/export/starexec/sandbox/solver/bin/starexec_run_Transition /export/starexec/sandbox/benchmark/theBenchmark.smt2 /export/starexec/sandbox/output/output_files -------------------------------------------------------------------------------- YES DP problem for innermost termination. P = init#(x1, x2, x3, x4, x5, x6) -> f1#(rnd1, rnd2, rnd3, rnd4, rnd5, rnd6) f8#(I0, I1, I2, I3, I4, I5) -> f7#(I6, I2, I7, I8, I9, I10) [-1 <= I6 - 1 /\ -1 <= I3 - 1 /\ -1 <= I1 - 1 /\ 4 <= I0 - 1 /\ I6 <= I3 /\ I6 <= I1 /\ I6 + 4 <= I0] f7#(I11, I12, I13, I14, I15, I16) -> f8#(I17, I18, I12, I19, I20, I21) [-1 <= I19 - 1 /\ -1 <= I18 - 1 /\ 10 <= I17 - 1 /\ 0 <= I11 - 1 /\ I19 + 1 <= I11 /\ I18 + 1 <= I11] f7#(I22, I23, I24, I25, I26, I27) -> f8#(I28, I29, I23, I30, I31, I32) [-1 <= I30 - 1 /\ -1 <= I29 - 1 /\ 5 <= I28 - 1 /\ 3 <= I22 - 1 /\ I30 + 2 <= I22 /\ I29 + 2 <= I22 /\ I28 - 2 <= I22] f7#(I33, I34, I35, I36, I37, I38) -> f3#(I39, I40, I41, I42, I43, I44) [-1 <= I39 - 1 /\ 0 <= I33 - 1 /\ I39 + 1 <= I33] f3#(I45, I46, I47, I48, I49, I50) -> f7#(I51, I52, I53, I54, I55, I56) [-1 <= I51 - 1 /\ 0 <= I45 - 1 /\ I51 + 1 <= I45] f6#(I57, I58, I59, I60, I61, I62) -> f6#(I57, I58, I59 + 1, I60, I61, I63) [I58 - 1 <= I58 - 1 /\ -1 <= I58 - 1 /\ I58 - 1 <= I57 - 1 /\ I58 <= I57 - 1 /\ 1 <= I62 - 1 /\ 0 <= I57 - 1 /\ I59 <= I60 - 1 /\ 0 <= I60 - 1] f6#(I64, I65, I66, I67, I68, I69) -> f6#(I64, I65, I66 + 1, I67, I68, I69) [I65 - 1 <= I65 - 1 /\ -1 <= I65 - 1 /\ I65 - 1 <= I64 - 1 /\ I65 <= I64 - 1 /\ 1 <= I69 - 1 /\ 0 <= I64 - 1 /\ I66 <= I67 - 1 /\ 0 <= I67 - 1] f6#(I70, I71, I72, I73, I74, I75) -> f2#(I71 - 1, I74, I75, I76, I77, I78) [I71 - 1 <= I71 - 1 /\ -1 <= I71 - 1 /\ I71 - 1 <= I70 - 1 /\ I71 <= I70 - 1 /\ 1 <= I75 - 1 /\ 0 <= I70 - 1 /\ I72 <= I73 - 1 /\ 0 <= I73 - 1] f2#(I79, I80, I81, I82, I83, I84) -> f6#(I79, I79 - 1, 0, I85, I80, I81 + 1) [-1 <= I85 - 1 /\ I81 <= I80 - 1 /\ 0 <= I81 - 1 /\ 0 <= I79 - 1 /\ -1 <= I80 - 1] f4#(I86, I87, I88, I89, I90, I91) -> f3#(I92, I93, I94, I95, I96, I97) [0 <= y1 - 1 /\ 1 <= I88 - 1 /\ I92 <= I87 /\ 0 <= I86 - 1 /\ 0 <= I87 - 1 /\ 0 <= I92 - 1] f5#(I98, I99, I100, I101, I102, I103) -> f4#(I104, I105, I99, I106, I107, I108) [1 <= I105 - 1 /\ 0 <= I104 - 1 /\ 0 <= I98 - 1 /\ I105 - 1 <= I98 /\ I104 <= I98] f1#(I109, I110, I111, I112, I113, I114) -> f4#(I115, I116, I117, I118, I119, I120) [-1 <= I121 - 1 /\ 0 <= I110 - 1 /\ I115 <= I109 /\ 0 <= I109 - 1 /\ 0 <= I115 - 1 /\ 0 <= I116 - 1] f1#(I122, I123, I124, I125, I126, I127) -> f3#(I128, I129, I130, I131, I132, I133) [-1 <= I128 - 1 /\ 0 <= I122 - 1 /\ 0 <= I123 - 1 /\ I128 + 1 <= I122] f1#(I134, I135, I136, I137, I138, I139) -> f2#(I140, I135, 1, I141, I142, I143) [0 <= I134 - 1 /\ 0 <= I135 - 1 /\ -1 <= I140 - 1] R = init(x1, x2, x3, x4, x5, x6) -> f1(rnd1, rnd2, rnd3, rnd4, rnd5, rnd6) f8(I0, I1, I2, I3, I4, I5) -> f7(I6, I2, I7, I8, I9, I10) [-1 <= I6 - 1 /\ -1 <= I3 - 1 /\ -1 <= I1 - 1 /\ 4 <= I0 - 1 /\ I6 <= I3 /\ I6 <= I1 /\ I6 + 4 <= I0] f7(I11, I12, I13, I14, I15, I16) -> f8(I17, I18, I12, I19, I20, I21) [-1 <= I19 - 1 /\ -1 <= I18 - 1 /\ 10 <= I17 - 1 /\ 0 <= I11 - 1 /\ I19 + 1 <= I11 /\ I18 + 1 <= I11] f7(I22, I23, I24, I25, I26, I27) -> f8(I28, I29, I23, I30, I31, I32) [-1 <= I30 - 1 /\ -1 <= I29 - 1 /\ 5 <= I28 - 1 /\ 3 <= I22 - 1 /\ I30 + 2 <= I22 /\ I29 + 2 <= I22 /\ I28 - 2 <= I22] f7(I33, I34, I35, I36, I37, I38) -> f3(I39, I40, I41, I42, I43, I44) [-1 <= I39 - 1 /\ 0 <= I33 - 1 /\ I39 + 1 <= I33] f3(I45, I46, I47, I48, I49, I50) -> f7(I51, I52, I53, I54, I55, I56) [-1 <= I51 - 1 /\ 0 <= I45 - 1 /\ I51 + 1 <= I45] f6(I57, I58, I59, I60, I61, I62) -> f6(I57, I58, I59 + 1, I60, I61, I63) [I58 - 1 <= I58 - 1 /\ -1 <= I58 - 1 /\ I58 - 1 <= I57 - 1 /\ I58 <= I57 - 1 /\ 1 <= I62 - 1 /\ 0 <= I57 - 1 /\ I59 <= I60 - 1 /\ 0 <= I60 - 1] f6(I64, I65, I66, I67, I68, I69) -> f6(I64, I65, I66 + 1, I67, I68, I69) [I65 - 1 <= I65 - 1 /\ -1 <= I65 - 1 /\ I65 - 1 <= I64 - 1 /\ I65 <= I64 - 1 /\ 1 <= I69 - 1 /\ 0 <= I64 - 1 /\ I66 <= I67 - 1 /\ 0 <= I67 - 1] f6(I70, I71, I72, I73, I74, I75) -> f2(I71 - 1, I74, I75, I76, I77, I78) [I71 - 1 <= I71 - 1 /\ -1 <= I71 - 1 /\ I71 - 1 <= I70 - 1 /\ I71 <= I70 - 1 /\ 1 <= I75 - 1 /\ 0 <= I70 - 1 /\ I72 <= I73 - 1 /\ 0 <= I73 - 1] f2(I79, I80, I81, I82, I83, I84) -> f6(I79, I79 - 1, 0, I85, I80, I81 + 1) [-1 <= I85 - 1 /\ I81 <= I80 - 1 /\ 0 <= I81 - 1 /\ 0 <= I79 - 1 /\ -1 <= I80 - 1] f4(I86, I87, I88, I89, I90, I91) -> f3(I92, I93, I94, I95, I96, I97) [0 <= y1 - 1 /\ 1 <= I88 - 1 /\ I92 <= I87 /\ 0 <= I86 - 1 /\ 0 <= I87 - 1 /\ 0 <= I92 - 1] f5(I98, I99, I100, I101, I102, I103) -> f4(I104, I105, I99, I106, I107, I108) [1 <= I105 - 1 /\ 0 <= I104 - 1 /\ 0 <= I98 - 1 /\ I105 - 1 <= I98 /\ I104 <= I98] f1(I109, I110, I111, I112, I113, I114) -> f4(I115, I116, I117, I118, I119, I120) [-1 <= I121 - 1 /\ 0 <= I110 - 1 /\ I115 <= I109 /\ 0 <= I109 - 1 /\ 0 <= I115 - 1 /\ 0 <= I116 - 1] f1(I122, I123, I124, I125, I126, I127) -> f3(I128, I129, I130, I131, I132, I133) [-1 <= I128 - 1 /\ 0 <= I122 - 1 /\ 0 <= I123 - 1 /\ I128 + 1 <= I122] f1(I134, I135, I136, I137, I138, I139) -> f2(I140, I135, 1, I141, I142, I143) [0 <= I134 - 1 /\ 0 <= I135 - 1 /\ -1 <= I140 - 1] The dependency graph for this problem is: 0 -> 12, 13, 14 1 -> 2, 3, 4 2 -> 1 3 -> 1 4 -> 5 5 -> 2, 3, 4 6 -> 6, 7, 8 7 -> 6, 7, 8 8 -> 9 9 -> 6, 7, 8 10 -> 5 11 -> 10 12 -> 10 13 -> 5 14 -> 9 Where: 0) init#(x1, x2, x3, x4, x5, x6) -> f1#(rnd1, rnd2, rnd3, rnd4, rnd5, rnd6) 1) f8#(I0, I1, I2, I3, I4, I5) -> f7#(I6, I2, I7, I8, I9, I10) [-1 <= I6 - 1 /\ -1 <= I3 - 1 /\ -1 <= I1 - 1 /\ 4 <= I0 - 1 /\ I6 <= I3 /\ I6 <= I1 /\ I6 + 4 <= I0] 2) f7#(I11, I12, I13, I14, I15, I16) -> f8#(I17, I18, I12, I19, I20, I21) [-1 <= I19 - 1 /\ -1 <= I18 - 1 /\ 10 <= I17 - 1 /\ 0 <= I11 - 1 /\ I19 + 1 <= I11 /\ I18 + 1 <= I11] 3) f7#(I22, I23, I24, I25, I26, I27) -> f8#(I28, I29, I23, I30, I31, I32) [-1 <= I30 - 1 /\ -1 <= I29 - 1 /\ 5 <= I28 - 1 /\ 3 <= I22 - 1 /\ I30 + 2 <= I22 /\ I29 + 2 <= I22 /\ I28 - 2 <= I22] 4) f7#(I33, I34, I35, I36, I37, I38) -> f3#(I39, I40, I41, I42, I43, I44) [-1 <= I39 - 1 /\ 0 <= I33 - 1 /\ I39 + 1 <= I33] 5) f3#(I45, I46, I47, I48, I49, I50) -> f7#(I51, I52, I53, I54, I55, I56) [-1 <= I51 - 1 /\ 0 <= I45 - 1 /\ I51 + 1 <= I45] 6) f6#(I57, I58, I59, I60, I61, I62) -> f6#(I57, I58, I59 + 1, I60, I61, I63) [I58 - 1 <= I58 - 1 /\ -1 <= I58 - 1 /\ I58 - 1 <= I57 - 1 /\ I58 <= I57 - 1 /\ 1 <= I62 - 1 /\ 0 <= I57 - 1 /\ I59 <= I60 - 1 /\ 0 <= I60 - 1] 7) f6#(I64, I65, I66, I67, I68, I69) -> f6#(I64, I65, I66 + 1, I67, I68, I69) [I65 - 1 <= I65 - 1 /\ -1 <= I65 - 1 /\ I65 - 1 <= I64 - 1 /\ I65 <= I64 - 1 /\ 1 <= I69 - 1 /\ 0 <= I64 - 1 /\ I66 <= I67 - 1 /\ 0 <= I67 - 1] 8) f6#(I70, I71, I72, I73, I74, I75) -> f2#(I71 - 1, I74, I75, I76, I77, I78) [I71 - 1 <= I71 - 1 /\ -1 <= I71 - 1 /\ I71 - 1 <= I70 - 1 /\ I71 <= I70 - 1 /\ 1 <= I75 - 1 /\ 0 <= I70 - 1 /\ I72 <= I73 - 1 /\ 0 <= I73 - 1] 9) f2#(I79, I80, I81, I82, I83, I84) -> f6#(I79, I79 - 1, 0, I85, I80, I81 + 1) [-1 <= I85 - 1 /\ I81 <= I80 - 1 /\ 0 <= I81 - 1 /\ 0 <= I79 - 1 /\ -1 <= I80 - 1] 10) f4#(I86, I87, I88, I89, I90, I91) -> f3#(I92, I93, I94, I95, I96, I97) [0 <= y1 - 1 /\ 1 <= I88 - 1 /\ I92 <= I87 /\ 0 <= I86 - 1 /\ 0 <= I87 - 1 /\ 0 <= I92 - 1] 11) f5#(I98, I99, I100, I101, I102, I103) -> f4#(I104, I105, I99, I106, I107, I108) [1 <= I105 - 1 /\ 0 <= I104 - 1 /\ 0 <= I98 - 1 /\ I105 - 1 <= I98 /\ I104 <= I98] 12) f1#(I109, I110, I111, I112, I113, I114) -> f4#(I115, I116, I117, I118, I119, I120) [-1 <= I121 - 1 /\ 0 <= I110 - 1 /\ I115 <= I109 /\ 0 <= I109 - 1 /\ 0 <= I115 - 1 /\ 0 <= I116 - 1] 13) f1#(I122, I123, I124, I125, I126, I127) -> f3#(I128, I129, I130, I131, I132, I133) [-1 <= I128 - 1 /\ 0 <= I122 - 1 /\ 0 <= I123 - 1 /\ I128 + 1 <= I122] 14) f1#(I134, I135, I136, I137, I138, I139) -> f2#(I140, I135, 1, I141, I142, I143) [0 <= I134 - 1 /\ 0 <= I135 - 1 /\ -1 <= I140 - 1] We have the following SCCs. { 1, 2, 3, 4, 5 } { 6, 7, 8, 9 } DP problem for innermost termination. P = f6#(I57, I58, I59, I60, I61, I62) -> f6#(I57, I58, I59 + 1, I60, I61, I63) [I58 - 1 <= I58 - 1 /\ -1 <= I58 - 1 /\ I58 - 1 <= I57 - 1 /\ I58 <= I57 - 1 /\ 1 <= I62 - 1 /\ 0 <= I57 - 1 /\ I59 <= I60 - 1 /\ 0 <= I60 - 1] f6#(I64, I65, I66, I67, I68, I69) -> f6#(I64, I65, I66 + 1, I67, I68, I69) [I65 - 1 <= I65 - 1 /\ -1 <= I65 - 1 /\ I65 - 1 <= I64 - 1 /\ I65 <= I64 - 1 /\ 1 <= I69 - 1 /\ 0 <= I64 - 1 /\ I66 <= I67 - 1 /\ 0 <= I67 - 1] f6#(I70, I71, I72, I73, I74, I75) -> f2#(I71 - 1, I74, I75, I76, I77, I78) [I71 - 1 <= I71 - 1 /\ -1 <= I71 - 1 /\ I71 - 1 <= I70 - 1 /\ I71 <= I70 - 1 /\ 1 <= I75 - 1 /\ 0 <= I70 - 1 /\ I72 <= I73 - 1 /\ 0 <= I73 - 1] f2#(I79, I80, I81, I82, I83, I84) -> f6#(I79, I79 - 1, 0, I85, I80, I81 + 1) [-1 <= I85 - 1 /\ I81 <= I80 - 1 /\ 0 <= I81 - 1 /\ 0 <= I79 - 1 /\ -1 <= I80 - 1] R = init(x1, x2, x3, x4, x5, x6) -> f1(rnd1, rnd2, rnd3, rnd4, rnd5, rnd6) f8(I0, I1, I2, I3, I4, I5) -> f7(I6, I2, I7, I8, I9, I10) [-1 <= I6 - 1 /\ -1 <= I3 - 1 /\ -1 <= I1 - 1 /\ 4 <= I0 - 1 /\ I6 <= I3 /\ I6 <= I1 /\ I6 + 4 <= I0] f7(I11, I12, I13, I14, I15, I16) -> f8(I17, I18, I12, I19, I20, I21) [-1 <= I19 - 1 /\ -1 <= I18 - 1 /\ 10 <= I17 - 1 /\ 0 <= I11 - 1 /\ I19 + 1 <= I11 /\ I18 + 1 <= I11] f7(I22, I23, I24, I25, I26, I27) -> f8(I28, I29, I23, I30, I31, I32) [-1 <= I30 - 1 /\ -1 <= I29 - 1 /\ 5 <= I28 - 1 /\ 3 <= I22 - 1 /\ I30 + 2 <= I22 /\ I29 + 2 <= I22 /\ I28 - 2 <= I22] f7(I33, I34, I35, I36, I37, I38) -> f3(I39, I40, I41, I42, I43, I44) [-1 <= I39 - 1 /\ 0 <= I33 - 1 /\ I39 + 1 <= I33] f3(I45, I46, I47, I48, I49, I50) -> f7(I51, I52, I53, I54, I55, I56) [-1 <= I51 - 1 /\ 0 <= I45 - 1 /\ I51 + 1 <= I45] f6(I57, I58, I59, I60, I61, I62) -> f6(I57, I58, I59 + 1, I60, I61, I63) [I58 - 1 <= I58 - 1 /\ -1 <= I58 - 1 /\ I58 - 1 <= I57 - 1 /\ I58 <= I57 - 1 /\ 1 <= I62 - 1 /\ 0 <= I57 - 1 /\ I59 <= I60 - 1 /\ 0 <= I60 - 1] f6(I64, I65, I66, I67, I68, I69) -> f6(I64, I65, I66 + 1, I67, I68, I69) [I65 - 1 <= I65 - 1 /\ -1 <= I65 - 1 /\ I65 - 1 <= I64 - 1 /\ I65 <= I64 - 1 /\ 1 <= I69 - 1 /\ 0 <= I64 - 1 /\ I66 <= I67 - 1 /\ 0 <= I67 - 1] f6(I70, I71, I72, I73, I74, I75) -> f2(I71 - 1, I74, I75, I76, I77, I78) [I71 - 1 <= I71 - 1 /\ -1 <= I71 - 1 /\ I71 - 1 <= I70 - 1 /\ I71 <= I70 - 1 /\ 1 <= I75 - 1 /\ 0 <= I70 - 1 /\ I72 <= I73 - 1 /\ 0 <= I73 - 1] f2(I79, I80, I81, I82, I83, I84) -> f6(I79, I79 - 1, 0, I85, I80, I81 + 1) [-1 <= I85 - 1 /\ I81 <= I80 - 1 /\ 0 <= I81 - 1 /\ 0 <= I79 - 1 /\ -1 <= I80 - 1] f4(I86, I87, I88, I89, I90, I91) -> f3(I92, I93, I94, I95, I96, I97) [0 <= y1 - 1 /\ 1 <= I88 - 1 /\ I92 <= I87 /\ 0 <= I86 - 1 /\ 0 <= I87 - 1 /\ 0 <= I92 - 1] f5(I98, I99, I100, I101, I102, I103) -> f4(I104, I105, I99, I106, I107, I108) [1 <= I105 - 1 /\ 0 <= I104 - 1 /\ 0 <= I98 - 1 /\ I105 - 1 <= I98 /\ I104 <= I98] f1(I109, I110, I111, I112, I113, I114) -> f4(I115, I116, I117, I118, I119, I120) [-1 <= I121 - 1 /\ 0 <= I110 - 1 /\ I115 <= I109 /\ 0 <= I109 - 1 /\ 0 <= I115 - 1 /\ 0 <= I116 - 1] f1(I122, I123, I124, I125, I126, I127) -> f3(I128, I129, I130, I131, I132, I133) [-1 <= I128 - 1 /\ 0 <= I122 - 1 /\ 0 <= I123 - 1 /\ I128 + 1 <= I122] f1(I134, I135, I136, I137, I138, I139) -> f2(I140, I135, 1, I141, I142, I143) [0 <= I134 - 1 /\ 0 <= I135 - 1 /\ -1 <= I140 - 1] We use the basic value criterion with the projection function NU: NU[f2#(z1,z2,z3,z4,z5,z6)] = z1 NU[f6#(z1,z2,z3,z4,z5,z6)] = z2 This gives the following inequalities: I58 - 1 <= I58 - 1 /\ -1 <= I58 - 1 /\ I58 - 1 <= I57 - 1 /\ I58 <= I57 - 1 /\ 1 <= I62 - 1 /\ 0 <= I57 - 1 /\ I59 <= I60 - 1 /\ 0 <= I60 - 1 ==> I58 (>! \union =) I58 I65 - 1 <= I65 - 1 /\ -1 <= I65 - 1 /\ I65 - 1 <= I64 - 1 /\ I65 <= I64 - 1 /\ 1 <= I69 - 1 /\ 0 <= I64 - 1 /\ I66 <= I67 - 1 /\ 0 <= I67 - 1 ==> I65 (>! \union =) I65 I71 - 1 <= I71 - 1 /\ -1 <= I71 - 1 /\ I71 - 1 <= I70 - 1 /\ I71 <= I70 - 1 /\ 1 <= I75 - 1 /\ 0 <= I70 - 1 /\ I72 <= I73 - 1 /\ 0 <= I73 - 1 ==> I71 >! I71 - 1 -1 <= I85 - 1 /\ I81 <= I80 - 1 /\ 0 <= I81 - 1 /\ 0 <= I79 - 1 /\ -1 <= I80 - 1 ==> I79 >! I79 - 1 We remove all the strictly oriented dependency pairs. DP problem for innermost termination. P = f6#(I57, I58, I59, I60, I61, I62) -> f6#(I57, I58, I59 + 1, I60, I61, I63) [I58 - 1 <= I58 - 1 /\ -1 <= I58 - 1 /\ I58 - 1 <= I57 - 1 /\ I58 <= I57 - 1 /\ 1 <= I62 - 1 /\ 0 <= I57 - 1 /\ I59 <= I60 - 1 /\ 0 <= I60 - 1] f6#(I64, I65, I66, I67, I68, I69) -> f6#(I64, I65, I66 + 1, I67, I68, I69) [I65 - 1 <= I65 - 1 /\ -1 <= I65 - 1 /\ I65 - 1 <= I64 - 1 /\ I65 <= I64 - 1 /\ 1 <= I69 - 1 /\ 0 <= I64 - 1 /\ I66 <= I67 - 1 /\ 0 <= I67 - 1] R = init(x1, x2, x3, x4, x5, x6) -> f1(rnd1, rnd2, rnd3, rnd4, rnd5, rnd6) f8(I0, I1, I2, I3, I4, I5) -> f7(I6, I2, I7, I8, I9, I10) [-1 <= I6 - 1 /\ -1 <= I3 - 1 /\ -1 <= I1 - 1 /\ 4 <= I0 - 1 /\ I6 <= I3 /\ I6 <= I1 /\ I6 + 4 <= I0] f7(I11, I12, I13, I14, I15, I16) -> f8(I17, I18, I12, I19, I20, I21) [-1 <= I19 - 1 /\ -1 <= I18 - 1 /\ 10 <= I17 - 1 /\ 0 <= I11 - 1 /\ I19 + 1 <= I11 /\ I18 + 1 <= I11] f7(I22, I23, I24, I25, I26, I27) -> f8(I28, I29, I23, I30, I31, I32) [-1 <= I30 - 1 /\ -1 <= I29 - 1 /\ 5 <= I28 - 1 /\ 3 <= I22 - 1 /\ I30 + 2 <= I22 /\ I29 + 2 <= I22 /\ I28 - 2 <= I22] f7(I33, I34, I35, I36, I37, I38) -> f3(I39, I40, I41, I42, I43, I44) [-1 <= I39 - 1 /\ 0 <= I33 - 1 /\ I39 + 1 <= I33] f3(I45, I46, I47, I48, I49, I50) -> f7(I51, I52, I53, I54, I55, I56) [-1 <= I51 - 1 /\ 0 <= I45 - 1 /\ I51 + 1 <= I45] f6(I57, I58, I59, I60, I61, I62) -> f6(I57, I58, I59 + 1, I60, I61, I63) [I58 - 1 <= I58 - 1 /\ -1 <= I58 - 1 /\ I58 - 1 <= I57 - 1 /\ I58 <= I57 - 1 /\ 1 <= I62 - 1 /\ 0 <= I57 - 1 /\ I59 <= I60 - 1 /\ 0 <= I60 - 1] f6(I64, I65, I66, I67, I68, I69) -> f6(I64, I65, I66 + 1, I67, I68, I69) [I65 - 1 <= I65 - 1 /\ -1 <= I65 - 1 /\ I65 - 1 <= I64 - 1 /\ I65 <= I64 - 1 /\ 1 <= I69 - 1 /\ 0 <= I64 - 1 /\ I66 <= I67 - 1 /\ 0 <= I67 - 1] f6(I70, I71, I72, I73, I74, I75) -> f2(I71 - 1, I74, I75, I76, I77, I78) [I71 - 1 <= I71 - 1 /\ -1 <= I71 - 1 /\ I71 - 1 <= I70 - 1 /\ I71 <= I70 - 1 /\ 1 <= I75 - 1 /\ 0 <= I70 - 1 /\ I72 <= I73 - 1 /\ 0 <= I73 - 1] f2(I79, I80, I81, I82, I83, I84) -> f6(I79, I79 - 1, 0, I85, I80, I81 + 1) [-1 <= I85 - 1 /\ I81 <= I80 - 1 /\ 0 <= I81 - 1 /\ 0 <= I79 - 1 /\ -1 <= I80 - 1] f4(I86, I87, I88, I89, I90, I91) -> f3(I92, I93, I94, I95, I96, I97) [0 <= y1 - 1 /\ 1 <= I88 - 1 /\ I92 <= I87 /\ 0 <= I86 - 1 /\ 0 <= I87 - 1 /\ 0 <= I92 - 1] f5(I98, I99, I100, I101, I102, I103) -> f4(I104, I105, I99, I106, I107, I108) [1 <= I105 - 1 /\ 0 <= I104 - 1 /\ 0 <= I98 - 1 /\ I105 - 1 <= I98 /\ I104 <= I98] f1(I109, I110, I111, I112, I113, I114) -> f4(I115, I116, I117, I118, I119, I120) [-1 <= I121 - 1 /\ 0 <= I110 - 1 /\ I115 <= I109 /\ 0 <= I109 - 1 /\ 0 <= I115 - 1 /\ 0 <= I116 - 1] f1(I122, I123, I124, I125, I126, I127) -> f3(I128, I129, I130, I131, I132, I133) [-1 <= I128 - 1 /\ 0 <= I122 - 1 /\ 0 <= I123 - 1 /\ I128 + 1 <= I122] f1(I134, I135, I136, I137, I138, I139) -> f2(I140, I135, 1, I141, I142, I143) [0 <= I134 - 1 /\ 0 <= I135 - 1 /\ -1 <= I140 - 1] We use the reverse value criterion with the projection function NU: NU[f6#(z1,z2,z3,z4,z5,z6)] = z4 - 1 + -1 * z3 This gives the following inequalities: I58 - 1 <= I58 - 1 /\ -1 <= I58 - 1 /\ I58 - 1 <= I57 - 1 /\ I58 <= I57 - 1 /\ 1 <= I62 - 1 /\ 0 <= I57 - 1 /\ I59 <= I60 - 1 /\ 0 <= I60 - 1 ==> I60 - 1 + -1 * I59 > I60 - 1 + -1 * (I59 + 1) with I60 - 1 + -1 * I59 >= 0 I65 - 1 <= I65 - 1 /\ -1 <= I65 - 1 /\ I65 - 1 <= I64 - 1 /\ I65 <= I64 - 1 /\ 1 <= I69 - 1 /\ 0 <= I64 - 1 /\ I66 <= I67 - 1 /\ 0 <= I67 - 1 ==> I67 - 1 + -1 * I66 > I67 - 1 + -1 * (I66 + 1) with I67 - 1 + -1 * I66 >= 0 All dependency pairs are strictly oriented, so the entire dependency pair problem may be removed. DP problem for innermost termination. P = f8#(I0, I1, I2, I3, I4, I5) -> f7#(I6, I2, I7, I8, I9, I10) [-1 <= I6 - 1 /\ -1 <= I3 - 1 /\ -1 <= I1 - 1 /\ 4 <= I0 - 1 /\ I6 <= I3 /\ I6 <= I1 /\ I6 + 4 <= I0] f7#(I11, I12, I13, I14, I15, I16) -> f8#(I17, I18, I12, I19, I20, I21) [-1 <= I19 - 1 /\ -1 <= I18 - 1 /\ 10 <= I17 - 1 /\ 0 <= I11 - 1 /\ I19 + 1 <= I11 /\ I18 + 1 <= I11] f7#(I22, I23, I24, I25, I26, I27) -> f8#(I28, I29, I23, I30, I31, I32) [-1 <= I30 - 1 /\ -1 <= I29 - 1 /\ 5 <= I28 - 1 /\ 3 <= I22 - 1 /\ I30 + 2 <= I22 /\ I29 + 2 <= I22 /\ I28 - 2 <= I22] f7#(I33, I34, I35, I36, I37, I38) -> f3#(I39, I40, I41, I42, I43, I44) [-1 <= I39 - 1 /\ 0 <= I33 - 1 /\ I39 + 1 <= I33] f3#(I45, I46, I47, I48, I49, I50) -> f7#(I51, I52, I53, I54, I55, I56) [-1 <= I51 - 1 /\ 0 <= I45 - 1 /\ I51 + 1 <= I45] R = init(x1, x2, x3, x4, x5, x6) -> f1(rnd1, rnd2, rnd3, rnd4, rnd5, rnd6) f8(I0, I1, I2, I3, I4, I5) -> f7(I6, I2, I7, I8, I9, I10) [-1 <= I6 - 1 /\ -1 <= I3 - 1 /\ -1 <= I1 - 1 /\ 4 <= I0 - 1 /\ I6 <= I3 /\ I6 <= I1 /\ I6 + 4 <= I0] f7(I11, I12, I13, I14, I15, I16) -> f8(I17, I18, I12, I19, I20, I21) [-1 <= I19 - 1 /\ -1 <= I18 - 1 /\ 10 <= I17 - 1 /\ 0 <= I11 - 1 /\ I19 + 1 <= I11 /\ I18 + 1 <= I11] f7(I22, I23, I24, I25, I26, I27) -> f8(I28, I29, I23, I30, I31, I32) [-1 <= I30 - 1 /\ -1 <= I29 - 1 /\ 5 <= I28 - 1 /\ 3 <= I22 - 1 /\ I30 + 2 <= I22 /\ I29 + 2 <= I22 /\ I28 - 2 <= I22] f7(I33, I34, I35, I36, I37, I38) -> f3(I39, I40, I41, I42, I43, I44) [-1 <= I39 - 1 /\ 0 <= I33 - 1 /\ I39 + 1 <= I33] f3(I45, I46, I47, I48, I49, I50) -> f7(I51, I52, I53, I54, I55, I56) [-1 <= I51 - 1 /\ 0 <= I45 - 1 /\ I51 + 1 <= I45] f6(I57, I58, I59, I60, I61, I62) -> f6(I57, I58, I59 + 1, I60, I61, I63) [I58 - 1 <= I58 - 1 /\ -1 <= I58 - 1 /\ I58 - 1 <= I57 - 1 /\ I58 <= I57 - 1 /\ 1 <= I62 - 1 /\ 0 <= I57 - 1 /\ I59 <= I60 - 1 /\ 0 <= I60 - 1] f6(I64, I65, I66, I67, I68, I69) -> f6(I64, I65, I66 + 1, I67, I68, I69) [I65 - 1 <= I65 - 1 /\ -1 <= I65 - 1 /\ I65 - 1 <= I64 - 1 /\ I65 <= I64 - 1 /\ 1 <= I69 - 1 /\ 0 <= I64 - 1 /\ I66 <= I67 - 1 /\ 0 <= I67 - 1] f6(I70, I71, I72, I73, I74, I75) -> f2(I71 - 1, I74, I75, I76, I77, I78) [I71 - 1 <= I71 - 1 /\ -1 <= I71 - 1 /\ I71 - 1 <= I70 - 1 /\ I71 <= I70 - 1 /\ 1 <= I75 - 1 /\ 0 <= I70 - 1 /\ I72 <= I73 - 1 /\ 0 <= I73 - 1] f2(I79, I80, I81, I82, I83, I84) -> f6(I79, I79 - 1, 0, I85, I80, I81 + 1) [-1 <= I85 - 1 /\ I81 <= I80 - 1 /\ 0 <= I81 - 1 /\ 0 <= I79 - 1 /\ -1 <= I80 - 1] f4(I86, I87, I88, I89, I90, I91) -> f3(I92, I93, I94, I95, I96, I97) [0 <= y1 - 1 /\ 1 <= I88 - 1 /\ I92 <= I87 /\ 0 <= I86 - 1 /\ 0 <= I87 - 1 /\ 0 <= I92 - 1] f5(I98, I99, I100, I101, I102, I103) -> f4(I104, I105, I99, I106, I107, I108) [1 <= I105 - 1 /\ 0 <= I104 - 1 /\ 0 <= I98 - 1 /\ I105 - 1 <= I98 /\ I104 <= I98] f1(I109, I110, I111, I112, I113, I114) -> f4(I115, I116, I117, I118, I119, I120) [-1 <= I121 - 1 /\ 0 <= I110 - 1 /\ I115 <= I109 /\ 0 <= I109 - 1 /\ 0 <= I115 - 1 /\ 0 <= I116 - 1] f1(I122, I123, I124, I125, I126, I127) -> f3(I128, I129, I130, I131, I132, I133) [-1 <= I128 - 1 /\ 0 <= I122 - 1 /\ 0 <= I123 - 1 /\ I128 + 1 <= I122] f1(I134, I135, I136, I137, I138, I139) -> f2(I140, I135, 1, I141, I142, I143) [0 <= I134 - 1 /\ 0 <= I135 - 1 /\ -1 <= I140 - 1] We use the basic value criterion with the projection function NU: NU[f3#(z1,z2,z3,z4,z5,z6)] = z1 NU[f7#(z1,z2,z3,z4,z5,z6)] = z1 NU[f8#(z1,z2,z3,z4,z5,z6)] = z4 This gives the following inequalities: -1 <= I6 - 1 /\ -1 <= I3 - 1 /\ -1 <= I1 - 1 /\ 4 <= I0 - 1 /\ I6 <= I3 /\ I6 <= I1 /\ I6 + 4 <= I0 ==> I3 (>! \union =) I6 -1 <= I19 - 1 /\ -1 <= I18 - 1 /\ 10 <= I17 - 1 /\ 0 <= I11 - 1 /\ I19 + 1 <= I11 /\ I18 + 1 <= I11 ==> I11 >! I19 -1 <= I30 - 1 /\ -1 <= I29 - 1 /\ 5 <= I28 - 1 /\ 3 <= I22 - 1 /\ I30 + 2 <= I22 /\ I29 + 2 <= I22 /\ I28 - 2 <= I22 ==> I22 >! I30 -1 <= I39 - 1 /\ 0 <= I33 - 1 /\ I39 + 1 <= I33 ==> I33 >! I39 -1 <= I51 - 1 /\ 0 <= I45 - 1 /\ I51 + 1 <= I45 ==> I45 >! I51 We remove all the strictly oriented dependency pairs. DP problem for innermost termination. P = f8#(I0, I1, I2, I3, I4, I5) -> f7#(I6, I2, I7, I8, I9, I10) [-1 <= I6 - 1 /\ -1 <= I3 - 1 /\ -1 <= I1 - 1 /\ 4 <= I0 - 1 /\ I6 <= I3 /\ I6 <= I1 /\ I6 + 4 <= I0] R = init(x1, x2, x3, x4, x5, x6) -> f1(rnd1, rnd2, rnd3, rnd4, rnd5, rnd6) f8(I0, I1, I2, I3, I4, I5) -> f7(I6, I2, I7, I8, I9, I10) [-1 <= I6 - 1 /\ -1 <= I3 - 1 /\ -1 <= I1 - 1 /\ 4 <= I0 - 1 /\ I6 <= I3 /\ I6 <= I1 /\ I6 + 4 <= I0] f7(I11, I12, I13, I14, I15, I16) -> f8(I17, I18, I12, I19, I20, I21) [-1 <= I19 - 1 /\ -1 <= I18 - 1 /\ 10 <= I17 - 1 /\ 0 <= I11 - 1 /\ I19 + 1 <= I11 /\ I18 + 1 <= I11] f7(I22, I23, I24, I25, I26, I27) -> f8(I28, I29, I23, I30, I31, I32) [-1 <= I30 - 1 /\ -1 <= I29 - 1 /\ 5 <= I28 - 1 /\ 3 <= I22 - 1 /\ I30 + 2 <= I22 /\ I29 + 2 <= I22 /\ I28 - 2 <= I22] f7(I33, I34, I35, I36, I37, I38) -> f3(I39, I40, I41, I42, I43, I44) [-1 <= I39 - 1 /\ 0 <= I33 - 1 /\ I39 + 1 <= I33] f3(I45, I46, I47, I48, I49, I50) -> f7(I51, I52, I53, I54, I55, I56) [-1 <= I51 - 1 /\ 0 <= I45 - 1 /\ I51 + 1 <= I45] f6(I57, I58, I59, I60, I61, I62) -> f6(I57, I58, I59 + 1, I60, I61, I63) [I58 - 1 <= I58 - 1 /\ -1 <= I58 - 1 /\ I58 - 1 <= I57 - 1 /\ I58 <= I57 - 1 /\ 1 <= I62 - 1 /\ 0 <= I57 - 1 /\ I59 <= I60 - 1 /\ 0 <= I60 - 1] f6(I64, I65, I66, I67, I68, I69) -> f6(I64, I65, I66 + 1, I67, I68, I69) [I65 - 1 <= I65 - 1 /\ -1 <= I65 - 1 /\ I65 - 1 <= I64 - 1 /\ I65 <= I64 - 1 /\ 1 <= I69 - 1 /\ 0 <= I64 - 1 /\ I66 <= I67 - 1 /\ 0 <= I67 - 1] f6(I70, I71, I72, I73, I74, I75) -> f2(I71 - 1, I74, I75, I76, I77, I78) [I71 - 1 <= I71 - 1 /\ -1 <= I71 - 1 /\ I71 - 1 <= I70 - 1 /\ I71 <= I70 - 1 /\ 1 <= I75 - 1 /\ 0 <= I70 - 1 /\ I72 <= I73 - 1 /\ 0 <= I73 - 1] f2(I79, I80, I81, I82, I83, I84) -> f6(I79, I79 - 1, 0, I85, I80, I81 + 1) [-1 <= I85 - 1 /\ I81 <= I80 - 1 /\ 0 <= I81 - 1 /\ 0 <= I79 - 1 /\ -1 <= I80 - 1] f4(I86, I87, I88, I89, I90, I91) -> f3(I92, I93, I94, I95, I96, I97) [0 <= y1 - 1 /\ 1 <= I88 - 1 /\ I92 <= I87 /\ 0 <= I86 - 1 /\ 0 <= I87 - 1 /\ 0 <= I92 - 1] f5(I98, I99, I100, I101, I102, I103) -> f4(I104, I105, I99, I106, I107, I108) [1 <= I105 - 1 /\ 0 <= I104 - 1 /\ 0 <= I98 - 1 /\ I105 - 1 <= I98 /\ I104 <= I98] f1(I109, I110, I111, I112, I113, I114) -> f4(I115, I116, I117, I118, I119, I120) [-1 <= I121 - 1 /\ 0 <= I110 - 1 /\ I115 <= I109 /\ 0 <= I109 - 1 /\ 0 <= I115 - 1 /\ 0 <= I116 - 1] f1(I122, I123, I124, I125, I126, I127) -> f3(I128, I129, I130, I131, I132, I133) [-1 <= I128 - 1 /\ 0 <= I122 - 1 /\ 0 <= I123 - 1 /\ I128 + 1 <= I122] f1(I134, I135, I136, I137, I138, I139) -> f2(I140, I135, 1, I141, I142, I143) [0 <= I134 - 1 /\ 0 <= I135 - 1 /\ -1 <= I140 - 1] The dependency graph for this problem is: 1 -> Where: 1) f8#(I0, I1, I2, I3, I4, I5) -> f7#(I6, I2, I7, I8, I9, I10) [-1 <= I6 - 1 /\ -1 <= I3 - 1 /\ -1 <= I1 - 1 /\ 4 <= I0 - 1 /\ I6 <= I3 /\ I6 <= I1 /\ I6 + 4 <= I0] We have the following SCCs.