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

0 CpxTRS
1 DecreasingLoopProof (⇔, 289 ms)
2 BOUNDS(n^1, INF)
3 RenamingProof (⇔, 0 ms)
4 CpxRelTRS
5 TypeInferenceProof (BOTH BOUNDS(ID, ID), 0 ms)
6 typed CpxTrs
7 OrderProof (LOWER BOUND(ID), 0 ms)
8 typed CpxTrs
9 NoRewriteLemmaProof (LOWER BOUND(ID), 43.9 s)
10 typed CpxTrs
11 NoRewriteLemmaProof (LOWER BOUND(ID), 40.9 s)
12 typed CpxTrs
13 NoRewriteLemmaProof (LOWER BOUND(ID), 43.4 s)
14 typed CpxTrs
15 NoRewriteLemmaProof (LOWER BOUND(ID), 41.1 s)
16 typed CpxTrs

(0) Obligation:

Runtime Complexity TRS:
The TRS R consists of the following rules:

group3(@l) → group3#1(@l)
group3#1(::(@x, @xs)) → group3#2(@xs, @x)
group3#1(nil) → nil
group3#2(::(@y, @ys), @x) → group3#3(@ys, @x, @y)
group3#2(nil, @x) → nil
group3#3(::(@z, @zs), @x, @y) → ::(tuple#3(@x, @y, @z), group3(@zs))
group3#3(nil, @x, @y) → nil
zip3(@l1, @l2, @l3) → zip3#1(@l1, @l2, @l3)
zip3#1(::(@x, @xs), @l2, @l3) → zip3#2(@l2, @l3, @x, @xs)
zip3#1(nil, @l2, @l3) → nil
zip3#2(::(@y, @ys), @l3, @x, @xs) → zip3#3(@l3, @x, @xs, @y, @ys)
zip3#2(nil, @l3, @x, @xs) → nil
zip3#3(::(@z, @zs), @x, @xs, @y, @ys) → ::(tuple#3(@x, @y, @z), zip3(@xs, @ys, @zs))
zip3#3(nil, @x, @xs, @y, @ys) → nil

Rewrite Strategy: INNERMOST

(1) DecreasingLoopProof (EQUIVALENT transformation)

The following loop(s) give(s) rise to the lower bound Ω(n1):
The rewrite sequence
group3(::(@x2_0, ::(@y44_0, ::(@z128_0, @zs129_0)))) →+ ::(tuple#3(@x2_0, @y44_0, @z128_0), group3(@zs129_0))
gives rise to a decreasing loop by considering the right hand sides subterm at position [1].
The pumping substitution is [@zs129_0 / ::(@x2_0, ::(@y44_0, ::(@z128_0, @zs129_0)))].
The result substitution is [ ].

(2) BOUNDS(n^1, INF)

(3) RenamingProof (EQUIVALENT transformation)

Renamed function symbols to avoid clashes with predefined symbol.

(4) Obligation:

Runtime Complexity Relative TRS:
The TRS R consists of the following rules:

group3(@l) → group3#1(@l)
group3#1(::(@x, @xs)) → group3#2(@xs, @x)
group3#1(nil) → nil
group3#2(::(@y, @ys), @x) → group3#3(@ys, @x, @y)
group3#2(nil, @x) → nil
group3#3(::(@z, @zs), @x, @y) → ::(tuple#3(@x, @y, @z), group3(@zs))
group3#3(nil, @x, @y) → nil
zip3(@l1, @l2, @l3) → zip3#1(@l1, @l2, @l3)
zip3#1(::(@x, @xs), @l2, @l3) → zip3#2(@l2, @l3, @x, @xs)
zip3#1(nil, @l2, @l3) → nil
zip3#2(::(@y, @ys), @l3, @x, @xs) → zip3#3(@l3, @x, @xs, @y, @ys)
zip3#2(nil, @l3, @x, @xs) → nil
zip3#3(::(@z, @zs), @x, @xs, @y, @ys) → ::(tuple#3(@x, @y, @z), zip3(@xs, @ys, @zs))
zip3#3(nil, @x, @xs, @y, @ys) → nil

S is empty.
Rewrite Strategy: INNERMOST

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

Infered types.

(6) Obligation:

Innermost TRS:
Rules:
group3(@l) → group3#1(@l)
group3#1(::(@x, @xs)) → group3#2(@xs, @x)
group3#1(nil) → nil
group3#2(::(@y, @ys), @x) → group3#3(@ys, @x, @y)
group3#2(nil, @x) → nil
group3#3(::(@z, @zs), @x, @y) → ::(tuple#3(@x, @y, @z), group3(@zs))
group3#3(nil, @x, @y) → nil
zip3(@l1, @l2, @l3) → zip3#1(@l1, @l2, @l3)
zip3#1(::(@x, @xs), @l2, @l3) → zip3#2(@l2, @l3, @x, @xs)
zip3#1(nil, @l2, @l3) → nil
zip3#2(::(@y, @ys), @l3, @x, @xs) → zip3#3(@l3, @x, @xs, @y, @ys)
zip3#2(nil, @l3, @x, @xs) → nil
zip3#3(::(@z, @zs), @x, @xs, @y, @ys) → ::(tuple#3(@x, @y, @z), zip3(@xs, @ys, @zs))
zip3#3(nil, @x, @xs, @y, @ys) → nil

Types:
group3 :: :::nil → :::nil
group3#1 :: :::nil → :::nil
:: :: tuple#3 → :::nil → :::nil
group3#2 :: :::nil → tuple#3 → :::nil
nil :: :::nil
group3#3 :: :::nil → tuple#3 → tuple#3 → :::nil
tuple#3 :: tuple#3 → tuple#3 → tuple#3 → tuple#3
zip3 :: :::nil → :::nil → :::nil → :::nil
zip3#1 :: :::nil → :::nil → :::nil → :::nil
zip3#2 :: :::nil → :::nil → tuple#3 → :::nil → :::nil
zip3#3 :: :::nil → tuple#3 → :::nil → tuple#3 → :::nil → :::nil
hole_:::nil1_0 :: :::nil
hole_tuple#32_0 :: tuple#3
gen_:::nil3_0 :: Nat → :::nil
gen_tuple#34_0 :: Nat → tuple#3

(7) OrderProof (LOWER BOUND(ID) transformation)

Heuristically decided to analyse the following defined symbols:
group3, group3#1, zip3, zip3#1

They will be analysed ascendingly in the following order:
group3 = group3#1
zip3 = zip3#1

(8) Obligation:

Innermost TRS:
Rules:
group3(@l) → group3#1(@l)
group3#1(::(@x, @xs)) → group3#2(@xs, @x)
group3#1(nil) → nil
group3#2(::(@y, @ys), @x) → group3#3(@ys, @x, @y)
group3#2(nil, @x) → nil
group3#3(::(@z, @zs), @x, @y) → ::(tuple#3(@x, @y, @z), group3(@zs))
group3#3(nil, @x, @y) → nil
zip3(@l1, @l2, @l3) → zip3#1(@l1, @l2, @l3)
zip3#1(::(@x, @xs), @l2, @l3) → zip3#2(@l2, @l3, @x, @xs)
zip3#1(nil, @l2, @l3) → nil
zip3#2(::(@y, @ys), @l3, @x, @xs) → zip3#3(@l3, @x, @xs, @y, @ys)
zip3#2(nil, @l3, @x, @xs) → nil
zip3#3(::(@z, @zs), @x, @xs, @y, @ys) → ::(tuple#3(@x, @y, @z), zip3(@xs, @ys, @zs))
zip3#3(nil, @x, @xs, @y, @ys) → nil

Types:
group3 :: :::nil → :::nil
group3#1 :: :::nil → :::nil
:: :: tuple#3 → :::nil → :::nil
group3#2 :: :::nil → tuple#3 → :::nil
nil :: :::nil
group3#3 :: :::nil → tuple#3 → tuple#3 → :::nil
tuple#3 :: tuple#3 → tuple#3 → tuple#3 → tuple#3
zip3 :: :::nil → :::nil → :::nil → :::nil
zip3#1 :: :::nil → :::nil → :::nil → :::nil
zip3#2 :: :::nil → :::nil → tuple#3 → :::nil → :::nil
zip3#3 :: :::nil → tuple#3 → :::nil → tuple#3 → :::nil → :::nil
hole_:::nil1_0 :: :::nil
hole_tuple#32_0 :: tuple#3
gen_:::nil3_0 :: Nat → :::nil
gen_tuple#34_0 :: Nat → tuple#3

Generator Equations:
gen_:::nil3_0(0) ⇔ nil
gen_:::nil3_0(+(x, 1)) ⇔ ::(hole_tuple#32_0, gen_:::nil3_0(x))
gen_tuple#34_0(0) ⇔ hole_tuple#32_0
gen_tuple#34_0(+(x, 1)) ⇔ tuple#3(hole_tuple#32_0, hole_tuple#32_0, gen_tuple#34_0(x))

The following defined symbols remain to be analysed:
zip3#1, group3, group3#1, zip3

They will be analysed ascendingly in the following order:
group3 = group3#1
zip3 = zip3#1

(9) NoRewriteLemmaProof (LOWER BOUND(ID) transformation)

Could not prove a rewrite lemma for the defined symbol zip3#1.

(10) Obligation:

Innermost TRS:
Rules:
group3(@l) → group3#1(@l)
group3#1(::(@x, @xs)) → group3#2(@xs, @x)
group3#1(nil) → nil
group3#2(::(@y, @ys), @x) → group3#3(@ys, @x, @y)
group3#2(nil, @x) → nil
group3#3(::(@z, @zs), @x, @y) → ::(tuple#3(@x, @y, @z), group3(@zs))
group3#3(nil, @x, @y) → nil
zip3(@l1, @l2, @l3) → zip3#1(@l1, @l2, @l3)
zip3#1(::(@x, @xs), @l2, @l3) → zip3#2(@l2, @l3, @x, @xs)
zip3#1(nil, @l2, @l3) → nil
zip3#2(::(@y, @ys), @l3, @x, @xs) → zip3#3(@l3, @x, @xs, @y, @ys)
zip3#2(nil, @l3, @x, @xs) → nil
zip3#3(::(@z, @zs), @x, @xs, @y, @ys) → ::(tuple#3(@x, @y, @z), zip3(@xs, @ys, @zs))
zip3#3(nil, @x, @xs, @y, @ys) → nil

Types:
group3 :: :::nil → :::nil
group3#1 :: :::nil → :::nil
:: :: tuple#3 → :::nil → :::nil
group3#2 :: :::nil → tuple#3 → :::nil
nil :: :::nil
group3#3 :: :::nil → tuple#3 → tuple#3 → :::nil
tuple#3 :: tuple#3 → tuple#3 → tuple#3 → tuple#3
zip3 :: :::nil → :::nil → :::nil → :::nil
zip3#1 :: :::nil → :::nil → :::nil → :::nil
zip3#2 :: :::nil → :::nil → tuple#3 → :::nil → :::nil
zip3#3 :: :::nil → tuple#3 → :::nil → tuple#3 → :::nil → :::nil
hole_:::nil1_0 :: :::nil
hole_tuple#32_0 :: tuple#3
gen_:::nil3_0 :: Nat → :::nil
gen_tuple#34_0 :: Nat → tuple#3

Generator Equations:
gen_:::nil3_0(0) ⇔ nil
gen_:::nil3_0(+(x, 1)) ⇔ ::(hole_tuple#32_0, gen_:::nil3_0(x))
gen_tuple#34_0(0) ⇔ hole_tuple#32_0
gen_tuple#34_0(+(x, 1)) ⇔ tuple#3(hole_tuple#32_0, hole_tuple#32_0, gen_tuple#34_0(x))

The following defined symbols remain to be analysed:
zip3, group3, group3#1

They will be analysed ascendingly in the following order:
group3 = group3#1
zip3 = zip3#1

(11) NoRewriteLemmaProof (LOWER BOUND(ID) transformation)

Could not prove a rewrite lemma for the defined symbol zip3.

(12) Obligation:

Innermost TRS:
Rules:
group3(@l) → group3#1(@l)
group3#1(::(@x, @xs)) → group3#2(@xs, @x)
group3#1(nil) → nil
group3#2(::(@y, @ys), @x) → group3#3(@ys, @x, @y)
group3#2(nil, @x) → nil
group3#3(::(@z, @zs), @x, @y) → ::(tuple#3(@x, @y, @z), group3(@zs))
group3#3(nil, @x, @y) → nil
zip3(@l1, @l2, @l3) → zip3#1(@l1, @l2, @l3)
zip3#1(::(@x, @xs), @l2, @l3) → zip3#2(@l2, @l3, @x, @xs)
zip3#1(nil, @l2, @l3) → nil
zip3#2(::(@y, @ys), @l3, @x, @xs) → zip3#3(@l3, @x, @xs, @y, @ys)
zip3#2(nil, @l3, @x, @xs) → nil
zip3#3(::(@z, @zs), @x, @xs, @y, @ys) → ::(tuple#3(@x, @y, @z), zip3(@xs, @ys, @zs))
zip3#3(nil, @x, @xs, @y, @ys) → nil

Types:
group3 :: :::nil → :::nil
group3#1 :: :::nil → :::nil
:: :: tuple#3 → :::nil → :::nil
group3#2 :: :::nil → tuple#3 → :::nil
nil :: :::nil
group3#3 :: :::nil → tuple#3 → tuple#3 → :::nil
tuple#3 :: tuple#3 → tuple#3 → tuple#3 → tuple#3
zip3 :: :::nil → :::nil → :::nil → :::nil
zip3#1 :: :::nil → :::nil → :::nil → :::nil
zip3#2 :: :::nil → :::nil → tuple#3 → :::nil → :::nil
zip3#3 :: :::nil → tuple#3 → :::nil → tuple#3 → :::nil → :::nil
hole_:::nil1_0 :: :::nil
hole_tuple#32_0 :: tuple#3
gen_:::nil3_0 :: Nat → :::nil
gen_tuple#34_0 :: Nat → tuple#3

Generator Equations:
gen_:::nil3_0(0) ⇔ nil
gen_:::nil3_0(+(x, 1)) ⇔ ::(hole_tuple#32_0, gen_:::nil3_0(x))
gen_tuple#34_0(0) ⇔ hole_tuple#32_0
gen_tuple#34_0(+(x, 1)) ⇔ tuple#3(hole_tuple#32_0, hole_tuple#32_0, gen_tuple#34_0(x))

The following defined symbols remain to be analysed:
group3#1, group3

They will be analysed ascendingly in the following order:
group3 = group3#1

(13) NoRewriteLemmaProof (LOWER BOUND(ID) transformation)

Could not prove a rewrite lemma for the defined symbol group3#1.

(14) Obligation:

Innermost TRS:
Rules:
group3(@l) → group3#1(@l)
group3#1(::(@x, @xs)) → group3#2(@xs, @x)
group3#1(nil) → nil
group3#2(::(@y, @ys), @x) → group3#3(@ys, @x, @y)
group3#2(nil, @x) → nil
group3#3(::(@z, @zs), @x, @y) → ::(tuple#3(@x, @y, @z), group3(@zs))
group3#3(nil, @x, @y) → nil
zip3(@l1, @l2, @l3) → zip3#1(@l1, @l2, @l3)
zip3#1(::(@x, @xs), @l2, @l3) → zip3#2(@l2, @l3, @x, @xs)
zip3#1(nil, @l2, @l3) → nil
zip3#2(::(@y, @ys), @l3, @x, @xs) → zip3#3(@l3, @x, @xs, @y, @ys)
zip3#2(nil, @l3, @x, @xs) → nil
zip3#3(::(@z, @zs), @x, @xs, @y, @ys) → ::(tuple#3(@x, @y, @z), zip3(@xs, @ys, @zs))
zip3#3(nil, @x, @xs, @y, @ys) → nil

Types:
group3 :: :::nil → :::nil
group3#1 :: :::nil → :::nil
:: :: tuple#3 → :::nil → :::nil
group3#2 :: :::nil → tuple#3 → :::nil
nil :: :::nil
group3#3 :: :::nil → tuple#3 → tuple#3 → :::nil
tuple#3 :: tuple#3 → tuple#3 → tuple#3 → tuple#3
zip3 :: :::nil → :::nil → :::nil → :::nil
zip3#1 :: :::nil → :::nil → :::nil → :::nil
zip3#2 :: :::nil → :::nil → tuple#3 → :::nil → :::nil
zip3#3 :: :::nil → tuple#3 → :::nil → tuple#3 → :::nil → :::nil
hole_:::nil1_0 :: :::nil
hole_tuple#32_0 :: tuple#3
gen_:::nil3_0 :: Nat → :::nil
gen_tuple#34_0 :: Nat → tuple#3

Generator Equations:
gen_:::nil3_0(0) ⇔ nil
gen_:::nil3_0(+(x, 1)) ⇔ ::(hole_tuple#32_0, gen_:::nil3_0(x))
gen_tuple#34_0(0) ⇔ hole_tuple#32_0
gen_tuple#34_0(+(x, 1)) ⇔ tuple#3(hole_tuple#32_0, hole_tuple#32_0, gen_tuple#34_0(x))

The following defined symbols remain to be analysed:
group3

They will be analysed ascendingly in the following order:
group3 = group3#1

(15) NoRewriteLemmaProof (LOWER BOUND(ID) transformation)

Could not prove a rewrite lemma for the defined symbol group3.

(16) Obligation:

Innermost TRS:
Rules:
group3(@l) → group3#1(@l)
group3#1(::(@x, @xs)) → group3#2(@xs, @x)
group3#1(nil) → nil
group3#2(::(@y, @ys), @x) → group3#3(@ys, @x, @y)
group3#2(nil, @x) → nil
group3#3(::(@z, @zs), @x, @y) → ::(tuple#3(@x, @y, @z), group3(@zs))
group3#3(nil, @x, @y) → nil
zip3(@l1, @l2, @l3) → zip3#1(@l1, @l2, @l3)
zip3#1(::(@x, @xs), @l2, @l3) → zip3#2(@l2, @l3, @x, @xs)
zip3#1(nil, @l2, @l3) → nil
zip3#2(::(@y, @ys), @l3, @x, @xs) → zip3#3(@l3, @x, @xs, @y, @ys)
zip3#2(nil, @l3, @x, @xs) → nil
zip3#3(::(@z, @zs), @x, @xs, @y, @ys) → ::(tuple#3(@x, @y, @z), zip3(@xs, @ys, @zs))
zip3#3(nil, @x, @xs, @y, @ys) → nil

Types:
group3 :: :::nil → :::nil
group3#1 :: :::nil → :::nil
:: :: tuple#3 → :::nil → :::nil
group3#2 :: :::nil → tuple#3 → :::nil
nil :: :::nil
group3#3 :: :::nil → tuple#3 → tuple#3 → :::nil
tuple#3 :: tuple#3 → tuple#3 → tuple#3 → tuple#3
zip3 :: :::nil → :::nil → :::nil → :::nil
zip3#1 :: :::nil → :::nil → :::nil → :::nil
zip3#2 :: :::nil → :::nil → tuple#3 → :::nil → :::nil
zip3#3 :: :::nil → tuple#3 → :::nil → tuple#3 → :::nil → :::nil
hole_:::nil1_0 :: :::nil
hole_tuple#32_0 :: tuple#3
gen_:::nil3_0 :: Nat → :::nil
gen_tuple#34_0 :: Nat → tuple#3

Generator Equations:
gen_:::nil3_0(0) ⇔ nil
gen_:::nil3_0(+(x, 1)) ⇔ ::(hole_tuple#32_0, gen_:::nil3_0(x))
gen_tuple#34_0(0) ⇔ hole_tuple#32_0
gen_tuple#34_0(+(x, 1)) ⇔ tuple#3(hole_tuple#32_0, hole_tuple#32_0, gen_tuple#34_0(x))

No more defined symbols left to analyse.