MAYBE * Step 1: ArgumentFilter MAYBE + Considered Problem: Rules: 0. f0(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f1(A,B,C,D,E,F,G,H,I,J,K,L,M,N) True (1,1) 1. f1(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f7(1,C,C,E,E,P,O,0,1,P,O,7,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] (?,1) 2. f1(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f7(1,C,C,E,E,P,O,0,1,P,O,7,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] (?,1) 3. f1(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f7(1,1 + C,1 + C,1 + E,1 + E,P,4,1,1,P,4,7,M,N) [7 >= P && P >= 1] (?,1) 4. f1(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f2(0,C,C,E,E,3,P,0,0,3,P,2,M,N) [7 >= P && 3 >= P && P >= 1] (?,1) 5. f1(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f2(0,C,C,E,E,3,P,0,0,3,P,2,M,N) [7 >= P && P >= 5] (?,1) 6. f1(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f2(0,1 + C,1 + C,1 + E,1 + E,3,4,1,0,3,4,2,M,N) True (?,1) 7. f2(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f7(1,C,C,E,E,P,O,H,1,P,O,7,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] (?,1) 8. f2(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f7(1,C,C,E,E,P,O,H,1,P,O,7,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] (?,1) 9. f2(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f7(1,1 + C,1 + C,1 + E,1 + E,P,4,1,1,P,4,7,M,N) [7 >= P && P >= 1] (?,1) 10. f2(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f3(0,C,C,E,E,P,O,H,0,P,O,3,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] (?,1) 11. f2(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f3(0,C,C,E,E,P,O,H,0,P,O,3,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] (?,1) 12. f2(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f3(0,1 + C,1 + C,1 + E,1 + E,P,4,1,0,P,4,3,M,N) [7 >= P && P >= 1] (?,1) 13. f3(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f6(1,C,C,E,E,P,O,H,1,P,O,6,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] (?,1) 14. f3(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f6(1,C,C,E,E,P,O,H,1,P,O,6,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] (?,1) 15. f3(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f6(1,1 + C,1 + C,1 + E,1 + E,P,4,1,1,P,4,6,M,N) [7 >= P && P >= 1] (?,1) 16. f6(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f4(P,C,C,E,E,O,2,0,P,O,2,4,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1] (?,1) 17. f6(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f4(P,C,C,E,E,O,7,1,P,O,7,4,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1 && H = 1] (?,1) 18. f4(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f2(0,C,C,E,E,P,O,0,0,P,O,2,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1 && H = 1] (?,1) 19. f4(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f2(0,C,C,E,E,P,O,0,0,P,O,2,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && O >= 5 && P >= 1 && H = 1] (?,1) 20. f4(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f2(0,1 + C,1 + C,1 + E,1 + E,P,4,0,0,P,4,2,M,N) [M >= 2 + E && N >= 2 + C && M >= 1 && N >= 1 && 7 >= P && P >= 1] (?,1) 21. f4(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f7(0,C,C,E,E,P,O,H,0,P,O,7,M,N) [E >= M && C >= N && 7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] (?,1) 22. f4(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f7(0,C,C,E,E,P,O,H,0,P,O,7,M,N) [E >= M && C >= N && 7 >= O && 7 >= P && O >= 5 && P >= 1] (?,1) 23. f4(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f7(0,1 + C,1 + C,1 + E,1 + E,P,4,1,0,P,4,7,M,N) [1 + E >= M && 1 + C >= N && 7 >= P && P >= 1] (?,1) 24. f4(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f7(1,C,C,E,E,P,O,H,1,P,O,7,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] (?,1) 25. f4(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f7(1,C,C,E,E,P,O,H,1,P,O,7,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] (?,1) 26. f4(A,B,C,D,E,F,G,H,I,J,K,L,M,N) -> f7(1,1 + C,1 + C,1 + E,1 + E,P,4,1,1,P,4,7,M,N) [7 >= P && P >= 1] (?,1) Signature: {(f0,14);(f1,14);(f2,14);(f3,14);(f4,14);(f6,14);(f7,14)} Flow Graph: [0->{1,2,3,4,5,6},1->{},2->{},3->{},4->{7,8,9,10,11,12},5->{7,8,9,10,11,12},6->{7,8,9,10,11,12},7->{} ,8->{},9->{},10->{13,14,15},11->{13,14,15},12->{13,14,15},13->{16,17},14->{16,17},15->{16,17},16->{18,19,20 ,21,22,23,24,25,26},17->{18,19,20,21,22,23,24,25,26},18->{7,8,9,10,11,12},19->{7,8,9,10,11,12},20->{7,8,9,10 ,11,12},21->{},22->{},23->{},24->{},25->{},26->{}] + Applied Processor: ArgumentFilter [0,1,3,5,6,8,9,10,11] + Details: We remove following argument positions: [0,1,3,5,6,8,9,10,11]. * Step 2: UnsatPaths MAYBE + Considered Problem: Rules: 0. f0(C,E,H,M,N) -> f1(C,E,H,M,N) True (1,1) 1. f1(C,E,H,M,N) -> f7(C,E,0,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] (?,1) 2. f1(C,E,H,M,N) -> f7(C,E,0,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] (?,1) 3. f1(C,E,H,M,N) -> f7(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] (?,1) 4. f1(C,E,H,M,N) -> f2(C,E,0,M,N) [7 >= P && 3 >= P && P >= 1] (?,1) 5. f1(C,E,H,M,N) -> f2(C,E,0,M,N) [7 >= P && P >= 5] (?,1) 6. f1(C,E,H,M,N) -> f2(1 + C,1 + E,1,M,N) True (?,1) 7. f2(C,E,H,M,N) -> f7(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] (?,1) 8. f2(C,E,H,M,N) -> f7(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] (?,1) 9. f2(C,E,H,M,N) -> f7(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] (?,1) 10. f2(C,E,H,M,N) -> f3(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] (?,1) 11. f2(C,E,H,M,N) -> f3(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] (?,1) 12. f2(C,E,H,M,N) -> f3(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] (?,1) 13. f3(C,E,H,M,N) -> f6(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] (?,1) 14. f3(C,E,H,M,N) -> f6(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] (?,1) 15. f3(C,E,H,M,N) -> f6(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] (?,1) 16. f6(C,E,H,M,N) -> f4(C,E,0,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1] (?,1) 17. f6(C,E,H,M,N) -> f4(C,E,1,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1 && H = 1] (?,1) 18. f4(C,E,H,M,N) -> f2(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1 && H = 1] (?,1) 19. f4(C,E,H,M,N) -> f2(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && O >= 5 && P >= 1 && H = 1] (?,1) 20. f4(C,E,H,M,N) -> f2(1 + C,1 + E,0,M,N) [M >= 2 + E && N >= 2 + C && M >= 1 && N >= 1 && 7 >= P && P >= 1] (?,1) 21. f4(C,E,H,M,N) -> f7(C,E,H,M,N) [E >= M && C >= N && 7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] (?,1) 22. f4(C,E,H,M,N) -> f7(C,E,H,M,N) [E >= M && C >= N && 7 >= O && 7 >= P && O >= 5 && P >= 1] (?,1) 23. f4(C,E,H,M,N) -> f7(1 + C,1 + E,1,M,N) [1 + E >= M && 1 + C >= N && 7 >= P && P >= 1] (?,1) 24. f4(C,E,H,M,N) -> f7(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] (?,1) 25. f4(C,E,H,M,N) -> f7(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] (?,1) 26. f4(C,E,H,M,N) -> f7(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] (?,1) Signature: {(f0,14);(f1,14);(f2,14);(f3,14);(f4,14);(f6,14);(f7,14)} Flow Graph: [0->{1,2,3,4,5,6},1->{},2->{},3->{},4->{7,8,9,10,11,12},5->{7,8,9,10,11,12},6->{7,8,9,10,11,12},7->{} ,8->{},9->{},10->{13,14,15},11->{13,14,15},12->{13,14,15},13->{16,17},14->{16,17},15->{16,17},16->{18,19,20 ,21,22,23,24,25,26},17->{18,19,20,21,22,23,24,25,26},18->{7,8,9,10,11,12},19->{7,8,9,10,11,12},20->{7,8,9,10 ,11,12},21->{},22->{},23->{},24->{},25->{},26->{}] + Applied Processor: UnsatPaths + Details: We remove following edges from the transition graph: [(16,18),(16,19)] * Step 3: FromIts MAYBE + Considered Problem: Rules: 0. f0(C,E,H,M,N) -> f1(C,E,H,M,N) True (1,1) 1. f1(C,E,H,M,N) -> f7(C,E,0,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] (?,1) 2. f1(C,E,H,M,N) -> f7(C,E,0,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] (?,1) 3. f1(C,E,H,M,N) -> f7(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] (?,1) 4. f1(C,E,H,M,N) -> f2(C,E,0,M,N) [7 >= P && 3 >= P && P >= 1] (?,1) 5. f1(C,E,H,M,N) -> f2(C,E,0,M,N) [7 >= P && P >= 5] (?,1) 6. f1(C,E,H,M,N) -> f2(1 + C,1 + E,1,M,N) True (?,1) 7. f2(C,E,H,M,N) -> f7(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] (?,1) 8. f2(C,E,H,M,N) -> f7(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] (?,1) 9. f2(C,E,H,M,N) -> f7(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] (?,1) 10. f2(C,E,H,M,N) -> f3(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] (?,1) 11. f2(C,E,H,M,N) -> f3(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] (?,1) 12. f2(C,E,H,M,N) -> f3(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] (?,1) 13. f3(C,E,H,M,N) -> f6(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] (?,1) 14. f3(C,E,H,M,N) -> f6(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] (?,1) 15. f3(C,E,H,M,N) -> f6(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] (?,1) 16. f6(C,E,H,M,N) -> f4(C,E,0,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1] (?,1) 17. f6(C,E,H,M,N) -> f4(C,E,1,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1 && H = 1] (?,1) 18. f4(C,E,H,M,N) -> f2(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1 && H = 1] (?,1) 19. f4(C,E,H,M,N) -> f2(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && O >= 5 && P >= 1 && H = 1] (?,1) 20. f4(C,E,H,M,N) -> f2(1 + C,1 + E,0,M,N) [M >= 2 + E && N >= 2 + C && M >= 1 && N >= 1 && 7 >= P && P >= 1] (?,1) 21. f4(C,E,H,M,N) -> f7(C,E,H,M,N) [E >= M && C >= N && 7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] (?,1) 22. f4(C,E,H,M,N) -> f7(C,E,H,M,N) [E >= M && C >= N && 7 >= O && 7 >= P && O >= 5 && P >= 1] (?,1) 23. f4(C,E,H,M,N) -> f7(1 + C,1 + E,1,M,N) [1 + E >= M && 1 + C >= N && 7 >= P && P >= 1] (?,1) 24. f4(C,E,H,M,N) -> f7(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] (?,1) 25. f4(C,E,H,M,N) -> f7(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] (?,1) 26. f4(C,E,H,M,N) -> f7(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] (?,1) Signature: {(f0,14);(f1,14);(f2,14);(f3,14);(f4,14);(f6,14);(f7,14)} Flow Graph: [0->{1,2,3,4,5,6},1->{},2->{},3->{},4->{7,8,9,10,11,12},5->{7,8,9,10,11,12},6->{7,8,9,10,11,12},7->{} ,8->{},9->{},10->{13,14,15},11->{13,14,15},12->{13,14,15},13->{16,17},14->{16,17},15->{16,17},16->{20,21,22 ,23,24,25,26},17->{18,19,20,21,22,23,24,25,26},18->{7,8,9,10,11,12},19->{7,8,9,10,11,12},20->{7,8,9,10,11 ,12},21->{},22->{},23->{},24->{},25->{},26->{}] + Applied Processor: FromIts + Details: () * Step 4: Unfold MAYBE + Considered Problem: Rules: f0(C,E,H,M,N) -> f1(C,E,H,M,N) True f1(C,E,H,M,N) -> f7(C,E,0,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] f1(C,E,H,M,N) -> f7(C,E,0,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] f1(C,E,H,M,N) -> f7(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] f1(C,E,H,M,N) -> f2(C,E,0,M,N) [7 >= P && 3 >= P && P >= 1] f1(C,E,H,M,N) -> f2(C,E,0,M,N) [7 >= P && P >= 5] f1(C,E,H,M,N) -> f2(1 + C,1 + E,1,M,N) True f2(C,E,H,M,N) -> f7(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] f2(C,E,H,M,N) -> f7(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] f2(C,E,H,M,N) -> f7(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] f2(C,E,H,M,N) -> f3(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] f2(C,E,H,M,N) -> f3(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] f2(C,E,H,M,N) -> f3(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] f3(C,E,H,M,N) -> f6(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] f3(C,E,H,M,N) -> f6(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] f3(C,E,H,M,N) -> f6(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] f6(C,E,H,M,N) -> f4(C,E,0,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1] f6(C,E,H,M,N) -> f4(C,E,1,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1 && H = 1] f4(C,E,H,M,N) -> f2(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1 && H = 1] f4(C,E,H,M,N) -> f2(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && O >= 5 && P >= 1 && H = 1] f4(C,E,H,M,N) -> f2(1 + C,1 + E,0,M,N) [M >= 2 + E && N >= 2 + C && M >= 1 && N >= 1 && 7 >= P && P >= 1] f4(C,E,H,M,N) -> f7(C,E,H,M,N) [E >= M && C >= N && 7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] f4(C,E,H,M,N) -> f7(C,E,H,M,N) [E >= M && C >= N && 7 >= O && 7 >= P && O >= 5 && P >= 1] f4(C,E,H,M,N) -> f7(1 + C,1 + E,1,M,N) [1 + E >= M && 1 + C >= N && 7 >= P && P >= 1] f4(C,E,H,M,N) -> f7(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] f4(C,E,H,M,N) -> f7(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] f4(C,E,H,M,N) -> f7(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] Signature: {(f0,14);(f1,14);(f2,14);(f3,14);(f4,14);(f6,14);(f7,14)} Rule Graph: [0->{1,2,3,4,5,6},1->{},2->{},3->{},4->{7,8,9,10,11,12},5->{7,8,9,10,11,12},6->{7,8,9,10,11,12},7->{} ,8->{},9->{},10->{13,14,15},11->{13,14,15},12->{13,14,15},13->{16,17},14->{16,17},15->{16,17},16->{20,21,22 ,23,24,25,26},17->{18,19,20,21,22,23,24,25,26},18->{7,8,9,10,11,12},19->{7,8,9,10,11,12},20->{7,8,9,10,11 ,12},21->{},22->{},23->{},24->{},25->{},26->{}] + Applied Processor: Unfold + Details: () * Step 5: AddSinks MAYBE + Considered Problem: Rules: f0.0(C,E,H,M,N) -> f1.1(C,E,H,M,N) True f0.0(C,E,H,M,N) -> f1.2(C,E,H,M,N) True f0.0(C,E,H,M,N) -> f1.3(C,E,H,M,N) True f0.0(C,E,H,M,N) -> f1.4(C,E,H,M,N) True f0.0(C,E,H,M,N) -> f1.5(C,E,H,M,N) True f0.0(C,E,H,M,N) -> f1.6(C,E,H,M,N) True f1.1(C,E,H,M,N) -> f7.27(C,E,0,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] f1.2(C,E,H,M,N) -> f7.27(C,E,0,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] f1.3(C,E,H,M,N) -> f7.27(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] f1.4(C,E,H,M,N) -> f2.7(C,E,0,M,N) [7 >= P && 3 >= P && P >= 1] f1.4(C,E,H,M,N) -> f2.8(C,E,0,M,N) [7 >= P && 3 >= P && P >= 1] f1.4(C,E,H,M,N) -> f2.9(C,E,0,M,N) [7 >= P && 3 >= P && P >= 1] f1.4(C,E,H,M,N) -> f2.10(C,E,0,M,N) [7 >= P && 3 >= P && P >= 1] f1.4(C,E,H,M,N) -> f2.11(C,E,0,M,N) [7 >= P && 3 >= P && P >= 1] f1.4(C,E,H,M,N) -> f2.12(C,E,0,M,N) [7 >= P && 3 >= P && P >= 1] f1.5(C,E,H,M,N) -> f2.7(C,E,0,M,N) [7 >= P && P >= 5] f1.5(C,E,H,M,N) -> f2.8(C,E,0,M,N) [7 >= P && P >= 5] f1.5(C,E,H,M,N) -> f2.9(C,E,0,M,N) [7 >= P && P >= 5] f1.5(C,E,H,M,N) -> f2.10(C,E,0,M,N) [7 >= P && P >= 5] f1.5(C,E,H,M,N) -> f2.11(C,E,0,M,N) [7 >= P && P >= 5] f1.5(C,E,H,M,N) -> f2.12(C,E,0,M,N) [7 >= P && P >= 5] f1.6(C,E,H,M,N) -> f2.7(1 + C,1 + E,1,M,N) True f1.6(C,E,H,M,N) -> f2.8(1 + C,1 + E,1,M,N) True f1.6(C,E,H,M,N) -> f2.9(1 + C,1 + E,1,M,N) True f1.6(C,E,H,M,N) -> f2.10(1 + C,1 + E,1,M,N) True f1.6(C,E,H,M,N) -> f2.11(1 + C,1 + E,1,M,N) True f1.6(C,E,H,M,N) -> f2.12(1 + C,1 + E,1,M,N) True f2.7(C,E,H,M,N) -> f7.27(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] f2.8(C,E,H,M,N) -> f7.27(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] f2.9(C,E,H,M,N) -> f7.27(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] f2.10(C,E,H,M,N) -> f3.13(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] f2.10(C,E,H,M,N) -> f3.14(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] f2.10(C,E,H,M,N) -> f3.15(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] f2.11(C,E,H,M,N) -> f3.13(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] f2.11(C,E,H,M,N) -> f3.14(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] f2.11(C,E,H,M,N) -> f3.15(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] f2.12(C,E,H,M,N) -> f3.13(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] f2.12(C,E,H,M,N) -> f3.14(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] f2.12(C,E,H,M,N) -> f3.15(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] f3.13(C,E,H,M,N) -> f6.16(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] f3.13(C,E,H,M,N) -> f6.17(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] f3.14(C,E,H,M,N) -> f6.16(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] f3.14(C,E,H,M,N) -> f6.17(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] f3.15(C,E,H,M,N) -> f6.16(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] f3.15(C,E,H,M,N) -> f6.17(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] f6.16(C,E,H,M,N) -> f4.20(C,E,0,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1] f6.16(C,E,H,M,N) -> f4.21(C,E,0,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1] f6.16(C,E,H,M,N) -> f4.22(C,E,0,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1] f6.16(C,E,H,M,N) -> f4.23(C,E,0,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1] f6.16(C,E,H,M,N) -> f4.24(C,E,0,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1] f6.16(C,E,H,M,N) -> f4.25(C,E,0,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1] f6.16(C,E,H,M,N) -> f4.26(C,E,0,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1] f6.17(C,E,H,M,N) -> f4.18(C,E,1,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1 && H = 1] f6.17(C,E,H,M,N) -> f4.19(C,E,1,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1 && H = 1] f6.17(C,E,H,M,N) -> f4.20(C,E,1,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1 && H = 1] f6.17(C,E,H,M,N) -> f4.21(C,E,1,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1 && H = 1] f6.17(C,E,H,M,N) -> f4.22(C,E,1,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1 && H = 1] f6.17(C,E,H,M,N) -> f4.23(C,E,1,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1 && H = 1] f6.17(C,E,H,M,N) -> f4.24(C,E,1,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1 && H = 1] f6.17(C,E,H,M,N) -> f4.25(C,E,1,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1 && H = 1] f6.17(C,E,H,M,N) -> f4.26(C,E,1,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1 && H = 1] f4.18(C,E,H,M,N) -> f2.7(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1 && H = 1] f4.18(C,E,H,M,N) -> f2.8(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1 && H = 1] f4.18(C,E,H,M,N) -> f2.9(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1 && H = 1] f4.18(C,E,H,M,N) -> f2.10(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1 && H = 1] f4.18(C,E,H,M,N) -> f2.11(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1 && H = 1] f4.18(C,E,H,M,N) -> f2.12(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1 && H = 1] f4.19(C,E,H,M,N) -> f2.7(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && O >= 5 && P >= 1 && H = 1] f4.19(C,E,H,M,N) -> f2.8(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && O >= 5 && P >= 1 && H = 1] f4.19(C,E,H,M,N) -> f2.9(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && O >= 5 && P >= 1 && H = 1] f4.19(C,E,H,M,N) -> f2.10(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && O >= 5 && P >= 1 && H = 1] f4.19(C,E,H,M,N) -> f2.11(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && O >= 5 && P >= 1 && H = 1] f4.19(C,E,H,M,N) -> f2.12(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && O >= 5 && P >= 1 && H = 1] f4.20(C,E,H,M,N) -> f2.7(1 + C,1 + E,0,M,N) [M >= 2 + E && N >= 2 + C && M >= 1 && N >= 1 && 7 >= P && P >= 1] f4.20(C,E,H,M,N) -> f2.8(1 + C,1 + E,0,M,N) [M >= 2 + E && N >= 2 + C && M >= 1 && N >= 1 && 7 >= P && P >= 1] f4.20(C,E,H,M,N) -> f2.9(1 + C,1 + E,0,M,N) [M >= 2 + E && N >= 2 + C && M >= 1 && N >= 1 && 7 >= P && P >= 1] f4.20(C,E,H,M,N) -> f2.10(1 + C,1 + E,0,M,N) [M >= 2 + E && N >= 2 + C && M >= 1 && N >= 1 && 7 >= P && P >= 1] f4.20(C,E,H,M,N) -> f2.11(1 + C,1 + E,0,M,N) [M >= 2 + E && N >= 2 + C && M >= 1 && N >= 1 && 7 >= P && P >= 1] f4.20(C,E,H,M,N) -> f2.12(1 + C,1 + E,0,M,N) [M >= 2 + E && N >= 2 + C && M >= 1 && N >= 1 && 7 >= P && P >= 1] f4.21(C,E,H,M,N) -> f7.27(C,E,H,M,N) [E >= M && C >= N && 7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] f4.22(C,E,H,M,N) -> f7.27(C,E,H,M,N) [E >= M && C >= N && 7 >= O && 7 >= P && O >= 5 && P >= 1] f4.23(C,E,H,M,N) -> f7.27(1 + C,1 + E,1,M,N) [1 + E >= M && 1 + C >= N && 7 >= P && P >= 1] f4.24(C,E,H,M,N) -> f7.27(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] f4.25(C,E,H,M,N) -> f7.27(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] f4.26(C,E,H,M,N) -> f7.27(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] Signature: {(f0.0,5) ;(f1.1,5) ;(f1.2,5) ;(f1.3,5) ;(f1.4,5) ;(f1.5,5) ;(f1.6,5) ;(f2.10,5) ;(f2.11,5) ;(f2.12,5) ;(f2.7,5) ;(f2.8,5) ;(f2.9,5) ;(f3.13,5) ;(f3.14,5) ;(f3.15,5) ;(f4.18,5) ;(f4.19,5) ;(f4.20,5) ;(f4.21,5) ;(f4.22,5) ;(f4.23,5) ;(f4.24,5) ;(f4.25,5) ;(f4.26,5) ;(f6.16,5) ;(f6.17,5) ;(f7.27,5)} Rule Graph: [0->{6},1->{7},2->{8},3->{9,10,11,12,13,14},4->{15,16,17,18,19,20},5->{21,22,23,24,25,26},6->{},7->{} ,8->{},9->{27},10->{28},11->{29},12->{30,31,32},13->{33,34,35},14->{36,37,38},15->{27},16->{28},17->{29} ,18->{30,31,32},19->{33,34,35},20->{36,37,38},21->{27},22->{28},23->{29},24->{30,31,32},25->{33,34,35} ,26->{36,37,38},27->{},28->{},29->{},30->{39,40},31->{41,42},32->{43,44},33->{39,40},34->{41,42},35->{43,44} ,36->{39,40},37->{41,42},38->{43,44},39->{45,46,47,48,49,50,51},40->{52,53,54,55,56,57,58,59,60},41->{45,46 ,47,48,49,50,51},42->{52,53,54,55,56,57,58,59,60},43->{45,46,47,48,49,50,51},44->{52,53,54,55,56,57,58,59 ,60},45->{73,74,75,76,77,78},46->{79},47->{80},48->{81},49->{82},50->{83},51->{84},52->{61,62,63,64,65,66} ,53->{67,68,69,70,71,72},54->{73,74,75,76,77,78},55->{79},56->{80},57->{81},58->{82},59->{83},60->{84} ,61->{27},62->{28},63->{29},64->{30,31,32},65->{33,34,35},66->{36,37,38},67->{27},68->{28},69->{29},70->{30 ,31,32},71->{33,34,35},72->{36,37,38},73->{27},74->{28},75->{29},76->{30,31,32},77->{33,34,35},78->{36,37 ,38},79->{},80->{},81->{},82->{},83->{},84->{}] + Applied Processor: AddSinks + Details: () * Step 6: Failure MAYBE + Considered Problem: Rules: f0.0(C,E,H,M,N) -> f1.1(C,E,H,M,N) True f0.0(C,E,H,M,N) -> f1.2(C,E,H,M,N) True f0.0(C,E,H,M,N) -> f1.3(C,E,H,M,N) True f0.0(C,E,H,M,N) -> f1.4(C,E,H,M,N) True f0.0(C,E,H,M,N) -> f1.5(C,E,H,M,N) True f0.0(C,E,H,M,N) -> f1.6(C,E,H,M,N) True f1.1(C,E,H,M,N) -> f7.27(C,E,0,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] f1.2(C,E,H,M,N) -> f7.27(C,E,0,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] f1.3(C,E,H,M,N) -> f7.27(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] f1.4(C,E,H,M,N) -> f2.7(C,E,0,M,N) [7 >= P && 3 >= P && P >= 1] f1.4(C,E,H,M,N) -> f2.8(C,E,0,M,N) [7 >= P && 3 >= P && P >= 1] f1.4(C,E,H,M,N) -> f2.9(C,E,0,M,N) [7 >= P && 3 >= P && P >= 1] f1.4(C,E,H,M,N) -> f2.10(C,E,0,M,N) [7 >= P && 3 >= P && P >= 1] f1.4(C,E,H,M,N) -> f2.11(C,E,0,M,N) [7 >= P && 3 >= P && P >= 1] f1.4(C,E,H,M,N) -> f2.12(C,E,0,M,N) [7 >= P && 3 >= P && P >= 1] f1.5(C,E,H,M,N) -> f2.7(C,E,0,M,N) [7 >= P && P >= 5] f1.5(C,E,H,M,N) -> f2.8(C,E,0,M,N) [7 >= P && P >= 5] f1.5(C,E,H,M,N) -> f2.9(C,E,0,M,N) [7 >= P && P >= 5] f1.5(C,E,H,M,N) -> f2.10(C,E,0,M,N) [7 >= P && P >= 5] f1.5(C,E,H,M,N) -> f2.11(C,E,0,M,N) [7 >= P && P >= 5] f1.5(C,E,H,M,N) -> f2.12(C,E,0,M,N) [7 >= P && P >= 5] f1.6(C,E,H,M,N) -> f2.7(1 + C,1 + E,1,M,N) True f1.6(C,E,H,M,N) -> f2.8(1 + C,1 + E,1,M,N) True f1.6(C,E,H,M,N) -> f2.9(1 + C,1 + E,1,M,N) True f1.6(C,E,H,M,N) -> f2.10(1 + C,1 + E,1,M,N) True f1.6(C,E,H,M,N) -> f2.11(1 + C,1 + E,1,M,N) True f1.6(C,E,H,M,N) -> f2.12(1 + C,1 + E,1,M,N) True f2.7(C,E,H,M,N) -> f7.27(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] f2.8(C,E,H,M,N) -> f7.27(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] f2.9(C,E,H,M,N) -> f7.27(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] f2.10(C,E,H,M,N) -> f3.13(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] f2.10(C,E,H,M,N) -> f3.14(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] f2.10(C,E,H,M,N) -> f3.15(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] f2.11(C,E,H,M,N) -> f3.13(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] f2.11(C,E,H,M,N) -> f3.14(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] f2.11(C,E,H,M,N) -> f3.15(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] f2.12(C,E,H,M,N) -> f3.13(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] f2.12(C,E,H,M,N) -> f3.14(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] f2.12(C,E,H,M,N) -> f3.15(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] f3.13(C,E,H,M,N) -> f6.16(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] f3.13(C,E,H,M,N) -> f6.17(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] f3.14(C,E,H,M,N) -> f6.16(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] f3.14(C,E,H,M,N) -> f6.17(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] f3.15(C,E,H,M,N) -> f6.16(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] f3.15(C,E,H,M,N) -> f6.17(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] f6.16(C,E,H,M,N) -> f4.20(C,E,0,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1] f6.16(C,E,H,M,N) -> f4.21(C,E,0,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1] f6.16(C,E,H,M,N) -> f4.22(C,E,0,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1] f6.16(C,E,H,M,N) -> f4.23(C,E,0,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1] f6.16(C,E,H,M,N) -> f4.24(C,E,0,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1] f6.16(C,E,H,M,N) -> f4.25(C,E,0,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1] f6.16(C,E,H,M,N) -> f4.26(C,E,0,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1] f6.17(C,E,H,M,N) -> f4.18(C,E,1,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1 && H = 1] f6.17(C,E,H,M,N) -> f4.19(C,E,1,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1 && H = 1] f6.17(C,E,H,M,N) -> f4.20(C,E,1,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1 && H = 1] f6.17(C,E,H,M,N) -> f4.21(C,E,1,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1 && H = 1] f6.17(C,E,H,M,N) -> f4.22(C,E,1,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1 && H = 1] f6.17(C,E,H,M,N) -> f4.23(C,E,1,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1 && H = 1] f6.17(C,E,H,M,N) -> f4.24(C,E,1,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1 && H = 1] f6.17(C,E,H,M,N) -> f4.25(C,E,1,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1 && H = 1] f6.17(C,E,H,M,N) -> f4.26(C,E,1,M,N) [7 >= O && 1 >= P && P >= 0 && O >= 1 && H = 1] f4.18(C,E,H,M,N) -> f2.7(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1 && H = 1] f4.18(C,E,H,M,N) -> f2.8(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1 && H = 1] f4.18(C,E,H,M,N) -> f2.9(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1 && H = 1] f4.18(C,E,H,M,N) -> f2.10(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1 && H = 1] f4.18(C,E,H,M,N) -> f2.11(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1 && H = 1] f4.18(C,E,H,M,N) -> f2.12(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1 && H = 1] f4.19(C,E,H,M,N) -> f2.7(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && O >= 5 && P >= 1 && H = 1] f4.19(C,E,H,M,N) -> f2.8(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && O >= 5 && P >= 1 && H = 1] f4.19(C,E,H,M,N) -> f2.9(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && O >= 5 && P >= 1 && H = 1] f4.19(C,E,H,M,N) -> f2.10(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && O >= 5 && P >= 1 && H = 1] f4.19(C,E,H,M,N) -> f2.11(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && O >= 5 && P >= 1 && H = 1] f4.19(C,E,H,M,N) -> f2.12(C,E,0,M,N) [M >= 1 && M >= 1 + E && N >= 1 && N >= 1 + C && 7 >= O && 7 >= P && O >= 5 && P >= 1 && H = 1] f4.20(C,E,H,M,N) -> f2.7(1 + C,1 + E,0,M,N) [M >= 2 + E && N >= 2 + C && M >= 1 && N >= 1 && 7 >= P && P >= 1] f4.20(C,E,H,M,N) -> f2.8(1 + C,1 + E,0,M,N) [M >= 2 + E && N >= 2 + C && M >= 1 && N >= 1 && 7 >= P && P >= 1] f4.20(C,E,H,M,N) -> f2.9(1 + C,1 + E,0,M,N) [M >= 2 + E && N >= 2 + C && M >= 1 && N >= 1 && 7 >= P && P >= 1] f4.20(C,E,H,M,N) -> f2.10(1 + C,1 + E,0,M,N) [M >= 2 + E && N >= 2 + C && M >= 1 && N >= 1 && 7 >= P && P >= 1] f4.20(C,E,H,M,N) -> f2.11(1 + C,1 + E,0,M,N) [M >= 2 + E && N >= 2 + C && M >= 1 && N >= 1 && 7 >= P && P >= 1] f4.20(C,E,H,M,N) -> f2.12(1 + C,1 + E,0,M,N) [M >= 2 + E && N >= 2 + C && M >= 1 && N >= 1 && 7 >= P && P >= 1] f4.21(C,E,H,M,N) -> f7.27(C,E,H,M,N) [E >= M && C >= N && 7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] f4.22(C,E,H,M,N) -> f7.27(C,E,H,M,N) [E >= M && C >= N && 7 >= O && 7 >= P && O >= 5 && P >= 1] f4.23(C,E,H,M,N) -> f7.27(1 + C,1 + E,1,M,N) [1 + E >= M && 1 + C >= N && 7 >= P && P >= 1] f4.24(C,E,H,M,N) -> f7.27(C,E,H,M,N) [7 >= O && 7 >= P && 3 >= O && O >= 1 && P >= 1] f4.25(C,E,H,M,N) -> f7.27(C,E,H,M,N) [7 >= O && 7 >= P && O >= 5 && P >= 1] f4.26(C,E,H,M,N) -> f7.27(1 + C,1 + E,1,M,N) [7 >= P && P >= 1] f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True f7.27(C,E,H,M,N) -> exitus616(C,E,H,M,N) True Signature: {(exitus616,5) ;(f0.0,5) ;(f1.1,5) ;(f1.2,5) ;(f1.3,5) ;(f1.4,5) ;(f1.5,5) ;(f1.6,5) ;(f2.10,5) ;(f2.11,5) ;(f2.12,5) ;(f2.7,5) ;(f2.8,5) ;(f2.9,5) ;(f3.13,5) ;(f3.14,5) ;(f3.15,5) ;(f4.18,5) ;(f4.19,5) ;(f4.20,5) ;(f4.21,5) ;(f4.22,5) ;(f4.23,5) ;(f4.24,5) ;(f4.25,5) ;(f4.26,5) ;(f6.16,5) ;(f6.17,5) ;(f7.27,5)} Rule Graph: [0->{6},1->{7},2->{8},3->{9,10,11,12,13,14},4->{15,16,17,18,19,20},5->{21,22,23,24,25,26},6->{285} ,7->{284},8->{283},9->{27},10->{28},11->{29},12->{30,31,32},13->{33,34,35},14->{36,37,38},15->{27},16->{28} ,17->{29},18->{30,31,32},19->{33,34,35},20->{36,37,38},21->{27},22->{28},23->{29},24->{30,31,32},25->{33,34 ,35},26->{36,37,38},27->{93,96,105,114,117,126,135,138,147,150,159,162,171,180,183,192,201,204,213,216,225 ,228,237,246,249,258,267,270,279,282},28->{92,95,104,113,116,125,134,137,146,149,158,161,170,179,182,191,200 ,203,212,215,224,227,236,245,248,257,266,269,278,281},29->{91,94,103,112,115,124,133,136,145,148,157,160,169 ,178,181,190,199,202,211,214,223,226,235,244,247,256,265,268,277,280},30->{39,40},31->{41,42},32->{43,44} ,33->{39,40},34->{41,42},35->{43,44},36->{39,40},37->{41,42},38->{43,44},39->{45,46,47,48,49,50,51},40->{52 ,53,54,55,56,57,58,59,60},41->{45,46,47,48,49,50,51},42->{52,53,54,55,56,57,58,59,60},43->{45,46,47,48,49,50 ,51},44->{52,53,54,55,56,57,58,59,60},45->{73,74,75,76,77,78},46->{79},47->{80},48->{81},49->{82},50->{83} ,51->{84},52->{61,62,63,64,65,66},53->{67,68,69,70,71,72},54->{73,74,75,76,77,78},55->{79},56->{80},57->{81} ,58->{82},59->{83},60->{84},61->{27},62->{28},63->{29},64->{30,31,32},65->{33,34,35},66->{36,37,38},67->{27} ,68->{28},69->{29},70->{30,31,32},71->{33,34,35},72->{36,37,38},73->{27},74->{28},75->{29},76->{30,31,32} ,77->{33,34,35},78->{36,37,38},79->{90,102,111,123,132,144,156,168,177,189,198,210,222,234,243,255,264,276} ,80->{89,101,110,122,131,143,155,167,176,188,197,209,221,233,242,254,263,275},81->{88,100,109,121,130,142 ,154,166,175,187,196,208,220,232,241,253,262,274},82->{87,99,108,120,129,141,153,165,174,186,195,207,219,231 ,240,252,261,273},83->{86,98,107,119,128,140,152,164,173,185,194,206,218,230,239,251,260,272},84->{85,97,106 ,118,127,139,151,163,172,184,193,205,217,229,238,250,259,271}] + Applied Processor: Decompose Greedy + Details: We construct a looptree: P: [0,1,2,3,4,5,6,7,8,9,10,11,12,13,14,15,16,17,18,19,20,21,22,23,24,25,26,27,28,29,30,31,32,33,34,35,36,37,38,39,40,41,42,43,44,45,46,47,48,49,50,51,52,53,54,55,56,57,58,59,60,61,62,63,64,65,66,67,68,69,70,71,72,73,74,75,76,77,78,79,80,81,82,83,84,85,86,87,88,89,90,91,92,93,94,95,96,97,98,99,100,101,102,103,104,105,106,107,108,109,110,111,112,113,114,115,116,117,118,119,120,121,122,123,124,125,126,127,128,129,130,131,132,133,134,135,136,137,138,139,140,141,142,143,144,145,146,147,148,149,150,151,152,153,154,155,156,157,158,159,160,161,162,163,164,165,166,167,168,169,170,171,172,173,174,175,176,177,178,179,180,181,182,183,184,185,186,187,188,189,190,191,192,193,194,195,196,197,198,199,200,201,202,203,204,205,206,207,208,209,210,211,212,213,214,215,216,217,218,219,220,221,222,223,224,225,226,227,228,229,230,231,232,233,234,235,236,237,238,239,240,241,242,243,244,245,246,247,248,249,250,251,252,253,254,255,256,257,258,259,260,261,262,263,264,265,266,267,268,269,270,271,272,273,274,275,276,277,278,279,280,281,282,283,284,285] | `- p:[30,64,52,40,33,65,71,53,42,31,70,76,45,39,36,66,72,78,54,44,32,35,77,38,41,34,37,43] c: [36,37,38,39,41,43,45,54,66,72,76,77,78] | `- p:[30,64,52,40,33,65,71,53,42,31,70,34,44,32,35] c: [] MAYBE