* Step 1: Sum WORST_CASE(Omega(n^1),O(n^1))
+ Considered Problem:
- Strict TRS:
eqZList(C(x1,x2),C(y1,y2)) -> and(eqZList(x1,y1),eqZList(x2,y2))
eqZList(C(x1,x2),Z()) -> False()
eqZList(Z(),C(y1,y2)) -> False()
eqZList(Z(),Z()) -> True()
f(C(x1,x2)) -> C(f(x1),f(x2))
f(Z()) -> Z()
first(C(x1,x2)) -> x1
g(x) -> x
second(C(x1,x2)) -> x2
- Weak TRS:
and(False(),False()) -> False()
and(False(),True()) -> False()
and(True(),False()) -> False()
and(True(),True()) -> True()
- Signature:
{and/2,eqZList/2,f/1,first/1,g/1,second/1} / {C/2,False/0,True/0,Z/0}
- Obligation:
innermost runtime complexity wrt. defined symbols {and,eqZList,f,first,g,second} and constructors {C,False
,True,Z}
+ Applied Processor:
Sum {left = someStrategy, right = someStrategy}
+ Details:
()
** Step 1.a:1: DecreasingLoops WORST_CASE(Omega(n^1),?)
+ Considered Problem:
- Strict TRS:
eqZList(C(x1,x2),C(y1,y2)) -> and(eqZList(x1,y1),eqZList(x2,y2))
eqZList(C(x1,x2),Z()) -> False()
eqZList(Z(),C(y1,y2)) -> False()
eqZList(Z(),Z()) -> True()
f(C(x1,x2)) -> C(f(x1),f(x2))
f(Z()) -> Z()
first(C(x1,x2)) -> x1
g(x) -> x
second(C(x1,x2)) -> x2
- Weak TRS:
and(False(),False()) -> False()
and(False(),True()) -> False()
and(True(),False()) -> False()
and(True(),True()) -> True()
- Signature:
{and/2,eqZList/2,f/1,first/1,g/1,second/1} / {C/2,False/0,True/0,Z/0}
- Obligation:
innermost runtime complexity wrt. defined symbols {and,eqZList,f,first,g,second} and constructors {C,False
,True,Z}
+ Applied Processor:
DecreasingLoops {bound = AnyLoop, narrow = 10}
+ Details:
The system has following decreasing Loops:
eqZList(x,z){x -> C(x,y),z -> C(z,u)} =
eqZList(C(x,y),C(z,u)) ->^+ and(eqZList(x,z),eqZList(y,u))
= C[eqZList(x,z) = eqZList(x,z){}]
** Step 1.b:1: Bounds WORST_CASE(?,O(n^1))
+ Considered Problem:
- Strict TRS:
eqZList(C(x1,x2),C(y1,y2)) -> and(eqZList(x1,y1),eqZList(x2,y2))
eqZList(C(x1,x2),Z()) -> False()
eqZList(Z(),C(y1,y2)) -> False()
eqZList(Z(),Z()) -> True()
f(C(x1,x2)) -> C(f(x1),f(x2))
f(Z()) -> Z()
first(C(x1,x2)) -> x1
g(x) -> x
second(C(x1,x2)) -> x2
- Weak TRS:
and(False(),False()) -> False()
and(False(),True()) -> False()
and(True(),False()) -> False()
and(True(),True()) -> True()
- Signature:
{and/2,eqZList/2,f/1,first/1,g/1,second/1} / {C/2,False/0,True/0,Z/0}
- Obligation:
innermost runtime complexity wrt. defined symbols {and,eqZList,f,first,g,second} and constructors {C,False
,True,Z}
+ Applied Processor:
Bounds {initialAutomaton = minimal, enrichment = match}
+ Details:
The problem is match-bounded by 1.
The enriched problem is compatible with follwoing automaton.
C_0(2,2) -> 1
C_0(2,2) -> 2
C_1(5,6) -> 1
C_1(6,6) -> 5
C_1(6,6) -> 6
False_0() -> 1
False_0() -> 2
False_1() -> 1
False_1() -> 3
False_1() -> 4
True_0() -> 1
True_0() -> 2
True_1() -> 1
True_1() -> 3
True_1() -> 4
Z_0() -> 1
Z_0() -> 2
Z_1() -> 1
Z_1() -> 5
Z_1() -> 6
and_0(2,2) -> 1
and_1(3,4) -> 1
and_1(4,4) -> 3
and_1(4,4) -> 4
eqZList_0(2,2) -> 1
eqZList_1(2,2) -> 3
eqZList_1(2,2) -> 4
f_0(2) -> 1
f_1(2) -> 5
f_1(2) -> 6
first_0(2) -> 1
g_0(2) -> 1
second_0(2) -> 1
2 -> 1
** Step 1.b:2: EmptyProcessor WORST_CASE(?,O(1))
+ Considered Problem:
- Weak TRS:
and(False(),False()) -> False()
and(False(),True()) -> False()
and(True(),False()) -> False()
and(True(),True()) -> True()
eqZList(C(x1,x2),C(y1,y2)) -> and(eqZList(x1,y1),eqZList(x2,y2))
eqZList(C(x1,x2),Z()) -> False()
eqZList(Z(),C(y1,y2)) -> False()
eqZList(Z(),Z()) -> True()
f(C(x1,x2)) -> C(f(x1),f(x2))
f(Z()) -> Z()
first(C(x1,x2)) -> x1
g(x) -> x
second(C(x1,x2)) -> x2
- Signature:
{and/2,eqZList/2,f/1,first/1,g/1,second/1} / {C/2,False/0,True/0,Z/0}
- Obligation:
innermost runtime complexity wrt. defined symbols {and,eqZList,f,first,g,second} and constructors {C,False
,True,Z}
+ Applied Processor:
EmptyProcessor
+ Details:
The problem is already closed. The intended complexity is O(1).
WORST_CASE(Omega(n^1),O(n^1))