/export/starexec/sandbox2/solver/bin/starexec_run_default /export/starexec/sandbox2/benchmark/theBenchmark.xml /export/starexec/sandbox2/output/output_files -------------------------------------------------------------------------------- YES ** BEGIN proof argument ** All the DP problems were proved finite. As all the involved DP processors are sound, the TRS under analysis terminates. ** END proof argument ** ** BEGIN proof description ** ## Searching for a generalized rewrite rule (a rule whose right-hand side contains a variable that does not occur in the left-hand side)... No generalized rewrite rule found! ## Applying the DP framework... ## 2 initial DP problems to solve. ## First, we try to decompose these problems into smaller problems. ## Round 1 [2 DP problems]: ## DP problem: Dependency pairs = [i^#(.(_0,_1)) -> i^#(_1), i^#(.(_0,_1)) -> i^#(_0)] TRS = {.(1,_0) -> _0, .(_0,1) -> _0, .(i(_0),_0) -> 1, .(_0,i(_0)) -> 1, i(1) -> 1, i(i(_0)) -> _0, .(i(_0),.(_0,_1)) -> _1, .(_0,.(i(_0),_1)) -> _1, .(.(_0,_1),_2) -> .(_0,.(_1,_2)), i(.(_0,_1)) -> .(i(_1),i(_0))} ## Trying with homeomorphic embeddings... Success! This DP problem is finite. ## DP problem: Dependency pairs = [.^#(.(_0,_1),_2) -> .^#(_0,.(_1,_2)), .^#(.(_0,_1),_2) -> .^#(_1,_2)] TRS = {.(1,_0) -> _0, .(_0,1) -> _0, .(i(_0),_0) -> 1, .(_0,i(_0)) -> 1, i(1) -> 1, i(i(_0)) -> _0, .(i(_0),.(_0,_1)) -> _1, .(_0,.(i(_0),_1)) -> _1, .(.(_0,_1),_2) -> .(_0,.(_1,_2)), i(.(_0,_1)) -> .(i(_1),i(_0))} ## Trying with homeomorphic embeddings... Failed! ## Trying with polynomial interpretations... The constraints are satisfied by the polynomials: {1:[0], i(_0):[_0], .(_0,_1):[1 + _0 + _1], .^#(_0,_1):[_0]} for all instantiations of the variables with values greater than or equal to mu = 0. This DP problem is finite. ## All the DP problems were proved finite. As all the involved DP processors are sound, the TRS under analysis terminates. Proof run on Linux version 3.10.0-1160.25.1.el7.x86_64 for amd64 using Java version 1.8.0_292 ** END proof description ** Total number of generated unfolded rules = 0