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TRS Stand 20472 pair #381713172
details
property
value
status
complete
benchmark
4.28.xml
ran by
Akihisa Yamada
cpu timeout
1200 seconds
wallclock timeout
300 seconds
memory limit
137438953472 bytes
execution host
n042.star.cs.uiowa.edu
space
SK90
run statistics
property
value
solver
Wanda
configuration
FirstOrder
runtime (wallclock)
0.26900601387 seconds
cpu usage
0.26467866
max memory
1.0878976E7
stage attributes
key
value
output-size
11336
starexec-result
YES
output
/export/starexec/sandbox/solver/bin/starexec_run_FirstOrder /export/starexec/sandbox/benchmark/theBenchmark.xml /export/starexec/sandbox/output/output_files -------------------------------------------------------------------------------- YES We consider the system theBenchmark. We are asked to determine termination of the following first-order TRS. !870 : [o * o] --> o !plus!plus : [o * o] --> o f : [o * o] --> o false : [] --> o g : [o * o] --> o max : [o] --> o max!450 : [o * o] --> o mem : [o * o] --> o nil : [] --> o not : [o] --> o null : [o] --> o or : [o * o] --> o true : [] --> o u : [] --> o f(X, nil) => g(nil, X) f(X, g(Y, Z)) => g(f(X, Y), Z) !plus!plus(X, nil) => X !plus!plus(X, g(Y, Z)) => g(!plus!plus(X, Y), Z) null(nil) => true null(g(X, Y)) => false mem(nil, X) => false mem(g(X, Y), Z) => or(!870(Y, Z), mem(X, Z)) mem(X, max(X)) => not(null(X)) max(g(g(nil, X), Y)) => max!450(X, Y) max(g(g(g(X, Y), Z), u)) => max!450(max(g(g(X, Y), Z)), u) We use rule removal, following [Kop12, Theorem 2.23]. This gives the following requirements (possibly using Theorems 2.25 and 2.26 in [Kop12]): f(X, nil) >? g(nil, X) f(X, g(Y, Z)) >? g(f(X, Y), Z) !plus!plus(X, nil) >? X !plus!plus(X, g(Y, Z)) >? g(!plus!plus(X, Y), Z) null(nil) >? true null(g(X, Y)) >? false mem(nil, X) >? false mem(g(X, Y), Z) >? or(!870(Y, Z), mem(X, Z)) mem(X, max(X)) >? not(null(X)) max(g(g(nil, X), Y)) >? max!450(X, Y) max(g(g(g(X, Y), Z), u)) >? max!450(max(g(g(X, Y), Z)), u) about to try horpo We use a recursive path ordering as defined in [Kop12, Chapter 5]. Argument functions: [[false]] = _|_ [[nil]] = _|_ [[true]] = _|_ [[u]] = _|_ We choose Lex = {} and Mul = {!870, !plus!plus, f, g, max, max!450, mem, not, null, or}, and the following precedence: mem > f > or > not > !plus!plus > !870 > null > max > max!450 > g Taking the argument function into account, and fixing the greater / greater equal choices, the constraints can be denoted as follows: f(X, _|_) >= g(_|_, X) f(X, g(Y, Z)) > g(f(X, Y), Z) !plus!plus(X, _|_) >= X !plus!plus(X, g(Y, Z)) >= g(!plus!plus(X, Y), Z) null(_|_) >= _|_ null(g(X, Y)) >= _|_ mem(_|_, X) >= _|_ mem(g(X, Y), Z) >= or(!870(Y, Z), mem(X, Z)) mem(X, max(X)) > not(null(X)) max(g(g(_|_, X), Y)) >= max!450(X, Y) max(g(g(g(X, Y), Z), _|_)) > max!450(max(g(g(X, Y), Z)), _|_) With these choices, we have: 1] f(X, _|_) >= g(_|_, X) because [2], by (Star) 2] f*(X, _|_) >= g(_|_, X) because f > g, [3] and [4], by (Copy) 3] f*(X, _|_) >= _|_ by (Bot) 4] f*(X, _|_) >= X because [5], by (Select) 5] X >= X by (Meta) 6] f(X, g(Y, Z)) > g(f(X, Y), Z) because [7], by definition 7] f*(X, g(Y, Z)) >= g(f(X, Y), Z) because f > g, [8] and [13], by (Copy) 8] f*(X, g(Y, Z)) >= f(X, Y) because f in Mul, [9] and [10], by (Stat) 9] X >= X by (Meta) 10] g(Y, Z) > Y because [11], by definition 11] g*(Y, Z) >= Y because [12], by (Select) 12] Y >= Y by (Meta) 13] f*(X, g(Y, Z)) >= Z because [14], by (Select) 14] g(Y, Z) >= Z because [15], by (Star) 15] g*(Y, Z) >= Z because [16], by (Select) 16] Z >= Z by (Meta)
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