/export/starexec/sandbox/solver/bin/starexec_run_its /export/starexec/sandbox/benchmark/theBenchmark.koat /export/starexec/sandbox/output/output_files -------------------------------------------------------------------------------- MAYBE Preprocessing Cost Relations ===================================== #### Computed strongly connected components 0. recursive : [f2/27,f3/27,f4/27,f6/27] 1. non_recursive : [exit_location/1] 2. non_recursive : [f7/16] 3. non_recursive : [f2_loop_cont/17] 4. non_recursive : [f1/16] 5. non_recursive : [f0/16] #### Obtained direct recursion through partial evaluation 0. SCC is partially evaluated into f2/27 1. SCC is completely evaluated into other SCCs 2. SCC is completely evaluated into other SCCs 3. SCC is partially evaluated into f2_loop_cont/17 4. SCC is partially evaluated into f1/16 5. SCC is partially evaluated into f0/16 Control-Flow Refinement of Cost Relations ===================================== ### Specialization of cost equations f2/27 * CE 45 is refined into CE [48] * CE 18 is refined into CE [49] * CE 12 is refined into CE [50] * CE 19 is refined into CE [51] * CE 13 is refined into CE [52] * CE 20 is refined into CE [53] * CE 14 is refined into CE [54] * CE 15 is refined into CE [55] * CE 9 is refined into CE [56] * CE 16 is refined into CE [57] * CE 10 is refined into CE [58] * CE 17 is refined into CE [59] * CE 11 is refined into CE [60] * CE 6 is refined into CE [61] * CE 8 is refined into CE [62] * CE 7 is refined into CE [63] * CE 34 is refined into CE [64] * CE 28 is refined into CE [65] * CE 35 is refined into CE [66] * CE 29 is refined into CE [67] * CE 30 is refined into CE [68] * CE 24 is refined into CE [69] * CE 31 is refined into CE [70] * CE 25 is refined into CE [71] * CE 32 is refined into CE [72] * CE 26 is refined into CE [73] * CE 21 is refined into CE [74] * CE 23 is refined into CE [75] * CE 22 is refined into CE [76] * CE 33 is refined into CE [77] * CE 27 is refined into CE [78] * CE 43 is refined into CE [79] * CE 40 is refined into CE [80] * CE 44 is refined into CE [81] * CE 41 is refined into CE [82] * CE 36 is refined into CE [83] * CE 37 is refined into CE [84] * CE 38 is refined into CE [85] * CE 42 is refined into CE [86] * CE 39 is refined into CE [87] ### Cost equations --> "Loop" of f2/27 * CEs [79] --> Loop 45 * CEs [80] --> Loop 46 * CEs [81] --> Loop 47 * CEs [82] --> Loop 48 * CEs [83] --> Loop 49 * CEs [84] --> Loop 50 * CEs [85] --> Loop 51 * CEs [86] --> Loop 52 * CEs [87] --> Loop 53 * CEs [48] --> Loop 54 * CEs [49] --> Loop 55 * CEs [50] --> Loop 56 * CEs [51] --> Loop 57 * CEs [52] --> Loop 58 * CEs [53] --> Loop 59 * CEs [54] --> Loop 60 * CEs [55] --> Loop 61 * CEs [56] --> Loop 62 * CEs [57] --> Loop 63 * CEs [58] --> Loop 64 * CEs [59] --> Loop 65 * CEs [60] --> Loop 66 * CEs [61] --> Loop 67 * CEs [62] --> Loop 68 * CEs [63] --> Loop 69 * CEs [64] --> Loop 70 * CEs [65] --> Loop 71 * CEs [66] --> Loop 72 * CEs [67] --> Loop 73 * CEs [70] --> Loop 74 * CEs [71] --> Loop 75 * CEs [72] --> Loop 76 * CEs [73] --> Loop 77 * CEs [74] --> Loop 78 * CEs [75] --> Loop 79 * CEs [76] --> Loop 80 * CEs [68] --> Loop 81 * CEs [69] --> Loop 82 * CEs [77] --> Loop 83 * CEs [78] --> Loop 84 ### Ranking functions of CR f2(B,C,D,E,F,G,H,I,J,K,L,M,N,O,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1) #### Partial ranking functions of CR f2(B,C,D,E,F,G,H,I,J,K,L,M,N,O,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1) * Partial RF of phase [45,46,47,48,49,50,51,52,53]: - RF of loop [45:1,46:1,51:1]: -C/2+O/2-1 -D/2+O/2-1 -E/2+N/2-1 -F/2+N/2-1 - RF of loop [47:1,48:1,49:1]: -C+O-1 -D+O-1 -E+N-1 -F+N-1 - RF of loop [50:1]: -C/3+O/3-1 -D/3+O/3-1 -E/3+N/3-1 -F/3+N/3-1 ### Specialization of cost equations f2_loop_cont/17 * CE 47 is refined into CE [88] * CE 46 is refined into CE [89] ### Cost equations --> "Loop" of f2_loop_cont/17 * CEs [88] --> Loop 85 * CEs [89] --> Loop 86 ### Ranking functions of CR f2_loop_cont(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q) #### Partial ranking functions of CR f2_loop_cont(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q) ### Specialization of cost equations f1/16 * CE 2 is refined into CE [90] * CE 3 is refined into CE [91,92,93,94,95,96,97,98,99,100,101,102,103,104,105,106,107,108,109,110,111,112,113,114,115,116,117,118,119,120,121,122,123,124,125,126,127,128,129,130,131,132,133,134,135,136,137,138,139,140,141,142,143,144,145,146,147,148] * CE 4 is refined into CE [149,150,151,152,153,154,155,156,157,158,159,160,161,162,163,164,165,166,167,168,169,170,171,172,173,174,175,176,177,178,179,180,181,182,183,184,185,186,187,188,189,190,191,192,193,194,195,196,197,198,199,200,201,202,203,204,205,206] * CE 5 is refined into CE [207,208,209,210,211,212,213,214,215,216,217,218,219,220,221,222,223,224,225,226,227,228,229,230,231,232,233,234,235,236,237,238,239,240,241,242,243,244,245,246,247,248,249,250,251,252,253,254,255,256,257,258,259,260,261,262,263,264,265,266] ### Cost equations --> "Loop" of f1/16 * CEs [147,148,205,206,265,266] --> Loop 87 * CEs [91,92,149,150] --> Loop 88 * CEs [95,101,102,109,110,153,159,160,167,168,207,208,209,210] --> Loop 89 * CEs [94,99,100,107,108,152,157,158,165,166,213,219,220,227,228] --> Loop 90 * CEs [93,151,212,217,218,225,226] --> Loop 91 * CEs [211] --> Loop 92 * CEs [97,103,104,111,112,155,161,162,169,170,215,221,222,229,230] --> Loop 93 * CEs [96,154,214] --> Loop 94 * CEs [118,119,120,127,128,129,130,131,132,137,138,139,140,141,142,146,176,177,178,185,186,187,188,189,190,195,196,197,198,199,200,204,236,237,238,245,246,247,248,249,250,255,256,257,258,259,260,264] --> Loop 95 * CEs [98,105,106,113,114,156,163,164,171,172,216,223,224,231,232] --> Loop 96 * CEs [90,115,116,117,121,122,123,124,125,126,133,134,135,136,143,144,145,173,174,175,179,180,181,182,183,184,191,192,193,194,201,202,203,233,234,235,239,240,241,242,243,244,251,252,253,254,261,262,263] --> Loop 97 ### Ranking functions of CR f1(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,R) #### Partial ranking functions of CR f1(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,R) ### Specialization of cost equations f0/16 * CE 1 is refined into CE [267,268,269,270,271,272,273,274,275,276,277] ### Cost equations --> "Loop" of f0/16 * CEs [277] --> Loop 98 * CEs [276] --> Loop 99 * CEs [275] --> Loop 100 * CEs [274] --> Loop 101 * CEs [273] --> Loop 102 * CEs [272] --> Loop 103 * CEs [271] --> Loop 104 * CEs [270] --> Loop 105 * CEs [269] --> Loop 106 * CEs [268] --> Loop 107 * CEs [267] --> Loop 108 ### Ranking functions of CR f0(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,R) #### Partial ranking functions of CR f0(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,R) Computing Bounds ===================================== #### Cost of chains of f2(B,C,D,E,F,G,H,I,J,K,L,M,N,O,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1): * Chain [[45,46,47,48,49,50,51,52,53]]...: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -C/3+O/3 it(50) =< -F/3+N/3 aux(17) =< -C+O aux(18) =< -C/2+O/2 aux(19) =< -F+N aux(20) =< -F/2+N/2 aux(2) =< aux(17) aux(4) =< aux(18) aux(2) =< aux(19) aux(4) =< aux(20) it(47) =< aux(17) it(50) =< aux(17) it(51) =< aux(17) it(47) =< aux(2) it(50) =< aux(2) it(51) =< aux(2) it(45) =< aux(18) it(50) =< aux(18) it(51) =< aux(18) it(45) =< aux(4) it(50) =< aux(4) it(51) =< aux(4) it(47) =< aux(19) it(50) =< aux(19) it(51) =< aux(19) it(45) =< aux(20) it(50) =< aux(20) it(51) =< aux(20) with precondition: [H=L,G=K,E=F,C=D,B=0,I+O>=C+2,I+N>=E+2,G+2*I>=3,4*I+3>=G,1>=I,N>=1,O>=1,H>=1,7>=H,J=0,M=2] * Chain [[45,46,47,48,49,50,51,52,53],80]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -F/3+W/3 aux(21) =< -F+N aux(22) =< -F+O-U+W aux(23) =< -F+W aux(24) =< -F/2+N/2 aux(25) =< -F/2+O/2-U/2+W/2 aux(26) =< -F/2+W/2 it(47) =< aux(22) it(50) =< aux(22) it(51) =< aux(22) it(47) =< aux(23) it(50) =< aux(23) it(51) =< aux(23) it(45) =< aux(25) it(50) =< aux(25) it(51) =< aux(25) it(45) =< aux(26) it(50) =< aux(26) it(51) =< aux(26) it(47) =< aux(21) it(50) =< aux(21) it(51) =< aux(21) it(45) =< aux(24) it(50) =< aux(24) it(51) =< aux(24) with precondition: [B=0,J=0,M=2,R=2,S=0,Y=4,Z=1,A1=0,C1=4,D1=7,C=D,E=F,G=K,H=L,T=U,X=B1,E+T=C+V,E+T=C+W,7>=H,1>=I,7>=X,H>=1,N>=1,O>=1,X>=1,4*I+3>=G,T>=O,O+2>=T,G+2*I>=3,I+T>=C+4,E+T>=C+N,C+N+2>=E+T] * Chain [[45,46,47,48,49,50,51,52,53],79]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -F/3+W/3 aux(27) =< -F+N aux(28) =< -F+O-U+W aux(29) =< -F+W aux(30) =< -F/2+N/2 aux(31) =< -F/2+O/2-U/2+W/2 aux(32) =< -F/2+W/2 it(47) =< aux(28) it(50) =< aux(28) it(51) =< aux(28) it(47) =< aux(29) it(50) =< aux(29) it(51) =< aux(29) it(45) =< aux(31) it(50) =< aux(31) it(51) =< aux(31) it(45) =< aux(32) it(50) =< aux(32) it(51) =< aux(32) it(47) =< aux(27) it(50) =< aux(27) it(51) =< aux(27) it(45) =< aux(30) it(50) =< aux(30) it(51) =< aux(30) with precondition: [B=0,J=0,M=2,R=2,S=0,Y=4,Z=1,A1=0,C1=4,D1=7,C=D,E=F,G=K,H=L,T=U,X=B1,E+T=C+V,E+T=C+W,7>=H,1>=I,7>=X,H>=1,N>=1,O>=1,X>=1,4*I+3>=G,T>=O,O+1>=T,G+2*I>=3,I+T>=C+3,E+T>=C+N,C+N+1>=E+T] * Chain [[45,46,47,48,49,50,51,52,53],78]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -F/3+W/3 aux(33) =< -F+W aux(34) =< -F/2+W/2 it(47) =< aux(33) it(50) =< aux(33) it(51) =< aux(33) it(45) =< aux(34) it(50) =< aux(34) it(51) =< aux(34) with precondition: [B=0,J=0,M=2,R=2,S=0,Y=4,Z=1,A1=0,C1=4,D1=7,C=D,E=F,G=K,H=L,N=V,N=W,X=B1,C+N=E+O,C+N=E+T,C+N=E+U,7>=H,1>=I,7>=X,H>=1,N>=1,X>=1,4*I+3>=G,G+2*I>=3,C+N>=E+1,I+N>=E+2] * Chain [[45,46,47,48,49,50,51,52,53],77]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -F/3+W/3 aux(35) =< -F+W aux(36) =< -F/2+W/2 it(47) =< aux(35) it(50) =< aux(35) it(51) =< aux(35) it(45) =< aux(36) it(50) =< aux(36) it(51) =< aux(36) with precondition: [B=0,J=0,M=2,R=2,S=0,Z=0,A1=0,D1=7,C=D,E=F,G=K,H=L,N=V,N=W,X=B1,Y=C1,C+N=E+O,C+N=E+T,C+N=E+U,7>=H,1>=I,7>=X,7>=Y,H>=1,N>=1,X>=1,Y>=5,4*I+3>=G,G+2*I>=3,C+N>=E+1,I+N>=E+2] * Chain [[45,46,47,48,49,50,51,52,53],76]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -F/3+W/3 aux(37) =< -F+W aux(38) =< -F/2+W/2 it(47) =< aux(37) it(50) =< aux(37) it(51) =< aux(37) it(45) =< aux(38) it(50) =< aux(38) it(51) =< aux(38) with precondition: [B=0,J=0,M=2,R=2,S=0,Z=0,A1=0,D1=7,C=D,E=F,G=K,H=L,N=V,N=W,X=B1,Y=C1,C+N=E+O,C+N=E+T,C+N=E+U,7>=H,1>=I,7>=X,3>=Y,H>=1,N>=1,X>=1,Y>=1,4*I+3>=G,G+2*I>=3,C+N>=E+1,I+N>=E+2] * Chain [[45,46,47,48,49,50,51,52,53],75]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -F/3+W/3 aux(39) =< -F+N aux(40) =< -F+O-U+W aux(41) =< -F+W aux(42) =< -F/2+N/2 aux(43) =< -F/2+O/2-U/2+W/2 aux(44) =< -F/2+W/2 it(47) =< aux(40) it(50) =< aux(40) it(51) =< aux(40) it(47) =< aux(41) it(50) =< aux(41) it(51) =< aux(41) it(45) =< aux(43) it(50) =< aux(43) it(51) =< aux(43) it(45) =< aux(44) it(50) =< aux(44) it(51) =< aux(44) it(47) =< aux(39) it(50) =< aux(39) it(51) =< aux(39) it(45) =< aux(42) it(50) =< aux(42) it(51) =< aux(42) with precondition: [B=0,J=0,M=2,R=2,S=0,Z=0,A1=0,D1=7,C=D,E=F,G=K,H=L,T=U,X=B1,Y=C1,E+T=C+V,E+T=C+W,7>=H,1>=I,7>=X,7>=Y,H>=1,N>=1,O>=1,X>=1,Y>=5,4*I+3>=G,T>=O,O+1>=T,G+2*I>=3,I+T>=C+3,E+T>=C+N,C+N+1>=E+T] * Chain [[45,46,47,48,49,50,51,52,53],74]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -F/3+W/3 aux(45) =< -F+N aux(46) =< -F+O-U+W aux(47) =< -F+W aux(48) =< -F/2+N/2 aux(49) =< -F/2+O/2-U/2+W/2 aux(50) =< -F/2+W/2 it(47) =< aux(46) it(50) =< aux(46) it(51) =< aux(46) it(47) =< aux(47) it(50) =< aux(47) it(51) =< aux(47) it(45) =< aux(49) it(50) =< aux(49) it(51) =< aux(49) it(45) =< aux(50) it(50) =< aux(50) it(51) =< aux(50) it(47) =< aux(45) it(50) =< aux(45) it(51) =< aux(45) it(45) =< aux(48) it(50) =< aux(48) it(51) =< aux(48) with precondition: [B=0,J=0,M=2,R=2,S=0,Z=0,A1=0,D1=7,C=D,E=F,G=K,H=L,T=U,X=B1,Y=C1,E+T=C+V,E+T=C+W,7>=H,1>=I,7>=X,3>=Y,H>=1,N>=1,O>=1,X>=1,Y>=1,4*I+3>=G,T>=O,O+1>=T,G+2*I>=3,I+T>=C+3,E+T>=C+N,C+N+1>=E+T] * Chain [[45,46,47,48,49,50,51,52,53],73]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -F/3+W/3 aux(51) =< -F+W aux(52) =< -F/2+W/2 it(47) =< aux(51) it(50) =< aux(51) it(51) =< aux(51) it(45) =< aux(52) it(50) =< aux(52) it(51) =< aux(52) with precondition: [B=0,J=0,M=2,R=2,S=0,Z=1,A1=0,D1=7,C=D,E=F,G=K,H=L,N=V,N=W,X=B1,Y=C1,C+N=E+O,C+N=E+T,C+N=E+U,7>=H,1>=I,7>=X,7>=Y,H>=1,N>=1,X>=1,Y>=5,4*I+3>=G,G+2*I>=3,C+N>=E+1,I+N>=E+2] * Chain [[45,46,47,48,49,50,51,52,53],72]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -F/3+W/3 aux(53) =< -F+W aux(54) =< -F/2+W/2 it(47) =< aux(53) it(50) =< aux(53) it(51) =< aux(53) it(45) =< aux(54) it(50) =< aux(54) it(51) =< aux(54) with precondition: [B=0,J=0,M=2,R=2,S=0,Z=1,A1=0,D1=7,C=D,E=F,G=K,H=L,N=V,N=W,X=B1,Y=C1,C+N=E+O,C+N=E+T,C+N=E+U,7>=H,1>=I,7>=X,3>=Y,H>=1,N>=1,X>=1,Y>=1,4*I+3>=G,G+2*I>=3,C+N>=E+1,I+N>=E+2] * Chain [[45,46,47,48,49,50,51,52,53],71]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -F/3+W/3 aux(55) =< -F+N aux(56) =< -F+O-U+W aux(57) =< -F+W aux(58) =< -F/2+N/2 aux(59) =< -F/2+O/2-U/2+W/2 aux(60) =< -F/2+W/2 it(47) =< aux(56) it(50) =< aux(56) it(51) =< aux(56) it(47) =< aux(57) it(50) =< aux(57) it(51) =< aux(57) it(45) =< aux(59) it(50) =< aux(59) it(51) =< aux(59) it(45) =< aux(60) it(50) =< aux(60) it(51) =< aux(60) it(47) =< aux(55) it(50) =< aux(55) it(51) =< aux(55) it(45) =< aux(58) it(50) =< aux(58) it(51) =< aux(58) with precondition: [B=0,J=0,M=2,R=2,S=0,Z=1,A1=0,D1=7,C=D,E=F,G=K,H=L,T=U,X=B1,Y=C1,E+T=C+V,E+T=C+W,7>=H,1>=I,7>=X,7>=Y,H>=1,N>=1,O>=1,X>=1,Y>=5,4*I+3>=G,T>=O,O+1>=T,G+2*I>=3,I+T>=C+3,E+T>=C+N,C+N+1>=E+T] * Chain [[45,46,47,48,49,50,51,52,53],70]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -F/3+W/3 aux(61) =< -F+N aux(62) =< -F+O-U+W aux(63) =< -F+W aux(64) =< -F/2+N/2 aux(65) =< -F/2+O/2-U/2+W/2 aux(66) =< -F/2+W/2 it(47) =< aux(62) it(50) =< aux(62) it(51) =< aux(62) it(47) =< aux(63) it(50) =< aux(63) it(51) =< aux(63) it(45) =< aux(65) it(50) =< aux(65) it(51) =< aux(65) it(45) =< aux(66) it(50) =< aux(66) it(51) =< aux(66) it(47) =< aux(61) it(50) =< aux(61) it(51) =< aux(61) it(45) =< aux(64) it(50) =< aux(64) it(51) =< aux(64) with precondition: [B=0,J=0,M=2,R=2,S=0,Z=1,A1=0,D1=7,C=D,E=F,G=K,H=L,T=U,X=B1,Y=C1,E+T=C+V,E+T=C+W,7>=H,1>=I,7>=X,3>=Y,H>=1,N>=1,O>=1,X>=1,Y>=1,4*I+3>=G,T>=O,O+1>=T,G+2*I>=3,I+T>=C+3,E+T>=C+N,C+N+1>=E+T] * Chain [[45,46,47,48,49,50,51,52,53],69]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -D/3+U/3 aux(67) =< -D+N+U-W aux(68) =< -D+O aux(69) =< -D+U aux(70) =< -D/2+N/2+U/2-W/2 aux(71) =< -D/2+O/2 aux(72) =< -D/2+U/2 it(47) =< aux(68) it(50) =< aux(68) it(51) =< aux(68) it(47) =< aux(69) it(50) =< aux(69) it(51) =< aux(69) it(45) =< aux(71) it(50) =< aux(71) it(51) =< aux(71) it(45) =< aux(72) it(50) =< aux(72) it(51) =< aux(72) it(47) =< aux(67) it(50) =< aux(67) it(51) =< aux(67) it(45) =< aux(70) it(50) =< aux(70) it(51) =< aux(70) with precondition: [B=0,J=0,M=2,R=2,S=1,Y=4,Z=1,A1=1,C1=4,D1=7,C=D,E=F,G=K,H=L,T=U,X=B1,E+T=C+V,E+T=C+W,7>=H,1>=I,7>=X,H>=1,N>=1,O>=1,X>=1,4*I+3>=G,O+2>=T,G+2*I>=3,I+T>=C+4,C+N+2>=E+T] * Chain [[45,46,47,48,49,50,51,52,53],68]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -D/3+U/3 aux(73) =< -D+N+U-W aux(74) =< -D+O aux(75) =< -D+U aux(76) =< -D/2+N/2+U/2-W/2 aux(77) =< -D/2+O/2 aux(78) =< -D/2+U/2 it(47) =< aux(74) it(50) =< aux(74) it(51) =< aux(74) it(47) =< aux(75) it(50) =< aux(75) it(51) =< aux(75) it(45) =< aux(77) it(50) =< aux(77) it(51) =< aux(77) it(45) =< aux(78) it(50) =< aux(78) it(51) =< aux(78) it(47) =< aux(73) it(50) =< aux(73) it(51) =< aux(73) it(45) =< aux(76) it(50) =< aux(76) it(51) =< aux(76) with precondition: [B=0,J=0,M=2,R=2,S=1,Y=4,Z=1,A1=1,C1=4,D1=7,C=D,E=F,G=K,H=L,T=U,X=B1,E+T=C+V,E+T=C+W,7>=H,1>=I,7>=X,H>=1,N>=1,O>=1,X>=1,4*I+3>=G,O+1>=T,G+2*I>=3,I+T>=C+3,C+N+1>=E+T] * Chain [[45,46,47,48,49,50,51,52,53],67]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -D/3+U/3 aux(79) =< -D+N+U-W aux(80) =< -D+O aux(81) =< -D+U aux(82) =< -D/2+N/2+U/2-W/2 aux(83) =< -D/2+O/2 aux(84) =< -D/2+U/2 it(47) =< aux(80) it(50) =< aux(80) it(51) =< aux(80) it(47) =< aux(81) it(50) =< aux(81) it(51) =< aux(81) it(45) =< aux(83) it(50) =< aux(83) it(51) =< aux(83) it(45) =< aux(84) it(50) =< aux(84) it(51) =< aux(84) it(47) =< aux(79) it(50) =< aux(79) it(51) =< aux(79) it(45) =< aux(82) it(50) =< aux(82) it(51) =< aux(82) with precondition: [B=0,J=0,M=2,R=2,S=1,Y=4,Z=1,A1=1,C1=4,D1=7,C=D,E=F,G=K,H=L,T=U,X=B1,E+T=C+V,E+T=C+W,7>=H,1>=I,7>=X,H>=1,N>=1,O>=1,X>=1,4*I+3>=G,O>=T,G+2*I>=3,I+T>=C+2,C+N>=E+T] * Chain [[45,46,47,48,49,50,51,52,53],66]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -C/3+U/3 aux(85) =< -C+N+U-W aux(86) =< -C+O aux(87) =< -C+U aux(88) =< -C/2+N/2+U/2-W/2 aux(89) =< -C/2+O/2 aux(90) =< -C/2+U/2 it(47) =< aux(86) it(50) =< aux(86) it(51) =< aux(86) it(47) =< aux(87) it(50) =< aux(87) it(51) =< aux(87) it(45) =< aux(89) it(50) =< aux(89) it(51) =< aux(89) it(45) =< aux(90) it(50) =< aux(90) it(51) =< aux(90) it(47) =< aux(85) it(50) =< aux(85) it(51) =< aux(85) it(45) =< aux(88) it(50) =< aux(88) it(51) =< aux(88) with precondition: [B=0,J=0,M=2,R=2,S=1,Z=0,A1=1,D1=7,C=D,E=F,G=K,H=L,T=U,X=B1,Y=C1,E+T=C+V,E+T=C+W,7>=H,1>=I,7>=X,7>=Y,H>=1,N>=1,O>=1,X>=1,Y>=5,4*I+3>=G,O>=T,G+2*I>=3,I+T>=C+2,C+N>=E+T] * Chain [[45,46,47,48,49,50,51,52,53],65]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -C/3+U/3 aux(91) =< -C+N+U-W aux(92) =< -C+O aux(93) =< -C+U aux(94) =< -C/2+N/2+U/2-W/2 aux(95) =< -C/2+O/2 aux(96) =< -C/2+U/2 it(47) =< aux(92) it(50) =< aux(92) it(51) =< aux(92) it(47) =< aux(93) it(50) =< aux(93) it(51) =< aux(93) it(45) =< aux(95) it(50) =< aux(95) it(51) =< aux(95) it(45) =< aux(96) it(50) =< aux(96) it(51) =< aux(96) it(47) =< aux(91) it(50) =< aux(91) it(51) =< aux(91) it(45) =< aux(94) it(50) =< aux(94) it(51) =< aux(94) with precondition: [B=0,J=0,M=2,R=2,S=1,Z=0,A1=1,D1=7,C=D,E=F,G=K,H=L,T=U,X=B1,Y=C1,E+T=C+V,E+T=C+W,7>=H,1>=I,7>=X,3>=Y,H>=1,N>=1,O>=1,X>=1,Y>=1,4*I+3>=G,O>=T,G+2*I>=3,I+T>=C+2,C+N>=E+T] * Chain [[45,46,47,48,49,50,51,52,53],64]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -C/3+U/3 aux(97) =< -C+N+U-W aux(98) =< -C+O aux(99) =< -C+U aux(100) =< -C/2+N/2+U/2-W/2 aux(101) =< -C/2+O/2 aux(102) =< -C/2+U/2 it(47) =< aux(98) it(50) =< aux(98) it(51) =< aux(98) it(47) =< aux(99) it(50) =< aux(99) it(51) =< aux(99) it(45) =< aux(101) it(50) =< aux(101) it(51) =< aux(101) it(45) =< aux(102) it(50) =< aux(102) it(51) =< aux(102) it(47) =< aux(97) it(50) =< aux(97) it(51) =< aux(97) it(45) =< aux(100) it(50) =< aux(100) it(51) =< aux(100) with precondition: [B=0,J=0,M=2,R=2,S=1,Z=0,A1=1,D1=7,C=D,E=F,G=K,H=L,T=U,X=B1,Y=C1,E+T=C+V,E+T=C+W,7>=H,1>=I,7>=X,7>=Y,H>=1,N>=1,O>=1,X>=1,Y>=5,4*I+3>=G,O+1>=T,G+2*I>=3,I+T>=C+3,C+N+1>=E+T] * Chain [[45,46,47,48,49,50,51,52,53],63]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -C/3+U/3 aux(103) =< -C+N+U-W aux(104) =< -C+O aux(105) =< -C+U aux(106) =< -C/2+N/2+U/2-W/2 aux(107) =< -C/2+O/2 aux(108) =< -C/2+U/2 it(47) =< aux(104) it(50) =< aux(104) it(51) =< aux(104) it(47) =< aux(105) it(50) =< aux(105) it(51) =< aux(105) it(45) =< aux(107) it(50) =< aux(107) it(51) =< aux(107) it(45) =< aux(108) it(50) =< aux(108) it(51) =< aux(108) it(47) =< aux(103) it(50) =< aux(103) it(51) =< aux(103) it(45) =< aux(106) it(50) =< aux(106) it(51) =< aux(106) with precondition: [B=0,J=0,M=2,R=2,S=1,Z=0,A1=1,D1=7,C=D,E=F,G=K,H=L,T=U,X=B1,Y=C1,E+T=C+V,E+T=C+W,7>=H,1>=I,7>=X,3>=Y,H>=1,N>=1,O>=1,X>=1,Y>=1,4*I+3>=G,O+1>=T,G+2*I>=3,I+T>=C+3,C+N+1>=E+T] * Chain [[45,46,47,48,49,50,51,52,53],62]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -C/3+U/3 aux(109) =< -C+N+U-W aux(110) =< -C+O aux(111) =< -C+U aux(112) =< -C/2+N/2+U/2-W/2 aux(113) =< -C/2+O/2 aux(114) =< -C/2+U/2 it(47) =< aux(110) it(50) =< aux(110) it(51) =< aux(110) it(47) =< aux(111) it(50) =< aux(111) it(51) =< aux(111) it(45) =< aux(113) it(50) =< aux(113) it(51) =< aux(113) it(45) =< aux(114) it(50) =< aux(114) it(51) =< aux(114) it(47) =< aux(109) it(50) =< aux(109) it(51) =< aux(109) it(45) =< aux(112) it(50) =< aux(112) it(51) =< aux(112) with precondition: [B=0,J=0,M=2,R=2,S=1,Z=0,A1=1,D1=7,C=D,E=F,G=K,H=L,T=U,X=B1,Y=C1,E+T=C+V,E+T=C+W,7>=H,1>=I,7>=X,7>=Y,H>=1,N>=1,O>=1,X>=1,Y>=5,4*I+3>=G,O>=T+1,G+2*I>=3,I+T>=C+1,C+N>=E+T+1] * Chain [[45,46,47,48,49,50,51,52,53],61]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -C/3+U/3 aux(115) =< -C+N+U-W aux(116) =< -C+O aux(117) =< -C+U aux(118) =< -C/2+N/2+U/2-W/2 aux(119) =< -C/2+O/2 aux(120) =< -C/2+U/2 it(47) =< aux(116) it(50) =< aux(116) it(51) =< aux(116) it(47) =< aux(117) it(50) =< aux(117) it(51) =< aux(117) it(45) =< aux(119) it(50) =< aux(119) it(51) =< aux(119) it(45) =< aux(120) it(50) =< aux(120) it(51) =< aux(120) it(47) =< aux(115) it(50) =< aux(115) it(51) =< aux(115) it(45) =< aux(118) it(50) =< aux(118) it(51) =< aux(118) with precondition: [B=0,J=0,M=2,R=2,S=1,Z=0,A1=1,D1=7,C=D,E=F,G=K,H=L,T=U,X=B1,Y=C1,E+T=C+V,E+T=C+W,7>=H,1>=I,7>=X,3>=Y,H>=1,N>=1,O>=1,X>=1,Y>=1,4*I+3>=G,O>=T+1,G+2*I>=3,I+T>=C+1,C+N>=E+T+1] * Chain [[45,46,47,48,49,50,51,52,53],60]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -C/3+U/3 aux(121) =< -C+N+U-W aux(122) =< -C+O aux(123) =< -C+U aux(124) =< -C/2+N/2+U/2-W/2 aux(125) =< -C/2+O/2 aux(126) =< -C/2+U/2 it(47) =< aux(122) it(50) =< aux(122) it(51) =< aux(122) it(47) =< aux(123) it(50) =< aux(123) it(51) =< aux(123) it(45) =< aux(125) it(50) =< aux(125) it(51) =< aux(125) it(45) =< aux(126) it(50) =< aux(126) it(51) =< aux(126) it(47) =< aux(121) it(50) =< aux(121) it(51) =< aux(121) it(45) =< aux(124) it(50) =< aux(124) it(51) =< aux(124) with precondition: [B=0,J=0,M=2,R=2,S=1,Z=1,A1=1,D1=7,C=D,E=F,G=K,H=L,T=U,X=B1,Y=C1,E+T=C+V,E+T=C+W,7>=H,1>=I,7>=X,7>=Y,H>=1,N>=1,O>=1,X>=1,Y>=5,4*I+3>=G,O>=T,G+2*I>=3,I+T>=C+2,C+N>=E+T] * Chain [[45,46,47,48,49,50,51,52,53],59]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -C/3+U/3 aux(127) =< -C+N+U-W aux(128) =< -C+O aux(129) =< -C+U aux(130) =< -C/2+N/2+U/2-W/2 aux(131) =< -C/2+O/2 aux(132) =< -C/2+U/2 it(47) =< aux(128) it(50) =< aux(128) it(51) =< aux(128) it(47) =< aux(129) it(50) =< aux(129) it(51) =< aux(129) it(45) =< aux(131) it(50) =< aux(131) it(51) =< aux(131) it(45) =< aux(132) it(50) =< aux(132) it(51) =< aux(132) it(47) =< aux(127) it(50) =< aux(127) it(51) =< aux(127) it(45) =< aux(130) it(50) =< aux(130) it(51) =< aux(130) with precondition: [B=0,J=0,M=2,R=2,S=1,Z=1,A1=1,D1=7,C=D,E=F,G=K,H=L,T=U,X=B1,Y=C1,E+T=C+V,E+T=C+W,7>=H,1>=I,7>=X,3>=Y,H>=1,N>=1,O>=1,X>=1,Y>=1,4*I+3>=G,O>=T,G+2*I>=3,I+T>=C+2,C+N>=E+T] * Chain [[45,46,47,48,49,50,51,52,53],58]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -C/3+U/3 aux(133) =< -C+N+U-W aux(134) =< -C+O aux(135) =< -C+U aux(136) =< -C/2+N/2+U/2-W/2 aux(137) =< -C/2+O/2 aux(138) =< -C/2+U/2 it(47) =< aux(134) it(50) =< aux(134) it(51) =< aux(134) it(47) =< aux(135) it(50) =< aux(135) it(51) =< aux(135) it(45) =< aux(137) it(50) =< aux(137) it(51) =< aux(137) it(45) =< aux(138) it(50) =< aux(138) it(51) =< aux(138) it(47) =< aux(133) it(50) =< aux(133) it(51) =< aux(133) it(45) =< aux(136) it(50) =< aux(136) it(51) =< aux(136) with precondition: [B=0,J=0,M=2,R=2,S=1,Z=1,A1=1,D1=7,C=D,E=F,G=K,H=L,T=U,X=B1,Y=C1,E+T=C+V,E+T=C+W,7>=H,1>=I,7>=X,7>=Y,H>=1,N>=1,O>=1,X>=1,Y>=5,4*I+3>=G,O+1>=T,G+2*I>=3,I+T>=C+3,C+N+1>=E+T] * Chain [[45,46,47,48,49,50,51,52,53],57]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -C/3+U/3 aux(139) =< -C+N+U-W aux(140) =< -C+O aux(141) =< -C+U aux(142) =< -C/2+N/2+U/2-W/2 aux(143) =< -C/2+O/2 aux(144) =< -C/2+U/2 it(47) =< aux(140) it(50) =< aux(140) it(51) =< aux(140) it(47) =< aux(141) it(50) =< aux(141) it(51) =< aux(141) it(45) =< aux(143) it(50) =< aux(143) it(51) =< aux(143) it(45) =< aux(144) it(50) =< aux(144) it(51) =< aux(144) it(47) =< aux(139) it(50) =< aux(139) it(51) =< aux(139) it(45) =< aux(142) it(50) =< aux(142) it(51) =< aux(142) with precondition: [B=0,J=0,M=2,R=2,S=1,Z=1,A1=1,D1=7,C=D,E=F,G=K,H=L,T=U,X=B1,Y=C1,E+T=C+V,E+T=C+W,7>=H,1>=I,7>=X,3>=Y,H>=1,N>=1,O>=1,X>=1,Y>=1,4*I+3>=G,O+1>=T,G+2*I>=3,I+T>=C+3,C+N+1>=E+T] * Chain [[45,46,47,48,49,50,51,52,53],56]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -C/3+U/3 aux(145) =< -C+N+U-W aux(146) =< -C+O aux(147) =< -C+U aux(148) =< -C/2+N/2+U/2-W/2 aux(149) =< -C/2+O/2 aux(150) =< -C/2+U/2 it(47) =< aux(146) it(50) =< aux(146) it(51) =< aux(146) it(47) =< aux(147) it(50) =< aux(147) it(51) =< aux(147) it(45) =< aux(149) it(50) =< aux(149) it(51) =< aux(149) it(45) =< aux(150) it(50) =< aux(150) it(51) =< aux(150) it(47) =< aux(145) it(50) =< aux(145) it(51) =< aux(145) it(45) =< aux(148) it(50) =< aux(148) it(51) =< aux(148) with precondition: [B=0,J=0,M=2,R=2,S=1,Z=1,A1=1,D1=7,C=D,E=F,G=K,H=L,T=U,X=B1,Y=C1,E+T=C+V,E+T=C+W,7>=H,1>=I,7>=X,7>=Y,H>=1,N>=1,O>=1,X>=1,Y>=5,4*I+3>=G,O>=T+1,G+2*I>=3,I+T>=C+1,C+N>=E+T+1] * Chain [[45,46,47,48,49,50,51,52,53],55]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -C/3+U/3 aux(151) =< -C+N+U-W aux(152) =< -C+O aux(153) =< -C+U aux(154) =< -C/2+N/2+U/2-W/2 aux(155) =< -C/2+O/2 aux(156) =< -C/2+U/2 it(47) =< aux(152) it(50) =< aux(152) it(51) =< aux(152) it(47) =< aux(153) it(50) =< aux(153) it(51) =< aux(153) it(45) =< aux(155) it(50) =< aux(155) it(51) =< aux(155) it(45) =< aux(156) it(50) =< aux(156) it(51) =< aux(156) it(47) =< aux(151) it(50) =< aux(151) it(51) =< aux(151) it(45) =< aux(154) it(50) =< aux(154) it(51) =< aux(154) with precondition: [B=0,J=0,M=2,R=2,S=1,Z=1,A1=1,D1=7,C=D,E=F,G=K,H=L,T=U,X=B1,Y=C1,E+T=C+V,E+T=C+W,7>=H,1>=I,7>=X,3>=Y,H>=1,N>=1,O>=1,X>=1,Y>=1,4*I+3>=G,O>=T+1,G+2*I>=3,I+T>=C+1,C+N>=E+T+1] * Chain [[45,46,47,48,49,50,51,52,53],54]: 2*it(45)+3*it(47)+1*it(50)+1*it(51)+2*it(52)+0 Such that:it(50) =< -C/3+O/3 it(50) =< -F/3+N/3 aux(157) =< -C+O aux(158) =< -C/2+O/2 aux(159) =< -F+N aux(160) =< -F/2+N/2 aux(2) =< aux(157) aux(4) =< aux(158) aux(2) =< aux(159) aux(4) =< aux(160) it(47) =< aux(157) it(50) =< aux(157) it(51) =< aux(157) it(47) =< aux(2) it(50) =< aux(2) it(51) =< aux(2) it(45) =< aux(158) it(50) =< aux(158) it(51) =< aux(158) it(45) =< aux(4) it(50) =< aux(4) it(51) =< aux(4) it(47) =< aux(159) it(50) =< aux(159) it(51) =< aux(159) it(45) =< aux(160) it(50) =< aux(160) it(51) =< aux(160) with precondition: [B=0,J=0,M=2,R=3,C=D,E=F,G=K,H=L,7>=H,1>=I,H>=1,N>=1,O>=1,4*I+3>=G,G+2*I>=3,I+O>=C+2,I+N>=E+2] * Chain [84]: 0 with precondition: [B=0,G=3,H=4,I=1,J=0,K=3,L=4,M=2,R=2,S=0,Z=1,A1=0,D1=7,D=C,F=E,D=T,D=U,F=V,F=W,X=B1,Y=C1,7>=X,7>=Y,X>=1,Y>=5,F>=N,D>=O] * Chain [83]: 0 with precondition: [B=0,G=3,H=4,I=1,J=0,K=3,L=4,M=2,R=2,S=0,Z=1,A1=0,D1=7,D=C,F=E,D=T,D=U,F=V,F=W,X=B1,Y=C1,7>=X,3>=Y,X>=1,Y>=1,F>=N,D>=O] * Chain [82]: 0 with precondition: [B=0,G=3,J=0,K=3,M=2,R=2,S=0,Z=0,A1=0,D1=7,D=C,F=E,L=H,D=T,D=U,F=V,F=W,X=B1,Y=C1,7>=X,7>=Y,I>=0,X>=1,Y>=5,7>=3*I+L,L>=3*I+1,F>=N,D>=O] * Chain [81]: 0 with precondition: [B=0,G=3,J=0,K=3,M=2,R=2,S=0,Z=0,A1=0,D1=7,D=C,F=E,L=H,D=T,D=U,F=V,F=W,X=B1,Y=C1,7>=X,3>=Y,I>=0,X>=1,Y>=1,7>=3*I+L,L>=3*I+1,F>=N,D>=O] * Chain [80]: 0 with precondition: [B=0,J=0,M=2,R=2,S=0,Y=4,Z=1,A1=0,C1=4,D1=7,D=C,F=E,K=G,L=H,D+3=T,D+3=U,F+3=V,F+3=W,X=B1,1>=I,7>=L,7>=X,L>=1,X>=1,4*I+3>=K,F+3>=N,D+3>=O,K+2*I>=3] * Chain [79]: 0 with precondition: [B=0,J=0,M=2,R=2,S=0,Y=4,Z=1,A1=0,C1=4,D1=7,D=C,F=E,K=G,L=H,D+2=T,D+2=U,F+2=V,F+2=W,X=B1,1>=I,7>=L,7>=X,L>=1,X>=1,4*I+3>=K,F+2>=N,D+2>=O,K+2*I>=3] * Chain [78]: 0 with precondition: [B=0,J=0,M=2,R=2,S=0,Y=4,Z=1,A1=0,C1=4,D1=7,D=C,F=E,K=G,L=H,D+1=T,D+1=U,F+1=V,F+1=W,X=B1,1>=I,7>=L,7>=X,L>=1,X>=1,4*I+3>=K,F+1>=N,D+1>=O,K+2*I>=3] * Chain [77]: 0 with precondition: [B=0,J=0,M=2,R=2,S=0,Z=0,A1=0,D1=7,C=D,E=F,K=G,L=H,C+1=T,C+1=U,E+1=V,E+1=W,X=B1,Y=C1,1>=I,7>=L,7>=X,7>=Y,L>=1,X>=1,Y>=5,4*I+3>=K,E+1>=N,C+1>=O,K+2*I>=3] * Chain [76]: 0 with precondition: [B=0,J=0,M=2,R=2,S=0,Z=0,A1=0,D1=7,C=D,E=F,K=G,L=H,C+1=T,C+1=U,E+1=V,E+1=W,X=B1,Y=C1,1>=I,7>=L,7>=X,3>=Y,L>=1,X>=1,Y>=1,4*I+3>=K,E+1>=N,C+1>=O,K+2*I>=3] * Chain [75]: 0 with precondition: [B=0,J=0,M=2,R=2,S=0,Z=0,A1=0,D1=7,C=D,E=F,K=G,L=H,C+2=T,C+2=U,E+2=V,E+2=W,X=B1,Y=C1,1>=I,7>=L,7>=X,7>=Y,L>=1,X>=1,Y>=5,4*I+3>=K,E+2>=N,C+2>=O,K+2*I>=3] * Chain [74]: 0 with precondition: [B=0,J=0,M=2,R=2,S=0,Z=0,A1=0,D1=7,C=D,E=F,K=G,L=H,C+2=T,C+2=U,E+2=V,E+2=W,X=B1,Y=C1,1>=I,7>=L,7>=X,3>=Y,L>=1,X>=1,Y>=1,4*I+3>=K,E+2>=N,C+2>=O,K+2*I>=3] * Chain [73]: 0 with precondition: [B=0,J=0,M=2,R=2,S=0,Z=1,A1=0,D1=7,C=D,E=F,K=G,L=H,C+1=T,C+1=U,E+1=V,E+1=W,X=B1,Y=C1,1>=I,7>=L,7>=X,7>=Y,L>=1,X>=1,Y>=5,4*I+3>=K,E+1>=N,C+1>=O,K+2*I>=3] * Chain [72]: 0 with precondition: [B=0,J=0,M=2,R=2,S=0,Z=1,A1=0,D1=7,C=D,E=F,K=G,L=H,C+1=T,C+1=U,E+1=V,E+1=W,X=B1,Y=C1,1>=I,7>=L,7>=X,3>=Y,L>=1,X>=1,Y>=1,4*I+3>=K,E+1>=N,C+1>=O,K+2*I>=3] * Chain [71]: 0 with precondition: [B=0,J=0,M=2,R=2,S=0,Z=1,A1=0,D1=7,C=D,E=F,K=G,L=H,C+2=T,C+2=U,E+2=V,E+2=W,X=B1,Y=C1,1>=I,7>=L,7>=X,7>=Y,L>=1,X>=1,Y>=5,4*I+3>=K,E+2>=N,C+2>=O,K+2*I>=3] * Chain [70]: 0 with precondition: [B=0,J=0,M=2,R=2,S=0,Z=1,A1=0,D1=7,C=D,E=F,K=G,L=H,C+2=T,C+2=U,E+2=V,E+2=W,X=B1,Y=C1,1>=I,7>=L,7>=X,3>=Y,L>=1,X>=1,Y>=1,4*I+3>=K,E+2>=N,C+2>=O,K+2*I>=3] * Chain [69]: 0 with precondition: [B=0,J=0,M=2,R=2,S=1,Y=4,Z=1,A1=1,C1=4,D1=7,D=C,F=E,K=G,L=H,D+3=T,D+3=U,F+3=V,F+3=W,X=B1,1>=I,7>=L,7>=X,L>=1,X>=1,4*I+3>=K,K+2*I>=3] * Chain [68]: 0 with precondition: [B=0,J=0,M=2,R=2,S=1,Y=4,Z=1,A1=1,C1=4,D1=7,D=C,F=E,K=G,L=H,D+2=T,D+2=U,F+2=V,F+2=W,X=B1,1>=I,7>=L,7>=X,L>=1,X>=1,4*I+3>=K,K+2*I>=3] * Chain [67]: 0 with precondition: [B=0,J=0,M=2,R=2,S=1,Y=4,Z=1,A1=1,C1=4,D1=7,D=C,F=E,K=G,L=H,D+1=T,D+1=U,F+1=V,F+1=W,X=B1,1>=I,7>=L,7>=X,L>=1,X>=1,4*I+3>=K,K+2*I>=3] * Chain [66]: 0 with precondition: [B=0,J=0,M=2,R=2,S=1,Z=0,A1=1,D1=7,C=D,E=F,K=G,L=H,C+1=T,C+1=U,E+1=V,E+1=W,X=B1,Y=C1,1>=I,7>=L,7>=X,7>=Y,L>=1,X>=1,Y>=5,4*I+3>=K,K+2*I>=3] * Chain [65]: 0 with precondition: [B=0,J=0,M=2,R=2,S=1,Z=0,A1=1,D1=7,C=D,E=F,K=G,L=H,C+1=T,C+1=U,E+1=V,E+1=W,X=B1,Y=C1,1>=I,7>=L,7>=X,3>=Y,L>=1,X>=1,Y>=1,4*I+3>=K,K+2*I>=3] * Chain [64]: 0 with precondition: [B=0,J=0,M=2,R=2,S=1,Z=0,A1=1,D1=7,C=D,E=F,K=G,L=H,C+2=T,C+2=U,E+2=V,E+2=W,X=B1,Y=C1,1>=I,7>=L,7>=X,7>=Y,L>=1,X>=1,Y>=5,4*I+3>=K,K+2*I>=3] * Chain [63]: 0 with precondition: [B=0,J=0,M=2,R=2,S=1,Z=0,A1=1,D1=7,C=D,E=F,K=G,L=H,C+2=T,C+2=U,E+2=V,E+2=W,X=B1,Y=C1,1>=I,7>=L,7>=X,3>=Y,L>=1,X>=1,Y>=1,4*I+3>=K,K+2*I>=3] * Chain [62]: 0 with precondition: [B=0,J=0,M=2,R=2,S=1,Z=0,A1=1,D1=7,D=C,F=E,K=G,L=H,D=T,D=U,F=V,F=W,X=B1,Y=C1,1>=I,7>=L,7>=X,7>=Y,L>=1,X>=1,Y>=5,4*I+3>=K,K+2*I>=3] * Chain [61]: 0 with precondition: [B=0,J=0,M=2,R=2,S=1,Z=0,A1=1,D1=7,D=C,F=E,K=G,L=H,D=T,D=U,F=V,F=W,X=B1,Y=C1,1>=I,7>=L,7>=X,3>=Y,L>=1,X>=1,Y>=1,4*I+3>=K,K+2*I>=3] * Chain [60]: 0 with precondition: [B=0,J=0,M=2,R=2,S=1,Z=1,A1=1,D1=7,C=D,E=F,K=G,L=H,C+1=T,C+1=U,E+1=V,E+1=W,X=B1,Y=C1,1>=I,7>=L,7>=X,7>=Y,L>=1,X>=1,Y>=5,4*I+3>=K,K+2*I>=3] * Chain [59]: 0 with precondition: [B=0,J=0,M=2,R=2,S=1,Z=1,A1=1,D1=7,C=D,E=F,K=G,L=H,C+1=T,C+1=U,E+1=V,E+1=W,X=B1,Y=C1,1>=I,7>=L,7>=X,3>=Y,L>=1,X>=1,Y>=1,4*I+3>=K,K+2*I>=3] * Chain [58]: 0 with precondition: [B=0,J=0,M=2,R=2,S=1,Z=1,A1=1,D1=7,C=D,E=F,K=G,L=H,C+2=T,C+2=U,E+2=V,E+2=W,X=B1,Y=C1,1>=I,7>=L,7>=X,7>=Y,L>=1,X>=1,Y>=5,4*I+3>=K,K+2*I>=3] * Chain [57]: 0 with precondition: [B=0,J=0,M=2,R=2,S=1,Z=1,A1=1,D1=7,C=D,E=F,K=G,L=H,C+2=T,C+2=U,E+2=V,E+2=W,X=B1,Y=C1,1>=I,7>=L,7>=X,3>=Y,L>=1,X>=1,Y>=1,4*I+3>=K,K+2*I>=3] * Chain [56]: 0 with precondition: [B=0,J=0,M=2,R=2,S=1,A1=1,D1=7,D=C,F=E,K=G,L=H,D=T,D=U,F=V,F=W,I=Z,X=B1,Y=C1,1>=I,7>=L,7>=X,7>=Y,L>=1,X>=1,Y>=5,4*I+3>=K,K+2*I>=3] * Chain [55]: 0 with precondition: [B=0,J=0,M=2,R=2,S=1,A1=1,D1=7,D=C,F=E,K=G,L=H,D=T,D=U,F=V,F=W,I=Z,X=B1,Y=C1,1>=I,7>=L,7>=X,3>=Y,L>=1,X>=1,Y>=1,4*I+3>=K,K+2*I>=3] * Chain [54]: 0 with precondition: [B=0,J=0,M=2,R=3,D=C,F=E,K=G,L=H,1>=I,7>=L,L>=1,4*I+3>=K,K+2*I>=3] #### Cost of chains of f2_loop_cont(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q): * Chain [86]: 0 with precondition: [A=2] * Chain [85]: 0 with precondition: [A=3] #### Cost of chains of f1(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,R): * Chain [97]: 0 with precondition: [] * Chain [96]: 15*s(1)+45*s(4)+15*s(5)+30*s(6)+30*s(7)+0 Such that:aux(161) =< -F+N aux(162) =< -F/2+N/2 aux(163) =< -F/3+N/3 s(1) =< aux(163) s(4) =< aux(161) s(1) =< aux(161) s(5) =< aux(161) s(6) =< aux(162) s(1) =< aux(162) s(5) =< aux(162) with precondition: [D+N=F+O,N>=1,N>=F+2,D+N>=F+1] * Chain [95]: 2*s(106)+6*s(113)+2*s(114)+4*s(115)+96*s(116)+11*s(117)+33*s(124)+11*s(125)+22*s(126)+35*s(128)+105*s(135)+35*s(136)+70*s(137)+0 Such that:aux(292) =< -D+O aux(293) =< -D+O+1 aux(294) =< -D+O+2 aux(295) =< -D/2+O/2 aux(296) =< -D/2+O/2+1 aux(297) =< -D/2+O/2+1/2 aux(298) =< -D/3+O/3 aux(299) =< -D/3+O/3+1/3 aux(300) =< -D/3+O/3+2/3 aux(301) =< -F+N aux(302) =< -F+N+1 aux(303) =< -F+N+2 aux(304) =< -F/2+N/2 aux(305) =< -F/2+N/2+1 aux(306) =< -F/2+N/2+1/2 aux(307) =< -F/3+N/3 aux(308) =< -F/3+N/3+1/3 aux(309) =< -F/3+N/3+2/3 s(120) =< aux(293) s(109) =< aux(294) s(112) =< aux(296) s(123) =< aux(297) s(128) =< aux(298) s(117) =< aux(299) s(106) =< aux(300) s(120) =< aux(302) s(109) =< aux(303) s(112) =< aux(305) s(123) =< aux(306) s(128) =< aux(307) s(117) =< aux(308) s(106) =< aux(309) s(113) =< aux(292) s(106) =< aux(292) s(114) =< aux(292) s(113) =< s(109) s(106) =< s(109) s(114) =< s(109) s(115) =< aux(295) s(106) =< aux(295) s(114) =< aux(295) s(115) =< s(112) s(106) =< s(112) s(114) =< s(112) s(113) =< aux(301) s(106) =< aux(301) s(114) =< aux(301) s(115) =< aux(304) s(106) =< aux(304) s(114) =< aux(304) s(124) =< aux(292) s(117) =< aux(292) s(125) =< aux(292) s(124) =< s(120) s(117) =< s(120) s(125) =< s(120) s(126) =< aux(295) s(117) =< aux(295) s(125) =< aux(295) s(126) =< s(123) s(117) =< s(123) s(125) =< s(123) s(124) =< aux(301) s(117) =< aux(301) s(125) =< aux(301) s(126) =< aux(304) s(117) =< aux(304) s(125) =< aux(304) s(131) =< aux(292) s(134) =< aux(295) s(131) =< aux(301) s(134) =< aux(304) s(135) =< aux(292) s(128) =< aux(292) s(136) =< aux(292) s(135) =< s(131) s(128) =< s(131) s(136) =< s(131) s(137) =< aux(295) s(128) =< aux(295) s(136) =< aux(295) s(137) =< s(134) s(128) =< s(134) s(136) =< s(134) s(135) =< aux(301) s(128) =< aux(301) s(136) =< aux(301) s(137) =< aux(304) s(128) =< aux(304) s(136) =< aux(304) with precondition: [N>=1,O>=1,O>=D+2,N>=F+2] * Chain [94]: 2*s(634)+6*s(641)+2*s(642)+4*s(643)+6*s(644)+1*s(656)+3*s(663)+1*s(664)+2*s(665)+0 Such that:s(659) =< -D+O+1 s(662) =< -D/2+O/2+1/2 s(656) =< -D/3+O/3+1/3 s(659) =< -F+N+1 s(662) =< -F/2+N/2+1/2 s(656) =< -F/3+N/3+1/3 aux(310) =< -D+O aux(311) =< -D+O+2 aux(312) =< -D/2+O/2 aux(313) =< -D/2+O/2+1 aux(314) =< -D/3+O/3+2/3 aux(315) =< -F+N aux(316) =< -F+N+2 aux(317) =< -F/2+N/2 aux(318) =< -F/2+N/2+1 aux(319) =< -F/3+N/3+2/3 s(637) =< aux(311) s(640) =< aux(313) s(634) =< aux(314) s(637) =< aux(316) s(640) =< aux(318) s(634) =< aux(319) s(641) =< aux(310) s(634) =< aux(310) s(642) =< aux(310) s(641) =< s(637) s(634) =< s(637) s(642) =< s(637) s(643) =< aux(312) s(634) =< aux(312) s(642) =< aux(312) s(643) =< s(640) s(634) =< s(640) s(642) =< s(640) s(641) =< aux(315) s(634) =< aux(315) s(642) =< aux(315) s(643) =< aux(317) s(634) =< aux(317) s(642) =< aux(317) s(663) =< aux(310) s(656) =< aux(310) s(664) =< aux(310) s(663) =< s(659) s(656) =< s(659) s(664) =< s(659) s(665) =< aux(312) s(656) =< aux(312) s(664) =< aux(312) s(665) =< s(662) s(656) =< s(662) s(664) =< s(662) s(663) =< aux(315) s(656) =< aux(315) s(664) =< aux(315) s(665) =< aux(317) s(656) =< aux(317) s(664) =< aux(317) with precondition: [N>=1,O>=1,O>=D+2,N>=F+2,F+O+2>=D+N,D+N+2>=F+O] * Chain [93]: 10*s(667)+30*s(674)+10*s(675)+20*s(676)+30*s(677)+5*s(777)+15*s(784)+5*s(785)+10*s(786)+0 Such that:aux(340) =< -D+O aux(341) =< -D+O+1 aux(342) =< -D/2+O/2 aux(343) =< -D/2+O/2+1/2 aux(344) =< -D/3+O/3 aux(345) =< -D/3+O/3+1/3 aux(346) =< -F+N aux(347) =< -F+N+1 aux(348) =< -F/2+N/2 aux(349) =< -F/2+N/2+1/2 aux(350) =< -F/3+N/3 aux(351) =< -F/3+N/3+1/3 s(670) =< aux(341) s(673) =< aux(343) s(777) =< aux(344) s(667) =< aux(345) s(670) =< aux(347) s(673) =< aux(349) s(777) =< aux(350) s(667) =< aux(351) s(674) =< aux(340) s(667) =< aux(340) s(675) =< aux(340) s(674) =< s(670) s(667) =< s(670) s(675) =< s(670) s(676) =< aux(342) s(667) =< aux(342) s(675) =< aux(342) s(676) =< s(673) s(667) =< s(673) s(675) =< s(673) s(674) =< aux(346) s(667) =< aux(346) s(675) =< aux(346) s(676) =< aux(348) s(667) =< aux(348) s(675) =< aux(348) s(780) =< aux(340) s(783) =< aux(342) s(780) =< aux(346) s(783) =< aux(348) s(784) =< aux(340) s(777) =< aux(340) s(785) =< aux(340) s(784) =< s(780) s(777) =< s(780) s(785) =< s(780) s(786) =< aux(342) s(777) =< aux(342) s(785) =< aux(342) s(786) =< s(783) s(777) =< s(783) s(785) =< s(783) s(784) =< aux(346) s(777) =< aux(346) s(785) =< aux(346) s(786) =< aux(348) s(777) =< aux(348) s(785) =< aux(348) with precondition: [N>=1,O>=1,O>=D+2,N>=F+2,F+O+1>=D+N,D+N+1>=F+O] * Chain [92]: 0 with precondition: [F+4>=N,D+4>=O] * Chain [91]: 0 with precondition: [F+3>=N,D+3>=O] * Chain [90]: 0 with precondition: [F+2>=N,D+2>=O] * Chain [89]: 0 with precondition: [F+1>=N,D+1>=O] * Chain [88]: 0 with precondition: [F>=N,D>=O] * Chain [87]...: 6*s(832)+18*s(839)+6*s(840)+12*s(841)+12*s(842)+0 Such that:aux(352) =< -D+O aux(353) =< -D/2+O/2 aux(354) =< -D/3+O/3 aux(355) =< -F+N aux(356) =< -F/2+N/2 aux(357) =< -F/3+N/3 s(832) =< aux(354) s(832) =< aux(357) s(837) =< aux(352) s(838) =< aux(353) s(837) =< aux(355) s(838) =< aux(356) s(839) =< aux(352) s(832) =< aux(352) s(840) =< aux(352) s(839) =< s(837) s(832) =< s(837) s(840) =< s(837) s(841) =< aux(353) s(832) =< aux(353) s(840) =< aux(353) s(841) =< s(838) s(832) =< s(838) s(840) =< s(838) s(839) =< aux(355) s(832) =< aux(355) s(840) =< aux(355) s(841) =< aux(356) s(832) =< aux(356) s(840) =< aux(356) with precondition: [N>=1,O>=1,O>=D+2,N>=F+2] #### Cost of chains of f0(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,R): * Chain [108]: 0 with precondition: [] * Chain [107]: 15*s(901)+45*s(902)+15*s(903)+30*s(904)+30*s(905)+0 Such that:s(898) =< -F+N s(899) =< -F/2+N/2 s(900) =< -F/3+N/3 s(901) =< s(900) s(902) =< s(898) s(901) =< s(898) s(903) =< s(898) s(904) =< s(899) s(901) =< s(899) s(903) =< s(899) with precondition: [D+N=F+O,N>=1,N>=F+2,D+N>=F+1] * Chain [106]: 35*s(928)+11*s(929)+2*s(930)+6*s(931)+2*s(932)+4*s(933)+33*s(934)+11*s(935)+22*s(936)+105*s(939)+35*s(940)+70*s(941)+96*s(942)+0 Such that:s(906) =< -D+O s(907) =< -D+O+1 s(908) =< -D+O+2 s(909) =< -D/2+O/2 s(910) =< -D/2+O/2+1 s(911) =< -D/2+O/2+1/2 s(912) =< -D/3+O/3 s(913) =< -D/3+O/3+1/3 s(914) =< -D/3+O/3+2/3 s(915) =< -F+N s(916) =< -F+N+1 s(917) =< -F+N+2 s(918) =< -F/2+N/2 s(919) =< -F/2+N/2+1 s(920) =< -F/2+N/2+1/2 s(921) =< -F/3+N/3 s(922) =< -F/3+N/3+1/3 s(923) =< -F/3+N/3+2/3 s(924) =< s(907) s(925) =< s(908) s(926) =< s(910) s(927) =< s(911) s(928) =< s(912) s(929) =< s(913) s(930) =< s(914) s(924) =< s(916) s(925) =< s(917) s(926) =< s(919) s(927) =< s(920) s(928) =< s(921) s(929) =< s(922) s(930) =< s(923) s(931) =< s(906) s(930) =< s(906) s(932) =< s(906) s(931) =< s(925) s(930) =< s(925) s(932) =< s(925) s(933) =< s(909) s(930) =< s(909) s(932) =< s(909) s(933) =< s(926) s(930) =< s(926) s(932) =< s(926) s(931) =< s(915) s(930) =< s(915) s(932) =< s(915) s(933) =< s(918) s(930) =< s(918) s(932) =< s(918) s(934) =< s(906) s(929) =< s(906) s(935) =< s(906) s(934) =< s(924) s(929) =< s(924) s(935) =< s(924) s(936) =< s(909) s(929) =< s(909) s(935) =< s(909) s(936) =< s(927) s(929) =< s(927) s(935) =< s(927) s(934) =< s(915) s(929) =< s(915) s(935) =< s(915) s(936) =< s(918) s(929) =< s(918) s(935) =< s(918) s(937) =< s(906) s(938) =< s(909) s(937) =< s(915) s(938) =< s(918) s(939) =< s(906) s(928) =< s(906) s(940) =< s(906) s(939) =< s(937) s(928) =< s(937) s(940) =< s(937) s(941) =< s(909) s(928) =< s(909) s(940) =< s(909) s(941) =< s(938) s(928) =< s(938) s(940) =< s(938) s(939) =< s(915) s(928) =< s(915) s(940) =< s(915) s(941) =< s(918) s(928) =< s(918) s(940) =< s(918) with precondition: [N>=1,O>=1,O>=D+2,N>=F+2] * Chain [105]: 1*s(945)+2*s(958)+6*s(959)+2*s(960)+4*s(961)+3*s(962)+1*s(963)+2*s(964)+6*s(965)+0 Such that:s(946) =< -D+O s(943) =< -D+O+1 s(947) =< -D+O+2 s(948) =< -D/2+O/2 s(949) =< -D/2+O/2+1 s(944) =< -D/2+O/2+1/2 s(945) =< -D/3+O/3+1/3 s(950) =< -D/3+O/3+2/3 s(951) =< -F+N s(943) =< -F+N+1 s(952) =< -F+N+2 s(953) =< -F/2+N/2 s(954) =< -F/2+N/2+1 s(944) =< -F/2+N/2+1/2 s(945) =< -F/3+N/3+1/3 s(955) =< -F/3+N/3+2/3 s(956) =< s(947) s(957) =< s(949) s(958) =< s(950) s(956) =< s(952) s(957) =< s(954) s(958) =< s(955) s(959) =< s(946) s(958) =< s(946) s(960) =< s(946) s(959) =< s(956) s(958) =< s(956) s(960) =< s(956) s(961) =< s(948) s(958) =< s(948) s(960) =< s(948) s(961) =< s(957) s(958) =< s(957) s(960) =< s(957) s(959) =< s(951) s(958) =< s(951) s(960) =< s(951) s(961) =< s(953) s(958) =< s(953) s(960) =< s(953) s(962) =< s(946) s(945) =< s(946) s(963) =< s(946) s(962) =< s(943) s(945) =< s(943) s(963) =< s(943) s(964) =< s(948) s(945) =< s(948) s(963) =< s(948) s(964) =< s(944) s(945) =< s(944) s(963) =< s(944) s(962) =< s(951) s(945) =< s(951) s(963) =< s(951) s(964) =< s(953) s(945) =< s(953) s(963) =< s(953) with precondition: [N>=1,O>=1,O>=D+2,N>=F+2,F+O+2>=D+N,D+N+2>=F+O] * Chain [104]: 5*s(980)+10*s(981)+30*s(982)+10*s(983)+20*s(984)+15*s(987)+5*s(988)+10*s(989)+30*s(990)+0 Such that:s(966) =< -D+O s(967) =< -D+O+1 s(968) =< -D/2+O/2 s(969) =< -D/2+O/2+1/2 s(970) =< -D/3+O/3 s(971) =< -D/3+O/3+1/3 s(972) =< -F+N s(973) =< -F+N+1 s(974) =< -F/2+N/2 s(975) =< -F/2+N/2+1/2 s(976) =< -F/3+N/3 s(977) =< -F/3+N/3+1/3 s(978) =< s(967) s(979) =< s(969) s(980) =< s(970) s(981) =< s(971) s(978) =< s(973) s(979) =< s(975) s(980) =< s(976) s(981) =< s(977) s(982) =< s(966) s(981) =< s(966) s(983) =< s(966) s(982) =< s(978) s(981) =< s(978) s(983) =< s(978) s(984) =< s(968) s(981) =< s(968) s(983) =< s(968) s(984) =< s(979) s(981) =< s(979) s(983) =< s(979) s(982) =< s(972) s(981) =< s(972) s(983) =< s(972) s(984) =< s(974) s(981) =< s(974) s(983) =< s(974) s(985) =< s(966) s(986) =< s(968) s(985) =< s(972) s(986) =< s(974) s(987) =< s(966) s(980) =< s(966) s(988) =< s(966) s(987) =< s(985) s(980) =< s(985) s(988) =< s(985) s(989) =< s(968) s(980) =< s(968) s(988) =< s(968) s(989) =< s(986) s(980) =< s(986) s(988) =< s(986) s(987) =< s(972) s(980) =< s(972) s(988) =< s(972) s(989) =< s(974) s(980) =< s(974) s(988) =< s(974) with precondition: [N>=1,O>=1,O>=D+2,N>=F+2,F+O+1>=D+N,D+N+1>=F+O] * Chain [103]: 0 with precondition: [F+4>=N,D+4>=O] * Chain [102]: 0 with precondition: [F+3>=N,D+3>=O] * Chain [101]: 0 with precondition: [F+2>=N,D+2>=O] * Chain [100]: 0 with precondition: [F+1>=N,D+1>=O] * Chain [99]: 0 with precondition: [F>=N,D>=O] * Chain [98]...: 6*s(997)+18*s(1000)+6*s(1001)+12*s(1002)+12*s(1003)+0 Such that:s(991) =< -D+O s(992) =< -D/2+O/2 s(993) =< -D/3+O/3 s(994) =< -F+N s(995) =< -F/2+N/2 s(996) =< -F/3+N/3 s(997) =< s(993) s(997) =< s(996) s(998) =< s(991) s(999) =< s(992) s(998) =< s(994) s(999) =< s(995) s(1000) =< s(991) s(997) =< s(991) s(1001) =< s(991) s(1000) =< s(998) s(997) =< s(998) s(1001) =< s(998) s(1002) =< s(992) s(997) =< s(992) s(1001) =< s(992) s(1002) =< s(999) s(997) =< s(999) s(1001) =< s(999) s(1000) =< s(994) s(997) =< s(994) s(1001) =< s(994) s(1002) =< s(995) s(997) =< s(995) s(1001) =< s(995) with precondition: [N>=1,O>=1,O>=D+2,N>=F+2] Closed-form bounds of f0(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,R): ------------------------------------- * Chain [108] with precondition: [] - Upper bound: 0 - Complexity: constant * Chain [107] with precondition: [D+N=F+O,N>=1,N>=F+2,D+N>=F+1] - Upper bound: inf - Complexity: infinity * Chain [106] with precondition: [N>=1,O>=1,O>=D+2,N>=F+2] - Upper bound: inf - Complexity: infinity * Chain [105] with precondition: [N>=1,O>=1,O>=D+2,N>=F+2,F+O+2>=D+N,D+N+2>=F+O] - Upper bound: inf - Complexity: infinity * Chain [104] with precondition: [N>=1,O>=1,O>=D+2,N>=F+2,F+O+1>=D+N,D+N+1>=F+O] - Upper bound: inf - Complexity: infinity * Chain [103] with precondition: [F+4>=N,D+4>=O] - Upper bound: 0 - Complexity: constant * Chain [102] with precondition: [F+3>=N,D+3>=O] - Upper bound: 0 - Complexity: constant * Chain [101] with precondition: [F+2>=N,D+2>=O] - Upper bound: 0 - Complexity: constant * Chain [100] with precondition: [F+1>=N,D+1>=O] - Upper bound: 0 - Complexity: constant * Chain [99] with precondition: [F>=N,D>=O] - Upper bound: 0 - Complexity: constant * Chain [98]... with precondition: [N>=1,O>=1,O>=D+2,N>=F+2] - Upper bound: inf - Complexity: infinity ### Maximum cost of f0(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,R): inf Asymptotic class: infinity * Total analysis performed in 128085 ms.