YES(?,POLY) * Step 1: ArgumentFilter WORST_CASE(?,POLY) + Considered Problem: Rules: 0. f90(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f93(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1 [1 >= A] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 1. f90(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f93(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1 [A >= 3] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 2. f93(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f96(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1 [8 >= A] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 3. f93(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f96(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1 [A >= 10] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 4. f0(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1,R1 -> f34(A,0,C4,D4,E4,F4,D4,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,G1,H1,I1,J1,K1,L1,M1,N1 [B = 0] (1,1) ,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,B3,O1,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2 ,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,Y2,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 5. f0(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1,R1 -> f29(A,0,C4,D4,E4,F4,D4,1,2,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1 [0 >= 1 + B] (1,1) ,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,B3,O1,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2 ,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,Y2,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 6. f0(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1,R1 -> f29(A,0,C4,D4,E4,F4,D4,1,2,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1 [B >= 1] (1,1) ,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,B3,O1,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2 ,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,Y2,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 7. f29(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f29(A,B,C,D,E,F,G,C4,1 + I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1 [32 >= I] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,O1,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,Y2,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 8. f34(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f41(A,B,C,D,E,F,G,H,28,56,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1,O1 [0 >= 1 + C4] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 9. f34(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f41(A,B,C,D,E,F,G,H,28,56,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1,O1 True (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 10. f41(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f59(A,B,C,D,E,F,G,H,I,J,F,C4,32,1,1,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1,O1 [32 >= C4 && I >= 1] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 11. f41(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f59(A,B,C,D,E,F,G,H,I,J,F,C4,32,0,0,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1,O1 [32 >= C4 && I >= 1] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 12. f41(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f59(A,B,C,D,E,F,G,H,I,J,F,C4,32,N,1,1,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1,O1 [C4 >= 33 && I >= 1] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 13. f41(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f59(A,B,C,D,E,F,G,H,I,J,F,C4,32,N,0,0,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1,O1 [C4 >= 33 && I >= 1] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 14. f81(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f90(Q,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,C4,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1[0 >= Q && 16 >= Q] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 15. f81(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f90(Q,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,C4,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1[16 >= Q && Q >= 2] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 16. f96(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f100(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,1,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1[15 >= A] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 17. f96(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f100(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,1,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1[A >= 17] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 18. f100(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f100(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,1 + S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1 [2 >= S] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,O1,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,Y2,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 19. f81(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f113(1,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,1,C4,S,0,0,16,32,48,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1 [Q = 1] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,O1,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,Y2,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 20. f90(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f113(2,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,0,0,16,32,48,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1,O1[A = 2] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 21. f93(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f113(9,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,0,0,16,32,48,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1,O1[A = 9] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 22. f96(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f113(16,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,0,0,16,32,48,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1 [A = 16] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,O1,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,Y2,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 23. f113(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f132(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,C4,D4,E4,28,1,1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1[28 >= E4 && V >= 1] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 24. f113(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f132(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,C4,D4,E4,28,0,0,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1[28 >= E4 && V >= 1] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 25. f113(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f132(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,C4,D4,E4,28,C1,1,1,F1,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1[E4 >= 29 && V >= 1] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 26. f113(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f132(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,C4,D4,E4,28,C1,0,0,F1,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1[E4 >= 29 && V >= 1] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 27. f132(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f150(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,D1,C4,D4,E4,28,1,1,M1,N1,O1,P1 [28 >= E4] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 28. f132(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f150(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,D1,C4,D4,E4,28,0,0,M1,N1,O1,P1 [28 >= E4] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 29. f132(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f150(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,D1,C4,D4,E4,28,K1,1,1,N1,O1,P1 [E4 >= 29] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 30. f132(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f150(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,D1,C4,D4,E4,28,K1,0,0,N1,O1,P1 [E4 >= 29] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 31. f34(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f182(A,B,C,D,E,F,G,H,32,64,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1,O1 True (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 32. f182(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f200(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,G1,H1,I1,J1,K1,L1,M1,E,C4,32 [32 >= C4 && I >= 1] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,1,1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 33. f182(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f200(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,G1,H1,I1,J1,K1,L1,M1,E,C4,32 [32 >= C4 && I >= 1] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,0,0,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 34. f182(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f200(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,G1,H1,I1,J1,K1,L1,M1,E,C4,32 [C4 >= 33 && I >= 1] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,1,1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 35. f182(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f200(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,G1,H1,I1,J1,K1,L1,M1,E,C4,32 [C4 >= 33 && I >= 1] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,0,0,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 36. f222(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f237(A,B,C,D,E,F,1,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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1[16 >= Q && G = 1] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,17 + -1*Q,C4,D4,16,32,48,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,X2,Y2,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 37. f222(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f237(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1[16 >= Q && 0 >= G] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,Q,C4,D4,16,32,48,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 38. f222(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f237(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1[16 >= Q && G >= 2] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,Q,C4,D4,16,32,48,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 39. f237(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f245(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1[W1 >= 1] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 40. f237(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f245(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1[W1 >= 1] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,0,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 41. f245(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f250(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1True (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,1,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 42. f245(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f250(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1True (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,0,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 43. f250(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f237(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1True (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,-1 + W1,-1 + X1,-1 + Y1,Z1,A2,1,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,V2,W2,X2,Y2,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 44. f250(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f237(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1True (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,-1 + W1,-1 + X1,-1 + Y1,Z1,A2,0,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,V2,W2,X2,Y2,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 45. f265(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f265(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1[4 >= W1] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,1 + W1,X1,1 + Y1,Z1,A2,B2,C4,D4,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,X2,Y2,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 46. f276(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f276(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1[E2 >= 1] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,C4,X1,Y1,Z1,A2,B2,C2,D2,-1 + E2,D4,E4,F4,G4,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,Y2,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 47. f289(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f289(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1[W1 >= 1] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,-1 + W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,C4,1,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,Y2,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 48. f289(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f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f314(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f333(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1[32 >= E4 && I >= 1] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,C4,D4,E4,32,1,1,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 50. f314(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f333(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1[32 >= E4 && I >= 1] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,C4,D4,E4,32,0,0,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 51. f314(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f333(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1[E4 >= 33 && I >= 1] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,C4,D4,E4,32,P2,1,1,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 52. f314(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f333(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1[E4 >= 33 && I >= 1] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,C4,D4,E4,32,P2,0,0,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 53. f333(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f314(A,B,C,D,E,F,G,H,-1 + I,-1 + J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1 [32 >= E4] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,M1,N1,O1,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,Q2,C4,D4,E4 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,32,1,1,1,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 54. f333(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f314(A,B,C,D,E,F,G,H,-1 + I,-1 + J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1 [32 >= E4] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,M1,N1,O1,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,Q2,C4,D4,E4 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,32,0,0,0,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 55. f333(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f314(A,B,C,D,E,F,G,H,-1 + I,-1 + J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1 [E4 >= 33] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,M1,N1,O1,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,Q2,C4,D4,E4 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,32,X2,1,1,1,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 56. f333(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f314(A,B,C,D,E,F,G,H,-1 + I,-1 + J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1 [E4 >= 33] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,M1,N1,O1,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,Q2,C4,D4,E4 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,32,X2,0,0,0,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 57. f314(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f358(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1[0 >= I] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 58. f289(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f222(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,1 + Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1 [0 >= W1] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,O1,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,Y2,Z2,A3,C4,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 59. f276(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f289(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1[0 >= E2] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,32,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 60. f265(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f276(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1[W1 >= 5] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,8,0,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 61. f237(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f265(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1[0 >= W1] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,1,X1,5,Z1,A2,B2,C4,D4,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 62. f222(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f314(A,B,C,D,E,F,G,H,32,64,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1,O1 [Q >= 17] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,Z2,A3,C4,0,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 63. f200(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f182(A,B,C,D,E,F,G,H,-1 + I,-1 + J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1 [32 >= C4] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,M1,N1,O1,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,W2,X2,Y2,Z2,A3,B3,C3,R1,E,C4,32,1,1,1,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 64. f200(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f182(A,B,C,D,E,F,G,H,-1 + I,-1 + J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1 [32 >= C4] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,M1,N1,O1,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,W2,X2,Y2,Z2,A3,B3,C3,R1,E,C4,32,0,0,0,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 65. f200(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f182(A,B,C,D,E,F,G,H,-1 + I,-1 + J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1 [C4 >= 33] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,M1,N1,O1,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,W2,X2,Y2,Z2,A3,B3,C3,R1,E,C4,32,H3,1,1,1,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 66. f200(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f182(A,B,C,D,E,F,G,H,-1 + I,-1 + J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1 [C4 >= 33] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,M1,N1,O1,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,W2,X2,Y2,Z2,A3,B3,C3,R1,E,C4,32,H3,0,0,0,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 67. f182(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f222(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,1,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1[0 >= I] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 68. f150(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f113(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,-1 + V,-1 + W,-1 + X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1[28 >= E4] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,L1,M1,N1,O1,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,V2,W2,X2,Y2,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L1,C4,D4,E4,28,1,1,1,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 69. f150(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f113(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,-1 + V,-1 + W,-1 + X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1[28 >= E4] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,L1,M1,N1,O1,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,V2,W2,X2,Y2,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L1,C4,D4,E4,28,0,0,0,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 70. f150(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f113(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,-1 + V,-1 + W,-1 + X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1[E4 >= 29] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,L1,M1,N1,O1,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,V2,W2,X2,Y2,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L1,C4,D4,E4,28,Q3,1,1,1,U3,V3,W3,X3,Y3,Z3,A4,B4) 71. f150(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f113(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,T,U,-1 + V,-1 + W,-1 + X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1[E4 >= 29] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,L1,M1,N1,O1,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,V2,W2,X2,Y2,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L1,C4,D4,E4,28,Q3,0,0,0,U3,V3,W3,X3,Y3,Z3,A4,B4) 72. f113(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f81(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,1 + Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1,O1[0 >= V] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 73. f100(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f113(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,Q,R,S,0,0,16,32,48,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1,O1[S >= 3] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 74. f81(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f182(A,B,C,D,E,F,G,H,32,64,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1,O1 [Q >= 17] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 75. f59(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f41(A,B,C,D,E,F,G,H,-1 + I,-1 + J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1[32 >= C4] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,N1,O1,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,X2,Y2,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,O,F,C4,32,1,1,1,B4) 76. f59(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f41(A,B,C,D,E,F,G,H,-1 + I,-1 + J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1[32 >= C4] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,N1,O1,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,X2,Y2,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,O,F,C4,32,0,0,0,B4) 77. f59(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f41(A,B,C,D,E,F,G,H,-1 + I,-1 + J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1[C4 >= 33] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,N1,O1,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,X2,Y2,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,O,F,C4,32,Y3,1,1,1) 78. f59(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f41(A,B,C,D,E,F,G,H,-1 + I,-1 + J,K,L,M,N,O,P,Q,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1[C4 >= 33] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,N1,O1,P1,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,X2,Y2,Z2,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,O,F,C4,32,Y3,0,0,0) 79. f41(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f81(A,B,C,D,E,F,G,H,I,J,K,L,M,N,O,P,1,R,S,T,U,V,W,X,Y,Z,A1,B1,C1,D1,E1,F1,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1 [0 >= I] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) 80. f29(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1,Q1 -> f34(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,G1,H1,I1,J1,K1,L1,M1,N1,O1,P1 [I >= 33] (?,1) ,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2,A3,Q1,R1,S1,T1,U1,V1,W1,X1,Y1,Z1,A2,B2,C2,D2,E2,F2,G2,H2,I2,J2,K2,L2,M2,N2,O2,P2,Q2,R2,S2,T2,U2,V2,W2,X2,Y2,Z2 ,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) ,A3,B3,C3,D3,E3,F3,G3,H3,I3,J3,K3,L3,M3,N3,O3,P3,Q3,R3,S3,T3,U3,V3,W3,X3,Y3,Z3,A4,B4) Signature: {(f0,106) ;(f100,106) ;(f113,106) ;(f132,106) ;(f150,106) ;(f182,106) ;(f200,106) ;(f222,106) ;(f237,106) ;(f245,106) ;(f250,106) ;(f265,106) ;(f276,106) ;(f289,106) ;(f29,106) ;(f314,106) ;(f333,106) ;(f34,106) ;(f358,106) ;(f41,106) ;(f59,106) ;(f81,106) ;(f90,106) ;(f93,106) ;(f96,106)} Flow Graph: [0->{2,3,21},1->{2,3,21},2->{16,17,22},3->{16,17,22},4->{8,9,31},5->{7,80},6->{7,80},7->{7,80},8->{10,11 ,12,13,79},9->{10,11,12,13,79},10->{75,76,77,78},11->{75,76,77,78},12->{75,76,77,78},13->{75,76,77,78} ,14->{0,1,20},15->{0,1,20},16->{18,73},17->{18,73},18->{18,73},19->{23,24,25,26,72},20->{23,24,25,26,72} ,21->{23,24,25,26,72},22->{23,24,25,26,72},23->{27,28,29,30},24->{27,28,29,30},25->{27,28,29,30},26->{27,28 ,29,30},27->{68,69,70,71},28->{68,69,70,71},29->{68,69,70,71},30->{68,69,70,71},31->{32,33,34,35,67},32->{63 ,64,65,66},33->{63,64,65,66},34->{63,64,65,66},35->{63,64,65,66},36->{39,40,61},37->{39,40,61},38->{39,40 ,61},39->{41,42},40->{41,42},41->{43,44},42->{43,44},43->{39,40,61},44->{39,40,61},45->{45,60},46->{46,59} ,47->{47,48,58},48->{47,48,58},49->{53,54,55,56},50->{53,54,55,56},51->{53,54,55,56},52->{53,54,55,56} ,53->{49,50,51,52,57},54->{49,50,51,52,57},55->{49,50,51,52,57},56->{49,50,51,52,57},57->{},58->{36,37,38 ,62},59->{47,48,58},60->{46,59},61->{45,60},62->{49,50,51,52,57},63->{32,33,34,35,67},64->{32,33,34,35,67} ,65->{32,33,34,35,67},66->{32,33,34,35,67},67->{36,37,38,62},68->{23,24,25,26,72},69->{23,24,25,26,72} ,70->{23,24,25,26,72},71->{23,24,25,26,72},72->{14,15,19,74},73->{23,24,25,26,72},74->{32,33,34,35,67} ,75->{10,11,12,13,79},76->{10,11,12,13,79},77->{10,11,12,13,79},78->{10,11,12,13,79},79->{14,15,19,74} ,80->{8,9,31}] + Applied Processor: ArgumentFilter [2,3,4,5,7,9,10,11,12,13,14,15,17,19,20,22,23,24,25,26,27,28,29,30,31,32,33,34,35,36,37,38,39,40,41,42,43,44,45,46,47,49,50,51,52,53,54,55,57,58,59,60,61,62,63,64,65,66,67,68,69,70,71,72,73,74,75,76,77,78,79,80,81,82,83,84,85,86,87,88,89,90,91,92,93,94,95,96,97,98,99,100,101,102,103,104,105] + Details: We remove following argument positions: [2 ,3 ,4 ,5 ,7 ,9 ,10 ,11 ,12 ,13 ,14 ,15 ,17 ,19 ,20 ,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 ,49 ,50 ,51 ,52 ,53 ,54 ,55 ,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]. * Step 2: TrivialSCCs WORST_CASE(?,POLY) + Considered Problem: Rules: 0. f90(A,B,G,I,Q,S,V,W1,E2) -> f93(A,B,G,I,Q,S,V,W1,E2) [1 >= A] (?,1) 1. f90(A,B,G,I,Q,S,V,W1,E2) -> f93(A,B,G,I,Q,S,V,W1,E2) [A >= 3] (?,1) 2. f93(A,B,G,I,Q,S,V,W1,E2) -> f96(A,B,G,I,Q,S,V,W1,E2) [8 >= A] (?,1) 3. f93(A,B,G,I,Q,S,V,W1,E2) -> f96(A,B,G,I,Q,S,V,W1,E2) [A >= 10] (?,1) 4. f0(A,B,G,I,Q,S,V,W1,E2) -> f34(A,0,D4,I,Q,S,V,W1,E2) [B = 0] (1,1) 5. f0(A,B,G,I,Q,S,V,W1,E2) -> f29(A,0,D4,2,Q,S,V,W1,E2) [0 >= 1 + B] (1,1) 6. f0(A,B,G,I,Q,S,V,W1,E2) -> f29(A,0,D4,2,Q,S,V,W1,E2) [B >= 1] (1,1) 7. f29(A,B,G,I,Q,S,V,W1,E2) -> f29(A,B,G,1 + I,Q,S,V,W1,E2) [32 >= I] (?,1) 8. f34(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,28,Q,S,V,W1,E2) [0 >= 1 + C4] (?,1) 9. f34(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,28,Q,S,V,W1,E2) True (?,1) 10. f41(A,B,G,I,Q,S,V,W1,E2) -> f59(A,B,G,I,Q,S,V,W1,E2) [32 >= C4 && I >= 1] (?,1) 11. f41(A,B,G,I,Q,S,V,W1,E2) -> f59(A,B,G,I,Q,S,V,W1,E2) [32 >= C4 && I >= 1] (?,1) 12. f41(A,B,G,I,Q,S,V,W1,E2) -> f59(A,B,G,I,Q,S,V,W1,E2) [C4 >= 33 && I >= 1] (?,1) 13. f41(A,B,G,I,Q,S,V,W1,E2) -> f59(A,B,G,I,Q,S,V,W1,E2) [C4 >= 33 && I >= 1] (?,1) 14. f81(A,B,G,I,Q,S,V,W1,E2) -> f90(Q,B,G,I,Q,S,V,W1,E2) [0 >= Q && 16 >= Q] (?,1) 15. f81(A,B,G,I,Q,S,V,W1,E2) -> f90(Q,B,G,I,Q,S,V,W1,E2) [16 >= Q && Q >= 2] (?,1) 16. f96(A,B,G,I,Q,S,V,W1,E2) -> f100(A,B,G,I,Q,1,V,W1,E2) [15 >= A] (?,1) 17. f96(A,B,G,I,Q,S,V,W1,E2) -> f100(A,B,G,I,Q,1,V,W1,E2) [A >= 17] (?,1) 18. f100(A,B,G,I,Q,S,V,W1,E2) -> f100(A,B,G,I,Q,1 + S,V,W1,E2) [2 >= S] (?,1) 19. f81(A,B,G,I,Q,S,V,W1,E2) -> f113(1,B,G,I,1,S,16,W1,E2) [Q = 1] (?,1) 20. f90(A,B,G,I,Q,S,V,W1,E2) -> f113(2,B,G,I,Q,S,16,W1,E2) [A = 2] (?,1) 21. f93(A,B,G,I,Q,S,V,W1,E2) -> f113(9,B,G,I,Q,S,16,W1,E2) [A = 9] (?,1) 22. f96(A,B,G,I,Q,S,V,W1,E2) -> f113(16,B,G,I,Q,S,16,W1,E2) [A = 16] (?,1) 23. f113(A,B,G,I,Q,S,V,W1,E2) -> f132(A,B,G,I,Q,S,V,W1,E2) [28 >= E4 && V >= 1] (?,1) 24. f113(A,B,G,I,Q,S,V,W1,E2) -> f132(A,B,G,I,Q,S,V,W1,E2) [28 >= E4 && V >= 1] (?,1) 25. f113(A,B,G,I,Q,S,V,W1,E2) -> f132(A,B,G,I,Q,S,V,W1,E2) [E4 >= 29 && V >= 1] (?,1) 26. f113(A,B,G,I,Q,S,V,W1,E2) -> f132(A,B,G,I,Q,S,V,W1,E2) [E4 >= 29 && V >= 1] (?,1) 27. f132(A,B,G,I,Q,S,V,W1,E2) -> f150(A,B,G,I,Q,S,V,W1,E2) [28 >= E4] (?,1) 28. f132(A,B,G,I,Q,S,V,W1,E2) -> f150(A,B,G,I,Q,S,V,W1,E2) [28 >= E4] (?,1) 29. f132(A,B,G,I,Q,S,V,W1,E2) -> f150(A,B,G,I,Q,S,V,W1,E2) [E4 >= 29] (?,1) 30. f132(A,B,G,I,Q,S,V,W1,E2) -> f150(A,B,G,I,Q,S,V,W1,E2) [E4 >= 29] (?,1) 31. f34(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,32,Q,S,V,W1,E2) True (?,1) 32. f182(A,B,G,I,Q,S,V,W1,E2) -> f200(A,B,G,I,Q,S,V,W1,E2) [32 >= C4 && I >= 1] (?,1) 33. f182(A,B,G,I,Q,S,V,W1,E2) -> f200(A,B,G,I,Q,S,V,W1,E2) [32 >= C4 && I >= 1] (?,1) 34. f182(A,B,G,I,Q,S,V,W1,E2) -> f200(A,B,G,I,Q,S,V,W1,E2) [C4 >= 33 && I >= 1] (?,1) 35. f182(A,B,G,I,Q,S,V,W1,E2) -> f200(A,B,G,I,Q,S,V,W1,E2) [C4 >= 33 && I >= 1] (?,1) 36. f222(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,1,I,Q,S,V,16,E2) [16 >= Q && G = 1] (?,1) 37. f222(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,G,I,Q,S,V,16,E2) [16 >= Q && 0 >= G] (?,1) 38. f222(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,G,I,Q,S,V,16,E2) [16 >= Q && G >= 2] (?,1) 39. f237(A,B,G,I,Q,S,V,W1,E2) -> f245(A,B,G,I,Q,S,V,W1,E2) [W1 >= 1] (?,1) 40. f237(A,B,G,I,Q,S,V,W1,E2) -> f245(A,B,G,I,Q,S,V,W1,E2) [W1 >= 1] (?,1) 41. f245(A,B,G,I,Q,S,V,W1,E2) -> f250(A,B,G,I,Q,S,V,W1,E2) True (?,1) 42. f245(A,B,G,I,Q,S,V,W1,E2) -> f250(A,B,G,I,Q,S,V,W1,E2) True (?,1) 43. f250(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,G,I,Q,S,V,-1 + W1,E2) True (?,1) 44. f250(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,G,I,Q,S,V,-1 + W1,E2) True (?,1) 45. f265(A,B,G,I,Q,S,V,W1,E2) -> f265(A,B,G,I,Q,S,V,1 + W1,E2) [4 >= W1] (?,1) 46. f276(A,B,G,I,Q,S,V,W1,E2) -> f276(A,B,G,I,Q,S,V,C4,-1 + E2) [E2 >= 1] (?,1) 47. f289(A,B,G,I,Q,S,V,W1,E2) -> f289(A,B,G,I,Q,S,V,-1 + W1,E2) [W1 >= 1] (?,1) 48. f289(A,B,G,I,Q,S,V,W1,E2) -> f289(A,B,G,I,Q,S,V,-1 + W1,E2) [W1 >= 1] (?,1) 49. f314(A,B,G,I,Q,S,V,W1,E2) -> f333(A,B,G,I,Q,S,V,W1,E2) [32 >= E4 && I >= 1] (?,1) 50. f314(A,B,G,I,Q,S,V,W1,E2) -> f333(A,B,G,I,Q,S,V,W1,E2) [32 >= E4 && I >= 1] (?,1) 51. f314(A,B,G,I,Q,S,V,W1,E2) -> f333(A,B,G,I,Q,S,V,W1,E2) [E4 >= 33 && I >= 1] (?,1) 52. f314(A,B,G,I,Q,S,V,W1,E2) -> f333(A,B,G,I,Q,S,V,W1,E2) [E4 >= 33 && I >= 1] (?,1) 53. f333(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= E4] (?,1) 54. f333(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= E4] (?,1) 55. f333(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,-1 + I,Q,S,V,W1,E2) [E4 >= 33] (?,1) 56. f333(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,-1 + I,Q,S,V,W1,E2) [E4 >= 33] (?,1) 57. f314(A,B,G,I,Q,S,V,W1,E2) -> f358(A,B,G,I,Q,S,V,W1,E2) [0 >= I] (?,1) 58. f289(A,B,G,I,Q,S,V,W1,E2) -> f222(A,B,G,I,1 + Q,S,V,W1,E2) [0 >= W1] (?,1) 59. f276(A,B,G,I,Q,S,V,W1,E2) -> f289(A,B,G,I,Q,S,V,32,E2) [0 >= E2] (?,1) 60. f265(A,B,G,I,Q,S,V,W1,E2) -> f276(A,B,G,I,Q,S,V,W1,8) [W1 >= 5] (?,1) 61. f237(A,B,G,I,Q,S,V,W1,E2) -> f265(A,B,G,I,Q,S,V,1,E2) [0 >= W1] (?,1) 62. f222(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,32,Q,S,V,W1,E2) [Q >= 17] (?,1) 63. f200(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= C4] (?,1) 64. f200(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= C4] (?,1) 65. f200(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,-1 + I,Q,S,V,W1,E2) [C4 >= 33] (?,1) 66. f200(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,-1 + I,Q,S,V,W1,E2) [C4 >= 33] (?,1) 67. f182(A,B,G,I,Q,S,V,W1,E2) -> f222(A,B,G,I,1,S,V,W1,E2) [0 >= I] (?,1) 68. f150(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,-1 + V,W1,E2) [28 >= E4] (?,1) 69. f150(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,-1 + V,W1,E2) [28 >= E4] (?,1) 70. f150(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,-1 + V,W1,E2) [E4 >= 29] (?,1) 71. f150(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,-1 + V,W1,E2) [E4 >= 29] (?,1) 72. f113(A,B,G,I,Q,S,V,W1,E2) -> f81(A,B,G,I,1 + Q,S,V,W1,E2) [0 >= V] (?,1) 73. f100(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,16,W1,E2) [S >= 3] (?,1) 74. f81(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,32,Q,S,V,W1,E2) [Q >= 17] (?,1) 75. f59(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= C4] (?,1) 76. f59(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= C4] (?,1) 77. f59(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,-1 + I,Q,S,V,W1,E2) [C4 >= 33] (?,1) 78. f59(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,-1 + I,Q,S,V,W1,E2) [C4 >= 33] (?,1) 79. f41(A,B,G,I,Q,S,V,W1,E2) -> f81(A,B,G,I,1,S,V,W1,E2) [0 >= I] (?,1) 80. f29(A,B,G,I,Q,S,V,W1,E2) -> f34(A,B,G,I,Q,S,V,W1,E2) [I >= 33] (?,1) Signature: {(f0,106) ;(f100,106) ;(f113,106) ;(f132,106) ;(f150,106) ;(f182,106) ;(f200,106) ;(f222,106) ;(f237,106) ;(f245,106) ;(f250,106) ;(f265,106) ;(f276,106) ;(f289,106) ;(f29,106) ;(f314,106) ;(f333,106) ;(f34,106) ;(f358,106) ;(f41,106) ;(f59,106) ;(f81,106) ;(f90,106) ;(f93,106) ;(f96,106)} Flow Graph: [0->{2,3,21},1->{2,3,21},2->{16,17,22},3->{16,17,22},4->{8,9,31},5->{7,80},6->{7,80},7->{7,80},8->{10,11 ,12,13,79},9->{10,11,12,13,79},10->{75,76,77,78},11->{75,76,77,78},12->{75,76,77,78},13->{75,76,77,78} ,14->{0,1,20},15->{0,1,20},16->{18,73},17->{18,73},18->{18,73},19->{23,24,25,26,72},20->{23,24,25,26,72} ,21->{23,24,25,26,72},22->{23,24,25,26,72},23->{27,28,29,30},24->{27,28,29,30},25->{27,28,29,30},26->{27,28 ,29,30},27->{68,69,70,71},28->{68,69,70,71},29->{68,69,70,71},30->{68,69,70,71},31->{32,33,34,35,67},32->{63 ,64,65,66},33->{63,64,65,66},34->{63,64,65,66},35->{63,64,65,66},36->{39,40,61},37->{39,40,61},38->{39,40 ,61},39->{41,42},40->{41,42},41->{43,44},42->{43,44},43->{39,40,61},44->{39,40,61},45->{45,60},46->{46,59} ,47->{47,48,58},48->{47,48,58},49->{53,54,55,56},50->{53,54,55,56},51->{53,54,55,56},52->{53,54,55,56} ,53->{49,50,51,52,57},54->{49,50,51,52,57},55->{49,50,51,52,57},56->{49,50,51,52,57},57->{},58->{36,37,38 ,62},59->{47,48,58},60->{46,59},61->{45,60},62->{49,50,51,52,57},63->{32,33,34,35,67},64->{32,33,34,35,67} ,65->{32,33,34,35,67},66->{32,33,34,35,67},67->{36,37,38,62},68->{23,24,25,26,72},69->{23,24,25,26,72} ,70->{23,24,25,26,72},71->{23,24,25,26,72},72->{14,15,19,74},73->{23,24,25,26,72},74->{32,33,34,35,67} ,75->{10,11,12,13,79},76->{10,11,12,13,79},77->{10,11,12,13,79},78->{10,11,12,13,79},79->{14,15,19,74} ,80->{8,9,31}] + Applied Processor: TrivialSCCs + Details: All trivial SCCs of the transition graph admit timebound 1. * Step 3: UnsatPaths WORST_CASE(?,POLY) + Considered Problem: Rules: 0. f90(A,B,G,I,Q,S,V,W1,E2) -> f93(A,B,G,I,Q,S,V,W1,E2) [1 >= A] (?,1) 1. f90(A,B,G,I,Q,S,V,W1,E2) -> f93(A,B,G,I,Q,S,V,W1,E2) [A >= 3] (?,1) 2. f93(A,B,G,I,Q,S,V,W1,E2) -> f96(A,B,G,I,Q,S,V,W1,E2) [8 >= A] (?,1) 3. f93(A,B,G,I,Q,S,V,W1,E2) -> f96(A,B,G,I,Q,S,V,W1,E2) [A >= 10] (?,1) 4. f0(A,B,G,I,Q,S,V,W1,E2) -> f34(A,0,D4,I,Q,S,V,W1,E2) [B = 0] (1,1) 5. f0(A,B,G,I,Q,S,V,W1,E2) -> f29(A,0,D4,2,Q,S,V,W1,E2) [0 >= 1 + B] (1,1) 6. f0(A,B,G,I,Q,S,V,W1,E2) -> f29(A,0,D4,2,Q,S,V,W1,E2) [B >= 1] (1,1) 7. f29(A,B,G,I,Q,S,V,W1,E2) -> f29(A,B,G,1 + I,Q,S,V,W1,E2) [32 >= I] (?,1) 8. f34(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,28,Q,S,V,W1,E2) [0 >= 1 + C4] (1,1) 9. f34(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,28,Q,S,V,W1,E2) True (1,1) 10. f41(A,B,G,I,Q,S,V,W1,E2) -> f59(A,B,G,I,Q,S,V,W1,E2) [32 >= C4 && I >= 1] (?,1) 11. f41(A,B,G,I,Q,S,V,W1,E2) -> f59(A,B,G,I,Q,S,V,W1,E2) [32 >= C4 && I >= 1] (?,1) 12. f41(A,B,G,I,Q,S,V,W1,E2) -> f59(A,B,G,I,Q,S,V,W1,E2) [C4 >= 33 && I >= 1] (?,1) 13. f41(A,B,G,I,Q,S,V,W1,E2) -> f59(A,B,G,I,Q,S,V,W1,E2) [C4 >= 33 && I >= 1] (?,1) 14. f81(A,B,G,I,Q,S,V,W1,E2) -> f90(Q,B,G,I,Q,S,V,W1,E2) [0 >= Q && 16 >= Q] (?,1) 15. f81(A,B,G,I,Q,S,V,W1,E2) -> f90(Q,B,G,I,Q,S,V,W1,E2) [16 >= Q && Q >= 2] (?,1) 16. f96(A,B,G,I,Q,S,V,W1,E2) -> f100(A,B,G,I,Q,1,V,W1,E2) [15 >= A] (?,1) 17. f96(A,B,G,I,Q,S,V,W1,E2) -> f100(A,B,G,I,Q,1,V,W1,E2) [A >= 17] (?,1) 18. f100(A,B,G,I,Q,S,V,W1,E2) -> f100(A,B,G,I,Q,1 + S,V,W1,E2) [2 >= S] (?,1) 19. f81(A,B,G,I,Q,S,V,W1,E2) -> f113(1,B,G,I,1,S,16,W1,E2) [Q = 1] (?,1) 20. f90(A,B,G,I,Q,S,V,W1,E2) -> f113(2,B,G,I,Q,S,16,W1,E2) [A = 2] (?,1) 21. f93(A,B,G,I,Q,S,V,W1,E2) -> f113(9,B,G,I,Q,S,16,W1,E2) [A = 9] (?,1) 22. f96(A,B,G,I,Q,S,V,W1,E2) -> f113(16,B,G,I,Q,S,16,W1,E2) [A = 16] (?,1) 23. f113(A,B,G,I,Q,S,V,W1,E2) -> f132(A,B,G,I,Q,S,V,W1,E2) [28 >= E4 && V >= 1] (?,1) 24. f113(A,B,G,I,Q,S,V,W1,E2) -> f132(A,B,G,I,Q,S,V,W1,E2) [28 >= E4 && V >= 1] (?,1) 25. f113(A,B,G,I,Q,S,V,W1,E2) -> f132(A,B,G,I,Q,S,V,W1,E2) [E4 >= 29 && V >= 1] (?,1) 26. f113(A,B,G,I,Q,S,V,W1,E2) -> f132(A,B,G,I,Q,S,V,W1,E2) [E4 >= 29 && V >= 1] (?,1) 27. f132(A,B,G,I,Q,S,V,W1,E2) -> f150(A,B,G,I,Q,S,V,W1,E2) [28 >= E4] (?,1) 28. f132(A,B,G,I,Q,S,V,W1,E2) -> f150(A,B,G,I,Q,S,V,W1,E2) [28 >= E4] (?,1) 29. f132(A,B,G,I,Q,S,V,W1,E2) -> f150(A,B,G,I,Q,S,V,W1,E2) [E4 >= 29] (?,1) 30. f132(A,B,G,I,Q,S,V,W1,E2) -> f150(A,B,G,I,Q,S,V,W1,E2) [E4 >= 29] (?,1) 31. f34(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,32,Q,S,V,W1,E2) True (1,1) 32. f182(A,B,G,I,Q,S,V,W1,E2) -> f200(A,B,G,I,Q,S,V,W1,E2) [32 >= C4 && I >= 1] (?,1) 33. f182(A,B,G,I,Q,S,V,W1,E2) -> f200(A,B,G,I,Q,S,V,W1,E2) [32 >= C4 && I >= 1] (?,1) 34. f182(A,B,G,I,Q,S,V,W1,E2) -> f200(A,B,G,I,Q,S,V,W1,E2) [C4 >= 33 && I >= 1] (?,1) 35. f182(A,B,G,I,Q,S,V,W1,E2) -> f200(A,B,G,I,Q,S,V,W1,E2) [C4 >= 33 && I >= 1] (?,1) 36. f222(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,1,I,Q,S,V,16,E2) [16 >= Q && G = 1] (?,1) 37. f222(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,G,I,Q,S,V,16,E2) [16 >= Q && 0 >= G] (?,1) 38. f222(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,G,I,Q,S,V,16,E2) [16 >= Q && G >= 2] (?,1) 39. f237(A,B,G,I,Q,S,V,W1,E2) -> f245(A,B,G,I,Q,S,V,W1,E2) [W1 >= 1] (?,1) 40. f237(A,B,G,I,Q,S,V,W1,E2) -> f245(A,B,G,I,Q,S,V,W1,E2) [W1 >= 1] (?,1) 41. f245(A,B,G,I,Q,S,V,W1,E2) -> f250(A,B,G,I,Q,S,V,W1,E2) True (?,1) 42. f245(A,B,G,I,Q,S,V,W1,E2) -> f250(A,B,G,I,Q,S,V,W1,E2) True (?,1) 43. f250(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,G,I,Q,S,V,-1 + W1,E2) True (?,1) 44. f250(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,G,I,Q,S,V,-1 + W1,E2) True (?,1) 45. f265(A,B,G,I,Q,S,V,W1,E2) -> f265(A,B,G,I,Q,S,V,1 + W1,E2) [4 >= W1] (?,1) 46. f276(A,B,G,I,Q,S,V,W1,E2) -> f276(A,B,G,I,Q,S,V,C4,-1 + E2) [E2 >= 1] (?,1) 47. f289(A,B,G,I,Q,S,V,W1,E2) -> f289(A,B,G,I,Q,S,V,-1 + W1,E2) [W1 >= 1] (?,1) 48. f289(A,B,G,I,Q,S,V,W1,E2) -> f289(A,B,G,I,Q,S,V,-1 + W1,E2) [W1 >= 1] (?,1) 49. f314(A,B,G,I,Q,S,V,W1,E2) -> f333(A,B,G,I,Q,S,V,W1,E2) [32 >= E4 && I >= 1] (?,1) 50. f314(A,B,G,I,Q,S,V,W1,E2) -> f333(A,B,G,I,Q,S,V,W1,E2) [32 >= E4 && I >= 1] (?,1) 51. f314(A,B,G,I,Q,S,V,W1,E2) -> f333(A,B,G,I,Q,S,V,W1,E2) [E4 >= 33 && I >= 1] (?,1) 52. f314(A,B,G,I,Q,S,V,W1,E2) -> f333(A,B,G,I,Q,S,V,W1,E2) [E4 >= 33 && I >= 1] (?,1) 53. f333(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= E4] (?,1) 54. f333(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= E4] (?,1) 55. f333(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,-1 + I,Q,S,V,W1,E2) [E4 >= 33] (?,1) 56. f333(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,-1 + I,Q,S,V,W1,E2) [E4 >= 33] (?,1) 57. f314(A,B,G,I,Q,S,V,W1,E2) -> f358(A,B,G,I,Q,S,V,W1,E2) [0 >= I] (1,1) 58. f289(A,B,G,I,Q,S,V,W1,E2) -> f222(A,B,G,I,1 + Q,S,V,W1,E2) [0 >= W1] (?,1) 59. f276(A,B,G,I,Q,S,V,W1,E2) -> f289(A,B,G,I,Q,S,V,32,E2) [0 >= E2] (?,1) 60. f265(A,B,G,I,Q,S,V,W1,E2) -> f276(A,B,G,I,Q,S,V,W1,8) [W1 >= 5] (?,1) 61. f237(A,B,G,I,Q,S,V,W1,E2) -> f265(A,B,G,I,Q,S,V,1,E2) [0 >= W1] (?,1) 62. f222(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,32,Q,S,V,W1,E2) [Q >= 17] (1,1) 63. f200(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= C4] (?,1) 64. f200(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= C4] (?,1) 65. f200(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,-1 + I,Q,S,V,W1,E2) [C4 >= 33] (?,1) 66. f200(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,-1 + I,Q,S,V,W1,E2) [C4 >= 33] (?,1) 67. f182(A,B,G,I,Q,S,V,W1,E2) -> f222(A,B,G,I,1,S,V,W1,E2) [0 >= I] (1,1) 68. f150(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,-1 + V,W1,E2) [28 >= E4] (?,1) 69. f150(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,-1 + V,W1,E2) [28 >= E4] (?,1) 70. f150(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,-1 + V,W1,E2) [E4 >= 29] (?,1) 71. f150(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,-1 + V,W1,E2) [E4 >= 29] (?,1) 72. f113(A,B,G,I,Q,S,V,W1,E2) -> f81(A,B,G,I,1 + Q,S,V,W1,E2) [0 >= V] (?,1) 73. f100(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,16,W1,E2) [S >= 3] (?,1) 74. f81(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,32,Q,S,V,W1,E2) [Q >= 17] (1,1) 75. f59(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= C4] (?,1) 76. f59(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= C4] (?,1) 77. f59(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,-1 + I,Q,S,V,W1,E2) [C4 >= 33] (?,1) 78. f59(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,-1 + I,Q,S,V,W1,E2) [C4 >= 33] (?,1) 79. f41(A,B,G,I,Q,S,V,W1,E2) -> f81(A,B,G,I,1,S,V,W1,E2) [0 >= I] (1,1) 80. f29(A,B,G,I,Q,S,V,W1,E2) -> f34(A,B,G,I,Q,S,V,W1,E2) [I >= 33] (1,1) Signature: {(f0,106) ;(f100,106) ;(f113,106) ;(f132,106) ;(f150,106) ;(f182,106) ;(f200,106) ;(f222,106) ;(f237,106) ;(f245,106) ;(f250,106) ;(f265,106) ;(f276,106) ;(f289,106) ;(f29,106) ;(f314,106) ;(f333,106) ;(f34,106) ;(f358,106) ;(f41,106) ;(f59,106) ;(f81,106) ;(f90,106) ;(f93,106) ;(f96,106)} Flow Graph: [0->{2,3,21},1->{2,3,21},2->{16,17,22},3->{16,17,22},4->{8,9,31},5->{7,80},6->{7,80},7->{7,80},8->{10,11 ,12,13,79},9->{10,11,12,13,79},10->{75,76,77,78},11->{75,76,77,78},12->{75,76,77,78},13->{75,76,77,78} ,14->{0,1,20},15->{0,1,20},16->{18,73},17->{18,73},18->{18,73},19->{23,24,25,26,72},20->{23,24,25,26,72} ,21->{23,24,25,26,72},22->{23,24,25,26,72},23->{27,28,29,30},24->{27,28,29,30},25->{27,28,29,30},26->{27,28 ,29,30},27->{68,69,70,71},28->{68,69,70,71},29->{68,69,70,71},30->{68,69,70,71},31->{32,33,34,35,67},32->{63 ,64,65,66},33->{63,64,65,66},34->{63,64,65,66},35->{63,64,65,66},36->{39,40,61},37->{39,40,61},38->{39,40 ,61},39->{41,42},40->{41,42},41->{43,44},42->{43,44},43->{39,40,61},44->{39,40,61},45->{45,60},46->{46,59} ,47->{47,48,58},48->{47,48,58},49->{53,54,55,56},50->{53,54,55,56},51->{53,54,55,56},52->{53,54,55,56} ,53->{49,50,51,52,57},54->{49,50,51,52,57},55->{49,50,51,52,57},56->{49,50,51,52,57},57->{},58->{36,37,38 ,62},59->{47,48,58},60->{46,59},61->{45,60},62->{49,50,51,52,57},63->{32,33,34,35,67},64->{32,33,34,35,67} ,65->{32,33,34,35,67},66->{32,33,34,35,67},67->{36,37,38,62},68->{23,24,25,26,72},69->{23,24,25,26,72} ,70->{23,24,25,26,72},71->{23,24,25,26,72},72->{14,15,19,74},73->{23,24,25,26,72},74->{32,33,34,35,67} ,75->{10,11,12,13,79},76->{10,11,12,13,79},77->{10,11,12,13,79},78->{10,11,12,13,79},79->{14,15,19,74} ,80->{8,9,31}] + Applied Processor: UnsatPaths + Details: We remove following edges from the transition graph: [(0,3) ,(0,21) ,(2,17) ,(2,22) ,(5,80) ,(6,80) ,(8,79) ,(9,79) ,(14,1) ,(14,20) ,(15,0) ,(16,73) ,(17,73) ,(19,72) ,(20,72) ,(21,72) ,(22,72) ,(31,67) ,(36,61) ,(37,61) ,(38,61) ,(59,58) ,(60,59) ,(61,60) ,(62,57) ,(67,62) ,(73,72) ,(74,67) ,(79,14) ,(79,15) ,(79,74)] * Step 4: AddSinks WORST_CASE(?,POLY) + Considered Problem: Rules: 0. f90(A,B,G,I,Q,S,V,W1,E2) -> f93(A,B,G,I,Q,S,V,W1,E2) [1 >= A] (?,1) 1. f90(A,B,G,I,Q,S,V,W1,E2) -> f93(A,B,G,I,Q,S,V,W1,E2) [A >= 3] (?,1) 2. f93(A,B,G,I,Q,S,V,W1,E2) -> f96(A,B,G,I,Q,S,V,W1,E2) [8 >= A] (?,1) 3. f93(A,B,G,I,Q,S,V,W1,E2) -> f96(A,B,G,I,Q,S,V,W1,E2) [A >= 10] (?,1) 4. f0(A,B,G,I,Q,S,V,W1,E2) -> f34(A,0,D4,I,Q,S,V,W1,E2) [B = 0] (1,1) 5. f0(A,B,G,I,Q,S,V,W1,E2) -> f29(A,0,D4,2,Q,S,V,W1,E2) [0 >= 1 + B] (1,1) 6. f0(A,B,G,I,Q,S,V,W1,E2) -> f29(A,0,D4,2,Q,S,V,W1,E2) [B >= 1] (1,1) 7. f29(A,B,G,I,Q,S,V,W1,E2) -> f29(A,B,G,1 + I,Q,S,V,W1,E2) [32 >= I] (?,1) 8. f34(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,28,Q,S,V,W1,E2) [0 >= 1 + C4] (1,1) 9. f34(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,28,Q,S,V,W1,E2) True (1,1) 10. f41(A,B,G,I,Q,S,V,W1,E2) -> f59(A,B,G,I,Q,S,V,W1,E2) [32 >= C4 && I >= 1] (?,1) 11. f41(A,B,G,I,Q,S,V,W1,E2) -> f59(A,B,G,I,Q,S,V,W1,E2) [32 >= C4 && I >= 1] (?,1) 12. f41(A,B,G,I,Q,S,V,W1,E2) -> f59(A,B,G,I,Q,S,V,W1,E2) [C4 >= 33 && I >= 1] (?,1) 13. f41(A,B,G,I,Q,S,V,W1,E2) -> f59(A,B,G,I,Q,S,V,W1,E2) [C4 >= 33 && I >= 1] (?,1) 14. f81(A,B,G,I,Q,S,V,W1,E2) -> f90(Q,B,G,I,Q,S,V,W1,E2) [0 >= Q && 16 >= Q] (?,1) 15. f81(A,B,G,I,Q,S,V,W1,E2) -> f90(Q,B,G,I,Q,S,V,W1,E2) [16 >= Q && Q >= 2] (?,1) 16. f96(A,B,G,I,Q,S,V,W1,E2) -> f100(A,B,G,I,Q,1,V,W1,E2) [15 >= A] (?,1) 17. f96(A,B,G,I,Q,S,V,W1,E2) -> f100(A,B,G,I,Q,1,V,W1,E2) [A >= 17] (?,1) 18. f100(A,B,G,I,Q,S,V,W1,E2) -> f100(A,B,G,I,Q,1 + S,V,W1,E2) [2 >= S] (?,1) 19. f81(A,B,G,I,Q,S,V,W1,E2) -> f113(1,B,G,I,1,S,16,W1,E2) [Q = 1] (?,1) 20. f90(A,B,G,I,Q,S,V,W1,E2) -> f113(2,B,G,I,Q,S,16,W1,E2) [A = 2] (?,1) 21. f93(A,B,G,I,Q,S,V,W1,E2) -> f113(9,B,G,I,Q,S,16,W1,E2) [A = 9] (?,1) 22. f96(A,B,G,I,Q,S,V,W1,E2) -> f113(16,B,G,I,Q,S,16,W1,E2) [A = 16] (?,1) 23. f113(A,B,G,I,Q,S,V,W1,E2) -> f132(A,B,G,I,Q,S,V,W1,E2) [28 >= E4 && V >= 1] (?,1) 24. f113(A,B,G,I,Q,S,V,W1,E2) -> f132(A,B,G,I,Q,S,V,W1,E2) [28 >= E4 && V >= 1] (?,1) 25. f113(A,B,G,I,Q,S,V,W1,E2) -> f132(A,B,G,I,Q,S,V,W1,E2) [E4 >= 29 && V >= 1] (?,1) 26. f113(A,B,G,I,Q,S,V,W1,E2) -> f132(A,B,G,I,Q,S,V,W1,E2) [E4 >= 29 && V >= 1] (?,1) 27. f132(A,B,G,I,Q,S,V,W1,E2) -> f150(A,B,G,I,Q,S,V,W1,E2) [28 >= E4] (?,1) 28. f132(A,B,G,I,Q,S,V,W1,E2) -> f150(A,B,G,I,Q,S,V,W1,E2) [28 >= E4] (?,1) 29. f132(A,B,G,I,Q,S,V,W1,E2) -> f150(A,B,G,I,Q,S,V,W1,E2) [E4 >= 29] (?,1) 30. f132(A,B,G,I,Q,S,V,W1,E2) -> f150(A,B,G,I,Q,S,V,W1,E2) [E4 >= 29] (?,1) 31. f34(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,32,Q,S,V,W1,E2) True (1,1) 32. f182(A,B,G,I,Q,S,V,W1,E2) -> f200(A,B,G,I,Q,S,V,W1,E2) [32 >= C4 && I >= 1] (?,1) 33. f182(A,B,G,I,Q,S,V,W1,E2) -> f200(A,B,G,I,Q,S,V,W1,E2) [32 >= C4 && I >= 1] (?,1) 34. f182(A,B,G,I,Q,S,V,W1,E2) -> f200(A,B,G,I,Q,S,V,W1,E2) [C4 >= 33 && I >= 1] (?,1) 35. f182(A,B,G,I,Q,S,V,W1,E2) -> f200(A,B,G,I,Q,S,V,W1,E2) [C4 >= 33 && I >= 1] (?,1) 36. f222(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,1,I,Q,S,V,16,E2) [16 >= Q && G = 1] (?,1) 37. f222(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,G,I,Q,S,V,16,E2) [16 >= Q && 0 >= G] (?,1) 38. f222(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,G,I,Q,S,V,16,E2) [16 >= Q && G >= 2] (?,1) 39. f237(A,B,G,I,Q,S,V,W1,E2) -> f245(A,B,G,I,Q,S,V,W1,E2) [W1 >= 1] (?,1) 40. f237(A,B,G,I,Q,S,V,W1,E2) -> f245(A,B,G,I,Q,S,V,W1,E2) [W1 >= 1] (?,1) 41. f245(A,B,G,I,Q,S,V,W1,E2) -> f250(A,B,G,I,Q,S,V,W1,E2) True (?,1) 42. f245(A,B,G,I,Q,S,V,W1,E2) -> f250(A,B,G,I,Q,S,V,W1,E2) True (?,1) 43. f250(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,G,I,Q,S,V,-1 + W1,E2) True (?,1) 44. f250(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,G,I,Q,S,V,-1 + W1,E2) True (?,1) 45. f265(A,B,G,I,Q,S,V,W1,E2) -> f265(A,B,G,I,Q,S,V,1 + W1,E2) [4 >= W1] (?,1) 46. f276(A,B,G,I,Q,S,V,W1,E2) -> f276(A,B,G,I,Q,S,V,C4,-1 + E2) [E2 >= 1] (?,1) 47. f289(A,B,G,I,Q,S,V,W1,E2) -> f289(A,B,G,I,Q,S,V,-1 + W1,E2) [W1 >= 1] (?,1) 48. f289(A,B,G,I,Q,S,V,W1,E2) -> f289(A,B,G,I,Q,S,V,-1 + W1,E2) [W1 >= 1] (?,1) 49. f314(A,B,G,I,Q,S,V,W1,E2) -> f333(A,B,G,I,Q,S,V,W1,E2) [32 >= E4 && I >= 1] (?,1) 50. f314(A,B,G,I,Q,S,V,W1,E2) -> f333(A,B,G,I,Q,S,V,W1,E2) [32 >= E4 && I >= 1] (?,1) 51. f314(A,B,G,I,Q,S,V,W1,E2) -> f333(A,B,G,I,Q,S,V,W1,E2) [E4 >= 33 && I >= 1] (?,1) 52. f314(A,B,G,I,Q,S,V,W1,E2) -> f333(A,B,G,I,Q,S,V,W1,E2) [E4 >= 33 && I >= 1] (?,1) 53. f333(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= E4] (?,1) 54. f333(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= E4] (?,1) 55. f333(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,-1 + I,Q,S,V,W1,E2) [E4 >= 33] (?,1) 56. f333(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,-1 + I,Q,S,V,W1,E2) [E4 >= 33] (?,1) 57. f314(A,B,G,I,Q,S,V,W1,E2) -> f358(A,B,G,I,Q,S,V,W1,E2) [0 >= I] (1,1) 58. f289(A,B,G,I,Q,S,V,W1,E2) -> f222(A,B,G,I,1 + Q,S,V,W1,E2) [0 >= W1] (?,1) 59. f276(A,B,G,I,Q,S,V,W1,E2) -> f289(A,B,G,I,Q,S,V,32,E2) [0 >= E2] (?,1) 60. f265(A,B,G,I,Q,S,V,W1,E2) -> f276(A,B,G,I,Q,S,V,W1,8) [W1 >= 5] (?,1) 61. f237(A,B,G,I,Q,S,V,W1,E2) -> f265(A,B,G,I,Q,S,V,1,E2) [0 >= W1] (?,1) 62. f222(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,32,Q,S,V,W1,E2) [Q >= 17] (1,1) 63. f200(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= C4] (?,1) 64. f200(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= C4] (?,1) 65. f200(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,-1 + I,Q,S,V,W1,E2) [C4 >= 33] (?,1) 66. f200(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,-1 + I,Q,S,V,W1,E2) [C4 >= 33] (?,1) 67. f182(A,B,G,I,Q,S,V,W1,E2) -> f222(A,B,G,I,1,S,V,W1,E2) [0 >= I] (1,1) 68. f150(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,-1 + V,W1,E2) [28 >= E4] (?,1) 69. f150(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,-1 + V,W1,E2) [28 >= E4] (?,1) 70. f150(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,-1 + V,W1,E2) [E4 >= 29] (?,1) 71. f150(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,-1 + V,W1,E2) [E4 >= 29] (?,1) 72. f113(A,B,G,I,Q,S,V,W1,E2) -> f81(A,B,G,I,1 + Q,S,V,W1,E2) [0 >= V] (?,1) 73. f100(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,16,W1,E2) [S >= 3] (?,1) 74. f81(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,32,Q,S,V,W1,E2) [Q >= 17] (1,1) 75. f59(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= C4] (?,1) 76. f59(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= C4] (?,1) 77. f59(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,-1 + I,Q,S,V,W1,E2) [C4 >= 33] (?,1) 78. f59(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,-1 + I,Q,S,V,W1,E2) [C4 >= 33] (?,1) 79. f41(A,B,G,I,Q,S,V,W1,E2) -> f81(A,B,G,I,1,S,V,W1,E2) [0 >= I] (1,1) 80. f29(A,B,G,I,Q,S,V,W1,E2) -> f34(A,B,G,I,Q,S,V,W1,E2) [I >= 33] (1,1) Signature: {(f0,106) ;(f100,106) ;(f113,106) ;(f132,106) ;(f150,106) ;(f182,106) ;(f200,106) ;(f222,106) ;(f237,106) ;(f245,106) ;(f250,106) ;(f265,106) ;(f276,106) ;(f289,106) ;(f29,106) ;(f314,106) ;(f333,106) ;(f34,106) ;(f358,106) ;(f41,106) ;(f59,106) ;(f81,106) ;(f90,106) ;(f93,106) ;(f96,106)} Flow Graph: [0->{2},1->{2,3,21},2->{16},3->{16,17,22},4->{8,9,31},5->{7},6->{7},7->{7,80},8->{10,11,12,13},9->{10,11 ,12,13},10->{75,76,77,78},11->{75,76,77,78},12->{75,76,77,78},13->{75,76,77,78},14->{0},15->{1,20},16->{18} ,17->{18},18->{18,73},19->{23,24,25,26},20->{23,24,25,26},21->{23,24,25,26},22->{23,24,25,26},23->{27,28,29 ,30},24->{27,28,29,30},25->{27,28,29,30},26->{27,28,29,30},27->{68,69,70,71},28->{68,69,70,71},29->{68,69,70 ,71},30->{68,69,70,71},31->{32,33,34,35},32->{63,64,65,66},33->{63,64,65,66},34->{63,64,65,66},35->{63,64,65 ,66},36->{39,40},37->{39,40},38->{39,40},39->{41,42},40->{41,42},41->{43,44},42->{43,44},43->{39,40,61} ,44->{39,40,61},45->{45,60},46->{46,59},47->{47,48,58},48->{47,48,58},49->{53,54,55,56},50->{53,54,55,56} ,51->{53,54,55,56},52->{53,54,55,56},53->{49,50,51,52,57},54->{49,50,51,52,57},55->{49,50,51,52,57},56->{49 ,50,51,52,57},57->{},58->{36,37,38,62},59->{47,48},60->{46},61->{45},62->{49,50,51,52},63->{32,33,34,35,67} ,64->{32,33,34,35,67},65->{32,33,34,35,67},66->{32,33,34,35,67},67->{36,37,38},68->{23,24,25,26,72},69->{23 ,24,25,26,72},70->{23,24,25,26,72},71->{23,24,25,26,72},72->{14,15,19,74},73->{23,24,25,26},74->{32,33,34 ,35},75->{10,11,12,13,79},76->{10,11,12,13,79},77->{10,11,12,13,79},78->{10,11,12,13,79},79->{19},80->{8,9 ,31}] + Applied Processor: AddSinks + Details: () * Step 5: UnsatPaths WORST_CASE(?,POLY) + Considered Problem: Rules: 0. f90(A,B,G,I,Q,S,V,W1,E2) -> f93(A,B,G,I,Q,S,V,W1,E2) [1 >= A] (?,1) 1. f90(A,B,G,I,Q,S,V,W1,E2) -> f93(A,B,G,I,Q,S,V,W1,E2) [A >= 3] (?,1) 2. f93(A,B,G,I,Q,S,V,W1,E2) -> f96(A,B,G,I,Q,S,V,W1,E2) [8 >= A] (?,1) 3. f93(A,B,G,I,Q,S,V,W1,E2) -> f96(A,B,G,I,Q,S,V,W1,E2) [A >= 10] (?,1) 4. f0(A,B,G,I,Q,S,V,W1,E2) -> f34(A,0,D4,I,Q,S,V,W1,E2) [B = 0] (1,1) 5. f0(A,B,G,I,Q,S,V,W1,E2) -> f29(A,0,D4,2,Q,S,V,W1,E2) [0 >= 1 + B] (1,1) 6. f0(A,B,G,I,Q,S,V,W1,E2) -> f29(A,0,D4,2,Q,S,V,W1,E2) [B >= 1] (1,1) 7. f29(A,B,G,I,Q,S,V,W1,E2) -> f29(A,B,G,1 + I,Q,S,V,W1,E2) [32 >= I] (?,1) 8. f34(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,28,Q,S,V,W1,E2) [0 >= 1 + C4] (?,1) 9. f34(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,28,Q,S,V,W1,E2) True (?,1) 10. f41(A,B,G,I,Q,S,V,W1,E2) -> f59(A,B,G,I,Q,S,V,W1,E2) [32 >= C4 && I >= 1] (?,1) 11. f41(A,B,G,I,Q,S,V,W1,E2) -> f59(A,B,G,I,Q,S,V,W1,E2) [32 >= C4 && I >= 1] (?,1) 12. f41(A,B,G,I,Q,S,V,W1,E2) -> f59(A,B,G,I,Q,S,V,W1,E2) [C4 >= 33 && I >= 1] (?,1) 13. f41(A,B,G,I,Q,S,V,W1,E2) -> f59(A,B,G,I,Q,S,V,W1,E2) [C4 >= 33 && I >= 1] (?,1) 14. f81(A,B,G,I,Q,S,V,W1,E2) -> f90(Q,B,G,I,Q,S,V,W1,E2) [0 >= Q && 16 >= Q] (?,1) 15. f81(A,B,G,I,Q,S,V,W1,E2) -> f90(Q,B,G,I,Q,S,V,W1,E2) [16 >= Q && Q >= 2] (?,1) 16. f96(A,B,G,I,Q,S,V,W1,E2) -> f100(A,B,G,I,Q,1,V,W1,E2) [15 >= A] (?,1) 17. f96(A,B,G,I,Q,S,V,W1,E2) -> f100(A,B,G,I,Q,1,V,W1,E2) [A >= 17] (?,1) 18. f100(A,B,G,I,Q,S,V,W1,E2) -> f100(A,B,G,I,Q,1 + S,V,W1,E2) [2 >= S] (?,1) 19. f81(A,B,G,I,Q,S,V,W1,E2) -> f113(1,B,G,I,1,S,16,W1,E2) [Q = 1] (?,1) 20. f90(A,B,G,I,Q,S,V,W1,E2) -> f113(2,B,G,I,Q,S,16,W1,E2) [A = 2] (?,1) 21. f93(A,B,G,I,Q,S,V,W1,E2) -> f113(9,B,G,I,Q,S,16,W1,E2) [A = 9] (?,1) 22. f96(A,B,G,I,Q,S,V,W1,E2) -> f113(16,B,G,I,Q,S,16,W1,E2) [A = 16] (?,1) 23. f113(A,B,G,I,Q,S,V,W1,E2) -> f132(A,B,G,I,Q,S,V,W1,E2) [28 >= E4 && V >= 1] (?,1) 24. f113(A,B,G,I,Q,S,V,W1,E2) -> f132(A,B,G,I,Q,S,V,W1,E2) [28 >= E4 && V >= 1] (?,1) 25. f113(A,B,G,I,Q,S,V,W1,E2) -> f132(A,B,G,I,Q,S,V,W1,E2) [E4 >= 29 && V >= 1] (?,1) 26. f113(A,B,G,I,Q,S,V,W1,E2) -> f132(A,B,G,I,Q,S,V,W1,E2) [E4 >= 29 && V >= 1] (?,1) 27. f132(A,B,G,I,Q,S,V,W1,E2) -> f150(A,B,G,I,Q,S,V,W1,E2) [28 >= E4] (?,1) 28. f132(A,B,G,I,Q,S,V,W1,E2) -> f150(A,B,G,I,Q,S,V,W1,E2) [28 >= E4] (?,1) 29. f132(A,B,G,I,Q,S,V,W1,E2) -> f150(A,B,G,I,Q,S,V,W1,E2) [E4 >= 29] (?,1) 30. f132(A,B,G,I,Q,S,V,W1,E2) -> f150(A,B,G,I,Q,S,V,W1,E2) [E4 >= 29] (?,1) 31. f34(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,32,Q,S,V,W1,E2) True (?,1) 32. f182(A,B,G,I,Q,S,V,W1,E2) -> f200(A,B,G,I,Q,S,V,W1,E2) [32 >= C4 && I >= 1] (?,1) 33. f182(A,B,G,I,Q,S,V,W1,E2) -> f200(A,B,G,I,Q,S,V,W1,E2) [32 >= C4 && I >= 1] (?,1) 34. f182(A,B,G,I,Q,S,V,W1,E2) -> f200(A,B,G,I,Q,S,V,W1,E2) [C4 >= 33 && I >= 1] (?,1) 35. f182(A,B,G,I,Q,S,V,W1,E2) -> f200(A,B,G,I,Q,S,V,W1,E2) [C4 >= 33 && I >= 1] (?,1) 36. f222(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,1,I,Q,S,V,16,E2) [16 >= Q && G = 1] (?,1) 37. f222(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,G,I,Q,S,V,16,E2) [16 >= Q && 0 >= G] (?,1) 38. f222(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,G,I,Q,S,V,16,E2) [16 >= Q && G >= 2] (?,1) 39. f237(A,B,G,I,Q,S,V,W1,E2) -> f245(A,B,G,I,Q,S,V,W1,E2) [W1 >= 1] (?,1) 40. f237(A,B,G,I,Q,S,V,W1,E2) -> f245(A,B,G,I,Q,S,V,W1,E2) [W1 >= 1] (?,1) 41. f245(A,B,G,I,Q,S,V,W1,E2) -> f250(A,B,G,I,Q,S,V,W1,E2) True (?,1) 42. f245(A,B,G,I,Q,S,V,W1,E2) -> f250(A,B,G,I,Q,S,V,W1,E2) True (?,1) 43. f250(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,G,I,Q,S,V,-1 + W1,E2) True (?,1) 44. f250(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,G,I,Q,S,V,-1 + W1,E2) True (?,1) 45. f265(A,B,G,I,Q,S,V,W1,E2) -> f265(A,B,G,I,Q,S,V,1 + W1,E2) [4 >= W1] (?,1) 46. f276(A,B,G,I,Q,S,V,W1,E2) -> f276(A,B,G,I,Q,S,V,C4,-1 + E2) [E2 >= 1] (?,1) 47. f289(A,B,G,I,Q,S,V,W1,E2) -> f289(A,B,G,I,Q,S,V,-1 + W1,E2) [W1 >= 1] (?,1) 48. f289(A,B,G,I,Q,S,V,W1,E2) -> f289(A,B,G,I,Q,S,V,-1 + W1,E2) [W1 >= 1] (?,1) 49. f314(A,B,G,I,Q,S,V,W1,E2) -> f333(A,B,G,I,Q,S,V,W1,E2) [32 >= E4 && I >= 1] (?,1) 50. f314(A,B,G,I,Q,S,V,W1,E2) -> f333(A,B,G,I,Q,S,V,W1,E2) [32 >= E4 && I >= 1] (?,1) 51. f314(A,B,G,I,Q,S,V,W1,E2) -> f333(A,B,G,I,Q,S,V,W1,E2) [E4 >= 33 && I >= 1] (?,1) 52. f314(A,B,G,I,Q,S,V,W1,E2) -> f333(A,B,G,I,Q,S,V,W1,E2) [E4 >= 33 && I >= 1] (?,1) 53. f333(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= E4] (?,1) 54. f333(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= E4] (?,1) 55. f333(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,-1 + I,Q,S,V,W1,E2) [E4 >= 33] (?,1) 56. f333(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,-1 + I,Q,S,V,W1,E2) [E4 >= 33] (?,1) 57. f314(A,B,G,I,Q,S,V,W1,E2) -> f358(A,B,G,I,Q,S,V,W1,E2) [0 >= I] (?,1) 58. f289(A,B,G,I,Q,S,V,W1,E2) -> f222(A,B,G,I,1 + Q,S,V,W1,E2) [0 >= W1] (?,1) 59. f276(A,B,G,I,Q,S,V,W1,E2) -> f289(A,B,G,I,Q,S,V,32,E2) [0 >= E2] (?,1) 60. f265(A,B,G,I,Q,S,V,W1,E2) -> f276(A,B,G,I,Q,S,V,W1,8) [W1 >= 5] (?,1) 61. f237(A,B,G,I,Q,S,V,W1,E2) -> f265(A,B,G,I,Q,S,V,1,E2) [0 >= W1] (?,1) 62. f222(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,32,Q,S,V,W1,E2) [Q >= 17] (?,1) 63. f200(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= C4] (?,1) 64. f200(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= C4] (?,1) 65. f200(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,-1 + I,Q,S,V,W1,E2) [C4 >= 33] (?,1) 66. f200(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,-1 + I,Q,S,V,W1,E2) [C4 >= 33] (?,1) 67. f182(A,B,G,I,Q,S,V,W1,E2) -> f222(A,B,G,I,1,S,V,W1,E2) [0 >= I] (?,1) 68. f150(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,-1 + V,W1,E2) [28 >= E4] (?,1) 69. f150(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,-1 + V,W1,E2) [28 >= E4] (?,1) 70. f150(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,-1 + V,W1,E2) [E4 >= 29] (?,1) 71. f150(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,-1 + V,W1,E2) [E4 >= 29] (?,1) 72. f113(A,B,G,I,Q,S,V,W1,E2) -> f81(A,B,G,I,1 + Q,S,V,W1,E2) [0 >= V] (?,1) 73. f100(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,16,W1,E2) [S >= 3] (?,1) 74. f81(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,32,Q,S,V,W1,E2) [Q >= 17] (?,1) 75. f59(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= C4] (?,1) 76. f59(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= C4] (?,1) 77. f59(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,-1 + I,Q,S,V,W1,E2) [C4 >= 33] (?,1) 78. f59(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,-1 + I,Q,S,V,W1,E2) [C4 >= 33] (?,1) 79. f41(A,B,G,I,Q,S,V,W1,E2) -> f81(A,B,G,I,1,S,V,W1,E2) [0 >= I] (?,1) 80. f29(A,B,G,I,Q,S,V,W1,E2) -> f34(A,B,G,I,Q,S,V,W1,E2) [I >= 33] (?,1) 81. f314(A,B,G,I,Q,S,V,W1,E2) -> exitus616(A,B,G,I,Q,S,V,W1,E2) True (?,1) Signature: {(exitus616,9) ;(f0,106) ;(f100,106) ;(f113,106) ;(f132,106) ;(f150,106) ;(f182,106) ;(f200,106) ;(f222,106) ;(f237,106) ;(f245,106) ;(f250,106) ;(f265,106) ;(f276,106) ;(f289,106) ;(f29,106) ;(f314,106) ;(f333,106) ;(f34,106) ;(f358,106) ;(f41,106) ;(f59,106) ;(f81,106) ;(f90,106) ;(f93,106) ;(f96,106)} Flow Graph: [0->{2,3,21},1->{2,3,21},2->{16,17,22},3->{16,17,22},4->{8,9,31},5->{7,80},6->{7,80},7->{7,80},8->{10,11 ,12,13,79},9->{10,11,12,13,79},10->{75,76,77,78},11->{75,76,77,78},12->{75,76,77,78},13->{75,76,77,78} ,14->{0,1,20},15->{0,1,20},16->{18,73},17->{18,73},18->{18,73},19->{23,24,25,26,72},20->{23,24,25,26,72} ,21->{23,24,25,26,72},22->{23,24,25,26,72},23->{27,28,29,30},24->{27,28,29,30},25->{27,28,29,30},26->{27,28 ,29,30},27->{68,69,70,71},28->{68,69,70,71},29->{68,69,70,71},30->{68,69,70,71},31->{32,33,34,35,67},32->{63 ,64,65,66},33->{63,64,65,66},34->{63,64,65,66},35->{63,64,65,66},36->{39,40,61},37->{39,40,61},38->{39,40 ,61},39->{41,42},40->{41,42},41->{43,44},42->{43,44},43->{39,40,61},44->{39,40,61},45->{45,60},46->{46,59} ,47->{47,48,58},48->{47,48,58},49->{53,54,55,56},50->{53,54,55,56},51->{53,54,55,56},52->{53,54,55,56} ,53->{49,50,51,52,57,81},54->{49,50,51,52,57,81},55->{49,50,51,52,57,81},56->{49,50,51,52,57,81},57->{} ,58->{36,37,38,62},59->{47,48,58},60->{46,59},61->{45,60},62->{49,50,51,52,57,81},63->{32,33,34,35,67} ,64->{32,33,34,35,67},65->{32,33,34,35,67},66->{32,33,34,35,67},67->{36,37,38,62},68->{23,24,25,26,72} ,69->{23,24,25,26,72},70->{23,24,25,26,72},71->{23,24,25,26,72},72->{14,15,19,74},73->{23,24,25,26,72} ,74->{32,33,34,35,67},75->{10,11,12,13,79},76->{10,11,12,13,79},77->{10,11,12,13,79},78->{10,11,12,13,79} ,79->{14,15,19,74},80->{8,9,31},81->{}] + Applied Processor: UnsatPaths + Details: We remove following edges from the transition graph: [(0,3) ,(0,21) ,(2,17) ,(2,22) ,(5,80) ,(6,80) ,(8,79) ,(9,79) ,(14,1) ,(14,20) ,(15,0) ,(16,73) ,(17,73) ,(19,72) ,(20,72) ,(21,72) ,(22,72) ,(31,67) ,(36,61) ,(37,61) ,(38,61) ,(59,58) ,(60,59) ,(61,60) ,(62,57) ,(67,62) ,(73,72) ,(74,67) ,(79,14) ,(79,15) ,(79,74)] * Step 6: LooptreeTransformer WORST_CASE(?,POLY) + Considered Problem: Rules: 0. f90(A,B,G,I,Q,S,V,W1,E2) -> f93(A,B,G,I,Q,S,V,W1,E2) [1 >= A] (?,1) 1. f90(A,B,G,I,Q,S,V,W1,E2) -> f93(A,B,G,I,Q,S,V,W1,E2) [A >= 3] (?,1) 2. f93(A,B,G,I,Q,S,V,W1,E2) -> f96(A,B,G,I,Q,S,V,W1,E2) [8 >= A] (?,1) 3. f93(A,B,G,I,Q,S,V,W1,E2) -> f96(A,B,G,I,Q,S,V,W1,E2) [A >= 10] (?,1) 4. f0(A,B,G,I,Q,S,V,W1,E2) -> f34(A,0,D4,I,Q,S,V,W1,E2) [B = 0] (1,1) 5. f0(A,B,G,I,Q,S,V,W1,E2) -> f29(A,0,D4,2,Q,S,V,W1,E2) [0 >= 1 + B] (1,1) 6. f0(A,B,G,I,Q,S,V,W1,E2) -> f29(A,0,D4,2,Q,S,V,W1,E2) [B >= 1] (1,1) 7. f29(A,B,G,I,Q,S,V,W1,E2) -> f29(A,B,G,1 + I,Q,S,V,W1,E2) [32 >= I] (?,1) 8. f34(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,28,Q,S,V,W1,E2) [0 >= 1 + C4] (?,1) 9. f34(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,28,Q,S,V,W1,E2) True (?,1) 10. f41(A,B,G,I,Q,S,V,W1,E2) -> f59(A,B,G,I,Q,S,V,W1,E2) [32 >= C4 && I >= 1] (?,1) 11. f41(A,B,G,I,Q,S,V,W1,E2) -> f59(A,B,G,I,Q,S,V,W1,E2) [32 >= C4 && I >= 1] (?,1) 12. f41(A,B,G,I,Q,S,V,W1,E2) -> f59(A,B,G,I,Q,S,V,W1,E2) [C4 >= 33 && I >= 1] (?,1) 13. f41(A,B,G,I,Q,S,V,W1,E2) -> f59(A,B,G,I,Q,S,V,W1,E2) [C4 >= 33 && I >= 1] (?,1) 14. f81(A,B,G,I,Q,S,V,W1,E2) -> f90(Q,B,G,I,Q,S,V,W1,E2) [0 >= Q && 16 >= Q] (?,1) 15. f81(A,B,G,I,Q,S,V,W1,E2) -> f90(Q,B,G,I,Q,S,V,W1,E2) [16 >= Q && Q >= 2] (?,1) 16. f96(A,B,G,I,Q,S,V,W1,E2) -> f100(A,B,G,I,Q,1,V,W1,E2) [15 >= A] (?,1) 17. f96(A,B,G,I,Q,S,V,W1,E2) -> f100(A,B,G,I,Q,1,V,W1,E2) [A >= 17] (?,1) 18. f100(A,B,G,I,Q,S,V,W1,E2) -> f100(A,B,G,I,Q,1 + S,V,W1,E2) [2 >= S] (?,1) 19. f81(A,B,G,I,Q,S,V,W1,E2) -> f113(1,B,G,I,1,S,16,W1,E2) [Q = 1] (?,1) 20. f90(A,B,G,I,Q,S,V,W1,E2) -> f113(2,B,G,I,Q,S,16,W1,E2) [A = 2] (?,1) 21. f93(A,B,G,I,Q,S,V,W1,E2) -> f113(9,B,G,I,Q,S,16,W1,E2) [A = 9] (?,1) 22. f96(A,B,G,I,Q,S,V,W1,E2) -> f113(16,B,G,I,Q,S,16,W1,E2) [A = 16] (?,1) 23. f113(A,B,G,I,Q,S,V,W1,E2) -> f132(A,B,G,I,Q,S,V,W1,E2) [28 >= E4 && V >= 1] (?,1) 24. f113(A,B,G,I,Q,S,V,W1,E2) -> f132(A,B,G,I,Q,S,V,W1,E2) [28 >= E4 && V >= 1] (?,1) 25. f113(A,B,G,I,Q,S,V,W1,E2) -> f132(A,B,G,I,Q,S,V,W1,E2) [E4 >= 29 && V >= 1] (?,1) 26. f113(A,B,G,I,Q,S,V,W1,E2) -> f132(A,B,G,I,Q,S,V,W1,E2) [E4 >= 29 && V >= 1] (?,1) 27. f132(A,B,G,I,Q,S,V,W1,E2) -> f150(A,B,G,I,Q,S,V,W1,E2) [28 >= E4] (?,1) 28. f132(A,B,G,I,Q,S,V,W1,E2) -> f150(A,B,G,I,Q,S,V,W1,E2) [28 >= E4] (?,1) 29. f132(A,B,G,I,Q,S,V,W1,E2) -> f150(A,B,G,I,Q,S,V,W1,E2) [E4 >= 29] (?,1) 30. f132(A,B,G,I,Q,S,V,W1,E2) -> f150(A,B,G,I,Q,S,V,W1,E2) [E4 >= 29] (?,1) 31. f34(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,32,Q,S,V,W1,E2) True (?,1) 32. f182(A,B,G,I,Q,S,V,W1,E2) -> f200(A,B,G,I,Q,S,V,W1,E2) [32 >= C4 && I >= 1] (?,1) 33. f182(A,B,G,I,Q,S,V,W1,E2) -> f200(A,B,G,I,Q,S,V,W1,E2) [32 >= C4 && I >= 1] (?,1) 34. f182(A,B,G,I,Q,S,V,W1,E2) -> f200(A,B,G,I,Q,S,V,W1,E2) [C4 >= 33 && I >= 1] (?,1) 35. f182(A,B,G,I,Q,S,V,W1,E2) -> f200(A,B,G,I,Q,S,V,W1,E2) [C4 >= 33 && I >= 1] (?,1) 36. f222(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,1,I,Q,S,V,16,E2) [16 >= Q && G = 1] (?,1) 37. f222(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,G,I,Q,S,V,16,E2) [16 >= Q && 0 >= G] (?,1) 38. f222(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,G,I,Q,S,V,16,E2) [16 >= Q && G >= 2] (?,1) 39. f237(A,B,G,I,Q,S,V,W1,E2) -> f245(A,B,G,I,Q,S,V,W1,E2) [W1 >= 1] (?,1) 40. f237(A,B,G,I,Q,S,V,W1,E2) -> f245(A,B,G,I,Q,S,V,W1,E2) [W1 >= 1] (?,1) 41. f245(A,B,G,I,Q,S,V,W1,E2) -> f250(A,B,G,I,Q,S,V,W1,E2) True (?,1) 42. f245(A,B,G,I,Q,S,V,W1,E2) -> f250(A,B,G,I,Q,S,V,W1,E2) True (?,1) 43. f250(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,G,I,Q,S,V,-1 + W1,E2) True (?,1) 44. f250(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,G,I,Q,S,V,-1 + W1,E2) True (?,1) 45. f265(A,B,G,I,Q,S,V,W1,E2) -> f265(A,B,G,I,Q,S,V,1 + W1,E2) [4 >= W1] (?,1) 46. f276(A,B,G,I,Q,S,V,W1,E2) -> f276(A,B,G,I,Q,S,V,C4,-1 + E2) [E2 >= 1] (?,1) 47. f289(A,B,G,I,Q,S,V,W1,E2) -> f289(A,B,G,I,Q,S,V,-1 + W1,E2) [W1 >= 1] (?,1) 48. f289(A,B,G,I,Q,S,V,W1,E2) -> f289(A,B,G,I,Q,S,V,-1 + W1,E2) [W1 >= 1] (?,1) 49. f314(A,B,G,I,Q,S,V,W1,E2) -> f333(A,B,G,I,Q,S,V,W1,E2) [32 >= E4 && I >= 1] (?,1) 50. f314(A,B,G,I,Q,S,V,W1,E2) -> f333(A,B,G,I,Q,S,V,W1,E2) [32 >= E4 && I >= 1] (?,1) 51. f314(A,B,G,I,Q,S,V,W1,E2) -> f333(A,B,G,I,Q,S,V,W1,E2) [E4 >= 33 && I >= 1] (?,1) 52. f314(A,B,G,I,Q,S,V,W1,E2) -> f333(A,B,G,I,Q,S,V,W1,E2) [E4 >= 33 && I >= 1] (?,1) 53. f333(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= E4] (?,1) 54. f333(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= E4] (?,1) 55. f333(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,-1 + I,Q,S,V,W1,E2) [E4 >= 33] (?,1) 56. f333(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,-1 + I,Q,S,V,W1,E2) [E4 >= 33] (?,1) 57. f314(A,B,G,I,Q,S,V,W1,E2) -> f358(A,B,G,I,Q,S,V,W1,E2) [0 >= I] (?,1) 58. f289(A,B,G,I,Q,S,V,W1,E2) -> f222(A,B,G,I,1 + Q,S,V,W1,E2) [0 >= W1] (?,1) 59. f276(A,B,G,I,Q,S,V,W1,E2) -> f289(A,B,G,I,Q,S,V,32,E2) [0 >= E2] (?,1) 60. f265(A,B,G,I,Q,S,V,W1,E2) -> f276(A,B,G,I,Q,S,V,W1,8) [W1 >= 5] (?,1) 61. f237(A,B,G,I,Q,S,V,W1,E2) -> f265(A,B,G,I,Q,S,V,1,E2) [0 >= W1] (?,1) 62. f222(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,32,Q,S,V,W1,E2) [Q >= 17] (?,1) 63. f200(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= C4] (?,1) 64. f200(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= C4] (?,1) 65. f200(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,-1 + I,Q,S,V,W1,E2) [C4 >= 33] (?,1) 66. f200(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,-1 + I,Q,S,V,W1,E2) [C4 >= 33] (?,1) 67. f182(A,B,G,I,Q,S,V,W1,E2) -> f222(A,B,G,I,1,S,V,W1,E2) [0 >= I] (?,1) 68. f150(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,-1 + V,W1,E2) [28 >= E4] (?,1) 69. f150(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,-1 + V,W1,E2) [28 >= E4] (?,1) 70. f150(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,-1 + V,W1,E2) [E4 >= 29] (?,1) 71. f150(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,-1 + V,W1,E2) [E4 >= 29] (?,1) 72. f113(A,B,G,I,Q,S,V,W1,E2) -> f81(A,B,G,I,1 + Q,S,V,W1,E2) [0 >= V] (?,1) 73. f100(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,16,W1,E2) [S >= 3] (?,1) 74. f81(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,32,Q,S,V,W1,E2) [Q >= 17] (?,1) 75. f59(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= C4] (?,1) 76. f59(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= C4] (?,1) 77. f59(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,-1 + I,Q,S,V,W1,E2) [C4 >= 33] (?,1) 78. f59(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,-1 + I,Q,S,V,W1,E2) [C4 >= 33] (?,1) 79. f41(A,B,G,I,Q,S,V,W1,E2) -> f81(A,B,G,I,1,S,V,W1,E2) [0 >= I] (?,1) 80. f29(A,B,G,I,Q,S,V,W1,E2) -> f34(A,B,G,I,Q,S,V,W1,E2) [I >= 33] (?,1) 81. f314(A,B,G,I,Q,S,V,W1,E2) -> exitus616(A,B,G,I,Q,S,V,W1,E2) True (?,1) Signature: {(exitus616,9) ;(f0,106) ;(f100,106) ;(f113,106) ;(f132,106) ;(f150,106) ;(f182,106) ;(f200,106) ;(f222,106) ;(f237,106) ;(f245,106) ;(f250,106) ;(f265,106) ;(f276,106) ;(f289,106) ;(f29,106) ;(f314,106) ;(f333,106) ;(f34,106) ;(f358,106) ;(f41,106) ;(f59,106) ;(f81,106) ;(f90,106) ;(f93,106) ;(f96,106)} Flow Graph: [0->{2},1->{2,3,21},2->{16},3->{16,17,22},4->{8,9,31},5->{7},6->{7},7->{7,80},8->{10,11,12,13},9->{10,11 ,12,13},10->{75,76,77,78},11->{75,76,77,78},12->{75,76,77,78},13->{75,76,77,78},14->{0},15->{1,20},16->{18} ,17->{18},18->{18,73},19->{23,24,25,26},20->{23,24,25,26},21->{23,24,25,26},22->{23,24,25,26},23->{27,28,29 ,30},24->{27,28,29,30},25->{27,28,29,30},26->{27,28,29,30},27->{68,69,70,71},28->{68,69,70,71},29->{68,69,70 ,71},30->{68,69,70,71},31->{32,33,34,35},32->{63,64,65,66},33->{63,64,65,66},34->{63,64,65,66},35->{63,64,65 ,66},36->{39,40},37->{39,40},38->{39,40},39->{41,42},40->{41,42},41->{43,44},42->{43,44},43->{39,40,61} ,44->{39,40,61},45->{45,60},46->{46,59},47->{47,48,58},48->{47,48,58},49->{53,54,55,56},50->{53,54,55,56} ,51->{53,54,55,56},52->{53,54,55,56},53->{49,50,51,52,57,81},54->{49,50,51,52,57,81},55->{49,50,51,52,57,81} ,56->{49,50,51,52,57,81},57->{},58->{36,37,38,62},59->{47,48},60->{46},61->{45},62->{49,50,51,52,81},63->{32 ,33,34,35,67},64->{32,33,34,35,67},65->{32,33,34,35,67},66->{32,33,34,35,67},67->{36,37,38},68->{23,24,25,26 ,72},69->{23,24,25,26,72},70->{23,24,25,26,72},71->{23,24,25,26,72},72->{14,15,19,74},73->{23,24,25,26} ,74->{32,33,34,35},75->{10,11,12,13,79},76->{10,11,12,13,79},77->{10,11,12,13,79},78->{10,11,12,13,79} ,79->{19},80->{8,9,31},81->{}] + Applied Processor: LooptreeTransformer + 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] | +- p:[7] c: [7] | +- p:[10,75,11,76,12,77,13,78] c: [11,12,13] | | | `- p:[10,75,76,77,78] c: [10] | +- p:[0,14,72,68,27,23,19,20,15,21,1,22,3,69,28,24,70,29,25,71,30,26,73,18,16,2,17] c: [19] | | | `- p:[0,14,72,68,27,23,20,15,21,1,22,3,69,28,24,70,29,25,71,30,26,73,18,16,2,17] c: [14,15] | | | +- p:[18] c: [18] | | | `- p:[23,68,27,24,69,28,25,70,29,26,71,30] c: [24] | | | `- p:[23,68,27,25,69,28,26,70,29,30,71] c: [25] | | | `- p:[23,68,27,26,69,28,29,30,70,71] c: [26] | | | `- p:[23,68,27,28,29,30,69,70,71] c: [23] | +- p:[32,63,33,64,34,65,35,66] c: [33,34,35] | | | `- p:[32,63,64,65,66] c: [32] | +- p:[36,58,47,48,59,46,60,45,61,43,41,39,37,38,44,42,40] c: [37] | | | `- p:[36,58,47,48,59,46,60,45,61,43,41,39,38,44,42,40] c: [38] | | | `- p:[36,58,47,48,59,46,60,45,61,43,41,39,44,42,40] c: [36] | | | +- p:[39,43,41,40,44,42] c: [40] | | | | | `- p:[39,43,41,42,44] c: [39] | | | +- p:[45] c: [45] | | | +- p:[46] c: [46] | | | `- p:[47,48] c: [48] | | | `- p:[47] c: [47] | `- p:[49,53,50,54,51,55,52,56] c: [50,51,52] | `- p:[49,53,54,55,56] c: [49] * Step 7: SizeAbstraction WORST_CASE(?,POLY) + Considered Problem: (Rules: 0. f90(A,B,G,I,Q,S,V,W1,E2) -> f93(A,B,G,I,Q,S,V,W1,E2) [1 >= A] (?,1) 1. f90(A,B,G,I,Q,S,V,W1,E2) -> f93(A,B,G,I,Q,S,V,W1,E2) [A >= 3] (?,1) 2. f93(A,B,G,I,Q,S,V,W1,E2) -> f96(A,B,G,I,Q,S,V,W1,E2) [8 >= A] (?,1) 3. f93(A,B,G,I,Q,S,V,W1,E2) -> f96(A,B,G,I,Q,S,V,W1,E2) [A >= 10] (?,1) 4. f0(A,B,G,I,Q,S,V,W1,E2) -> f34(A,0,D4,I,Q,S,V,W1,E2) [B = 0] (1,1) 5. f0(A,B,G,I,Q,S,V,W1,E2) -> f29(A,0,D4,2,Q,S,V,W1,E2) [0 >= 1 + B] (1,1) 6. f0(A,B,G,I,Q,S,V,W1,E2) -> f29(A,0,D4,2,Q,S,V,W1,E2) [B >= 1] (1,1) 7. f29(A,B,G,I,Q,S,V,W1,E2) -> f29(A,B,G,1 + I,Q,S,V,W1,E2) [32 >= I] (?,1) 8. f34(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,28,Q,S,V,W1,E2) [0 >= 1 + C4] (?,1) 9. f34(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,28,Q,S,V,W1,E2) True (?,1) 10. f41(A,B,G,I,Q,S,V,W1,E2) -> f59(A,B,G,I,Q,S,V,W1,E2) [32 >= C4 && I >= 1] (?,1) 11. f41(A,B,G,I,Q,S,V,W1,E2) -> f59(A,B,G,I,Q,S,V,W1,E2) [32 >= C4 && I >= 1] (?,1) 12. f41(A,B,G,I,Q,S,V,W1,E2) -> f59(A,B,G,I,Q,S,V,W1,E2) [C4 >= 33 && I >= 1] (?,1) 13. f41(A,B,G,I,Q,S,V,W1,E2) -> f59(A,B,G,I,Q,S,V,W1,E2) [C4 >= 33 && I >= 1] (?,1) 14. f81(A,B,G,I,Q,S,V,W1,E2) -> f90(Q,B,G,I,Q,S,V,W1,E2) [0 >= Q && 16 >= Q] (?,1) 15. f81(A,B,G,I,Q,S,V,W1,E2) -> f90(Q,B,G,I,Q,S,V,W1,E2) [16 >= Q && Q >= 2] (?,1) 16. f96(A,B,G,I,Q,S,V,W1,E2) -> f100(A,B,G,I,Q,1,V,W1,E2) [15 >= A] (?,1) 17. f96(A,B,G,I,Q,S,V,W1,E2) -> f100(A,B,G,I,Q,1,V,W1,E2) [A >= 17] (?,1) 18. f100(A,B,G,I,Q,S,V,W1,E2) -> f100(A,B,G,I,Q,1 + S,V,W1,E2) [2 >= S] (?,1) 19. f81(A,B,G,I,Q,S,V,W1,E2) -> f113(1,B,G,I,1,S,16,W1,E2) [Q = 1] (?,1) 20. f90(A,B,G,I,Q,S,V,W1,E2) -> f113(2,B,G,I,Q,S,16,W1,E2) [A = 2] (?,1) 21. f93(A,B,G,I,Q,S,V,W1,E2) -> f113(9,B,G,I,Q,S,16,W1,E2) [A = 9] (?,1) 22. f96(A,B,G,I,Q,S,V,W1,E2) -> f113(16,B,G,I,Q,S,16,W1,E2) [A = 16] (?,1) 23. f113(A,B,G,I,Q,S,V,W1,E2) -> f132(A,B,G,I,Q,S,V,W1,E2) [28 >= E4 && V >= 1] (?,1) 24. f113(A,B,G,I,Q,S,V,W1,E2) -> f132(A,B,G,I,Q,S,V,W1,E2) [28 >= E4 && V >= 1] (?,1) 25. f113(A,B,G,I,Q,S,V,W1,E2) -> f132(A,B,G,I,Q,S,V,W1,E2) [E4 >= 29 && V >= 1] (?,1) 26. f113(A,B,G,I,Q,S,V,W1,E2) -> f132(A,B,G,I,Q,S,V,W1,E2) [E4 >= 29 && V >= 1] (?,1) 27. f132(A,B,G,I,Q,S,V,W1,E2) -> f150(A,B,G,I,Q,S,V,W1,E2) [28 >= E4] (?,1) 28. f132(A,B,G,I,Q,S,V,W1,E2) -> f150(A,B,G,I,Q,S,V,W1,E2) [28 >= E4] (?,1) 29. f132(A,B,G,I,Q,S,V,W1,E2) -> f150(A,B,G,I,Q,S,V,W1,E2) [E4 >= 29] (?,1) 30. f132(A,B,G,I,Q,S,V,W1,E2) -> f150(A,B,G,I,Q,S,V,W1,E2) [E4 >= 29] (?,1) 31. f34(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,32,Q,S,V,W1,E2) True (?,1) 32. f182(A,B,G,I,Q,S,V,W1,E2) -> f200(A,B,G,I,Q,S,V,W1,E2) [32 >= C4 && I >= 1] (?,1) 33. f182(A,B,G,I,Q,S,V,W1,E2) -> f200(A,B,G,I,Q,S,V,W1,E2) [32 >= C4 && I >= 1] (?,1) 34. f182(A,B,G,I,Q,S,V,W1,E2) -> f200(A,B,G,I,Q,S,V,W1,E2) [C4 >= 33 && I >= 1] (?,1) 35. f182(A,B,G,I,Q,S,V,W1,E2) -> f200(A,B,G,I,Q,S,V,W1,E2) [C4 >= 33 && I >= 1] (?,1) 36. f222(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,1,I,Q,S,V,16,E2) [16 >= Q && G = 1] (?,1) 37. f222(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,G,I,Q,S,V,16,E2) [16 >= Q && 0 >= G] (?,1) 38. f222(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,G,I,Q,S,V,16,E2) [16 >= Q && G >= 2] (?,1) 39. f237(A,B,G,I,Q,S,V,W1,E2) -> f245(A,B,G,I,Q,S,V,W1,E2) [W1 >= 1] (?,1) 40. f237(A,B,G,I,Q,S,V,W1,E2) -> f245(A,B,G,I,Q,S,V,W1,E2) [W1 >= 1] (?,1) 41. f245(A,B,G,I,Q,S,V,W1,E2) -> f250(A,B,G,I,Q,S,V,W1,E2) True (?,1) 42. f245(A,B,G,I,Q,S,V,W1,E2) -> f250(A,B,G,I,Q,S,V,W1,E2) True (?,1) 43. f250(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,G,I,Q,S,V,-1 + W1,E2) True (?,1) 44. f250(A,B,G,I,Q,S,V,W1,E2) -> f237(A,B,G,I,Q,S,V,-1 + W1,E2) True (?,1) 45. f265(A,B,G,I,Q,S,V,W1,E2) -> f265(A,B,G,I,Q,S,V,1 + W1,E2) [4 >= W1] (?,1) 46. f276(A,B,G,I,Q,S,V,W1,E2) -> f276(A,B,G,I,Q,S,V,C4,-1 + E2) [E2 >= 1] (?,1) 47. f289(A,B,G,I,Q,S,V,W1,E2) -> f289(A,B,G,I,Q,S,V,-1 + W1,E2) [W1 >= 1] (?,1) 48. f289(A,B,G,I,Q,S,V,W1,E2) -> f289(A,B,G,I,Q,S,V,-1 + W1,E2) [W1 >= 1] (?,1) 49. f314(A,B,G,I,Q,S,V,W1,E2) -> f333(A,B,G,I,Q,S,V,W1,E2) [32 >= E4 && I >= 1] (?,1) 50. f314(A,B,G,I,Q,S,V,W1,E2) -> f333(A,B,G,I,Q,S,V,W1,E2) [32 >= E4 && I >= 1] (?,1) 51. f314(A,B,G,I,Q,S,V,W1,E2) -> f333(A,B,G,I,Q,S,V,W1,E2) [E4 >= 33 && I >= 1] (?,1) 52. f314(A,B,G,I,Q,S,V,W1,E2) -> f333(A,B,G,I,Q,S,V,W1,E2) [E4 >= 33 && I >= 1] (?,1) 53. f333(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= E4] (?,1) 54. f333(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= E4] (?,1) 55. f333(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,-1 + I,Q,S,V,W1,E2) [E4 >= 33] (?,1) 56. f333(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,-1 + I,Q,S,V,W1,E2) [E4 >= 33] (?,1) 57. f314(A,B,G,I,Q,S,V,W1,E2) -> f358(A,B,G,I,Q,S,V,W1,E2) [0 >= I] (?,1) 58. f289(A,B,G,I,Q,S,V,W1,E2) -> f222(A,B,G,I,1 + Q,S,V,W1,E2) [0 >= W1] (?,1) 59. f276(A,B,G,I,Q,S,V,W1,E2) -> f289(A,B,G,I,Q,S,V,32,E2) [0 >= E2] (?,1) 60. f265(A,B,G,I,Q,S,V,W1,E2) -> f276(A,B,G,I,Q,S,V,W1,8) [W1 >= 5] (?,1) 61. f237(A,B,G,I,Q,S,V,W1,E2) -> f265(A,B,G,I,Q,S,V,1,E2) [0 >= W1] (?,1) 62. f222(A,B,G,I,Q,S,V,W1,E2) -> f314(A,B,G,32,Q,S,V,W1,E2) [Q >= 17] (?,1) 63. f200(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= C4] (?,1) 64. f200(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= C4] (?,1) 65. f200(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,-1 + I,Q,S,V,W1,E2) [C4 >= 33] (?,1) 66. f200(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,-1 + I,Q,S,V,W1,E2) [C4 >= 33] (?,1) 67. f182(A,B,G,I,Q,S,V,W1,E2) -> f222(A,B,G,I,1,S,V,W1,E2) [0 >= I] (?,1) 68. f150(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,-1 + V,W1,E2) [28 >= E4] (?,1) 69. f150(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,-1 + V,W1,E2) [28 >= E4] (?,1) 70. f150(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,-1 + V,W1,E2) [E4 >= 29] (?,1) 71. f150(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,-1 + V,W1,E2) [E4 >= 29] (?,1) 72. f113(A,B,G,I,Q,S,V,W1,E2) -> f81(A,B,G,I,1 + Q,S,V,W1,E2) [0 >= V] (?,1) 73. f100(A,B,G,I,Q,S,V,W1,E2) -> f113(A,B,G,I,Q,S,16,W1,E2) [S >= 3] (?,1) 74. f81(A,B,G,I,Q,S,V,W1,E2) -> f182(A,B,G,32,Q,S,V,W1,E2) [Q >= 17] (?,1) 75. f59(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= C4] (?,1) 76. f59(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,-1 + I,Q,S,V,W1,E2) [32 >= C4] (?,1) 77. f59(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,-1 + I,Q,S,V,W1,E2) [C4 >= 33] (?,1) 78. f59(A,B,G,I,Q,S,V,W1,E2) -> f41(A,B,G,-1 + I,Q,S,V,W1,E2) [C4 >= 33] (?,1) 79. f41(A,B,G,I,Q,S,V,W1,E2) -> f81(A,B,G,I,1,S,V,W1,E2) [0 >= I] (?,1) 80. f29(A,B,G,I,Q,S,V,W1,E2) -> f34(A,B,G,I,Q,S,V,W1,E2) [I >= 33] (?,1) 81. f314(A,B,G,I,Q,S,V,W1,E2) -> exitus616(A,B,G,I,Q,S,V,W1,E2) True (?,1) Signature: {(exitus616,9) ;(f0,106) ;(f100,106) ;(f113,106) ;(f132,106) ;(f150,106) ;(f182,106) ;(f200,106) ;(f222,106) ;(f237,106) ;(f245,106) ;(f250,106) ;(f265,106) ;(f276,106) ;(f289,106) ;(f29,106) ;(f314,106) ;(f333,106) ;(f34,106) ;(f358,106) ;(f41,106) ;(f59,106) ;(f81,106) ;(f90,106) ;(f93,106) ;(f96,106)} Flow Graph: [0->{2},1->{2,3,21},2->{16},3->{16,17,22},4->{8,9,31},5->{7},6->{7},7->{7,80},8->{10,11,12,13},9->{10,11 ,12,13},10->{75,76,77,78},11->{75,76,77,78},12->{75,76,77,78},13->{75,76,77,78},14->{0},15->{1,20},16->{18} ,17->{18},18->{18,73},19->{23,24,25,26},20->{23,24,25,26},21->{23,24,25,26},22->{23,24,25,26},23->{27,28,29 ,30},24->{27,28,29,30},25->{27,28,29,30},26->{27,28,29,30},27->{68,69,70,71},28->{68,69,70,71},29->{68,69,70 ,71},30->{68,69,70,71},31->{32,33,34,35},32->{63,64,65,66},33->{63,64,65,66},34->{63,64,65,66},35->{63,64,65 ,66},36->{39,40},37->{39,40},38->{39,40},39->{41,42},40->{41,42},41->{43,44},42->{43,44},43->{39,40,61} ,44->{39,40,61},45->{45,60},46->{46,59},47->{47,48,58},48->{47,48,58},49->{53,54,55,56},50->{53,54,55,56} ,51->{53,54,55,56},52->{53,54,55,56},53->{49,50,51,52,57,81},54->{49,50,51,52,57,81},55->{49,50,51,52,57,81} ,56->{49,50,51,52,57,81},57->{},58->{36,37,38,62},59->{47,48},60->{46},61->{45},62->{49,50,51,52,81},63->{32 ,33,34,35,67},64->{32,33,34,35,67},65->{32,33,34,35,67},66->{32,33,34,35,67},67->{36,37,38},68->{23,24,25,26 ,72},69->{23,24,25,26,72},70->{23,24,25,26,72},71->{23,24,25,26,72},72->{14,15,19,74},73->{23,24,25,26} ,74->{32,33,34,35},75->{10,11,12,13,79},76->{10,11,12,13,79},77->{10,11,12,13,79},78->{10,11,12,13,79} ,79->{19},80->{8,9,31},81->{}] ,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] | +- p:[7] c: [7] | +- p:[10,75,11,76,12,77,13,78] c: [11,12,13] | | | `- p:[10,75,76,77,78] c: [10] | +- p:[0,14,72,68,27,23,19,20,15,21,1,22,3,69,28,24,70,29,25,71,30,26,73,18,16,2,17] c: [19] | | | `- p:[0,14,72,68,27,23,20,15,21,1,22,3,69,28,24,70,29,25,71,30,26,73,18,16,2,17] c: [14,15] | | | +- p:[18] c: [18] | | | `- p:[23,68,27,24,69,28,25,70,29,26,71,30] c: [24] | | | `- p:[23,68,27,25,69,28,26,70,29,30,71] c: [25] | | | `- p:[23,68,27,26,69,28,29,30,70,71] c: [26] | | | `- p:[23,68,27,28,29,30,69,70,71] c: [23] | +- p:[32,63,33,64,34,65,35,66] c: [33,34,35] | | | `- p:[32,63,64,65,66] c: [32] | +- p:[36,58,47,48,59,46,60,45,61,43,41,39,37,38,44,42,40] c: [37] | | | `- p:[36,58,47,48,59,46,60,45,61,43,41,39,38,44,42,40] c: [38] | | | `- p:[36,58,47,48,59,46,60,45,61,43,41,39,44,42,40] c: [36] | | | +- p:[39,43,41,40,44,42] c: [40] | | | | | `- p:[39,43,41,42,44] c: [39] | | | +- p:[45] c: [45] | | | +- p:[46] c: [46] | | | `- p:[47,48] c: [48] | | | `- p:[47] c: [47] | `- p:[49,53,50,54,51,55,52,56] c: [50,51,52] | `- p:[49,53,54,55,56] c: [49]) + Applied Processor: SizeAbstraction UseCFG Minimize + Details: () * Step 8: FlowAbstraction WORST_CASE(?,POLY) + Considered Problem: Program: Domain: [A ,B ,G ,I ,Q ,S ,V ,W1 ,E2 ,0.0 ,0.1 ,0.1.0 ,0.2 ,0.2.0 ,0.2.0.0 ,0.2.0.1 ,0.2.0.1.0 ,0.2.0.1.0.0 ,0.2.0.1.0.0.0 ,0.3 ,0.3.0 ,0.4 ,0.4.0 ,0.4.0.0 ,0.4.0.0.0 ,0.4.0.0.0.0 ,0.4.0.0.1 ,0.4.0.0.2 ,0.4.0.0.3 ,0.4.0.0.3.0 ,0.5 ,0.5.0] f90 ~> f93 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f90 ~> f93 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f93 ~> f96 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f93 ~> f96 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f0 ~> f34 [A <= A, B <= 0*K, G <= unknown, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f0 ~> f29 [A <= A, B <= 0*K, G <= unknown, I <= 2*K, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f0 ~> f29 [A <= A, B <= 0*K, G <= unknown, I <= 2*K, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f29 ~> f29 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f34 ~> f41 [A <= A, B <= B, G <= G, I <= 28*K, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f34 ~> f41 [A <= A, B <= B, G <= G, I <= 28*K, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f41 ~> f59 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f41 ~> f59 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f41 ~> f59 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f41 ~> f59 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f81 ~> f90 [A <= Q, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f81 ~> f90 [A <= Q, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f96 ~> f100 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= K, V <= V, W1 <= W1, E2 <= E2] f96 ~> f100 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= K, V <= V, W1 <= W1, E2 <= E2] f100 ~> f100 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= K + S, V <= V, W1 <= W1, E2 <= E2] f81 ~> f113 [A <= K, B <= B, G <= G, I <= I, Q <= K, S <= S, V <= 16*K, W1 <= W1, E2 <= E2] f90 ~> f113 [A <= 2*K, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= 16*K, W1 <= W1, E2 <= E2] f93 ~> f113 [A <= 9*K, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= 16*K, W1 <= W1, E2 <= E2] f96 ~> f113 [A <= 16*K, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= 16*K, W1 <= W1, E2 <= E2] f113 ~> f132 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f113 ~> f132 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f113 ~> f132 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f113 ~> f132 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f34 ~> f182 [A <= A, B <= B, G <= G, I <= 32*K, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f182 ~> f200 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f182 ~> f200 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f182 ~> f200 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f182 ~> f200 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f222 ~> f237 [A <= A, B <= B, G <= K, I <= I, Q <= Q, S <= S, V <= V, W1 <= 16*K, E2 <= E2] f222 ~> f237 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= 16*K, E2 <= E2] f222 ~> f237 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= 16*K, E2 <= E2] f237 ~> f245 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f237 ~> f245 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f245 ~> f250 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f245 ~> f250 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f250 ~> f237 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= K + W1, E2 <= E2] f250 ~> f237 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= K + W1, E2 <= E2] f265 ~> f265 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= K + W1, E2 <= E2] f276 ~> f276 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= unknown, E2 <= E2] f289 ~> f289 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f289 ~> f289 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f314 ~> f333 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f314 ~> f333 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f314 ~> f333 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f314 ~> f333 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f333 ~> f314 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f333 ~> f314 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f333 ~> f314 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f333 ~> f314 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f314 ~> f358 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f289 ~> f222 [A <= A, B <= B, G <= G, I <= I, Q <= K + Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f276 ~> f289 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= 32*K, E2 <= E2] f265 ~> f276 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= 8*K] f237 ~> f265 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= K, E2 <= E2] f222 ~> f314 [A <= A, B <= B, G <= G, I <= 32*K, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f200 ~> f182 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f200 ~> f182 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f200 ~> f182 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f200 ~> f182 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f182 ~> f222 [A <= A, B <= B, G <= G, I <= I, Q <= K, S <= S, V <= V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] f113 ~> f81 [A <= A, B <= B, G <= G, I <= I, Q <= K + Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f100 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= 16*K, W1 <= W1, E2 <= E2] f81 ~> f182 [A <= A, B <= B, G <= G, I <= 32*K, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f59 ~> f41 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f59 ~> f41 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f59 ~> f41 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f59 ~> f41 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f41 ~> f81 [A <= A, B <= B, G <= G, I <= I, Q <= K, S <= S, V <= V, W1 <= W1, E2 <= E2] f29 ~> f34 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f314 ~> exitus616 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] + Loop: [0.0 <= 33*K + I] f29 ~> f29 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] + Loop: [0.1 <= 2*K + I] f41 ~> f59 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f59 ~> f41 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f41 ~> f59 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f59 ~> f41 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f41 ~> f59 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f59 ~> f41 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f41 ~> f59 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f59 ~> f41 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] + Loop: [0.1.0 <= 2*K + I] f41 ~> f59 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f59 ~> f41 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f59 ~> f41 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f59 ~> f41 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f59 ~> f41 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] + Loop: [0.2 <= 2*K + Q] f90 ~> f93 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f81 ~> f90 [A <= Q, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f113 ~> f81 [A <= A, B <= B, G <= G, I <= I, Q <= K + Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f113 ~> f132 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f81 ~> f113 [A <= K, B <= B, G <= G, I <= I, Q <= K, S <= S, V <= 16*K, W1 <= W1, E2 <= E2] f90 ~> f113 [A <= 2*K, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= 16*K, W1 <= W1, E2 <= E2] f81 ~> f90 [A <= Q, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f93 ~> f113 [A <= 9*K, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= 16*K, W1 <= W1, E2 <= E2] f90 ~> f93 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f96 ~> f113 [A <= 16*K, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= 16*K, W1 <= W1, E2 <= E2] f93 ~> f96 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f113 ~> f132 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f113 ~> f132 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f113 ~> f132 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f100 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= 16*K, W1 <= W1, E2 <= E2] f100 ~> f100 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= K + S, V <= V, W1 <= W1, E2 <= E2] f96 ~> f100 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= K, V <= V, W1 <= W1, E2 <= E2] f93 ~> f96 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f96 ~> f100 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= K, V <= V, W1 <= W1, E2 <= E2] + Loop: [0.2.0 <= 17*K + Q] f90 ~> f93 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f81 ~> f90 [A <= Q, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f113 ~> f81 [A <= A, B <= B, G <= G, I <= I, Q <= K + Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f113 ~> f132 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f90 ~> f113 [A <= 2*K, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= 16*K, W1 <= W1, E2 <= E2] f81 ~> f90 [A <= Q, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f93 ~> f113 [A <= 9*K, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= 16*K, W1 <= W1, E2 <= E2] f90 ~> f93 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f96 ~> f113 [A <= 16*K, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= 16*K, W1 <= W1, E2 <= E2] f93 ~> f96 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f113 ~> f132 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f113 ~> f132 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f113 ~> f132 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f100 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= 16*K, W1 <= W1, E2 <= E2] f100 ~> f100 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= K + S, V <= V, W1 <= W1, E2 <= E2] f96 ~> f100 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= K, V <= V, W1 <= W1, E2 <= E2] f93 ~> f96 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f96 ~> f100 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= K, V <= V, W1 <= W1, E2 <= E2] + Loop: [0.2.0.0 <= 3*K + S] f100 ~> f100 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= K + S, V <= V, W1 <= W1, E2 <= E2] + Loop: [0.2.0.1 <= 2*K + V] f113 ~> f132 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f113 ~> f132 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f113 ~> f132 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f113 ~> f132 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] + Loop: [0.2.0.1.0 <= 2*K + V] f113 ~> f132 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f113 ~> f132 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f113 ~> f132 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] + Loop: [0.2.0.1.0.0 <= 2*K + V] f113 ~> f132 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f113 ~> f132 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] + Loop: [0.2.0.1.0.0.0 <= 2*K + V] f113 ~> f132 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f132 ~> f150 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] f150 ~> f113 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= K + V, W1 <= W1, E2 <= E2] + Loop: [0.3 <= 2*K + I] f182 ~> f200 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f200 ~> f182 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f182 ~> f200 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f200 ~> f182 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f182 ~> f200 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f200 ~> f182 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f182 ~> f200 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f200 ~> f182 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] + Loop: [0.3.0 <= 2*K + I] f182 ~> f200 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f200 ~> f182 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f200 ~> f182 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f200 ~> f182 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f200 ~> f182 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] + Loop: [0.4 <= 17*K + Q] f222 ~> f237 [A <= A, B <= B, G <= K, I <= I, Q <= Q, S <= S, V <= V, W1 <= 16*K, E2 <= E2] f289 ~> f222 [A <= A, B <= B, G <= G, I <= I, Q <= K + Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f289 ~> f289 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f289 ~> f289 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f276 ~> f289 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= 32*K, E2 <= E2] f276 ~> f276 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= unknown, E2 <= E2] f265 ~> f276 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= 8*K] f265 ~> f265 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= K + W1, E2 <= E2] f237 ~> f265 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= K, E2 <= E2] f250 ~> f237 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= K + W1, E2 <= E2] f245 ~> f250 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f237 ~> f245 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f222 ~> f237 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= 16*K, E2 <= E2] f222 ~> f237 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= 16*K, E2 <= E2] f250 ~> f237 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= K + W1, E2 <= E2] f245 ~> f250 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f237 ~> f245 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] + Loop: [0.4.0 <= 17*K + Q] f222 ~> f237 [A <= A, B <= B, G <= K, I <= I, Q <= Q, S <= S, V <= V, W1 <= 16*K, E2 <= E2] f289 ~> f222 [A <= A, B <= B, G <= G, I <= I, Q <= K + Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f289 ~> f289 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f289 ~> f289 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f276 ~> f289 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= 32*K, E2 <= E2] f276 ~> f276 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= unknown, E2 <= E2] f265 ~> f276 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= 8*K] f265 ~> f265 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= K + W1, E2 <= E2] f237 ~> f265 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= K, E2 <= E2] f250 ~> f237 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= K + W1, E2 <= E2] f245 ~> f250 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f237 ~> f245 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f222 ~> f237 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= 16*K, E2 <= E2] f250 ~> f237 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= K + W1, E2 <= E2] f245 ~> f250 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f237 ~> f245 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] + Loop: [0.4.0.0 <= 17*K + Q] f222 ~> f237 [A <= A, B <= B, G <= K, I <= I, Q <= Q, S <= S, V <= V, W1 <= 16*K, E2 <= E2] f289 ~> f222 [A <= A, B <= B, G <= G, I <= I, Q <= K + Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f289 ~> f289 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f289 ~> f289 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f276 ~> f289 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= 32*K, E2 <= E2] f276 ~> f276 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= unknown, E2 <= E2] f265 ~> f276 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= 8*K] f265 ~> f265 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= K + W1, E2 <= E2] f237 ~> f265 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= K, E2 <= E2] f250 ~> f237 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= K + W1, E2 <= E2] f245 ~> f250 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f237 ~> f245 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f250 ~> f237 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= K + W1, E2 <= E2] f245 ~> f250 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f237 ~> f245 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] + Loop: [0.4.0.0.0 <= 2*K + W1] f237 ~> f245 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f250 ~> f237 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= K + W1, E2 <= E2] f245 ~> f250 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f237 ~> f245 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f250 ~> f237 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= K + W1, E2 <= E2] f245 ~> f250 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] + Loop: [0.4.0.0.0.0 <= 2*K + W1] f237 ~> f245 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f250 ~> f237 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= K + W1, E2 <= E2] f245 ~> f250 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f245 ~> f250 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f250 ~> f237 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= K + W1, E2 <= E2] + Loop: [0.4.0.0.1 <= 5*K + W1] f265 ~> f265 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= K + W1, E2 <= E2] + Loop: [0.4.0.0.2 <= E2] f276 ~> f276 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= unknown, E2 <= E2] + Loop: [0.4.0.0.3 <= W1] f289 ~> f289 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f289 ~> f289 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] + Loop: [0.4.0.0.3.0 <= W1] f289 ~> f289 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] + Loop: [0.5 <= 2*K + I] f314 ~> f333 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f333 ~> f314 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f314 ~> f333 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f333 ~> f314 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f314 ~> f333 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f333 ~> f314 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f314 ~> f333 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f333 ~> f314 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] + Loop: [0.5.0 <= 2*K + I] f314 ~> f333 [A <= A, B <= B, G <= G, I <= I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f333 ~> f314 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f333 ~> f314 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f333 ~> f314 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] f333 ~> f314 [A <= A, B <= B, G <= G, I <= K + I, Q <= Q, S <= S, V <= V, W1 <= W1, E2 <= E2] + Applied Processor: FlowAbstraction + Details: () * Step 9: LareProcessor WORST_CASE(?,POLY) + Considered Problem: Program: Domain: [tick ,huge ,K ,A ,B ,G ,I ,Q ,S ,V ,W1 ,E2 ,0.0 ,0.1 ,0.1.0 ,0.2 ,0.2.0 ,0.2.0.0 ,0.2.0.1 ,0.2.0.1.0 ,0.2.0.1.0.0 ,0.2.0.1.0.0.0 ,0.3 ,0.3.0 ,0.4 ,0.4.0 ,0.4.0.0 ,0.4.0.0.0 ,0.4.0.0.0.0 ,0.4.0.0.1 ,0.4.0.0.2 ,0.4.0.0.3 ,0.4.0.0.3.0 ,0.5 ,0.5.0] f90 ~> f93 [] f90 ~> f93 [] f93 ~> f96 [] f93 ~> f96 [] f0 ~> f34 [K ~=> B,huge ~=> G] f0 ~> f29 [K ~=> B,K ~=> I,huge ~=> G] f0 ~> f29 [K ~=> B,K ~=> I,huge ~=> G] f29 ~> f29 [I ~+> I,K ~+> I] f34 ~> f41 [K ~=> I] f34 ~> f41 [K ~=> I] f41 ~> f59 [] f41 ~> f59 [] f41 ~> f59 [] f41 ~> f59 [] f81 ~> f90 [Q ~=> A] f81 ~> f90 [Q ~=> A] f96 ~> f100 [K ~=> S] f96 ~> f100 [K ~=> S] f100 ~> f100 [S ~+> S,K ~+> S] f81 ~> f113 [K ~=> A,K ~=> Q,K ~=> V] f90 ~> f113 [K ~=> A,K ~=> V] f93 ~> f113 [K ~=> A,K ~=> V] f96 ~> f113 [K ~=> A,K ~=> V] f113 ~> f132 [] f113 ~> f132 [] f113 ~> f132 [] f113 ~> f132 [] f132 ~> f150 [] f132 ~> f150 [] f132 ~> f150 [] f132 ~> f150 [] f34 ~> f182 [K ~=> I] f182 ~> f200 [] f182 ~> f200 [] f182 ~> f200 [] f182 ~> f200 [] f222 ~> f237 [K ~=> G,K ~=> W1] f222 ~> f237 [K ~=> W1] f222 ~> f237 [K ~=> W1] f237 ~> f245 [] f237 ~> f245 [] f245 ~> f250 [] f245 ~> f250 [] f250 ~> f237 [W1 ~+> W1,K ~+> W1] f250 ~> f237 [W1 ~+> W1,K ~+> W1] f265 ~> f265 [W1 ~+> W1,K ~+> W1] f276 ~> f276 [huge ~=> W1] f289 ~> f289 [] f289 ~> f289 [] f314 ~> f333 [] f314 ~> f333 [] f314 ~> f333 [] f314 ~> f333 [] f333 ~> f314 [I ~+> I,K ~+> I] f333 ~> f314 [I ~+> I,K ~+> I] f333 ~> f314 [I ~+> I,K ~+> I] f333 ~> f314 [I ~+> I,K ~+> I] f314 ~> f358 [] f289 ~> f222 [Q ~+> Q,K ~+> Q] f276 ~> f289 [K ~=> W1] f265 ~> f276 [K ~=> E2] f237 ~> f265 [K ~=> W1] f222 ~> f314 [K ~=> I] f200 ~> f182 [I ~+> I,K ~+> I] f200 ~> f182 [I ~+> I,K ~+> I] f200 ~> f182 [I ~+> I,K ~+> I] f200 ~> f182 [I ~+> I,K ~+> I] f182 ~> f222 [K ~=> Q] f150 ~> f113 [V ~+> V,K ~+> V] f150 ~> f113 [V ~+> V,K ~+> V] f150 ~> f113 [V ~+> V,K ~+> V] f150 ~> f113 [V ~+> V,K ~+> V] f113 ~> f81 [Q ~+> Q,K ~+> Q] f100 ~> f113 [K ~=> V] f81 ~> f182 [K ~=> I] f59 ~> f41 [I ~+> I,K ~+> I] f59 ~> f41 [I ~+> I,K ~+> I] f59 ~> f41 [I ~+> I,K ~+> I] f59 ~> f41 [I ~+> I,K ~+> I] f41 ~> f81 [K ~=> Q] f29 ~> f34 [] f314 ~> exitus616 [] + Loop: [I ~+> 0.0,K ~*> 0.0] f29 ~> f29 [I ~+> I,K ~+> I] + Loop: [I ~+> 0.1,K ~*> 0.1] f41 ~> f59 [] f59 ~> f41 [I ~+> I,K ~+> I] f41 ~> f59 [] f59 ~> f41 [I ~+> I,K ~+> I] f41 ~> f59 [] f59 ~> f41 [I ~+> I,K ~+> I] f41 ~> f59 [] f59 ~> f41 [I ~+> I,K ~+> I] + Loop: [I ~+> 0.1.0,K ~*> 0.1.0] f41 ~> f59 [] f59 ~> f41 [I ~+> I,K ~+> I] f59 ~> f41 [I ~+> I,K ~+> I] f59 ~> f41 [I ~+> I,K ~+> I] f59 ~> f41 [I ~+> I,K ~+> I] + Loop: [Q ~+> 0.2,K ~*> 0.2] f90 ~> f93 [] f81 ~> f90 [Q ~=> A] f113 ~> f81 [Q ~+> Q,K ~+> Q] f150 ~> f113 [V ~+> V,K ~+> V] f132 ~> f150 [] f113 ~> f132 [] f81 ~> f113 [K ~=> A,K ~=> Q,K ~=> V] f90 ~> f113 [K ~=> A,K ~=> V] f81 ~> f90 [Q ~=> A] f93 ~> f113 [K ~=> A,K ~=> V] f90 ~> f93 [] f96 ~> f113 [K ~=> A,K ~=> V] f93 ~> f96 [] f150 ~> f113 [V ~+> V,K ~+> V] f132 ~> f150 [] f113 ~> f132 [] f150 ~> f113 [V ~+> V,K ~+> V] f132 ~> f150 [] f113 ~> f132 [] f150 ~> f113 [V ~+> V,K ~+> V] f132 ~> f150 [] f113 ~> f132 [] f100 ~> f113 [K ~=> V] f100 ~> f100 [S ~+> S,K ~+> S] f96 ~> f100 [K ~=> S] f93 ~> f96 [] f96 ~> f100 [K ~=> S] + Loop: [Q ~+> 0.2.0,K ~*> 0.2.0] f90 ~> f93 [] f81 ~> f90 [Q ~=> A] f113 ~> f81 [Q ~+> Q,K ~+> Q] f150 ~> f113 [V ~+> V,K ~+> V] f132 ~> f150 [] f113 ~> f132 [] f90 ~> f113 [K ~=> A,K ~=> V] f81 ~> f90 [Q ~=> A] f93 ~> f113 [K ~=> A,K ~=> V] f90 ~> f93 [] f96 ~> f113 [K ~=> A,K ~=> V] f93 ~> f96 [] f150 ~> f113 [V ~+> V,K ~+> V] f132 ~> f150 [] f113 ~> f132 [] f150 ~> f113 [V ~+> V,K ~+> V] f132 ~> f150 [] f113 ~> f132 [] f150 ~> f113 [V ~+> V,K ~+> V] f132 ~> f150 [] f113 ~> f132 [] f100 ~> f113 [K ~=> V] f100 ~> f100 [S ~+> S,K ~+> S] f96 ~> f100 [K ~=> S] f93 ~> f96 [] f96 ~> f100 [K ~=> S] + Loop: [S ~+> 0.2.0.0,K ~*> 0.2.0.0] f100 ~> f100 [S ~+> S,K ~+> S] + Loop: [V ~+> 0.2.0.1,K ~*> 0.2.0.1] f113 ~> f132 [] f150 ~> f113 [V ~+> V,K ~+> V] f132 ~> f150 [] f113 ~> f132 [] f150 ~> f113 [V ~+> V,K ~+> V] f132 ~> f150 [] f113 ~> f132 [] f150 ~> f113 [V ~+> V,K ~+> V] f132 ~> f150 [] f113 ~> f132 [] f150 ~> f113 [V ~+> V,K ~+> V] f132 ~> f150 [] + Loop: [V ~+> 0.2.0.1.0,K ~*> 0.2.0.1.0] f113 ~> f132 [] f150 ~> f113 [V ~+> V,K ~+> V] f132 ~> f150 [] f113 ~> f132 [] f150 ~> f113 [V ~+> V,K ~+> V] f132 ~> f150 [] f113 ~> f132 [] f150 ~> f113 [V ~+> V,K ~+> V] f132 ~> f150 [] f132 ~> f150 [] f150 ~> f113 [V ~+> V,K ~+> V] + Loop: [V ~+> 0.2.0.1.0.0,K ~*> 0.2.0.1.0.0] f113 ~> f132 [] f150 ~> f113 [V ~+> V,K ~+> V] f132 ~> f150 [] f113 ~> f132 [] f150 ~> f113 [V ~+> V,K ~+> V] f132 ~> f150 [] f132 ~> f150 [] f132 ~> f150 [] f150 ~> f113 [V ~+> V,K ~+> V] f150 ~> f113 [V ~+> V,K ~+> V] + Loop: [V ~+> 0.2.0.1.0.0.0,K ~*> 0.2.0.1.0.0.0] f113 ~> f132 [] f150 ~> f113 [V ~+> V,K ~+> V] f132 ~> f150 [] f132 ~> f150 [] f132 ~> f150 [] f132 ~> f150 [] f150 ~> f113 [V ~+> V,K ~+> V] f150 ~> f113 [V ~+> V,K ~+> V] f150 ~> f113 [V ~+> V,K ~+> V] + Loop: [I ~+> 0.3,K ~*> 0.3] f182 ~> f200 [] f200 ~> f182 [I ~+> I,K ~+> I] f182 ~> f200 [] f200 ~> f182 [I ~+> I,K ~+> I] f182 ~> f200 [] f200 ~> f182 [I ~+> I,K ~+> I] f182 ~> f200 [] f200 ~> f182 [I ~+> I,K ~+> I] + Loop: [I ~+> 0.3.0,K ~*> 0.3.0] f182 ~> f200 [] f200 ~> f182 [I ~+> I,K ~+> I] f200 ~> f182 [I ~+> I,K ~+> I] f200 ~> f182 [I ~+> I,K ~+> I] f200 ~> f182 [I ~+> I,K ~+> I] + Loop: [Q ~+> 0.4,K ~*> 0.4] f222 ~> f237 [K ~=> G,K ~=> W1] f289 ~> f222 [Q ~+> Q,K ~+> Q] f289 ~> f289 [] f289 ~> f289 [] f276 ~> f289 [K ~=> W1] f276 ~> f276 [huge ~=> W1] f265 ~> f276 [K ~=> E2] f265 ~> f265 [W1 ~+> W1,K ~+> W1] f237 ~> f265 [K ~=> W1] f250 ~> f237 [W1 ~+> W1,K ~+> W1] f245 ~> f250 [] f237 ~> f245 [] f222 ~> f237 [K ~=> W1] f222 ~> f237 [K ~=> W1] f250 ~> f237 [W1 ~+> W1,K ~+> W1] f245 ~> f250 [] f237 ~> f245 [] + Loop: [Q ~+> 0.4.0,K ~*> 0.4.0] f222 ~> f237 [K ~=> G,K ~=> W1] f289 ~> f222 [Q ~+> Q,K ~+> Q] f289 ~> f289 [] f289 ~> f289 [] f276 ~> f289 [K ~=> W1] f276 ~> f276 [huge ~=> W1] f265 ~> f276 [K ~=> E2] f265 ~> f265 [W1 ~+> W1,K ~+> W1] f237 ~> f265 [K ~=> W1] f250 ~> f237 [W1 ~+> W1,K ~+> W1] f245 ~> f250 [] f237 ~> f245 [] f222 ~> f237 [K ~=> W1] f250 ~> f237 [W1 ~+> W1,K ~+> W1] f245 ~> f250 [] f237 ~> f245 [] + Loop: [Q ~+> 0.4.0.0,K ~*> 0.4.0.0] f222 ~> f237 [K ~=> G,K ~=> W1] f289 ~> f222 [Q ~+> Q,K ~+> Q] f289 ~> f289 [] f289 ~> f289 [] f276 ~> f289 [K ~=> W1] f276 ~> f276 [huge ~=> W1] f265 ~> f276 [K ~=> E2] f265 ~> f265 [W1 ~+> W1,K ~+> W1] f237 ~> f265 [K ~=> W1] f250 ~> f237 [W1 ~+> W1,K ~+> W1] f245 ~> f250 [] f237 ~> f245 [] f250 ~> f237 [W1 ~+> W1,K ~+> W1] f245 ~> f250 [] f237 ~> f245 [] + Loop: [W1 ~+> 0.4.0.0.0,K ~*> 0.4.0.0.0] f237 ~> f245 [] f250 ~> f237 [W1 ~+> W1,K ~+> W1] f245 ~> f250 [] f237 ~> f245 [] f250 ~> f237 [W1 ~+> W1,K ~+> W1] f245 ~> f250 [] + Loop: [W1 ~+> 0.4.0.0.0.0,K ~*> 0.4.0.0.0.0] f237 ~> f245 [] f250 ~> f237 [W1 ~+> W1,K ~+> W1] f245 ~> f250 [] f245 ~> f250 [] f250 ~> f237 [W1 ~+> W1,K ~+> W1] + Loop: [W1 ~+> 0.4.0.0.1,K ~*> 0.4.0.0.1] f265 ~> f265 [W1 ~+> W1,K ~+> W1] + Loop: [E2 ~=> 0.4.0.0.2] f276 ~> f276 [huge ~=> W1] + Loop: [W1 ~=> 0.4.0.0.3] f289 ~> f289 [] f289 ~> f289 [] + Loop: [W1 ~=> 0.4.0.0.3.0] f289 ~> f289 [] + Loop: [I ~+> 0.5,K ~*> 0.5] f314 ~> f333 [] f333 ~> f314 [I ~+> I,K ~+> I] f314 ~> f333 [] f333 ~> f314 [I ~+> I,K ~+> I] f314 ~> f333 [] f333 ~> f314 [I ~+> I,K ~+> I] f314 ~> f333 [] f333 ~> f314 [I ~+> I,K ~+> I] + Loop: [I ~+> 0.5.0,K ~*> 0.5.0] f314 ~> f333 [] f333 ~> f314 [I ~+> I,K ~+> I] f333 ~> f314 [I ~+> I,K ~+> I] f333 ~> f314 [I ~+> I,K ~+> I] f333 ~> f314 [I ~+> I,K ~+> I] + Applied Processor: LareProcessor + Details: f0 ~> exitus616 [E2 ~=> 0.4.0.0.2 ,K ~=> A ,K ~=> B ,K ~=> E2 ,K ~=> G ,K ~=> I ,K ~=> Q ,K ~=> S ,K ~=> V ,K ~=> W1 ,K ~=> 0.4.0.0.2 ,K ~=> 0.4.0.0.3 ,K ~=> 0.4.0.0.3.0 ,huge ~=> G ,huge ~=> W1 ,E2 ~+> tick ,tick ~+> tick ,K ~+> A ,K ~+> I ,K ~+> Q ,K ~+> S ,K ~+> V ,K ~+> W1 ,K ~+> 0.0 ,K ~+> 0.1 ,K ~+> 0.1.0 ,K ~+> 0.2 ,K ~+> 0.2.0 ,K ~+> 0.2.0.0 ,K ~+> 0.2.0.1 ,K ~+> 0.2.0.1.0 ,K ~+> 0.2.0.1.0.0 ,K ~+> 0.2.0.1.0.0.0 ,K ~+> 0.3 ,K ~+> 0.3.0 ,K ~+> 0.4 ,K ~+> 0.4.0 ,K ~+> 0.4.0.0 ,K ~+> 0.4.0.0.0 ,K ~+> 0.4.0.0.0.0 ,K ~+> 0.4.0.0.1 ,K ~+> 0.5 ,K ~+> 0.5.0 ,K ~+> tick ,E2 ~*> tick ,K ~*> A ,K ~*> I ,K ~*> Q ,K ~*> S ,K ~*> V ,K ~*> W1 ,K ~*> 0.0 ,K ~*> 0.1 ,K ~*> 0.1.0 ,K ~*> 0.2 ,K ~*> 0.2.0 ,K ~*> 0.2.0.0 ,K ~*> 0.2.0.1 ,K ~*> 0.2.0.1.0 ,K ~*> 0.2.0.1.0.0 ,K ~*> 0.2.0.1.0.0.0 ,K ~*> 0.3 ,K ~*> 0.3.0 ,K ~*> 0.4 ,K ~*> 0.4.0 ,K ~*> 0.4.0.0 ,K ~*> 0.4.0.0.0 ,K ~*> 0.4.0.0.0.0 ,K ~*> 0.4.0.0.1 ,K ~*> 0.5 ,K ~*> 0.5.0 ,K ~*> tick ,K ~^> I ,K ~^> Q ,K ~^> S ,K ~^> V ,K ~^> W1 ,K ~^> 0.2.0.1 ,K ~^> 0.2.0.1.0 ,K ~^> 0.2.0.1.0.0 ,K ~^> 0.2.0.1.0.0.0 ,K ~^> 0.4.0 ,K ~^> 0.4.0.0 ,K ~^> 0.4.0.0.0 ,K ~^> 0.4.0.0.0.0 ,K ~^> tick] f0 ~> f358 [E2 ~=> 0.4.0.0.2 ,K ~=> A ,K ~=> B ,K ~=> E2 ,K ~=> G ,K ~=> I ,K ~=> Q ,K ~=> S ,K ~=> V ,K ~=> W1 ,K ~=> 0.4.0.0.2 ,K ~=> 0.4.0.0.3 ,K ~=> 0.4.0.0.3.0 ,huge ~=> G ,huge ~=> W1 ,E2 ~+> tick ,tick ~+> tick ,K ~+> A ,K ~+> I ,K ~+> Q ,K ~+> S ,K ~+> V ,K ~+> W1 ,K ~+> 0.0 ,K ~+> 0.1 ,K ~+> 0.1.0 ,K ~+> 0.2 ,K ~+> 0.2.0 ,K ~+> 0.2.0.0 ,K ~+> 0.2.0.1 ,K ~+> 0.2.0.1.0 ,K ~+> 0.2.0.1.0.0 ,K ~+> 0.2.0.1.0.0.0 ,K ~+> 0.3 ,K ~+> 0.3.0 ,K ~+> 0.4 ,K ~+> 0.4.0 ,K ~+> 0.4.0.0 ,K ~+> 0.4.0.0.0 ,K ~+> 0.4.0.0.0.0 ,K ~+> 0.4.0.0.1 ,K ~+> 0.5 ,K ~+> 0.5.0 ,K ~+> tick ,E2 ~*> tick ,K ~*> A ,K ~*> I ,K ~*> Q ,K ~*> S ,K ~*> V ,K ~*> W1 ,K ~*> 0.0 ,K ~*> 0.1 ,K ~*> 0.1.0 ,K ~*> 0.2 ,K ~*> 0.2.0 ,K ~*> 0.2.0.0 ,K ~*> 0.2.0.1 ,K ~*> 0.2.0.1.0 ,K ~*> 0.2.0.1.0.0 ,K ~*> 0.2.0.1.0.0.0 ,K ~*> 0.3 ,K ~*> 0.3.0 ,K ~*> 0.4 ,K ~*> 0.4.0 ,K ~*> 0.4.0.0 ,K ~*> 0.4.0.0.0 ,K ~*> 0.4.0.0.0.0 ,K ~*> 0.4.0.0.1 ,K ~*> 0.5 ,K ~*> 0.5.0 ,K ~*> tick ,K ~^> I ,K ~^> Q ,K ~^> S ,K ~^> V ,K ~^> W1 ,K ~^> 0.2.0.1 ,K ~^> 0.2.0.1.0 ,K ~^> 0.2.0.1.0.0 ,K ~^> 0.2.0.1.0.0.0 ,K ~^> 0.4.0 ,K ~^> 0.4.0.0 ,K ~^> 0.4.0.0.0 ,K ~^> 0.4.0.0.0.0 ,K ~^> tick] + f29> [I ~+> I,I ~+> 0.0,I ~+> tick,tick ~+> tick,K ~+> I,I ~*> I,K ~*> I,K ~*> 0.0,K ~*> tick] + f41> [I ~+> I ,I ~+> 0.1 ,I ~+> 0.1.0 ,I ~+> tick ,tick ~+> tick ,K ~+> I ,K ~+> 0.1.0 ,K ~+> tick ,I ~*> I ,I ~*> 0.1.0 ,I ~*> tick ,K ~*> I ,K ~*> 0.1 ,K ~*> 0.1.0 ,K ~*> tick ,I ~^> I ,K ~^> I] + f41> [I ~+> I ,I ~+> 0.1.0 ,I ~+> tick ,tick ~+> tick ,K ~+> I ,I ~*> I ,K ~*> I ,K ~*> 0.1.0 ,K ~*> tick] + f81> [Q ~=> A ,K ~=> A ,K ~=> Q ,K ~=> S ,K ~=> V ,Q ~+> A ,Q ~+> Q ,Q ~+> 0.2 ,Q ~+> 0.2.0 ,Q ~+> tick ,tick ~+> tick ,K ~+> A ,K ~+> Q ,K ~+> S ,K ~+> V ,K ~+> 0.2.0 ,K ~+> 0.2.0.0 ,K ~+> 0.2.0.1 ,K ~+> 0.2.0.1.0 ,K ~+> 0.2.0.1.0.0 ,K ~+> 0.2.0.1.0.0.0 ,K ~+> tick ,Q ~*> A ,Q ~*> Q ,Q ~*> S ,Q ~*> V ,Q ~*> 0.2.0 ,Q ~*> tick ,K ~*> A ,K ~*> Q ,K ~*> S ,K ~*> V ,K ~*> 0.2 ,K ~*> 0.2.0 ,K ~*> 0.2.0.0 ,K ~*> 0.2.0.1 ,K ~*> 0.2.0.1.0 ,K ~*> 0.2.0.1.0.0 ,K ~*> 0.2.0.1.0.0.0 ,K ~*> tick ,Q ~^> Q ,Q ~^> S ,Q ~^> V ,K ~^> Q ,K ~^> S ,K ~^> V ,K ~^> 0.2.0.1 ,K ~^> 0.2.0.1.0 ,K ~^> 0.2.0.1.0.0 ,K ~^> 0.2.0.1.0.0.0 ,K ~^> tick] + f81> [Q ~=> A ,K ~=> A ,K ~=> S ,K ~=> V ,Q ~+> A ,Q ~+> Q ,Q ~+> 0.2.0 ,Q ~+> tick ,V ~+> V ,V ~+> 0.2.0.1 ,V ~+> 0.2.0.1.0 ,V ~+> 0.2.0.1.0.0 ,V ~+> 0.2.0.1.0.0.0 ,V ~+> tick ,tick ~+> tick ,K ~+> A ,K ~+> Q ,K ~+> S ,K ~+> V ,K ~+> 0.2.0.0 ,K ~+> 0.2.0.1 ,K ~+> 0.2.0.1.0 ,K ~+> 0.2.0.1.0.0 ,K ~+> 0.2.0.1.0.0.0 ,K ~+> tick ,Q ~*> A ,Q ~*> Q ,Q ~*> S ,Q ~*> V ,Q ~*> 0.2.0.1 ,Q ~*> 0.2.0.1.0 ,Q ~*> 0.2.0.1.0.0 ,Q ~*> 0.2.0.1.0.0.0 ,Q ~*> tick ,V ~*> V ,V ~*> 0.2.0.1 ,V ~*> 0.2.0.1.0 ,V ~*> 0.2.0.1.0.0 ,V ~*> 0.2.0.1.0.0.0 ,V ~*> tick ,K ~*> A ,K ~*> Q ,K ~*> S ,K ~*> V ,K ~*> 0.2.0 ,K ~*> 0.2.0.0 ,K ~*> 0.2.0.1 ,K ~*> 0.2.0.1.0 ,K ~*> 0.2.0.1.0.0 ,K ~*> 0.2.0.1.0.0.0 ,K ~*> tick ,Q ~^> S ,Q ~^> V ,Q ~^> 0.2.0.1 ,Q ~^> 0.2.0.1.0 ,Q ~^> 0.2.0.1.0.0 ,Q ~^> 0.2.0.1.0.0.0 ,Q ~^> tick ,V ~^> V ,V ~^> 0.2.0.1 ,V ~^> 0.2.0.1.0 ,V ~^> 0.2.0.1.0.0 ,V ~^> 0.2.0.1.0.0.0 ,V ~^> tick ,K ~^> S ,K ~^> V ,K ~^> 0.2.0.1 ,K ~^> 0.2.0.1.0 ,K ~^> 0.2.0.1.0.0 ,K ~^> 0.2.0.1.0.0.0 ,K ~^> tick] f81> [Q ~=> A ,K ~=> A ,K ~=> S ,K ~=> V ,Q ~+> A ,Q ~+> Q ,Q ~+> 0.2.0 ,Q ~+> tick ,tick ~+> tick ,K ~+> A ,K ~+> Q ,K ~+> S ,K ~+> V ,K ~+> 0.2.0.0 ,K ~+> 0.2.0.1 ,K ~+> 0.2.0.1.0 ,K ~+> 0.2.0.1.0.0 ,K ~+> 0.2.0.1.0.0.0 ,K ~+> tick ,Q ~*> A ,Q ~*> Q ,Q ~*> S ,Q ~*> V ,Q ~*> tick ,K ~*> A ,K ~*> Q ,K ~*> S ,K ~*> V ,K ~*> 0.2.0 ,K ~*> 0.2.0.0 ,K ~*> 0.2.0.1 ,K ~*> 0.2.0.1.0 ,K ~*> 0.2.0.1.0.0 ,K ~*> 0.2.0.1.0.0.0 ,K ~*> tick ,Q ~^> S ,Q ~^> V ,K ~^> S ,K ~^> V ,K ~^> 0.2.0.1 ,K ~^> 0.2.0.1.0 ,K ~^> 0.2.0.1.0.0 ,K ~^> 0.2.0.1.0.0.0 ,K ~^> tick] + f100> [S ~+> S ,S ~+> 0.2.0.0 ,S ~+> tick ,tick ~+> tick ,K ~+> S ,S ~*> S ,K ~*> S ,K ~*> 0.2.0.0 ,K ~*> tick] + f113> [V ~+> V ,V ~+> 0.2.0.1 ,V ~+> 0.2.0.1.0 ,V ~+> 0.2.0.1.0.0 ,V ~+> 0.2.0.1.0.0.0 ,V ~+> tick ,tick ~+> tick ,K ~+> V ,K ~+> 0.2.0.1.0 ,K ~+> 0.2.0.1.0.0 ,K ~+> 0.2.0.1.0.0.0 ,K ~+> tick ,V ~*> V ,V ~*> 0.2.0.1.0 ,V ~*> 0.2.0.1.0.0 ,V ~*> 0.2.0.1.0.0.0 ,V ~*> tick ,K ~*> V ,K ~*> 0.2.0.1 ,K ~*> 0.2.0.1.0 ,K ~*> 0.2.0.1.0.0 ,K ~*> 0.2.0.1.0.0.0 ,K ~*> tick ,V ~^> V ,V ~^> 0.2.0.1.0 ,V ~^> 0.2.0.1.0.0 ,V ~^> 0.2.0.1.0.0.0 ,V ~^> tick ,K ~^> V ,K ~^> 0.2.0.1.0 ,K ~^> 0.2.0.1.0.0 ,K ~^> 0.2.0.1.0.0.0 ,K ~^> tick] + f113> [V ~+> V ,V ~+> 0.2.0.1.0 ,V ~+> 0.2.0.1.0.0 ,V ~+> 0.2.0.1.0.0.0 ,V ~+> tick ,tick ~+> tick ,K ~+> V ,K ~+> 0.2.0.1.0.0 ,K ~+> 0.2.0.1.0.0.0 ,K ~+> tick ,V ~*> V ,V ~*> 0.2.0.1.0.0 ,V ~*> 0.2.0.1.0.0.0 ,V ~*> tick ,K ~*> V ,K ~*> 0.2.0.1.0 ,K ~*> 0.2.0.1.0.0 ,K ~*> 0.2.0.1.0.0.0 ,K ~*> tick ,V ~^> V ,V ~^> 0.2.0.1.0.0 ,V ~^> 0.2.0.1.0.0.0 ,V ~^> tick ,K ~^> V ,K ~^> 0.2.0.1.0.0 ,K ~^> 0.2.0.1.0.0.0 ,K ~^> tick] + f113> [V ~+> V ,V ~+> 0.2.0.1.0.0 ,V ~+> 0.2.0.1.0.0.0 ,V ~+> tick ,tick ~+> tick ,K ~+> V ,K ~+> 0.2.0.1.0.0.0 ,K ~+> tick ,V ~*> V ,V ~*> 0.2.0.1.0.0.0 ,V ~*> tick ,K ~*> V ,K ~*> 0.2.0.1.0.0 ,K ~*> 0.2.0.1.0.0.0 ,K ~*> tick ,V ~^> V ,K ~^> V] + f113> [V ~+> V ,V ~+> 0.2.0.1.0.0.0 ,V ~+> tick ,tick ~+> tick ,K ~+> V ,V ~*> V ,K ~*> V ,K ~*> 0.2.0.1.0.0.0 ,K ~*> tick] + f182> [I ~+> I ,I ~+> 0.3 ,I ~+> 0.3.0 ,I ~+> tick ,tick ~+> tick ,K ~+> I ,K ~+> 0.3.0 ,K ~+> tick ,I ~*> I ,I ~*> 0.3.0 ,I ~*> tick ,K ~*> I ,K ~*> 0.3 ,K ~*> 0.3.0 ,K ~*> tick ,I ~^> I ,K ~^> I] + f182> [I ~+> I ,I ~+> 0.3.0 ,I ~+> tick ,tick ~+> tick ,K ~+> I ,I ~*> I ,K ~*> I ,K ~*> 0.3.0 ,K ~*> tick] + f222> [E2 ~=> 0.4.0.0.2 ,K ~=> E2 ,K ~=> G ,K ~=> W1 ,K ~=> 0.4.0.0.2 ,K ~=> 0.4.0.0.3 ,K ~=> 0.4.0.0.3.0 ,huge ~=> W1 ,E2 ~+> tick ,Q ~+> Q ,Q ~+> 0.4 ,Q ~+> 0.4.0 ,Q ~+> 0.4.0.0 ,Q ~+> tick ,tick ~+> tick ,K ~+> Q ,K ~+> W1 ,K ~+> 0.4.0 ,K ~+> 0.4.0.0 ,K ~+> 0.4.0.0.0 ,K ~+> 0.4.0.0.0.0 ,K ~+> 0.4.0.0.1 ,K ~+> tick ,E2 ~*> tick ,Q ~*> Q ,Q ~*> W1 ,Q ~*> 0.4.0 ,Q ~*> 0.4.0.0 ,Q ~*> tick ,K ~*> Q ,K ~*> W1 ,K ~*> 0.4 ,K ~*> 0.4.0 ,K ~*> 0.4.0.0 ,K ~*> 0.4.0.0.0 ,K ~*> 0.4.0.0.0.0 ,K ~*> 0.4.0.0.1 ,K ~*> tick ,Q ~^> Q ,Q ~^> W1 ,Q ~^> 0.4.0 ,Q ~^> 0.4.0.0 ,Q ~^> tick ,K ~^> Q ,K ~^> W1 ,K ~^> 0.4.0 ,K ~^> 0.4.0.0 ,K ~^> 0.4.0.0.0 ,K ~^> 0.4.0.0.0.0 ,K ~^> tick] + f222> [E2 ~=> 0.4.0.0.2 ,K ~=> E2 ,K ~=> G ,K ~=> W1 ,K ~=> 0.4.0.0.2 ,K ~=> 0.4.0.0.3 ,K ~=> 0.4.0.0.3.0 ,huge ~=> W1 ,E2 ~+> tick ,Q ~+> Q ,Q ~+> 0.4.0 ,Q ~+> 0.4.0.0 ,Q ~+> tick ,tick ~+> tick ,K ~+> Q ,K ~+> W1 ,K ~+> 0.4.0.0 ,K ~+> 0.4.0.0.0 ,K ~+> 0.4.0.0.0.0 ,K ~+> 0.4.0.0.1 ,K ~+> tick ,E2 ~*> tick ,Q ~*> Q ,Q ~*> W1 ,Q ~*> 0.4.0.0 ,Q ~*> tick ,K ~*> Q ,K ~*> W1 ,K ~*> 0.4.0 ,K ~*> 0.4.0.0 ,K ~*> 0.4.0.0.0 ,K ~*> 0.4.0.0.0.0 ,K ~*> 0.4.0.0.1 ,K ~*> tick ,Q ~^> Q ,Q ~^> W1 ,K ~^> Q ,K ~^> W1 ,K ~^> 0.4.0.0.0 ,K ~^> 0.4.0.0.0.0 ,K ~^> tick] + f222> [E2 ~=> 0.4.0.0.2 ,K ~=> E2 ,K ~=> G ,K ~=> W1 ,K ~=> 0.4.0.0.2 ,K ~=> 0.4.0.0.3 ,K ~=> 0.4.0.0.3.0 ,huge ~=> W1 ,E2 ~+> tick ,Q ~+> Q ,Q ~+> 0.4.0.0 ,Q ~+> tick ,tick ~+> tick ,K ~+> Q ,K ~+> W1 ,K ~+> 0.4.0.0.0 ,K ~+> 0.4.0.0.0.0 ,K ~+> 0.4.0.0.1 ,K ~+> tick ,E2 ~*> tick ,Q ~*> Q ,Q ~*> W1 ,Q ~*> tick ,K ~*> Q ,K ~*> W1 ,K ~*> 0.4.0.0 ,K ~*> 0.4.0.0.0 ,K ~*> 0.4.0.0.0.0 ,K ~*> 0.4.0.0.1 ,K ~*> tick ,Q ~^> W1 ,K ~^> W1 ,K ~^> 0.4.0.0.0 ,K ~^> 0.4.0.0.0.0 ,K ~^> tick] f222> [E2 ~=> 0.4.0.0.2 ,K ~=> E2 ,K ~=> G ,K ~=> W1 ,K ~=> 0.4.0.0.2 ,K ~=> 0.4.0.0.3 ,K ~=> 0.4.0.0.3.0 ,huge ~=> W1 ,E2 ~+> tick ,Q ~+> Q ,Q ~+> 0.4.0.0 ,Q ~+> tick ,W1 ~+> W1 ,W1 ~+> 0.4.0.0.0 ,W1 ~+> 0.4.0.0.0.0 ,W1 ~+> tick ,tick ~+> tick ,K ~+> Q ,K ~+> W1 ,K ~+> 0.4.0.0.0 ,K ~+> 0.4.0.0.0.0 ,K ~+> 0.4.0.0.1 ,K ~+> tick ,E2 ~*> tick ,Q ~*> Q ,Q ~*> W1 ,Q ~*> tick ,W1 ~*> W1 ,W1 ~*> 0.4.0.0.0 ,W1 ~*> 0.4.0.0.0.0 ,W1 ~*> tick ,K ~*> Q ,K ~*> W1 ,K ~*> 0.4.0.0 ,K ~*> 0.4.0.0.0 ,K ~*> 0.4.0.0.0.0 ,K ~*> 0.4.0.0.1 ,K ~*> tick ,Q ~^> W1 ,W1 ~^> W1 ,W1 ~^> 0.4.0.0.0 ,W1 ~^> 0.4.0.0.0.0 ,W1 ~^> tick ,K ~^> W1 ,K ~^> 0.4.0.0.0 ,K ~^> 0.4.0.0.0.0 ,K ~^> tick] + f237> [W1 ~+> W1 ,W1 ~+> 0.4.0.0.0 ,W1 ~+> 0.4.0.0.0.0 ,W1 ~+> tick ,tick ~+> tick ,K ~+> W1 ,K ~+> 0.4.0.0.0.0 ,K ~+> tick ,W1 ~*> W1 ,W1 ~*> 0.4.0.0.0.0 ,W1 ~*> tick ,K ~*> W1 ,K ~*> 0.4.0.0.0 ,K ~*> 0.4.0.0.0.0 ,K ~*> tick ,W1 ~^> W1 ,K ~^> W1] + f237> [W1 ~+> W1 ,W1 ~+> 0.4.0.0.0.0 ,W1 ~+> tick ,tick ~+> tick ,K ~+> W1 ,W1 ~*> W1 ,K ~*> W1 ,K ~*> 0.4.0.0.0.0 ,K ~*> tick] + f265> [W1 ~+> W1 ,W1 ~+> 0.4.0.0.1 ,W1 ~+> tick ,tick ~+> tick ,K ~+> W1 ,W1 ~*> W1 ,K ~*> W1 ,K ~*> 0.4.0.0.1 ,K ~*> tick] + f276> [E2 ~=> 0.4.0.0.2,huge ~=> W1,E2 ~+> tick,tick ~+> tick] + f289> [W1 ~=> 0.4.0.0.3,W1 ~=> 0.4.0.0.3.0,W1 ~+> tick,tick ~+> tick,W1 ~*> tick] + f289> [W1 ~=> 0.4.0.0.3.0,W1 ~+> tick,tick ~+> tick] + f314> [I ~+> I ,I ~+> 0.5 ,I ~+> 0.5.0 ,I ~+> tick ,tick ~+> tick ,K ~+> I ,K ~+> 0.5.0 ,K ~+> tick ,I ~*> I ,I ~*> 0.5.0 ,I ~*> tick ,K ~*> I ,K ~*> 0.5 ,K ~*> 0.5.0 ,K ~*> tick ,I ~^> I ,K ~^> I] + f314> [I ~+> I ,I ~+> 0.5.0 ,I ~+> tick ,tick ~+> tick ,K ~+> I ,I ~*> I ,K ~*> I ,K ~*> 0.5.0 ,K ~*> tick] YES(?,POLY)