MAYBE * Step 1: ArgumentFilter MAYBE + Considered Problem: Rules: 0. f1(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) -> f1(A,1 + B,D,G1,D,H1,B,I,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) [A >= 1 + B && B >= 0] (?,1) 1. f9(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) -> f10(A,B,C,D,E,F,G,H,I,J,K,M,M,M,G1,H1,H1,J,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) [I1 >= 1 + J && K >= 0 && H1 >= 1 + I1 && G1 >= 2] (?,1) 2. f9(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) -> f10(A,B,C,D,E,F,G,H,I,J,K,M,M,M,G1,H1,H1,J,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) [I1 >= 1 + J && K >= 0 && I1 >= 1 + H1 && G1 >= 2] (?,1) 3. f9(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) -> f10(A,B,C,D,E,F,G,H,I,J,K,M,M,M,G1,H1,H1,J,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) [J >= 1 + I1 && K >= 0 && H1 >= 1 + I1 && G1 >= 2] (?,1) 4. f9(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) -> f10(A,B,C,D,E,F,G,H,I,J,K,M,M,M,G1,H1,H1,J,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) [J >= 1 + I1 && K >= 0 && I1 >= 1 + H1 && G1 >= 2] (?,1) 5. f9(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) -> f4(A,B,C,D,E,F,G,H,I,M1,K,G1,L1,N,H1,J1,K1,N1,I1,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) [K >= 0 && G1 >= 1 + J1 && H1 >= 2 && M = J] (?,1) 6. f9(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) -> f4(A,B,C,D,E,F,G,H,I,M1,K,G1,L1,N,H1,J1,K1,N1,I1,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) [K >= 0 && J1 >= 1 + G1 && H1 >= 2 && M = J] (?,1) 7. f10(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) -> f10(A,B,C,D,E,F,G,H,I,J,K,M,M,M,G1,H1,H1,J,S,-1 + T,I1,I,-1 + T,X,Y,Z,A1,B1,C1,D1,E1,F1) [J1 >= 1 + J && T >= 0 && H1 >= 1 + J1 && G1 >= 2] (?,1) 8. f10(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) -> f10(A,B,C,D,E,F,G,H,I,J,K,M,M,M,G1,H1,H1,J,S,-1 + T,I1,I,-1 + T,X,Y,Z,A1,B1,C1,D1,E1,F1) [J1 >= 1 + J && T >= 0 && J1 >= 1 + H1 && G1 >= 2] (?,1) 9. f10(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) -> f10(A,B,C,D,E,F,G,H,I,J,K,M,M,M,G1,H1,H1,J,S,-1 + T,I1,I,-1 + T,X,Y,Z,A1,B1,C1,D1,E1,F1) [J >= 1 + J1 && T >= 0 && H1 >= 1 + J1 && G1 >= 2] (?,1) 10. f10(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) -> f10(A,B,C,D,E,F,G,H,I,J,K,M,M,M,G1,H1,H1,J,S,-1 + T,I1,I,-1 + T,X,Y,Z,A1,B1,C1,D1,E1,F1) [J >= 1 + J1 && T >= 0 && J1 >= 1 + H1 && G1 >= 2] (?,1) 11. f10(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) -> f4(A,B,C,D,E,F,G,H,I,K1,K,L,J1,N,G1,P,I1,L1,H1,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) [G1 >= 2 && T >= 0 && M = J] (?,1) 12. f3(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) -> f4(J1,M1,L1,T1,S1,F,G,H,I,W1,K,X,V1,X,I1,X,U1,X1,Q1,T,U,V,W,G1,H1,K1,N1,R1,C1,D1,E1,F1) [0 >= O1 && 0 >= I1 && 0 >= P1] (1,1) 13. f3(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) -> f1(J1,2,K1,L1,K1,F,G,H,I,J,K,G1,M,G1,J1,P,Q,R,S,T,U,V,W,H1,I1,G1,A1,K1,M1,D1,E1,F1) [J1 >= 2] (1,1) 14. f1(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) -> f10(H1,K1,J1,R1,Q1,F,G,H,I,C,T,N,N,N,G1,C,C,C,M1,T,U,V,W,X,Y,I1,L1,N1,C1,1 + T,I,S1) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && C >= 1 + N && K1 >= 0 && G1 >= 2 && N >= 1 + C] (?,1) 15. f1(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) -> f10(H1,K1,J1,R1,Q1,F,G,H,I,C,T,N,N,N,G1,C,C,C,M1,T,U,V,W,X,Y,I1,L1,N1,C1,1 + T,I,S1) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && C >= 1 + N && K1 >= 0 && G1 >= 2] (?,1) 16. f1(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) -> f10(H1,K1,J1,R1,Q1,F,G,H,I,C,T,N,N,N,G1,C,C,C,M1,T,U,V,W,X,Y,I1,L1,N1,C1,1 + T,I,S1) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && N >= 1 + C && K1 >= 0 && G1 >= 2] (?,1) 17. f1(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) -> f10(H1,K1,J1,R1,Q1,F,G,H,I,C,T,N,N,N,G1,C,C,C,M1,T,U,V,W,X,Y,I1,L1,N1,C1,1 + T,I,S1) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && N >= 1 + C && K1 >= 0 && G1 >= 2 && C >= 1 + N] (?,1) 18. f3(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) -> f4(J1,M1,L1,T1,S1,F,G,H,I,X1,K,G1,W1,D,1,U1,V1,O1,Q1,T,U,V,W,H1,I1,K1,N1,R1,C1,D1,E1,F1) [0 >= 1 && G1 >= 1 + U1] (1,1) 19. f3(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) -> f4(J1,M1,L1,T1,S1,F,G,H,I,X1,K,G1,W1,D,1,U1,V1,O1,Q1,T,U,V,W,H1,I1,K1,N1,R1,C1,D1,E1,F1) [0 >= 1 && U1 >= 1 + G1] (1,1) 20. f3(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) -> f4(J1,M1,L1,T1,S1,F,G,H,I,X1,K,G1,W1,D,1,U1,V1,O1,Q1,T,U,V,W,H1,I1,K1,N1,R1,C1,D1,E1,F1) [0 >= 1 && G1 >= 1 + U1] (1,1) 21. f3(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1) -> f4(J1,M1,L1,T1,S1,F,G,H,I,X1,K,G1,W1,D,1,U1,V1,O1,Q1,T,U,V,W,H1,I1,K1,N1,R1,C1,D1,E1,F1) [0 >= 1 && U1 >= 1 + G1] (1,1) Signature: {(f1,32);(f10,32);(f3,32);(f4,32);(f9,32)} Flow Graph: [0->{0,14,15,16,17},1->{7,8,9,10,11},2->{7,8,9,10,11},3->{7,8,9,10,11},4->{7,8,9,10,11},5->{},6->{},7->{7 ,8,9,10,11},8->{7,8,9,10,11},9->{7,8,9,10,11},10->{7,8,9,10,11},11->{},12->{},13->{0,14,15,16,17},14->{7,8,9 ,10,11},15->{7,8,9,10,11},16->{7,8,9,10,11},17->{7,8,9,10,11},18->{},19->{},20->{},21->{}] + Applied Processor: ArgumentFilter [3,4,5,6,7,8,11,14,15,16,17,18,20,21,22,23,24,25,26,27,28,29,30,31] + Details: We remove following argument positions: [3,4,5,6,7,8,11,14,15,16,17,18,20,21,22,23,24,25,26,27,28,29,30,31]. * Step 2: UnsatRules MAYBE + Considered Problem: Rules: 0. f1(A,B,C,J,K,M,N,T) -> f1(A,1 + B,D,J,K,M,N,T) [A >= 1 + B && B >= 0] (?,1) 1. f9(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,T) [I1 >= 1 + J && K >= 0 && H1 >= 1 + I1 && G1 >= 2] (?,1) 2. f9(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,T) [I1 >= 1 + J && K >= 0 && I1 >= 1 + H1 && G1 >= 2] (?,1) 3. f9(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,T) [J >= 1 + I1 && K >= 0 && H1 >= 1 + I1 && G1 >= 2] (?,1) 4. f9(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,T) [J >= 1 + I1 && K >= 0 && I1 >= 1 + H1 && G1 >= 2] (?,1) 5. f9(A,B,C,J,K,M,N,T) -> f4(A,B,C,M1,K,L1,N,T) [K >= 0 && G1 >= 1 + J1 && H1 >= 2 && M = J] (?,1) 6. f9(A,B,C,J,K,M,N,T) -> f4(A,B,C,M1,K,L1,N,T) [K >= 0 && J1 >= 1 + G1 && H1 >= 2 && M = J] (?,1) 7. f10(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && H1 >= 1 + J1 && G1 >= 2] (?,1) 8. f10(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && J1 >= 1 + H1 && G1 >= 2] (?,1) 9. f10(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && H1 >= 1 + J1 && G1 >= 2] (?,1) 10. f10(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && J1 >= 1 + H1 && G1 >= 2] (?,1) 11. f10(A,B,C,J,K,M,N,T) -> f4(A,B,C,K1,K,J1,N,T) [G1 >= 2 && T >= 0 && M = J] (?,1) 12. f3(A,B,C,J,K,M,N,T) -> f4(J1,M1,L1,W1,K,V1,X,T) [0 >= O1 && 0 >= I1 && 0 >= P1] (1,1) 13. f3(A,B,C,J,K,M,N,T) -> f1(J1,2,K1,J,K,M,G1,T) [J1 >= 2] (1,1) 14. f1(A,B,C,J,K,M,N,T) -> f10(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && C >= 1 + N && K1 >= 0 && G1 >= 2 && N >= 1 + C] (?,1) 15. f1(A,B,C,J,K,M,N,T) -> f10(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && C >= 1 + N && K1 >= 0 && G1 >= 2] (?,1) 16. f1(A,B,C,J,K,M,N,T) -> f10(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && N >= 1 + C && K1 >= 0 && G1 >= 2] (?,1) 17. f1(A,B,C,J,K,M,N,T) -> f10(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && N >= 1 + C && K1 >= 0 && G1 >= 2 && C >= 1 + N] (?,1) 18. f3(A,B,C,J,K,M,N,T) -> f4(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && G1 >= 1 + U1] (1,1) 19. f3(A,B,C,J,K,M,N,T) -> f4(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && U1 >= 1 + G1] (1,1) 20. f3(A,B,C,J,K,M,N,T) -> f4(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && G1 >= 1 + U1] (1,1) 21. f3(A,B,C,J,K,M,N,T) -> f4(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && U1 >= 1 + G1] (1,1) Signature: {(f1,32);(f10,32);(f3,32);(f4,32);(f9,32)} Flow Graph: [0->{0,14,15,16,17},1->{7,8,9,10,11},2->{7,8,9,10,11},3->{7,8,9,10,11},4->{7,8,9,10,11},5->{},6->{},7->{7 ,8,9,10,11},8->{7,8,9,10,11},9->{7,8,9,10,11},10->{7,8,9,10,11},11->{},12->{},13->{0,14,15,16,17},14->{7,8,9 ,10,11},15->{7,8,9,10,11},16->{7,8,9,10,11},17->{7,8,9,10,11},18->{},19->{},20->{},21->{}] + Applied Processor: UnsatRules + Details: Following transitions have unsatisfiable constraints and are removed: [14,17] * Step 3: UnreachableRules MAYBE + Considered Problem: Rules: 0. f1(A,B,C,J,K,M,N,T) -> f1(A,1 + B,D,J,K,M,N,T) [A >= 1 + B && B >= 0] (?,1) 1. f9(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,T) [I1 >= 1 + J && K >= 0 && H1 >= 1 + I1 && G1 >= 2] (?,1) 2. f9(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,T) [I1 >= 1 + J && K >= 0 && I1 >= 1 + H1 && G1 >= 2] (?,1) 3. f9(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,T) [J >= 1 + I1 && K >= 0 && H1 >= 1 + I1 && G1 >= 2] (?,1) 4. f9(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,T) [J >= 1 + I1 && K >= 0 && I1 >= 1 + H1 && G1 >= 2] (?,1) 5. f9(A,B,C,J,K,M,N,T) -> f4(A,B,C,M1,K,L1,N,T) [K >= 0 && G1 >= 1 + J1 && H1 >= 2 && M = J] (?,1) 6. f9(A,B,C,J,K,M,N,T) -> f4(A,B,C,M1,K,L1,N,T) [K >= 0 && J1 >= 1 + G1 && H1 >= 2 && M = J] (?,1) 7. f10(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && H1 >= 1 + J1 && G1 >= 2] (?,1) 8. f10(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && J1 >= 1 + H1 && G1 >= 2] (?,1) 9. f10(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && H1 >= 1 + J1 && G1 >= 2] (?,1) 10. f10(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && J1 >= 1 + H1 && G1 >= 2] (?,1) 11. f10(A,B,C,J,K,M,N,T) -> f4(A,B,C,K1,K,J1,N,T) [G1 >= 2 && T >= 0 && M = J] (?,1) 12. f3(A,B,C,J,K,M,N,T) -> f4(J1,M1,L1,W1,K,V1,X,T) [0 >= O1 && 0 >= I1 && 0 >= P1] (1,1) 13. f3(A,B,C,J,K,M,N,T) -> f1(J1,2,K1,J,K,M,G1,T) [J1 >= 2] (1,1) 15. f1(A,B,C,J,K,M,N,T) -> f10(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && C >= 1 + N && K1 >= 0 && G1 >= 2] (?,1) 16. f1(A,B,C,J,K,M,N,T) -> f10(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && N >= 1 + C && K1 >= 0 && G1 >= 2] (?,1) 18. f3(A,B,C,J,K,M,N,T) -> f4(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && G1 >= 1 + U1] (1,1) 19. f3(A,B,C,J,K,M,N,T) -> f4(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && U1 >= 1 + G1] (1,1) 20. f3(A,B,C,J,K,M,N,T) -> f4(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && G1 >= 1 + U1] (1,1) 21. f3(A,B,C,J,K,M,N,T) -> f4(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && U1 >= 1 + G1] (1,1) Signature: {(f1,32);(f10,32);(f3,32);(f4,32);(f9,32)} Flow Graph: [0->{0,15,16},1->{7,8,9,10,11},2->{7,8,9,10,11},3->{7,8,9,10,11},4->{7,8,9,10,11},5->{},6->{},7->{7,8,9,10 ,11},8->{7,8,9,10,11},9->{7,8,9,10,11},10->{7,8,9,10,11},11->{},12->{},13->{0,15,16},15->{7,8,9,10,11} ,16->{7,8,9,10,11},18->{},19->{},20->{},21->{}] + Applied Processor: UnreachableRules + Details: Following transitions are not reachable from the starting states and are revomed: [1,2,3,4,5,6] * Step 4: UnsatPaths MAYBE + Considered Problem: Rules: 0. f1(A,B,C,J,K,M,N,T) -> f1(A,1 + B,D,J,K,M,N,T) [A >= 1 + B && B >= 0] (?,1) 7. f10(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && H1 >= 1 + J1 && G1 >= 2] (?,1) 8. f10(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && J1 >= 1 + H1 && G1 >= 2] (?,1) 9. f10(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && H1 >= 1 + J1 && G1 >= 2] (?,1) 10. f10(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && J1 >= 1 + H1 && G1 >= 2] (?,1) 11. f10(A,B,C,J,K,M,N,T) -> f4(A,B,C,K1,K,J1,N,T) [G1 >= 2 && T >= 0 && M = J] (?,1) 12. f3(A,B,C,J,K,M,N,T) -> f4(J1,M1,L1,W1,K,V1,X,T) [0 >= O1 && 0 >= I1 && 0 >= P1] (1,1) 13. f3(A,B,C,J,K,M,N,T) -> f1(J1,2,K1,J,K,M,G1,T) [J1 >= 2] (1,1) 15. f1(A,B,C,J,K,M,N,T) -> f10(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && C >= 1 + N && K1 >= 0 && G1 >= 2] (?,1) 16. f1(A,B,C,J,K,M,N,T) -> f10(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && N >= 1 + C && K1 >= 0 && G1 >= 2] (?,1) 18. f3(A,B,C,J,K,M,N,T) -> f4(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && G1 >= 1 + U1] (1,1) 19. f3(A,B,C,J,K,M,N,T) -> f4(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && U1 >= 1 + G1] (1,1) 20. f3(A,B,C,J,K,M,N,T) -> f4(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && G1 >= 1 + U1] (1,1) 21. f3(A,B,C,J,K,M,N,T) -> f4(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && U1 >= 1 + G1] (1,1) Signature: {(f1,32);(f10,32);(f3,32);(f4,32);(f9,32)} Flow Graph: [0->{0,15,16},7->{7,8,9,10,11},8->{7,8,9,10,11},9->{7,8,9,10,11},10->{7,8,9,10,11},11->{},12->{},13->{0,15 ,16},15->{7,8,9,10,11},16->{7,8,9,10,11},18->{},19->{},20->{},21->{}] + Applied Processor: UnsatPaths + Details: We remove following edges from the transition graph: [(15,11),(16,11)] * Step 5: FromIts MAYBE + Considered Problem: Rules: 0. f1(A,B,C,J,K,M,N,T) -> f1(A,1 + B,D,J,K,M,N,T) [A >= 1 + B && B >= 0] (?,1) 7. f10(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && H1 >= 1 + J1 && G1 >= 2] (?,1) 8. f10(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && J1 >= 1 + H1 && G1 >= 2] (?,1) 9. f10(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && H1 >= 1 + J1 && G1 >= 2] (?,1) 10. f10(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && J1 >= 1 + H1 && G1 >= 2] (?,1) 11. f10(A,B,C,J,K,M,N,T) -> f4(A,B,C,K1,K,J1,N,T) [G1 >= 2 && T >= 0 && M = J] (?,1) 12. f3(A,B,C,J,K,M,N,T) -> f4(J1,M1,L1,W1,K,V1,X,T) [0 >= O1 && 0 >= I1 && 0 >= P1] (1,1) 13. f3(A,B,C,J,K,M,N,T) -> f1(J1,2,K1,J,K,M,G1,T) [J1 >= 2] (1,1) 15. f1(A,B,C,J,K,M,N,T) -> f10(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && C >= 1 + N && K1 >= 0 && G1 >= 2] (?,1) 16. f1(A,B,C,J,K,M,N,T) -> f10(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && N >= 1 + C && K1 >= 0 && G1 >= 2] (?,1) 18. f3(A,B,C,J,K,M,N,T) -> f4(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && G1 >= 1 + U1] (1,1) 19. f3(A,B,C,J,K,M,N,T) -> f4(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && U1 >= 1 + G1] (1,1) 20. f3(A,B,C,J,K,M,N,T) -> f4(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && G1 >= 1 + U1] (1,1) 21. f3(A,B,C,J,K,M,N,T) -> f4(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && U1 >= 1 + G1] (1,1) Signature: {(f1,32);(f10,32);(f3,32);(f4,32);(f9,32)} Flow Graph: [0->{0,15,16},7->{7,8,9,10,11},8->{7,8,9,10,11},9->{7,8,9,10,11},10->{7,8,9,10,11},11->{},12->{},13->{0,15 ,16},15->{7,8,9,10},16->{7,8,9,10},18->{},19->{},20->{},21->{}] + Applied Processor: FromIts + Details: () * Step 6: Unfold MAYBE + Considered Problem: Rules: f1(A,B,C,J,K,M,N,T) -> f1(A,1 + B,D,J,K,M,N,T) [A >= 1 + B && B >= 0] f10(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10(A,B,C,J,K,M,N,T) -> f10(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10(A,B,C,J,K,M,N,T) -> f4(A,B,C,K1,K,J1,N,T) [G1 >= 2 && T >= 0 && M = J] f3(A,B,C,J,K,M,N,T) -> f4(J1,M1,L1,W1,K,V1,X,T) [0 >= O1 && 0 >= I1 && 0 >= P1] f3(A,B,C,J,K,M,N,T) -> f1(J1,2,K1,J,K,M,G1,T) [J1 >= 2] f1(A,B,C,J,K,M,N,T) -> f10(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && C >= 1 + N && K1 >= 0 && G1 >= 2] f1(A,B,C,J,K,M,N,T) -> f10(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && N >= 1 + C && K1 >= 0 && G1 >= 2] f3(A,B,C,J,K,M,N,T) -> f4(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && G1 >= 1 + U1] f3(A,B,C,J,K,M,N,T) -> f4(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && U1 >= 1 + G1] f3(A,B,C,J,K,M,N,T) -> f4(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && G1 >= 1 + U1] f3(A,B,C,J,K,M,N,T) -> f4(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && U1 >= 1 + G1] Signature: {(f1,32);(f10,32);(f3,32);(f4,32);(f9,32)} Rule Graph: [0->{0,15,16},7->{7,8,9,10,11},8->{7,8,9,10,11},9->{7,8,9,10,11},10->{7,8,9,10,11},11->{},12->{},13->{0,15 ,16},15->{7,8,9,10},16->{7,8,9,10},18->{},19->{},20->{},21->{}] + Applied Processor: Unfold + Details: () * Step 7: AddSinks MAYBE + Considered Problem: Rules: f1.0(A,B,C,J,K,M,N,T) -> f1.0(A,1 + B,D,J,K,M,N,T) [A >= 1 + B && B >= 0] f1.0(A,B,C,J,K,M,N,T) -> f1.15(A,1 + B,D,J,K,M,N,T) [A >= 1 + B && B >= 0] f1.0(A,B,C,J,K,M,N,T) -> f1.16(A,1 + B,D,J,K,M,N,T) [A >= 1 + B && B >= 0] f10.7(A,B,C,J,K,M,N,T) -> f10.7(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.7(A,B,C,J,K,M,N,T) -> f10.8(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.7(A,B,C,J,K,M,N,T) -> f10.9(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.7(A,B,C,J,K,M,N,T) -> f10.10(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.7(A,B,C,J,K,M,N,T) -> f10.11(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.8(A,B,C,J,K,M,N,T) -> f10.7(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.8(A,B,C,J,K,M,N,T) -> f10.8(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.8(A,B,C,J,K,M,N,T) -> f10.9(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.8(A,B,C,J,K,M,N,T) -> f10.10(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.8(A,B,C,J,K,M,N,T) -> f10.11(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.9(A,B,C,J,K,M,N,T) -> f10.7(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.9(A,B,C,J,K,M,N,T) -> f10.8(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.9(A,B,C,J,K,M,N,T) -> f10.9(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.9(A,B,C,J,K,M,N,T) -> f10.10(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.9(A,B,C,J,K,M,N,T) -> f10.11(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.10(A,B,C,J,K,M,N,T) -> f10.7(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.10(A,B,C,J,K,M,N,T) -> f10.8(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.10(A,B,C,J,K,M,N,T) -> f10.9(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.10(A,B,C,J,K,M,N,T) -> f10.10(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.10(A,B,C,J,K,M,N,T) -> f10.11(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.11(A,B,C,J,K,M,N,T) -> f4.22(A,B,C,K1,K,J1,N,T) [G1 >= 2 && T >= 0 && M = J] f3.12(A,B,C,J,K,M,N,T) -> f4.22(J1,M1,L1,W1,K,V1,X,T) [0 >= O1 && 0 >= I1 && 0 >= P1] f3.13(A,B,C,J,K,M,N,T) -> f1.0(J1,2,K1,J,K,M,G1,T) [J1 >= 2] f3.13(A,B,C,J,K,M,N,T) -> f1.15(J1,2,K1,J,K,M,G1,T) [J1 >= 2] f3.13(A,B,C,J,K,M,N,T) -> f1.16(J1,2,K1,J,K,M,G1,T) [J1 >= 2] f1.15(A,B,C,J,K,M,N,T) -> f10.7(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && C >= 1 + N && K1 >= 0 && G1 >= 2] f1.15(A,B,C,J,K,M,N,T) -> f10.8(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && C >= 1 + N && K1 >= 0 && G1 >= 2] f1.15(A,B,C,J,K,M,N,T) -> f10.9(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && C >= 1 + N && K1 >= 0 && G1 >= 2] f1.15(A,B,C,J,K,M,N,T) -> f10.10(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && C >= 1 + N && K1 >= 0 && G1 >= 2] f1.16(A,B,C,J,K,M,N,T) -> f10.7(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && N >= 1 + C && K1 >= 0 && G1 >= 2] f1.16(A,B,C,J,K,M,N,T) -> f10.8(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && N >= 1 + C && K1 >= 0 && G1 >= 2] f1.16(A,B,C,J,K,M,N,T) -> f10.9(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && N >= 1 + C && K1 >= 0 && G1 >= 2] f1.16(A,B,C,J,K,M,N,T) -> f10.10(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && N >= 1 + C && K1 >= 0 && G1 >= 2] f3.18(A,B,C,J,K,M,N,T) -> f4.22(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && G1 >= 1 + U1] f3.19(A,B,C,J,K,M,N,T) -> f4.22(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && U1 >= 1 + G1] f3.20(A,B,C,J,K,M,N,T) -> f4.22(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && G1 >= 1 + U1] f3.21(A,B,C,J,K,M,N,T) -> f4.22(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && U1 >= 1 + G1] Signature: {(f1.0,8) ;(f1.15,8) ;(f1.16,8) ;(f10.10,8) ;(f10.11,8) ;(f10.7,8) ;(f10.8,8) ;(f10.9,8) ;(f3.12,8) ;(f3.13,8) ;(f3.18,8) ;(f3.19,8) ;(f3.20,8) ;(f3.21,8) ;(f4.22,8)} Rule Graph: [0->{0,1,2},1->{28,29,30,31},2->{32,33,34,35},3->{3,4,5,6,7},4->{8,9,10,11,12},5->{13,14,15,16,17},6->{18 ,19,20,21,22},7->{23},8->{3,4,5,6,7},9->{8,9,10,11,12},10->{13,14,15,16,17},11->{18,19,20,21,22},12->{23} ,13->{3,4,5,6,7},14->{8,9,10,11,12},15->{13,14,15,16,17},16->{18,19,20,21,22},17->{23},18->{3,4,5,6,7} ,19->{8,9,10,11,12},20->{13,14,15,16,17},21->{18,19,20,21,22},22->{23},23->{},24->{},25->{0,1,2},26->{28,29 ,30,31},27->{32,33,34,35},28->{3,4,5,6,7},29->{8,9,10,11,12},30->{13,14,15,16,17},31->{18,19,20,21,22} ,32->{3,4,5,6,7},33->{8,9,10,11,12},34->{13,14,15,16,17},35->{18,19,20,21,22},36->{},37->{},38->{},39->{}] + Applied Processor: AddSinks + Details: () * Step 8: Decompose MAYBE + Considered Problem: Rules: f1.0(A,B,C,J,K,M,N,T) -> f1.0(A,1 + B,D,J,K,M,N,T) [A >= 1 + B && B >= 0] f1.0(A,B,C,J,K,M,N,T) -> f1.15(A,1 + B,D,J,K,M,N,T) [A >= 1 + B && B >= 0] f1.0(A,B,C,J,K,M,N,T) -> f1.16(A,1 + B,D,J,K,M,N,T) [A >= 1 + B && B >= 0] f10.7(A,B,C,J,K,M,N,T) -> f10.7(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.7(A,B,C,J,K,M,N,T) -> f10.8(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.7(A,B,C,J,K,M,N,T) -> f10.9(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.7(A,B,C,J,K,M,N,T) -> f10.10(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.7(A,B,C,J,K,M,N,T) -> f10.11(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.8(A,B,C,J,K,M,N,T) -> f10.7(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.8(A,B,C,J,K,M,N,T) -> f10.8(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.8(A,B,C,J,K,M,N,T) -> f10.9(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.8(A,B,C,J,K,M,N,T) -> f10.10(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.8(A,B,C,J,K,M,N,T) -> f10.11(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.9(A,B,C,J,K,M,N,T) -> f10.7(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.9(A,B,C,J,K,M,N,T) -> f10.8(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.9(A,B,C,J,K,M,N,T) -> f10.9(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.9(A,B,C,J,K,M,N,T) -> f10.10(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.9(A,B,C,J,K,M,N,T) -> f10.11(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.10(A,B,C,J,K,M,N,T) -> f10.7(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.10(A,B,C,J,K,M,N,T) -> f10.8(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.10(A,B,C,J,K,M,N,T) -> f10.9(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.10(A,B,C,J,K,M,N,T) -> f10.10(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.10(A,B,C,J,K,M,N,T) -> f10.11(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.11(A,B,C,J,K,M,N,T) -> f4.22(A,B,C,K1,K,J1,N,T) [G1 >= 2 && T >= 0 && M = J] f3.12(A,B,C,J,K,M,N,T) -> f4.22(J1,M1,L1,W1,K,V1,X,T) [0 >= O1 && 0 >= I1 && 0 >= P1] f3.13(A,B,C,J,K,M,N,T) -> f1.0(J1,2,K1,J,K,M,G1,T) [J1 >= 2] f3.13(A,B,C,J,K,M,N,T) -> f1.15(J1,2,K1,J,K,M,G1,T) [J1 >= 2] f3.13(A,B,C,J,K,M,N,T) -> f1.16(J1,2,K1,J,K,M,G1,T) [J1 >= 2] f1.15(A,B,C,J,K,M,N,T) -> f10.7(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && C >= 1 + N && K1 >= 0 && G1 >= 2] f1.15(A,B,C,J,K,M,N,T) -> f10.8(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && C >= 1 + N && K1 >= 0 && G1 >= 2] f1.15(A,B,C,J,K,M,N,T) -> f10.9(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && C >= 1 + N && K1 >= 0 && G1 >= 2] f1.15(A,B,C,J,K,M,N,T) -> f10.10(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && C >= 1 + N && K1 >= 0 && G1 >= 2] f1.16(A,B,C,J,K,M,N,T) -> f10.7(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && N >= 1 + C && K1 >= 0 && G1 >= 2] f1.16(A,B,C,J,K,M,N,T) -> f10.8(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && N >= 1 + C && K1 >= 0 && G1 >= 2] f1.16(A,B,C,J,K,M,N,T) -> f10.9(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && N >= 1 + C && K1 >= 0 && G1 >= 2] f1.16(A,B,C,J,K,M,N,T) -> f10.10(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && N >= 1 + C && K1 >= 0 && G1 >= 2] f3.18(A,B,C,J,K,M,N,T) -> f4.22(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && G1 >= 1 + U1] f3.19(A,B,C,J,K,M,N,T) -> f4.22(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && U1 >= 1 + G1] f3.20(A,B,C,J,K,M,N,T) -> f4.22(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && G1 >= 1 + U1] f3.21(A,B,C,J,K,M,N,T) -> f4.22(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && U1 >= 1 + G1] f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True Signature: {(exitus616,8) ;(f1.0,8) ;(f1.15,8) ;(f1.16,8) ;(f10.10,8) ;(f10.11,8) ;(f10.7,8) ;(f10.8,8) ;(f10.9,8) ;(f3.12,8) ;(f3.13,8) ;(f3.18,8) ;(f3.19,8) ;(f3.20,8) ;(f3.21,8) ;(f4.22,8)} Rule Graph: [0->{0,1,2},1->{28,29,30,31},2->{32,33,34,35},3->{3,4,5,6,7},4->{8,9,10,11,12},5->{13,14,15,16,17},6->{18 ,19,20,21,22},7->{23},8->{3,4,5,6,7},9->{8,9,10,11,12},10->{13,14,15,16,17},11->{18,19,20,21,22},12->{23} ,13->{3,4,5,6,7},14->{8,9,10,11,12},15->{13,14,15,16,17},16->{18,19,20,21,22},17->{23},18->{3,4,5,6,7} ,19->{8,9,10,11,12},20->{13,14,15,16,17},21->{18,19,20,21,22},22->{23},23->{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},24->{108},25->{0,1,2},26->{28,29,30,31},27->{32 ,33,34,35},28->{3,4,5,6,7},29->{8,9,10,11,12},30->{13,14,15,16,17},31->{18,19,20,21,22},32->{3,4,5,6,7} ,33->{8,9,10,11,12},34->{13,14,15,16,17},35->{18,19,20,21,22},36->{43},37->{42},38->{41},39->{40}] + 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] | +- p:[0] c: [0] | `- p:[3,8,4,13,5,18,6,11,9,14,10,19,16,15,20,21] c: [3,4,5,6,8,9,10,11,13,14,15,16,18,19,20,21] * Step 9: AbstractSize MAYBE + Considered Problem: (Rules: f1.0(A,B,C,J,K,M,N,T) -> f1.0(A,1 + B,D,J,K,M,N,T) [A >= 1 + B && B >= 0] f1.0(A,B,C,J,K,M,N,T) -> f1.15(A,1 + B,D,J,K,M,N,T) [A >= 1 + B && B >= 0] f1.0(A,B,C,J,K,M,N,T) -> f1.16(A,1 + B,D,J,K,M,N,T) [A >= 1 + B && B >= 0] f10.7(A,B,C,J,K,M,N,T) -> f10.7(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.7(A,B,C,J,K,M,N,T) -> f10.8(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.7(A,B,C,J,K,M,N,T) -> f10.9(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.7(A,B,C,J,K,M,N,T) -> f10.10(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.7(A,B,C,J,K,M,N,T) -> f10.11(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.8(A,B,C,J,K,M,N,T) -> f10.7(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.8(A,B,C,J,K,M,N,T) -> f10.8(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.8(A,B,C,J,K,M,N,T) -> f10.9(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.8(A,B,C,J,K,M,N,T) -> f10.10(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.8(A,B,C,J,K,M,N,T) -> f10.11(A,B,C,J,K,M,M,-1 + T) [J1 >= 1 + J && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.9(A,B,C,J,K,M,N,T) -> f10.7(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.9(A,B,C,J,K,M,N,T) -> f10.8(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.9(A,B,C,J,K,M,N,T) -> f10.9(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.9(A,B,C,J,K,M,N,T) -> f10.10(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.9(A,B,C,J,K,M,N,T) -> f10.11(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && H1 >= 1 + J1 && G1 >= 2] f10.10(A,B,C,J,K,M,N,T) -> f10.7(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.10(A,B,C,J,K,M,N,T) -> f10.8(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.10(A,B,C,J,K,M,N,T) -> f10.9(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.10(A,B,C,J,K,M,N,T) -> f10.10(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.10(A,B,C,J,K,M,N,T) -> f10.11(A,B,C,J,K,M,M,-1 + T) [J >= 1 + J1 && T >= 0 && J1 >= 1 + H1 && G1 >= 2] f10.11(A,B,C,J,K,M,N,T) -> f4.22(A,B,C,K1,K,J1,N,T) [G1 >= 2 && T >= 0 && M = J] f3.12(A,B,C,J,K,M,N,T) -> f4.22(J1,M1,L1,W1,K,V1,X,T) [0 >= O1 && 0 >= I1 && 0 >= P1] f3.13(A,B,C,J,K,M,N,T) -> f1.0(J1,2,K1,J,K,M,G1,T) [J1 >= 2] f3.13(A,B,C,J,K,M,N,T) -> f1.15(J1,2,K1,J,K,M,G1,T) [J1 >= 2] f3.13(A,B,C,J,K,M,N,T) -> f1.16(J1,2,K1,J,K,M,G1,T) [J1 >= 2] f1.15(A,B,C,J,K,M,N,T) -> f10.7(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && C >= 1 + N && K1 >= 0 && G1 >= 2] f1.15(A,B,C,J,K,M,N,T) -> f10.8(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && C >= 1 + N && K1 >= 0 && G1 >= 2] f1.15(A,B,C,J,K,M,N,T) -> f10.9(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && C >= 1 + N && K1 >= 0 && G1 >= 2] f1.15(A,B,C,J,K,M,N,T) -> f10.10(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && C >= 1 + N && K1 >= 0 && G1 >= 2] f1.16(A,B,C,J,K,M,N,T) -> f10.7(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && N >= 1 + C && K1 >= 0 && G1 >= 2] f1.16(A,B,C,J,K,M,N,T) -> f10.8(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && N >= 1 + C && K1 >= 0 && G1 >= 2] f1.16(A,B,C,J,K,M,N,T) -> f10.9(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && N >= 1 + C && K1 >= 0 && G1 >= 2] f1.16(A,B,C,J,K,M,N,T) -> f10.10(H1,K1,J1,C,T,N,N,T) [B >= A && B >= 0 && T1 >= G1 && U1 >= 2 && K1 >= U1 && N >= 1 + C && K1 >= 0 && G1 >= 2] f3.18(A,B,C,J,K,M,N,T) -> f4.22(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && G1 >= 1 + U1] f3.19(A,B,C,J,K,M,N,T) -> f4.22(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && U1 >= 1 + G1] f3.20(A,B,C,J,K,M,N,T) -> f4.22(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && G1 >= 1 + U1] f3.21(A,B,C,J,K,M,N,T) -> f4.22(J1,M1,L1,X1,K,W1,D,T) [0 >= 1 && U1 >= 1 + G1] f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True f4.22(A,B,C,J,K,M,N,T) -> exitus616(A,B,C,J,K,M,N,T) True Signature: {(exitus616,8) ;(f1.0,8) ;(f1.15,8) ;(f1.16,8) ;(f10.10,8) ;(f10.11,8) ;(f10.7,8) ;(f10.8,8) ;(f10.9,8) ;(f3.12,8) ;(f3.13,8) ;(f3.18,8) ;(f3.19,8) ;(f3.20,8) ;(f3.21,8) ;(f4.22,8)} Rule Graph: [0->{0,1,2},1->{28,29,30,31},2->{32,33,34,35},3->{3,4,5,6,7},4->{8,9,10,11,12},5->{13,14,15,16,17},6->{18 ,19,20,21,22},7->{23},8->{3,4,5,6,7},9->{8,9,10,11,12},10->{13,14,15,16,17},11->{18,19,20,21,22},12->{23} ,13->{3,4,5,6,7},14->{8,9,10,11,12},15->{13,14,15,16,17},16->{18,19,20,21,22},17->{23},18->{3,4,5,6,7} ,19->{8,9,10,11,12},20->{13,14,15,16,17},21->{18,19,20,21,22},22->{23},23->{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},24->{108},25->{0,1,2},26->{28,29,30,31},27->{32 ,33,34,35},28->{3,4,5,6,7},29->{8,9,10,11,12},30->{13,14,15,16,17},31->{18,19,20,21,22},32->{3,4,5,6,7} ,33->{8,9,10,11,12},34->{13,14,15,16,17},35->{18,19,20,21,22},36->{43},37->{42},38->{41},39->{40}] ,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] | +- p:[0] c: [0] | `- p:[3,8,4,13,5,18,6,11,9,14,10,19,16,15,20,21] c: [3,4,5,6,8,9,10,11,13,14,15,16,18,19,20,21]) + Applied Processor: AbstractSize Minimize + Details: () * Step 10: AbstractFlow MAYBE + Considered Problem: Program: Domain: [A,B,C,J,K,M,N,T,0.0,0.1] f1.0 ~> f1.0 [A <= A, B <= A, C <= unknown, J <= J, K <= K, M <= M, N <= N, T <= T] f1.0 ~> f1.15 [A <= A, B <= A, C <= unknown, J <= J, K <= K, M <= M, N <= N, T <= T] f1.0 ~> f1.16 [A <= A, B <= A, C <= unknown, J <= J, K <= K, M <= M, N <= N, T <= T] f10.7 ~> f10.7 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.7 ~> f10.8 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.7 ~> f10.9 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.7 ~> f10.10 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.7 ~> f10.11 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.8 ~> f10.7 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.8 ~> f10.8 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.8 ~> f10.9 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.8 ~> f10.10 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.8 ~> f10.11 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.9 ~> f10.7 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.9 ~> f10.8 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.9 ~> f10.9 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.9 ~> f10.10 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.9 ~> f10.11 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.10 ~> f10.7 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.10 ~> f10.8 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.10 ~> f10.9 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.10 ~> f10.10 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.10 ~> f10.11 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.11 ~> f4.22 [A <= A, B <= B, C <= C, J <= unknown, K <= K, M <= unknown, N <= N, T <= T] f3.12 ~> f4.22 [A <= unknown, B <= unknown, C <= unknown, J <= unknown, K <= K, M <= unknown, N <= unknown, T <= T] f3.13 ~> f1.0 [A <= unknown, B <= 2*K, C <= unknown, J <= J, K <= K, M <= M, N <= unknown, T <= T] f3.13 ~> f1.15 [A <= unknown, B <= 2*K, C <= unknown, J <= J, K <= K, M <= M, N <= unknown, T <= T] f3.13 ~> f1.16 [A <= unknown, B <= 2*K, C <= unknown, J <= J, K <= K, M <= M, N <= unknown, T <= T] f1.15 ~> f10.7 [A <= unknown, B <= unknown, C <= unknown, J <= C, K <= T, M <= N, N <= N, T <= T] f1.15 ~> f10.8 [A <= unknown, B <= unknown, C <= unknown, J <= C, K <= T, M <= N, N <= N, T <= T] f1.15 ~> f10.9 [A <= unknown, B <= unknown, C <= unknown, J <= C, K <= T, M <= N, N <= N, T <= T] f1.15 ~> f10.10 [A <= unknown, B <= unknown, C <= unknown, J <= C, K <= T, M <= N, N <= N, T <= T] f1.16 ~> f10.7 [A <= unknown, B <= unknown, C <= unknown, J <= C, K <= T, M <= N, N <= N, T <= T] f1.16 ~> f10.8 [A <= unknown, B <= unknown, C <= unknown, J <= C, K <= T, M <= N, N <= N, T <= T] f1.16 ~> f10.9 [A <= unknown, B <= unknown, C <= unknown, J <= C, K <= T, M <= N, N <= N, T <= T] f1.16 ~> f10.10 [A <= unknown, B <= unknown, C <= unknown, J <= C, K <= T, M <= N, N <= N, T <= T] f3.18 ~> f4.22 [A <= unknown, B <= unknown, C <= unknown, J <= unknown, K <= K, M <= unknown, N <= unknown, T <= T] f3.19 ~> f4.22 [A <= unknown, B <= unknown, C <= unknown, J <= unknown, K <= K, M <= unknown, N <= unknown, T <= T] f3.20 ~> f4.22 [A <= unknown, B <= unknown, C <= unknown, J <= unknown, K <= K, M <= unknown, N <= unknown, T <= T] f3.21 ~> f4.22 [A <= unknown, B <= unknown, C <= unknown, J <= unknown, K <= K, M <= unknown, N <= unknown, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] f4.22 ~> exitus616 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= N, T <= T] + Loop: [0.0 <= K + A + B] f1.0 ~> f1.0 [A <= A, B <= A, C <= unknown, J <= J, K <= K, M <= M, N <= N, T <= T] + Loop: [0.1 <= K + T] f10.7 ~> f10.7 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.8 ~> f10.7 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.7 ~> f10.8 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.9 ~> f10.7 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.7 ~> f10.9 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.10 ~> f10.7 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.7 ~> f10.10 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.8 ~> f10.10 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.8 ~> f10.8 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.9 ~> f10.8 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.8 ~> f10.9 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.10 ~> f10.8 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.9 ~> f10.10 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.9 ~> f10.9 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.10 ~> f10.9 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] f10.10 ~> f10.10 [A <= A, B <= B, C <= C, J <= J, K <= K, M <= M, N <= M, T <= K + T] + Applied Processor: AbstractFlow + Details: () * Step 11: Failure MAYBE + Considered Problem: Program: Domain: [tick,huge,K,A,B,C,J,K,M,N,T,0.0,0.1] f1.0 ~> f1.0 [A ~=> B,huge ~=> C] f1.0 ~> f1.15 [A ~=> B,huge ~=> C] f1.0 ~> f1.16 [A ~=> B,huge ~=> C] f10.7 ~> f10.7 [M ~=> N,T ~+> T,K ~+> T] f10.7 ~> f10.8 [M ~=> N,T ~+> T,K ~+> T] f10.7 ~> f10.9 [M ~=> N,T ~+> T,K ~+> T] f10.7 ~> f10.10 [M ~=> N,T ~+> T,K ~+> T] f10.7 ~> f10.11 [M ~=> N,T ~+> T,K ~+> T] f10.8 ~> f10.7 [M ~=> N,T ~+> T,K ~+> T] f10.8 ~> f10.8 [M ~=> N,T ~+> T,K ~+> T] f10.8 ~> f10.9 [M ~=> N,T ~+> T,K ~+> T] f10.8 ~> f10.10 [M ~=> N,T ~+> T,K ~+> T] f10.8 ~> f10.11 [M ~=> N,T ~+> T,K ~+> T] f10.9 ~> f10.7 [M ~=> N,T ~+> T,K ~+> T] f10.9 ~> f10.8 [M ~=> N,T ~+> T,K ~+> T] f10.9 ~> f10.9 [M ~=> N,T ~+> T,K ~+> T] f10.9 ~> f10.10 [M ~=> N,T ~+> T,K ~+> T] f10.9 ~> f10.11 [M ~=> N,T ~+> T,K ~+> T] f10.10 ~> f10.7 [M ~=> N,T ~+> T,K ~+> T] f10.10 ~> f10.8 [M ~=> N,T ~+> T,K ~+> T] f10.10 ~> f10.9 [M ~=> N,T ~+> T,K ~+> T] f10.10 ~> f10.10 [M ~=> N,T ~+> T,K ~+> T] f10.10 ~> f10.11 [M ~=> N,T ~+> T,K ~+> T] f10.11 ~> f4.22 [huge ~=> J,huge ~=> M] f3.12 ~> f4.22 [huge ~=> A,huge ~=> B,huge ~=> C,huge ~=> J,huge ~=> M,huge ~=> N] f3.13 ~> f1.0 [K ~=> B,huge ~=> A,huge ~=> C,huge ~=> N] f3.13 ~> f1.15 [K ~=> B,huge ~=> A,huge ~=> C,huge ~=> N] f3.13 ~> f1.16 [K ~=> B,huge ~=> A,huge ~=> C,huge ~=> N] f1.15 ~> f10.7 [C ~=> J,N ~=> M,T ~=> K,huge ~=> A,huge ~=> B,huge ~=> C] f1.15 ~> f10.8 [C ~=> J,N ~=> M,T ~=> K,huge ~=> A,huge ~=> B,huge ~=> C] f1.15 ~> f10.9 [C ~=> J,N ~=> M,T ~=> K,huge ~=> A,huge ~=> B,huge ~=> C] f1.15 ~> f10.10 [C ~=> J,N ~=> M,T ~=> K,huge ~=> A,huge ~=> B,huge ~=> C] f1.16 ~> f10.7 [C ~=> J,N ~=> M,T ~=> K,huge ~=> A,huge ~=> B,huge ~=> C] f1.16 ~> f10.8 [C ~=> J,N ~=> M,T ~=> K,huge ~=> A,huge ~=> B,huge ~=> C] f1.16 ~> f10.9 [C ~=> J,N ~=> M,T ~=> K,huge ~=> A,huge ~=> B,huge ~=> C] f1.16 ~> f10.10 [C ~=> J,N ~=> M,T ~=> K,huge ~=> A,huge ~=> B,huge ~=> C] f3.18 ~> f4.22 [huge ~=> A,huge ~=> B,huge ~=> C,huge ~=> J,huge ~=> M,huge ~=> N] f3.19 ~> f4.22 [huge ~=> A,huge ~=> B,huge ~=> C,huge ~=> J,huge ~=> M,huge ~=> N] f3.20 ~> f4.22 [huge ~=> A,huge ~=> B,huge ~=> C,huge ~=> J,huge ~=> M,huge ~=> N] f3.21 ~> f4.22 [huge ~=> A,huge ~=> B,huge ~=> C,huge ~=> J,huge ~=> M,huge ~=> N] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] f4.22 ~> exitus616 [] + Loop: [A ~+> 0.0,B ~+> 0.0,K ~+> 0.0] f1.0 ~> f1.0 [A ~=> B,huge ~=> C] + Loop: [T ~+> 0.1,K ~+> 0.1] f10.7 ~> f10.7 [M ~=> N,T ~+> T,K ~+> T] f10.8 ~> f10.7 [M ~=> N,T ~+> T,K ~+> T] f10.7 ~> f10.8 [M ~=> N,T ~+> T,K ~+> T] f10.9 ~> f10.7 [M ~=> N,T ~+> T,K ~+> T] f10.7 ~> f10.9 [M ~=> N,T ~+> T,K ~+> T] f10.10 ~> f10.7 [M ~=> N,T ~+> T,K ~+> T] f10.7 ~> f10.10 [M ~=> N,T ~+> T,K ~+> T] f10.8 ~> f10.10 [M ~=> N,T ~+> T,K ~+> T] f10.8 ~> f10.8 [M ~=> N,T ~+> T,K ~+> T] f10.9 ~> f10.8 [M ~=> N,T ~+> T,K ~+> T] f10.8 ~> f10.9 [M ~=> N,T ~+> T,K ~+> T] f10.10 ~> f10.8 [M ~=> N,T ~+> T,K ~+> T] f10.9 ~> f10.10 [M ~=> N,T ~+> T,K ~+> T] f10.9 ~> f10.9 [M ~=> N,T ~+> T,K ~+> T] f10.10 ~> f10.9 [M ~=> N,T ~+> T,K ~+> T] f10.10 ~> f10.10 [M ~=> N,T ~+> T,K ~+> T] + Applied Processor: Lare + Details: Unknown bound. MAYBE