The Runtime Complexity (innermost) of the given CpxRelTRS could be proven to be BOUNDS(1, n^2).

0 CpxRelTRS
1 RelTrsToWeightedTrsProof (BOTH BOUNDS(ID, ID), 0 ms)
2 CpxWeightedTrs
3 TypeInferenceProof (BOTH BOUNDS(ID, ID), 0 ms)
4 CpxTypedWeightedTrs
5 CompletionProof (UPPER BOUND(ID), 0 ms)
6 CpxTypedWeightedCompleteTrs
7 NarrowingProof (BOTH BOUNDS(ID, ID), 32 ms)
8 CpxTypedWeightedCompleteTrs
9 CpxTypedWeightedTrsToRntsProof (UPPER BOUND(ID), 0 ms)
10 CpxRNTS
11 InliningProof (UPPER BOUND(ID), 796 ms)
12 CpxRNTS
13 SimplificationProof (BOTH BOUNDS(ID, ID), 0 ms)
14 CpxRNTS
15 CpxRntsAnalysisOrderProof (BOTH BOUNDS(ID, ID), 0 ms)
16 CpxRNTS
17 IntTrsBoundProof (UPPER BOUND(ID), 1204 ms)
18 CpxRNTS
19 IntTrsBoundProof (UPPER BOUND(ID), 254 ms)
20 CpxRNTS
21 ResultPropagationProof (UPPER BOUND(ID), 0 ms)
22 CpxRNTS
23 IntTrsBoundProof (UPPER BOUND(ID), 129 ms)
24 CpxRNTS
25 IntTrsBoundProof (UPPER BOUND(ID), 15 ms)
26 CpxRNTS
27 ResultPropagationProof (UPPER BOUND(ID), 0 ms)
28 CpxRNTS
29 IntTrsBoundProof (UPPER BOUND(ID), 216 ms)
30 CpxRNTS
31 IntTrsBoundProof (UPPER BOUND(ID), 48 ms)
32 CpxRNTS
33 ResultPropagationProof (UPPER BOUND(ID), 0 ms)
34 CpxRNTS
35 IntTrsBoundProof (UPPER BOUND(ID), 884 ms)
36 CpxRNTS
37 IntTrsBoundProof (UPPER BOUND(ID), 30 ms)
38 CpxRNTS
39 ResultPropagationProof (UPPER BOUND(ID), 0 ms)
40 CpxRNTS
41 IntTrsBoundProof (UPPER BOUND(ID), 1647 ms)
42 CpxRNTS
43 IntTrsBoundProof (UPPER BOUND(ID), 572 ms)
44 CpxRNTS
45 ResultPropagationProof (UPPER BOUND(ID), 0 ms)
46 CpxRNTS
47 IntTrsBoundProof (UPPER BOUND(ID), 1791 ms)
48 CpxRNTS
49 IntTrsBoundProof (UPPER BOUND(ID), 522 ms)
50 CpxRNTS
51 ResultPropagationProof (UPPER BOUND(ID), 0 ms)
52 CpxRNTS
53 IntTrsBoundProof (UPPER BOUND(ID), 592 ms)
54 CpxRNTS
55 IntTrsBoundProof (UPPER BOUND(ID), 58 ms)
56 CpxRNTS
57 ResultPropagationProof (UPPER BOUND(ID), 0 ms)
58 CpxRNTS
59 IntTrsBoundProof (UPPER BOUND(ID), 201 ms)
60 CpxRNTS
61 IntTrsBoundProof (UPPER BOUND(ID), 36 ms)
62 CpxRNTS
63 ResultPropagationProof (UPPER BOUND(ID), 0 ms)
64 CpxRNTS
65 IntTrsBoundProof (UPPER BOUND(ID), 249 ms)
66 CpxRNTS
67 IntTrsBoundProof (UPPER BOUND(ID), 36 ms)
68 CpxRNTS
69 ResultPropagationProof (UPPER BOUND(ID), 0 ms)
70 CpxRNTS
71 IntTrsBoundProof (UPPER BOUND(ID), 162 ms)
72 CpxRNTS
73 IntTrsBoundProof (UPPER BOUND(ID), 44 ms)
74 CpxRNTS
75 ResultPropagationProof (UPPER BOUND(ID), 0 ms)
76 CpxRNTS
77 IntTrsBoundProof (UPPER BOUND(ID), 192 ms)
78 CpxRNTS
79 IntTrsBoundProof (UPPER BOUND(ID), 0 ms)
80 CpxRNTS
81 ResultPropagationProof (UPPER BOUND(ID), 0 ms)
82 CpxRNTS
83 IntTrsBoundProof (UPPER BOUND(ID), 242 ms)
84 CpxRNTS
85 IntTrsBoundProof (UPPER BOUND(ID), 14 ms)
86 CpxRNTS
87 ResultPropagationProof (UPPER BOUND(ID), 0 ms)
88 CpxRNTS
89 IntTrsBoundProof (UPPER BOUND(ID), 303 ms)
90 CpxRNTS
91 IntTrsBoundProof (UPPER BOUND(ID), 83 ms)
92 CpxRNTS
93 FinalProof (⇔, 0 ms)
94 BOUNDS(1, n^2)

(0) Obligation:

The Runtime Complexity (innermost) of the given CpxRelTRS could be proven to be BOUNDS(1, n^2).


The TRS R consists of the following rules:

#abs(#0) → #0
#abs(#neg(@x)) → #pos(@x)
#abs(#pos(@x)) → #pos(@x)
#abs(#s(@x)) → #pos(#s(@x))
#less(@x, @y) → #cklt(#compare(@x, @y))
insert(@x, @l) → insert#1(@l, @x)
insert#1(::(@y, @ys), @x) → insert#2(#less(@y, @x), @x, @y, @ys)
insert#1(nil, @x) → ::(@x, nil)
insert#2(#false, @x, @y, @ys) → ::(@x, ::(@y, @ys))
insert#2(#true, @x, @y, @ys) → ::(@y, insert(@x, @ys))
insertD(@x, @l) → insertD#1(@l, @x)
insertD#1(::(@y, @ys), @x) → insertD#2(#less(@y, @x), @x, @y, @ys)
insertD#1(nil, @x) → ::(@x, nil)
insertD#2(#false, @x, @y, @ys) → ::(@x, ::(@y, @ys))
insertD#2(#true, @x, @y, @ys) → ::(@y, insertD(@x, @ys))
insertionsort(@l) → insertionsort#1(@l)
insertionsort#1(::(@x, @xs)) → insert(@x, insertionsort(@xs))
insertionsort#1(nil) → nil
insertionsortD(@l) → insertionsortD#1(@l)
insertionsortD#1(::(@x, @xs)) → insertD(@x, insertionsortD(@xs))
insertionsortD#1(nil) → nil
testInsertionsort(@x) → insertionsort(testList(#unit))
testInsertionsortD(@x) → insertionsortD(testList(#unit))
testList(@_) → ::(#abs(#0), ::(#abs(#pos(#s(#s(#s(#s(#0)))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#0))))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#s(#s(#s(#0))))))))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#s(#0))))))))), ::(#abs(#pos(#s(#0))), ::(#abs(#pos(#s(#s(#0)))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#s(#s(#0)))))))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#0)))))))), ::(#abs(#pos(#s(#s(#s(#0))))), nil))))))))))

The (relative) TRS S consists of the following rules:

#cklt(#EQ) → #false
#cklt(#GT) → #false
#cklt(#LT) → #true
#compare(#0, #0) → #EQ
#compare(#0, #neg(@y)) → #GT
#compare(#0, #pos(@y)) → #LT
#compare(#0, #s(@y)) → #LT
#compare(#neg(@x), #0) → #LT
#compare(#neg(@x), #neg(@y)) → #compare(@y, @x)
#compare(#neg(@x), #pos(@y)) → #LT
#compare(#pos(@x), #0) → #GT
#compare(#pos(@x), #neg(@y)) → #GT
#compare(#pos(@x), #pos(@y)) → #compare(@x, @y)
#compare(#s(@x), #0) → #GT
#compare(#s(@x), #s(@y)) → #compare(@x, @y)

Rewrite Strategy: INNERMOST

(1) RelTrsToWeightedTrsProof (BOTH BOUNDS(ID, ID) transformation)

Transformed relative TRS to weighted TRS

(2) Obligation:

The Runtime Complexity (innermost) of the given CpxWeightedTrs could be proven to be BOUNDS(1, n^2).


The TRS R consists of the following rules:

#abs(#0) → #0 [1]
#abs(#neg(@x)) → #pos(@x) [1]
#abs(#pos(@x)) → #pos(@x) [1]
#abs(#s(@x)) → #pos(#s(@x)) [1]
#less(@x, @y) → #cklt(#compare(@x, @y)) [1]
insert(@x, @l) → insert#1(@l, @x) [1]
insert#1(::(@y, @ys), @x) → insert#2(#less(@y, @x), @x, @y, @ys) [1]
insert#1(nil, @x) → ::(@x, nil) [1]
insert#2(#false, @x, @y, @ys) → ::(@x, ::(@y, @ys)) [1]
insert#2(#true, @x, @y, @ys) → ::(@y, insert(@x, @ys)) [1]
insertD(@x, @l) → insertD#1(@l, @x) [1]
insertD#1(::(@y, @ys), @x) → insertD#2(#less(@y, @x), @x, @y, @ys) [1]
insertD#1(nil, @x) → ::(@x, nil) [1]
insertD#2(#false, @x, @y, @ys) → ::(@x, ::(@y, @ys)) [1]
insertD#2(#true, @x, @y, @ys) → ::(@y, insertD(@x, @ys)) [1]
insertionsort(@l) → insertionsort#1(@l) [1]
insertionsort#1(::(@x, @xs)) → insert(@x, insertionsort(@xs)) [1]
insertionsort#1(nil) → nil [1]
insertionsortD(@l) → insertionsortD#1(@l) [1]
insertionsortD#1(::(@x, @xs)) → insertD(@x, insertionsortD(@xs)) [1]
insertionsortD#1(nil) → nil [1]
testInsertionsort(@x) → insertionsort(testList(#unit)) [1]
testInsertionsortD(@x) → insertionsortD(testList(#unit)) [1]
testList(@_) → ::(#abs(#0), ::(#abs(#pos(#s(#s(#s(#s(#0)))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#0))))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#s(#s(#s(#0))))))))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#s(#0))))))))), ::(#abs(#pos(#s(#0))), ::(#abs(#pos(#s(#s(#0)))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#s(#s(#0)))))))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#0)))))))), ::(#abs(#pos(#s(#s(#s(#0))))), nil)))))))))) [1]
#cklt(#EQ) → #false [0]
#cklt(#GT) → #false [0]
#cklt(#LT) → #true [0]
#compare(#0, #0) → #EQ [0]
#compare(#0, #neg(@y)) → #GT [0]
#compare(#0, #pos(@y)) → #LT [0]
#compare(#0, #s(@y)) → #LT [0]
#compare(#neg(@x), #0) → #LT [0]
#compare(#neg(@x), #neg(@y)) → #compare(@y, @x) [0]
#compare(#neg(@x), #pos(@y)) → #LT [0]
#compare(#pos(@x), #0) → #GT [0]
#compare(#pos(@x), #neg(@y)) → #GT [0]
#compare(#pos(@x), #pos(@y)) → #compare(@x, @y) [0]
#compare(#s(@x), #0) → #GT [0]
#compare(#s(@x), #s(@y)) → #compare(@x, @y) [0]

Rewrite Strategy: INNERMOST

(3) TypeInferenceProof (BOTH BOUNDS(ID, ID) transformation)

Infered types.

(4) Obligation:

Runtime Complexity Weighted TRS with Types.
The TRS R consists of the following rules:

#abs(#0) → #0 [1]
#abs(#neg(@x)) → #pos(@x) [1]
#abs(#pos(@x)) → #pos(@x) [1]
#abs(#s(@x)) → #pos(#s(@x)) [1]
#less(@x, @y) → #cklt(#compare(@x, @y)) [1]
insert(@x, @l) → insert#1(@l, @x) [1]
insert#1(::(@y, @ys), @x) → insert#2(#less(@y, @x), @x, @y, @ys) [1]
insert#1(nil, @x) → ::(@x, nil) [1]
insert#2(#false, @x, @y, @ys) → ::(@x, ::(@y, @ys)) [1]
insert#2(#true, @x, @y, @ys) → ::(@y, insert(@x, @ys)) [1]
insertD(@x, @l) → insertD#1(@l, @x) [1]
insertD#1(::(@y, @ys), @x) → insertD#2(#less(@y, @x), @x, @y, @ys) [1]
insertD#1(nil, @x) → ::(@x, nil) [1]
insertD#2(#false, @x, @y, @ys) → ::(@x, ::(@y, @ys)) [1]
insertD#2(#true, @x, @y, @ys) → ::(@y, insertD(@x, @ys)) [1]
insertionsort(@l) → insertionsort#1(@l) [1]
insertionsort#1(::(@x, @xs)) → insert(@x, insertionsort(@xs)) [1]
insertionsort#1(nil) → nil [1]
insertionsortD(@l) → insertionsortD#1(@l) [1]
insertionsortD#1(::(@x, @xs)) → insertD(@x, insertionsortD(@xs)) [1]
insertionsortD#1(nil) → nil [1]
testInsertionsort(@x) → insertionsort(testList(#unit)) [1]
testInsertionsortD(@x) → insertionsortD(testList(#unit)) [1]
testList(@_) → ::(#abs(#0), ::(#abs(#pos(#s(#s(#s(#s(#0)))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#0))))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#s(#s(#s(#0))))))))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#s(#0))))))))), ::(#abs(#pos(#s(#0))), ::(#abs(#pos(#s(#s(#0)))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#s(#s(#0)))))))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#0)))))))), ::(#abs(#pos(#s(#s(#s(#0))))), nil)))))))))) [1]
#cklt(#EQ) → #false [0]
#cklt(#GT) → #false [0]
#cklt(#LT) → #true [0]
#compare(#0, #0) → #EQ [0]
#compare(#0, #neg(@y)) → #GT [0]
#compare(#0, #pos(@y)) → #LT [0]
#compare(#0, #s(@y)) → #LT [0]
#compare(#neg(@x), #0) → #LT [0]
#compare(#neg(@x), #neg(@y)) → #compare(@y, @x) [0]
#compare(#neg(@x), #pos(@y)) → #LT [0]
#compare(#pos(@x), #0) → #GT [0]
#compare(#pos(@x), #neg(@y)) → #GT [0]
#compare(#pos(@x), #pos(@y)) → #compare(@x, @y) [0]
#compare(#s(@x), #0) → #GT [0]
#compare(#s(@x), #s(@y)) → #compare(@x, @y) [0]

The TRS has the following type information:
#abs :: #0:#neg:#pos:#s → #0:#neg:#pos:#s
#0 :: #0:#neg:#pos:#s
#neg :: #0:#neg:#pos:#s → #0:#neg:#pos:#s
#pos :: #0:#neg:#pos:#s → #0:#neg:#pos:#s
#s :: #0:#neg:#pos:#s → #0:#neg:#pos:#s
#less :: #0:#neg:#pos:#s → #0:#neg:#pos:#s → #false:#true
#cklt :: #EQ:#GT:#LT → #false:#true
#compare :: #0:#neg:#pos:#s → #0:#neg:#pos:#s → #EQ:#GT:#LT
insert :: #0:#neg:#pos:#s → :::nil → :::nil
insert#1 :: :::nil → #0:#neg:#pos:#s → :::nil
:: :: #0:#neg:#pos:#s → :::nil → :::nil
insert#2 :: #false:#true → #0:#neg:#pos:#s → #0:#neg:#pos:#s → :::nil → :::nil
nil :: :::nil
#false :: #false:#true
#true :: #false:#true
insertD :: #0:#neg:#pos:#s → :::nil → :::nil
insertD#1 :: :::nil → #0:#neg:#pos:#s → :::nil
insertD#2 :: #false:#true → #0:#neg:#pos:#s → #0:#neg:#pos:#s → :::nil → :::nil
insertionsort :: :::nil → :::nil
insertionsort#1 :: :::nil → :::nil
insertionsortD :: :::nil → :::nil
insertionsortD#1 :: :::nil → :::nil
testInsertionsort :: a → :::nil
testList :: #unit → :::nil
#unit :: #unit
testInsertionsortD :: b → :::nil
#EQ :: #EQ:#GT:#LT
#GT :: #EQ:#GT:#LT
#LT :: #EQ:#GT:#LT

Rewrite Strategy: INNERMOST

(5) CompletionProof (UPPER BOUND(ID) transformation)

The transformation into a RNTS is sound, since:

(a) The obligation is a constructor system where every type has a constant constructor,

(b) The following defined symbols do not have to be completely defined, as they can never occur inside other defined symbols:


testInsertionsort
testInsertionsortD

(c) The following functions are completely defined:

insertionsortD
insertionsort
#less
testList
#abs
insertionsortD#1
insertionsort#1
insertD
insert
insertD#1
insertD#2
insert#1
insert#2
#cklt
#compare

Due to the following rules being added:

#cklt(v0) → null_#cklt [0]
#compare(v0, v1) → null_#compare [0]
insertD#2(v0, v1, v2, v3) → nil [0]
insert#2(v0, v1, v2, v3) → nil [0]

And the following fresh constants:

null_#cklt, null_#compare, const, const1

(6) Obligation:

Runtime Complexity Weighted TRS where critical functions are completely defined. The underlying TRS is:

Runtime Complexity Weighted TRS with Types.
The TRS R consists of the following rules:

#abs(#0) → #0 [1]
#abs(#neg(@x)) → #pos(@x) [1]
#abs(#pos(@x)) → #pos(@x) [1]
#abs(#s(@x)) → #pos(#s(@x)) [1]
#less(@x, @y) → #cklt(#compare(@x, @y)) [1]
insert(@x, @l) → insert#1(@l, @x) [1]
insert#1(::(@y, @ys), @x) → insert#2(#less(@y, @x), @x, @y, @ys) [1]
insert#1(nil, @x) → ::(@x, nil) [1]
insert#2(#false, @x, @y, @ys) → ::(@x, ::(@y, @ys)) [1]
insert#2(#true, @x, @y, @ys) → ::(@y, insert(@x, @ys)) [1]
insertD(@x, @l) → insertD#1(@l, @x) [1]
insertD#1(::(@y, @ys), @x) → insertD#2(#less(@y, @x), @x, @y, @ys) [1]
insertD#1(nil, @x) → ::(@x, nil) [1]
insertD#2(#false, @x, @y, @ys) → ::(@x, ::(@y, @ys)) [1]
insertD#2(#true, @x, @y, @ys) → ::(@y, insertD(@x, @ys)) [1]
insertionsort(@l) → insertionsort#1(@l) [1]
insertionsort#1(::(@x, @xs)) → insert(@x, insertionsort(@xs)) [1]
insertionsort#1(nil) → nil [1]
insertionsortD(@l) → insertionsortD#1(@l) [1]
insertionsortD#1(::(@x, @xs)) → insertD(@x, insertionsortD(@xs)) [1]
insertionsortD#1(nil) → nil [1]
testInsertionsort(@x) → insertionsort(testList(#unit)) [1]
testInsertionsortD(@x) → insertionsortD(testList(#unit)) [1]
testList(@_) → ::(#abs(#0), ::(#abs(#pos(#s(#s(#s(#s(#0)))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#0))))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#s(#s(#s(#0))))))))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#s(#0))))))))), ::(#abs(#pos(#s(#0))), ::(#abs(#pos(#s(#s(#0)))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#s(#s(#0)))))))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#0)))))))), ::(#abs(#pos(#s(#s(#s(#0))))), nil)))))))))) [1]
#cklt(#EQ) → #false [0]
#cklt(#GT) → #false [0]
#cklt(#LT) → #true [0]
#compare(#0, #0) → #EQ [0]
#compare(#0, #neg(@y)) → #GT [0]
#compare(#0, #pos(@y)) → #LT [0]
#compare(#0, #s(@y)) → #LT [0]
#compare(#neg(@x), #0) → #LT [0]
#compare(#neg(@x), #neg(@y)) → #compare(@y, @x) [0]
#compare(#neg(@x), #pos(@y)) → #LT [0]
#compare(#pos(@x), #0) → #GT [0]
#compare(#pos(@x), #neg(@y)) → #GT [0]
#compare(#pos(@x), #pos(@y)) → #compare(@x, @y) [0]
#compare(#s(@x), #0) → #GT [0]
#compare(#s(@x), #s(@y)) → #compare(@x, @y) [0]
#cklt(v0) → null_#cklt [0]
#compare(v0, v1) → null_#compare [0]
insertD#2(v0, v1, v2, v3) → nil [0]
insert#2(v0, v1, v2, v3) → nil [0]

The TRS has the following type information:
#abs :: #0:#neg:#pos:#s → #0:#neg:#pos:#s
#0 :: #0:#neg:#pos:#s
#neg :: #0:#neg:#pos:#s → #0:#neg:#pos:#s
#pos :: #0:#neg:#pos:#s → #0:#neg:#pos:#s
#s :: #0:#neg:#pos:#s → #0:#neg:#pos:#s
#less :: #0:#neg:#pos:#s → #0:#neg:#pos:#s → #false:#true:null_#cklt
#cklt :: #EQ:#GT:#LT:null_#compare → #false:#true:null_#cklt
#compare :: #0:#neg:#pos:#s → #0:#neg:#pos:#s → #EQ:#GT:#LT:null_#compare
insert :: #0:#neg:#pos:#s → :::nil → :::nil
insert#1 :: :::nil → #0:#neg:#pos:#s → :::nil
:: :: #0:#neg:#pos:#s → :::nil → :::nil
insert#2 :: #false:#true:null_#cklt → #0:#neg:#pos:#s → #0:#neg:#pos:#s → :::nil → :::nil
nil :: :::nil
#false :: #false:#true:null_#cklt
#true :: #false:#true:null_#cklt
insertD :: #0:#neg:#pos:#s → :::nil → :::nil
insertD#1 :: :::nil → #0:#neg:#pos:#s → :::nil
insertD#2 :: #false:#true:null_#cklt → #0:#neg:#pos:#s → #0:#neg:#pos:#s → :::nil → :::nil
insertionsort :: :::nil → :::nil
insertionsort#1 :: :::nil → :::nil
insertionsortD :: :::nil → :::nil
insertionsortD#1 :: :::nil → :::nil
testInsertionsort :: a → :::nil
testList :: #unit → :::nil
#unit :: #unit
testInsertionsortD :: b → :::nil
#EQ :: #EQ:#GT:#LT:null_#compare
#GT :: #EQ:#GT:#LT:null_#compare
#LT :: #EQ:#GT:#LT:null_#compare
null_#cklt :: #false:#true:null_#cklt
null_#compare :: #EQ:#GT:#LT:null_#compare
const :: a
const1 :: b

Rewrite Strategy: INNERMOST

(7) NarrowingProof (BOTH BOUNDS(ID, ID) transformation)

Narrowed the inner basic terms of all right-hand sides by a single narrowing step.

(8) Obligation:

Runtime Complexity Weighted TRS where critical functions are completely defined. The underlying TRS is:

Runtime Complexity Weighted TRS with Types.
The TRS R consists of the following rules:

#abs(#0) → #0 [1]
#abs(#neg(@x)) → #pos(@x) [1]
#abs(#pos(@x)) → #pos(@x) [1]
#abs(#s(@x)) → #pos(#s(@x)) [1]
#less(#0, #0) → #cklt(#EQ) [1]
#less(#0, #neg(@y')) → #cklt(#GT) [1]
#less(#0, #pos(@y'')) → #cklt(#LT) [1]
#less(#0, #s(@y1)) → #cklt(#LT) [1]
#less(#neg(@x'), #0) → #cklt(#LT) [1]
#less(#neg(@x''), #neg(@y2)) → #cklt(#compare(@y2, @x'')) [1]
#less(#neg(@x1), #pos(@y3)) → #cklt(#LT) [1]
#less(#pos(@x2), #0) → #cklt(#GT) [1]
#less(#pos(@x3), #neg(@y4)) → #cklt(#GT) [1]
#less(#pos(@x4), #pos(@y5)) → #cklt(#compare(@x4, @y5)) [1]
#less(#s(@x5), #0) → #cklt(#GT) [1]
#less(#s(@x6), #s(@y6)) → #cklt(#compare(@x6, @y6)) [1]
#less(@x, @y) → #cklt(null_#compare) [1]
insert(@x, @l) → insert#1(@l, @x) [1]
insert#1(::(@y, @ys), @x) → insert#2(#cklt(#compare(@y, @x)), @x, @y, @ys) [2]
insert#1(nil, @x) → ::(@x, nil) [1]
insert#2(#false, @x, @y, @ys) → ::(@x, ::(@y, @ys)) [1]
insert#2(#true, @x, @y, @ys) → ::(@y, insert(@x, @ys)) [1]
insertD(@x, @l) → insertD#1(@l, @x) [1]
insertD#1(::(@y, @ys), @x) → insertD#2(#cklt(#compare(@y, @x)), @x, @y, @ys) [2]
insertD#1(nil, @x) → ::(@x, nil) [1]
insertD#2(#false, @x, @y, @ys) → ::(@x, ::(@y, @ys)) [1]
insertD#2(#true, @x, @y, @ys) → ::(@y, insertD(@x, @ys)) [1]
insertionsort(@l) → insertionsort#1(@l) [1]
insertionsort#1(::(@x, @xs)) → insert(@x, insertionsort#1(@xs)) [2]
insertionsort#1(nil) → nil [1]
insertionsortD(@l) → insertionsortD#1(@l) [1]
insertionsortD#1(::(@x, @xs)) → insertD(@x, insertionsortD#1(@xs)) [2]
insertionsortD#1(nil) → nil [1]
testInsertionsort(@x) → insertionsort(::(#abs(#0), ::(#abs(#pos(#s(#s(#s(#s(#0)))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#0))))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#s(#s(#s(#0))))))))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#s(#0))))))))), ::(#abs(#pos(#s(#0))), ::(#abs(#pos(#s(#s(#0)))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#s(#s(#0)))))))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#0)))))))), ::(#abs(#pos(#s(#s(#s(#0))))), nil))))))))))) [2]
testInsertionsortD(@x) → insertionsortD(::(#abs(#0), ::(#abs(#pos(#s(#s(#s(#s(#0)))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#0))))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#s(#s(#s(#0))))))))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#s(#0))))))))), ::(#abs(#pos(#s(#0))), ::(#abs(#pos(#s(#s(#0)))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#s(#s(#0)))))))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#0)))))))), ::(#abs(#pos(#s(#s(#s(#0))))), nil))))))))))) [2]
testList(@_) → ::(#abs(#0), ::(#abs(#pos(#s(#s(#s(#s(#0)))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#0))))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#s(#s(#s(#0))))))))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#s(#0))))))))), ::(#abs(#pos(#s(#0))), ::(#abs(#pos(#s(#s(#0)))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#s(#s(#0)))))))))), ::(#abs(#pos(#s(#s(#s(#s(#s(#s(#0)))))))), ::(#abs(#pos(#s(#s(#s(#0))))), nil)))))))))) [1]
#cklt(#EQ) → #false [0]
#cklt(#GT) → #false [0]
#cklt(#LT) → #true [0]
#compare(#0, #0) → #EQ [0]
#compare(#0, #neg(@y)) → #GT [0]
#compare(#0, #pos(@y)) → #LT [0]
#compare(#0, #s(@y)) → #LT [0]
#compare(#neg(@x), #0) → #LT [0]
#compare(#neg(@x), #neg(@y)) → #compare(@y, @x) [0]
#compare(#neg(@x), #pos(@y)) → #LT [0]
#compare(#pos(@x), #0) → #GT [0]
#compare(#pos(@x), #neg(@y)) → #GT [0]
#compare(#pos(@x), #pos(@y)) → #compare(@x, @y) [0]
#compare(#s(@x), #0) → #GT [0]
#compare(#s(@x), #s(@y)) → #compare(@x, @y) [0]
#cklt(v0) → null_#cklt [0]
#compare(v0, v1) → null_#compare [0]
insertD#2(v0, v1, v2, v3) → nil [0]
insert#2(v0, v1, v2, v3) → nil [0]

The TRS has the following type information:
#abs :: #0:#neg:#pos:#s → #0:#neg:#pos:#s
#0 :: #0:#neg:#pos:#s
#neg :: #0:#neg:#pos:#s → #0:#neg:#pos:#s
#pos :: #0:#neg:#pos:#s → #0:#neg:#pos:#s
#s :: #0:#neg:#pos:#s → #0:#neg:#pos:#s
#less :: #0:#neg:#pos:#s → #0:#neg:#pos:#s → #false:#true:null_#cklt
#cklt :: #EQ:#GT:#LT:null_#compare → #false:#true:null_#cklt
#compare :: #0:#neg:#pos:#s → #0:#neg:#pos:#s → #EQ:#GT:#LT:null_#compare
insert :: #0:#neg:#pos:#s → :::nil → :::nil
insert#1 :: :::nil → #0:#neg:#pos:#s → :::nil
:: :: #0:#neg:#pos:#s → :::nil → :::nil
insert#2 :: #false:#true:null_#cklt → #0:#neg:#pos:#s → #0:#neg:#pos:#s → :::nil → :::nil
nil :: :::nil
#false :: #false:#true:null_#cklt
#true :: #false:#true:null_#cklt
insertD :: #0:#neg:#pos:#s → :::nil → :::nil
insertD#1 :: :::nil → #0:#neg:#pos:#s → :::nil
insertD#2 :: #false:#true:null_#cklt → #0:#neg:#pos:#s → #0:#neg:#pos:#s → :::nil → :::nil
insertionsort :: :::nil → :::nil
insertionsort#1 :: :::nil → :::nil
insertionsortD :: :::nil → :::nil
insertionsortD#1 :: :::nil → :::nil
testInsertionsort :: a → :::nil
testList :: #unit → :::nil
#unit :: #unit
testInsertionsortD :: b → :::nil
#EQ :: #EQ:#GT:#LT:null_#compare
#GT :: #EQ:#GT:#LT:null_#compare
#LT :: #EQ:#GT:#LT:null_#compare
null_#cklt :: #false:#true:null_#cklt
null_#compare :: #EQ:#GT:#LT:null_#compare
const :: a
const1 :: b

Rewrite Strategy: INNERMOST

(9) CpxTypedWeightedTrsToRntsProof (UPPER BOUND(ID) transformation)

Transformed the TRS into an over-approximating RNTS by (improved) Size Abstraction.
The constant constructors are abstracted as follows:

#0 => 0
nil => 0
#false => 1
#true => 2
#unit => 0
#EQ => 1
#GT => 2
#LT => 3
null_#cklt => 0
null_#compare => 0
const => 0
const1 => 0

(10) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + @x :|: @x >= 0, z = 1 + @x
#abs(z) -{ 1 }→ 1 + (1 + @x) :|: @x >= 0, z = 1 + @x
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: v0 >= 0, z = v0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' = 1 + @y, @y >= 0
#compare(z, z') -{ 0 }→ 3 :|: @x >= 0, z = 1 + @x, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: @x >= 0, z = 1 + @x, z' = 1 + @y, @y >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' = 1 + @y, @y >= 0
#compare(z, z') -{ 0 }→ 2 :|: @x >= 0, z = 1 + @x, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: @x >= 0, z = 1 + @x, z' = 1 + @y, @y >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: v0 >= 0, v1 >= 0, z = v0, z' = v1
#compare(z, z') -{ 0 }→ #compare(@x, @y) :|: @x >= 0, z = 1 + @x, z' = 1 + @y, @y >= 0
#compare(z, z') -{ 0 }→ #compare(@y, @x) :|: @x >= 0, z = 1 + @x, z' = 1 + @y, @y >= 0
#less(z, z') -{ 1 }→ #cklt(3) :|: z' = 1 + @y'', @y'' >= 0, z = 0
#less(z, z') -{ 1 }→ #cklt(3) :|: z' = 1 + @y1, @y1 >= 0, z = 0
#less(z, z') -{ 1 }→ #cklt(3) :|: z = 1 + @x', @x' >= 0, z' = 0
#less(z, z') -{ 1 }→ #cklt(3) :|: @y3 >= 0, @x1 >= 0, z' = 1 + @y3, z = 1 + @x1
#less(z, z') -{ 1 }→ #cklt(2) :|: @y' >= 0, z' = 1 + @y', z = 0
#less(z, z') -{ 1 }→ #cklt(2) :|: @x2 >= 0, z = 1 + @x2, z' = 0
#less(z, z') -{ 1 }→ #cklt(2) :|: @x3 >= 0, z' = 1 + @y4, z = 1 + @x3, @y4 >= 0
#less(z, z') -{ 1 }→ #cklt(2) :|: z = 1 + @x5, @x5 >= 0, z' = 0
#less(z, z') -{ 1 }→ #cklt(1) :|: z = 0, z' = 0
#less(z, z') -{ 1 }→ #cklt(0) :|: z = @x, @x >= 0, z' = @y, @y >= 0
#less(z, z') -{ 1 }→ #cklt(#compare(@x4, @y5)) :|: z' = 1 + @y5, @y5 >= 0, z = 1 + @x4, @x4 >= 0
#less(z, z') -{ 1 }→ #cklt(#compare(@x6, @y6)) :|: z = 1 + @x6, z' = 1 + @y6, @x6 >= 0, @y6 >= 0
#less(z, z') -{ 1 }→ #cklt(#compare(@y2, @x'')) :|: z = 1 + @x'', z' = 1 + @y2, @y2 >= 0, @x'' >= 0
insert(z, z') -{ 1 }→ insert#1(@l, @x) :|: z = @x, @l >= 0, @x >= 0, z' = @l
insert#1(z, z') -{ 2 }→ insert#2(#cklt(#compare(@y, @x)), @x, @y, @ys) :|: z = 1 + @y + @ys, @x >= 0, @y >= 0, z' = @x, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + @x + 0 :|: @x >= 0, z = 0, z' = @x
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z1 = v3, v0 >= 0, z'' = v2, v1 >= 0, z = v0, z' = v1, v2 >= 0, v3 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + @x + (1 + @y + @ys) :|: @x >= 0, z = 1, z1 = @ys, @y >= 0, z' = @x, @ys >= 0, z'' = @y
insert#2(z, z', z'', z1) -{ 1 }→ 1 + @y + insert(@x, @ys) :|: z = 2, @x >= 0, z1 = @ys, @y >= 0, z' = @x, @ys >= 0, z'' = @y
insertD(z, z') -{ 1 }→ insertD#1(@l, @x) :|: z = @x, @l >= 0, @x >= 0, z' = @l
insertD#1(z, z') -{ 2 }→ insertD#2(#cklt(#compare(@y, @x)), @x, @y, @ys) :|: z = 1 + @y + @ys, @x >= 0, @y >= 0, z' = @x, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + @x + 0 :|: @x >= 0, z = 0, z' = @x
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z1 = v3, v0 >= 0, z'' = v2, v1 >= 0, z = v0, z' = v1, v2 >= 0, v3 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + @x + (1 + @y + @ys) :|: @x >= 0, z = 1, z1 = @ys, @y >= 0, z' = @x, @ys >= 0, z'' = @y
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + @y + insertD(@x, @ys) :|: z = 2, @x >= 0, z1 = @ys, @y >= 0, z' = @x, @ys >= 0, z'' = @y
insertionsort(z) -{ 1 }→ insertionsort#1(@l) :|: z = @l, @l >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(@l) :|: z = @l, @l >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 2 }→ insertionsort(1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0)))))))))) :|: z = @x, @x >= 0
testInsertionsortD(z) -{ 2 }→ insertionsortD(1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0)))))))))) :|: z = @x, @x >= 0
testList(z) -{ 1 }→ 1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0))))))))) :|: @_ >= 0, z = @_

(11) InliningProof (UPPER BOUND(ID) transformation)

Inlined the following terminating rules on right-hand sides where appropriate:

#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 0 :|: v0 >= 0, z = v0

(12) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + @x :|: @x >= 0, z = 1 + @x
#abs(z) -{ 1 }→ 1 + (1 + @x) :|: @x >= 0, z = 1 + @x
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: v0 >= 0, z = v0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' = 1 + @y, @y >= 0
#compare(z, z') -{ 0 }→ 3 :|: @x >= 0, z = 1 + @x, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: @x >= 0, z = 1 + @x, z' = 1 + @y, @y >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' = 1 + @y, @y >= 0
#compare(z, z') -{ 0 }→ 2 :|: @x >= 0, z = 1 + @x, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: @x >= 0, z = 1 + @x, z' = 1 + @y, @y >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: v0 >= 0, v1 >= 0, z = v0, z' = v1
#compare(z, z') -{ 0 }→ #compare(@x, @y) :|: @x >= 0, z = 1 + @x, z' = 1 + @y, @y >= 0
#compare(z, z') -{ 0 }→ #compare(@y, @x) :|: @x >= 0, z = 1 + @x, z' = 1 + @y, @y >= 0
#less(z, z') -{ 1 }→ 2 :|: z' = 1 + @y'', @y'' >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' = 1 + @y1, @y1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z = 1 + @x', @x' >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: @y3 >= 0, @x1 >= 0, z' = 1 + @y3, z = 1 + @x1, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: @y' >= 0, z' = 1 + @y', z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: @x2 >= 0, z = 1 + @x2, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: @x3 >= 0, z' = 1 + @y4, z = 1 + @x3, @y4 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z = 1 + @x5, @x5 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: @y' >= 0, z' = 1 + @y', z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' = 1 + @y'', @y'' >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' = 1 + @y1, @y1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z = 1 + @x', @x' >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: @y3 >= 0, @x1 >= 0, z' = 1 + @y3, z = 1 + @x1, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: @x2 >= 0, z = 1 + @x2, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: @x3 >= 0, z' = 1 + @y4, z = 1 + @x3, @y4 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z = 1 + @x5, @x5 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z = @x, @x >= 0, z' = @y, @y >= 0, v0 >= 0, 0 = v0
#less(z, z') -{ 1 }→ #cklt(#compare(@x4, @y5)) :|: z' = 1 + @y5, @y5 >= 0, z = 1 + @x4, @x4 >= 0
#less(z, z') -{ 1 }→ #cklt(#compare(@x6, @y6)) :|: z = 1 + @x6, z' = 1 + @y6, @x6 >= 0, @y6 >= 0
#less(z, z') -{ 1 }→ #cklt(#compare(@y2, @x'')) :|: z = 1 + @x'', z' = 1 + @y2, @y2 >= 0, @x'' >= 0
insert(z, z') -{ 1 }→ insert#1(@l, @x) :|: z = @x, @l >= 0, @x >= 0, z' = @l
insert#1(z, z') -{ 2 }→ insert#2(#cklt(#compare(@y, @x)), @x, @y, @ys) :|: z = 1 + @y + @ys, @x >= 0, @y >= 0, z' = @x, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + @x + 0 :|: @x >= 0, z = 0, z' = @x
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z1 = v3, v0 >= 0, z'' = v2, v1 >= 0, z = v0, z' = v1, v2 >= 0, v3 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + @x + (1 + @y + @ys) :|: @x >= 0, z = 1, z1 = @ys, @y >= 0, z' = @x, @ys >= 0, z'' = @y
insert#2(z, z', z'', z1) -{ 1 }→ 1 + @y + insert(@x, @ys) :|: z = 2, @x >= 0, z1 = @ys, @y >= 0, z' = @x, @ys >= 0, z'' = @y
insertD(z, z') -{ 1 }→ insertD#1(@l, @x) :|: z = @x, @l >= 0, @x >= 0, z' = @l
insertD#1(z, z') -{ 2 }→ insertD#2(#cklt(#compare(@y, @x)), @x, @y, @ys) :|: z = 1 + @y + @ys, @x >= 0, @y >= 0, z' = @x, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + @x + 0 :|: @x >= 0, z = 0, z' = @x
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z1 = v3, v0 >= 0, z'' = v2, v1 >= 0, z = v0, z' = v1, v2 >= 0, v3 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + @x + (1 + @y + @ys) :|: @x >= 0, z = 1, z1 = @ys, @y >= 0, z' = @x, @ys >= 0, z'' = @y
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + @y + insertD(@x, @ys) :|: z = 2, @x >= 0, z1 = @ys, @y >= 0, z' = @x, @ys >= 0, z'' = @y
insertionsort(z) -{ 1 }→ insertionsort#1(@l) :|: z = @l, @l >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(@l) :|: z = @l, @l >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 2 }→ insertionsort(1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0)))))))))) :|: z = @x, @x >= 0
testInsertionsortD(z) -{ 2 }→ insertionsortD(1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0)))))))))) :|: z = @x, @x >= 0
testList(z) -{ 1 }→ 1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0))))))))) :|: @_ >= 0, z = @_

(13) SimplificationProof (BOTH BOUNDS(ID, ID) transformation)

Simplified the RNTS by moving equalities from the constraints into the right-hand sides.

(14) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#compare(z, z') -{ 0 }→ #compare(z - 1, z' - 1) :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ #compare(z' - 1, z - 1) :|: z - 1 >= 0, z' - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
#less(z, z') -{ 1 }→ #cklt(#compare(z - 1, z' - 1)) :|: z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ #cklt(#compare(z' - 1, z - 1)) :|: z' - 1 >= 0, z - 1 >= 0
insert(z, z') -{ 1 }→ insert#1(z', z) :|: z' >= 0, z >= 0
insert#1(z, z') -{ 2 }→ insert#2(#cklt(#compare(@y, z')), z', @y, @ys) :|: z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insert(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 1 }→ insertD#1(z', z) :|: z' >= 0, z >= 0
insertD#1(z, z') -{ 2 }→ insertD#2(#cklt(#compare(@y, z')), z', @y, @ys) :|: z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insertD(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(z) :|: z >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 2 }→ insertionsort(1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0)))))))))) :|: z >= 0
testInsertionsortD(z) -{ 2 }→ insertionsortD(1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0)))))))))) :|: z >= 0
testList(z) -{ 1 }→ 1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0))))))))) :|: z >= 0

(15) CpxRntsAnalysisOrderProof (BOTH BOUNDS(ID, ID) transformation)

Found the following analysis order by SCC decomposition:

{ #compare }
{ #cklt }
{ #abs }
{ #less }
{ insertD#2, insertD#1, insertD }
{ insert#2, insert, insert#1 }
{ testList }
{ insertionsortD#1 }
{ insertionsort#1 }
{ insertionsortD }
{ insertionsort }
{ testInsertionsortD }
{ testInsertionsort }

(16) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#compare(z, z') -{ 0 }→ #compare(z - 1, z' - 1) :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ #compare(z' - 1, z - 1) :|: z - 1 >= 0, z' - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
#less(z, z') -{ 1 }→ #cklt(#compare(z - 1, z' - 1)) :|: z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ #cklt(#compare(z' - 1, z - 1)) :|: z' - 1 >= 0, z - 1 >= 0
insert(z, z') -{ 1 }→ insert#1(z', z) :|: z' >= 0, z >= 0
insert#1(z, z') -{ 2 }→ insert#2(#cklt(#compare(@y, z')), z', @y, @ys) :|: z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insert(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 1 }→ insertD#1(z', z) :|: z' >= 0, z >= 0
insertD#1(z, z') -{ 2 }→ insertD#2(#cklt(#compare(@y, z')), z', @y, @ys) :|: z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insertD(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(z) :|: z >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 2 }→ insertionsort(1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0)))))))))) :|: z >= 0
testInsertionsortD(z) -{ 2 }→ insertionsortD(1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0)))))))))) :|: z >= 0
testList(z) -{ 1 }→ 1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0))))))))) :|: z >= 0

Function symbols to be analyzed: {#compare}, {#cklt}, {#abs}, {#less}, {insertD#2,insertD#1,insertD}, {insert#2,insert,insert#1}, {testList}, {insertionsortD#1}, {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}

(17) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed SIZE bound using CoFloCo for: #compare
after applying outer abstraction to obtain an ITS,
resulting in: O(1) with polynomial bound: 3

(18) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#compare(z, z') -{ 0 }→ #compare(z - 1, z' - 1) :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ #compare(z' - 1, z - 1) :|: z - 1 >= 0, z' - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
#less(z, z') -{ 1 }→ #cklt(#compare(z - 1, z' - 1)) :|: z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ #cklt(#compare(z' - 1, z - 1)) :|: z' - 1 >= 0, z - 1 >= 0
insert(z, z') -{ 1 }→ insert#1(z', z) :|: z' >= 0, z >= 0
insert#1(z, z') -{ 2 }→ insert#2(#cklt(#compare(@y, z')), z', @y, @ys) :|: z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insert(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 1 }→ insertD#1(z', z) :|: z' >= 0, z >= 0
insertD#1(z, z') -{ 2 }→ insertD#2(#cklt(#compare(@y, z')), z', @y, @ys) :|: z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insertD(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(z) :|: z >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 2 }→ insertionsort(1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0)))))))))) :|: z >= 0
testInsertionsortD(z) -{ 2 }→ insertionsortD(1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0)))))))))) :|: z >= 0
testList(z) -{ 1 }→ 1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0))))))))) :|: z >= 0

Function symbols to be analyzed: {#compare}, {#cklt}, {#abs}, {#less}, {insertD#2,insertD#1,insertD}, {insert#2,insert,insert#1}, {testList}, {insertionsortD#1}, {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: ?, size: O(1) [3]

(19) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed RUNTIME bound using CoFloCo for: #compare
after applying outer abstraction to obtain an ITS,
resulting in: O(1) with polynomial bound: 0

(20) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#compare(z, z') -{ 0 }→ #compare(z - 1, z' - 1) :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ #compare(z' - 1, z - 1) :|: z - 1 >= 0, z' - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
#less(z, z') -{ 1 }→ #cklt(#compare(z - 1, z' - 1)) :|: z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ #cklt(#compare(z' - 1, z - 1)) :|: z' - 1 >= 0, z - 1 >= 0
insert(z, z') -{ 1 }→ insert#1(z', z) :|: z' >= 0, z >= 0
insert#1(z, z') -{ 2 }→ insert#2(#cklt(#compare(@y, z')), z', @y, @ys) :|: z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insert(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 1 }→ insertD#1(z', z) :|: z' >= 0, z >= 0
insertD#1(z, z') -{ 2 }→ insertD#2(#cklt(#compare(@y, z')), z', @y, @ys) :|: z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insertD(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(z) :|: z >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 2 }→ insertionsort(1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0)))))))))) :|: z >= 0
testInsertionsortD(z) -{ 2 }→ insertionsortD(1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0)))))))))) :|: z >= 0
testList(z) -{ 1 }→ 1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0))))))))) :|: z >= 0

Function symbols to be analyzed: {#cklt}, {#abs}, {#less}, {insertD#2,insertD#1,insertD}, {insert#2,insert,insert#1}, {testList}, {insertionsortD#1}, {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]

(21) ResultPropagationProof (UPPER BOUND(ID) transformation)

Applied inner abstraction using the recently inferred runtime/size bounds where possible.

(22) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
#less(z, z') -{ 1 }→ #cklt(s'') :|: s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ #cklt(s1) :|: s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
insert(z, z') -{ 1 }→ insert#1(z', z) :|: z' >= 0, z >= 0
insert#1(z, z') -{ 2 }→ insert#2(#cklt(s2), z', @y, @ys) :|: s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insert(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 1 }→ insertD#1(z', z) :|: z' >= 0, z >= 0
insertD#1(z, z') -{ 2 }→ insertD#2(#cklt(s3), z', @y, @ys) :|: s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insertD(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(z) :|: z >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 2 }→ insertionsort(1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0)))))))))) :|: z >= 0
testInsertionsortD(z) -{ 2 }→ insertionsortD(1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0)))))))))) :|: z >= 0
testList(z) -{ 1 }→ 1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0))))))))) :|: z >= 0

Function symbols to be analyzed: {#cklt}, {#abs}, {#less}, {insertD#2,insertD#1,insertD}, {insert#2,insert,insert#1}, {testList}, {insertionsortD#1}, {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]

(23) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed SIZE bound using CoFloCo for: #cklt
after applying outer abstraction to obtain an ITS,
resulting in: O(1) with polynomial bound: 2

(24) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
#less(z, z') -{ 1 }→ #cklt(s'') :|: s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ #cklt(s1) :|: s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
insert(z, z') -{ 1 }→ insert#1(z', z) :|: z' >= 0, z >= 0
insert#1(z, z') -{ 2 }→ insert#2(#cklt(s2), z', @y, @ys) :|: s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insert(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 1 }→ insertD#1(z', z) :|: z' >= 0, z >= 0
insertD#1(z, z') -{ 2 }→ insertD#2(#cklt(s3), z', @y, @ys) :|: s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insertD(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(z) :|: z >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 2 }→ insertionsort(1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0)))))))))) :|: z >= 0
testInsertionsortD(z) -{ 2 }→ insertionsortD(1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0)))))))))) :|: z >= 0
testList(z) -{ 1 }→ 1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0))))))))) :|: z >= 0

Function symbols to be analyzed: {#cklt}, {#abs}, {#less}, {insertD#2,insertD#1,insertD}, {insert#2,insert,insert#1}, {testList}, {insertionsortD#1}, {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: ?, size: O(1) [2]

(25) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed RUNTIME bound using CoFloCo for: #cklt
after applying outer abstraction to obtain an ITS,
resulting in: O(1) with polynomial bound: 0

(26) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
#less(z, z') -{ 1 }→ #cklt(s'') :|: s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ #cklt(s1) :|: s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
insert(z, z') -{ 1 }→ insert#1(z', z) :|: z' >= 0, z >= 0
insert#1(z, z') -{ 2 }→ insert#2(#cklt(s2), z', @y, @ys) :|: s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insert(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 1 }→ insertD#1(z', z) :|: z' >= 0, z >= 0
insertD#1(z, z') -{ 2 }→ insertD#2(#cklt(s3), z', @y, @ys) :|: s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insertD(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(z) :|: z >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 2 }→ insertionsort(1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0)))))))))) :|: z >= 0
testInsertionsortD(z) -{ 2 }→ insertionsortD(1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0)))))))))) :|: z >= 0
testList(z) -{ 1 }→ 1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0))))))))) :|: z >= 0

Function symbols to be analyzed: {#abs}, {#less}, {insertD#2,insertD#1,insertD}, {insert#2,insert,insert#1}, {testList}, {insertionsortD#1}, {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]

(27) ResultPropagationProof (UPPER BOUND(ID) transformation)

Applied inner abstraction using the recently inferred runtime/size bounds where possible.

(28) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 1 }→ insert#1(z', z) :|: z' >= 0, z >= 0
insert#1(z, z') -{ 2 }→ insert#2(s6, z', @y, @ys) :|: s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insert(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 1 }→ insertD#1(z', z) :|: z' >= 0, z >= 0
insertD#1(z, z') -{ 2 }→ insertD#2(s7, z', @y, @ys) :|: s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insertD(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(z) :|: z >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 2 }→ insertionsort(1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0)))))))))) :|: z >= 0
testInsertionsortD(z) -{ 2 }→ insertionsortD(1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0)))))))))) :|: z >= 0
testList(z) -{ 1 }→ 1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0))))))))) :|: z >= 0

Function symbols to be analyzed: {#abs}, {#less}, {insertD#2,insertD#1,insertD}, {insert#2,insert,insert#1}, {testList}, {insertionsortD#1}, {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]

(29) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed SIZE bound using CoFloCo for: #abs
after applying outer abstraction to obtain an ITS,
resulting in: O(n1) with polynomial bound: 1 + z

(30) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 1 }→ insert#1(z', z) :|: z' >= 0, z >= 0
insert#1(z, z') -{ 2 }→ insert#2(s6, z', @y, @ys) :|: s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insert(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 1 }→ insertD#1(z', z) :|: z' >= 0, z >= 0
insertD#1(z, z') -{ 2 }→ insertD#2(s7, z', @y, @ys) :|: s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insertD(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(z) :|: z >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 2 }→ insertionsort(1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0)))))))))) :|: z >= 0
testInsertionsortD(z) -{ 2 }→ insertionsortD(1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0)))))))))) :|: z >= 0
testList(z) -{ 1 }→ 1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0))))))))) :|: z >= 0

Function symbols to be analyzed: {#abs}, {#less}, {insertD#2,insertD#1,insertD}, {insert#2,insert,insert#1}, {testList}, {insertionsortD#1}, {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: ?, size: O(n1) [1 + z]

(31) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed RUNTIME bound using CoFloCo for: #abs
after applying outer abstraction to obtain an ITS,
resulting in: O(1) with polynomial bound: 1

(32) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 1 }→ insert#1(z', z) :|: z' >= 0, z >= 0
insert#1(z, z') -{ 2 }→ insert#2(s6, z', @y, @ys) :|: s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insert(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 1 }→ insertD#1(z', z) :|: z' >= 0, z >= 0
insertD#1(z, z') -{ 2 }→ insertD#2(s7, z', @y, @ys) :|: s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insertD(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(z) :|: z >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 2 }→ insertionsort(1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0)))))))))) :|: z >= 0
testInsertionsortD(z) -{ 2 }→ insertionsortD(1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0)))))))))) :|: z >= 0
testList(z) -{ 1 }→ 1 + #abs(0) + (1 + #abs(1 + (1 + (1 + (1 + (1 + 0))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + (1 + #abs(1 + (1 + 0)) + (1 + #abs(1 + (1 + (1 + 0))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + (1 + #abs(1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + (1 + #abs(1 + (1 + (1 + (1 + 0)))) + 0))))))))) :|: z >= 0

Function symbols to be analyzed: {#less}, {insertD#2,insertD#1,insertD}, {insert#2,insert,insert#1}, {testList}, {insertionsortD#1}, {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]

(33) ResultPropagationProof (UPPER BOUND(ID) transformation)

Applied inner abstraction using the recently inferred runtime/size bounds where possible.

(34) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 1 }→ insert#1(z', z) :|: z' >= 0, z >= 0
insert#1(z, z') -{ 2 }→ insert#2(s6, z', @y, @ys) :|: s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insert(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 1 }→ insertD#1(z', z) :|: z' >= 0, z >= 0
insertD#1(z, z') -{ 2 }→ insertD#2(s7, z', @y, @ys) :|: s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insertD(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(z) :|: z >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 12 }→ insertionsort(1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))) :|: s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 12 }→ insertionsortD(1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))) :|: s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {#less}, {insertD#2,insertD#1,insertD}, {insert#2,insert,insert#1}, {testList}, {insertionsortD#1}, {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]

(35) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed SIZE bound using CoFloCo for: #less
after applying outer abstraction to obtain an ITS,
resulting in: O(1) with polynomial bound: 2

(36) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 1 }→ insert#1(z', z) :|: z' >= 0, z >= 0
insert#1(z, z') -{ 2 }→ insert#2(s6, z', @y, @ys) :|: s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insert(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 1 }→ insertD#1(z', z) :|: z' >= 0, z >= 0
insertD#1(z, z') -{ 2 }→ insertD#2(s7, z', @y, @ys) :|: s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insertD(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(z) :|: z >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 12 }→ insertionsort(1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))) :|: s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 12 }→ insertionsortD(1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))) :|: s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {#less}, {insertD#2,insertD#1,insertD}, {insert#2,insert,insert#1}, {testList}, {insertionsortD#1}, {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: ?, size: O(1) [2]

(37) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed RUNTIME bound using CoFloCo for: #less
after applying outer abstraction to obtain an ITS,
resulting in: O(1) with polynomial bound: 1

(38) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 1 }→ insert#1(z', z) :|: z' >= 0, z >= 0
insert#1(z, z') -{ 2 }→ insert#2(s6, z', @y, @ys) :|: s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insert(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 1 }→ insertD#1(z', z) :|: z' >= 0, z >= 0
insertD#1(z, z') -{ 2 }→ insertD#2(s7, z', @y, @ys) :|: s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insertD(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(z) :|: z >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 12 }→ insertionsort(1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))) :|: s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 12 }→ insertionsortD(1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))) :|: s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {insertD#2,insertD#1,insertD}, {insert#2,insert,insert#1}, {testList}, {insertionsortD#1}, {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]

(39) ResultPropagationProof (UPPER BOUND(ID) transformation)

Applied inner abstraction using the recently inferred runtime/size bounds where possible.

(40) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 1 }→ insert#1(z', z) :|: z' >= 0, z >= 0
insert#1(z, z') -{ 2 }→ insert#2(s6, z', @y, @ys) :|: s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insert(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 1 }→ insertD#1(z', z) :|: z' >= 0, z >= 0
insertD#1(z, z') -{ 2 }→ insertD#2(s7, z', @y, @ys) :|: s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insertD(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(z) :|: z >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 12 }→ insertionsort(1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))) :|: s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 12 }→ insertionsortD(1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))) :|: s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {insertD#2,insertD#1,insertD}, {insert#2,insert,insert#1}, {testList}, {insertionsortD#1}, {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]

(41) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed SIZE bound using CoFloCo for: insertD#2
after applying outer abstraction to obtain an ITS,
resulting in: O(n1) with polynomial bound: 2 + z' + z'' + z1

Computed SIZE bound using CoFloCo for: insertD#1
after applying outer abstraction to obtain an ITS,
resulting in: O(n1) with polynomial bound: 1 + z + z'

Computed SIZE bound using CoFloCo for: insertD
after applying outer abstraction to obtain an ITS,
resulting in: O(n1) with polynomial bound: 1 + z + z'

(42) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 1 }→ insert#1(z', z) :|: z' >= 0, z >= 0
insert#1(z, z') -{ 2 }→ insert#2(s6, z', @y, @ys) :|: s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insert(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 1 }→ insertD#1(z', z) :|: z' >= 0, z >= 0
insertD#1(z, z') -{ 2 }→ insertD#2(s7, z', @y, @ys) :|: s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insertD(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(z) :|: z >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 12 }→ insertionsort(1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))) :|: s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 12 }→ insertionsortD(1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))) :|: s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {insertD#2,insertD#1,insertD}, {insert#2,insert,insert#1}, {testList}, {insertionsortD#1}, {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: ?, size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: ?, size: O(n1) [1 + z + z']
insertD: runtime: ?, size: O(n1) [1 + z + z']

(43) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed RUNTIME bound using CoFloCo for: insertD#2
after applying outer abstraction to obtain an ITS,
resulting in: O(n1) with polynomial bound: 3 + 4·z1

Computed RUNTIME bound using CoFloCo for: insertD#1
after applying outer abstraction to obtain an ITS,
resulting in: O(n1) with polynomial bound: 1 + 4·z

Computed RUNTIME bound using CoFloCo for: insertD
after applying outer abstraction to obtain an ITS,
resulting in: O(n1) with polynomial bound: 2 + 4·z'

(44) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 1 }→ insert#1(z', z) :|: z' >= 0, z >= 0
insert#1(z, z') -{ 2 }→ insert#2(s6, z', @y, @ys) :|: s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insert(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 1 }→ insertD#1(z', z) :|: z' >= 0, z >= 0
insertD#1(z, z') -{ 2 }→ insertD#2(s7, z', @y, @ys) :|: s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insertD(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(z) :|: z >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 12 }→ insertionsort(1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))) :|: s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 12 }→ insertionsortD(1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))) :|: s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {insert#2,insert,insert#1}, {testList}, {insertionsortD#1}, {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
insertD: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']

(45) ResultPropagationProof (UPPER BOUND(ID) transformation)

Applied inner abstraction using the recently inferred runtime/size bounds where possible.

(46) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 1 }→ insert#1(z', z) :|: z' >= 0, z >= 0
insert#1(z, z') -{ 2 }→ insert#2(s6, z', @y, @ys) :|: s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insert(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 2 + 4·z' }→ s38 :|: s38 >= 0, s38 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insertD#1(z, z') -{ 5 + 4·@ys }→ s40 :|: s40 >= 0, s40 <= 1 * z' + 1 * @y + 1 * @ys + 2, s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s39 :|: s39 >= 0, s39 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(z) :|: z >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 12 }→ insertionsort(1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))) :|: s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 12 }→ insertionsortD(1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))) :|: s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {insert#2,insert,insert#1}, {testList}, {insertionsortD#1}, {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
insertD: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']

(47) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed SIZE bound using CoFloCo for: insert#2
after applying outer abstraction to obtain an ITS,
resulting in: O(n1) with polynomial bound: 2 + z' + z'' + z1

Computed SIZE bound using CoFloCo for: insert
after applying outer abstraction to obtain an ITS,
resulting in: O(n1) with polynomial bound: 1 + z + z'

Computed SIZE bound using CoFloCo for: insert#1
after applying outer abstraction to obtain an ITS,
resulting in: O(n1) with polynomial bound: 1 + z + z'

(48) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 1 }→ insert#1(z', z) :|: z' >= 0, z >= 0
insert#1(z, z') -{ 2 }→ insert#2(s6, z', @y, @ys) :|: s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insert(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 2 + 4·z' }→ s38 :|: s38 >= 0, s38 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insertD#1(z, z') -{ 5 + 4·@ys }→ s40 :|: s40 >= 0, s40 <= 1 * z' + 1 * @y + 1 * @ys + 2, s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s39 :|: s39 >= 0, s39 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(z) :|: z >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 12 }→ insertionsort(1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))) :|: s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 12 }→ insertionsortD(1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))) :|: s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {insert#2,insert,insert#1}, {testList}, {insertionsortD#1}, {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
insertD: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#2: runtime: ?, size: O(n1) [2 + z' + z'' + z1]
insert: runtime: ?, size: O(n1) [1 + z + z']
insert#1: runtime: ?, size: O(n1) [1 + z + z']

(49) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed RUNTIME bound using CoFloCo for: insert#2
after applying outer abstraction to obtain an ITS,
resulting in: O(n1) with polynomial bound: 3 + 4·z1

Computed RUNTIME bound using CoFloCo for: insert
after applying outer abstraction to obtain an ITS,
resulting in: O(n1) with polynomial bound: 2 + 4·z'

Computed RUNTIME bound using CoFloCo for: insert#1
after applying outer abstraction to obtain an ITS,
resulting in: O(n1) with polynomial bound: 1 + 4·z

(50) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 1 }→ insert#1(z', z) :|: z' >= 0, z >= 0
insert#1(z, z') -{ 2 }→ insert#2(s6, z', @y, @ys) :|: s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z'' + insert(z', z1) :|: z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 2 + 4·z' }→ s38 :|: s38 >= 0, s38 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insertD#1(z, z') -{ 5 + 4·@ys }→ s40 :|: s40 >= 0, s40 <= 1 * z' + 1 * @y + 1 * @ys + 2, s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s39 :|: s39 >= 0, s39 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(z) :|: z >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 12 }→ insertionsort(1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))) :|: s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 12 }→ insertionsortD(1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))) :|: s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {testList}, {insertionsortD#1}, {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
insertD: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insert: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']

(51) ResultPropagationProof (UPPER BOUND(ID) transformation)

Applied inner abstraction using the recently inferred runtime/size bounds where possible.

(52) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 2 + 4·z' }→ s41 :|: s41 >= 0, s41 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insert#1(z, z') -{ 5 + 4·@ys }→ s43 :|: s43 >= 0, s43 <= 1 * z' + 1 * @y + 1 * @ys + 2, s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s42 :|: s42 >= 0, s42 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 2 + 4·z' }→ s38 :|: s38 >= 0, s38 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insertD#1(z, z') -{ 5 + 4·@ys }→ s40 :|: s40 >= 0, s40 <= 1 * z' + 1 * @y + 1 * @ys + 2, s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s39 :|: s39 >= 0, s39 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(z) :|: z >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 12 }→ insertionsort(1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))) :|: s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 12 }→ insertionsortD(1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))) :|: s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {testList}, {insertionsortD#1}, {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
insertD: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insert: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']

(53) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed SIZE bound using CoFloCo for: testList
after applying outer abstraction to obtain an ITS,
resulting in: O(1) with polynomial bound: 74

(54) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 2 + 4·z' }→ s41 :|: s41 >= 0, s41 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insert#1(z, z') -{ 5 + 4·@ys }→ s43 :|: s43 >= 0, s43 <= 1 * z' + 1 * @y + 1 * @ys + 2, s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s42 :|: s42 >= 0, s42 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 2 + 4·z' }→ s38 :|: s38 >= 0, s38 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insertD#1(z, z') -{ 5 + 4·@ys }→ s40 :|: s40 >= 0, s40 <= 1 * z' + 1 * @y + 1 * @ys + 2, s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s39 :|: s39 >= 0, s39 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(z) :|: z >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 12 }→ insertionsort(1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))) :|: s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 12 }→ insertionsortD(1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))) :|: s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {testList}, {insertionsortD#1}, {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
insertD: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insert: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
testList: runtime: ?, size: O(1) [74]

(55) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed RUNTIME bound using CoFloCo for: testList
after applying outer abstraction to obtain an ITS,
resulting in: O(1) with polynomial bound: 11

(56) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 2 + 4·z' }→ s41 :|: s41 >= 0, s41 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insert#1(z, z') -{ 5 + 4·@ys }→ s43 :|: s43 >= 0, s43 <= 1 * z' + 1 * @y + 1 * @ys + 2, s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s42 :|: s42 >= 0, s42 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 2 + 4·z' }→ s38 :|: s38 >= 0, s38 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insertD#1(z, z') -{ 5 + 4·@ys }→ s40 :|: s40 >= 0, s40 <= 1 * z' + 1 * @y + 1 * @ys + 2, s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s39 :|: s39 >= 0, s39 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(z) :|: z >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 12 }→ insertionsort(1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))) :|: s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 12 }→ insertionsortD(1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))) :|: s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {insertionsortD#1}, {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
insertD: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insert: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
testList: runtime: O(1) [11], size: O(1) [74]

(57) ResultPropagationProof (UPPER BOUND(ID) transformation)

Applied inner abstraction using the recently inferred runtime/size bounds where possible.

(58) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 2 + 4·z' }→ s41 :|: s41 >= 0, s41 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insert#1(z, z') -{ 5 + 4·@ys }→ s43 :|: s43 >= 0, s43 <= 1 * z' + 1 * @y + 1 * @ys + 2, s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s42 :|: s42 >= 0, s42 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 2 + 4·z' }→ s38 :|: s38 >= 0, s38 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insertD#1(z, z') -{ 5 + 4·@ys }→ s40 :|: s40 >= 0, s40 <= 1 * z' + 1 * @y + 1 * @ys + 2, s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s39 :|: s39 >= 0, s39 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(z) :|: z >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 12 }→ insertionsort(1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))) :|: s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 12 }→ insertionsortD(1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))) :|: s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {insertionsortD#1}, {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
insertD: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insert: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
testList: runtime: O(1) [11], size: O(1) [74]

(59) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed SIZE bound using CoFloCo for: insertionsortD#1
after applying outer abstraction to obtain an ITS,
resulting in: O(n1) with polynomial bound: z

(60) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 2 + 4·z' }→ s41 :|: s41 >= 0, s41 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insert#1(z, z') -{ 5 + 4·@ys }→ s43 :|: s43 >= 0, s43 <= 1 * z' + 1 * @y + 1 * @ys + 2, s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s42 :|: s42 >= 0, s42 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 2 + 4·z' }→ s38 :|: s38 >= 0, s38 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insertD#1(z, z') -{ 5 + 4·@ys }→ s40 :|: s40 >= 0, s40 <= 1 * z' + 1 * @y + 1 * @ys + 2, s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s39 :|: s39 >= 0, s39 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(z) :|: z >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 12 }→ insertionsort(1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))) :|: s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 12 }→ insertionsortD(1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))) :|: s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {insertionsortD#1}, {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
insertD: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insert: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
testList: runtime: O(1) [11], size: O(1) [74]
insertionsortD#1: runtime: ?, size: O(n1) [z]

(61) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed RUNTIME bound using CoFloCo for: insertionsortD#1
after applying outer abstraction to obtain an ITS,
resulting in: O(n2) with polynomial bound: 1 + 4·z2

(62) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 2 + 4·z' }→ s41 :|: s41 >= 0, s41 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insert#1(z, z') -{ 5 + 4·@ys }→ s43 :|: s43 >= 0, s43 <= 1 * z' + 1 * @y + 1 * @ys + 2, s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s42 :|: s42 >= 0, s42 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 2 + 4·z' }→ s38 :|: s38 >= 0, s38 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insertD#1(z, z') -{ 5 + 4·@ys }→ s40 :|: s40 >= 0, s40 <= 1 * z' + 1 * @y + 1 * @ys + 2, s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s39 :|: s39 >= 0, s39 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 1 }→ insertionsortD#1(z) :|: z >= 0
insertionsortD#1(z) -{ 2 }→ insertD(@x, insertionsortD#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 12 }→ insertionsort(1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))) :|: s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 12 }→ insertionsortD(1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))) :|: s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
insertD: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insert: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
testList: runtime: O(1) [11], size: O(1) [74]
insertionsortD#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]

(63) ResultPropagationProof (UPPER BOUND(ID) transformation)

Applied inner abstraction using the recently inferred runtime/size bounds where possible.

(64) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 2 + 4·z' }→ s41 :|: s41 >= 0, s41 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insert#1(z, z') -{ 5 + 4·@ys }→ s43 :|: s43 >= 0, s43 <= 1 * z' + 1 * @y + 1 * @ys + 2, s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s42 :|: s42 >= 0, s42 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 2 + 4·z' }→ s38 :|: s38 >= 0, s38 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insertD#1(z, z') -{ 5 + 4·@ys }→ s40 :|: s40 >= 0, s40 <= 1 * z' + 1 * @y + 1 * @ys + 2, s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s39 :|: s39 >= 0, s39 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 2 + 4·z2 }→ s44 :|: s44 >= 0, s44 <= 1 * z, z >= 0
insertionsortD#1(z) -{ 5 + 4·@xs2 + 4·s45 }→ s46 :|: s45 >= 0, s45 <= 1 * @xs, s46 >= 0, s46 <= 1 * @x + 1 * s45 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 12 }→ insertionsort(1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))) :|: s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 12 }→ insertionsortD(1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))) :|: s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
insertD: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insert: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
testList: runtime: O(1) [11], size: O(1) [74]
insertionsortD#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]

(65) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed SIZE bound using CoFloCo for: insertionsort#1
after applying outer abstraction to obtain an ITS,
resulting in: O(n1) with polynomial bound: z

(66) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 2 + 4·z' }→ s41 :|: s41 >= 0, s41 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insert#1(z, z') -{ 5 + 4·@ys }→ s43 :|: s43 >= 0, s43 <= 1 * z' + 1 * @y + 1 * @ys + 2, s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s42 :|: s42 >= 0, s42 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 2 + 4·z' }→ s38 :|: s38 >= 0, s38 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insertD#1(z, z') -{ 5 + 4·@ys }→ s40 :|: s40 >= 0, s40 <= 1 * z' + 1 * @y + 1 * @ys + 2, s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s39 :|: s39 >= 0, s39 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 2 + 4·z2 }→ s44 :|: s44 >= 0, s44 <= 1 * z, z >= 0
insertionsortD#1(z) -{ 5 + 4·@xs2 + 4·s45 }→ s46 :|: s45 >= 0, s45 <= 1 * @xs, s46 >= 0, s46 <= 1 * @x + 1 * s45 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 12 }→ insertionsort(1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))) :|: s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 12 }→ insertionsortD(1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))) :|: s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {insertionsort#1}, {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
insertD: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insert: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
testList: runtime: O(1) [11], size: O(1) [74]
insertionsortD#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]
insertionsort#1: runtime: ?, size: O(n1) [z]

(67) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed RUNTIME bound using CoFloCo for: insertionsort#1
after applying outer abstraction to obtain an ITS,
resulting in: O(n2) with polynomial bound: 1 + 4·z2

(68) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 2 + 4·z' }→ s41 :|: s41 >= 0, s41 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insert#1(z, z') -{ 5 + 4·@ys }→ s43 :|: s43 >= 0, s43 <= 1 * z' + 1 * @y + 1 * @ys + 2, s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s42 :|: s42 >= 0, s42 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 2 + 4·z' }→ s38 :|: s38 >= 0, s38 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insertD#1(z, z') -{ 5 + 4·@ys }→ s40 :|: s40 >= 0, s40 <= 1 * z' + 1 * @y + 1 * @ys + 2, s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s39 :|: s39 >= 0, s39 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 1 }→ insertionsort#1(z) :|: z >= 0
insertionsort#1(z) -{ 2 }→ insert(@x, insertionsort#1(@xs)) :|: @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 2 + 4·z2 }→ s44 :|: s44 >= 0, s44 <= 1 * z, z >= 0
insertionsortD#1(z) -{ 5 + 4·@xs2 + 4·s45 }→ s46 :|: s45 >= 0, s45 <= 1 * @xs, s46 >= 0, s46 <= 1 * @x + 1 * s45 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 12 }→ insertionsort(1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))) :|: s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 12 }→ insertionsortD(1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))) :|: s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
insertD: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insert: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
testList: runtime: O(1) [11], size: O(1) [74]
insertionsortD#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]
insertionsort#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]

(69) ResultPropagationProof (UPPER BOUND(ID) transformation)

Applied inner abstraction using the recently inferred runtime/size bounds where possible.

(70) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 2 + 4·z' }→ s41 :|: s41 >= 0, s41 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insert#1(z, z') -{ 5 + 4·@ys }→ s43 :|: s43 >= 0, s43 <= 1 * z' + 1 * @y + 1 * @ys + 2, s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s42 :|: s42 >= 0, s42 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 2 + 4·z' }→ s38 :|: s38 >= 0, s38 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insertD#1(z, z') -{ 5 + 4·@ys }→ s40 :|: s40 >= 0, s40 <= 1 * z' + 1 * @y + 1 * @ys + 2, s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s39 :|: s39 >= 0, s39 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 2 + 4·z2 }→ s47 :|: s47 >= 0, s47 <= 1 * z, z >= 0
insertionsort#1(z) -{ 5 + 4·@xs2 + 4·s48 }→ s49 :|: s48 >= 0, s48 <= 1 * @xs, s49 >= 0, s49 <= 1 * @x + 1 * s48 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 2 + 4·z2 }→ s44 :|: s44 >= 0, s44 <= 1 * z, z >= 0
insertionsortD#1(z) -{ 5 + 4·@xs2 + 4·s45 }→ s46 :|: s45 >= 0, s45 <= 1 * @xs, s46 >= 0, s46 <= 1 * @x + 1 * s45 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 12 }→ insertionsort(1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))) :|: s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 12 }→ insertionsortD(1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))) :|: s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
insertD: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insert: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
testList: runtime: O(1) [11], size: O(1) [74]
insertionsortD#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]
insertionsort#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]

(71) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed SIZE bound using CoFloCo for: insertionsortD
after applying outer abstraction to obtain an ITS,
resulting in: O(n1) with polynomial bound: z

(72) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 2 + 4·z' }→ s41 :|: s41 >= 0, s41 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insert#1(z, z') -{ 5 + 4·@ys }→ s43 :|: s43 >= 0, s43 <= 1 * z' + 1 * @y + 1 * @ys + 2, s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s42 :|: s42 >= 0, s42 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 2 + 4·z' }→ s38 :|: s38 >= 0, s38 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insertD#1(z, z') -{ 5 + 4·@ys }→ s40 :|: s40 >= 0, s40 <= 1 * z' + 1 * @y + 1 * @ys + 2, s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s39 :|: s39 >= 0, s39 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 2 + 4·z2 }→ s47 :|: s47 >= 0, s47 <= 1 * z, z >= 0
insertionsort#1(z) -{ 5 + 4·@xs2 + 4·s48 }→ s49 :|: s48 >= 0, s48 <= 1 * @xs, s49 >= 0, s49 <= 1 * @x + 1 * s48 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 2 + 4·z2 }→ s44 :|: s44 >= 0, s44 <= 1 * z, z >= 0
insertionsortD#1(z) -{ 5 + 4·@xs2 + 4·s45 }→ s46 :|: s45 >= 0, s45 <= 1 * @xs, s46 >= 0, s46 <= 1 * @x + 1 * s45 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 12 }→ insertionsort(1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))) :|: s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 12 }→ insertionsortD(1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))) :|: s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {insertionsortD}, {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
insertD: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insert: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
testList: runtime: O(1) [11], size: O(1) [74]
insertionsortD#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]
insertionsort#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]
insertionsortD: runtime: ?, size: O(n1) [z]

(73) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed RUNTIME bound using KoAT for: insertionsortD
after applying outer abstraction to obtain an ITS,
resulting in: O(n2) with polynomial bound: 2 + 4·z2

(74) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 2 + 4·z' }→ s41 :|: s41 >= 0, s41 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insert#1(z, z') -{ 5 + 4·@ys }→ s43 :|: s43 >= 0, s43 <= 1 * z' + 1 * @y + 1 * @ys + 2, s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s42 :|: s42 >= 0, s42 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 2 + 4·z' }→ s38 :|: s38 >= 0, s38 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insertD#1(z, z') -{ 5 + 4·@ys }→ s40 :|: s40 >= 0, s40 <= 1 * z' + 1 * @y + 1 * @ys + 2, s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s39 :|: s39 >= 0, s39 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 2 + 4·z2 }→ s47 :|: s47 >= 0, s47 <= 1 * z, z >= 0
insertionsort#1(z) -{ 5 + 4·@xs2 + 4·s48 }→ s49 :|: s48 >= 0, s48 <= 1 * @xs, s49 >= 0, s49 <= 1 * @x + 1 * s48 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 2 + 4·z2 }→ s44 :|: s44 >= 0, s44 <= 1 * z, z >= 0
insertionsortD#1(z) -{ 5 + 4·@xs2 + 4·s45 }→ s46 :|: s45 >= 0, s45 <= 1 * @xs, s46 >= 0, s46 <= 1 * @x + 1 * s45 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 12 }→ insertionsort(1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))) :|: s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 12 }→ insertionsortD(1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))) :|: s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
insertD: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insert: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
testList: runtime: O(1) [11], size: O(1) [74]
insertionsortD#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]
insertionsort#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]
insertionsortD: runtime: O(n2) [2 + 4·z2], size: O(n1) [z]

(75) ResultPropagationProof (UPPER BOUND(ID) transformation)

Applied inner abstraction using the recently inferred runtime/size bounds where possible.

(76) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 2 + 4·z' }→ s41 :|: s41 >= 0, s41 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insert#1(z, z') -{ 5 + 4·@ys }→ s43 :|: s43 >= 0, s43 <= 1 * z' + 1 * @y + 1 * @ys + 2, s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s42 :|: s42 >= 0, s42 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 2 + 4·z' }→ s38 :|: s38 >= 0, s38 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insertD#1(z, z') -{ 5 + 4·@ys }→ s40 :|: s40 >= 0, s40 <= 1 * z' + 1 * @y + 1 * @ys + 2, s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s39 :|: s39 >= 0, s39 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 2 + 4·z2 }→ s47 :|: s47 >= 0, s47 <= 1 * z, z >= 0
insertionsort#1(z) -{ 5 + 4·@xs2 + 4·s48 }→ s49 :|: s48 >= 0, s48 <= 1 * @xs, s49 >= 0, s49 <= 1 * @x + 1 * s48 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 2 + 4·z2 }→ s44 :|: s44 >= 0, s44 <= 1 * z, z >= 0
insertionsortD#1(z) -{ 5 + 4·@xs2 + 4·s45 }→ s46 :|: s45 >= 0, s45 <= 1 * @xs, s46 >= 0, s46 <= 1 * @x + 1 * s45 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 12 }→ insertionsort(1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))) :|: s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 414 + 80·s18 + 8·s18·s19 + 8·s18·s20 + 8·s18·s21 + 8·s18·s22 + 8·s18·s23 + 8·s18·s24 + 8·s18·s25 + 8·s18·s26 + 8·s18·s27 + 4·s182 + 80·s19 + 8·s19·s20 + 8·s19·s21 + 8·s19·s22 + 8·s19·s23 + 8·s19·s24 + 8·s19·s25 + 8·s19·s26 + 8·s19·s27 + 4·s192 + 80·s20 + 8·s20·s21 + 8·s20·s22 + 8·s20·s23 + 8·s20·s24 + 8·s20·s25 + 8·s20·s26 + 8·s20·s27 + 4·s202 + 80·s21 + 8·s21·s22 + 8·s21·s23 + 8·s21·s24 + 8·s21·s25 + 8·s21·s26 + 8·s21·s27 + 4·s212 + 80·s22 + 8·s22·s23 + 8·s22·s24 + 8·s22·s25 + 8·s22·s26 + 8·s22·s27 + 4·s222 + 80·s23 + 8·s23·s24 + 8·s23·s25 + 8·s23·s26 + 8·s23·s27 + 4·s232 + 80·s24 + 8·s24·s25 + 8·s24·s26 + 8·s24·s27 + 4·s242 + 80·s25 + 8·s25·s26 + 8·s25·s27 + 4·s252 + 80·s26 + 8·s26·s27 + 4·s262 + 80·s27 + 4·s272 }→ s50 :|: s50 >= 0, s50 <= 1 * (1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))), s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
insertD: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insert: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
testList: runtime: O(1) [11], size: O(1) [74]
insertionsortD#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]
insertionsort#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]
insertionsortD: runtime: O(n2) [2 + 4·z2], size: O(n1) [z]

(77) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed SIZE bound using CoFloCo for: insertionsort
after applying outer abstraction to obtain an ITS,
resulting in: O(n1) with polynomial bound: z

(78) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 2 + 4·z' }→ s41 :|: s41 >= 0, s41 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insert#1(z, z') -{ 5 + 4·@ys }→ s43 :|: s43 >= 0, s43 <= 1 * z' + 1 * @y + 1 * @ys + 2, s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s42 :|: s42 >= 0, s42 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 2 + 4·z' }→ s38 :|: s38 >= 0, s38 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insertD#1(z, z') -{ 5 + 4·@ys }→ s40 :|: s40 >= 0, s40 <= 1 * z' + 1 * @y + 1 * @ys + 2, s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s39 :|: s39 >= 0, s39 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 2 + 4·z2 }→ s47 :|: s47 >= 0, s47 <= 1 * z, z >= 0
insertionsort#1(z) -{ 5 + 4·@xs2 + 4·s48 }→ s49 :|: s48 >= 0, s48 <= 1 * @xs, s49 >= 0, s49 <= 1 * @x + 1 * s48 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 2 + 4·z2 }→ s44 :|: s44 >= 0, s44 <= 1 * z, z >= 0
insertionsortD#1(z) -{ 5 + 4·@xs2 + 4·s45 }→ s46 :|: s45 >= 0, s45 <= 1 * @xs, s46 >= 0, s46 <= 1 * @x + 1 * s45 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 12 }→ insertionsort(1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))) :|: s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 414 + 80·s18 + 8·s18·s19 + 8·s18·s20 + 8·s18·s21 + 8·s18·s22 + 8·s18·s23 + 8·s18·s24 + 8·s18·s25 + 8·s18·s26 + 8·s18·s27 + 4·s182 + 80·s19 + 8·s19·s20 + 8·s19·s21 + 8·s19·s22 + 8·s19·s23 + 8·s19·s24 + 8·s19·s25 + 8·s19·s26 + 8·s19·s27 + 4·s192 + 80·s20 + 8·s20·s21 + 8·s20·s22 + 8·s20·s23 + 8·s20·s24 + 8·s20·s25 + 8·s20·s26 + 8·s20·s27 + 4·s202 + 80·s21 + 8·s21·s22 + 8·s21·s23 + 8·s21·s24 + 8·s21·s25 + 8·s21·s26 + 8·s21·s27 + 4·s212 + 80·s22 + 8·s22·s23 + 8·s22·s24 + 8·s22·s25 + 8·s22·s26 + 8·s22·s27 + 4·s222 + 80·s23 + 8·s23·s24 + 8·s23·s25 + 8·s23·s26 + 8·s23·s27 + 4·s232 + 80·s24 + 8·s24·s25 + 8·s24·s26 + 8·s24·s27 + 4·s242 + 80·s25 + 8·s25·s26 + 8·s25·s27 + 4·s252 + 80·s26 + 8·s26·s27 + 4·s262 + 80·s27 + 4·s272 }→ s50 :|: s50 >= 0, s50 <= 1 * (1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))), s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {insertionsort}, {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
insertD: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insert: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
testList: runtime: O(1) [11], size: O(1) [74]
insertionsortD#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]
insertionsort#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]
insertionsortD: runtime: O(n2) [2 + 4·z2], size: O(n1) [z]
insertionsort: runtime: ?, size: O(n1) [z]

(79) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed RUNTIME bound using KoAT for: insertionsort
after applying outer abstraction to obtain an ITS,
resulting in: O(n2) with polynomial bound: 2 + 4·z2

(80) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 2 + 4·z' }→ s41 :|: s41 >= 0, s41 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insert#1(z, z') -{ 5 + 4·@ys }→ s43 :|: s43 >= 0, s43 <= 1 * z' + 1 * @y + 1 * @ys + 2, s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s42 :|: s42 >= 0, s42 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 2 + 4·z' }→ s38 :|: s38 >= 0, s38 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insertD#1(z, z') -{ 5 + 4·@ys }→ s40 :|: s40 >= 0, s40 <= 1 * z' + 1 * @y + 1 * @ys + 2, s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s39 :|: s39 >= 0, s39 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 2 + 4·z2 }→ s47 :|: s47 >= 0, s47 <= 1 * z, z >= 0
insertionsort#1(z) -{ 5 + 4·@xs2 + 4·s48 }→ s49 :|: s48 >= 0, s48 <= 1 * @xs, s49 >= 0, s49 <= 1 * @x + 1 * s48 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 2 + 4·z2 }→ s44 :|: s44 >= 0, s44 <= 1 * z, z >= 0
insertionsortD#1(z) -{ 5 + 4·@xs2 + 4·s45 }→ s46 :|: s45 >= 0, s45 <= 1 * @xs, s46 >= 0, s46 <= 1 * @x + 1 * s45 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 12 }→ insertionsort(1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))) :|: s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 414 + 80·s18 + 8·s18·s19 + 8·s18·s20 + 8·s18·s21 + 8·s18·s22 + 8·s18·s23 + 8·s18·s24 + 8·s18·s25 + 8·s18·s26 + 8·s18·s27 + 4·s182 + 80·s19 + 8·s19·s20 + 8·s19·s21 + 8·s19·s22 + 8·s19·s23 + 8·s19·s24 + 8·s19·s25 + 8·s19·s26 + 8·s19·s27 + 4·s192 + 80·s20 + 8·s20·s21 + 8·s20·s22 + 8·s20·s23 + 8·s20·s24 + 8·s20·s25 + 8·s20·s26 + 8·s20·s27 + 4·s202 + 80·s21 + 8·s21·s22 + 8·s21·s23 + 8·s21·s24 + 8·s21·s25 + 8·s21·s26 + 8·s21·s27 + 4·s212 + 80·s22 + 8·s22·s23 + 8·s22·s24 + 8·s22·s25 + 8·s22·s26 + 8·s22·s27 + 4·s222 + 80·s23 + 8·s23·s24 + 8·s23·s25 + 8·s23·s26 + 8·s23·s27 + 4·s232 + 80·s24 + 8·s24·s25 + 8·s24·s26 + 8·s24·s27 + 4·s242 + 80·s25 + 8·s25·s26 + 8·s25·s27 + 4·s252 + 80·s26 + 8·s26·s27 + 4·s262 + 80·s27 + 4·s272 }→ s50 :|: s50 >= 0, s50 <= 1 * (1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))), s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
insertD: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insert: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
testList: runtime: O(1) [11], size: O(1) [74]
insertionsortD#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]
insertionsort#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]
insertionsortD: runtime: O(n2) [2 + 4·z2], size: O(n1) [z]
insertionsort: runtime: O(n2) [2 + 4·z2], size: O(n1) [z]

(81) ResultPropagationProof (UPPER BOUND(ID) transformation)

Applied inner abstraction using the recently inferred runtime/size bounds where possible.

(82) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 2 + 4·z' }→ s41 :|: s41 >= 0, s41 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insert#1(z, z') -{ 5 + 4·@ys }→ s43 :|: s43 >= 0, s43 <= 1 * z' + 1 * @y + 1 * @ys + 2, s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s42 :|: s42 >= 0, s42 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 2 + 4·z' }→ s38 :|: s38 >= 0, s38 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insertD#1(z, z') -{ 5 + 4·@ys }→ s40 :|: s40 >= 0, s40 <= 1 * z' + 1 * @y + 1 * @ys + 2, s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s39 :|: s39 >= 0, s39 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 2 + 4·z2 }→ s47 :|: s47 >= 0, s47 <= 1 * z, z >= 0
insertionsort#1(z) -{ 5 + 4·@xs2 + 4·s48 }→ s49 :|: s48 >= 0, s48 <= 1 * @xs, s49 >= 0, s49 <= 1 * @x + 1 * s48 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 2 + 4·z2 }→ s44 :|: s44 >= 0, s44 <= 1 * z, z >= 0
insertionsortD#1(z) -{ 5 + 4·@xs2 + 4·s45 }→ s46 :|: s45 >= 0, s45 <= 1 * @xs, s46 >= 0, s46 <= 1 * @x + 1 * s45 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 414 + 80·s10 + 8·s10·s11 + 8·s10·s12 + 8·s10·s13 + 8·s10·s14 + 8·s10·s15 + 8·s10·s16 + 8·s10·s17 + 8·s10·s8 + 8·s10·s9 + 4·s102 + 80·s11 + 8·s11·s12 + 8·s11·s13 + 8·s11·s14 + 8·s11·s15 + 8·s11·s16 + 8·s11·s17 + 8·s11·s8 + 8·s11·s9 + 4·s112 + 80·s12 + 8·s12·s13 + 8·s12·s14 + 8·s12·s15 + 8·s12·s16 + 8·s12·s17 + 8·s12·s8 + 8·s12·s9 + 4·s122 + 80·s13 + 8·s13·s14 + 8·s13·s15 + 8·s13·s16 + 8·s13·s17 + 8·s13·s8 + 8·s13·s9 + 4·s132 + 80·s14 + 8·s14·s15 + 8·s14·s16 + 8·s14·s17 + 8·s14·s8 + 8·s14·s9 + 4·s142 + 80·s15 + 8·s15·s16 + 8·s15·s17 + 8·s15·s8 + 8·s15·s9 + 4·s152 + 80·s16 + 8·s16·s17 + 8·s16·s8 + 8·s16·s9 + 4·s162 + 80·s17 + 8·s17·s8 + 8·s17·s9 + 4·s172 + 80·s8 + 8·s8·s9 + 4·s82 + 80·s9 + 4·s92 }→ s51 :|: s51 >= 0, s51 <= 1 * (1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))), s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 414 + 80·s18 + 8·s18·s19 + 8·s18·s20 + 8·s18·s21 + 8·s18·s22 + 8·s18·s23 + 8·s18·s24 + 8·s18·s25 + 8·s18·s26 + 8·s18·s27 + 4·s182 + 80·s19 + 8·s19·s20 + 8·s19·s21 + 8·s19·s22 + 8·s19·s23 + 8·s19·s24 + 8·s19·s25 + 8·s19·s26 + 8·s19·s27 + 4·s192 + 80·s20 + 8·s20·s21 + 8·s20·s22 + 8·s20·s23 + 8·s20·s24 + 8·s20·s25 + 8·s20·s26 + 8·s20·s27 + 4·s202 + 80·s21 + 8·s21·s22 + 8·s21·s23 + 8·s21·s24 + 8·s21·s25 + 8·s21·s26 + 8·s21·s27 + 4·s212 + 80·s22 + 8·s22·s23 + 8·s22·s24 + 8·s22·s25 + 8·s22·s26 + 8·s22·s27 + 4·s222 + 80·s23 + 8·s23·s24 + 8·s23·s25 + 8·s23·s26 + 8·s23·s27 + 4·s232 + 80·s24 + 8·s24·s25 + 8·s24·s26 + 8·s24·s27 + 4·s242 + 80·s25 + 8·s25·s26 + 8·s25·s27 + 4·s252 + 80·s26 + 8·s26·s27 + 4·s262 + 80·s27 + 4·s272 }→ s50 :|: s50 >= 0, s50 <= 1 * (1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))), s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
insertD: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insert: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
testList: runtime: O(1) [11], size: O(1) [74]
insertionsortD#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]
insertionsort#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]
insertionsortD: runtime: O(n2) [2 + 4·z2], size: O(n1) [z]
insertionsort: runtime: O(n2) [2 + 4·z2], size: O(n1) [z]

(83) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed SIZE bound using CoFloCo for: testInsertionsortD
after applying outer abstraction to obtain an ITS,
resulting in: O(1) with polynomial bound: 74

(84) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 2 + 4·z' }→ s41 :|: s41 >= 0, s41 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insert#1(z, z') -{ 5 + 4·@ys }→ s43 :|: s43 >= 0, s43 <= 1 * z' + 1 * @y + 1 * @ys + 2, s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s42 :|: s42 >= 0, s42 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 2 + 4·z' }→ s38 :|: s38 >= 0, s38 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insertD#1(z, z') -{ 5 + 4·@ys }→ s40 :|: s40 >= 0, s40 <= 1 * z' + 1 * @y + 1 * @ys + 2, s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s39 :|: s39 >= 0, s39 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 2 + 4·z2 }→ s47 :|: s47 >= 0, s47 <= 1 * z, z >= 0
insertionsort#1(z) -{ 5 + 4·@xs2 + 4·s48 }→ s49 :|: s48 >= 0, s48 <= 1 * @xs, s49 >= 0, s49 <= 1 * @x + 1 * s48 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 2 + 4·z2 }→ s44 :|: s44 >= 0, s44 <= 1 * z, z >= 0
insertionsortD#1(z) -{ 5 + 4·@xs2 + 4·s45 }→ s46 :|: s45 >= 0, s45 <= 1 * @xs, s46 >= 0, s46 <= 1 * @x + 1 * s45 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 414 + 80·s10 + 8·s10·s11 + 8·s10·s12 + 8·s10·s13 + 8·s10·s14 + 8·s10·s15 + 8·s10·s16 + 8·s10·s17 + 8·s10·s8 + 8·s10·s9 + 4·s102 + 80·s11 + 8·s11·s12 + 8·s11·s13 + 8·s11·s14 + 8·s11·s15 + 8·s11·s16 + 8·s11·s17 + 8·s11·s8 + 8·s11·s9 + 4·s112 + 80·s12 + 8·s12·s13 + 8·s12·s14 + 8·s12·s15 + 8·s12·s16 + 8·s12·s17 + 8·s12·s8 + 8·s12·s9 + 4·s122 + 80·s13 + 8·s13·s14 + 8·s13·s15 + 8·s13·s16 + 8·s13·s17 + 8·s13·s8 + 8·s13·s9 + 4·s132 + 80·s14 + 8·s14·s15 + 8·s14·s16 + 8·s14·s17 + 8·s14·s8 + 8·s14·s9 + 4·s142 + 80·s15 + 8·s15·s16 + 8·s15·s17 + 8·s15·s8 + 8·s15·s9 + 4·s152 + 80·s16 + 8·s16·s17 + 8·s16·s8 + 8·s16·s9 + 4·s162 + 80·s17 + 8·s17·s8 + 8·s17·s9 + 4·s172 + 80·s8 + 8·s8·s9 + 4·s82 + 80·s9 + 4·s92 }→ s51 :|: s51 >= 0, s51 <= 1 * (1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))), s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 414 + 80·s18 + 8·s18·s19 + 8·s18·s20 + 8·s18·s21 + 8·s18·s22 + 8·s18·s23 + 8·s18·s24 + 8·s18·s25 + 8·s18·s26 + 8·s18·s27 + 4·s182 + 80·s19 + 8·s19·s20 + 8·s19·s21 + 8·s19·s22 + 8·s19·s23 + 8·s19·s24 + 8·s19·s25 + 8·s19·s26 + 8·s19·s27 + 4·s192 + 80·s20 + 8·s20·s21 + 8·s20·s22 + 8·s20·s23 + 8·s20·s24 + 8·s20·s25 + 8·s20·s26 + 8·s20·s27 + 4·s202 + 80·s21 + 8·s21·s22 + 8·s21·s23 + 8·s21·s24 + 8·s21·s25 + 8·s21·s26 + 8·s21·s27 + 4·s212 + 80·s22 + 8·s22·s23 + 8·s22·s24 + 8·s22·s25 + 8·s22·s26 + 8·s22·s27 + 4·s222 + 80·s23 + 8·s23·s24 + 8·s23·s25 + 8·s23·s26 + 8·s23·s27 + 4·s232 + 80·s24 + 8·s24·s25 + 8·s24·s26 + 8·s24·s27 + 4·s242 + 80·s25 + 8·s25·s26 + 8·s25·s27 + 4·s252 + 80·s26 + 8·s26·s27 + 4·s262 + 80·s27 + 4·s272 }→ s50 :|: s50 >= 0, s50 <= 1 * (1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))), s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {testInsertionsortD}, {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
insertD: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insert: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
testList: runtime: O(1) [11], size: O(1) [74]
insertionsortD#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]
insertionsort#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]
insertionsortD: runtime: O(n2) [2 + 4·z2], size: O(n1) [z]
insertionsort: runtime: O(n2) [2 + 4·z2], size: O(n1) [z]
testInsertionsortD: runtime: ?, size: O(1) [74]

(85) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed RUNTIME bound using CoFloCo for: testInsertionsortD
after applying outer abstraction to obtain an ITS,
resulting in: O(1) with polynomial bound: 21918

(86) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 2 + 4·z' }→ s41 :|: s41 >= 0, s41 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insert#1(z, z') -{ 5 + 4·@ys }→ s43 :|: s43 >= 0, s43 <= 1 * z' + 1 * @y + 1 * @ys + 2, s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s42 :|: s42 >= 0, s42 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 2 + 4·z' }→ s38 :|: s38 >= 0, s38 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insertD#1(z, z') -{ 5 + 4·@ys }→ s40 :|: s40 >= 0, s40 <= 1 * z' + 1 * @y + 1 * @ys + 2, s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s39 :|: s39 >= 0, s39 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 2 + 4·z2 }→ s47 :|: s47 >= 0, s47 <= 1 * z, z >= 0
insertionsort#1(z) -{ 5 + 4·@xs2 + 4·s48 }→ s49 :|: s48 >= 0, s48 <= 1 * @xs, s49 >= 0, s49 <= 1 * @x + 1 * s48 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 2 + 4·z2 }→ s44 :|: s44 >= 0, s44 <= 1 * z, z >= 0
insertionsortD#1(z) -{ 5 + 4·@xs2 + 4·s45 }→ s46 :|: s45 >= 0, s45 <= 1 * @xs, s46 >= 0, s46 <= 1 * @x + 1 * s45 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 414 + 80·s10 + 8·s10·s11 + 8·s10·s12 + 8·s10·s13 + 8·s10·s14 + 8·s10·s15 + 8·s10·s16 + 8·s10·s17 + 8·s10·s8 + 8·s10·s9 + 4·s102 + 80·s11 + 8·s11·s12 + 8·s11·s13 + 8·s11·s14 + 8·s11·s15 + 8·s11·s16 + 8·s11·s17 + 8·s11·s8 + 8·s11·s9 + 4·s112 + 80·s12 + 8·s12·s13 + 8·s12·s14 + 8·s12·s15 + 8·s12·s16 + 8·s12·s17 + 8·s12·s8 + 8·s12·s9 + 4·s122 + 80·s13 + 8·s13·s14 + 8·s13·s15 + 8·s13·s16 + 8·s13·s17 + 8·s13·s8 + 8·s13·s9 + 4·s132 + 80·s14 + 8·s14·s15 + 8·s14·s16 + 8·s14·s17 + 8·s14·s8 + 8·s14·s9 + 4·s142 + 80·s15 + 8·s15·s16 + 8·s15·s17 + 8·s15·s8 + 8·s15·s9 + 4·s152 + 80·s16 + 8·s16·s17 + 8·s16·s8 + 8·s16·s9 + 4·s162 + 80·s17 + 8·s17·s8 + 8·s17·s9 + 4·s172 + 80·s8 + 8·s8·s9 + 4·s82 + 80·s9 + 4·s92 }→ s51 :|: s51 >= 0, s51 <= 1 * (1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))), s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 414 + 80·s18 + 8·s18·s19 + 8·s18·s20 + 8·s18·s21 + 8·s18·s22 + 8·s18·s23 + 8·s18·s24 + 8·s18·s25 + 8·s18·s26 + 8·s18·s27 + 4·s182 + 80·s19 + 8·s19·s20 + 8·s19·s21 + 8·s19·s22 + 8·s19·s23 + 8·s19·s24 + 8·s19·s25 + 8·s19·s26 + 8·s19·s27 + 4·s192 + 80·s20 + 8·s20·s21 + 8·s20·s22 + 8·s20·s23 + 8·s20·s24 + 8·s20·s25 + 8·s20·s26 + 8·s20·s27 + 4·s202 + 80·s21 + 8·s21·s22 + 8·s21·s23 + 8·s21·s24 + 8·s21·s25 + 8·s21·s26 + 8·s21·s27 + 4·s212 + 80·s22 + 8·s22·s23 + 8·s22·s24 + 8·s22·s25 + 8·s22·s26 + 8·s22·s27 + 4·s222 + 80·s23 + 8·s23·s24 + 8·s23·s25 + 8·s23·s26 + 8·s23·s27 + 4·s232 + 80·s24 + 8·s24·s25 + 8·s24·s26 + 8·s24·s27 + 4·s242 + 80·s25 + 8·s25·s26 + 8·s25·s27 + 4·s252 + 80·s26 + 8·s26·s27 + 4·s262 + 80·s27 + 4·s272 }→ s50 :|: s50 >= 0, s50 <= 1 * (1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))), s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
insertD: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insert: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
testList: runtime: O(1) [11], size: O(1) [74]
insertionsortD#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]
insertionsort#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]
insertionsortD: runtime: O(n2) [2 + 4·z2], size: O(n1) [z]
insertionsort: runtime: O(n2) [2 + 4·z2], size: O(n1) [z]
testInsertionsortD: runtime: O(1) [21918], size: O(1) [74]

(87) ResultPropagationProof (UPPER BOUND(ID) transformation)

Applied inner abstraction using the recently inferred runtime/size bounds where possible.

(88) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 2 + 4·z' }→ s41 :|: s41 >= 0, s41 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insert#1(z, z') -{ 5 + 4·@ys }→ s43 :|: s43 >= 0, s43 <= 1 * z' + 1 * @y + 1 * @ys + 2, s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s42 :|: s42 >= 0, s42 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 2 + 4·z' }→ s38 :|: s38 >= 0, s38 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insertD#1(z, z') -{ 5 + 4·@ys }→ s40 :|: s40 >= 0, s40 <= 1 * z' + 1 * @y + 1 * @ys + 2, s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s39 :|: s39 >= 0, s39 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 2 + 4·z2 }→ s47 :|: s47 >= 0, s47 <= 1 * z, z >= 0
insertionsort#1(z) -{ 5 + 4·@xs2 + 4·s48 }→ s49 :|: s48 >= 0, s48 <= 1 * @xs, s49 >= 0, s49 <= 1 * @x + 1 * s48 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 2 + 4·z2 }→ s44 :|: s44 >= 0, s44 <= 1 * z, z >= 0
insertionsortD#1(z) -{ 5 + 4·@xs2 + 4·s45 }→ s46 :|: s45 >= 0, s45 <= 1 * @xs, s46 >= 0, s46 <= 1 * @x + 1 * s45 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 414 + 80·s10 + 8·s10·s11 + 8·s10·s12 + 8·s10·s13 + 8·s10·s14 + 8·s10·s15 + 8·s10·s16 + 8·s10·s17 + 8·s10·s8 + 8·s10·s9 + 4·s102 + 80·s11 + 8·s11·s12 + 8·s11·s13 + 8·s11·s14 + 8·s11·s15 + 8·s11·s16 + 8·s11·s17 + 8·s11·s8 + 8·s11·s9 + 4·s112 + 80·s12 + 8·s12·s13 + 8·s12·s14 + 8·s12·s15 + 8·s12·s16 + 8·s12·s17 + 8·s12·s8 + 8·s12·s9 + 4·s122 + 80·s13 + 8·s13·s14 + 8·s13·s15 + 8·s13·s16 + 8·s13·s17 + 8·s13·s8 + 8·s13·s9 + 4·s132 + 80·s14 + 8·s14·s15 + 8·s14·s16 + 8·s14·s17 + 8·s14·s8 + 8·s14·s9 + 4·s142 + 80·s15 + 8·s15·s16 + 8·s15·s17 + 8·s15·s8 + 8·s15·s9 + 4·s152 + 80·s16 + 8·s16·s17 + 8·s16·s8 + 8·s16·s9 + 4·s162 + 80·s17 + 8·s17·s8 + 8·s17·s9 + 4·s172 + 80·s8 + 8·s8·s9 + 4·s82 + 80·s9 + 4·s92 }→ s51 :|: s51 >= 0, s51 <= 1 * (1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))), s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 414 + 80·s18 + 8·s18·s19 + 8·s18·s20 + 8·s18·s21 + 8·s18·s22 + 8·s18·s23 + 8·s18·s24 + 8·s18·s25 + 8·s18·s26 + 8·s18·s27 + 4·s182 + 80·s19 + 8·s19·s20 + 8·s19·s21 + 8·s19·s22 + 8·s19·s23 + 8·s19·s24 + 8·s19·s25 + 8·s19·s26 + 8·s19·s27 + 4·s192 + 80·s20 + 8·s20·s21 + 8·s20·s22 + 8·s20·s23 + 8·s20·s24 + 8·s20·s25 + 8·s20·s26 + 8·s20·s27 + 4·s202 + 80·s21 + 8·s21·s22 + 8·s21·s23 + 8·s21·s24 + 8·s21·s25 + 8·s21·s26 + 8·s21·s27 + 4·s212 + 80·s22 + 8·s22·s23 + 8·s22·s24 + 8·s22·s25 + 8·s22·s26 + 8·s22·s27 + 4·s222 + 80·s23 + 8·s23·s24 + 8·s23·s25 + 8·s23·s26 + 8·s23·s27 + 4·s232 + 80·s24 + 8·s24·s25 + 8·s24·s26 + 8·s24·s27 + 4·s242 + 80·s25 + 8·s25·s26 + 8·s25·s27 + 4·s252 + 80·s26 + 8·s26·s27 + 4·s262 + 80·s27 + 4·s272 }→ s50 :|: s50 >= 0, s50 <= 1 * (1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))), s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
insertD: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insert: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
testList: runtime: O(1) [11], size: O(1) [74]
insertionsortD#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]
insertionsort#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]
insertionsortD: runtime: O(n2) [2 + 4·z2], size: O(n1) [z]
insertionsort: runtime: O(n2) [2 + 4·z2], size: O(n1) [z]
testInsertionsortD: runtime: O(1) [21918], size: O(1) [74]

(89) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed SIZE bound using CoFloCo for: testInsertionsort
after applying outer abstraction to obtain an ITS,
resulting in: O(1) with polynomial bound: 74

(90) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 2 + 4·z' }→ s41 :|: s41 >= 0, s41 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insert#1(z, z') -{ 5 + 4·@ys }→ s43 :|: s43 >= 0, s43 <= 1 * z' + 1 * @y + 1 * @ys + 2, s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s42 :|: s42 >= 0, s42 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 2 + 4·z' }→ s38 :|: s38 >= 0, s38 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insertD#1(z, z') -{ 5 + 4·@ys }→ s40 :|: s40 >= 0, s40 <= 1 * z' + 1 * @y + 1 * @ys + 2, s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s39 :|: s39 >= 0, s39 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 2 + 4·z2 }→ s47 :|: s47 >= 0, s47 <= 1 * z, z >= 0
insertionsort#1(z) -{ 5 + 4·@xs2 + 4·s48 }→ s49 :|: s48 >= 0, s48 <= 1 * @xs, s49 >= 0, s49 <= 1 * @x + 1 * s48 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 2 + 4·z2 }→ s44 :|: s44 >= 0, s44 <= 1 * z, z >= 0
insertionsortD#1(z) -{ 5 + 4·@xs2 + 4·s45 }→ s46 :|: s45 >= 0, s45 <= 1 * @xs, s46 >= 0, s46 <= 1 * @x + 1 * s45 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 414 + 80·s10 + 8·s10·s11 + 8·s10·s12 + 8·s10·s13 + 8·s10·s14 + 8·s10·s15 + 8·s10·s16 + 8·s10·s17 + 8·s10·s8 + 8·s10·s9 + 4·s102 + 80·s11 + 8·s11·s12 + 8·s11·s13 + 8·s11·s14 + 8·s11·s15 + 8·s11·s16 + 8·s11·s17 + 8·s11·s8 + 8·s11·s9 + 4·s112 + 80·s12 + 8·s12·s13 + 8·s12·s14 + 8·s12·s15 + 8·s12·s16 + 8·s12·s17 + 8·s12·s8 + 8·s12·s9 + 4·s122 + 80·s13 + 8·s13·s14 + 8·s13·s15 + 8·s13·s16 + 8·s13·s17 + 8·s13·s8 + 8·s13·s9 + 4·s132 + 80·s14 + 8·s14·s15 + 8·s14·s16 + 8·s14·s17 + 8·s14·s8 + 8·s14·s9 + 4·s142 + 80·s15 + 8·s15·s16 + 8·s15·s17 + 8·s15·s8 + 8·s15·s9 + 4·s152 + 80·s16 + 8·s16·s17 + 8·s16·s8 + 8·s16·s9 + 4·s162 + 80·s17 + 8·s17·s8 + 8·s17·s9 + 4·s172 + 80·s8 + 8·s8·s9 + 4·s82 + 80·s9 + 4·s92 }→ s51 :|: s51 >= 0, s51 <= 1 * (1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))), s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 414 + 80·s18 + 8·s18·s19 + 8·s18·s20 + 8·s18·s21 + 8·s18·s22 + 8·s18·s23 + 8·s18·s24 + 8·s18·s25 + 8·s18·s26 + 8·s18·s27 + 4·s182 + 80·s19 + 8·s19·s20 + 8·s19·s21 + 8·s19·s22 + 8·s19·s23 + 8·s19·s24 + 8·s19·s25 + 8·s19·s26 + 8·s19·s27 + 4·s192 + 80·s20 + 8·s20·s21 + 8·s20·s22 + 8·s20·s23 + 8·s20·s24 + 8·s20·s25 + 8·s20·s26 + 8·s20·s27 + 4·s202 + 80·s21 + 8·s21·s22 + 8·s21·s23 + 8·s21·s24 + 8·s21·s25 + 8·s21·s26 + 8·s21·s27 + 4·s212 + 80·s22 + 8·s22·s23 + 8·s22·s24 + 8·s22·s25 + 8·s22·s26 + 8·s22·s27 + 4·s222 + 80·s23 + 8·s23·s24 + 8·s23·s25 + 8·s23·s26 + 8·s23·s27 + 4·s232 + 80·s24 + 8·s24·s25 + 8·s24·s26 + 8·s24·s27 + 4·s242 + 80·s25 + 8·s25·s26 + 8·s25·s27 + 4·s252 + 80·s26 + 8·s26·s27 + 4·s262 + 80·s27 + 4·s272 }→ s50 :|: s50 >= 0, s50 <= 1 * (1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))), s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed: {testInsertionsort}
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
insertD: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insert: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
testList: runtime: O(1) [11], size: O(1) [74]
insertionsortD#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]
insertionsort#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]
insertionsortD: runtime: O(n2) [2 + 4·z2], size: O(n1) [z]
insertionsort: runtime: O(n2) [2 + 4·z2], size: O(n1) [z]
testInsertionsortD: runtime: O(1) [21918], size: O(1) [74]
testInsertionsort: runtime: ?, size: O(1) [74]

(91) IntTrsBoundProof (UPPER BOUND(ID) transformation)


Computed RUNTIME bound using CoFloCo for: testInsertionsort
after applying outer abstraction to obtain an ITS,
resulting in: O(1) with polynomial bound: 21918

(92) Obligation:

Complexity RNTS consisting of the following rules:

#abs(z) -{ 1 }→ 0 :|: z = 0
#abs(z) -{ 1 }→ 1 + (z - 1) :|: z - 1 >= 0
#abs(z) -{ 1 }→ 1 + (1 + (z - 1)) :|: z - 1 >= 0
#cklt(z) -{ 0 }→ 2 :|: z = 3
#cklt(z) -{ 0 }→ 1 :|: z = 1
#cklt(z) -{ 0 }→ 1 :|: z = 2
#cklt(z) -{ 0 }→ 0 :|: z >= 0
#compare(z, z') -{ 0 }→ s :|: s >= 0, s <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ s' :|: s' >= 0, s' <= 3, z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 3 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z = 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' = 0
#compare(z, z') -{ 0 }→ 2 :|: z - 1 >= 0, z' - 1 >= 0
#compare(z, z') -{ 0 }→ 1 :|: z = 0, z' = 0
#compare(z, z') -{ 0 }→ 0 :|: z >= 0, z' >= 0
#less(z, z') -{ 1 }→ s4 :|: s4 >= 0, s4 <= 2, s'' >= 0, s'' <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ s5 :|: s5 >= 0, s5 <= 2, s1 >= 0, s1 <= 3, z' - 1 >= 0, z - 1 >= 0
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z - 1 >= 0, z' = 0, 3 = 3
#less(z, z') -{ 1 }→ 2 :|: z' - 1 >= 0, z - 1 >= 0, 3 = 3
#less(z, z') -{ 1 }→ 1 :|: z = 0, z' = 0, 1 = 1
#less(z, z') -{ 1 }→ 1 :|: z' - 1 >= 0, z = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' = 0, 2 = 2
#less(z, z') -{ 1 }→ 1 :|: z - 1 >= 0, z' - 1 >= 0, 2 = 2
#less(z, z') -{ 1 }→ 0 :|: z = 0, z' = 0, v0 >= 0, 1 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z' - 1 >= 0, z - 1 >= 0, v0 >= 0, 3 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' = 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z - 1 >= 0, z' - 1 >= 0, v0 >= 0, 2 = v0
#less(z, z') -{ 1 }→ 0 :|: z >= 0, z' >= 0, v0 >= 0, 0 = v0
insert(z, z') -{ 2 + 4·z' }→ s41 :|: s41 >= 0, s41 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insert#1(z, z') -{ 5 + 4·@ys }→ s43 :|: s43 >= 0, s43 <= 1 * z' + 1 * @y + 1 * @ys + 2, s6 >= 0, s6 <= 2, s2 >= 0, s2 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insert#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insert#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insert#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s42 :|: s42 >= 0, s42 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertD(z, z') -{ 2 + 4·z' }→ s38 :|: s38 >= 0, s38 <= 1 * z' + 1 * z + 1, z' >= 0, z >= 0
insertD#1(z, z') -{ 5 + 4·@ys }→ s40 :|: s40 >= 0, s40 <= 1 * z' + 1 * @y + 1 * @ys + 2, s7 >= 0, s7 <= 2, s3 >= 0, s3 <= 3, z = 1 + @y + @ys, z' >= 0, @y >= 0, @ys >= 0
insertD#1(z, z') -{ 1 }→ 1 + z' + 0 :|: z' >= 0, z = 0
insertD#2(z, z', z'', z1) -{ 0 }→ 0 :|: z >= 0, z' >= 0, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 1 }→ 1 + z' + (1 + z'' + z1) :|: z' >= 0, z = 1, z'' >= 0, z1 >= 0
insertD#2(z, z', z'', z1) -{ 3 + 4·z1 }→ 1 + z'' + s39 :|: s39 >= 0, s39 <= 1 * z' + 1 * z1 + 1, z = 2, z' >= 0, z'' >= 0, z1 >= 0
insertionsort(z) -{ 2 + 4·z2 }→ s47 :|: s47 >= 0, s47 <= 1 * z, z >= 0
insertionsort#1(z) -{ 5 + 4·@xs2 + 4·s48 }→ s49 :|: s48 >= 0, s48 <= 1 * @xs, s49 >= 0, s49 <= 1 * @x + 1 * s48 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsort#1(z) -{ 1 }→ 0 :|: z = 0
insertionsortD(z) -{ 2 + 4·z2 }→ s44 :|: s44 >= 0, s44 <= 1 * z, z >= 0
insertionsortD#1(z) -{ 5 + 4·@xs2 + 4·s45 }→ s46 :|: s45 >= 0, s45 <= 1 * @xs, s46 >= 0, s46 <= 1 * @x + 1 * s45 + 1, @x >= 0, z = 1 + @x + @xs, @xs >= 0
insertionsortD#1(z) -{ 1 }→ 0 :|: z = 0
testInsertionsort(z) -{ 414 + 80·s10 + 8·s10·s11 + 8·s10·s12 + 8·s10·s13 + 8·s10·s14 + 8·s10·s15 + 8·s10·s16 + 8·s10·s17 + 8·s10·s8 + 8·s10·s9 + 4·s102 + 80·s11 + 8·s11·s12 + 8·s11·s13 + 8·s11·s14 + 8·s11·s15 + 8·s11·s16 + 8·s11·s17 + 8·s11·s8 + 8·s11·s9 + 4·s112 + 80·s12 + 8·s12·s13 + 8·s12·s14 + 8·s12·s15 + 8·s12·s16 + 8·s12·s17 + 8·s12·s8 + 8·s12·s9 + 4·s122 + 80·s13 + 8·s13·s14 + 8·s13·s15 + 8·s13·s16 + 8·s13·s17 + 8·s13·s8 + 8·s13·s9 + 4·s132 + 80·s14 + 8·s14·s15 + 8·s14·s16 + 8·s14·s17 + 8·s14·s8 + 8·s14·s9 + 4·s142 + 80·s15 + 8·s15·s16 + 8·s15·s17 + 8·s15·s8 + 8·s15·s9 + 4·s152 + 80·s16 + 8·s16·s17 + 8·s16·s8 + 8·s16·s9 + 4·s162 + 80·s17 + 8·s17·s8 + 8·s17·s9 + 4·s172 + 80·s8 + 8·s8·s9 + 4·s82 + 80·s9 + 4·s92 }→ s51 :|: s51 >= 0, s51 <= 1 * (1 + s8 + (1 + s9 + (1 + s10 + (1 + s11 + (1 + s12 + (1 + s13 + (1 + s14 + (1 + s15 + (1 + s16 + (1 + s17 + 0)))))))))), s8 >= 0, s8 <= 1 * 0 + 1, s9 >= 0, s9 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s10 >= 0, s10 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s11 >= 0, s11 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s12 >= 0, s12 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s13 >= 0, s13 <= 1 * (1 + (1 + 0)) + 1, s14 >= 0, s14 <= 1 * (1 + (1 + (1 + 0))) + 1, s15 >= 0, s15 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s16 >= 0, s16 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s17 >= 0, s17 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testInsertionsortD(z) -{ 414 + 80·s18 + 8·s18·s19 + 8·s18·s20 + 8·s18·s21 + 8·s18·s22 + 8·s18·s23 + 8·s18·s24 + 8·s18·s25 + 8·s18·s26 + 8·s18·s27 + 4·s182 + 80·s19 + 8·s19·s20 + 8·s19·s21 + 8·s19·s22 + 8·s19·s23 + 8·s19·s24 + 8·s19·s25 + 8·s19·s26 + 8·s19·s27 + 4·s192 + 80·s20 + 8·s20·s21 + 8·s20·s22 + 8·s20·s23 + 8·s20·s24 + 8·s20·s25 + 8·s20·s26 + 8·s20·s27 + 4·s202 + 80·s21 + 8·s21·s22 + 8·s21·s23 + 8·s21·s24 + 8·s21·s25 + 8·s21·s26 + 8·s21·s27 + 4·s212 + 80·s22 + 8·s22·s23 + 8·s22·s24 + 8·s22·s25 + 8·s22·s26 + 8·s22·s27 + 4·s222 + 80·s23 + 8·s23·s24 + 8·s23·s25 + 8·s23·s26 + 8·s23·s27 + 4·s232 + 80·s24 + 8·s24·s25 + 8·s24·s26 + 8·s24·s27 + 4·s242 + 80·s25 + 8·s25·s26 + 8·s25·s27 + 4·s252 + 80·s26 + 8·s26·s27 + 4·s262 + 80·s27 + 4·s272 }→ s50 :|: s50 >= 0, s50 <= 1 * (1 + s18 + (1 + s19 + (1 + s20 + (1 + s21 + (1 + s22 + (1 + s23 + (1 + s24 + (1 + s25 + (1 + s26 + (1 + s27 + 0)))))))))), s18 >= 0, s18 <= 1 * 0 + 1, s19 >= 0, s19 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s20 >= 0, s20 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s21 >= 0, s21 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s22 >= 0, s22 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s23 >= 0, s23 <= 1 * (1 + (1 + 0)) + 1, s24 >= 0, s24 <= 1 * (1 + (1 + (1 + 0))) + 1, s25 >= 0, s25 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s26 >= 0, s26 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s27 >= 0, s27 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0
testList(z) -{ 11 }→ 1 + s28 + (1 + s29 + (1 + s30 + (1 + s31 + (1 + s32 + (1 + s33 + (1 + s34 + (1 + s35 + (1 + s36 + (1 + s37 + 0))))))))) :|: s28 >= 0, s28 <= 1 * 0 + 1, s29 >= 0, s29 <= 1 * (1 + (1 + (1 + (1 + (1 + 0))))) + 1, s30 >= 0, s30 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + 0)))))) + 1, s31 >= 0, s31 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))))) + 1, s32 >= 0, s32 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0)))))))) + 1, s33 >= 0, s33 <= 1 * (1 + (1 + 0)) + 1, s34 >= 0, s34 <= 1 * (1 + (1 + (1 + 0))) + 1, s35 >= 0, s35 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))))) + 1, s36 >= 0, s36 <= 1 * (1 + (1 + (1 + (1 + (1 + (1 + (1 + 0))))))) + 1, s37 >= 0, s37 <= 1 * (1 + (1 + (1 + (1 + 0)))) + 1, z >= 0

Function symbols to be analyzed:
Previous analysis results are:
#compare: runtime: O(1) [0], size: O(1) [3]
#cklt: runtime: O(1) [0], size: O(1) [2]
#abs: runtime: O(1) [1], size: O(n1) [1 + z]
#less: runtime: O(1) [1], size: O(1) [2]
insertD#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insertD#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
insertD: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#2: runtime: O(n1) [3 + 4·z1], size: O(n1) [2 + z' + z'' + z1]
insert: runtime: O(n1) [2 + 4·z'], size: O(n1) [1 + z + z']
insert#1: runtime: O(n1) [1 + 4·z], size: O(n1) [1 + z + z']
testList: runtime: O(1) [11], size: O(1) [74]
insertionsortD#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]
insertionsort#1: runtime: O(n2) [1 + 4·z2], size: O(n1) [z]
insertionsortD: runtime: O(n2) [2 + 4·z2], size: O(n1) [z]
insertionsort: runtime: O(n2) [2 + 4·z2], size: O(n1) [z]
testInsertionsortD: runtime: O(1) [21918], size: O(1) [74]
testInsertionsort: runtime: O(1) [21918], size: O(1) [74]

(93) FinalProof (EQUIVALENT transformation)

Computed overall runtime complexity

(94) BOUNDS(1, n^2)