97.69/96.00 YES 97.69/96.00 97.69/96.00 DP problem for innermost termination. 97.69/96.00 P = 97.69/96.00 f18#(x1, x2, x3, x4, x5, x6, x7) -> f17#(x1, x2, x3, x4, x5, x6, x7) 97.69/96.00 f17#(I0, I1, I2, I3, I4, I5, I6) -> f14#(15, 0, I2, 5, 0, I5, I6) 97.69/96.00 f3#(I7, I8, I9, I10, I11, I12, I13) -> f1#(I7, I8, I9, I10, I11, I12, I13) 97.69/96.00 f5#(I14, I15, I16, I17, I18, I19, I20) -> f6#(I14, I15, I16, I17, I18, I19, I20) 97.69/96.00 f8#(I21, I22, I23, I24, I25, I26, I27) -> f9#(I21, I22, I23, I24, I25, I26, I27) 97.69/96.00 f10#(I28, I29, I30, I31, I32, I33, I34) -> f11#(I28, I29, I30, I31, I32, I33, I34) 97.69/96.00 f15#(I35, I36, I37, I38, I39, I40, I41) -> f16#(I35, I36, I37, I38, I39, I40, I41) [1 + I36 <= I38] 97.69/96.00 f15#(I42, I43, I44, I45, I46, I47, I48) -> f10#(I42, 0, I44, I45, I46, I47, I48) [I45 <= I43] 97.69/96.00 f16#(I49, I50, I51, I52, I53, I54, I55) -> f13#(I49, I50, I51, I52, I53, I54, I55) [I53 <= I50 /\ I50 <= I53] 97.69/96.00 f16#(I56, I57, I58, I59, I60, I61, I62) -> f12#(I56, I57, I58, I59, I60, I61, I62) [1 + I57 <= I60] 97.69/96.00 f16#(I63, I64, I65, I66, I67, I68, I69) -> f12#(I63, I64, I65, I66, I67, I68, I69) [1 + I67 <= I64] 97.69/96.00 f13#(I70, I71, I72, I73, I74, I75, I76) -> f14#(I70, 1 + I71, I72, I73, I74, I75, I76) 97.69/96.00 f14#(I77, I78, I79, I80, I81, I82, I83) -> f15#(I77, I78, I79, I80, I81, I82, I83) 97.69/96.00 f12#(I84, I85, I86, I87, I88, I89, I90) -> f13#(I84, I85, I86, I87, I88, I89, I90) 97.69/96.00 f11#(I91, I92, I93, I94, I95, I96, I97) -> f8#(I91, I92, 0, I94, I95, I96, I97) [1 + I92 <= I94] 97.69/96.00 f11#(I98, I99, I100, I101, I102, I103, I104) -> f5#(I98, 0, I100, I101, I102, I103, I104) [I101 <= I99] 97.69/96.00 f9#(I105, I106, I107, I108, I109, I110, I111) -> f7#(I105, I106, I107, I108, I109, rnd6, rnd7) [rnd7 = rnd7 /\ rnd6 = rnd6 /\ 1 + I107 <= I105] 97.69/96.00 f9#(I112, I113, I114, I115, I116, I117, I118) -> f10#(I112, 1 + I113, I114, I115, I116, I117, I118) [I112 <= I114] 97.69/96.00 f7#(I119, I120, I121, I122, I123, I124, I125) -> f8#(I119, I120, 1 + I121, I122, I123, I124, I125) 97.69/96.00 f6#(I126, I127, I128, I129, I130, I131, I132) -> f4#(I126, I127, I128, I129, I130, I133, I134) [I134 = I134 /\ I133 = I133 /\ 1 + I127 <= I126] 97.69/96.00 f6#(I135, I136, I137, I138, I139, I140, I141) -> f3#(I135, 0, I137, I138, I139, I140, I141) [I135 <= I136] 97.69/96.00 f4#(I149, I150, I151, I152, I153, I154, I155) -> f5#(I149, 1 + I150, I151, I152, I153, I154, I155) 97.69/96.00 f1#(I156, I157, I158, I159, I160, I161, I162) -> f3#(I156, 1 + I157, I158, I159, I160, I161, I162) [1 + I157 <= I159] 97.69/96.00 R = 97.69/96.00 f18(x1, x2, x3, x4, x5, x6, x7) -> f17(x1, x2, x3, x4, x5, x6, x7) 97.69/96.00 f17(I0, I1, I2, I3, I4, I5, I6) -> f14(15, 0, I2, 5, 0, I5, I6) 97.69/96.00 f3(I7, I8, I9, I10, I11, I12, I13) -> f1(I7, I8, I9, I10, I11, I12, I13) 97.69/96.00 f5(I14, I15, I16, I17, I18, I19, I20) -> f6(I14, I15, I16, I17, I18, I19, I20) 97.69/96.00 f8(I21, I22, I23, I24, I25, I26, I27) -> f9(I21, I22, I23, I24, I25, I26, I27) 97.69/96.00 f10(I28, I29, I30, I31, I32, I33, I34) -> f11(I28, I29, I30, I31, I32, I33, I34) 97.69/96.00 f15(I35, I36, I37, I38, I39, I40, I41) -> f16(I35, I36, I37, I38, I39, I40, I41) [1 + I36 <= I38] 97.69/96.00 f15(I42, I43, I44, I45, I46, I47, I48) -> f10(I42, 0, I44, I45, I46, I47, I48) [I45 <= I43] 97.69/96.00 f16(I49, I50, I51, I52, I53, I54, I55) -> f13(I49, I50, I51, I52, I53, I54, I55) [I53 <= I50 /\ I50 <= I53] 97.69/96.00 f16(I56, I57, I58, I59, I60, I61, I62) -> f12(I56, I57, I58, I59, I60, I61, I62) [1 + I57 <= I60] 97.69/96.00 f16(I63, I64, I65, I66, I67, I68, I69) -> f12(I63, I64, I65, I66, I67, I68, I69) [1 + I67 <= I64] 97.69/96.00 f13(I70, I71, I72, I73, I74, I75, I76) -> f14(I70, 1 + I71, I72, I73, I74, I75, I76) 97.69/96.00 f14(I77, I78, I79, I80, I81, I82, I83) -> f15(I77, I78, I79, I80, I81, I82, I83) 97.69/96.00 f12(I84, I85, I86, I87, I88, I89, I90) -> f13(I84, I85, I86, I87, I88, I89, I90) 97.69/96.00 f11(I91, I92, I93, I94, I95, I96, I97) -> f8(I91, I92, 0, I94, I95, I96, I97) [1 + I92 <= I94] 97.69/96.00 f11(I98, I99, I100, I101, I102, I103, I104) -> f5(I98, 0, I100, I101, I102, I103, I104) [I101 <= I99] 97.69/96.00 f9(I105, I106, I107, I108, I109, I110, I111) -> f7(I105, I106, I107, I108, I109, rnd6, rnd7) [rnd7 = rnd7 /\ rnd6 = rnd6 /\ 1 + I107 <= I105] 97.69/96.00 f9(I112, I113, I114, I115, I116, I117, I118) -> f10(I112, 1 + I113, I114, I115, I116, I117, I118) [I112 <= I114] 97.69/96.00 f7(I119, I120, I121, I122, I123, I124, I125) -> f8(I119, I120, 1 + I121, I122, I123, I124, I125) 97.69/96.00 f6(I126, I127, I128, I129, I130, I131, I132) -> f4(I126, I127, I128, I129, I130, I133, I134) [I134 = I134 /\ I133 = I133 /\ 1 + I127 <= I126] 97.69/96.00 f6(I135, I136, I137, I138, I139, I140, I141) -> f3(I135, 0, I137, I138, I139, I140, I141) [I135 <= I136] 97.69/96.00 f4(I142, I143, I144, I145, I146, I147, I148) -> f2(I142, I143, I144, I145, I146, I147, I148) 97.69/96.00 f4(I149, I150, I151, I152, I153, I154, I155) -> f5(I149, 1 + I150, I151, I152, I153, I154, I155) 97.69/96.00 f1(I156, I157, I158, I159, I160, I161, I162) -> f3(I156, 1 + I157, I158, I159, I160, I161, I162) [1 + I157 <= I159] 97.69/96.00 f1(I163, I164, I165, I166, I167, I168, I169) -> f2(I163, I164, I165, I166, I167, I168, I169) [I166 <= I164] 97.69/96.00 97.69/96.00 The dependency graph for this problem is: 97.69/96.00 0 -> 1 97.69/96.00 1 -> 12 97.69/96.00 2 -> 22 97.69/96.00 3 -> 19, 20 97.69/96.00 4 -> 16, 17 97.69/96.00 5 -> 14, 15 97.69/96.00 6 -> 8, 9, 10 97.69/96.00 7 -> 5 97.69/96.00 8 -> 11 97.69/96.00 9 -> 13 97.69/96.00 10 -> 13 97.69/96.00 11 -> 12 97.69/96.00 12 -> 6, 7 97.69/96.00 13 -> 11 97.69/96.00 14 -> 4 97.69/96.00 15 -> 3 97.69/96.00 16 -> 18 97.69/96.00 17 -> 5 97.69/96.00 18 -> 4 97.69/96.00 19 -> 21 97.69/96.00 20 -> 2 97.69/96.00 21 -> 3 97.69/96.00 22 -> 2 97.69/96.00 Where: 97.69/96.00 0) f18#(x1, x2, x3, x4, x5, x6, x7) -> f17#(x1, x2, x3, x4, x5, x6, x7) 97.69/96.00 1) f17#(I0, I1, I2, I3, I4, I5, I6) -> f14#(15, 0, I2, 5, 0, I5, I6) 97.69/96.00 2) f3#(I7, I8, I9, I10, I11, I12, I13) -> f1#(I7, I8, I9, I10, I11, I12, I13) 97.69/96.00 3) f5#(I14, I15, I16, I17, I18, I19, I20) -> f6#(I14, I15, I16, I17, I18, I19, I20) 97.69/96.00 4) f8#(I21, I22, I23, I24, I25, I26, I27) -> f9#(I21, I22, I23, I24, I25, I26, I27) 97.69/96.00 5) f10#(I28, I29, I30, I31, I32, I33, I34) -> f11#(I28, I29, I30, I31, I32, I33, I34) 97.69/96.00 6) f15#(I35, I36, I37, I38, I39, I40, I41) -> f16#(I35, I36, I37, I38, I39, I40, I41) [1 + I36 <= I38] 97.69/96.00 7) f15#(I42, I43, I44, I45, I46, I47, I48) -> f10#(I42, 0, I44, I45, I46, I47, I48) [I45 <= I43] 97.69/96.00 8) f16#(I49, I50, I51, I52, I53, I54, I55) -> f13#(I49, I50, I51, I52, I53, I54, I55) [I53 <= I50 /\ I50 <= I53] 97.69/96.00 9) f16#(I56, I57, I58, I59, I60, I61, I62) -> f12#(I56, I57, I58, I59, I60, I61, I62) [1 + I57 <= I60] 97.69/96.00 10) f16#(I63, I64, I65, I66, I67, I68, I69) -> f12#(I63, I64, I65, I66, I67, I68, I69) [1 + I67 <= I64] 97.69/96.00 11) f13#(I70, I71, I72, I73, I74, I75, I76) -> f14#(I70, 1 + I71, I72, I73, I74, I75, I76) 97.69/96.00 12) f14#(I77, I78, I79, I80, I81, I82, I83) -> f15#(I77, I78, I79, I80, I81, I82, I83) 97.69/96.00 13) f12#(I84, I85, I86, I87, I88, I89, I90) -> f13#(I84, I85, I86, I87, I88, I89, I90) 97.69/96.00 14) f11#(I91, I92, I93, I94, I95, I96, I97) -> f8#(I91, I92, 0, I94, I95, I96, I97) [1 + I92 <= I94] 97.69/96.00 15) f11#(I98, I99, I100, I101, I102, I103, I104) -> f5#(I98, 0, I100, I101, I102, I103, I104) [I101 <= I99] 97.69/96.00 16) f9#(I105, I106, I107, I108, I109, I110, I111) -> f7#(I105, I106, I107, I108, I109, rnd6, rnd7) [rnd7 = rnd7 /\ rnd6 = rnd6 /\ 1 + I107 <= I105] 97.69/96.00 17) f9#(I112, I113, I114, I115, I116, I117, I118) -> f10#(I112, 1 + I113, I114, I115, I116, I117, I118) [I112 <= I114] 97.69/96.00 18) f7#(I119, I120, I121, I122, I123, I124, I125) -> f8#(I119, I120, 1 + I121, I122, I123, I124, I125) 97.69/96.00 19) f6#(I126, I127, I128, I129, I130, I131, I132) -> f4#(I126, I127, I128, I129, I130, I133, I134) [I134 = I134 /\ I133 = I133 /\ 1 + I127 <= I126] 97.69/96.00 20) f6#(I135, I136, I137, I138, I139, I140, I141) -> f3#(I135, 0, I137, I138, I139, I140, I141) [I135 <= I136] 97.69/96.00 21) f4#(I149, I150, I151, I152, I153, I154, I155) -> f5#(I149, 1 + I150, I151, I152, I153, I154, I155) 97.69/96.00 22) f1#(I156, I157, I158, I159, I160, I161, I162) -> f3#(I156, 1 + I157, I158, I159, I160, I161, I162) [1 + I157 <= I159] 97.69/96.00 97.69/96.00 We have the following SCCs. 97.69/96.00 { 6, 8, 9, 10, 11, 12, 13 } 97.69/96.00 { 4, 5, 14, 16, 17, 18 } 97.69/96.00 { 3, 19, 21 } 97.69/96.00 { 2, 22 } 97.69/96.00 97.69/96.00 DP problem for innermost termination. 97.69/96.00 P = 97.69/96.00 f3#(I7, I8, I9, I10, I11, I12, I13) -> f1#(I7, I8, I9, I10, I11, I12, I13) 97.69/96.00 f1#(I156, I157, I158, I159, I160, I161, I162) -> f3#(I156, 1 + I157, I158, I159, I160, I161, I162) [1 + I157 <= I159] 97.69/96.00 R = 97.69/96.00 f18(x1, x2, x3, x4, x5, x6, x7) -> f17(x1, x2, x3, x4, x5, x6, x7) 97.69/96.00 f17(I0, I1, I2, I3, I4, I5, I6) -> f14(15, 0, I2, 5, 0, I5, I6) 97.69/96.00 f3(I7, I8, I9, I10, I11, I12, I13) -> f1(I7, I8, I9, I10, I11, I12, I13) 97.69/96.00 f5(I14, I15, I16, I17, I18, I19, I20) -> f6(I14, I15, I16, I17, I18, I19, I20) 97.69/96.00 f8(I21, I22, I23, I24, I25, I26, I27) -> f9(I21, I22, I23, I24, I25, I26, I27) 97.69/96.00 f10(I28, I29, I30, I31, I32, I33, I34) -> f11(I28, I29, I30, I31, I32, I33, I34) 97.69/96.00 f15(I35, I36, I37, I38, I39, I40, I41) -> f16(I35, I36, I37, I38, I39, I40, I41) [1 + I36 <= I38] 97.69/96.00 f15(I42, I43, I44, I45, I46, I47, I48) -> f10(I42, 0, I44, I45, I46, I47, I48) [I45 <= I43] 97.69/96.00 f16(I49, I50, I51, I52, I53, I54, I55) -> f13(I49, I50, I51, I52, I53, I54, I55) [I53 <= I50 /\ I50 <= I53] 97.69/96.00 f16(I56, I57, I58, I59, I60, I61, I62) -> f12(I56, I57, I58, I59, I60, I61, I62) [1 + I57 <= I60] 97.69/96.00 f16(I63, I64, I65, I66, I67, I68, I69) -> f12(I63, I64, I65, I66, I67, I68, I69) [1 + I67 <= I64] 97.69/96.00 f13(I70, I71, I72, I73, I74, I75, I76) -> f14(I70, 1 + I71, I72, I73, I74, I75, I76) 97.69/96.00 f14(I77, I78, I79, I80, I81, I82, I83) -> f15(I77, I78, I79, I80, I81, I82, I83) 97.69/96.00 f12(I84, I85, I86, I87, I88, I89, I90) -> f13(I84, I85, I86, I87, I88, I89, I90) 97.69/96.00 f11(I91, I92, I93, I94, I95, I96, I97) -> f8(I91, I92, 0, I94, I95, I96, I97) [1 + I92 <= I94] 97.69/96.00 f11(I98, I99, I100, I101, I102, I103, I104) -> f5(I98, 0, I100, I101, I102, I103, I104) [I101 <= I99] 97.69/96.00 f9(I105, I106, I107, I108, I109, I110, I111) -> f7(I105, I106, I107, I108, I109, rnd6, rnd7) [rnd7 = rnd7 /\ rnd6 = rnd6 /\ 1 + I107 <= I105] 97.69/96.00 f9(I112, I113, I114, I115, I116, I117, I118) -> f10(I112, 1 + I113, I114, I115, I116, I117, I118) [I112 <= I114] 97.69/96.00 f7(I119, I120, I121, I122, I123, I124, I125) -> f8(I119, I120, 1 + I121, I122, I123, I124, I125) 97.69/96.00 f6(I126, I127, I128, I129, I130, I131, I132) -> f4(I126, I127, I128, I129, I130, I133, I134) [I134 = I134 /\ I133 = I133 /\ 1 + I127 <= I126] 97.69/96.00 f6(I135, I136, I137, I138, I139, I140, I141) -> f3(I135, 0, I137, I138, I139, I140, I141) [I135 <= I136] 97.69/96.00 f4(I142, I143, I144, I145, I146, I147, I148) -> f2(I142, I143, I144, I145, I146, I147, I148) 97.69/96.00 f4(I149, I150, I151, I152, I153, I154, I155) -> f5(I149, 1 + I150, I151, I152, I153, I154, I155) 97.69/96.00 f1(I156, I157, I158, I159, I160, I161, I162) -> f3(I156, 1 + I157, I158, I159, I160, I161, I162) [1 + I157 <= I159] 97.69/96.00 f1(I163, I164, I165, I166, I167, I168, I169) -> f2(I163, I164, I165, I166, I167, I168, I169) [I166 <= I164] 97.69/96.00 97.69/96.00 We use the reverse value criterion with the projection function NU: 97.69/96.00 NU[f1#(z1,z2,z3,z4,z5,z6,z7)] = z4 + -1 * (1 + z2) 97.69/96.00 NU[f3#(z1,z2,z3,z4,z5,z6,z7)] = z4 + -1 * (1 + z2) 97.69/96.00 97.69/96.00 This gives the following inequalities: 97.69/96.00 ==> I10 + -1 * (1 + I8) >= I10 + -1 * (1 + I8) 97.69/96.00 1 + I157 <= I159 ==> I159 + -1 * (1 + I157) > I159 + -1 * (1 + (1 + I157)) with I159 + -1 * (1 + I157) >= 0 97.69/96.00 97.69/96.00 We remove all the strictly oriented dependency pairs. 97.69/96.00 97.69/96.00 DP problem for innermost termination. 97.69/96.00 P = 97.69/96.00 f3#(I7, I8, I9, I10, I11, I12, I13) -> f1#(I7, I8, I9, I10, I11, I12, I13) 97.69/96.00 R = 97.69/96.00 f18(x1, x2, x3, x4, x5, x6, x7) -> f17(x1, x2, x3, x4, x5, x6, x7) 97.69/96.00 f17(I0, I1, I2, I3, I4, I5, I6) -> f14(15, 0, I2, 5, 0, I5, I6) 97.69/96.00 f3(I7, I8, I9, I10, I11, I12, I13) -> f1(I7, I8, I9, I10, I11, I12, I13) 97.69/96.00 f5(I14, I15, I16, I17, I18, I19, I20) -> f6(I14, I15, I16, I17, I18, I19, I20) 97.69/96.00 f8(I21, I22, I23, I24, I25, I26, I27) -> f9(I21, I22, I23, I24, I25, I26, I27) 97.69/96.00 f10(I28, I29, I30, I31, I32, I33, I34) -> f11(I28, I29, I30, I31, I32, I33, I34) 97.69/96.00 f15(I35, I36, I37, I38, I39, I40, I41) -> f16(I35, I36, I37, I38, I39, I40, I41) [1 + I36 <= I38] 97.69/96.00 f15(I42, I43, I44, I45, I46, I47, I48) -> f10(I42, 0, I44, I45, I46, I47, I48) [I45 <= I43] 97.69/96.00 f16(I49, I50, I51, I52, I53, I54, I55) -> f13(I49, I50, I51, I52, I53, I54, I55) [I53 <= I50 /\ I50 <= I53] 97.69/96.00 f16(I56, I57, I58, I59, I60, I61, I62) -> f12(I56, I57, I58, I59, I60, I61, I62) [1 + I57 <= I60] 97.69/96.00 f16(I63, I64, I65, I66, I67, I68, I69) -> f12(I63, I64, I65, I66, I67, I68, I69) [1 + I67 <= I64] 97.69/96.00 f13(I70, I71, I72, I73, I74, I75, I76) -> f14(I70, 1 + I71, I72, I73, I74, I75, I76) 97.69/96.00 f14(I77, I78, I79, I80, I81, I82, I83) -> f15(I77, I78, I79, I80, I81, I82, I83) 97.69/96.00 f12(I84, I85, I86, I87, I88, I89, I90) -> f13(I84, I85, I86, I87, I88, I89, I90) 97.69/96.00 f11(I91, I92, I93, I94, I95, I96, I97) -> f8(I91, I92, 0, I94, I95, I96, I97) [1 + I92 <= I94] 97.69/96.00 f11(I98, I99, I100, I101, I102, I103, I104) -> f5(I98, 0, I100, I101, I102, I103, I104) [I101 <= I99] 97.69/96.00 f9(I105, I106, I107, I108, I109, I110, I111) -> f7(I105, I106, I107, I108, I109, rnd6, rnd7) [rnd7 = rnd7 /\ rnd6 = rnd6 /\ 1 + I107 <= I105] 97.69/96.00 f9(I112, I113, I114, I115, I116, I117, I118) -> f10(I112, 1 + I113, I114, I115, I116, I117, I118) [I112 <= I114] 97.69/96.00 f7(I119, I120, I121, I122, I123, I124, I125) -> f8(I119, I120, 1 + I121, I122, I123, I124, I125) 97.69/96.00 f6(I126, I127, I128, I129, I130, I131, I132) -> f4(I126, I127, I128, I129, I130, I133, I134) [I134 = I134 /\ I133 = I133 /\ 1 + I127 <= I126] 97.69/96.00 f6(I135, I136, I137, I138, I139, I140, I141) -> f3(I135, 0, I137, I138, I139, I140, I141) [I135 <= I136] 97.69/96.00 f4(I142, I143, I144, I145, I146, I147, I148) -> f2(I142, I143, I144, I145, I146, I147, I148) 97.69/96.00 f4(I149, I150, I151, I152, I153, I154, I155) -> f5(I149, 1 + I150, I151, I152, I153, I154, I155) 97.69/96.00 f1(I156, I157, I158, I159, I160, I161, I162) -> f3(I156, 1 + I157, I158, I159, I160, I161, I162) [1 + I157 <= I159] 97.69/96.00 f1(I163, I164, I165, I166, I167, I168, I169) -> f2(I163, I164, I165, I166, I167, I168, I169) [I166 <= I164] 97.69/96.00 97.69/96.00 The dependency graph for this problem is: 97.69/96.00 2 -> 97.69/96.00 Where: 97.69/96.00 2) f3#(I7, I8, I9, I10, I11, I12, I13) -> f1#(I7, I8, I9, I10, I11, I12, I13) 97.69/96.00 97.69/96.00 We have the following SCCs. 97.69/96.00 97.69/96.00 97.69/96.00 DP problem for innermost termination. 97.69/96.00 P = 97.69/96.00 f5#(I14, I15, I16, I17, I18, I19, I20) -> f6#(I14, I15, I16, I17, I18, I19, I20) 97.69/96.00 f6#(I126, I127, I128, I129, I130, I131, I132) -> f4#(I126, I127, I128, I129, I130, I133, I134) [I134 = I134 /\ I133 = I133 /\ 1 + I127 <= I126] 97.69/96.00 f4#(I149, I150, I151, I152, I153, I154, I155) -> f5#(I149, 1 + I150, I151, I152, I153, I154, I155) 97.69/96.00 R = 97.69/96.00 f18(x1, x2, x3, x4, x5, x6, x7) -> f17(x1, x2, x3, x4, x5, x6, x7) 97.69/96.00 f17(I0, I1, I2, I3, I4, I5, I6) -> f14(15, 0, I2, 5, 0, I5, I6) 97.69/96.00 f3(I7, I8, I9, I10, I11, I12, I13) -> f1(I7, I8, I9, I10, I11, I12, I13) 97.69/96.00 f5(I14, I15, I16, I17, I18, I19, I20) -> f6(I14, I15, I16, I17, I18, I19, I20) 97.69/96.00 f8(I21, I22, I23, I24, I25, I26, I27) -> f9(I21, I22, I23, I24, I25, I26, I27) 97.69/96.00 f10(I28, I29, I30, I31, I32, I33, I34) -> f11(I28, I29, I30, I31, I32, I33, I34) 97.69/96.00 f15(I35, I36, I37, I38, I39, I40, I41) -> f16(I35, I36, I37, I38, I39, I40, I41) [1 + I36 <= I38] 97.69/96.00 f15(I42, I43, I44, I45, I46, I47, I48) -> f10(I42, 0, I44, I45, I46, I47, I48) [I45 <= I43] 97.69/96.00 f16(I49, I50, I51, I52, I53, I54, I55) -> f13(I49, I50, I51, I52, I53, I54, I55) [I53 <= I50 /\ I50 <= I53] 97.69/96.00 f16(I56, I57, I58, I59, I60, I61, I62) -> f12(I56, I57, I58, I59, I60, I61, I62) [1 + I57 <= I60] 97.69/96.00 f16(I63, I64, I65, I66, I67, I68, I69) -> f12(I63, I64, I65, I66, I67, I68, I69) [1 + I67 <= I64] 97.69/96.00 f13(I70, I71, I72, I73, I74, I75, I76) -> f14(I70, 1 + I71, I72, I73, I74, I75, I76) 97.69/96.00 f14(I77, I78, I79, I80, I81, I82, I83) -> f15(I77, I78, I79, I80, I81, I82, I83) 97.69/96.00 f12(I84, I85, I86, I87, I88, I89, I90) -> f13(I84, I85, I86, I87, I88, I89, I90) 97.69/96.00 f11(I91, I92, I93, I94, I95, I96, I97) -> f8(I91, I92, 0, I94, I95, I96, I97) [1 + I92 <= I94] 97.69/96.00 f11(I98, I99, I100, I101, I102, I103, I104) -> f5(I98, 0, I100, I101, I102, I103, I104) [I101 <= I99] 97.69/96.00 f9(I105, I106, I107, I108, I109, I110, I111) -> f7(I105, I106, I107, I108, I109, rnd6, rnd7) [rnd7 = rnd7 /\ rnd6 = rnd6 /\ 1 + I107 <= I105] 97.69/96.00 f9(I112, I113, I114, I115, I116, I117, I118) -> f10(I112, 1 + I113, I114, I115, I116, I117, I118) [I112 <= I114] 97.69/96.00 f7(I119, I120, I121, I122, I123, I124, I125) -> f8(I119, I120, 1 + I121, I122, I123, I124, I125) 97.69/96.00 f6(I126, I127, I128, I129, I130, I131, I132) -> f4(I126, I127, I128, I129, I130, I133, I134) [I134 = I134 /\ I133 = I133 /\ 1 + I127 <= I126] 97.69/96.00 f6(I135, I136, I137, I138, I139, I140, I141) -> f3(I135, 0, I137, I138, I139, I140, I141) [I135 <= I136] 97.69/96.00 f4(I142, I143, I144, I145, I146, I147, I148) -> f2(I142, I143, I144, I145, I146, I147, I148) 97.69/96.00 f4(I149, I150, I151, I152, I153, I154, I155) -> f5(I149, 1 + I150, I151, I152, I153, I154, I155) 97.69/96.00 f1(I156, I157, I158, I159, I160, I161, I162) -> f3(I156, 1 + I157, I158, I159, I160, I161, I162) [1 + I157 <= I159] 97.69/96.00 f1(I163, I164, I165, I166, I167, I168, I169) -> f2(I163, I164, I165, I166, I167, I168, I169) [I166 <= I164] 97.69/96.00 97.69/96.00 We use the extended value criterion with the projection function NU: 97.69/96.00 NU[f4#(x0,x1,x2,x3,x4,x5,x6)] = x0 - x1 - 2 97.69/96.00 NU[f6#(x0,x1,x2,x3,x4,x5,x6)] = x0 - x1 - 1 97.69/96.00 NU[f5#(x0,x1,x2,x3,x4,x5,x6)] = x0 - x1 - 1 97.69/96.00 97.69/96.00 This gives the following inequalities: 97.69/96.00 ==> I14 - I15 - 1 >= I14 - I15 - 1 97.69/96.00 I134 = I134 /\ I133 = I133 /\ 1 + I127 <= I126 ==> I126 - I127 - 1 > I126 - I127 - 2 with I126 - I127 - 1 >= 0 97.69/96.00 ==> I149 - I150 - 2 >= I149 - (1 + I150) - 1 97.69/96.00 97.69/96.00 We remove all the strictly oriented dependency pairs. 97.69/96.00 97.69/96.00 DP problem for innermost termination. 97.69/96.00 P = 97.69/96.00 f5#(I14, I15, I16, I17, I18, I19, I20) -> f6#(I14, I15, I16, I17, I18, I19, I20) 97.69/96.00 f4#(I149, I150, I151, I152, I153, I154, I155) -> f5#(I149, 1 + I150, I151, I152, I153, I154, I155) 97.69/96.00 R = 97.69/96.00 f18(x1, x2, x3, x4, x5, x6, x7) -> f17(x1, x2, x3, x4, x5, x6, x7) 97.69/96.00 f17(I0, I1, I2, I3, I4, I5, I6) -> f14(15, 0, I2, 5, 0, I5, I6) 97.69/96.00 f3(I7, I8, I9, I10, I11, I12, I13) -> f1(I7, I8, I9, I10, I11, I12, I13) 97.69/96.00 f5(I14, I15, I16, I17, I18, I19, I20) -> f6(I14, I15, I16, I17, I18, I19, I20) 97.69/96.00 f8(I21, I22, I23, I24, I25, I26, I27) -> f9(I21, I22, I23, I24, I25, I26, I27) 97.69/96.00 f10(I28, I29, I30, I31, I32, I33, I34) -> f11(I28, I29, I30, I31, I32, I33, I34) 97.69/96.00 f15(I35, I36, I37, I38, I39, I40, I41) -> f16(I35, I36, I37, I38, I39, I40, I41) [1 + I36 <= I38] 97.69/96.00 f15(I42, I43, I44, I45, I46, I47, I48) -> f10(I42, 0, I44, I45, I46, I47, I48) [I45 <= I43] 97.69/96.00 f16(I49, I50, I51, I52, I53, I54, I55) -> f13(I49, I50, I51, I52, I53, I54, I55) [I53 <= I50 /\ I50 <= I53] 97.69/96.00 f16(I56, I57, I58, I59, I60, I61, I62) -> f12(I56, I57, I58, I59, I60, I61, I62) [1 + I57 <= I60] 97.69/96.00 f16(I63, I64, I65, I66, I67, I68, I69) -> f12(I63, I64, I65, I66, I67, I68, I69) [1 + I67 <= I64] 97.69/96.00 f13(I70, I71, I72, I73, I74, I75, I76) -> f14(I70, 1 + I71, I72, I73, I74, I75, I76) 97.69/96.00 f14(I77, I78, I79, I80, I81, I82, I83) -> f15(I77, I78, I79, I80, I81, I82, I83) 97.69/96.00 f12(I84, I85, I86, I87, I88, I89, I90) -> f13(I84, I85, I86, I87, I88, I89, I90) 97.69/96.00 f11(I91, I92, I93, I94, I95, I96, I97) -> f8(I91, I92, 0, I94, I95, I96, I97) [1 + I92 <= I94] 97.69/96.00 f11(I98, I99, I100, I101, I102, I103, I104) -> f5(I98, 0, I100, I101, I102, I103, I104) [I101 <= I99] 97.69/96.00 f9(I105, I106, I107, I108, I109, I110, I111) -> f7(I105, I106, I107, I108, I109, rnd6, rnd7) [rnd7 = rnd7 /\ rnd6 = rnd6 /\ 1 + I107 <= I105] 97.69/96.00 f9(I112, I113, I114, I115, I116, I117, I118) -> f10(I112, 1 + I113, I114, I115, I116, I117, I118) [I112 <= I114] 97.69/96.00 f7(I119, I120, I121, I122, I123, I124, I125) -> f8(I119, I120, 1 + I121, I122, I123, I124, I125) 97.69/96.00 f6(I126, I127, I128, I129, I130, I131, I132) -> f4(I126, I127, I128, I129, I130, I133, I134) [I134 = I134 /\ I133 = I133 /\ 1 + I127 <= I126] 97.69/96.00 f6(I135, I136, I137, I138, I139, I140, I141) -> f3(I135, 0, I137, I138, I139, I140, I141) [I135 <= I136] 97.69/96.00 f4(I142, I143, I144, I145, I146, I147, I148) -> f2(I142, I143, I144, I145, I146, I147, I148) 97.69/96.00 f4(I149, I150, I151, I152, I153, I154, I155) -> f5(I149, 1 + I150, I151, I152, I153, I154, I155) 97.69/96.00 f1(I156, I157, I158, I159, I160, I161, I162) -> f3(I156, 1 + I157, I158, I159, I160, I161, I162) [1 + I157 <= I159] 97.69/96.00 f1(I163, I164, I165, I166, I167, I168, I169) -> f2(I163, I164, I165, I166, I167, I168, I169) [I166 <= I164] 97.69/96.00 97.69/96.00 The dependency graph for this problem is: 97.69/96.00 3 -> 97.69/96.00 21 -> 3 97.69/96.00 Where: 97.69/96.00 3) f5#(I14, I15, I16, I17, I18, I19, I20) -> f6#(I14, I15, I16, I17, I18, I19, I20) 97.69/96.00 21) f4#(I149, I150, I151, I152, I153, I154, I155) -> f5#(I149, 1 + I150, I151, I152, I153, I154, I155) 97.69/96.00 97.69/96.00 We have the following SCCs. 97.69/96.00 97.69/96.00 97.69/96.00 DP problem for innermost termination. 97.69/96.00 P = 97.69/96.00 f8#(I21, I22, I23, I24, I25, I26, I27) -> f9#(I21, I22, I23, I24, I25, I26, I27) 97.69/96.00 f10#(I28, I29, I30, I31, I32, I33, I34) -> f11#(I28, I29, I30, I31, I32, I33, I34) 97.69/96.00 f11#(I91, I92, I93, I94, I95, I96, I97) -> f8#(I91, I92, 0, I94, I95, I96, I97) [1 + I92 <= I94] 97.69/96.00 f9#(I105, I106, I107, I108, I109, I110, I111) -> f7#(I105, I106, I107, I108, I109, rnd6, rnd7) [rnd7 = rnd7 /\ rnd6 = rnd6 /\ 1 + I107 <= I105] 97.69/96.00 f9#(I112, I113, I114, I115, I116, I117, I118) -> f10#(I112, 1 + I113, I114, I115, I116, I117, I118) [I112 <= I114] 97.69/96.00 f7#(I119, I120, I121, I122, I123, I124, I125) -> f8#(I119, I120, 1 + I121, I122, I123, I124, I125) 97.69/96.00 R = 97.69/96.00 f18(x1, x2, x3, x4, x5, x6, x7) -> f17(x1, x2, x3, x4, x5, x6, x7) 97.69/96.00 f17(I0, I1, I2, I3, I4, I5, I6) -> f14(15, 0, I2, 5, 0, I5, I6) 97.69/96.00 f3(I7, I8, I9, I10, I11, I12, I13) -> f1(I7, I8, I9, I10, I11, I12, I13) 97.69/96.00 f5(I14, I15, I16, I17, I18, I19, I20) -> f6(I14, I15, I16, I17, I18, I19, I20) 97.69/96.00 f8(I21, I22, I23, I24, I25, I26, I27) -> f9(I21, I22, I23, I24, I25, I26, I27) 97.69/96.00 f10(I28, I29, I30, I31, I32, I33, I34) -> f11(I28, I29, I30, I31, I32, I33, I34) 97.69/96.00 f15(I35, I36, I37, I38, I39, I40, I41) -> f16(I35, I36, I37, I38, I39, I40, I41) [1 + I36 <= I38] 97.69/96.00 f15(I42, I43, I44, I45, I46, I47, I48) -> f10(I42, 0, I44, I45, I46, I47, I48) [I45 <= I43] 97.69/96.00 f16(I49, I50, I51, I52, I53, I54, I55) -> f13(I49, I50, I51, I52, I53, I54, I55) [I53 <= I50 /\ I50 <= I53] 97.69/96.00 f16(I56, I57, I58, I59, I60, I61, I62) -> f12(I56, I57, I58, I59, I60, I61, I62) [1 + I57 <= I60] 97.69/96.00 f16(I63, I64, I65, I66, I67, I68, I69) -> f12(I63, I64, I65, I66, I67, I68, I69) [1 + I67 <= I64] 97.69/96.00 f13(I70, I71, I72, I73, I74, I75, I76) -> f14(I70, 1 + I71, I72, I73, I74, I75, I76) 97.69/96.01 f14(I77, I78, I79, I80, I81, I82, I83) -> f15(I77, I78, I79, I80, I81, I82, I83) 97.69/96.01 f12(I84, I85, I86, I87, I88, I89, I90) -> f13(I84, I85, I86, I87, I88, I89, I90) 97.69/96.01 f11(I91, I92, I93, I94, I95, I96, I97) -> f8(I91, I92, 0, I94, I95, I96, I97) [1 + I92 <= I94] 97.69/96.01 f11(I98, I99, I100, I101, I102, I103, I104) -> f5(I98, 0, I100, I101, I102, I103, I104) [I101 <= I99] 97.69/96.01 f9(I105, I106, I107, I108, I109, I110, I111) -> f7(I105, I106, I107, I108, I109, rnd6, rnd7) [rnd7 = rnd7 /\ rnd6 = rnd6 /\ 1 + I107 <= I105] 97.69/96.01 f9(I112, I113, I114, I115, I116, I117, I118) -> f10(I112, 1 + I113, I114, I115, I116, I117, I118) [I112 <= I114] 97.69/96.01 f7(I119, I120, I121, I122, I123, I124, I125) -> f8(I119, I120, 1 + I121, I122, I123, I124, I125) 97.69/96.01 f6(I126, I127, I128, I129, I130, I131, I132) -> f4(I126, I127, I128, I129, I130, I133, I134) [I134 = I134 /\ I133 = I133 /\ 1 + I127 <= I126] 97.69/96.01 f6(I135, I136, I137, I138, I139, I140, I141) -> f3(I135, 0, I137, I138, I139, I140, I141) [I135 <= I136] 97.69/96.01 f4(I142, I143, I144, I145, I146, I147, I148) -> f2(I142, I143, I144, I145, I146, I147, I148) 97.69/96.01 f4(I149, I150, I151, I152, I153, I154, I155) -> f5(I149, 1 + I150, I151, I152, I153, I154, I155) 97.69/96.01 f1(I156, I157, I158, I159, I160, I161, I162) -> f3(I156, 1 + I157, I158, I159, I160, I161, I162) [1 + I157 <= I159] 97.69/96.01 f1(I163, I164, I165, I166, I167, I168, I169) -> f2(I163, I164, I165, I166, I167, I168, I169) [I166 <= I164] 97.69/96.01 97.69/96.01 We use the extended value criterion with the projection function NU: 97.69/96.01 NU[f7#(x0,x1,x2,x3,x4,x5,x6)] = -x1 + x3 - 2 97.69/96.01 NU[f11#(x0,x1,x2,x3,x4,x5,x6)] = -x1 + x3 - 1 97.69/96.01 NU[f10#(x0,x1,x2,x3,x4,x5,x6)] = -x1 + x3 - 1 97.69/96.01 NU[f9#(x0,x1,x2,x3,x4,x5,x6)] = -x1 + x3 - 2 97.69/96.01 NU[f8#(x0,x1,x2,x3,x4,x5,x6)] = -x1 + x3 - 2 97.69/96.01 97.69/96.01 This gives the following inequalities: 97.69/96.01 ==> -I22 + I24 - 2 >= -I22 + I24 - 2 97.69/96.01 ==> -I29 + I31 - 1 >= -I29 + I31 - 1 97.69/96.01 1 + I92 <= I94 ==> -I92 + I94 - 1 > -I92 + I94 - 2 with -I92 + I94 - 1 >= 0 97.69/96.01 rnd7 = rnd7 /\ rnd6 = rnd6 /\ 1 + I107 <= I105 ==> -I106 + I108 - 2 >= -I106 + I108 - 2 97.69/96.01 I112 <= I114 ==> -I113 + I115 - 2 >= -(1 + I113) + I115 - 1 97.69/96.01 ==> -I120 + I122 - 2 >= -I120 + I122 - 2 97.69/96.01 97.69/96.01 We remove all the strictly oriented dependency pairs. 97.69/96.01 97.69/96.01 DP problem for innermost termination. 97.69/96.01 P = 97.69/96.01 f8#(I21, I22, I23, I24, I25, I26, I27) -> f9#(I21, I22, I23, I24, I25, I26, I27) 97.69/96.01 f10#(I28, I29, I30, I31, I32, I33, I34) -> f11#(I28, I29, I30, I31, I32, I33, I34) 97.69/96.01 f9#(I105, I106, I107, I108, I109, I110, I111) -> f7#(I105, I106, I107, I108, I109, rnd6, rnd7) [rnd7 = rnd7 /\ rnd6 = rnd6 /\ 1 + I107 <= I105] 97.69/96.01 f9#(I112, I113, I114, I115, I116, I117, I118) -> f10#(I112, 1 + I113, I114, I115, I116, I117, I118) [I112 <= I114] 97.69/96.01 f7#(I119, I120, I121, I122, I123, I124, I125) -> f8#(I119, I120, 1 + I121, I122, I123, I124, I125) 97.69/96.01 R = 97.69/96.01 f18(x1, x2, x3, x4, x5, x6, x7) -> f17(x1, x2, x3, x4, x5, x6, x7) 97.69/96.01 f17(I0, I1, I2, I3, I4, I5, I6) -> f14(15, 0, I2, 5, 0, I5, I6) 97.69/96.01 f3(I7, I8, I9, I10, I11, I12, I13) -> f1(I7, I8, I9, I10, I11, I12, I13) 97.69/96.01 f5(I14, I15, I16, I17, I18, I19, I20) -> f6(I14, I15, I16, I17, I18, I19, I20) 97.69/96.01 f8(I21, I22, I23, I24, I25, I26, I27) -> f9(I21, I22, I23, I24, I25, I26, I27) 97.69/96.01 f10(I28, I29, I30, I31, I32, I33, I34) -> f11(I28, I29, I30, I31, I32, I33, I34) 97.69/96.01 f15(I35, I36, I37, I38, I39, I40, I41) -> f16(I35, I36, I37, I38, I39, I40, I41) [1 + I36 <= I38] 97.69/96.01 f15(I42, I43, I44, I45, I46, I47, I48) -> f10(I42, 0, I44, I45, I46, I47, I48) [I45 <= I43] 97.69/96.01 f16(I49, I50, I51, I52, I53, I54, I55) -> f13(I49, I50, I51, I52, I53, I54, I55) [I53 <= I50 /\ I50 <= I53] 97.69/96.01 f16(I56, I57, I58, I59, I60, I61, I62) -> f12(I56, I57, I58, I59, I60, I61, I62) [1 + I57 <= I60] 97.69/96.01 f16(I63, I64, I65, I66, I67, I68, I69) -> f12(I63, I64, I65, I66, I67, I68, I69) [1 + I67 <= I64] 97.69/96.01 f13(I70, I71, I72, I73, I74, I75, I76) -> f14(I70, 1 + I71, I72, I73, I74, I75, I76) 97.69/96.01 f14(I77, I78, I79, I80, I81, I82, I83) -> f15(I77, I78, I79, I80, I81, I82, I83) 97.69/96.01 f12(I84, I85, I86, I87, I88, I89, I90) -> f13(I84, I85, I86, I87, I88, I89, I90) 97.69/96.01 f11(I91, I92, I93, I94, I95, I96, I97) -> f8(I91, I92, 0, I94, I95, I96, I97) [1 + I92 <= I94] 97.69/96.01 f11(I98, I99, I100, I101, I102, I103, I104) -> f5(I98, 0, I100, I101, I102, I103, I104) [I101 <= I99] 97.69/96.01 f9(I105, I106, I107, I108, I109, I110, I111) -> f7(I105, I106, I107, I108, I109, rnd6, rnd7) [rnd7 = rnd7 /\ rnd6 = rnd6 /\ 1 + I107 <= I105] 97.69/96.01 f9(I112, I113, I114, I115, I116, I117, I118) -> f10(I112, 1 + I113, I114, I115, I116, I117, I118) [I112 <= I114] 97.69/96.01 f7(I119, I120, I121, I122, I123, I124, I125) -> f8(I119, I120, 1 + I121, I122, I123, I124, I125) 97.69/96.01 f6(I126, I127, I128, I129, I130, I131, I132) -> f4(I126, I127, I128, I129, I130, I133, I134) [I134 = I134 /\ I133 = I133 /\ 1 + I127 <= I126] 97.69/96.01 f6(I135, I136, I137, I138, I139, I140, I141) -> f3(I135, 0, I137, I138, I139, I140, I141) [I135 <= I136] 97.69/96.01 f4(I142, I143, I144, I145, I146, I147, I148) -> f2(I142, I143, I144, I145, I146, I147, I148) 97.69/96.01 f4(I149, I150, I151, I152, I153, I154, I155) -> f5(I149, 1 + I150, I151, I152, I153, I154, I155) 97.69/96.01 f1(I156, I157, I158, I159, I160, I161, I162) -> f3(I156, 1 + I157, I158, I159, I160, I161, I162) [1 + I157 <= I159] 97.69/96.01 f1(I163, I164, I165, I166, I167, I168, I169) -> f2(I163, I164, I165, I166, I167, I168, I169) [I166 <= I164] 97.69/96.01 97.69/96.01 The dependency graph for this problem is: 97.69/96.01 4 -> 16, 17 97.69/96.01 5 -> 97.69/96.01 16 -> 18 97.69/96.01 17 -> 5 97.69/96.01 18 -> 4 97.69/96.01 Where: 97.69/96.01 4) f8#(I21, I22, I23, I24, I25, I26, I27) -> f9#(I21, I22, I23, I24, I25, I26, I27) 97.69/96.01 5) f10#(I28, I29, I30, I31, I32, I33, I34) -> f11#(I28, I29, I30, I31, I32, I33, I34) 97.69/96.01 16) f9#(I105, I106, I107, I108, I109, I110, I111) -> f7#(I105, I106, I107, I108, I109, rnd6, rnd7) [rnd7 = rnd7 /\ rnd6 = rnd6 /\ 1 + I107 <= I105] 97.69/96.01 17) f9#(I112, I113, I114, I115, I116, I117, I118) -> f10#(I112, 1 + I113, I114, I115, I116, I117, I118) [I112 <= I114] 97.69/96.01 18) f7#(I119, I120, I121, I122, I123, I124, I125) -> f8#(I119, I120, 1 + I121, I122, I123, I124, I125) 97.69/96.01 97.69/96.01 We have the following SCCs. 97.69/96.01 { 4, 16, 18 } 97.69/96.01 97.69/96.01 DP problem for innermost termination. 97.69/96.01 P = 97.69/96.01 f8#(I21, I22, I23, I24, I25, I26, I27) -> f9#(I21, I22, I23, I24, I25, I26, I27) 97.69/96.01 f9#(I105, I106, I107, I108, I109, I110, I111) -> f7#(I105, I106, I107, I108, I109, rnd6, rnd7) [rnd7 = rnd7 /\ rnd6 = rnd6 /\ 1 + I107 <= I105] 97.69/96.01 f7#(I119, I120, I121, I122, I123, I124, I125) -> f8#(I119, I120, 1 + I121, I122, I123, I124, I125) 97.69/96.01 R = 97.69/96.01 f18(x1, x2, x3, x4, x5, x6, x7) -> f17(x1, x2, x3, x4, x5, x6, x7) 97.69/96.01 f17(I0, I1, I2, I3, I4, I5, I6) -> f14(15, 0, I2, 5, 0, I5, I6) 97.69/96.01 f3(I7, I8, I9, I10, I11, I12, I13) -> f1(I7, I8, I9, I10, I11, I12, I13) 97.69/96.01 f5(I14, I15, I16, I17, I18, I19, I20) -> f6(I14, I15, I16, I17, I18, I19, I20) 97.69/96.01 f8(I21, I22, I23, I24, I25, I26, I27) -> f9(I21, I22, I23, I24, I25, I26, I27) 97.69/96.01 f10(I28, I29, I30, I31, I32, I33, I34) -> f11(I28, I29, I30, I31, I32, I33, I34) 97.69/96.01 f15(I35, I36, I37, I38, I39, I40, I41) -> f16(I35, I36, I37, I38, I39, I40, I41) [1 + I36 <= I38] 97.69/96.01 f15(I42, I43, I44, I45, I46, I47, I48) -> f10(I42, 0, I44, I45, I46, I47, I48) [I45 <= I43] 97.69/96.01 f16(I49, I50, I51, I52, I53, I54, I55) -> f13(I49, I50, I51, I52, I53, I54, I55) [I53 <= I50 /\ I50 <= I53] 97.69/96.01 f16(I56, I57, I58, I59, I60, I61, I62) -> f12(I56, I57, I58, I59, I60, I61, I62) [1 + I57 <= I60] 97.69/96.01 f16(I63, I64, I65, I66, I67, I68, I69) -> f12(I63, I64, I65, I66, I67, I68, I69) [1 + I67 <= I64] 97.69/96.01 f13(I70, I71, I72, I73, I74, I75, I76) -> f14(I70, 1 + I71, I72, I73, I74, I75, I76) 97.69/96.01 f14(I77, I78, I79, I80, I81, I82, I83) -> f15(I77, I78, I79, I80, I81, I82, I83) 97.69/96.01 f12(I84, I85, I86, I87, I88, I89, I90) -> f13(I84, I85, I86, I87, I88, I89, I90) 97.69/96.01 f11(I91, I92, I93, I94, I95, I96, I97) -> f8(I91, I92, 0, I94, I95, I96, I97) [1 + I92 <= I94] 97.69/96.01 f11(I98, I99, I100, I101, I102, I103, I104) -> f5(I98, 0, I100, I101, I102, I103, I104) [I101 <= I99] 97.69/96.01 f9(I105, I106, I107, I108, I109, I110, I111) -> f7(I105, I106, I107, I108, I109, rnd6, rnd7) [rnd7 = rnd7 /\ rnd6 = rnd6 /\ 1 + I107 <= I105] 97.69/96.01 f9(I112, I113, I114, I115, I116, I117, I118) -> f10(I112, 1 + I113, I114, I115, I116, I117, I118) [I112 <= I114] 97.69/96.01 f7(I119, I120, I121, I122, I123, I124, I125) -> f8(I119, I120, 1 + I121, I122, I123, I124, I125) 97.69/96.01 f6(I126, I127, I128, I129, I130, I131, I132) -> f4(I126, I127, I128, I129, I130, I133, I134) [I134 = I134 /\ I133 = I133 /\ 1 + I127 <= I126] 97.69/96.01 f6(I135, I136, I137, I138, I139, I140, I141) -> f3(I135, 0, I137, I138, I139, I140, I141) [I135 <= I136] 97.69/96.01 f4(I142, I143, I144, I145, I146, I147, I148) -> f2(I142, I143, I144, I145, I146, I147, I148) 97.69/96.01 f4(I149, I150, I151, I152, I153, I154, I155) -> f5(I149, 1 + I150, I151, I152, I153, I154, I155) 97.69/96.01 f1(I156, I157, I158, I159, I160, I161, I162) -> f3(I156, 1 + I157, I158, I159, I160, I161, I162) [1 + I157 <= I159] 97.69/96.01 f1(I163, I164, I165, I166, I167, I168, I169) -> f2(I163, I164, I165, I166, I167, I168, I169) [I166 <= I164] 97.69/96.01 97.69/96.01 We use the extended value criterion with the projection function NU: 97.69/96.01 NU[f7#(x0,x1,x2,x3,x4,x5,x6)] = x0 - x2 - 2 97.69/96.01 NU[f9#(x0,x1,x2,x3,x4,x5,x6)] = x0 - x2 - 1 97.69/96.01 NU[f8#(x0,x1,x2,x3,x4,x5,x6)] = x0 - x2 - 1 97.69/96.01 97.69/96.01 This gives the following inequalities: 97.69/96.01 ==> I21 - I23 - 1 >= I21 - I23 - 1 97.69/96.01 rnd7 = rnd7 /\ rnd6 = rnd6 /\ 1 + I107 <= I105 ==> I105 - I107 - 1 > I105 - I107 - 2 with I105 - I107 - 1 >= 0 97.69/96.01 ==> I119 - I121 - 2 >= I119 - (1 + I121) - 1 97.69/96.01 97.69/96.01 We remove all the strictly oriented dependency pairs. 97.69/96.01 97.69/96.01 DP problem for innermost termination. 97.69/96.01 P = 97.69/96.01 f8#(I21, I22, I23, I24, I25, I26, I27) -> f9#(I21, I22, I23, I24, I25, I26, I27) 97.69/96.01 f7#(I119, I120, I121, I122, I123, I124, I125) -> f8#(I119, I120, 1 + I121, I122, I123, I124, I125) 97.69/96.01 R = 97.69/96.01 f18(x1, x2, x3, x4, x5, x6, x7) -> f17(x1, x2, x3, x4, x5, x6, x7) 97.69/96.01 f17(I0, I1, I2, I3, I4, I5, I6) -> f14(15, 0, I2, 5, 0, I5, I6) 97.69/96.01 f3(I7, I8, I9, I10, I11, I12, I13) -> f1(I7, I8, I9, I10, I11, I12, I13) 97.69/96.01 f5(I14, I15, I16, I17, I18, I19, I20) -> f6(I14, I15, I16, I17, I18, I19, I20) 97.69/96.01 f8(I21, I22, I23, I24, I25, I26, I27) -> f9(I21, I22, I23, I24, I25, I26, I27) 97.69/96.01 f10(I28, I29, I30, I31, I32, I33, I34) -> f11(I28, I29, I30, I31, I32, I33, I34) 97.69/96.01 f15(I35, I36, I37, I38, I39, I40, I41) -> f16(I35, I36, I37, I38, I39, I40, I41) [1 + I36 <= I38] 97.69/96.01 f15(I42, I43, I44, I45, I46, I47, I48) -> f10(I42, 0, I44, I45, I46, I47, I48) [I45 <= I43] 97.69/96.01 f16(I49, I50, I51, I52, I53, I54, I55) -> f13(I49, I50, I51, I52, I53, I54, I55) [I53 <= I50 /\ I50 <= I53] 97.69/96.01 f16(I56, I57, I58, I59, I60, I61, I62) -> f12(I56, I57, I58, I59, I60, I61, I62) [1 + I57 <= I60] 97.69/96.01 f16(I63, I64, I65, I66, I67, I68, I69) -> f12(I63, I64, I65, I66, I67, I68, I69) [1 + I67 <= I64] 97.69/96.01 f13(I70, I71, I72, I73, I74, I75, I76) -> f14(I70, 1 + I71, I72, I73, I74, I75, I76) 97.69/96.01 f14(I77, I78, I79, I80, I81, I82, I83) -> f15(I77, I78, I79, I80, I81, I82, I83) 97.69/96.01 f12(I84, I85, I86, I87, I88, I89, I90) -> f13(I84, I85, I86, I87, I88, I89, I90) 97.69/96.01 f11(I91, I92, I93, I94, I95, I96, I97) -> f8(I91, I92, 0, I94, I95, I96, I97) [1 + I92 <= I94] 97.69/96.01 f11(I98, I99, I100, I101, I102, I103, I104) -> f5(I98, 0, I100, I101, I102, I103, I104) [I101 <= I99] 97.69/96.01 f9(I105, I106, I107, I108, I109, I110, I111) -> f7(I105, I106, I107, I108, I109, rnd6, rnd7) [rnd7 = rnd7 /\ rnd6 = rnd6 /\ 1 + I107 <= I105] 97.69/96.01 f9(I112, I113, I114, I115, I116, I117, I118) -> f10(I112, 1 + I113, I114, I115, I116, I117, I118) [I112 <= I114] 97.69/96.01 f7(I119, I120, I121, I122, I123, I124, I125) -> f8(I119, I120, 1 + I121, I122, I123, I124, I125) 97.69/96.01 f6(I126, I127, I128, I129, I130, I131, I132) -> f4(I126, I127, I128, I129, I130, I133, I134) [I134 = I134 /\ I133 = I133 /\ 1 + I127 <= I126] 97.69/96.01 f6(I135, I136, I137, I138, I139, I140, I141) -> f3(I135, 0, I137, I138, I139, I140, I141) [I135 <= I136] 97.69/96.01 f4(I142, I143, I144, I145, I146, I147, I148) -> f2(I142, I143, I144, I145, I146, I147, I148) 97.69/96.01 f4(I149, I150, I151, I152, I153, I154, I155) -> f5(I149, 1 + I150, I151, I152, I153, I154, I155) 97.69/96.01 f1(I156, I157, I158, I159, I160, I161, I162) -> f3(I156, 1 + I157, I158, I159, I160, I161, I162) [1 + I157 <= I159] 97.69/96.01 f1(I163, I164, I165, I166, I167, I168, I169) -> f2(I163, I164, I165, I166, I167, I168, I169) [I166 <= I164] 97.69/96.01 97.69/96.01 The dependency graph for this problem is: 97.69/96.01 4 -> 97.69/96.01 18 -> 4 97.69/96.01 Where: 97.69/96.01 4) f8#(I21, I22, I23, I24, I25, I26, I27) -> f9#(I21, I22, I23, I24, I25, I26, I27) 97.69/96.01 18) f7#(I119, I120, I121, I122, I123, I124, I125) -> f8#(I119, I120, 1 + I121, I122, I123, I124, I125) 97.69/96.01 97.69/96.01 We have the following SCCs. 97.69/96.01 97.69/96.01 97.69/96.01 DP problem for innermost termination. 97.69/96.01 P = 97.69/96.01 f15#(I35, I36, I37, I38, I39, I40, I41) -> f16#(I35, I36, I37, I38, I39, I40, I41) [1 + I36 <= I38] 97.69/96.01 f16#(I49, I50, I51, I52, I53, I54, I55) -> f13#(I49, I50, I51, I52, I53, I54, I55) [I53 <= I50 /\ I50 <= I53] 97.69/96.01 f16#(I56, I57, I58, I59, I60, I61, I62) -> f12#(I56, I57, I58, I59, I60, I61, I62) [1 + I57 <= I60] 97.69/96.01 f16#(I63, I64, I65, I66, I67, I68, I69) -> f12#(I63, I64, I65, I66, I67, I68, I69) [1 + I67 <= I64] 97.69/96.01 f13#(I70, I71, I72, I73, I74, I75, I76) -> f14#(I70, 1 + I71, I72, I73, I74, I75, I76) 97.69/96.01 f14#(I77, I78, I79, I80, I81, I82, I83) -> f15#(I77, I78, I79, I80, I81, I82, I83) 97.69/96.01 f12#(I84, I85, I86, I87, I88, I89, I90) -> f13#(I84, I85, I86, I87, I88, I89, I90) 97.69/96.01 R = 97.69/96.01 f18(x1, x2, x3, x4, x5, x6, x7) -> f17(x1, x2, x3, x4, x5, x6, x7) 97.69/96.01 f17(I0, I1, I2, I3, I4, I5, I6) -> f14(15, 0, I2, 5, 0, I5, I6) 97.69/96.01 f3(I7, I8, I9, I10, I11, I12, I13) -> f1(I7, I8, I9, I10, I11, I12, I13) 97.69/96.01 f5(I14, I15, I16, I17, I18, I19, I20) -> f6(I14, I15, I16, I17, I18, I19, I20) 97.69/96.01 f8(I21, I22, I23, I24, I25, I26, I27) -> f9(I21, I22, I23, I24, I25, I26, I27) 97.69/96.01 f10(I28, I29, I30, I31, I32, I33, I34) -> f11(I28, I29, I30, I31, I32, I33, I34) 97.69/96.01 f15(I35, I36, I37, I38, I39, I40, I41) -> f16(I35, I36, I37, I38, I39, I40, I41) [1 + I36 <= I38] 97.69/96.01 f15(I42, I43, I44, I45, I46, I47, I48) -> f10(I42, 0, I44, I45, I46, I47, I48) [I45 <= I43] 97.69/96.01 f16(I49, I50, I51, I52, I53, I54, I55) -> f13(I49, I50, I51, I52, I53, I54, I55) [I53 <= I50 /\ I50 <= I53] 97.69/96.01 f16(I56, I57, I58, I59, I60, I61, I62) -> f12(I56, I57, I58, I59, I60, I61, I62) [1 + I57 <= I60] 97.69/96.01 f16(I63, I64, I65, I66, I67, I68, I69) -> f12(I63, I64, I65, I66, I67, I68, I69) [1 + I67 <= I64] 97.69/96.01 f13(I70, I71, I72, I73, I74, I75, I76) -> f14(I70, 1 + I71, I72, I73, I74, I75, I76) 97.69/96.01 f14(I77, I78, I79, I80, I81, I82, I83) -> f15(I77, I78, I79, I80, I81, I82, I83) 97.69/96.01 f12(I84, I85, I86, I87, I88, I89, I90) -> f13(I84, I85, I86, I87, I88, I89, I90) 97.69/96.01 f11(I91, I92, I93, I94, I95, I96, I97) -> f8(I91, I92, 0, I94, I95, I96, I97) [1 + I92 <= I94] 97.69/96.01 f11(I98, I99, I100, I101, I102, I103, I104) -> f5(I98, 0, I100, I101, I102, I103, I104) [I101 <= I99] 97.69/96.01 f9(I105, I106, I107, I108, I109, I110, I111) -> f7(I105, I106, I107, I108, I109, rnd6, rnd7) [rnd7 = rnd7 /\ rnd6 = rnd6 /\ 1 + I107 <= I105] 97.69/96.01 f9(I112, I113, I114, I115, I116, I117, I118) -> f10(I112, 1 + I113, I114, I115, I116, I117, I118) [I112 <= I114] 97.69/96.01 f7(I119, I120, I121, I122, I123, I124, I125) -> f8(I119, I120, 1 + I121, I122, I123, I124, I125) 97.69/96.01 f6(I126, I127, I128, I129, I130, I131, I132) -> f4(I126, I127, I128, I129, I130, I133, I134) [I134 = I134 /\ I133 = I133 /\ 1 + I127 <= I126] 97.69/96.01 f6(I135, I136, I137, I138, I139, I140, I141) -> f3(I135, 0, I137, I138, I139, I140, I141) [I135 <= I136] 97.69/96.01 f4(I142, I143, I144, I145, I146, I147, I148) -> f2(I142, I143, I144, I145, I146, I147, I148) 97.69/96.01 f4(I149, I150, I151, I152, I153, I154, I155) -> f5(I149, 1 + I150, I151, I152, I153, I154, I155) 97.69/96.01 f1(I156, I157, I158, I159, I160, I161, I162) -> f3(I156, 1 + I157, I158, I159, I160, I161, I162) [1 + I157 <= I159] 97.69/96.01 f1(I163, I164, I165, I166, I167, I168, I169) -> f2(I163, I164, I165, I166, I167, I168, I169) [I166 <= I164] 97.69/96.01 97.69/96.01 We use the extended value criterion with the projection function NU: 97.69/96.01 NU[f14#(x0,x1,x2,x3,x4,x5,x6)] = -x1 + x4 97.69/96.01 NU[f12#(x0,x1,x2,x3,x4,x5,x6)] = -x1 + x4 - 1 97.69/96.01 NU[f13#(x0,x1,x2,x3,x4,x5,x6)] = -x1 + x4 - 1 97.69/96.01 NU[f16#(x0,x1,x2,x3,x4,x5,x6)] = -x1 + x4 97.69/96.01 NU[f15#(x0,x1,x2,x3,x4,x5,x6)] = -x1 + x4 97.69/96.01 97.69/96.01 This gives the following inequalities: 97.69/96.01 1 + I36 <= I38 ==> -I36 + I39 >= -I36 + I39 97.69/96.01 I53 <= I50 /\ I50 <= I53 ==> -I50 + I53 > -I50 + I53 - 1 with -I50 + I53 >= 0 97.69/96.01 1 + I57 <= I60 ==> -I57 + I60 > -I57 + I60 - 1 with -I57 + I60 >= 0 97.69/96.01 1 + I67 <= I64 ==> -I64 + I67 >= -I64 + I67 - 1 97.69/96.01 ==> -I71 + I74 - 1 >= -(1 + I71) + I74 97.69/96.01 ==> -I78 + I81 >= -I78 + I81 97.69/96.01 ==> -I85 + I88 - 1 >= -I85 + I88 - 1 97.69/96.01 97.69/96.01 We remove all the strictly oriented dependency pairs. 97.69/96.01 97.69/96.01 DP problem for innermost termination. 97.69/96.01 P = 97.69/96.01 f15#(I35, I36, I37, I38, I39, I40, I41) -> f16#(I35, I36, I37, I38, I39, I40, I41) [1 + I36 <= I38] 97.69/96.01 f16#(I63, I64, I65, I66, I67, I68, I69) -> f12#(I63, I64, I65, I66, I67, I68, I69) [1 + I67 <= I64] 97.69/96.01 f13#(I70, I71, I72, I73, I74, I75, I76) -> f14#(I70, 1 + I71, I72, I73, I74, I75, I76) 97.69/96.01 f14#(I77, I78, I79, I80, I81, I82, I83) -> f15#(I77, I78, I79, I80, I81, I82, I83) 97.69/96.01 f12#(I84, I85, I86, I87, I88, I89, I90) -> f13#(I84, I85, I86, I87, I88, I89, I90) 97.69/96.01 R = 97.69/96.01 f18(x1, x2, x3, x4, x5, x6, x7) -> f17(x1, x2, x3, x4, x5, x6, x7) 97.69/96.01 f17(I0, I1, I2, I3, I4, I5, I6) -> f14(15, 0, I2, 5, 0, I5, I6) 97.69/96.01 f3(I7, I8, I9, I10, I11, I12, I13) -> f1(I7, I8, I9, I10, I11, I12, I13) 97.69/96.01 f5(I14, I15, I16, I17, I18, I19, I20) -> f6(I14, I15, I16, I17, I18, I19, I20) 97.69/96.01 f8(I21, I22, I23, I24, I25, I26, I27) -> f9(I21, I22, I23, I24, I25, I26, I27) 97.69/96.01 f10(I28, I29, I30, I31, I32, I33, I34) -> f11(I28, I29, I30, I31, I32, I33, I34) 97.69/96.01 f15(I35, I36, I37, I38, I39, I40, I41) -> f16(I35, I36, I37, I38, I39, I40, I41) [1 + I36 <= I38] 97.69/96.01 f15(I42, I43, I44, I45, I46, I47, I48) -> f10(I42, 0, I44, I45, I46, I47, I48) [I45 <= I43] 97.69/96.01 f16(I49, I50, I51, I52, I53, I54, I55) -> f13(I49, I50, I51, I52, I53, I54, I55) [I53 <= I50 /\ I50 <= I53] 97.69/96.01 f16(I56, I57, I58, I59, I60, I61, I62) -> f12(I56, I57, I58, I59, I60, I61, I62) [1 + I57 <= I60] 97.69/96.01 f16(I63, I64, I65, I66, I67, I68, I69) -> f12(I63, I64, I65, I66, I67, I68, I69) [1 + I67 <= I64] 97.69/96.01 f13(I70, I71, I72, I73, I74, I75, I76) -> f14(I70, 1 + I71, I72, I73, I74, I75, I76) 97.69/96.01 f14(I77, I78, I79, I80, I81, I82, I83) -> f15(I77, I78, I79, I80, I81, I82, I83) 97.69/96.01 f12(I84, I85, I86, I87, I88, I89, I90) -> f13(I84, I85, I86, I87, I88, I89, I90) 97.69/96.01 f11(I91, I92, I93, I94, I95, I96, I97) -> f8(I91, I92, 0, I94, I95, I96, I97) [1 + I92 <= I94] 97.69/96.01 f11(I98, I99, I100, I101, I102, I103, I104) -> f5(I98, 0, I100, I101, I102, I103, I104) [I101 <= I99] 97.69/96.01 f9(I105, I106, I107, I108, I109, I110, I111) -> f7(I105, I106, I107, I108, I109, rnd6, rnd7) [rnd7 = rnd7 /\ rnd6 = rnd6 /\ 1 + I107 <= I105] 97.69/96.01 f9(I112, I113, I114, I115, I116, I117, I118) -> f10(I112, 1 + I113, I114, I115, I116, I117, I118) [I112 <= I114] 97.69/96.01 f7(I119, I120, I121, I122, I123, I124, I125) -> f8(I119, I120, 1 + I121, I122, I123, I124, I125) 97.69/96.01 f6(I126, I127, I128, I129, I130, I131, I132) -> f4(I126, I127, I128, I129, I130, I133, I134) [I134 = I134 /\ I133 = I133 /\ 1 + I127 <= I126] 97.69/96.01 f6(I135, I136, I137, I138, I139, I140, I141) -> f3(I135, 0, I137, I138, I139, I140, I141) [I135 <= I136] 97.69/96.01 f4(I142, I143, I144, I145, I146, I147, I148) -> f2(I142, I143, I144, I145, I146, I147, I148) 97.69/96.01 f4(I149, I150, I151, I152, I153, I154, I155) -> f5(I149, 1 + I150, I151, I152, I153, I154, I155) 97.69/96.01 f1(I156, I157, I158, I159, I160, I161, I162) -> f3(I156, 1 + I157, I158, I159, I160, I161, I162) [1 + I157 <= I159] 97.69/96.01 f1(I163, I164, I165, I166, I167, I168, I169) -> f2(I163, I164, I165, I166, I167, I168, I169) [I166 <= I164] 97.69/96.01 97.69/96.01 We use the extended value criterion with the projection function NU: 97.69/96.01 NU[f14#(x0,x1,x2,x3,x4,x5,x6)] = -x1 + x3 - 1 97.69/96.01 NU[f13#(x0,x1,x2,x3,x4,x5,x6)] = -x1 + x3 - 2 97.69/96.01 NU[f12#(x0,x1,x2,x3,x4,x5,x6)] = -x1 + x3 - 2 97.69/96.01 NU[f16#(x0,x1,x2,x3,x4,x5,x6)] = -x1 + x3 - 2 97.69/96.01 NU[f15#(x0,x1,x2,x3,x4,x5,x6)] = -x1 + x3 - 1 97.69/96.01 97.69/96.01 This gives the following inequalities: 97.69/96.01 1 + I36 <= I38 ==> -I36 + I38 - 1 > -I36 + I38 - 2 with -I36 + I38 - 1 >= 0 97.69/96.01 1 + I67 <= I64 ==> -I64 + I66 - 2 >= -I64 + I66 - 2 97.69/96.01 ==> -I71 + I73 - 2 >= -(1 + I71) + I73 - 1 97.69/96.01 ==> -I78 + I80 - 1 >= -I78 + I80 - 1 97.69/96.01 ==> -I85 + I87 - 2 >= -I85 + I87 - 2 97.69/96.01 97.69/96.01 We remove all the strictly oriented dependency pairs. 97.69/96.01 97.69/96.01 DP problem for innermost termination. 97.69/96.01 P = 97.69/96.01 f16#(I63, I64, I65, I66, I67, I68, I69) -> f12#(I63, I64, I65, I66, I67, I68, I69) [1 + I67 <= I64] 97.69/96.01 f13#(I70, I71, I72, I73, I74, I75, I76) -> f14#(I70, 1 + I71, I72, I73, I74, I75, I76) 97.69/96.01 f14#(I77, I78, I79, I80, I81, I82, I83) -> f15#(I77, I78, I79, I80, I81, I82, I83) 97.69/96.01 f12#(I84, I85, I86, I87, I88, I89, I90) -> f13#(I84, I85, I86, I87, I88, I89, I90) 97.69/96.01 R = 97.69/96.01 f18(x1, x2, x3, x4, x5, x6, x7) -> f17(x1, x2, x3, x4, x5, x6, x7) 97.69/96.01 f17(I0, I1, I2, I3, I4, I5, I6) -> f14(15, 0, I2, 5, 0, I5, I6) 97.69/96.01 f3(I7, I8, I9, I10, I11, I12, I13) -> f1(I7, I8, I9, I10, I11, I12, I13) 97.69/96.01 f5(I14, I15, I16, I17, I18, I19, I20) -> f6(I14, I15, I16, I17, I18, I19, I20) 97.69/96.01 f8(I21, I22, I23, I24, I25, I26, I27) -> f9(I21, I22, I23, I24, I25, I26, I27) 97.69/96.01 f10(I28, I29, I30, I31, I32, I33, I34) -> f11(I28, I29, I30, I31, I32, I33, I34) 97.69/96.01 f15(I35, I36, I37, I38, I39, I40, I41) -> f16(I35, I36, I37, I38, I39, I40, I41) [1 + I36 <= I38] 97.69/96.01 f15(I42, I43, I44, I45, I46, I47, I48) -> f10(I42, 0, I44, I45, I46, I47, I48) [I45 <= I43] 97.69/96.01 f16(I49, I50, I51, I52, I53, I54, I55) -> f13(I49, I50, I51, I52, I53, I54, I55) [I53 <= I50 /\ I50 <= I53] 97.69/96.01 f16(I56, I57, I58, I59, I60, I61, I62) -> f12(I56, I57, I58, I59, I60, I61, I62) [1 + I57 <= I60] 97.69/96.01 f16(I63, I64, I65, I66, I67, I68, I69) -> f12(I63, I64, I65, I66, I67, I68, I69) [1 + I67 <= I64] 97.69/96.01 f13(I70, I71, I72, I73, I74, I75, I76) -> f14(I70, 1 + I71, I72, I73, I74, I75, I76) 97.69/96.01 f14(I77, I78, I79, I80, I81, I82, I83) -> f15(I77, I78, I79, I80, I81, I82, I83) 97.69/96.01 f12(I84, I85, I86, I87, I88, I89, I90) -> f13(I84, I85, I86, I87, I88, I89, I90) 97.69/96.01 f11(I91, I92, I93, I94, I95, I96, I97) -> f8(I91, I92, 0, I94, I95, I96, I97) [1 + I92 <= I94] 97.69/96.01 f11(I98, I99, I100, I101, I102, I103, I104) -> f5(I98, 0, I100, I101, I102, I103, I104) [I101 <= I99] 97.69/96.01 f9(I105, I106, I107, I108, I109, I110, I111) -> f7(I105, I106, I107, I108, I109, rnd6, rnd7) [rnd7 = rnd7 /\ rnd6 = rnd6 /\ 1 + I107 <= I105] 97.69/96.01 f9(I112, I113, I114, I115, I116, I117, I118) -> f10(I112, 1 + I113, I114, I115, I116, I117, I118) [I112 <= I114] 97.69/96.01 f7(I119, I120, I121, I122, I123, I124, I125) -> f8(I119, I120, 1 + I121, I122, I123, I124, I125) 97.69/96.01 f6(I126, I127, I128, I129, I130, I131, I132) -> f4(I126, I127, I128, I129, I130, I133, I134) [I134 = I134 /\ I133 = I133 /\ 1 + I127 <= I126] 97.69/96.01 f6(I135, I136, I137, I138, I139, I140, I141) -> f3(I135, 0, I137, I138, I139, I140, I141) [I135 <= I136] 97.69/96.01 f4(I142, I143, I144, I145, I146, I147, I148) -> f2(I142, I143, I144, I145, I146, I147, I148) 97.69/96.01 f4(I149, I150, I151, I152, I153, I154, I155) -> f5(I149, 1 + I150, I151, I152, I153, I154, I155) 97.69/96.01 f1(I156, I157, I158, I159, I160, I161, I162) -> f3(I156, 1 + I157, I158, I159, I160, I161, I162) [1 + I157 <= I159] 97.69/96.01 f1(I163, I164, I165, I166, I167, I168, I169) -> f2(I163, I164, I165, I166, I167, I168, I169) [I166 <= I164] 97.69/96.01 97.69/96.01 The dependency graph for this problem is: 97.69/96.01 10 -> 13 97.69/96.01 11 -> 12 97.69/96.01 12 -> 97.69/96.01 13 -> 11 97.69/96.01 Where: 97.69/96.01 10) f16#(I63, I64, I65, I66, I67, I68, I69) -> f12#(I63, I64, I65, I66, I67, I68, I69) [1 + I67 <= I64] 97.69/96.01 11) f13#(I70, I71, I72, I73, I74, I75, I76) -> f14#(I70, 1 + I71, I72, I73, I74, I75, I76) 97.69/96.01 12) f14#(I77, I78, I79, I80, I81, I82, I83) -> f15#(I77, I78, I79, I80, I81, I82, I83) 97.69/96.01 13) f12#(I84, I85, I86, I87, I88, I89, I90) -> f13#(I84, I85, I86, I87, I88, I89, I90) 97.69/96.01 97.69/96.01 We have the following SCCs. 97.69/96.01 97.69/98.98 EOF