The rewrite relation of the following TRS is considered.
app(nil,k) | → | k | (1) |
app(l,nil) | → | l | (2) |
app(cons(x,l),k) | → | cons(x,app(l,k)) | (3) |
sum(cons(x,nil)) | → | cons(x,nil) | (4) |
sum(cons(x,cons(y,l))) | → | sum(cons(plus(x,y),l)) | (5) |
sum(app(l,cons(x,cons(y,k)))) | → | sum(app(l,sum(cons(x,cons(y,k))))) | (6) |
plus(s(x),s(y)) | → | s(s(plus(if(gt(x,y),x,y),if(not(gt(x,y)),id(x),id(y))))) | (7) |
plus(s(x),x) | → | plus(if(gt(x,x),id(x),id(x)),s(x)) | (8) |
plus(zero,y) | → | y | (9) |
plus(id(x),s(y)) | → | s(plus(x,if(gt(s(y),y),y,s(y)))) | (10) |
id(x) | → | x | (11) |
if(true,x,y) | → | x | (12) |
if(false,x,y) | → | y | (13) |
not(x) | → | if(x,false,true) | (14) |
gt(s(x),zero) | → | true | (15) |
gt(zero,y) | → | false | (16) |
gt(s(x),s(y)) | → | gt(x,y) | (17) |
app#(cons(x,l),k) | → | app#(l,k) | (18) |
sum#(cons(x,cons(y,l))) | → | sum#(cons(plus(x,y),l)) | (19) |
sum#(cons(x,cons(y,l))) | → | plus#(x,y) | (20) |
sum#(app(l,cons(x,cons(y,k)))) | → | sum#(app(l,sum(cons(x,cons(y,k))))) | (21) |
sum#(app(l,cons(x,cons(y,k)))) | → | app#(l,sum(cons(x,cons(y,k)))) | (22) |
sum#(app(l,cons(x,cons(y,k)))) | → | sum#(cons(x,cons(y,k))) | (23) |
plus#(s(x),s(y)) | → | plus#(if(gt(x,y),x,y),if(not(gt(x,y)),id(x),id(y))) | (24) |
plus#(s(x),s(y)) | → | if#(gt(x,y),x,y) | (25) |
plus#(s(x),s(y)) | → | gt#(x,y) | (26) |
plus#(s(x),s(y)) | → | if#(not(gt(x,y)),id(x),id(y)) | (27) |
plus#(s(x),s(y)) | → | not#(gt(x,y)) | (28) |
plus#(s(x),s(y)) | → | id#(x) | (29) |
plus#(s(x),s(y)) | → | id#(y) | (30) |
plus#(s(x),x) | → | plus#(if(gt(x,x),id(x),id(x)),s(x)) | (31) |
plus#(s(x),x) | → | if#(gt(x,x),id(x),id(x)) | (32) |
plus#(s(x),x) | → | gt#(x,x) | (33) |
plus#(s(x),x) | → | id#(x) | (34) |
plus#(id(x),s(y)) | → | plus#(x,if(gt(s(y),y),y,s(y))) | (35) |
plus#(id(x),s(y)) | → | if#(gt(s(y),y),y,s(y)) | (36) |
plus#(id(x),s(y)) | → | gt#(s(y),y) | (37) |
not#(x) | → | if#(x,false,true) | (38) |
gt#(s(x),s(y)) | → | gt#(x,y) | (39) |
The dependency pairs are split into 5 components.
sum#(app(l,cons(x,cons(y,k)))) | → | sum#(app(l,sum(cons(x,cons(y,k))))) | (21) |
prec(app) | = | 2 | weight(app) | = | 1 | ||||
prec(cons) | = | 1 | weight(cons) | = | 3 | ||||
prec(sum) | = | 0 | weight(sum) | = | 5 | ||||
prec(nil) | = | 3 | weight(nil) | = | 1 |
π(sum#) | = | 1 |
π(app) | = | [1,2] |
π(cons) | = | [2] |
π(sum) | = | [] |
π(nil) | = | [] |
sum(cons(x,cons(y,l))) | → | sum(cons(plus(x,y),l)) | (5) |
app(nil,k) | → | k | (1) |
app(l,nil) | → | l | (2) |
app(cons(x,l),k) | → | cons(x,app(l,k)) | (3) |
sum(cons(x,nil)) | → | cons(x,nil) | (4) |
sum#(app(l,cons(x,cons(y,k)))) | → | sum#(app(l,sum(cons(x,cons(y,k))))) | (21) |
There are no pairs anymore.
sum#(cons(x,cons(y,l))) | → | sum#(cons(plus(x,y),l)) | (19) |
prec(cons) | = | 1 | weight(cons) | = | 1 |
π(sum#) | = | 1 |
π(cons) | = | [2] |
sum#(cons(x,cons(y,l))) | → | sum#(cons(plus(x,y),l)) | (19) |
There are no pairs anymore.
plus#(s(x),x) | → | plus#(if(gt(x,x),id(x),id(x)),s(x)) | (31) |
plus#(s(x),s(y)) | → | plus#(if(gt(x,y),x,y),if(not(gt(x,y)),id(x),id(y))) | (24) |
plus#(id(x),s(y)) | → | plus#(x,if(gt(s(y),y),y,s(y))) | (35) |
[plus#(x1, x2)] | = |
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[s(x1)] | = |
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[if(x1, x2, x3)] | = |
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[gt(x1, x2)] | = |
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[id(x1)] | = |
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[not(x1)] | = |
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[zero] | = |
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[true] | = |
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[false] | = |
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gt(s(x),zero) | → | true | (15) |
gt(zero,y) | → | false | (16) |
gt(s(x),s(y)) | → | gt(x,y) | (17) |
id(x) | → | x | (11) |
if(true,x,y) | → | x | (12) |
if(false,x,y) | → | y | (13) |
not(x) | → | if(x,false,true) | (14) |
plus#(s(x),x) | → | plus#(if(gt(x,x),id(x),id(x)),s(x)) | (31) |
[plus#(x1, x2)] | = |
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[s(x1)] | = |
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[if(x1, x2, x3)] | = |
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[gt(x1, x2)] | = |
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[not(x1)] | = |
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[id(x1)] | = |
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[zero] | = |
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[true] | = |
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[false] | = |
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if(true,x,y) | → | x | (12) |
if(false,x,y) | → | y | (13) |
id(x) | → | x | (11) |
plus#(s(x),s(y)) | → | plus#(if(gt(x,y),x,y),if(not(gt(x,y)),id(x),id(y))) | (24) |
Using size-change termination in combination with the subterm criterion one obtains the following initial size-change graphs.
plus#(id(x),s(y)) | → | plus#(x,if(gt(s(y),y),y,s(y))) | (35) |
1 | > | 1 |
As there is no critical graph in the transitive closure, there are no infinite chains.
app#(cons(x,l),k) | → | app#(l,k) | (18) |
[cons(x1, x2)] | = | 1 · x1 + 1 · x2 |
[app#(x1, x2)] | = | 1 · x1 + 1 · x2 |
Using size-change termination in combination with the subterm criterion one obtains the following initial size-change graphs.
app#(cons(x,l),k) | → | app#(l,k) | (18) |
1 | > | 1 | |
2 | ≥ | 2 |
As there is no critical graph in the transitive closure, there are no infinite chains.
gt#(s(x),s(y)) | → | gt#(x,y) | (39) |
[s(x1)] | = | 1 · x1 |
[gt#(x1, x2)] | = | 1 · x1 + 1 · x2 |
Using size-change termination in combination with the subterm criterion one obtains the following initial size-change graphs.
gt#(s(x),s(y)) | → | gt#(x,y) | (39) |
1 | > | 1 | |
2 | > | 2 |
As there is no critical graph in the transitive closure, there are no infinite chains.