NO ### Pre-processing the ITS problem ### Initial linear ITS problem Start location: l35 0: l0 -> l1 : a_123^0'=a_123^post_1, a_136^0'=a_136^post_1, a_76^0'=a_76^post_1, ct_18^0'=ct_18^post_1, h_15^0'=h_15^post_1, h_30^0'=h_30^post_1, i_115^0'=i_115^post_1, i_28^0'=i_28^post_1, i_98^0'=i_98^post_1, l_27^0'=l_27^post_1, nd_12^0'=nd_12^post_1, r_135^0'=r_135^post_1, r_37^0'=r_37^post_1, r_57^0'=r_57^post_1, r_92^0'=r_92^post_1, rt_11^0'=rt_11^post_1, rv_13^0'=rv_13^post_1, rv_31^0'=rv_31^post_1, st_16^0'=st_16^post_1, st_29^0'=st_29^post_1, t_24^0'=t_24^post_1, t_32^0'=t_32^post_1, tp_33^0'=tp_33^post_1, x_134^0'=x_134^post_1, x_14^0'=x_14^post_1, x_17^0'=x_17^post_1, x_19^0'=x_19^post_1, x_21^0'=x_21^post_1, y_20^0'=y_20^post_1, [ nd_12^1_1==nd_12^1_1 && rv_13^post_1==nd_12^1_1 && nd_12^post_1==nd_12^post_1 && l_27^post_1==rv_13^post_1 && h_30^post_1==0 && i_28^post_1==0 && 0<=i_28^post_1 && i_28^post_1<=0 && 0<=h_30^post_1 && h_30^post_1<=0 && rv_13^post_1<=l_27^post_1 && l_27^post_1<=rv_13^post_1 && a_123^0==a_123^post_1 && a_136^0==a_136^post_1 && a_76^0==a_76^post_1 && ct_18^0==ct_18^post_1 && h_15^0==h_15^post_1 && i_115^0==i_115^post_1 && i_98^0==i_98^post_1 && r_135^0==r_135^post_1 && r_37^0==r_37^post_1 && r_57^0==r_57^post_1 && r_92^0==r_92^post_1 && rt_11^0==rt_11^post_1 && rv_31^0==rv_31^post_1 && st_16^0==st_16^post_1 && st_29^0==st_29^post_1 && t_24^0==t_24^post_1 && t_32^0==t_32^post_1 && tp_33^0==tp_33^post_1 && x_134^0==x_134^post_1 && x_14^0==x_14^post_1 && x_17^0==x_17^post_1 && x_19^0==x_19^post_1 && x_21^0==x_21^post_1 && y_20^0==y_20^post_1 ], cost: 1 52: l1 -> l3 : a_123^0'=a_123^post_53, a_136^0'=a_136^post_53, a_76^0'=a_76^post_53, ct_18^0'=ct_18^post_53, h_15^0'=h_15^post_53, h_30^0'=h_30^post_53, i_115^0'=i_115^post_53, i_28^0'=i_28^post_53, i_98^0'=i_98^post_53, l_27^0'=l_27^post_53, nd_12^0'=nd_12^post_53, r_135^0'=r_135^post_53, r_37^0'=r_37^post_53, r_57^0'=r_57^post_53, r_92^0'=r_92^post_53, rt_11^0'=rt_11^post_53, rv_13^0'=rv_13^post_53, rv_31^0'=rv_31^post_53, st_16^0'=st_16^post_53, st_29^0'=st_29^post_53, t_24^0'=t_24^post_53, t_32^0'=t_32^post_53, tp_33^0'=tp_33^post_53, x_134^0'=x_134^post_53, x_14^0'=x_14^post_53, x_17^0'=x_17^post_53, x_19^0'=x_19^post_53, x_21^0'=x_21^post_53, y_20^0'=y_20^post_53, [ rv_13^1_3_1==rv_13^1_3_1 && l_27^0<=i_28^0 && st_29^1_3_1==h_30^0 && rt_11^1_3_1==st_29^1_3_1 && l_27^post_53==l_27^post_53 && i_28^post_53==i_28^post_53 && st_29^post_53==st_29^post_53 && h_30^post_53==h_30^post_53 && rv_31^post_53==rv_31^post_53 && t_32^post_53==t_32^post_53 && tp_33^post_53==tp_33^post_53 && h_15^post_53==rt_11^1_3_1 && rt_11^2_1==rt_11^2_1 && x_14^post_53==h_15^post_53 && 0<=x_14^post_53 && x_14^post_53<=0 && 0<=h_15^post_53 && h_15^post_53<=0 && x_14^post_53<=h_15^post_53 && h_15^post_53<=x_14^post_53 && rv_13^1_3_1<=0 && rv_13^2_1==rv_13^2_1 && 0<=x_14^post_53 && x_14^post_53<=0 && x_17^1_1==h_15^post_53 && ct_18^1_3==0 && x_19^1_3_1==x_17^1_1 && y_20^1_3_1==ct_18^1_3 && x_21^1_3_1==x_19^1_3_1 && 0<=x_14^post_53 && x_14^post_53<=0 && 0<=h_15^post_53 && h_15^post_53<=0 && 0<=x_17^1_1 && x_17^1_1<=0 && 0<=ct_18^1_3 && ct_18^1_3<=0 && 0<=x_19^1_3_1 && x_19^1_3_1<=0 && 0<=y_20^1_3_1 && y_20^1_3_1<=0 && 0<=x_21^1_3_1 && x_21^1_3_1<=0 && x_14^post_53<=h_15^post_53 && h_15^post_53<=x_14^post_53 && h_15^post_53<=x_17^1_1 && x_17^1_1<=h_15^post_53 && x_17^1_1<=x_19^1_3_1 && x_19^1_3_1<=x_17^1_1 && ct_18^1_3<=y_20^1_3_1 && y_20^1_3_1<=ct_18^1_3 && x_19^1_3_1<=x_21^1_3_1 && x_21^1_3_1<=x_19^1_3_1 && rv_13^2_1<=0 && rv_13^post_53==rv_13^post_53 && y_20^1_3_1<=x_21^1_3_1 && x_21^1_3_1<=y_20^1_3_1 && x_19^2_1==x_19^2_1 && y_20^2_1==y_20^2_1 && x_21^2_1==x_21^2_1 && t_24^1_3_1==t_24^1_3_1 && ct_18^2_1==ct_18^2_1 && x_17^post_53==x_17^post_53 && ct_18^post_53==ct_18^post_53 && x_19^post_53==x_19^post_53 && y_20^post_53==y_20^post_53 && x_21^post_53==x_21^post_53 && t_24^post_53==t_24^post_53 && rt_11^post_53==st_16^0 && rv_13^post_53<=0 && a_123^0==a_123^post_53 && a_136^0==a_136^post_53 && a_76^0==a_76^post_53 && i_115^0==i_115^post_53 && i_98^0==i_98^post_53 && nd_12^0==nd_12^post_53 && r_135^0==r_135^post_53 && r_37^0==r_37^post_53 && r_57^0==r_57^post_53 && r_92^0==r_92^post_53 && st_16^0==st_16^post_53 && x_134^0==x_134^post_53 ], cost: 1 53: l1 -> l2 : a_123^0'=a_123^post_54, a_136^0'=a_136^post_54, a_76^0'=a_76^post_54, ct_18^0'=ct_18^post_54, h_15^0'=h_15^post_54, h_30^0'=h_30^post_54, i_115^0'=i_115^post_54, i_28^0'=i_28^post_54, i_98^0'=i_98^post_54, l_27^0'=l_27^post_54, nd_12^0'=nd_12^post_54, r_135^0'=r_135^post_54, r_37^0'=r_37^post_54, r_57^0'=r_57^post_54, r_92^0'=r_92^post_54, rt_11^0'=rt_11^post_54, rv_13^0'=rv_13^post_54, rv_31^0'=rv_31^post_54, st_16^0'=st_16^post_54, st_29^0'=st_29^post_54, t_24^0'=t_24^post_54, t_32^0'=t_32^post_54, tp_33^0'=tp_33^post_54, x_134^0'=x_134^post_54, x_14^0'=x_14^post_54, x_17^0'=x_17^post_54, x_19^0'=x_19^post_54, x_21^0'=x_21^post_54, y_20^0'=y_20^post_54, [ rv_13^post_54==rv_13^post_54 && rv_31^post_54==rv_31^post_54 && 1+i_28^0<=l_27^0 && t_32^post_54==tp_33^0 && tp_33^post_54==tp_33^post_54 && h_30^post_54==t_32^post_54 && i_28^post_54==1+i_28^0 && 1<=i_28^post_54 && i_28^post_54<=1 && rv_13^post_54<=l_27^0 && l_27^0<=rv_13^post_54 && h_30^post_54<=rv_31^post_54 && rv_31^post_54<=h_30^post_54 && h_30^post_54<=t_32^post_54 && t_32^post_54<=h_30^post_54 && rv_31^post_54<=t_32^post_54 && t_32^post_54<=rv_31^post_54 && 1<=l_27^0 && a_123^0==a_123^post_54 && a_136^0==a_136^post_54 && a_76^0==a_76^post_54 && ct_18^0==ct_18^post_54 && h_15^0==h_15^post_54 && i_115^0==i_115^post_54 && i_98^0==i_98^post_54 && l_27^0==l_27^post_54 && nd_12^0==nd_12^post_54 && r_135^0==r_135^post_54 && r_37^0==r_37^post_54 && r_57^0==r_57^post_54 && r_92^0==r_92^post_54 && rt_11^0==rt_11^post_54 && st_16^0==st_16^post_54 && st_29^0==st_29^post_54 && t_24^0==t_24^post_54 && x_134^0==x_134^post_54 && x_14^0==x_14^post_54 && x_17^0==x_17^post_54 && x_19^0==x_19^post_54 && x_21^0==x_21^post_54 && y_20^0==y_20^post_54 ], cost: 1 1: l2 -> l4 : a_123^0'=a_123^post_2, a_136^0'=a_136^post_2, a_76^0'=a_76^post_2, ct_18^0'=ct_18^post_2, h_15^0'=h_15^post_2, h_30^0'=h_30^post_2, i_115^0'=i_115^post_2, i_28^0'=i_28^post_2, i_98^0'=i_98^post_2, l_27^0'=l_27^post_2, nd_12^0'=nd_12^post_2, r_135^0'=r_135^post_2, r_37^0'=r_37^post_2, r_57^0'=r_57^post_2, r_92^0'=r_92^post_2, rt_11^0'=rt_11^post_2, rv_13^0'=rv_13^post_2, rv_31^0'=rv_31^post_2, st_16^0'=st_16^post_2, st_29^0'=st_29^post_2, t_24^0'=t_24^post_2, t_32^0'=t_32^post_2, tp_33^0'=tp_33^post_2, x_134^0'=x_134^post_2, x_14^0'=x_14^post_2, x_17^0'=x_17^post_2, x_19^0'=x_19^post_2, x_21^0'=x_21^post_2, y_20^0'=y_20^post_2, [ rv_13^1_1==rv_13^1_1 && l_27^0<=i_28^0 && st_29^1_1==h_30^0 && rt_11^1_1==st_29^1_1 && l_27^post_2==l_27^post_2 && i_28^post_2==i_28^post_2 && st_29^post_2==st_29^post_2 && h_30^post_2==h_30^post_2 && rv_31^post_2==rv_31^post_2 && t_32^post_2==t_32^post_2 && tp_33^post_2==tp_33^post_2 && h_15^1_1==rt_11^1_1 && rt_11^post_2==rt_11^post_2 && x_14^post_2==h_15^1_1 && 1<=rv_13^1_1 && rv_13^1_1<=1 && x_14^post_2<=h_15^1_1 && h_15^1_1<=x_14^post_2 && 1<=rv_13^1_1 && rv_13^1_1<=1 && rv_13^post_2==rv_13^post_2 && h_15^post_2==h_15^post_2 && a_123^0==a_123^post_2 && a_136^0==a_136^post_2 && a_76^0==a_76^post_2 && ct_18^0==ct_18^post_2 && i_115^0==i_115^post_2 && i_98^0==i_98^post_2 && nd_12^0==nd_12^post_2 && r_135^0==r_135^post_2 && r_37^0==r_37^post_2 && r_57^0==r_57^post_2 && r_92^0==r_92^post_2 && st_16^0==st_16^post_2 && t_24^0==t_24^post_2 && x_134^0==x_134^post_2 && x_17^0==x_17^post_2 && x_19^0==x_19^post_2 && x_21^0==x_21^post_2 && y_20^0==y_20^post_2 ], cost: 1 21: l2 -> l16 : a_123^0'=a_123^post_22, a_136^0'=a_136^post_22, a_76^0'=a_76^post_22, ct_18^0'=ct_18^post_22, h_15^0'=h_15^post_22, h_30^0'=h_30^post_22, i_115^0'=i_115^post_22, i_28^0'=i_28^post_22, i_98^0'=i_98^post_22, l_27^0'=l_27^post_22, nd_12^0'=nd_12^post_22, r_135^0'=r_135^post_22, r_37^0'=r_37^post_22, r_57^0'=r_57^post_22, r_92^0'=r_92^post_22, rt_11^0'=rt_11^post_22, rv_13^0'=rv_13^post_22, rv_31^0'=rv_31^post_22, st_16^0'=st_16^post_22, st_29^0'=st_29^post_22, t_24^0'=t_24^post_22, t_32^0'=t_32^post_22, tp_33^0'=tp_33^post_22, x_134^0'=x_134^post_22, x_14^0'=x_14^post_22, x_17^0'=x_17^post_22, x_19^0'=x_19^post_22, x_21^0'=x_21^post_22, y_20^0'=y_20^post_22, [ rv_13^post_22==rv_13^post_22 && rv_31^post_22==rv_31^post_22 && r_57^post_22==r_57^post_22 && 1+i_28^0<=l_27^0 && t_32^post_22==tp_33^0 && tp_33^post_22==tp_33^post_22 && h_30^post_22==t_32^post_22 && i_28^1_1==1+i_28^0 && i_28^post_22==i_28^post_22 && 2<=i_28^post_22 && i_28^post_22<=2 && rv_13^post_22<=l_27^0 && l_27^0<=rv_13^post_22 && h_30^post_22<=rv_31^post_22 && rv_31^post_22<=h_30^post_22 && h_30^post_22<=t_32^post_22 && t_32^post_22<=h_30^post_22 && rv_31^post_22<=t_32^post_22 && t_32^post_22<=rv_31^post_22 && 1<=l_27^0 && 2<=l_27^0 && a_76^post_22==a_76^post_22 && a_76^post_22<=i_28^post_22 && i_28^post_22<=a_76^post_22 && a_123^0==a_123^post_22 && a_136^0==a_136^post_22 && ct_18^0==ct_18^post_22 && h_15^0==h_15^post_22 && i_115^0==i_115^post_22 && i_98^0==i_98^post_22 && l_27^0==l_27^post_22 && nd_12^0==nd_12^post_22 && r_135^0==r_135^post_22 && r_37^0==r_37^post_22 && r_92^0==r_92^post_22 && rt_11^0==rt_11^post_22 && st_16^0==st_16^post_22 && st_29^0==st_29^post_22 && t_24^0==t_24^post_22 && x_134^0==x_134^post_22 && x_14^0==x_14^post_22 && x_17^0==x_17^post_22 && x_19^0==x_19^post_22 && x_21^0==x_21^post_22 && y_20^0==y_20^post_22 ], cost: 1 2: l4 -> l5 : a_123^0'=a_123^post_3, a_136^0'=a_136^post_3, a_76^0'=a_76^post_3, ct_18^0'=ct_18^post_3, h_15^0'=h_15^post_3, h_30^0'=h_30^post_3, i_115^0'=i_115^post_3, i_28^0'=i_28^post_3, i_98^0'=i_98^post_3, l_27^0'=l_27^post_3, nd_12^0'=nd_12^post_3, r_135^0'=r_135^post_3, r_37^0'=r_37^post_3, r_57^0'=r_57^post_3, r_92^0'=r_92^post_3, rt_11^0'=rt_11^post_3, rv_13^0'=rv_13^post_3, rv_31^0'=rv_31^post_3, st_16^0'=st_16^post_3, st_29^0'=st_29^post_3, t_24^0'=t_24^post_3, t_32^0'=t_32^post_3, tp_33^0'=tp_33^post_3, x_134^0'=x_134^post_3, x_14^0'=x_14^post_3, x_17^0'=x_17^post_3, x_19^0'=x_19^post_3, x_21^0'=x_21^post_3, y_20^0'=y_20^post_3, [ 1<=x_14^0 && a_123^0==a_123^post_3 && a_136^0==a_136^post_3 && a_76^0==a_76^post_3 && ct_18^0==ct_18^post_3 && h_15^0==h_15^post_3 && h_30^0==h_30^post_3 && i_115^0==i_115^post_3 && i_28^0==i_28^post_3 && i_98^0==i_98^post_3 && l_27^0==l_27^post_3 && nd_12^0==nd_12^post_3 && r_135^0==r_135^post_3 && r_37^0==r_37^post_3 && r_57^0==r_57^post_3 && r_92^0==r_92^post_3 && rt_11^0==rt_11^post_3 && rv_13^0==rv_13^post_3 && rv_31^0==rv_31^post_3 && st_16^0==st_16^post_3 && st_29^0==st_29^post_3 && t_24^0==t_24^post_3 && t_32^0==t_32^post_3 && tp_33^0==tp_33^post_3 && x_134^0==x_134^post_3 && x_14^0==x_14^post_3 && x_17^0==x_17^post_3 && x_19^0==x_19^post_3 && x_21^0==x_21^post_3 && y_20^0==y_20^post_3 ], cost: 1 3: l4 -> l5 : a_123^0'=a_123^post_4, a_136^0'=a_136^post_4, a_76^0'=a_76^post_4, ct_18^0'=ct_18^post_4, h_15^0'=h_15^post_4, h_30^0'=h_30^post_4, i_115^0'=i_115^post_4, i_28^0'=i_28^post_4, i_98^0'=i_98^post_4, l_27^0'=l_27^post_4, nd_12^0'=nd_12^post_4, r_135^0'=r_135^post_4, r_37^0'=r_37^post_4, r_57^0'=r_57^post_4, r_92^0'=r_92^post_4, rt_11^0'=rt_11^post_4, rv_13^0'=rv_13^post_4, rv_31^0'=rv_31^post_4, st_16^0'=st_16^post_4, st_29^0'=st_29^post_4, t_24^0'=t_24^post_4, t_32^0'=t_32^post_4, tp_33^0'=tp_33^post_4, x_134^0'=x_134^post_4, x_14^0'=x_14^post_4, x_17^0'=x_17^post_4, x_19^0'=x_19^post_4, x_21^0'=x_21^post_4, y_20^0'=y_20^post_4, [ 1+x_14^0<=0 && a_123^0==a_123^post_4 && a_136^0==a_136^post_4 && a_76^0==a_76^post_4 && ct_18^0==ct_18^post_4 && h_15^0==h_15^post_4 && h_30^0==h_30^post_4 && i_115^0==i_115^post_4 && i_28^0==i_28^post_4 && i_98^0==i_98^post_4 && l_27^0==l_27^post_4 && nd_12^0==nd_12^post_4 && r_135^0==r_135^post_4 && r_37^0==r_37^post_4 && r_57^0==r_57^post_4 && r_92^0==r_92^post_4 && rt_11^0==rt_11^post_4 && rv_13^0==rv_13^post_4 && rv_31^0==rv_31^post_4 && st_16^0==st_16^post_4 && st_29^0==st_29^post_4 && t_24^0==t_24^post_4 && t_32^0==t_32^post_4 && tp_33^0==tp_33^post_4 && x_134^0==x_134^post_4 && x_14^0==x_14^post_4 && x_17^0==x_17^post_4 && x_19^0==x_19^post_4 && x_21^0==x_21^post_4 && y_20^0==y_20^post_4 ], cost: 1 4: l5 -> l6 : a_123^0'=a_123^post_5, a_136^0'=a_136^post_5, a_76^0'=a_76^post_5, ct_18^0'=ct_18^post_5, h_15^0'=h_15^post_5, h_30^0'=h_30^post_5, i_115^0'=i_115^post_5, i_28^0'=i_28^post_5, i_98^0'=i_98^post_5, l_27^0'=l_27^post_5, nd_12^0'=nd_12^post_5, r_135^0'=r_135^post_5, r_37^0'=r_37^post_5, r_57^0'=r_57^post_5, r_92^0'=r_92^post_5, rt_11^0'=rt_11^post_5, rv_13^0'=rv_13^post_5, rv_31^0'=rv_31^post_5, st_16^0'=st_16^post_5, st_29^0'=st_29^post_5, t_24^0'=t_24^post_5, t_32^0'=t_32^post_5, tp_33^0'=tp_33^post_5, x_134^0'=x_134^post_5, x_14^0'=x_14^post_5, x_17^0'=x_17^post_5, x_19^0'=x_19^post_5, x_21^0'=x_21^post_5, y_20^0'=y_20^post_5, [ 0<=x_14^0 && x_14^0<=0 && 1<=rv_13^0 && rv_13^0<=1 && a_123^0==a_123^post_5 && a_136^0==a_136^post_5 && a_76^0==a_76^post_5 && ct_18^0==ct_18^post_5 && h_15^0==h_15^post_5 && h_30^0==h_30^post_5 && i_115^0==i_115^post_5 && i_28^0==i_28^post_5 && i_98^0==i_98^post_5 && l_27^0==l_27^post_5 && nd_12^0==nd_12^post_5 && r_135^0==r_135^post_5 && r_37^0==r_37^post_5 && r_57^0==r_57^post_5 && r_92^0==r_92^post_5 && rt_11^0==rt_11^post_5 && rv_13^0==rv_13^post_5 && rv_31^0==rv_31^post_5 && st_16^0==st_16^post_5 && st_29^0==st_29^post_5 && t_24^0==t_24^post_5 && t_32^0==t_32^post_5 && tp_33^0==tp_33^post_5 && x_134^0==x_134^post_5 && x_14^0==x_14^post_5 && x_17^0==x_17^post_5 && x_19^0==x_19^post_5 && x_21^0==x_21^post_5 && y_20^0==y_20^post_5 ], cost: 1 5: l6 -> l7 : a_123^0'=a_123^post_6, a_136^0'=a_136^post_6, a_76^0'=a_76^post_6, ct_18^0'=ct_18^post_6, h_15^0'=h_15^post_6, h_30^0'=h_30^post_6, i_115^0'=i_115^post_6, i_28^0'=i_28^post_6, i_98^0'=i_98^post_6, l_27^0'=l_27^post_6, nd_12^0'=nd_12^post_6, r_135^0'=r_135^post_6, r_37^0'=r_37^post_6, r_57^0'=r_57^post_6, r_92^0'=r_92^post_6, rt_11^0'=rt_11^post_6, rv_13^0'=rv_13^post_6, rv_31^0'=rv_31^post_6, st_16^0'=st_16^post_6, st_29^0'=st_29^post_6, t_24^0'=t_24^post_6, t_32^0'=t_32^post_6, tp_33^0'=tp_33^post_6, x_134^0'=x_134^post_6, x_14^0'=x_14^post_6, x_17^0'=x_17^post_6, x_19^0'=x_19^post_6, x_21^0'=x_21^post_6, y_20^0'=y_20^post_6, [ 1<=h_15^0 && a_123^0==a_123^post_6 && a_136^0==a_136^post_6 && a_76^0==a_76^post_6 && ct_18^0==ct_18^post_6 && h_15^0==h_15^post_6 && h_30^0==h_30^post_6 && i_115^0==i_115^post_6 && i_28^0==i_28^post_6 && i_98^0==i_98^post_6 && l_27^0==l_27^post_6 && nd_12^0==nd_12^post_6 && r_135^0==r_135^post_6 && r_37^0==r_37^post_6 && r_57^0==r_57^post_6 && r_92^0==r_92^post_6 && rt_11^0==rt_11^post_6 && rv_13^0==rv_13^post_6 && rv_31^0==rv_31^post_6 && st_16^0==st_16^post_6 && st_29^0==st_29^post_6 && t_24^0==t_24^post_6 && t_32^0==t_32^post_6 && tp_33^0==tp_33^post_6 && x_134^0==x_134^post_6 && x_14^0==x_14^post_6 && x_17^0==x_17^post_6 && x_19^0==x_19^post_6 && x_21^0==x_21^post_6 && y_20^0==y_20^post_6 ], cost: 1 6: l6 -> l7 : a_123^0'=a_123^post_7, a_136^0'=a_136^post_7, a_76^0'=a_76^post_7, ct_18^0'=ct_18^post_7, h_15^0'=h_15^post_7, h_30^0'=h_30^post_7, i_115^0'=i_115^post_7, i_28^0'=i_28^post_7, i_98^0'=i_98^post_7, l_27^0'=l_27^post_7, nd_12^0'=nd_12^post_7, r_135^0'=r_135^post_7, r_37^0'=r_37^post_7, r_57^0'=r_57^post_7, r_92^0'=r_92^post_7, rt_11^0'=rt_11^post_7, rv_13^0'=rv_13^post_7, rv_31^0'=rv_31^post_7, st_16^0'=st_16^post_7, st_29^0'=st_29^post_7, t_24^0'=t_24^post_7, t_32^0'=t_32^post_7, tp_33^0'=tp_33^post_7, x_134^0'=x_134^post_7, x_14^0'=x_14^post_7, x_17^0'=x_17^post_7, x_19^0'=x_19^post_7, x_21^0'=x_21^post_7, y_20^0'=y_20^post_7, [ 1+h_15^0<=0 && a_123^0==a_123^post_7 && a_136^0==a_136^post_7 && a_76^0==a_76^post_7 && ct_18^0==ct_18^post_7 && h_15^0==h_15^post_7 && h_30^0==h_30^post_7 && i_115^0==i_115^post_7 && i_28^0==i_28^post_7 && i_98^0==i_98^post_7 && l_27^0==l_27^post_7 && nd_12^0==nd_12^post_7 && r_135^0==r_135^post_7 && r_37^0==r_37^post_7 && r_57^0==r_57^post_7 && r_92^0==r_92^post_7 && rt_11^0==rt_11^post_7 && rv_13^0==rv_13^post_7 && rv_31^0==rv_31^post_7 && st_16^0==st_16^post_7 && st_29^0==st_29^post_7 && t_24^0==t_24^post_7 && t_32^0==t_32^post_7 && tp_33^0==tp_33^post_7 && x_134^0==x_134^post_7 && x_14^0==x_14^post_7 && x_17^0==x_17^post_7 && x_19^0==x_19^post_7 && x_21^0==x_21^post_7 && y_20^0==y_20^post_7 ], cost: 1 7: l7 -> l8 : a_123^0'=a_123^post_8, a_136^0'=a_136^post_8, a_76^0'=a_76^post_8, ct_18^0'=ct_18^post_8, h_15^0'=h_15^post_8, h_30^0'=h_30^post_8, i_115^0'=i_115^post_8, i_28^0'=i_28^post_8, i_98^0'=i_98^post_8, l_27^0'=l_27^post_8, nd_12^0'=nd_12^post_8, r_135^0'=r_135^post_8, r_37^0'=r_37^post_8, r_57^0'=r_57^post_8, r_92^0'=r_92^post_8, rt_11^0'=rt_11^post_8, rv_13^0'=rv_13^post_8, rv_31^0'=rv_31^post_8, st_16^0'=st_16^post_8, st_29^0'=st_29^post_8, t_24^0'=t_24^post_8, t_32^0'=t_32^post_8, tp_33^0'=tp_33^post_8, x_134^0'=x_134^post_8, x_14^0'=x_14^post_8, x_17^0'=x_17^post_8, x_19^0'=x_19^post_8, x_21^0'=x_21^post_8, y_20^0'=y_20^post_8, [ 1<=rv_13^0 && rv_13^0<=1 && rv_13^post_8==rv_13^post_8 && 0<=x_14^0 && x_14^0<=0 && x_17^post_8==h_15^0 && ct_18^post_8==0 && x_19^post_8==x_17^post_8 && y_20^post_8==ct_18^post_8 && x_21^post_8==x_19^post_8 && 0<=x_14^0 && x_14^0<=0 && 0<=ct_18^post_8 && ct_18^post_8<=0 && 0<=y_20^post_8 && y_20^post_8<=0 && 1<=rv_13^post_8 && rv_13^post_8<=1 && h_15^0<=x_17^post_8 && x_17^post_8<=h_15^0 && h_15^0<=x_19^post_8 && x_19^post_8<=h_15^0 && h_15^0<=x_21^post_8 && x_21^post_8<=h_15^0 && x_17^post_8<=x_19^post_8 && x_19^post_8<=x_17^post_8 && ct_18^post_8<=y_20^post_8 && y_20^post_8<=ct_18^post_8 && x_19^post_8<=x_21^post_8 && x_21^post_8<=x_19^post_8 && a_123^0==a_123^post_8 && a_136^0==a_136^post_8 && a_76^0==a_76^post_8 && h_15^0==h_15^post_8 && h_30^0==h_30^post_8 && i_115^0==i_115^post_8 && i_28^0==i_28^post_8 && i_98^0==i_98^post_8 && l_27^0==l_27^post_8 && nd_12^0==nd_12^post_8 && r_135^0==r_135^post_8 && r_37^0==r_37^post_8 && r_57^0==r_57^post_8 && r_92^0==r_92^post_8 && rt_11^0==rt_11^post_8 && rv_31^0==rv_31^post_8 && st_16^0==st_16^post_8 && st_29^0==st_29^post_8 && t_24^0==t_24^post_8 && t_32^0==t_32^post_8 && tp_33^0==tp_33^post_8 && x_134^0==x_134^post_8 && x_14^0==x_14^post_8 ], cost: 1 8: l8 -> l9 : a_123^0'=a_123^post_9, a_136^0'=a_136^post_9, a_76^0'=a_76^post_9, ct_18^0'=ct_18^post_9, h_15^0'=h_15^post_9, h_30^0'=h_30^post_9, i_115^0'=i_115^post_9, i_28^0'=i_28^post_9, i_98^0'=i_98^post_9, l_27^0'=l_27^post_9, nd_12^0'=nd_12^post_9, r_135^0'=r_135^post_9, r_37^0'=r_37^post_9, r_57^0'=r_57^post_9, r_92^0'=r_92^post_9, rt_11^0'=rt_11^post_9, rv_13^0'=rv_13^post_9, rv_31^0'=rv_31^post_9, st_16^0'=st_16^post_9, st_29^0'=st_29^post_9, t_24^0'=t_24^post_9, t_32^0'=t_32^post_9, tp_33^0'=tp_33^post_9, x_134^0'=x_134^post_9, x_14^0'=x_14^post_9, x_17^0'=x_17^post_9, x_19^0'=x_19^post_9, x_21^0'=x_21^post_9, y_20^0'=y_20^post_9, [ 1<=h_15^0 && a_123^0==a_123^post_9 && a_136^0==a_136^post_9 && a_76^0==a_76^post_9 && ct_18^0==ct_18^post_9 && h_15^0==h_15^post_9 && h_30^0==h_30^post_9 && i_115^0==i_115^post_9 && i_28^0==i_28^post_9 && i_98^0==i_98^post_9 && l_27^0==l_27^post_9 && nd_12^0==nd_12^post_9 && r_135^0==r_135^post_9 && r_37^0==r_37^post_9 && r_57^0==r_57^post_9 && r_92^0==r_92^post_9 && rt_11^0==rt_11^post_9 && rv_13^0==rv_13^post_9 && rv_31^0==rv_31^post_9 && st_16^0==st_16^post_9 && st_29^0==st_29^post_9 && t_24^0==t_24^post_9 && t_32^0==t_32^post_9 && tp_33^0==tp_33^post_9 && x_134^0==x_134^post_9 && x_14^0==x_14^post_9 && x_17^0==x_17^post_9 && x_19^0==x_19^post_9 && x_21^0==x_21^post_9 && y_20^0==y_20^post_9 ], cost: 1 9: l8 -> l9 : a_123^0'=a_123^post_10, a_136^0'=a_136^post_10, a_76^0'=a_76^post_10, ct_18^0'=ct_18^post_10, h_15^0'=h_15^post_10, h_30^0'=h_30^post_10, i_115^0'=i_115^post_10, i_28^0'=i_28^post_10, i_98^0'=i_98^post_10, l_27^0'=l_27^post_10, nd_12^0'=nd_12^post_10, r_135^0'=r_135^post_10, r_37^0'=r_37^post_10, r_57^0'=r_57^post_10, r_92^0'=r_92^post_10, rt_11^0'=rt_11^post_10, rv_13^0'=rv_13^post_10, rv_31^0'=rv_31^post_10, st_16^0'=st_16^post_10, st_29^0'=st_29^post_10, t_24^0'=t_24^post_10, t_32^0'=t_32^post_10, tp_33^0'=tp_33^post_10, x_134^0'=x_134^post_10, x_14^0'=x_14^post_10, x_17^0'=x_17^post_10, x_19^0'=x_19^post_10, x_21^0'=x_21^post_10, y_20^0'=y_20^post_10, [ 1+h_15^0<=0 && a_123^0==a_123^post_10 && a_136^0==a_136^post_10 && a_76^0==a_76^post_10 && ct_18^0==ct_18^post_10 && h_15^0==h_15^post_10 && h_30^0==h_30^post_10 && i_115^0==i_115^post_10 && i_28^0==i_28^post_10 && i_98^0==i_98^post_10 && l_27^0==l_27^post_10 && nd_12^0==nd_12^post_10 && r_135^0==r_135^post_10 && r_37^0==r_37^post_10 && r_57^0==r_57^post_10 && r_92^0==r_92^post_10 && rt_11^0==rt_11^post_10 && rv_13^0==rv_13^post_10 && rv_31^0==rv_31^post_10 && st_16^0==st_16^post_10 && st_29^0==st_29^post_10 && t_24^0==t_24^post_10 && t_32^0==t_32^post_10 && tp_33^0==tp_33^post_10 && x_134^0==x_134^post_10 && x_14^0==x_14^post_10 && x_17^0==x_17^post_10 && x_19^0==x_19^post_10 && x_21^0==x_21^post_10 && y_20^0==y_20^post_10 ], cost: 1 10: l9 -> l10 : a_123^0'=a_123^post_11, a_136^0'=a_136^post_11, a_76^0'=a_76^post_11, ct_18^0'=ct_18^post_11, h_15^0'=h_15^post_11, h_30^0'=h_30^post_11, i_115^0'=i_115^post_11, i_28^0'=i_28^post_11, i_98^0'=i_98^post_11, l_27^0'=l_27^post_11, nd_12^0'=nd_12^post_11, r_135^0'=r_135^post_11, r_37^0'=r_37^post_11, r_57^0'=r_57^post_11, r_92^0'=r_92^post_11, rt_11^0'=rt_11^post_11, rv_13^0'=rv_13^post_11, rv_31^0'=rv_31^post_11, st_16^0'=st_16^post_11, st_29^0'=st_29^post_11, t_24^0'=t_24^post_11, t_32^0'=t_32^post_11, tp_33^0'=tp_33^post_11, x_134^0'=x_134^post_11, x_14^0'=x_14^post_11, x_17^0'=x_17^post_11, x_19^0'=x_19^post_11, x_21^0'=x_21^post_11, y_20^0'=y_20^post_11, [ 1<=rv_13^0 && rv_13^0<=1 && rv_13^post_11==rv_13^post_11 && x_14^post_11==x_14^post_11 && h_15^post_11==h_15^post_11 && x_17^post_11==x_17^post_11 && ct_18^post_11==ct_18^post_11 && x_19^post_11==x_19^post_11 && a_123^0==a_123^post_11 && a_136^0==a_136^post_11 && a_76^0==a_76^post_11 && h_30^0==h_30^post_11 && i_115^0==i_115^post_11 && i_28^0==i_28^post_11 && i_98^0==i_98^post_11 && l_27^0==l_27^post_11 && nd_12^0==nd_12^post_11 && r_135^0==r_135^post_11 && r_37^0==r_37^post_11 && r_57^0==r_57^post_11 && r_92^0==r_92^post_11 && rt_11^0==rt_11^post_11 && rv_31^0==rv_31^post_11 && st_16^0==st_16^post_11 && st_29^0==st_29^post_11 && t_24^0==t_24^post_11 && t_32^0==t_32^post_11 && tp_33^0==tp_33^post_11 && x_134^0==x_134^post_11 && x_21^0==x_21^post_11 && y_20^0==y_20^post_11 ], cost: 1 11: l10 -> l11 : a_123^0'=a_123^post_12, a_136^0'=a_136^post_12, a_76^0'=a_76^post_12, ct_18^0'=ct_18^post_12, h_15^0'=h_15^post_12, h_30^0'=h_30^post_12, i_115^0'=i_115^post_12, i_28^0'=i_28^post_12, i_98^0'=i_98^post_12, l_27^0'=l_27^post_12, nd_12^0'=nd_12^post_12, r_135^0'=r_135^post_12, r_37^0'=r_37^post_12, r_57^0'=r_57^post_12, r_92^0'=r_92^post_12, rt_11^0'=rt_11^post_12, rv_13^0'=rv_13^post_12, rv_31^0'=rv_31^post_12, st_16^0'=st_16^post_12, st_29^0'=st_29^post_12, t_24^0'=t_24^post_12, t_32^0'=t_32^post_12, tp_33^0'=tp_33^post_12, x_134^0'=x_134^post_12, x_14^0'=x_14^post_12, x_17^0'=x_17^post_12, x_19^0'=x_19^post_12, x_21^0'=x_21^post_12, y_20^0'=y_20^post_12, [ 1+y_20^0<=x_21^0 && a_123^0==a_123^post_12 && a_136^0==a_136^post_12 && a_76^0==a_76^post_12 && ct_18^0==ct_18^post_12 && h_15^0==h_15^post_12 && h_30^0==h_30^post_12 && i_115^0==i_115^post_12 && i_28^0==i_28^post_12 && i_98^0==i_98^post_12 && l_27^0==l_27^post_12 && nd_12^0==nd_12^post_12 && r_135^0==r_135^post_12 && r_37^0==r_37^post_12 && r_57^0==r_57^post_12 && r_92^0==r_92^post_12 && rt_11^0==rt_11^post_12 && rv_13^0==rv_13^post_12 && rv_31^0==rv_31^post_12 && st_16^0==st_16^post_12 && st_29^0==st_29^post_12 && t_24^0==t_24^post_12 && t_32^0==t_32^post_12 && tp_33^0==tp_33^post_12 && x_134^0==x_134^post_12 && x_14^0==x_14^post_12 && x_17^0==x_17^post_12 && x_19^0==x_19^post_12 && x_21^0==x_21^post_12 && y_20^0==y_20^post_12 ], cost: 1 12: l10 -> l11 : a_123^0'=a_123^post_13, a_136^0'=a_136^post_13, a_76^0'=a_76^post_13, ct_18^0'=ct_18^post_13, h_15^0'=h_15^post_13, h_30^0'=h_30^post_13, i_115^0'=i_115^post_13, i_28^0'=i_28^post_13, i_98^0'=i_98^post_13, l_27^0'=l_27^post_13, nd_12^0'=nd_12^post_13, r_135^0'=r_135^post_13, r_37^0'=r_37^post_13, r_57^0'=r_57^post_13, r_92^0'=r_92^post_13, rt_11^0'=rt_11^post_13, rv_13^0'=rv_13^post_13, rv_31^0'=rv_31^post_13, st_16^0'=st_16^post_13, st_29^0'=st_29^post_13, t_24^0'=t_24^post_13, t_32^0'=t_32^post_13, tp_33^0'=tp_33^post_13, x_134^0'=x_134^post_13, x_14^0'=x_14^post_13, x_17^0'=x_17^post_13, x_19^0'=x_19^post_13, x_21^0'=x_21^post_13, y_20^0'=y_20^post_13, [ 1+x_21^0<=y_20^0 && a_123^0==a_123^post_13 && a_136^0==a_136^post_13 && a_76^0==a_76^post_13 && ct_18^0==ct_18^post_13 && h_15^0==h_15^post_13 && h_30^0==h_30^post_13 && i_115^0==i_115^post_13 && i_28^0==i_28^post_13 && i_98^0==i_98^post_13 && l_27^0==l_27^post_13 && nd_12^0==nd_12^post_13 && r_135^0==r_135^post_13 && r_37^0==r_37^post_13 && r_57^0==r_57^post_13 && r_92^0==r_92^post_13 && rt_11^0==rt_11^post_13 && rv_13^0==rv_13^post_13 && rv_31^0==rv_31^post_13 && st_16^0==st_16^post_13 && st_29^0==st_29^post_13 && t_24^0==t_24^post_13 && t_32^0==t_32^post_13 && tp_33^0==tp_33^post_13 && x_134^0==x_134^post_13 && x_14^0==x_14^post_13 && x_17^0==x_17^post_13 && x_19^0==x_19^post_13 && x_21^0==x_21^post_13 && y_20^0==y_20^post_13 ], cost: 1 13: l11 -> l12 : a_123^0'=a_123^post_14, a_136^0'=a_136^post_14, a_76^0'=a_76^post_14, ct_18^0'=ct_18^post_14, h_15^0'=h_15^post_14, h_30^0'=h_30^post_14, i_115^0'=i_115^post_14, i_28^0'=i_28^post_14, i_98^0'=i_98^post_14, l_27^0'=l_27^post_14, nd_12^0'=nd_12^post_14, r_135^0'=r_135^post_14, r_37^0'=r_37^post_14, r_57^0'=r_57^post_14, r_92^0'=r_92^post_14, rt_11^0'=rt_11^post_14, rv_13^0'=rv_13^post_14, rv_31^0'=rv_31^post_14, st_16^0'=st_16^post_14, st_29^0'=st_29^post_14, t_24^0'=t_24^post_14, t_32^0'=t_32^post_14, tp_33^0'=tp_33^post_14, x_134^0'=x_134^post_14, x_14^0'=x_14^post_14, x_17^0'=x_17^post_14, x_19^0'=x_19^post_14, x_21^0'=x_21^post_14, y_20^0'=y_20^post_14, [ t_24^post_14==x_21^0 && 0<=x_14^0 && x_14^0<=0 && 0<=ct_18^0 && ct_18^0<=0 && 0<=y_20^0 && y_20^0<=0 && 0<=x_21^0 && x_21^0<=0 && 1<=rv_13^0 && rv_13^0<=1 && h_15^0<=x_17^0 && x_17^0<=h_15^0 && h_15^0<=x_19^0 && x_19^0<=h_15^0 && h_15^0<=t_24^post_14 && t_24^post_14<=h_15^0 && x_17^0<=x_19^0 && x_19^0<=x_17^0 && ct_18^0<=y_20^0 && y_20^0<=ct_18^0 && a_123^0==a_123^post_14 && a_136^0==a_136^post_14 && a_76^0==a_76^post_14 && ct_18^0==ct_18^post_14 && h_15^0==h_15^post_14 && h_30^0==h_30^post_14 && i_115^0==i_115^post_14 && i_28^0==i_28^post_14 && i_98^0==i_98^post_14 && l_27^0==l_27^post_14 && nd_12^0==nd_12^post_14 && r_135^0==r_135^post_14 && r_37^0==r_37^post_14 && r_57^0==r_57^post_14 && r_92^0==r_92^post_14 && rt_11^0==rt_11^post_14 && rv_13^0==rv_13^post_14 && rv_31^0==rv_31^post_14 && st_16^0==st_16^post_14 && st_29^0==st_29^post_14 && t_32^0==t_32^post_14 && tp_33^0==tp_33^post_14 && x_134^0==x_134^post_14 && x_14^0==x_14^post_14 && x_17^0==x_17^post_14 && x_19^0==x_19^post_14 && x_21^0==x_21^post_14 && y_20^0==y_20^post_14 ], cost: 1 14: l12 -> l13 : a_123^0'=a_123^post_15, a_136^0'=a_136^post_15, a_76^0'=a_76^post_15, ct_18^0'=ct_18^post_15, h_15^0'=h_15^post_15, h_30^0'=h_30^post_15, i_115^0'=i_115^post_15, i_28^0'=i_28^post_15, i_98^0'=i_98^post_15, l_27^0'=l_27^post_15, nd_12^0'=nd_12^post_15, r_135^0'=r_135^post_15, r_37^0'=r_37^post_15, r_57^0'=r_57^post_15, r_92^0'=r_92^post_15, rt_11^0'=rt_11^post_15, rv_13^0'=rv_13^post_15, rv_31^0'=rv_31^post_15, st_16^0'=st_16^post_15, st_29^0'=st_29^post_15, t_24^0'=t_24^post_15, t_32^0'=t_32^post_15, tp_33^0'=tp_33^post_15, x_134^0'=x_134^post_15, x_14^0'=x_14^post_15, x_17^0'=x_17^post_15, x_19^0'=x_19^post_15, x_21^0'=x_21^post_15, y_20^0'=y_20^post_15, [ 1<=h_15^0 && a_123^0==a_123^post_15 && a_136^0==a_136^post_15 && a_76^0==a_76^post_15 && ct_18^0==ct_18^post_15 && h_15^0==h_15^post_15 && h_30^0==h_30^post_15 && i_115^0==i_115^post_15 && i_28^0==i_28^post_15 && i_98^0==i_98^post_15 && l_27^0==l_27^post_15 && nd_12^0==nd_12^post_15 && r_135^0==r_135^post_15 && r_37^0==r_37^post_15 && r_57^0==r_57^post_15 && r_92^0==r_92^post_15 && rt_11^0==rt_11^post_15 && rv_13^0==rv_13^post_15 && rv_31^0==rv_31^post_15 && st_16^0==st_16^post_15 && st_29^0==st_29^post_15 && t_24^0==t_24^post_15 && t_32^0==t_32^post_15 && tp_33^0==tp_33^post_15 && x_134^0==x_134^post_15 && x_14^0==x_14^post_15 && x_17^0==x_17^post_15 && x_19^0==x_19^post_15 && x_21^0==x_21^post_15 && y_20^0==y_20^post_15 ], cost: 1 15: l12 -> l13 : a_123^0'=a_123^post_16, a_136^0'=a_136^post_16, a_76^0'=a_76^post_16, ct_18^0'=ct_18^post_16, h_15^0'=h_15^post_16, h_30^0'=h_30^post_16, i_115^0'=i_115^post_16, i_28^0'=i_28^post_16, i_98^0'=i_98^post_16, l_27^0'=l_27^post_16, nd_12^0'=nd_12^post_16, r_135^0'=r_135^post_16, r_37^0'=r_37^post_16, r_57^0'=r_57^post_16, r_92^0'=r_92^post_16, rt_11^0'=rt_11^post_16, rv_13^0'=rv_13^post_16, rv_31^0'=rv_31^post_16, st_16^0'=st_16^post_16, st_29^0'=st_29^post_16, t_24^0'=t_24^post_16, t_32^0'=t_32^post_16, tp_33^0'=tp_33^post_16, x_134^0'=x_134^post_16, x_14^0'=x_14^post_16, x_17^0'=x_17^post_16, x_19^0'=x_19^post_16, x_21^0'=x_21^post_16, y_20^0'=y_20^post_16, [ 1+h_15^0<=0 && a_123^0==a_123^post_16 && a_136^0==a_136^post_16 && a_76^0==a_76^post_16 && ct_18^0==ct_18^post_16 && h_15^0==h_15^post_16 && h_30^0==h_30^post_16 && i_115^0==i_115^post_16 && i_28^0==i_28^post_16 && i_98^0==i_98^post_16 && l_27^0==l_27^post_16 && nd_12^0==nd_12^post_16 && r_135^0==r_135^post_16 && r_37^0==r_37^post_16 && r_57^0==r_57^post_16 && r_92^0==r_92^post_16 && rt_11^0==rt_11^post_16 && rv_13^0==rv_13^post_16 && rv_31^0==rv_31^post_16 && st_16^0==st_16^post_16 && st_29^0==st_29^post_16 && t_24^0==t_24^post_16 && t_32^0==t_32^post_16 && tp_33^0==tp_33^post_16 && x_134^0==x_134^post_16 && x_14^0==x_14^post_16 && x_17^0==x_17^post_16 && x_19^0==x_19^post_16 && x_21^0==x_21^post_16 && y_20^0==y_20^post_16 ], cost: 1 16: l13 -> l14 : a_123^0'=a_123^post_17, a_136^0'=a_136^post_17, a_76^0'=a_76^post_17, ct_18^0'=ct_18^post_17, h_15^0'=h_15^post_17, h_30^0'=h_30^post_17, i_115^0'=i_115^post_17, i_28^0'=i_28^post_17, i_98^0'=i_98^post_17, l_27^0'=l_27^post_17, nd_12^0'=nd_12^post_17, r_135^0'=r_135^post_17, r_37^0'=r_37^post_17, r_57^0'=r_57^post_17, r_92^0'=r_92^post_17, rt_11^0'=rt_11^post_17, rv_13^0'=rv_13^post_17, rv_31^0'=rv_31^post_17, st_16^0'=st_16^post_17, st_29^0'=st_29^post_17, t_24^0'=t_24^post_17, t_32^0'=t_32^post_17, tp_33^0'=tp_33^post_17, x_134^0'=x_134^post_17, x_14^0'=x_14^post_17, x_17^0'=x_17^post_17, x_19^0'=x_19^post_17, x_21^0'=x_21^post_17, y_20^0'=y_20^post_17, [ 1+h_15^0<=y_20^0 && a_123^0==a_123^post_17 && a_136^0==a_136^post_17 && a_76^0==a_76^post_17 && ct_18^0==ct_18^post_17 && h_15^0==h_15^post_17 && h_30^0==h_30^post_17 && i_115^0==i_115^post_17 && i_28^0==i_28^post_17 && i_98^0==i_98^post_17 && l_27^0==l_27^post_17 && nd_12^0==nd_12^post_17 && r_135^0==r_135^post_17 && r_37^0==r_37^post_17 && r_57^0==r_57^post_17 && r_92^0==r_92^post_17 && rt_11^0==rt_11^post_17 && rv_13^0==rv_13^post_17 && rv_31^0==rv_31^post_17 && st_16^0==st_16^post_17 && st_29^0==st_29^post_17 && t_24^0==t_24^post_17 && t_32^0==t_32^post_17 && tp_33^0==tp_33^post_17 && x_134^0==x_134^post_17 && x_14^0==x_14^post_17 && x_17^0==x_17^post_17 && x_19^0==x_19^post_17 && x_21^0==x_21^post_17 && y_20^0==y_20^post_17 ], cost: 1 17: l13 -> l14 : a_123^0'=a_123^post_18, a_136^0'=a_136^post_18, a_76^0'=a_76^post_18, ct_18^0'=ct_18^post_18, h_15^0'=h_15^post_18, h_30^0'=h_30^post_18, i_115^0'=i_115^post_18, i_28^0'=i_28^post_18, i_98^0'=i_98^post_18, l_27^0'=l_27^post_18, nd_12^0'=nd_12^post_18, r_135^0'=r_135^post_18, r_37^0'=r_37^post_18, r_57^0'=r_57^post_18, r_92^0'=r_92^post_18, rt_11^0'=rt_11^post_18, rv_13^0'=rv_13^post_18, rv_31^0'=rv_31^post_18, st_16^0'=st_16^post_18, st_29^0'=st_29^post_18, t_24^0'=t_24^post_18, t_32^0'=t_32^post_18, tp_33^0'=tp_33^post_18, x_134^0'=x_134^post_18, x_14^0'=x_14^post_18, x_17^0'=x_17^post_18, x_19^0'=x_19^post_18, x_21^0'=x_21^post_18, y_20^0'=y_20^post_18, [ 1+y_20^0<=h_15^0 && a_123^0==a_123^post_18 && a_136^0==a_136^post_18 && a_76^0==a_76^post_18 && ct_18^0==ct_18^post_18 && h_15^0==h_15^post_18 && h_30^0==h_30^post_18 && i_115^0==i_115^post_18 && i_28^0==i_28^post_18 && i_98^0==i_98^post_18 && l_27^0==l_27^post_18 && nd_12^0==nd_12^post_18 && r_135^0==r_135^post_18 && r_37^0==r_37^post_18 && r_57^0==r_57^post_18 && r_92^0==r_92^post_18 && rt_11^0==rt_11^post_18 && rv_13^0==rv_13^post_18 && rv_31^0==rv_31^post_18 && st_16^0==st_16^post_18 && st_29^0==st_29^post_18 && t_24^0==t_24^post_18 && t_32^0==t_32^post_18 && tp_33^0==tp_33^post_18 && x_134^0==x_134^post_18 && x_14^0==x_14^post_18 && x_17^0==x_17^post_18 && x_19^0==x_19^post_18 && x_21^0==x_21^post_18 && y_20^0==y_20^post_18 ], cost: 1 18: l14 -> l15 : a_123^0'=a_123^post_19, a_136^0'=a_136^post_19, a_76^0'=a_76^post_19, ct_18^0'=ct_18^post_19, h_15^0'=h_15^post_19, h_30^0'=h_30^post_19, i_115^0'=i_115^post_19, i_28^0'=i_28^post_19, i_98^0'=i_98^post_19, l_27^0'=l_27^post_19, nd_12^0'=nd_12^post_19, r_135^0'=r_135^post_19, r_37^0'=r_37^post_19, r_57^0'=r_57^post_19, r_92^0'=r_92^post_19, rt_11^0'=rt_11^post_19, rv_13^0'=rv_13^post_19, rv_31^0'=rv_31^post_19, st_16^0'=st_16^post_19, st_29^0'=st_29^post_19, t_24^0'=t_24^post_19, t_32^0'=t_32^post_19, tp_33^0'=tp_33^post_19, x_134^0'=x_134^post_19, x_14^0'=x_14^post_19, x_17^0'=x_17^post_19, x_19^0'=x_19^post_19, x_21^0'=x_21^post_19, y_20^0'=y_20^post_19, [ 1<=rv_13^0 && rv_13^0<=1 && h_15^post_19==h_15^post_19 && y_20^0<=x_21^0 && x_21^0<=y_20^0 && x_19^1_1==x_19^1_1 && y_20^1_1==y_20^1_1 && x_21^1_1==x_21^1_1 && t_24^1_1==t_24^1_1 && ct_18^1_1==ct_18^1_1 && x_17^post_19==x_17^post_19 && ct_18^post_19==ct_18^post_19 && x_19^post_19==x_19^post_19 && y_20^post_19==y_20^post_19 && x_21^post_19==x_21^post_19 && t_24^post_19==t_24^post_19 && rt_11^post_19==st_16^0 && a_123^0==a_123^post_19 && a_136^0==a_136^post_19 && a_76^0==a_76^post_19 && h_30^0==h_30^post_19 && i_115^0==i_115^post_19 && i_28^0==i_28^post_19 && i_98^0==i_98^post_19 && l_27^0==l_27^post_19 && nd_12^0==nd_12^post_19 && r_135^0==r_135^post_19 && r_37^0==r_37^post_19 && r_57^0==r_57^post_19 && r_92^0==r_92^post_19 && rv_13^0==rv_13^post_19 && rv_31^0==rv_31^post_19 && st_16^0==st_16^post_19 && st_29^0==st_29^post_19 && t_32^0==t_32^post_19 && tp_33^0==tp_33^post_19 && x_134^0==x_134^post_19 && x_14^0==x_14^post_19 ], cost: 1 19: l15 -> l3 : a_123^0'=a_123^post_20, a_136^0'=a_136^post_20, a_76^0'=a_76^post_20, ct_18^0'=ct_18^post_20, h_15^0'=h_15^post_20, h_30^0'=h_30^post_20, i_115^0'=i_115^post_20, i_28^0'=i_28^post_20, i_98^0'=i_98^post_20, l_27^0'=l_27^post_20, nd_12^0'=nd_12^post_20, r_135^0'=r_135^post_20, r_37^0'=r_37^post_20, r_57^0'=r_57^post_20, r_92^0'=r_92^post_20, rt_11^0'=rt_11^post_20, rv_13^0'=rv_13^post_20, rv_31^0'=rv_31^post_20, st_16^0'=st_16^post_20, st_29^0'=st_29^post_20, t_24^0'=t_24^post_20, t_32^0'=t_32^post_20, tp_33^0'=tp_33^post_20, x_134^0'=x_134^post_20, x_14^0'=x_14^post_20, x_17^0'=x_17^post_20, x_19^0'=x_19^post_20, x_21^0'=x_21^post_20, y_20^0'=y_20^post_20, [ 1<=h_15^0 && a_123^0==a_123^post_20 && a_136^0==a_136^post_20 && a_76^0==a_76^post_20 && ct_18^0==ct_18^post_20 && h_15^0==h_15^post_20 && h_30^0==h_30^post_20 && i_115^0==i_115^post_20 && i_28^0==i_28^post_20 && i_98^0==i_98^post_20 && l_27^0==l_27^post_20 && nd_12^0==nd_12^post_20 && r_135^0==r_135^post_20 && r_37^0==r_37^post_20 && r_57^0==r_57^post_20 && r_92^0==r_92^post_20 && rt_11^0==rt_11^post_20 && rv_13^0==rv_13^post_20 && rv_31^0==rv_31^post_20 && st_16^0==st_16^post_20 && st_29^0==st_29^post_20 && t_24^0==t_24^post_20 && t_32^0==t_32^post_20 && tp_33^0==tp_33^post_20 && x_134^0==x_134^post_20 && x_14^0==x_14^post_20 && x_17^0==x_17^post_20 && x_19^0==x_19^post_20 && x_21^0==x_21^post_20 && y_20^0==y_20^post_20 ], cost: 1 20: l15 -> l3 : a_123^0'=a_123^post_21, a_136^0'=a_136^post_21, a_76^0'=a_76^post_21, ct_18^0'=ct_18^post_21, h_15^0'=h_15^post_21, h_30^0'=h_30^post_21, i_115^0'=i_115^post_21, i_28^0'=i_28^post_21, i_98^0'=i_98^post_21, l_27^0'=l_27^post_21, nd_12^0'=nd_12^post_21, r_135^0'=r_135^post_21, r_37^0'=r_37^post_21, r_57^0'=r_57^post_21, r_92^0'=r_92^post_21, rt_11^0'=rt_11^post_21, rv_13^0'=rv_13^post_21, rv_31^0'=rv_31^post_21, st_16^0'=st_16^post_21, st_29^0'=st_29^post_21, t_24^0'=t_24^post_21, t_32^0'=t_32^post_21, tp_33^0'=tp_33^post_21, x_134^0'=x_134^post_21, x_14^0'=x_14^post_21, x_17^0'=x_17^post_21, x_19^0'=x_19^post_21, x_21^0'=x_21^post_21, y_20^0'=y_20^post_21, [ 1+h_15^0<=0 && a_123^0==a_123^post_21 && a_136^0==a_136^post_21 && a_76^0==a_76^post_21 && ct_18^0==ct_18^post_21 && h_15^0==h_15^post_21 && h_30^0==h_30^post_21 && i_115^0==i_115^post_21 && i_28^0==i_28^post_21 && i_98^0==i_98^post_21 && l_27^0==l_27^post_21 && nd_12^0==nd_12^post_21 && r_135^0==r_135^post_21 && r_37^0==r_37^post_21 && r_57^0==r_57^post_21 && r_92^0==r_92^post_21 && rt_11^0==rt_11^post_21 && rv_13^0==rv_13^post_21 && rv_31^0==rv_31^post_21 && st_16^0==st_16^post_21 && st_29^0==st_29^post_21 && t_24^0==t_24^post_21 && t_32^0==t_32^post_21 && tp_33^0==tp_33^post_21 && x_134^0==x_134^post_21 && x_14^0==x_14^post_21 && x_17^0==x_17^post_21 && x_19^0==x_19^post_21 && x_21^0==x_21^post_21 && y_20^0==y_20^post_21 ], cost: 1 44: l16 -> l31 : a_123^0'=a_123^post_45, a_136^0'=a_136^post_45, a_76^0'=a_76^post_45, ct_18^0'=ct_18^post_45, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=i_98^post_45, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_45, r_135^0'=r_135^post_45, r_37^0'=r_37^post_45, r_57^0'=r_57^post_45, r_92^0'=r_92^post_45, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_16^0'=st_16^post_45, st_29^0'=st_29^post_45, t_24^0'=t_24^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_134^0'=x_134^post_45, x_14^0'=x_14^post_45, x_17^0'=x_17^post_45, x_19^0'=x_19^post_45, x_21^0'=x_21^post_45, y_20^0'=y_20^post_45, [ 0<=i_28^0 && rv_13^1_2_1==rv_13^1_2_1 && l_27^0<=i_28^0 && st_29^1_2_1==h_30^0 && rt_11^1_2_1==st_29^1_2_1 && l_27^post_45==l_27^post_45 && i_28^post_45==i_28^post_45 && st_29^post_45==st_29^post_45 && h_30^post_45==h_30^post_45 && rv_31^post_45==rv_31^post_45 && t_32^post_45==t_32^post_45 && tp_33^post_45==tp_33^post_45 && h_15^1_2==rt_11^1_2_1 && rt_11^post_45==rt_11^post_45 && x_14^post_45==h_15^1_2 && x_14^post_45<=h_15^1_2 && h_15^1_2<=x_14^post_45 && 1<=rv_13^1_2_1 && 2<=rv_13^1_2_1 && rv_13^1_2_1<=i_28^post_45 && 0<=i_28^post_45 && rv_13^post_45==rv_13^post_45 && h_15^post_45==h_15^post_45 && i_115^post_45==i_115^post_45 && a_123^0==a_123^post_45 && a_136^0==a_136^post_45 && a_76^0==a_76^post_45 && ct_18^0==ct_18^post_45 && i_98^0==i_98^post_45 && nd_12^0==nd_12^post_45 && r_135^0==r_135^post_45 && r_37^0==r_37^post_45 && r_57^0==r_57^post_45 && r_92^0==r_92^post_45 && st_16^0==st_16^post_45 && t_24^0==t_24^post_45 && x_134^0==x_134^post_45 && x_17^0==x_17^post_45 && x_19^0==x_19^post_45 && x_21^0==x_21^post_45 && y_20^0==y_20^post_45 ], cost: 1 50: l16 -> l34 : a_123^0'=a_123^post_51, a_136^0'=a_136^post_51, a_76^0'=a_76^post_51, ct_18^0'=ct_18^post_51, h_15^0'=h_15^post_51, h_30^0'=h_30^post_51, i_115^0'=i_115^post_51, i_28^0'=i_28^post_51, i_98^0'=i_98^post_51, l_27^0'=l_27^post_51, nd_12^0'=nd_12^post_51, r_135^0'=r_135^post_51, r_37^0'=r_37^post_51, r_57^0'=r_57^post_51, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_51, rv_13^0'=rv_13^post_51, rv_31^0'=rv_31^post_51, st_16^0'=st_16^post_51, st_29^0'=st_29^post_51, t_24^0'=t_24^post_51, t_32^0'=t_32^post_51, tp_33^0'=tp_33^post_51, x_134^0'=x_134^post_51, x_14^0'=x_14^post_51, x_17^0'=x_17^post_51, x_19^0'=x_19^post_51, x_21^0'=x_21^post_51, y_20^0'=y_20^post_51, [ 0<=i_28^0 && r_92^post_51==r_92^post_51 && i_98^post_51==i_98^post_51 && 1+i_28^0<=l_27^0 && t_32^post_51==tp_33^0 && tp_33^post_51==tp_33^post_51 && h_30^post_51==t_32^post_51 && i_28^post_51==1+i_28^0 && i_28^post_51<=1+i_98^post_51 && 1+i_98^post_51<=i_28^post_51 && i_98^post_51<=-1+i_28^post_51 && -1+i_28^post_51<=i_98^post_51 && 1+i_98^post_51<=l_27^0 && a_123^0==a_123^post_51 && a_136^0==a_136^post_51 && a_76^0==a_76^post_51 && ct_18^0==ct_18^post_51 && h_15^0==h_15^post_51 && i_115^0==i_115^post_51 && l_27^0==l_27^post_51 && nd_12^0==nd_12^post_51 && r_135^0==r_135^post_51 && r_37^0==r_37^post_51 && r_57^0==r_57^post_51 && rt_11^0==rt_11^post_51 && rv_13^0==rv_13^post_51 && rv_31^0==rv_31^post_51 && st_16^0==st_16^post_51 && st_29^0==st_29^post_51 && t_24^0==t_24^post_51 && x_134^0==x_134^post_51 && x_14^0==x_14^post_51 && x_17^0==x_17^post_51 && x_19^0==x_19^post_51 && x_21^0==x_21^post_51 && y_20^0==y_20^post_51 ], cost: 1 22: l17 -> l18 : a_123^0'=a_123^post_23, a_136^0'=a_136^post_23, a_76^0'=a_76^post_23, ct_18^0'=ct_18^post_23, h_15^0'=h_15^post_23, h_30^0'=h_30^post_23, i_115^0'=i_115^post_23, i_28^0'=i_28^post_23, i_98^0'=i_98^post_23, l_27^0'=l_27^post_23, nd_12^0'=nd_12^post_23, r_135^0'=r_135^post_23, r_37^0'=r_37^post_23, r_57^0'=r_57^post_23, r_92^0'=r_92^post_23, rt_11^0'=rt_11^post_23, rv_13^0'=rv_13^post_23, rv_31^0'=rv_31^post_23, st_16^0'=st_16^post_23, st_29^0'=st_29^post_23, t_24^0'=t_24^post_23, t_32^0'=t_32^post_23, tp_33^0'=tp_33^post_23, x_134^0'=x_134^post_23, x_14^0'=x_14^post_23, x_17^0'=x_17^post_23, x_19^0'=x_19^post_23, x_21^0'=x_21^post_23, y_20^0'=y_20^post_23, [ 0<=a_123^0 && rv_13^post_23==rv_13^post_23 && 0<=x_14^0 && x_14^0<=0 && x_17^post_23==h_15^0 && ct_18^post_23==0 && x_19^post_23==x_17^post_23 && y_20^post_23==ct_18^post_23 && x_21^post_23==x_19^post_23 && 0<=x_14^0 && x_14^0<=0 && 0<=ct_18^post_23 && ct_18^post_23<=0 && 0<=y_20^post_23 && y_20^post_23<=0 && h_15^0<=x_17^post_23 && x_17^post_23<=h_15^0 && h_15^0<=x_19^post_23 && x_19^post_23<=h_15^0 && h_15^0<=x_21^post_23 && x_21^post_23<=h_15^0 && x_17^post_23<=x_19^post_23 && x_19^post_23<=x_17^post_23 && ct_18^post_23<=y_20^post_23 && y_20^post_23<=ct_18^post_23 && x_19^post_23<=x_21^post_23 && x_21^post_23<=x_19^post_23 && a_123^0==a_123^post_23 && a_136^0==a_136^post_23 && a_76^0==a_76^post_23 && h_15^0==h_15^post_23 && h_30^0==h_30^post_23 && i_115^0==i_115^post_23 && i_28^0==i_28^post_23 && i_98^0==i_98^post_23 && l_27^0==l_27^post_23 && nd_12^0==nd_12^post_23 && r_135^0==r_135^post_23 && r_37^0==r_37^post_23 && r_57^0==r_57^post_23 && r_92^0==r_92^post_23 && rt_11^0==rt_11^post_23 && rv_31^0==rv_31^post_23 && st_16^0==st_16^post_23 && st_29^0==st_29^post_23 && t_24^0==t_24^post_23 && t_32^0==t_32^post_23 && tp_33^0==tp_33^post_23 && x_134^0==x_134^post_23 && x_14^0==x_14^post_23 ], cost: 1 34: l17 -> l26 : a_123^0'=a_123^post_35, a_136^0'=a_136^post_35, a_76^0'=a_76^post_35, ct_18^0'=ct_18^post_35, h_15^0'=h_15^post_35, h_30^0'=h_30^post_35, i_115^0'=i_115^post_35, i_28^0'=i_28^post_35, i_98^0'=i_98^post_35, l_27^0'=l_27^post_35, nd_12^0'=nd_12^post_35, r_135^0'=r_135^post_35, r_37^0'=r_37^post_35, r_57^0'=r_57^post_35, r_92^0'=r_92^post_35, rt_11^0'=rt_11^post_35, rv_13^0'=rv_13^post_35, rv_31^0'=rv_31^post_35, st_16^0'=st_16^post_35, st_29^0'=st_29^post_35, t_24^0'=t_24^post_35, t_32^0'=t_32^post_35, tp_33^0'=tp_33^post_35, x_134^0'=x_134^post_35, x_14^0'=x_14^post_35, x_17^0'=x_17^post_35, x_19^0'=x_19^post_35, x_21^0'=x_21^post_35, y_20^0'=y_20^post_35, [ 0<=a_123^0 && rv_13^post_35==rv_13^post_35 && h_15^post_35==h_15^post_35 && x_134^post_35==x_134^post_35 && a_123^0==a_123^post_35 && a_136^0==a_136^post_35 && a_76^0==a_76^post_35 && ct_18^0==ct_18^post_35 && h_30^0==h_30^post_35 && i_115^0==i_115^post_35 && i_28^0==i_28^post_35 && i_98^0==i_98^post_35 && l_27^0==l_27^post_35 && nd_12^0==nd_12^post_35 && r_135^0==r_135^post_35 && r_37^0==r_37^post_35 && r_57^0==r_57^post_35 && r_92^0==r_92^post_35 && rt_11^0==rt_11^post_35 && rv_31^0==rv_31^post_35 && st_16^0==st_16^post_35 && st_29^0==st_29^post_35 && t_24^0==t_24^post_35 && t_32^0==t_32^post_35 && tp_33^0==tp_33^post_35 && x_14^0==x_14^post_35 && x_17^0==x_17^post_35 && x_19^0==x_19^post_35 && x_21^0==x_21^post_35 && y_20^0==y_20^post_35 ], cost: 1 23: l18 -> l19 : a_123^0'=a_123^post_24, a_136^0'=a_136^post_24, a_76^0'=a_76^post_24, ct_18^0'=ct_18^post_24, h_15^0'=h_15^post_24, h_30^0'=h_30^post_24, i_115^0'=i_115^post_24, i_28^0'=i_28^post_24, i_98^0'=i_98^post_24, l_27^0'=l_27^post_24, nd_12^0'=nd_12^post_24, r_135^0'=r_135^post_24, r_37^0'=r_37^post_24, r_57^0'=r_57^post_24, r_92^0'=r_92^post_24, rt_11^0'=rt_11^post_24, rv_13^0'=rv_13^post_24, rv_31^0'=rv_31^post_24, st_16^0'=st_16^post_24, st_29^0'=st_29^post_24, t_24^0'=t_24^post_24, t_32^0'=t_32^post_24, tp_33^0'=tp_33^post_24, x_134^0'=x_134^post_24, x_14^0'=x_14^post_24, x_17^0'=x_17^post_24, x_19^0'=x_19^post_24, x_21^0'=x_21^post_24, y_20^0'=y_20^post_24, [ 1<=h_15^0 && a_123^0==a_123^post_24 && a_136^0==a_136^post_24 && a_76^0==a_76^post_24 && ct_18^0==ct_18^post_24 && h_15^0==h_15^post_24 && h_30^0==h_30^post_24 && i_115^0==i_115^post_24 && i_28^0==i_28^post_24 && i_98^0==i_98^post_24 && l_27^0==l_27^post_24 && nd_12^0==nd_12^post_24 && r_135^0==r_135^post_24 && r_37^0==r_37^post_24 && r_57^0==r_57^post_24 && r_92^0==r_92^post_24 && rt_11^0==rt_11^post_24 && rv_13^0==rv_13^post_24 && rv_31^0==rv_31^post_24 && st_16^0==st_16^post_24 && st_29^0==st_29^post_24 && t_24^0==t_24^post_24 && t_32^0==t_32^post_24 && tp_33^0==tp_33^post_24 && x_134^0==x_134^post_24 && x_14^0==x_14^post_24 && x_17^0==x_17^post_24 && x_19^0==x_19^post_24 && x_21^0==x_21^post_24 && y_20^0==y_20^post_24 ], cost: 1 24: l18 -> l19 : a_123^0'=a_123^post_25, a_136^0'=a_136^post_25, a_76^0'=a_76^post_25, ct_18^0'=ct_18^post_25, h_15^0'=h_15^post_25, h_30^0'=h_30^post_25, i_115^0'=i_115^post_25, i_28^0'=i_28^post_25, i_98^0'=i_98^post_25, l_27^0'=l_27^post_25, nd_12^0'=nd_12^post_25, r_135^0'=r_135^post_25, r_37^0'=r_37^post_25, r_57^0'=r_57^post_25, r_92^0'=r_92^post_25, rt_11^0'=rt_11^post_25, rv_13^0'=rv_13^post_25, rv_31^0'=rv_31^post_25, st_16^0'=st_16^post_25, st_29^0'=st_29^post_25, t_24^0'=t_24^post_25, t_32^0'=t_32^post_25, tp_33^0'=tp_33^post_25, x_134^0'=x_134^post_25, x_14^0'=x_14^post_25, x_17^0'=x_17^post_25, x_19^0'=x_19^post_25, x_21^0'=x_21^post_25, y_20^0'=y_20^post_25, [ 1+h_15^0<=0 && a_123^0==a_123^post_25 && a_136^0==a_136^post_25 && a_76^0==a_76^post_25 && ct_18^0==ct_18^post_25 && h_15^0==h_15^post_25 && h_30^0==h_30^post_25 && i_115^0==i_115^post_25 && i_28^0==i_28^post_25 && i_98^0==i_98^post_25 && l_27^0==l_27^post_25 && nd_12^0==nd_12^post_25 && r_135^0==r_135^post_25 && r_37^0==r_37^post_25 && r_57^0==r_57^post_25 && r_92^0==r_92^post_25 && rt_11^0==rt_11^post_25 && rv_13^0==rv_13^post_25 && rv_31^0==rv_31^post_25 && st_16^0==st_16^post_25 && st_29^0==st_29^post_25 && t_24^0==t_24^post_25 && t_32^0==t_32^post_25 && tp_33^0==tp_33^post_25 && x_134^0==x_134^post_25 && x_14^0==x_14^post_25 && x_17^0==x_17^post_25 && x_19^0==x_19^post_25 && x_21^0==x_21^post_25 && y_20^0==y_20^post_25 ], cost: 1 25: l19 -> l20 : a_123^0'=a_123^post_26, a_136^0'=a_136^post_26, a_76^0'=a_76^post_26, ct_18^0'=ct_18^post_26, h_15^0'=h_15^post_26, h_30^0'=h_30^post_26, i_115^0'=i_115^post_26, i_28^0'=i_28^post_26, i_98^0'=i_98^post_26, l_27^0'=l_27^post_26, nd_12^0'=nd_12^post_26, r_135^0'=r_135^post_26, r_37^0'=r_37^post_26, r_57^0'=r_57^post_26, r_92^0'=r_92^post_26, rt_11^0'=rt_11^post_26, rv_13^0'=rv_13^post_26, rv_31^0'=rv_31^post_26, st_16^0'=st_16^post_26, st_29^0'=st_29^post_26, t_24^0'=t_24^post_26, t_32^0'=t_32^post_26, tp_33^0'=tp_33^post_26, x_134^0'=x_134^post_26, x_14^0'=x_14^post_26, x_17^0'=x_17^post_26, x_19^0'=x_19^post_26, x_21^0'=x_21^post_26, y_20^0'=y_20^post_26, [ 1<=rv_13^0 && 2<=rv_13^0 && rv_13^post_26==rv_13^post_26 && x_14^post_26==x_14^post_26 && h_15^post_26==h_15^post_26 && x_17^post_26==x_17^post_26 && ct_18^post_26==ct_18^post_26 && x_19^post_26==x_19^post_26 && a_123^0==a_123^post_26 && a_136^0==a_136^post_26 && a_76^0==a_76^post_26 && h_30^0==h_30^post_26 && i_115^0==i_115^post_26 && i_28^0==i_28^post_26 && i_98^0==i_98^post_26 && l_27^0==l_27^post_26 && nd_12^0==nd_12^post_26 && r_135^0==r_135^post_26 && r_37^0==r_37^post_26 && r_57^0==r_57^post_26 && r_92^0==r_92^post_26 && rt_11^0==rt_11^post_26 && rv_31^0==rv_31^post_26 && st_16^0==st_16^post_26 && st_29^0==st_29^post_26 && t_24^0==t_24^post_26 && t_32^0==t_32^post_26 && tp_33^0==tp_33^post_26 && x_134^0==x_134^post_26 && x_21^0==x_21^post_26 && y_20^0==y_20^post_26 ], cost: 1 26: l20 -> l21 : a_123^0'=a_123^post_27, a_136^0'=a_136^post_27, a_76^0'=a_76^post_27, ct_18^0'=ct_18^post_27, h_15^0'=h_15^post_27, h_30^0'=h_30^post_27, i_115^0'=i_115^post_27, i_28^0'=i_28^post_27, i_98^0'=i_98^post_27, l_27^0'=l_27^post_27, nd_12^0'=nd_12^post_27, r_135^0'=r_135^post_27, r_37^0'=r_37^post_27, r_57^0'=r_57^post_27, r_92^0'=r_92^post_27, rt_11^0'=rt_11^post_27, rv_13^0'=rv_13^post_27, rv_31^0'=rv_31^post_27, st_16^0'=st_16^post_27, st_29^0'=st_29^post_27, t_24^0'=t_24^post_27, t_32^0'=t_32^post_27, tp_33^0'=tp_33^post_27, x_134^0'=x_134^post_27, x_14^0'=x_14^post_27, x_17^0'=x_17^post_27, x_19^0'=x_19^post_27, x_21^0'=x_21^post_27, y_20^0'=y_20^post_27, [ 1+y_20^0<=x_21^0 && a_123^0==a_123^post_27 && a_136^0==a_136^post_27 && a_76^0==a_76^post_27 && ct_18^0==ct_18^post_27 && h_15^0==h_15^post_27 && h_30^0==h_30^post_27 && i_115^0==i_115^post_27 && i_28^0==i_28^post_27 && i_98^0==i_98^post_27 && l_27^0==l_27^post_27 && nd_12^0==nd_12^post_27 && r_135^0==r_135^post_27 && r_37^0==r_37^post_27 && r_57^0==r_57^post_27 && r_92^0==r_92^post_27 && rt_11^0==rt_11^post_27 && rv_13^0==rv_13^post_27 && rv_31^0==rv_31^post_27 && st_16^0==st_16^post_27 && st_29^0==st_29^post_27 && t_24^0==t_24^post_27 && t_32^0==t_32^post_27 && tp_33^0==tp_33^post_27 && x_134^0==x_134^post_27 && x_14^0==x_14^post_27 && x_17^0==x_17^post_27 && x_19^0==x_19^post_27 && x_21^0==x_21^post_27 && y_20^0==y_20^post_27 ], cost: 1 27: l20 -> l21 : a_123^0'=a_123^post_28, a_136^0'=a_136^post_28, a_76^0'=a_76^post_28, ct_18^0'=ct_18^post_28, h_15^0'=h_15^post_28, h_30^0'=h_30^post_28, i_115^0'=i_115^post_28, i_28^0'=i_28^post_28, i_98^0'=i_98^post_28, l_27^0'=l_27^post_28, nd_12^0'=nd_12^post_28, r_135^0'=r_135^post_28, r_37^0'=r_37^post_28, r_57^0'=r_57^post_28, r_92^0'=r_92^post_28, rt_11^0'=rt_11^post_28, rv_13^0'=rv_13^post_28, rv_31^0'=rv_31^post_28, st_16^0'=st_16^post_28, st_29^0'=st_29^post_28, t_24^0'=t_24^post_28, t_32^0'=t_32^post_28, tp_33^0'=tp_33^post_28, x_134^0'=x_134^post_28, x_14^0'=x_14^post_28, x_17^0'=x_17^post_28, x_19^0'=x_19^post_28, x_21^0'=x_21^post_28, y_20^0'=y_20^post_28, [ 1+x_21^0<=y_20^0 && a_123^0==a_123^post_28 && a_136^0==a_136^post_28 && a_76^0==a_76^post_28 && ct_18^0==ct_18^post_28 && h_15^0==h_15^post_28 && h_30^0==h_30^post_28 && i_115^0==i_115^post_28 && i_28^0==i_28^post_28 && i_98^0==i_98^post_28 && l_27^0==l_27^post_28 && nd_12^0==nd_12^post_28 && r_135^0==r_135^post_28 && r_37^0==r_37^post_28 && r_57^0==r_57^post_28 && r_92^0==r_92^post_28 && rt_11^0==rt_11^post_28 && rv_13^0==rv_13^post_28 && rv_31^0==rv_31^post_28 && st_16^0==st_16^post_28 && st_29^0==st_29^post_28 && t_24^0==t_24^post_28 && t_32^0==t_32^post_28 && tp_33^0==tp_33^post_28 && x_134^0==x_134^post_28 && x_14^0==x_14^post_28 && x_17^0==x_17^post_28 && x_19^0==x_19^post_28 && x_21^0==x_21^post_28 && y_20^0==y_20^post_28 ], cost: 1 28: l21 -> l22 : a_123^0'=a_123^post_29, a_136^0'=a_136^post_29, a_76^0'=a_76^post_29, ct_18^0'=ct_18^post_29, h_15^0'=h_15^post_29, h_30^0'=h_30^post_29, i_115^0'=i_115^post_29, i_28^0'=i_28^post_29, i_98^0'=i_98^post_29, l_27^0'=l_27^post_29, nd_12^0'=nd_12^post_29, r_135^0'=r_135^post_29, r_37^0'=r_37^post_29, r_57^0'=r_57^post_29, r_92^0'=r_92^post_29, rt_11^0'=rt_11^post_29, rv_13^0'=rv_13^post_29, rv_31^0'=rv_31^post_29, st_16^0'=st_16^post_29, st_29^0'=st_29^post_29, t_24^0'=t_24^post_29, t_32^0'=t_32^post_29, tp_33^0'=tp_33^post_29, x_134^0'=x_134^post_29, x_14^0'=x_14^post_29, x_17^0'=x_17^post_29, x_19^0'=x_19^post_29, x_21^0'=x_21^post_29, y_20^0'=y_20^post_29, [ t_24^post_29==x_21^0 && 0<=x_14^0 && x_14^0<=0 && 0<=ct_18^0 && ct_18^0<=0 && 0<=y_20^0 && y_20^0<=0 && 0<=x_21^0 && x_21^0<=0 && h_15^0<=x_17^0 && x_17^0<=h_15^0 && h_15^0<=x_19^0 && x_19^0<=h_15^0 && h_15^0<=t_24^post_29 && t_24^post_29<=h_15^0 && x_17^0<=x_19^0 && x_19^0<=x_17^0 && ct_18^0<=y_20^0 && y_20^0<=ct_18^0 && a_123^0==a_123^post_29 && a_136^0==a_136^post_29 && a_76^0==a_76^post_29 && ct_18^0==ct_18^post_29 && h_15^0==h_15^post_29 && h_30^0==h_30^post_29 && i_115^0==i_115^post_29 && i_28^0==i_28^post_29 && i_98^0==i_98^post_29 && l_27^0==l_27^post_29 && nd_12^0==nd_12^post_29 && r_135^0==r_135^post_29 && r_37^0==r_37^post_29 && r_57^0==r_57^post_29 && r_92^0==r_92^post_29 && rt_11^0==rt_11^post_29 && rv_13^0==rv_13^post_29 && rv_31^0==rv_31^post_29 && st_16^0==st_16^post_29 && st_29^0==st_29^post_29 && t_32^0==t_32^post_29 && tp_33^0==tp_33^post_29 && x_134^0==x_134^post_29 && x_14^0==x_14^post_29 && x_17^0==x_17^post_29 && x_19^0==x_19^post_29 && x_21^0==x_21^post_29 && y_20^0==y_20^post_29 ], cost: 1 29: l22 -> l23 : a_123^0'=a_123^post_30, a_136^0'=a_136^post_30, a_76^0'=a_76^post_30, ct_18^0'=ct_18^post_30, h_15^0'=h_15^post_30, h_30^0'=h_30^post_30, i_115^0'=i_115^post_30, i_28^0'=i_28^post_30, i_98^0'=i_98^post_30, l_27^0'=l_27^post_30, nd_12^0'=nd_12^post_30, r_135^0'=r_135^post_30, r_37^0'=r_37^post_30, r_57^0'=r_57^post_30, r_92^0'=r_92^post_30, rt_11^0'=rt_11^post_30, rv_13^0'=rv_13^post_30, rv_31^0'=rv_31^post_30, st_16^0'=st_16^post_30, st_29^0'=st_29^post_30, t_24^0'=t_24^post_30, t_32^0'=t_32^post_30, tp_33^0'=tp_33^post_30, x_134^0'=x_134^post_30, x_14^0'=x_14^post_30, x_17^0'=x_17^post_30, x_19^0'=x_19^post_30, x_21^0'=x_21^post_30, y_20^0'=y_20^post_30, [ 1<=h_15^0 && a_123^0==a_123^post_30 && a_136^0==a_136^post_30 && a_76^0==a_76^post_30 && ct_18^0==ct_18^post_30 && h_15^0==h_15^post_30 && h_30^0==h_30^post_30 && i_115^0==i_115^post_30 && i_28^0==i_28^post_30 && i_98^0==i_98^post_30 && l_27^0==l_27^post_30 && nd_12^0==nd_12^post_30 && r_135^0==r_135^post_30 && r_37^0==r_37^post_30 && r_57^0==r_57^post_30 && r_92^0==r_92^post_30 && rt_11^0==rt_11^post_30 && rv_13^0==rv_13^post_30 && rv_31^0==rv_31^post_30 && st_16^0==st_16^post_30 && st_29^0==st_29^post_30 && t_24^0==t_24^post_30 && t_32^0==t_32^post_30 && tp_33^0==tp_33^post_30 && x_134^0==x_134^post_30 && x_14^0==x_14^post_30 && x_17^0==x_17^post_30 && x_19^0==x_19^post_30 && x_21^0==x_21^post_30 && y_20^0==y_20^post_30 ], cost: 1 30: l22 -> l23 : a_123^0'=a_123^post_31, a_136^0'=a_136^post_31, a_76^0'=a_76^post_31, ct_18^0'=ct_18^post_31, h_15^0'=h_15^post_31, h_30^0'=h_30^post_31, i_115^0'=i_115^post_31, i_28^0'=i_28^post_31, i_98^0'=i_98^post_31, l_27^0'=l_27^post_31, nd_12^0'=nd_12^post_31, r_135^0'=r_135^post_31, r_37^0'=r_37^post_31, r_57^0'=r_57^post_31, r_92^0'=r_92^post_31, rt_11^0'=rt_11^post_31, rv_13^0'=rv_13^post_31, rv_31^0'=rv_31^post_31, st_16^0'=st_16^post_31, st_29^0'=st_29^post_31, t_24^0'=t_24^post_31, t_32^0'=t_32^post_31, tp_33^0'=tp_33^post_31, x_134^0'=x_134^post_31, x_14^0'=x_14^post_31, x_17^0'=x_17^post_31, x_19^0'=x_19^post_31, x_21^0'=x_21^post_31, y_20^0'=y_20^post_31, [ 1+h_15^0<=0 && a_123^0==a_123^post_31 && a_136^0==a_136^post_31 && a_76^0==a_76^post_31 && ct_18^0==ct_18^post_31 && h_15^0==h_15^post_31 && h_30^0==h_30^post_31 && i_115^0==i_115^post_31 && i_28^0==i_28^post_31 && i_98^0==i_98^post_31 && l_27^0==l_27^post_31 && nd_12^0==nd_12^post_31 && r_135^0==r_135^post_31 && r_37^0==r_37^post_31 && r_57^0==r_57^post_31 && r_92^0==r_92^post_31 && rt_11^0==rt_11^post_31 && rv_13^0==rv_13^post_31 && rv_31^0==rv_31^post_31 && st_16^0==st_16^post_31 && st_29^0==st_29^post_31 && t_24^0==t_24^post_31 && t_32^0==t_32^post_31 && tp_33^0==tp_33^post_31 && x_134^0==x_134^post_31 && x_14^0==x_14^post_31 && x_17^0==x_17^post_31 && x_19^0==x_19^post_31 && x_21^0==x_21^post_31 && y_20^0==y_20^post_31 ], cost: 1 31: l23 -> l24 : a_123^0'=a_123^post_32, a_136^0'=a_136^post_32, a_76^0'=a_76^post_32, ct_18^0'=ct_18^post_32, h_15^0'=h_15^post_32, h_30^0'=h_30^post_32, i_115^0'=i_115^post_32, i_28^0'=i_28^post_32, i_98^0'=i_98^post_32, l_27^0'=l_27^post_32, nd_12^0'=nd_12^post_32, r_135^0'=r_135^post_32, r_37^0'=r_37^post_32, r_57^0'=r_57^post_32, r_92^0'=r_92^post_32, rt_11^0'=rt_11^post_32, rv_13^0'=rv_13^post_32, rv_31^0'=rv_31^post_32, st_16^0'=st_16^post_32, st_29^0'=st_29^post_32, t_24^0'=t_24^post_32, t_32^0'=t_32^post_32, tp_33^0'=tp_33^post_32, x_134^0'=x_134^post_32, x_14^0'=x_14^post_32, x_17^0'=x_17^post_32, x_19^0'=x_19^post_32, x_21^0'=x_21^post_32, y_20^0'=y_20^post_32, [ 1+h_15^0<=y_20^0 && a_123^0==a_123^post_32 && a_136^0==a_136^post_32 && a_76^0==a_76^post_32 && ct_18^0==ct_18^post_32 && h_15^0==h_15^post_32 && h_30^0==h_30^post_32 && i_115^0==i_115^post_32 && i_28^0==i_28^post_32 && i_98^0==i_98^post_32 && l_27^0==l_27^post_32 && nd_12^0==nd_12^post_32 && r_135^0==r_135^post_32 && r_37^0==r_37^post_32 && r_57^0==r_57^post_32 && r_92^0==r_92^post_32 && rt_11^0==rt_11^post_32 && rv_13^0==rv_13^post_32 && rv_31^0==rv_31^post_32 && st_16^0==st_16^post_32 && st_29^0==st_29^post_32 && t_24^0==t_24^post_32 && t_32^0==t_32^post_32 && tp_33^0==tp_33^post_32 && x_134^0==x_134^post_32 && x_14^0==x_14^post_32 && x_17^0==x_17^post_32 && x_19^0==x_19^post_32 && x_21^0==x_21^post_32 && y_20^0==y_20^post_32 ], cost: 1 32: l23 -> l24 : a_123^0'=a_123^post_33, a_136^0'=a_136^post_33, a_76^0'=a_76^post_33, ct_18^0'=ct_18^post_33, h_15^0'=h_15^post_33, h_30^0'=h_30^post_33, i_115^0'=i_115^post_33, i_28^0'=i_28^post_33, i_98^0'=i_98^post_33, l_27^0'=l_27^post_33, nd_12^0'=nd_12^post_33, r_135^0'=r_135^post_33, r_37^0'=r_37^post_33, r_57^0'=r_57^post_33, r_92^0'=r_92^post_33, rt_11^0'=rt_11^post_33, rv_13^0'=rv_13^post_33, rv_31^0'=rv_31^post_33, st_16^0'=st_16^post_33, st_29^0'=st_29^post_33, t_24^0'=t_24^post_33, t_32^0'=t_32^post_33, tp_33^0'=tp_33^post_33, x_134^0'=x_134^post_33, x_14^0'=x_14^post_33, x_17^0'=x_17^post_33, x_19^0'=x_19^post_33, x_21^0'=x_21^post_33, y_20^0'=y_20^post_33, [ 1+y_20^0<=h_15^0 && a_123^0==a_123^post_33 && a_136^0==a_136^post_33 && a_76^0==a_76^post_33 && ct_18^0==ct_18^post_33 && h_15^0==h_15^post_33 && h_30^0==h_30^post_33 && i_115^0==i_115^post_33 && i_28^0==i_28^post_33 && i_98^0==i_98^post_33 && l_27^0==l_27^post_33 && nd_12^0==nd_12^post_33 && r_135^0==r_135^post_33 && r_37^0==r_37^post_33 && r_57^0==r_57^post_33 && r_92^0==r_92^post_33 && rt_11^0==rt_11^post_33 && rv_13^0==rv_13^post_33 && rv_31^0==rv_31^post_33 && st_16^0==st_16^post_33 && st_29^0==st_29^post_33 && t_24^0==t_24^post_33 && t_32^0==t_32^post_33 && tp_33^0==tp_33^post_33 && x_134^0==x_134^post_33 && x_14^0==x_14^post_33 && x_17^0==x_17^post_33 && x_19^0==x_19^post_33 && x_21^0==x_21^post_33 && y_20^0==y_20^post_33 ], cost: 1 33: l24 -> l3 : a_123^0'=a_123^post_34, a_136^0'=a_136^post_34, a_76^0'=a_76^post_34, ct_18^0'=ct_18^post_34, h_15^0'=h_15^post_34, h_30^0'=h_30^post_34, i_115^0'=i_115^post_34, i_28^0'=i_28^post_34, i_98^0'=i_98^post_34, l_27^0'=l_27^post_34, nd_12^0'=nd_12^post_34, r_135^0'=r_135^post_34, r_37^0'=r_37^post_34, r_57^0'=r_57^post_34, r_92^0'=r_92^post_34, rt_11^0'=rt_11^post_34, rv_13^0'=rv_13^post_34, rv_31^0'=rv_31^post_34, st_16^0'=st_16^post_34, st_29^0'=st_29^post_34, t_24^0'=t_24^post_34, t_32^0'=t_32^post_34, tp_33^0'=tp_33^post_34, x_134^0'=x_134^post_34, x_14^0'=x_14^post_34, x_17^0'=x_17^post_34, x_19^0'=x_19^post_34, x_21^0'=x_21^post_34, y_20^0'=y_20^post_34, [ 1<=rv_13^0 && 2<=rv_13^0 && rv_13^post_34==rv_13^post_34 && y_20^0<=x_21^0 && x_21^0<=y_20^0 && x_19^1_2_1==x_19^1_2_1 && y_20^1_2_1==y_20^1_2_1 && x_21^1_2_1==x_21^1_2_1 && t_24^1_2_1==t_24^1_2_1 && ct_18^1_2==ct_18^1_2 && x_17^post_34==x_17^post_34 && ct_18^post_34==ct_18^post_34 && x_19^post_34==x_19^post_34 && y_20^post_34==y_20^post_34 && x_21^post_34==x_21^post_34 && t_24^post_34==t_24^post_34 && rt_11^post_34==st_16^0 && 1<=rv_13^post_34 && 2<=rv_13^post_34 && a_123^0==a_123^post_34 && a_136^0==a_136^post_34 && a_76^0==a_76^post_34 && h_15^0==h_15^post_34 && h_30^0==h_30^post_34 && i_115^0==i_115^post_34 && i_28^0==i_28^post_34 && i_98^0==i_98^post_34 && l_27^0==l_27^post_34 && nd_12^0==nd_12^post_34 && r_135^0==r_135^post_34 && r_37^0==r_37^post_34 && r_57^0==r_57^post_34 && r_92^0==r_92^post_34 && rv_31^0==rv_31^post_34 && st_16^0==st_16^post_34 && st_29^0==st_29^post_34 && t_32^0==t_32^post_34 && tp_33^0==tp_33^post_34 && x_134^0==x_134^post_34 && x_14^0==x_14^post_34 ], cost: 1 35: l26 -> l27 : a_123^0'=a_123^post_36, a_136^0'=a_136^post_36, a_76^0'=a_76^post_36, ct_18^0'=ct_18^post_36, h_15^0'=h_15^post_36, h_30^0'=h_30^post_36, i_115^0'=i_115^post_36, i_28^0'=i_28^post_36, i_98^0'=i_98^post_36, l_27^0'=l_27^post_36, nd_12^0'=nd_12^post_36, r_135^0'=r_135^post_36, r_37^0'=r_37^post_36, r_57^0'=r_57^post_36, r_92^0'=r_92^post_36, rt_11^0'=rt_11^post_36, rv_13^0'=rv_13^post_36, rv_31^0'=rv_31^post_36, st_16^0'=st_16^post_36, st_29^0'=st_29^post_36, t_24^0'=t_24^post_36, t_32^0'=t_32^post_36, tp_33^0'=tp_33^post_36, x_134^0'=x_134^post_36, x_14^0'=x_14^post_36, x_17^0'=x_17^post_36, x_19^0'=x_19^post_36, x_21^0'=x_21^post_36, y_20^0'=y_20^post_36, [ 1<=x_14^0 && a_123^0==a_123^post_36 && a_136^0==a_136^post_36 && a_76^0==a_76^post_36 && ct_18^0==ct_18^post_36 && h_15^0==h_15^post_36 && h_30^0==h_30^post_36 && i_115^0==i_115^post_36 && i_28^0==i_28^post_36 && i_98^0==i_98^post_36 && l_27^0==l_27^post_36 && nd_12^0==nd_12^post_36 && r_135^0==r_135^post_36 && r_37^0==r_37^post_36 && r_57^0==r_57^post_36 && r_92^0==r_92^post_36 && rt_11^0==rt_11^post_36 && rv_13^0==rv_13^post_36 && rv_31^0==rv_31^post_36 && st_16^0==st_16^post_36 && st_29^0==st_29^post_36 && t_24^0==t_24^post_36 && t_32^0==t_32^post_36 && tp_33^0==tp_33^post_36 && x_134^0==x_134^post_36 && x_14^0==x_14^post_36 && x_17^0==x_17^post_36 && x_19^0==x_19^post_36 && x_21^0==x_21^post_36 && y_20^0==y_20^post_36 ], cost: 1 36: l26 -> l27 : a_123^0'=a_123^post_37, a_136^0'=a_136^post_37, a_76^0'=a_76^post_37, ct_18^0'=ct_18^post_37, h_15^0'=h_15^post_37, h_30^0'=h_30^post_37, i_115^0'=i_115^post_37, i_28^0'=i_28^post_37, i_98^0'=i_98^post_37, l_27^0'=l_27^post_37, nd_12^0'=nd_12^post_37, r_135^0'=r_135^post_37, r_37^0'=r_37^post_37, r_57^0'=r_57^post_37, r_92^0'=r_92^post_37, rt_11^0'=rt_11^post_37, rv_13^0'=rv_13^post_37, rv_31^0'=rv_31^post_37, st_16^0'=st_16^post_37, st_29^0'=st_29^post_37, t_24^0'=t_24^post_37, t_32^0'=t_32^post_37, tp_33^0'=tp_33^post_37, x_134^0'=x_134^post_37, x_14^0'=x_14^post_37, x_17^0'=x_17^post_37, x_19^0'=x_19^post_37, x_21^0'=x_21^post_37, y_20^0'=y_20^post_37, [ 1+x_14^0<=0 && a_123^0==a_123^post_37 && a_136^0==a_136^post_37 && a_76^0==a_76^post_37 && ct_18^0==ct_18^post_37 && h_15^0==h_15^post_37 && h_30^0==h_30^post_37 && i_115^0==i_115^post_37 && i_28^0==i_28^post_37 && i_98^0==i_98^post_37 && l_27^0==l_27^post_37 && nd_12^0==nd_12^post_37 && r_135^0==r_135^post_37 && r_37^0==r_37^post_37 && r_57^0==r_57^post_37 && r_92^0==r_92^post_37 && rt_11^0==rt_11^post_37 && rv_13^0==rv_13^post_37 && rv_31^0==rv_31^post_37 && st_16^0==st_16^post_37 && st_29^0==st_29^post_37 && t_24^0==t_24^post_37 && t_32^0==t_32^post_37 && tp_33^0==tp_33^post_37 && x_134^0==x_134^post_37 && x_14^0==x_14^post_37 && x_17^0==x_17^post_37 && x_19^0==x_19^post_37 && x_21^0==x_21^post_37 && y_20^0==y_20^post_37 ], cost: 1 37: l27 -> l28 : a_123^0'=a_123^post_38, a_136^0'=a_136^post_38, a_76^0'=a_76^post_38, ct_18^0'=ct_18^post_38, h_15^0'=h_15^post_38, h_30^0'=h_30^post_38, i_115^0'=i_115^post_38, i_28^0'=i_28^post_38, i_98^0'=i_98^post_38, l_27^0'=l_27^post_38, nd_12^0'=nd_12^post_38, r_135^0'=r_135^post_38, r_37^0'=r_37^post_38, r_57^0'=r_57^post_38, r_92^0'=r_92^post_38, rt_11^0'=rt_11^post_38, rv_13^0'=rv_13^post_38, rv_31^0'=rv_31^post_38, st_16^0'=st_16^post_38, st_29^0'=st_29^post_38, t_24^0'=t_24^post_38, t_32^0'=t_32^post_38, tp_33^0'=tp_33^post_38, x_134^0'=x_134^post_38, x_14^0'=x_14^post_38, x_17^0'=x_17^post_38, x_19^0'=x_19^post_38, x_21^0'=x_21^post_38, y_20^0'=y_20^post_38, [ r_135^post_38==r_135^post_38 && a_136^post_38==a_136^post_38 && 0<=a_136^post_38-a_123^0 && a_136^post_38-a_123^0<=0 && x_14^0<=x_134^0 && x_134^0<=x_14^0 && a_123^0<=a_136^post_38 && a_136^post_38<=a_123^0 && r_37^0<=r_135^post_38 && r_135^post_38<=r_37^0 && a_123^0==a_123^post_38 && a_76^0==a_76^post_38 && ct_18^0==ct_18^post_38 && h_15^0==h_15^post_38 && h_30^0==h_30^post_38 && i_115^0==i_115^post_38 && i_28^0==i_28^post_38 && i_98^0==i_98^post_38 && l_27^0==l_27^post_38 && nd_12^0==nd_12^post_38 && r_37^0==r_37^post_38 && r_57^0==r_57^post_38 && r_92^0==r_92^post_38 && rt_11^0==rt_11^post_38 && rv_13^0==rv_13^post_38 && rv_31^0==rv_31^post_38 && st_16^0==st_16^post_38 && st_29^0==st_29^post_38 && t_24^0==t_24^post_38 && t_32^0==t_32^post_38 && tp_33^0==tp_33^post_38 && x_134^0==x_134^post_38 && x_14^0==x_14^post_38 && x_17^0==x_17^post_38 && x_19^0==x_19^post_38 && x_21^0==x_21^post_38 && y_20^0==y_20^post_38 ], cost: 1 38: l28 -> l29 : a_123^0'=a_123^post_39, a_136^0'=a_136^post_39, a_76^0'=a_76^post_39, ct_18^0'=ct_18^post_39, h_15^0'=h_15^post_39, h_30^0'=h_30^post_39, i_115^0'=i_115^post_39, i_28^0'=i_28^post_39, i_98^0'=i_98^post_39, l_27^0'=l_27^post_39, nd_12^0'=nd_12^post_39, r_135^0'=r_135^post_39, r_37^0'=r_37^post_39, r_57^0'=r_57^post_39, r_92^0'=r_92^post_39, rt_11^0'=rt_11^post_39, rv_13^0'=rv_13^post_39, rv_31^0'=rv_31^post_39, st_16^0'=st_16^post_39, st_29^0'=st_29^post_39, t_24^0'=t_24^post_39, t_32^0'=t_32^post_39, tp_33^0'=tp_33^post_39, x_134^0'=x_134^post_39, x_14^0'=x_14^post_39, x_17^0'=x_17^post_39, x_19^0'=x_19^post_39, x_21^0'=x_21^post_39, y_20^0'=y_20^post_39, [ 1<=h_15^0 && a_123^0==a_123^post_39 && a_136^0==a_136^post_39 && a_76^0==a_76^post_39 && ct_18^0==ct_18^post_39 && h_15^0==h_15^post_39 && h_30^0==h_30^post_39 && i_115^0==i_115^post_39 && i_28^0==i_28^post_39 && i_98^0==i_98^post_39 && l_27^0==l_27^post_39 && nd_12^0==nd_12^post_39 && r_135^0==r_135^post_39 && r_37^0==r_37^post_39 && r_57^0==r_57^post_39 && r_92^0==r_92^post_39 && rt_11^0==rt_11^post_39 && rv_13^0==rv_13^post_39 && rv_31^0==rv_31^post_39 && st_16^0==st_16^post_39 && st_29^0==st_29^post_39 && t_24^0==t_24^post_39 && t_32^0==t_32^post_39 && tp_33^0==tp_33^post_39 && x_134^0==x_134^post_39 && x_14^0==x_14^post_39 && x_17^0==x_17^post_39 && x_19^0==x_19^post_39 && x_21^0==x_21^post_39 && y_20^0==y_20^post_39 ], cost: 1 39: l28 -> l29 : a_123^0'=a_123^post_40, a_136^0'=a_136^post_40, a_76^0'=a_76^post_40, ct_18^0'=ct_18^post_40, h_15^0'=h_15^post_40, h_30^0'=h_30^post_40, i_115^0'=i_115^post_40, i_28^0'=i_28^post_40, i_98^0'=i_98^post_40, l_27^0'=l_27^post_40, nd_12^0'=nd_12^post_40, r_135^0'=r_135^post_40, r_37^0'=r_37^post_40, r_57^0'=r_57^post_40, r_92^0'=r_92^post_40, rt_11^0'=rt_11^post_40, rv_13^0'=rv_13^post_40, rv_31^0'=rv_31^post_40, st_16^0'=st_16^post_40, st_29^0'=st_29^post_40, t_24^0'=t_24^post_40, t_32^0'=t_32^post_40, tp_33^0'=tp_33^post_40, x_134^0'=x_134^post_40, x_14^0'=x_14^post_40, x_17^0'=x_17^post_40, x_19^0'=x_19^post_40, x_21^0'=x_21^post_40, y_20^0'=y_20^post_40, [ 1+h_15^0<=0 && a_123^0==a_123^post_40 && a_136^0==a_136^post_40 && a_76^0==a_76^post_40 && ct_18^0==ct_18^post_40 && h_15^0==h_15^post_40 && h_30^0==h_30^post_40 && i_115^0==i_115^post_40 && i_28^0==i_28^post_40 && i_98^0==i_98^post_40 && l_27^0==l_27^post_40 && nd_12^0==nd_12^post_40 && r_135^0==r_135^post_40 && r_37^0==r_37^post_40 && r_57^0==r_57^post_40 && r_92^0==r_92^post_40 && rt_11^0==rt_11^post_40 && rv_13^0==rv_13^post_40 && rv_31^0==rv_31^post_40 && st_16^0==st_16^post_40 && st_29^0==st_29^post_40 && t_24^0==t_24^post_40 && t_32^0==t_32^post_40 && tp_33^0==tp_33^post_40 && x_134^0==x_134^post_40 && x_14^0==x_14^post_40 && x_17^0==x_17^post_40 && x_19^0==x_19^post_40 && x_21^0==x_21^post_40 && y_20^0==y_20^post_40 ], cost: 1 40: l29 -> l30 : a_123^0'=a_123^post_41, a_136^0'=a_136^post_41, a_76^0'=a_76^post_41, ct_18^0'=ct_18^post_41, h_15^0'=h_15^post_41, h_30^0'=h_30^post_41, i_115^0'=i_115^post_41, i_28^0'=i_28^post_41, i_98^0'=i_98^post_41, l_27^0'=l_27^post_41, nd_12^0'=nd_12^post_41, r_135^0'=r_135^post_41, r_37^0'=r_37^post_41, r_57^0'=r_57^post_41, r_92^0'=r_92^post_41, rt_11^0'=rt_11^post_41, rv_13^0'=rv_13^post_41, rv_31^0'=rv_31^post_41, st_16^0'=st_16^post_41, st_29^0'=st_29^post_41, t_24^0'=t_24^post_41, t_32^0'=t_32^post_41, tp_33^0'=tp_33^post_41, x_134^0'=x_134^post_41, x_14^0'=x_14^post_41, x_17^0'=x_17^post_41, x_19^0'=x_19^post_41, x_21^0'=x_21^post_41, y_20^0'=y_20^post_41, [ 1<=x_134^0 && a_123^0==a_123^post_41 && a_136^0==a_136^post_41 && a_76^0==a_76^post_41 && ct_18^0==ct_18^post_41 && h_15^0==h_15^post_41 && h_30^0==h_30^post_41 && i_115^0==i_115^post_41 && i_28^0==i_28^post_41 && i_98^0==i_98^post_41 && l_27^0==l_27^post_41 && nd_12^0==nd_12^post_41 && r_135^0==r_135^post_41 && r_37^0==r_37^post_41 && r_57^0==r_57^post_41 && r_92^0==r_92^post_41 && rt_11^0==rt_11^post_41 && rv_13^0==rv_13^post_41 && rv_31^0==rv_31^post_41 && st_16^0==st_16^post_41 && st_29^0==st_29^post_41 && t_24^0==t_24^post_41 && t_32^0==t_32^post_41 && tp_33^0==tp_33^post_41 && x_134^0==x_134^post_41 && x_14^0==x_14^post_41 && x_17^0==x_17^post_41 && x_19^0==x_19^post_41 && x_21^0==x_21^post_41 && y_20^0==y_20^post_41 ], cost: 1 41: l29 -> l30 : a_123^0'=a_123^post_42, a_136^0'=a_136^post_42, a_76^0'=a_76^post_42, ct_18^0'=ct_18^post_42, h_15^0'=h_15^post_42, h_30^0'=h_30^post_42, i_115^0'=i_115^post_42, i_28^0'=i_28^post_42, i_98^0'=i_98^post_42, l_27^0'=l_27^post_42, nd_12^0'=nd_12^post_42, r_135^0'=r_135^post_42, r_37^0'=r_37^post_42, r_57^0'=r_57^post_42, r_92^0'=r_92^post_42, rt_11^0'=rt_11^post_42, rv_13^0'=rv_13^post_42, rv_31^0'=rv_31^post_42, st_16^0'=st_16^post_42, st_29^0'=st_29^post_42, t_24^0'=t_24^post_42, t_32^0'=t_32^post_42, tp_33^0'=tp_33^post_42, x_134^0'=x_134^post_42, x_14^0'=x_14^post_42, x_17^0'=x_17^post_42, x_19^0'=x_19^post_42, x_21^0'=x_21^post_42, y_20^0'=y_20^post_42, [ 1+x_134^0<=0 && a_123^0==a_123^post_42 && a_136^0==a_136^post_42 && a_76^0==a_76^post_42 && ct_18^0==ct_18^post_42 && h_15^0==h_15^post_42 && h_30^0==h_30^post_42 && i_115^0==i_115^post_42 && i_28^0==i_28^post_42 && i_98^0==i_98^post_42 && l_27^0==l_27^post_42 && nd_12^0==nd_12^post_42 && r_135^0==r_135^post_42 && r_37^0==r_37^post_42 && r_57^0==r_57^post_42 && r_92^0==r_92^post_42 && rt_11^0==rt_11^post_42 && rv_13^0==rv_13^post_42 && rv_31^0==rv_31^post_42 && st_16^0==st_16^post_42 && st_29^0==st_29^post_42 && t_24^0==t_24^post_42 && t_32^0==t_32^post_42 && tp_33^0==tp_33^post_42 && x_134^0==x_134^post_42 && x_14^0==x_14^post_42 && x_17^0==x_17^post_42 && x_19^0==x_19^post_42 && x_21^0==x_21^post_42 && y_20^0==y_20^post_42 ], cost: 1 42: l30 -> l25 : a_123^0'=a_123^post_43, a_136^0'=a_136^post_43, a_76^0'=a_76^post_43, ct_18^0'=ct_18^post_43, h_15^0'=h_15^post_43, h_30^0'=h_30^post_43, i_115^0'=i_115^post_43, i_28^0'=i_28^post_43, i_98^0'=i_98^post_43, l_27^0'=l_27^post_43, nd_12^0'=nd_12^post_43, r_135^0'=r_135^post_43, r_37^0'=r_37^post_43, r_57^0'=r_57^post_43, r_92^0'=r_92^post_43, rt_11^0'=rt_11^post_43, rv_13^0'=rv_13^post_43, rv_31^0'=rv_31^post_43, st_16^0'=st_16^post_43, st_29^0'=st_29^post_43, t_24^0'=t_24^post_43, t_32^0'=t_32^post_43, tp_33^0'=tp_33^post_43, x_134^0'=x_134^post_43, x_14^0'=x_14^post_43, x_17^0'=x_17^post_43, x_19^0'=x_19^post_43, x_21^0'=x_21^post_43, y_20^0'=y_20^post_43, [ 1<=rv_13^0 && 2<=rv_13^0 && r_37^post_43==r_37^post_43 && r_37^post_43<=r_135^0 && r_135^0<=r_37^post_43 && a_123^post_43==a_123^post_43 && a_123^post_43<=a_136^0 && a_136^0<=a_123^post_43 && a_136^0==a_136^post_43 && a_76^0==a_76^post_43 && ct_18^0==ct_18^post_43 && h_15^0==h_15^post_43 && h_30^0==h_30^post_43 && i_115^0==i_115^post_43 && i_28^0==i_28^post_43 && i_98^0==i_98^post_43 && l_27^0==l_27^post_43 && nd_12^0==nd_12^post_43 && r_135^0==r_135^post_43 && r_57^0==r_57^post_43 && r_92^0==r_92^post_43 && rt_11^0==rt_11^post_43 && rv_13^0==rv_13^post_43 && rv_31^0==rv_31^post_43 && st_16^0==st_16^post_43 && st_29^0==st_29^post_43 && t_24^0==t_24^post_43 && t_32^0==t_32^post_43 && tp_33^0==tp_33^post_43 && x_134^0==x_134^post_43 && x_14^0==x_14^post_43 && x_17^0==x_17^post_43 && x_19^0==x_19^post_43 && x_21^0==x_21^post_43 && y_20^0==y_20^post_43 ], cost: 1 43: l25 -> l17 : a_123^0'=a_123^post_44, a_136^0'=a_136^post_44, a_76^0'=a_76^post_44, ct_18^0'=ct_18^post_44, h_15^0'=h_15^post_44, h_30^0'=h_30^post_44, i_115^0'=i_115^post_44, i_28^0'=i_28^post_44, i_98^0'=i_98^post_44, l_27^0'=l_27^post_44, nd_12^0'=nd_12^post_44, r_135^0'=r_135^post_44, r_37^0'=r_37^post_44, r_57^0'=r_57^post_44, r_92^0'=r_92^post_44, rt_11^0'=rt_11^post_44, rv_13^0'=rv_13^post_44, rv_31^0'=rv_31^post_44, st_16^0'=st_16^post_44, st_29^0'=st_29^post_44, t_24^0'=t_24^post_44, t_32^0'=t_32^post_44, tp_33^0'=tp_33^post_44, x_134^0'=x_134^post_44, x_14^0'=x_14^post_44, x_17^0'=x_17^post_44, x_19^0'=x_19^post_44, x_21^0'=x_21^post_44, y_20^0'=y_20^post_44, [ a_123^0==a_123^post_44 && a_136^0==a_136^post_44 && a_76^0==a_76^post_44 && ct_18^0==ct_18^post_44 && h_15^0==h_15^post_44 && h_30^0==h_30^post_44 && i_115^0==i_115^post_44 && i_28^0==i_28^post_44 && i_98^0==i_98^post_44 && l_27^0==l_27^post_44 && nd_12^0==nd_12^post_44 && r_135^0==r_135^post_44 && r_37^0==r_37^post_44 && r_57^0==r_57^post_44 && r_92^0==r_92^post_44 && rt_11^0==rt_11^post_44 && rv_13^0==rv_13^post_44 && rv_31^0==rv_31^post_44 && st_16^0==st_16^post_44 && st_29^0==st_29^post_44 && t_24^0==t_24^post_44 && t_32^0==t_32^post_44 && tp_33^0==tp_33^post_44 && x_134^0==x_134^post_44 && x_14^0==x_14^post_44 && x_17^0==x_17^post_44 && x_19^0==x_19^post_44 && x_21^0==x_21^post_44 && y_20^0==y_20^post_44 ], cost: 1 45: l31 -> l32 : a_123^0'=a_123^post_46, a_136^0'=a_136^post_46, a_76^0'=a_76^post_46, ct_18^0'=ct_18^post_46, h_15^0'=h_15^post_46, h_30^0'=h_30^post_46, i_115^0'=i_115^post_46, i_28^0'=i_28^post_46, i_98^0'=i_98^post_46, l_27^0'=l_27^post_46, nd_12^0'=nd_12^post_46, r_135^0'=r_135^post_46, r_37^0'=r_37^post_46, r_57^0'=r_57^post_46, r_92^0'=r_92^post_46, rt_11^0'=rt_11^post_46, rv_13^0'=rv_13^post_46, rv_31^0'=rv_31^post_46, st_16^0'=st_16^post_46, st_29^0'=st_29^post_46, t_24^0'=t_24^post_46, t_32^0'=t_32^post_46, tp_33^0'=tp_33^post_46, x_134^0'=x_134^post_46, x_14^0'=x_14^post_46, x_17^0'=x_17^post_46, x_19^0'=x_19^post_46, x_21^0'=x_21^post_46, y_20^0'=y_20^post_46, [ 1<=x_14^0 && a_123^0==a_123^post_46 && a_136^0==a_136^post_46 && a_76^0==a_76^post_46 && ct_18^0==ct_18^post_46 && h_15^0==h_15^post_46 && h_30^0==h_30^post_46 && i_115^0==i_115^post_46 && i_28^0==i_28^post_46 && i_98^0==i_98^post_46 && l_27^0==l_27^post_46 && nd_12^0==nd_12^post_46 && r_135^0==r_135^post_46 && r_37^0==r_37^post_46 && r_57^0==r_57^post_46 && r_92^0==r_92^post_46 && rt_11^0==rt_11^post_46 && rv_13^0==rv_13^post_46 && rv_31^0==rv_31^post_46 && st_16^0==st_16^post_46 && st_29^0==st_29^post_46 && t_24^0==t_24^post_46 && t_32^0==t_32^post_46 && tp_33^0==tp_33^post_46 && x_134^0==x_134^post_46 && x_14^0==x_14^post_46 && x_17^0==x_17^post_46 && x_19^0==x_19^post_46 && x_21^0==x_21^post_46 && y_20^0==y_20^post_46 ], cost: 1 46: l31 -> l32 : a_123^0'=a_123^post_47, a_136^0'=a_136^post_47, a_76^0'=a_76^post_47, ct_18^0'=ct_18^post_47, h_15^0'=h_15^post_47, h_30^0'=h_30^post_47, i_115^0'=i_115^post_47, i_28^0'=i_28^post_47, i_98^0'=i_98^post_47, l_27^0'=l_27^post_47, nd_12^0'=nd_12^post_47, r_135^0'=r_135^post_47, r_37^0'=r_37^post_47, r_57^0'=r_57^post_47, r_92^0'=r_92^post_47, rt_11^0'=rt_11^post_47, rv_13^0'=rv_13^post_47, rv_31^0'=rv_31^post_47, st_16^0'=st_16^post_47, st_29^0'=st_29^post_47, t_24^0'=t_24^post_47, t_32^0'=t_32^post_47, tp_33^0'=tp_33^post_47, x_134^0'=x_134^post_47, x_14^0'=x_14^post_47, x_17^0'=x_17^post_47, x_19^0'=x_19^post_47, x_21^0'=x_21^post_47, y_20^0'=y_20^post_47, [ 1+x_14^0<=0 && a_123^0==a_123^post_47 && a_136^0==a_136^post_47 && a_76^0==a_76^post_47 && ct_18^0==ct_18^post_47 && h_15^0==h_15^post_47 && h_30^0==h_30^post_47 && i_115^0==i_115^post_47 && i_28^0==i_28^post_47 && i_98^0==i_98^post_47 && l_27^0==l_27^post_47 && nd_12^0==nd_12^post_47 && r_135^0==r_135^post_47 && r_37^0==r_37^post_47 && r_57^0==r_57^post_47 && r_92^0==r_92^post_47 && rt_11^0==rt_11^post_47 && rv_13^0==rv_13^post_47 && rv_31^0==rv_31^post_47 && st_16^0==st_16^post_47 && st_29^0==st_29^post_47 && t_24^0==t_24^post_47 && t_32^0==t_32^post_47 && tp_33^0==tp_33^post_47 && x_134^0==x_134^post_47 && x_14^0==x_14^post_47 && x_17^0==x_17^post_47 && x_19^0==x_19^post_47 && x_21^0==x_21^post_47 && y_20^0==y_20^post_47 ], cost: 1 47: l32 -> l33 : a_123^0'=a_123^post_48, a_136^0'=a_136^post_48, a_76^0'=a_76^post_48, ct_18^0'=ct_18^post_48, h_15^0'=h_15^post_48, h_30^0'=h_30^post_48, i_115^0'=i_115^post_48, i_28^0'=i_28^post_48, i_98^0'=i_98^post_48, l_27^0'=l_27^post_48, nd_12^0'=nd_12^post_48, r_135^0'=r_135^post_48, r_37^0'=r_37^post_48, r_57^0'=r_57^post_48, r_92^0'=r_92^post_48, rt_11^0'=rt_11^post_48, rv_13^0'=rv_13^post_48, rv_31^0'=rv_31^post_48, st_16^0'=st_16^post_48, st_29^0'=st_29^post_48, t_24^0'=t_24^post_48, t_32^0'=t_32^post_48, tp_33^0'=tp_33^post_48, x_134^0'=x_134^post_48, x_14^0'=x_14^post_48, x_17^0'=x_17^post_48, x_19^0'=x_19^post_48, x_21^0'=x_21^post_48, y_20^0'=y_20^post_48, [ 1<=h_15^0 && a_123^0==a_123^post_48 && a_136^0==a_136^post_48 && a_76^0==a_76^post_48 && ct_18^0==ct_18^post_48 && h_15^0==h_15^post_48 && h_30^0==h_30^post_48 && i_115^0==i_115^post_48 && i_28^0==i_28^post_48 && i_98^0==i_98^post_48 && l_27^0==l_27^post_48 && nd_12^0==nd_12^post_48 && r_135^0==r_135^post_48 && r_37^0==r_37^post_48 && r_57^0==r_57^post_48 && r_92^0==r_92^post_48 && rt_11^0==rt_11^post_48 && rv_13^0==rv_13^post_48 && rv_31^0==rv_31^post_48 && st_16^0==st_16^post_48 && st_29^0==st_29^post_48 && t_24^0==t_24^post_48 && t_32^0==t_32^post_48 && tp_33^0==tp_33^post_48 && x_134^0==x_134^post_48 && x_14^0==x_14^post_48 && x_17^0==x_17^post_48 && x_19^0==x_19^post_48 && x_21^0==x_21^post_48 && y_20^0==y_20^post_48 ], cost: 1 48: l32 -> l33 : a_123^0'=a_123^post_49, a_136^0'=a_136^post_49, a_76^0'=a_76^post_49, ct_18^0'=ct_18^post_49, h_15^0'=h_15^post_49, h_30^0'=h_30^post_49, i_115^0'=i_115^post_49, i_28^0'=i_28^post_49, i_98^0'=i_98^post_49, l_27^0'=l_27^post_49, nd_12^0'=nd_12^post_49, r_135^0'=r_135^post_49, r_37^0'=r_37^post_49, r_57^0'=r_57^post_49, r_92^0'=r_92^post_49, rt_11^0'=rt_11^post_49, rv_13^0'=rv_13^post_49, rv_31^0'=rv_31^post_49, st_16^0'=st_16^post_49, st_29^0'=st_29^post_49, t_24^0'=t_24^post_49, t_32^0'=t_32^post_49, tp_33^0'=tp_33^post_49, x_134^0'=x_134^post_49, x_14^0'=x_14^post_49, x_17^0'=x_17^post_49, x_19^0'=x_19^post_49, x_21^0'=x_21^post_49, y_20^0'=y_20^post_49, [ 1+h_15^0<=0 && a_123^0==a_123^post_49 && a_136^0==a_136^post_49 && a_76^0==a_76^post_49 && ct_18^0==ct_18^post_49 && h_15^0==h_15^post_49 && h_30^0==h_30^post_49 && i_115^0==i_115^post_49 && i_28^0==i_28^post_49 && i_98^0==i_98^post_49 && l_27^0==l_27^post_49 && nd_12^0==nd_12^post_49 && r_135^0==r_135^post_49 && r_37^0==r_37^post_49 && r_57^0==r_57^post_49 && r_92^0==r_92^post_49 && rt_11^0==rt_11^post_49 && rv_13^0==rv_13^post_49 && rv_31^0==rv_31^post_49 && st_16^0==st_16^post_49 && st_29^0==st_29^post_49 && t_24^0==t_24^post_49 && t_32^0==t_32^post_49 && tp_33^0==tp_33^post_49 && x_134^0==x_134^post_49 && x_14^0==x_14^post_49 && x_17^0==x_17^post_49 && x_19^0==x_19^post_49 && x_21^0==x_21^post_49 && y_20^0==y_20^post_49 ], cost: 1 49: l33 -> l17 : a_123^0'=a_123^post_50, a_136^0'=a_136^post_50, a_76^0'=a_76^post_50, ct_18^0'=ct_18^post_50, h_15^0'=h_15^post_50, h_30^0'=h_30^post_50, i_115^0'=i_115^post_50, i_28^0'=i_28^post_50, i_98^0'=i_98^post_50, l_27^0'=l_27^post_50, nd_12^0'=nd_12^post_50, r_135^0'=r_135^post_50, r_37^0'=r_37^post_50, r_57^0'=r_57^post_50, r_92^0'=r_92^post_50, rt_11^0'=rt_11^post_50, rv_13^0'=rv_13^post_50, rv_31^0'=rv_31^post_50, st_16^0'=st_16^post_50, st_29^0'=st_29^post_50, t_24^0'=t_24^post_50, t_32^0'=t_32^post_50, tp_33^0'=tp_33^post_50, x_134^0'=x_134^post_50, x_14^0'=x_14^post_50, x_17^0'=x_17^post_50, x_19^0'=x_19^post_50, x_21^0'=x_21^post_50, y_20^0'=y_20^post_50, [ 1<=rv_13^0 && 2<=rv_13^0 && rv_13^0<=i_115^0 && a_123^0==a_123^post_50 && a_136^0==a_136^post_50 && a_76^0==a_76^post_50 && ct_18^0==ct_18^post_50 && h_15^0==h_15^post_50 && h_30^0==h_30^post_50 && i_115^0==i_115^post_50 && i_28^0==i_28^post_50 && i_98^0==i_98^post_50 && l_27^0==l_27^post_50 && nd_12^0==nd_12^post_50 && r_135^0==r_135^post_50 && r_37^0==r_37^post_50 && r_57^0==r_57^post_50 && r_92^0==r_92^post_50 && rt_11^0==rt_11^post_50 && rv_13^0==rv_13^post_50 && rv_31^0==rv_31^post_50 && st_16^0==st_16^post_50 && st_29^0==st_29^post_50 && t_24^0==t_24^post_50 && t_32^0==t_32^post_50 && tp_33^0==tp_33^post_50 && x_134^0==x_134^post_50 && x_14^0==x_14^post_50 && x_17^0==x_17^post_50 && x_19^0==x_19^post_50 && x_21^0==x_21^post_50 && y_20^0==y_20^post_50 ], cost: 1 51: l34 -> l16 : a_123^0'=a_123^post_52, a_136^0'=a_136^post_52, a_76^0'=a_76^post_52, ct_18^0'=ct_18^post_52, h_15^0'=h_15^post_52, h_30^0'=h_30^post_52, i_115^0'=i_115^post_52, i_28^0'=i_28^post_52, i_98^0'=i_98^post_52, l_27^0'=l_27^post_52, nd_12^0'=nd_12^post_52, r_135^0'=r_135^post_52, r_37^0'=r_37^post_52, r_57^0'=r_57^post_52, r_92^0'=r_92^post_52, rt_11^0'=rt_11^post_52, rv_13^0'=rv_13^post_52, rv_31^0'=rv_31^post_52, st_16^0'=st_16^post_52, st_29^0'=st_29^post_52, t_24^0'=t_24^post_52, t_32^0'=t_32^post_52, tp_33^0'=tp_33^post_52, x_134^0'=x_134^post_52, x_14^0'=x_14^post_52, x_17^0'=x_17^post_52, x_19^0'=x_19^post_52, x_21^0'=x_21^post_52, y_20^0'=y_20^post_52, [ a_123^0==a_123^post_52 && a_136^0==a_136^post_52 && a_76^0==a_76^post_52 && ct_18^0==ct_18^post_52 && h_15^0==h_15^post_52 && h_30^0==h_30^post_52 && i_115^0==i_115^post_52 && i_28^0==i_28^post_52 && i_98^0==i_98^post_52 && l_27^0==l_27^post_52 && nd_12^0==nd_12^post_52 && r_135^0==r_135^post_52 && r_37^0==r_37^post_52 && r_57^0==r_57^post_52 && r_92^0==r_92^post_52 && rt_11^0==rt_11^post_52 && rv_13^0==rv_13^post_52 && rv_31^0==rv_31^post_52 && st_16^0==st_16^post_52 && st_29^0==st_29^post_52 && t_24^0==t_24^post_52 && t_32^0==t_32^post_52 && tp_33^0==tp_33^post_52 && x_134^0==x_134^post_52 && x_14^0==x_14^post_52 && x_17^0==x_17^post_52 && x_19^0==x_19^post_52 && x_21^0==x_21^post_52 && y_20^0==y_20^post_52 ], cost: 1 54: l35 -> l0 : a_123^0'=a_123^post_55, a_136^0'=a_136^post_55, a_76^0'=a_76^post_55, ct_18^0'=ct_18^post_55, h_15^0'=h_15^post_55, h_30^0'=h_30^post_55, i_115^0'=i_115^post_55, i_28^0'=i_28^post_55, i_98^0'=i_98^post_55, l_27^0'=l_27^post_55, nd_12^0'=nd_12^post_55, r_135^0'=r_135^post_55, r_37^0'=r_37^post_55, r_57^0'=r_57^post_55, r_92^0'=r_92^post_55, rt_11^0'=rt_11^post_55, rv_13^0'=rv_13^post_55, rv_31^0'=rv_31^post_55, st_16^0'=st_16^post_55, st_29^0'=st_29^post_55, t_24^0'=t_24^post_55, t_32^0'=t_32^post_55, tp_33^0'=tp_33^post_55, x_134^0'=x_134^post_55, x_14^0'=x_14^post_55, x_17^0'=x_17^post_55, x_19^0'=x_19^post_55, x_21^0'=x_21^post_55, y_20^0'=y_20^post_55, [ a_123^0==a_123^post_55 && a_136^0==a_136^post_55 && a_76^0==a_76^post_55 && ct_18^0==ct_18^post_55 && h_15^0==h_15^post_55 && h_30^0==h_30^post_55 && i_115^0==i_115^post_55 && i_28^0==i_28^post_55 && i_98^0==i_98^post_55 && l_27^0==l_27^post_55 && nd_12^0==nd_12^post_55 && r_135^0==r_135^post_55 && r_37^0==r_37^post_55 && r_57^0==r_57^post_55 && r_92^0==r_92^post_55 && rt_11^0==rt_11^post_55 && rv_13^0==rv_13^post_55 && rv_31^0==rv_31^post_55 && st_16^0==st_16^post_55 && st_29^0==st_29^post_55 && t_24^0==t_24^post_55 && t_32^0==t_32^post_55 && tp_33^0==tp_33^post_55 && x_134^0==x_134^post_55 && x_14^0==x_14^post_55 && x_17^0==x_17^post_55 && x_19^0==x_19^post_55 && x_21^0==x_21^post_55 && y_20^0==y_20^post_55 ], cost: 1 Checking for constant complexity: The following rule is satisfiable with cost >= 1, yielding constant complexity: 54: l35 -> l0 : a_123^0'=a_123^post_55, a_136^0'=a_136^post_55, a_76^0'=a_76^post_55, ct_18^0'=ct_18^post_55, h_15^0'=h_15^post_55, h_30^0'=h_30^post_55, i_115^0'=i_115^post_55, i_28^0'=i_28^post_55, i_98^0'=i_98^post_55, l_27^0'=l_27^post_55, nd_12^0'=nd_12^post_55, r_135^0'=r_135^post_55, r_37^0'=r_37^post_55, r_57^0'=r_57^post_55, r_92^0'=r_92^post_55, rt_11^0'=rt_11^post_55, rv_13^0'=rv_13^post_55, rv_31^0'=rv_31^post_55, st_16^0'=st_16^post_55, st_29^0'=st_29^post_55, t_24^0'=t_24^post_55, t_32^0'=t_32^post_55, tp_33^0'=tp_33^post_55, x_134^0'=x_134^post_55, x_14^0'=x_14^post_55, x_17^0'=x_17^post_55, x_19^0'=x_19^post_55, x_21^0'=x_21^post_55, y_20^0'=y_20^post_55, [ a_123^0==a_123^post_55 && a_136^0==a_136^post_55 && a_76^0==a_76^post_55 && ct_18^0==ct_18^post_55 && h_15^0==h_15^post_55 && h_30^0==h_30^post_55 && i_115^0==i_115^post_55 && i_28^0==i_28^post_55 && i_98^0==i_98^post_55 && l_27^0==l_27^post_55 && nd_12^0==nd_12^post_55 && r_135^0==r_135^post_55 && r_37^0==r_37^post_55 && r_57^0==r_57^post_55 && r_92^0==r_92^post_55 && rt_11^0==rt_11^post_55 && rv_13^0==rv_13^post_55 && rv_31^0==rv_31^post_55 && st_16^0==st_16^post_55 && st_29^0==st_29^post_55 && t_24^0==t_24^post_55 && t_32^0==t_32^post_55 && tp_33^0==tp_33^post_55 && x_134^0==x_134^post_55 && x_14^0==x_14^post_55 && x_17^0==x_17^post_55 && x_19^0==x_19^post_55 && x_21^0==x_21^post_55 && y_20^0==y_20^post_55 ], cost: 1 Removed unreachable and leaf rules: Start location: l35 0: l0 -> l1 : a_123^0'=a_123^post_1, a_136^0'=a_136^post_1, a_76^0'=a_76^post_1, ct_18^0'=ct_18^post_1, h_15^0'=h_15^post_1, h_30^0'=h_30^post_1, i_115^0'=i_115^post_1, i_28^0'=i_28^post_1, i_98^0'=i_98^post_1, l_27^0'=l_27^post_1, nd_12^0'=nd_12^post_1, r_135^0'=r_135^post_1, r_37^0'=r_37^post_1, r_57^0'=r_57^post_1, r_92^0'=r_92^post_1, rt_11^0'=rt_11^post_1, rv_13^0'=rv_13^post_1, rv_31^0'=rv_31^post_1, st_16^0'=st_16^post_1, st_29^0'=st_29^post_1, t_24^0'=t_24^post_1, t_32^0'=t_32^post_1, tp_33^0'=tp_33^post_1, x_134^0'=x_134^post_1, x_14^0'=x_14^post_1, x_17^0'=x_17^post_1, x_19^0'=x_19^post_1, x_21^0'=x_21^post_1, y_20^0'=y_20^post_1, [ nd_12^1_1==nd_12^1_1 && rv_13^post_1==nd_12^1_1 && nd_12^post_1==nd_12^post_1 && l_27^post_1==rv_13^post_1 && h_30^post_1==0 && i_28^post_1==0 && 0<=i_28^post_1 && i_28^post_1<=0 && 0<=h_30^post_1 && h_30^post_1<=0 && rv_13^post_1<=l_27^post_1 && l_27^post_1<=rv_13^post_1 && a_123^0==a_123^post_1 && a_136^0==a_136^post_1 && a_76^0==a_76^post_1 && ct_18^0==ct_18^post_1 && h_15^0==h_15^post_1 && i_115^0==i_115^post_1 && i_98^0==i_98^post_1 && r_135^0==r_135^post_1 && r_37^0==r_37^post_1 && r_57^0==r_57^post_1 && r_92^0==r_92^post_1 && rt_11^0==rt_11^post_1 && rv_31^0==rv_31^post_1 && st_16^0==st_16^post_1 && st_29^0==st_29^post_1 && t_24^0==t_24^post_1 && t_32^0==t_32^post_1 && tp_33^0==tp_33^post_1 && x_134^0==x_134^post_1 && x_14^0==x_14^post_1 && x_17^0==x_17^post_1 && x_19^0==x_19^post_1 && x_21^0==x_21^post_1 && y_20^0==y_20^post_1 ], cost: 1 53: l1 -> l2 : a_123^0'=a_123^post_54, a_136^0'=a_136^post_54, a_76^0'=a_76^post_54, ct_18^0'=ct_18^post_54, h_15^0'=h_15^post_54, h_30^0'=h_30^post_54, i_115^0'=i_115^post_54, i_28^0'=i_28^post_54, i_98^0'=i_98^post_54, l_27^0'=l_27^post_54, nd_12^0'=nd_12^post_54, r_135^0'=r_135^post_54, r_37^0'=r_37^post_54, r_57^0'=r_57^post_54, r_92^0'=r_92^post_54, rt_11^0'=rt_11^post_54, rv_13^0'=rv_13^post_54, rv_31^0'=rv_31^post_54, st_16^0'=st_16^post_54, st_29^0'=st_29^post_54, t_24^0'=t_24^post_54, t_32^0'=t_32^post_54, tp_33^0'=tp_33^post_54, x_134^0'=x_134^post_54, x_14^0'=x_14^post_54, x_17^0'=x_17^post_54, x_19^0'=x_19^post_54, x_21^0'=x_21^post_54, y_20^0'=y_20^post_54, [ rv_13^post_54==rv_13^post_54 && rv_31^post_54==rv_31^post_54 && 1+i_28^0<=l_27^0 && t_32^post_54==tp_33^0 && tp_33^post_54==tp_33^post_54 && h_30^post_54==t_32^post_54 && i_28^post_54==1+i_28^0 && 1<=i_28^post_54 && i_28^post_54<=1 && rv_13^post_54<=l_27^0 && l_27^0<=rv_13^post_54 && h_30^post_54<=rv_31^post_54 && rv_31^post_54<=h_30^post_54 && h_30^post_54<=t_32^post_54 && t_32^post_54<=h_30^post_54 && rv_31^post_54<=t_32^post_54 && t_32^post_54<=rv_31^post_54 && 1<=l_27^0 && a_123^0==a_123^post_54 && a_136^0==a_136^post_54 && a_76^0==a_76^post_54 && ct_18^0==ct_18^post_54 && h_15^0==h_15^post_54 && i_115^0==i_115^post_54 && i_98^0==i_98^post_54 && l_27^0==l_27^post_54 && nd_12^0==nd_12^post_54 && r_135^0==r_135^post_54 && r_37^0==r_37^post_54 && r_57^0==r_57^post_54 && r_92^0==r_92^post_54 && rt_11^0==rt_11^post_54 && st_16^0==st_16^post_54 && st_29^0==st_29^post_54 && t_24^0==t_24^post_54 && x_134^0==x_134^post_54 && x_14^0==x_14^post_54 && x_17^0==x_17^post_54 && x_19^0==x_19^post_54 && x_21^0==x_21^post_54 && y_20^0==y_20^post_54 ], cost: 1 21: l2 -> l16 : a_123^0'=a_123^post_22, a_136^0'=a_136^post_22, a_76^0'=a_76^post_22, ct_18^0'=ct_18^post_22, h_15^0'=h_15^post_22, h_30^0'=h_30^post_22, i_115^0'=i_115^post_22, i_28^0'=i_28^post_22, i_98^0'=i_98^post_22, l_27^0'=l_27^post_22, nd_12^0'=nd_12^post_22, r_135^0'=r_135^post_22, r_37^0'=r_37^post_22, r_57^0'=r_57^post_22, r_92^0'=r_92^post_22, rt_11^0'=rt_11^post_22, rv_13^0'=rv_13^post_22, rv_31^0'=rv_31^post_22, st_16^0'=st_16^post_22, st_29^0'=st_29^post_22, t_24^0'=t_24^post_22, t_32^0'=t_32^post_22, tp_33^0'=tp_33^post_22, x_134^0'=x_134^post_22, x_14^0'=x_14^post_22, x_17^0'=x_17^post_22, x_19^0'=x_19^post_22, x_21^0'=x_21^post_22, y_20^0'=y_20^post_22, [ rv_13^post_22==rv_13^post_22 && rv_31^post_22==rv_31^post_22 && r_57^post_22==r_57^post_22 && 1+i_28^0<=l_27^0 && t_32^post_22==tp_33^0 && tp_33^post_22==tp_33^post_22 && h_30^post_22==t_32^post_22 && i_28^1_1==1+i_28^0 && i_28^post_22==i_28^post_22 && 2<=i_28^post_22 && i_28^post_22<=2 && rv_13^post_22<=l_27^0 && l_27^0<=rv_13^post_22 && h_30^post_22<=rv_31^post_22 && rv_31^post_22<=h_30^post_22 && h_30^post_22<=t_32^post_22 && t_32^post_22<=h_30^post_22 && rv_31^post_22<=t_32^post_22 && t_32^post_22<=rv_31^post_22 && 1<=l_27^0 && 2<=l_27^0 && a_76^post_22==a_76^post_22 && a_76^post_22<=i_28^post_22 && i_28^post_22<=a_76^post_22 && a_123^0==a_123^post_22 && a_136^0==a_136^post_22 && ct_18^0==ct_18^post_22 && h_15^0==h_15^post_22 && i_115^0==i_115^post_22 && i_98^0==i_98^post_22 && l_27^0==l_27^post_22 && nd_12^0==nd_12^post_22 && r_135^0==r_135^post_22 && r_37^0==r_37^post_22 && r_92^0==r_92^post_22 && rt_11^0==rt_11^post_22 && st_16^0==st_16^post_22 && st_29^0==st_29^post_22 && t_24^0==t_24^post_22 && x_134^0==x_134^post_22 && x_14^0==x_14^post_22 && x_17^0==x_17^post_22 && x_19^0==x_19^post_22 && x_21^0==x_21^post_22 && y_20^0==y_20^post_22 ], cost: 1 44: l16 -> l31 : a_123^0'=a_123^post_45, a_136^0'=a_136^post_45, a_76^0'=a_76^post_45, ct_18^0'=ct_18^post_45, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=i_98^post_45, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_45, r_135^0'=r_135^post_45, r_37^0'=r_37^post_45, r_57^0'=r_57^post_45, r_92^0'=r_92^post_45, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_16^0'=st_16^post_45, st_29^0'=st_29^post_45, t_24^0'=t_24^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_134^0'=x_134^post_45, x_14^0'=x_14^post_45, x_17^0'=x_17^post_45, x_19^0'=x_19^post_45, x_21^0'=x_21^post_45, y_20^0'=y_20^post_45, [ 0<=i_28^0 && rv_13^1_2_1==rv_13^1_2_1 && l_27^0<=i_28^0 && st_29^1_2_1==h_30^0 && rt_11^1_2_1==st_29^1_2_1 && l_27^post_45==l_27^post_45 && i_28^post_45==i_28^post_45 && st_29^post_45==st_29^post_45 && h_30^post_45==h_30^post_45 && rv_31^post_45==rv_31^post_45 && t_32^post_45==t_32^post_45 && tp_33^post_45==tp_33^post_45 && h_15^1_2==rt_11^1_2_1 && rt_11^post_45==rt_11^post_45 && x_14^post_45==h_15^1_2 && x_14^post_45<=h_15^1_2 && h_15^1_2<=x_14^post_45 && 1<=rv_13^1_2_1 && 2<=rv_13^1_2_1 && rv_13^1_2_1<=i_28^post_45 && 0<=i_28^post_45 && rv_13^post_45==rv_13^post_45 && h_15^post_45==h_15^post_45 && i_115^post_45==i_115^post_45 && a_123^0==a_123^post_45 && a_136^0==a_136^post_45 && a_76^0==a_76^post_45 && ct_18^0==ct_18^post_45 && i_98^0==i_98^post_45 && nd_12^0==nd_12^post_45 && r_135^0==r_135^post_45 && r_37^0==r_37^post_45 && r_57^0==r_57^post_45 && r_92^0==r_92^post_45 && st_16^0==st_16^post_45 && t_24^0==t_24^post_45 && x_134^0==x_134^post_45 && x_17^0==x_17^post_45 && x_19^0==x_19^post_45 && x_21^0==x_21^post_45 && y_20^0==y_20^post_45 ], cost: 1 50: l16 -> l34 : a_123^0'=a_123^post_51, a_136^0'=a_136^post_51, a_76^0'=a_76^post_51, ct_18^0'=ct_18^post_51, h_15^0'=h_15^post_51, h_30^0'=h_30^post_51, i_115^0'=i_115^post_51, i_28^0'=i_28^post_51, i_98^0'=i_98^post_51, l_27^0'=l_27^post_51, nd_12^0'=nd_12^post_51, r_135^0'=r_135^post_51, r_37^0'=r_37^post_51, r_57^0'=r_57^post_51, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_51, rv_13^0'=rv_13^post_51, rv_31^0'=rv_31^post_51, st_16^0'=st_16^post_51, st_29^0'=st_29^post_51, t_24^0'=t_24^post_51, t_32^0'=t_32^post_51, tp_33^0'=tp_33^post_51, x_134^0'=x_134^post_51, x_14^0'=x_14^post_51, x_17^0'=x_17^post_51, x_19^0'=x_19^post_51, x_21^0'=x_21^post_51, y_20^0'=y_20^post_51, [ 0<=i_28^0 && r_92^post_51==r_92^post_51 && i_98^post_51==i_98^post_51 && 1+i_28^0<=l_27^0 && t_32^post_51==tp_33^0 && tp_33^post_51==tp_33^post_51 && h_30^post_51==t_32^post_51 && i_28^post_51==1+i_28^0 && i_28^post_51<=1+i_98^post_51 && 1+i_98^post_51<=i_28^post_51 && i_98^post_51<=-1+i_28^post_51 && -1+i_28^post_51<=i_98^post_51 && 1+i_98^post_51<=l_27^0 && a_123^0==a_123^post_51 && a_136^0==a_136^post_51 && a_76^0==a_76^post_51 && ct_18^0==ct_18^post_51 && h_15^0==h_15^post_51 && i_115^0==i_115^post_51 && l_27^0==l_27^post_51 && nd_12^0==nd_12^post_51 && r_135^0==r_135^post_51 && r_37^0==r_37^post_51 && r_57^0==r_57^post_51 && rt_11^0==rt_11^post_51 && rv_13^0==rv_13^post_51 && rv_31^0==rv_31^post_51 && st_16^0==st_16^post_51 && st_29^0==st_29^post_51 && t_24^0==t_24^post_51 && x_134^0==x_134^post_51 && x_14^0==x_14^post_51 && x_17^0==x_17^post_51 && x_19^0==x_19^post_51 && x_21^0==x_21^post_51 && y_20^0==y_20^post_51 ], cost: 1 34: l17 -> l26 : a_123^0'=a_123^post_35, a_136^0'=a_136^post_35, a_76^0'=a_76^post_35, ct_18^0'=ct_18^post_35, h_15^0'=h_15^post_35, h_30^0'=h_30^post_35, i_115^0'=i_115^post_35, i_28^0'=i_28^post_35, i_98^0'=i_98^post_35, l_27^0'=l_27^post_35, nd_12^0'=nd_12^post_35, r_135^0'=r_135^post_35, r_37^0'=r_37^post_35, r_57^0'=r_57^post_35, r_92^0'=r_92^post_35, rt_11^0'=rt_11^post_35, rv_13^0'=rv_13^post_35, rv_31^0'=rv_31^post_35, st_16^0'=st_16^post_35, st_29^0'=st_29^post_35, t_24^0'=t_24^post_35, t_32^0'=t_32^post_35, tp_33^0'=tp_33^post_35, x_134^0'=x_134^post_35, x_14^0'=x_14^post_35, x_17^0'=x_17^post_35, x_19^0'=x_19^post_35, x_21^0'=x_21^post_35, y_20^0'=y_20^post_35, [ 0<=a_123^0 && rv_13^post_35==rv_13^post_35 && h_15^post_35==h_15^post_35 && x_134^post_35==x_134^post_35 && a_123^0==a_123^post_35 && a_136^0==a_136^post_35 && a_76^0==a_76^post_35 && ct_18^0==ct_18^post_35 && h_30^0==h_30^post_35 && i_115^0==i_115^post_35 && i_28^0==i_28^post_35 && i_98^0==i_98^post_35 && l_27^0==l_27^post_35 && nd_12^0==nd_12^post_35 && r_135^0==r_135^post_35 && r_37^0==r_37^post_35 && r_57^0==r_57^post_35 && r_92^0==r_92^post_35 && rt_11^0==rt_11^post_35 && rv_31^0==rv_31^post_35 && st_16^0==st_16^post_35 && st_29^0==st_29^post_35 && t_24^0==t_24^post_35 && t_32^0==t_32^post_35 && tp_33^0==tp_33^post_35 && x_14^0==x_14^post_35 && x_17^0==x_17^post_35 && x_19^0==x_19^post_35 && x_21^0==x_21^post_35 && y_20^0==y_20^post_35 ], cost: 1 35: l26 -> l27 : a_123^0'=a_123^post_36, a_136^0'=a_136^post_36, a_76^0'=a_76^post_36, ct_18^0'=ct_18^post_36, h_15^0'=h_15^post_36, h_30^0'=h_30^post_36, i_115^0'=i_115^post_36, i_28^0'=i_28^post_36, i_98^0'=i_98^post_36, l_27^0'=l_27^post_36, nd_12^0'=nd_12^post_36, r_135^0'=r_135^post_36, r_37^0'=r_37^post_36, r_57^0'=r_57^post_36, r_92^0'=r_92^post_36, rt_11^0'=rt_11^post_36, rv_13^0'=rv_13^post_36, rv_31^0'=rv_31^post_36, st_16^0'=st_16^post_36, st_29^0'=st_29^post_36, t_24^0'=t_24^post_36, t_32^0'=t_32^post_36, tp_33^0'=tp_33^post_36, x_134^0'=x_134^post_36, x_14^0'=x_14^post_36, x_17^0'=x_17^post_36, x_19^0'=x_19^post_36, x_21^0'=x_21^post_36, y_20^0'=y_20^post_36, [ 1<=x_14^0 && a_123^0==a_123^post_36 && a_136^0==a_136^post_36 && a_76^0==a_76^post_36 && ct_18^0==ct_18^post_36 && h_15^0==h_15^post_36 && h_30^0==h_30^post_36 && i_115^0==i_115^post_36 && i_28^0==i_28^post_36 && i_98^0==i_98^post_36 && l_27^0==l_27^post_36 && nd_12^0==nd_12^post_36 && r_135^0==r_135^post_36 && r_37^0==r_37^post_36 && r_57^0==r_57^post_36 && r_92^0==r_92^post_36 && rt_11^0==rt_11^post_36 && rv_13^0==rv_13^post_36 && rv_31^0==rv_31^post_36 && st_16^0==st_16^post_36 && st_29^0==st_29^post_36 && t_24^0==t_24^post_36 && t_32^0==t_32^post_36 && tp_33^0==tp_33^post_36 && x_134^0==x_134^post_36 && x_14^0==x_14^post_36 && x_17^0==x_17^post_36 && x_19^0==x_19^post_36 && x_21^0==x_21^post_36 && y_20^0==y_20^post_36 ], cost: 1 36: l26 -> l27 : a_123^0'=a_123^post_37, a_136^0'=a_136^post_37, a_76^0'=a_76^post_37, ct_18^0'=ct_18^post_37, h_15^0'=h_15^post_37, h_30^0'=h_30^post_37, i_115^0'=i_115^post_37, i_28^0'=i_28^post_37, i_98^0'=i_98^post_37, l_27^0'=l_27^post_37, nd_12^0'=nd_12^post_37, r_135^0'=r_135^post_37, r_37^0'=r_37^post_37, r_57^0'=r_57^post_37, r_92^0'=r_92^post_37, rt_11^0'=rt_11^post_37, rv_13^0'=rv_13^post_37, rv_31^0'=rv_31^post_37, st_16^0'=st_16^post_37, st_29^0'=st_29^post_37, t_24^0'=t_24^post_37, t_32^0'=t_32^post_37, tp_33^0'=tp_33^post_37, x_134^0'=x_134^post_37, x_14^0'=x_14^post_37, x_17^0'=x_17^post_37, x_19^0'=x_19^post_37, x_21^0'=x_21^post_37, y_20^0'=y_20^post_37, [ 1+x_14^0<=0 && a_123^0==a_123^post_37 && a_136^0==a_136^post_37 && a_76^0==a_76^post_37 && ct_18^0==ct_18^post_37 && h_15^0==h_15^post_37 && h_30^0==h_30^post_37 && i_115^0==i_115^post_37 && i_28^0==i_28^post_37 && i_98^0==i_98^post_37 && l_27^0==l_27^post_37 && nd_12^0==nd_12^post_37 && r_135^0==r_135^post_37 && r_37^0==r_37^post_37 && r_57^0==r_57^post_37 && r_92^0==r_92^post_37 && rt_11^0==rt_11^post_37 && rv_13^0==rv_13^post_37 && rv_31^0==rv_31^post_37 && st_16^0==st_16^post_37 && st_29^0==st_29^post_37 && t_24^0==t_24^post_37 && t_32^0==t_32^post_37 && tp_33^0==tp_33^post_37 && x_134^0==x_134^post_37 && x_14^0==x_14^post_37 && x_17^0==x_17^post_37 && x_19^0==x_19^post_37 && x_21^0==x_21^post_37 && y_20^0==y_20^post_37 ], cost: 1 37: l27 -> l28 : a_123^0'=a_123^post_38, a_136^0'=a_136^post_38, a_76^0'=a_76^post_38, ct_18^0'=ct_18^post_38, h_15^0'=h_15^post_38, h_30^0'=h_30^post_38, i_115^0'=i_115^post_38, i_28^0'=i_28^post_38, i_98^0'=i_98^post_38, l_27^0'=l_27^post_38, nd_12^0'=nd_12^post_38, r_135^0'=r_135^post_38, r_37^0'=r_37^post_38, r_57^0'=r_57^post_38, r_92^0'=r_92^post_38, rt_11^0'=rt_11^post_38, rv_13^0'=rv_13^post_38, rv_31^0'=rv_31^post_38, st_16^0'=st_16^post_38, st_29^0'=st_29^post_38, t_24^0'=t_24^post_38, t_32^0'=t_32^post_38, tp_33^0'=tp_33^post_38, x_134^0'=x_134^post_38, x_14^0'=x_14^post_38, x_17^0'=x_17^post_38, x_19^0'=x_19^post_38, x_21^0'=x_21^post_38, y_20^0'=y_20^post_38, [ r_135^post_38==r_135^post_38 && a_136^post_38==a_136^post_38 && 0<=a_136^post_38-a_123^0 && a_136^post_38-a_123^0<=0 && x_14^0<=x_134^0 && x_134^0<=x_14^0 && a_123^0<=a_136^post_38 && a_136^post_38<=a_123^0 && r_37^0<=r_135^post_38 && r_135^post_38<=r_37^0 && a_123^0==a_123^post_38 && a_76^0==a_76^post_38 && ct_18^0==ct_18^post_38 && h_15^0==h_15^post_38 && h_30^0==h_30^post_38 && i_115^0==i_115^post_38 && i_28^0==i_28^post_38 && i_98^0==i_98^post_38 && l_27^0==l_27^post_38 && nd_12^0==nd_12^post_38 && r_37^0==r_37^post_38 && r_57^0==r_57^post_38 && r_92^0==r_92^post_38 && rt_11^0==rt_11^post_38 && rv_13^0==rv_13^post_38 && rv_31^0==rv_31^post_38 && st_16^0==st_16^post_38 && st_29^0==st_29^post_38 && t_24^0==t_24^post_38 && t_32^0==t_32^post_38 && tp_33^0==tp_33^post_38 && x_134^0==x_134^post_38 && x_14^0==x_14^post_38 && x_17^0==x_17^post_38 && x_19^0==x_19^post_38 && x_21^0==x_21^post_38 && y_20^0==y_20^post_38 ], cost: 1 38: l28 -> l29 : a_123^0'=a_123^post_39, a_136^0'=a_136^post_39, a_76^0'=a_76^post_39, ct_18^0'=ct_18^post_39, h_15^0'=h_15^post_39, h_30^0'=h_30^post_39, i_115^0'=i_115^post_39, i_28^0'=i_28^post_39, i_98^0'=i_98^post_39, l_27^0'=l_27^post_39, nd_12^0'=nd_12^post_39, r_135^0'=r_135^post_39, r_37^0'=r_37^post_39, r_57^0'=r_57^post_39, r_92^0'=r_92^post_39, rt_11^0'=rt_11^post_39, rv_13^0'=rv_13^post_39, rv_31^0'=rv_31^post_39, st_16^0'=st_16^post_39, st_29^0'=st_29^post_39, t_24^0'=t_24^post_39, t_32^0'=t_32^post_39, tp_33^0'=tp_33^post_39, x_134^0'=x_134^post_39, x_14^0'=x_14^post_39, x_17^0'=x_17^post_39, x_19^0'=x_19^post_39, x_21^0'=x_21^post_39, y_20^0'=y_20^post_39, [ 1<=h_15^0 && a_123^0==a_123^post_39 && a_136^0==a_136^post_39 && a_76^0==a_76^post_39 && ct_18^0==ct_18^post_39 && h_15^0==h_15^post_39 && h_30^0==h_30^post_39 && i_115^0==i_115^post_39 && i_28^0==i_28^post_39 && i_98^0==i_98^post_39 && l_27^0==l_27^post_39 && nd_12^0==nd_12^post_39 && r_135^0==r_135^post_39 && r_37^0==r_37^post_39 && r_57^0==r_57^post_39 && r_92^0==r_92^post_39 && rt_11^0==rt_11^post_39 && rv_13^0==rv_13^post_39 && rv_31^0==rv_31^post_39 && st_16^0==st_16^post_39 && st_29^0==st_29^post_39 && t_24^0==t_24^post_39 && t_32^0==t_32^post_39 && tp_33^0==tp_33^post_39 && x_134^0==x_134^post_39 && x_14^0==x_14^post_39 && x_17^0==x_17^post_39 && x_19^0==x_19^post_39 && x_21^0==x_21^post_39 && y_20^0==y_20^post_39 ], cost: 1 39: l28 -> l29 : a_123^0'=a_123^post_40, a_136^0'=a_136^post_40, a_76^0'=a_76^post_40, ct_18^0'=ct_18^post_40, h_15^0'=h_15^post_40, h_30^0'=h_30^post_40, i_115^0'=i_115^post_40, i_28^0'=i_28^post_40, i_98^0'=i_98^post_40, l_27^0'=l_27^post_40, nd_12^0'=nd_12^post_40, r_135^0'=r_135^post_40, r_37^0'=r_37^post_40, r_57^0'=r_57^post_40, r_92^0'=r_92^post_40, rt_11^0'=rt_11^post_40, rv_13^0'=rv_13^post_40, rv_31^0'=rv_31^post_40, st_16^0'=st_16^post_40, st_29^0'=st_29^post_40, t_24^0'=t_24^post_40, t_32^0'=t_32^post_40, tp_33^0'=tp_33^post_40, x_134^0'=x_134^post_40, x_14^0'=x_14^post_40, x_17^0'=x_17^post_40, x_19^0'=x_19^post_40, x_21^0'=x_21^post_40, y_20^0'=y_20^post_40, [ 1+h_15^0<=0 && a_123^0==a_123^post_40 && a_136^0==a_136^post_40 && a_76^0==a_76^post_40 && ct_18^0==ct_18^post_40 && h_15^0==h_15^post_40 && h_30^0==h_30^post_40 && i_115^0==i_115^post_40 && i_28^0==i_28^post_40 && i_98^0==i_98^post_40 && l_27^0==l_27^post_40 && nd_12^0==nd_12^post_40 && r_135^0==r_135^post_40 && r_37^0==r_37^post_40 && r_57^0==r_57^post_40 && r_92^0==r_92^post_40 && rt_11^0==rt_11^post_40 && rv_13^0==rv_13^post_40 && rv_31^0==rv_31^post_40 && st_16^0==st_16^post_40 && st_29^0==st_29^post_40 && t_24^0==t_24^post_40 && t_32^0==t_32^post_40 && tp_33^0==tp_33^post_40 && x_134^0==x_134^post_40 && x_14^0==x_14^post_40 && x_17^0==x_17^post_40 && x_19^0==x_19^post_40 && x_21^0==x_21^post_40 && y_20^0==y_20^post_40 ], cost: 1 40: l29 -> l30 : a_123^0'=a_123^post_41, a_136^0'=a_136^post_41, a_76^0'=a_76^post_41, ct_18^0'=ct_18^post_41, h_15^0'=h_15^post_41, h_30^0'=h_30^post_41, i_115^0'=i_115^post_41, i_28^0'=i_28^post_41, i_98^0'=i_98^post_41, l_27^0'=l_27^post_41, nd_12^0'=nd_12^post_41, r_135^0'=r_135^post_41, r_37^0'=r_37^post_41, r_57^0'=r_57^post_41, r_92^0'=r_92^post_41, rt_11^0'=rt_11^post_41, rv_13^0'=rv_13^post_41, rv_31^0'=rv_31^post_41, st_16^0'=st_16^post_41, st_29^0'=st_29^post_41, t_24^0'=t_24^post_41, t_32^0'=t_32^post_41, tp_33^0'=tp_33^post_41, x_134^0'=x_134^post_41, x_14^0'=x_14^post_41, x_17^0'=x_17^post_41, x_19^0'=x_19^post_41, x_21^0'=x_21^post_41, y_20^0'=y_20^post_41, [ 1<=x_134^0 && a_123^0==a_123^post_41 && a_136^0==a_136^post_41 && a_76^0==a_76^post_41 && ct_18^0==ct_18^post_41 && h_15^0==h_15^post_41 && h_30^0==h_30^post_41 && i_115^0==i_115^post_41 && i_28^0==i_28^post_41 && i_98^0==i_98^post_41 && l_27^0==l_27^post_41 && nd_12^0==nd_12^post_41 && r_135^0==r_135^post_41 && r_37^0==r_37^post_41 && r_57^0==r_57^post_41 && r_92^0==r_92^post_41 && rt_11^0==rt_11^post_41 && rv_13^0==rv_13^post_41 && rv_31^0==rv_31^post_41 && st_16^0==st_16^post_41 && st_29^0==st_29^post_41 && t_24^0==t_24^post_41 && t_32^0==t_32^post_41 && tp_33^0==tp_33^post_41 && x_134^0==x_134^post_41 && x_14^0==x_14^post_41 && x_17^0==x_17^post_41 && x_19^0==x_19^post_41 && x_21^0==x_21^post_41 && y_20^0==y_20^post_41 ], cost: 1 41: l29 -> l30 : a_123^0'=a_123^post_42, a_136^0'=a_136^post_42, a_76^0'=a_76^post_42, ct_18^0'=ct_18^post_42, h_15^0'=h_15^post_42, h_30^0'=h_30^post_42, i_115^0'=i_115^post_42, i_28^0'=i_28^post_42, i_98^0'=i_98^post_42, l_27^0'=l_27^post_42, nd_12^0'=nd_12^post_42, r_135^0'=r_135^post_42, r_37^0'=r_37^post_42, r_57^0'=r_57^post_42, r_92^0'=r_92^post_42, rt_11^0'=rt_11^post_42, rv_13^0'=rv_13^post_42, rv_31^0'=rv_31^post_42, st_16^0'=st_16^post_42, st_29^0'=st_29^post_42, t_24^0'=t_24^post_42, t_32^0'=t_32^post_42, tp_33^0'=tp_33^post_42, x_134^0'=x_134^post_42, x_14^0'=x_14^post_42, x_17^0'=x_17^post_42, x_19^0'=x_19^post_42, x_21^0'=x_21^post_42, y_20^0'=y_20^post_42, [ 1+x_134^0<=0 && a_123^0==a_123^post_42 && a_136^0==a_136^post_42 && a_76^0==a_76^post_42 && ct_18^0==ct_18^post_42 && h_15^0==h_15^post_42 && h_30^0==h_30^post_42 && i_115^0==i_115^post_42 && i_28^0==i_28^post_42 && i_98^0==i_98^post_42 && l_27^0==l_27^post_42 && nd_12^0==nd_12^post_42 && r_135^0==r_135^post_42 && r_37^0==r_37^post_42 && r_57^0==r_57^post_42 && r_92^0==r_92^post_42 && rt_11^0==rt_11^post_42 && rv_13^0==rv_13^post_42 && rv_31^0==rv_31^post_42 && st_16^0==st_16^post_42 && st_29^0==st_29^post_42 && t_24^0==t_24^post_42 && t_32^0==t_32^post_42 && tp_33^0==tp_33^post_42 && x_134^0==x_134^post_42 && x_14^0==x_14^post_42 && x_17^0==x_17^post_42 && x_19^0==x_19^post_42 && x_21^0==x_21^post_42 && y_20^0==y_20^post_42 ], cost: 1 42: l30 -> l25 : a_123^0'=a_123^post_43, a_136^0'=a_136^post_43, a_76^0'=a_76^post_43, ct_18^0'=ct_18^post_43, h_15^0'=h_15^post_43, h_30^0'=h_30^post_43, i_115^0'=i_115^post_43, i_28^0'=i_28^post_43, i_98^0'=i_98^post_43, l_27^0'=l_27^post_43, nd_12^0'=nd_12^post_43, r_135^0'=r_135^post_43, r_37^0'=r_37^post_43, r_57^0'=r_57^post_43, r_92^0'=r_92^post_43, rt_11^0'=rt_11^post_43, rv_13^0'=rv_13^post_43, rv_31^0'=rv_31^post_43, st_16^0'=st_16^post_43, st_29^0'=st_29^post_43, t_24^0'=t_24^post_43, t_32^0'=t_32^post_43, tp_33^0'=tp_33^post_43, x_134^0'=x_134^post_43, x_14^0'=x_14^post_43, x_17^0'=x_17^post_43, x_19^0'=x_19^post_43, x_21^0'=x_21^post_43, y_20^0'=y_20^post_43, [ 1<=rv_13^0 && 2<=rv_13^0 && r_37^post_43==r_37^post_43 && r_37^post_43<=r_135^0 && r_135^0<=r_37^post_43 && a_123^post_43==a_123^post_43 && a_123^post_43<=a_136^0 && a_136^0<=a_123^post_43 && a_136^0==a_136^post_43 && a_76^0==a_76^post_43 && ct_18^0==ct_18^post_43 && h_15^0==h_15^post_43 && h_30^0==h_30^post_43 && i_115^0==i_115^post_43 && i_28^0==i_28^post_43 && i_98^0==i_98^post_43 && l_27^0==l_27^post_43 && nd_12^0==nd_12^post_43 && r_135^0==r_135^post_43 && r_57^0==r_57^post_43 && r_92^0==r_92^post_43 && rt_11^0==rt_11^post_43 && rv_13^0==rv_13^post_43 && rv_31^0==rv_31^post_43 && st_16^0==st_16^post_43 && st_29^0==st_29^post_43 && t_24^0==t_24^post_43 && t_32^0==t_32^post_43 && tp_33^0==tp_33^post_43 && x_134^0==x_134^post_43 && x_14^0==x_14^post_43 && x_17^0==x_17^post_43 && x_19^0==x_19^post_43 && x_21^0==x_21^post_43 && y_20^0==y_20^post_43 ], cost: 1 43: l25 -> l17 : a_123^0'=a_123^post_44, a_136^0'=a_136^post_44, a_76^0'=a_76^post_44, ct_18^0'=ct_18^post_44, h_15^0'=h_15^post_44, h_30^0'=h_30^post_44, i_115^0'=i_115^post_44, i_28^0'=i_28^post_44, i_98^0'=i_98^post_44, l_27^0'=l_27^post_44, nd_12^0'=nd_12^post_44, r_135^0'=r_135^post_44, r_37^0'=r_37^post_44, r_57^0'=r_57^post_44, r_92^0'=r_92^post_44, rt_11^0'=rt_11^post_44, rv_13^0'=rv_13^post_44, rv_31^0'=rv_31^post_44, st_16^0'=st_16^post_44, st_29^0'=st_29^post_44, t_24^0'=t_24^post_44, t_32^0'=t_32^post_44, tp_33^0'=tp_33^post_44, x_134^0'=x_134^post_44, x_14^0'=x_14^post_44, x_17^0'=x_17^post_44, x_19^0'=x_19^post_44, x_21^0'=x_21^post_44, y_20^0'=y_20^post_44, [ a_123^0==a_123^post_44 && a_136^0==a_136^post_44 && a_76^0==a_76^post_44 && ct_18^0==ct_18^post_44 && h_15^0==h_15^post_44 && h_30^0==h_30^post_44 && i_115^0==i_115^post_44 && i_28^0==i_28^post_44 && i_98^0==i_98^post_44 && l_27^0==l_27^post_44 && nd_12^0==nd_12^post_44 && r_135^0==r_135^post_44 && r_37^0==r_37^post_44 && r_57^0==r_57^post_44 && r_92^0==r_92^post_44 && rt_11^0==rt_11^post_44 && rv_13^0==rv_13^post_44 && rv_31^0==rv_31^post_44 && st_16^0==st_16^post_44 && st_29^0==st_29^post_44 && t_24^0==t_24^post_44 && t_32^0==t_32^post_44 && tp_33^0==tp_33^post_44 && x_134^0==x_134^post_44 && x_14^0==x_14^post_44 && x_17^0==x_17^post_44 && x_19^0==x_19^post_44 && x_21^0==x_21^post_44 && y_20^0==y_20^post_44 ], cost: 1 45: l31 -> l32 : a_123^0'=a_123^post_46, a_136^0'=a_136^post_46, a_76^0'=a_76^post_46, ct_18^0'=ct_18^post_46, h_15^0'=h_15^post_46, h_30^0'=h_30^post_46, i_115^0'=i_115^post_46, i_28^0'=i_28^post_46, i_98^0'=i_98^post_46, l_27^0'=l_27^post_46, nd_12^0'=nd_12^post_46, r_135^0'=r_135^post_46, r_37^0'=r_37^post_46, r_57^0'=r_57^post_46, r_92^0'=r_92^post_46, rt_11^0'=rt_11^post_46, rv_13^0'=rv_13^post_46, rv_31^0'=rv_31^post_46, st_16^0'=st_16^post_46, st_29^0'=st_29^post_46, t_24^0'=t_24^post_46, t_32^0'=t_32^post_46, tp_33^0'=tp_33^post_46, x_134^0'=x_134^post_46, x_14^0'=x_14^post_46, x_17^0'=x_17^post_46, x_19^0'=x_19^post_46, x_21^0'=x_21^post_46, y_20^0'=y_20^post_46, [ 1<=x_14^0 && a_123^0==a_123^post_46 && a_136^0==a_136^post_46 && a_76^0==a_76^post_46 && ct_18^0==ct_18^post_46 && h_15^0==h_15^post_46 && h_30^0==h_30^post_46 && i_115^0==i_115^post_46 && i_28^0==i_28^post_46 && i_98^0==i_98^post_46 && l_27^0==l_27^post_46 && nd_12^0==nd_12^post_46 && r_135^0==r_135^post_46 && r_37^0==r_37^post_46 && r_57^0==r_57^post_46 && r_92^0==r_92^post_46 && rt_11^0==rt_11^post_46 && rv_13^0==rv_13^post_46 && rv_31^0==rv_31^post_46 && st_16^0==st_16^post_46 && st_29^0==st_29^post_46 && t_24^0==t_24^post_46 && t_32^0==t_32^post_46 && tp_33^0==tp_33^post_46 && x_134^0==x_134^post_46 && x_14^0==x_14^post_46 && x_17^0==x_17^post_46 && x_19^0==x_19^post_46 && x_21^0==x_21^post_46 && y_20^0==y_20^post_46 ], cost: 1 46: l31 -> l32 : a_123^0'=a_123^post_47, a_136^0'=a_136^post_47, a_76^0'=a_76^post_47, ct_18^0'=ct_18^post_47, h_15^0'=h_15^post_47, h_30^0'=h_30^post_47, i_115^0'=i_115^post_47, i_28^0'=i_28^post_47, i_98^0'=i_98^post_47, l_27^0'=l_27^post_47, nd_12^0'=nd_12^post_47, r_135^0'=r_135^post_47, r_37^0'=r_37^post_47, r_57^0'=r_57^post_47, r_92^0'=r_92^post_47, rt_11^0'=rt_11^post_47, rv_13^0'=rv_13^post_47, rv_31^0'=rv_31^post_47, st_16^0'=st_16^post_47, st_29^0'=st_29^post_47, t_24^0'=t_24^post_47, t_32^0'=t_32^post_47, tp_33^0'=tp_33^post_47, x_134^0'=x_134^post_47, x_14^0'=x_14^post_47, x_17^0'=x_17^post_47, x_19^0'=x_19^post_47, x_21^0'=x_21^post_47, y_20^0'=y_20^post_47, [ 1+x_14^0<=0 && a_123^0==a_123^post_47 && a_136^0==a_136^post_47 && a_76^0==a_76^post_47 && ct_18^0==ct_18^post_47 && h_15^0==h_15^post_47 && h_30^0==h_30^post_47 && i_115^0==i_115^post_47 && i_28^0==i_28^post_47 && i_98^0==i_98^post_47 && l_27^0==l_27^post_47 && nd_12^0==nd_12^post_47 && r_135^0==r_135^post_47 && r_37^0==r_37^post_47 && r_57^0==r_57^post_47 && r_92^0==r_92^post_47 && rt_11^0==rt_11^post_47 && rv_13^0==rv_13^post_47 && rv_31^0==rv_31^post_47 && st_16^0==st_16^post_47 && st_29^0==st_29^post_47 && t_24^0==t_24^post_47 && t_32^0==t_32^post_47 && tp_33^0==tp_33^post_47 && x_134^0==x_134^post_47 && x_14^0==x_14^post_47 && x_17^0==x_17^post_47 && x_19^0==x_19^post_47 && x_21^0==x_21^post_47 && y_20^0==y_20^post_47 ], cost: 1 47: l32 -> l33 : a_123^0'=a_123^post_48, a_136^0'=a_136^post_48, a_76^0'=a_76^post_48, ct_18^0'=ct_18^post_48, h_15^0'=h_15^post_48, h_30^0'=h_30^post_48, i_115^0'=i_115^post_48, i_28^0'=i_28^post_48, i_98^0'=i_98^post_48, l_27^0'=l_27^post_48, nd_12^0'=nd_12^post_48, r_135^0'=r_135^post_48, r_37^0'=r_37^post_48, r_57^0'=r_57^post_48, r_92^0'=r_92^post_48, rt_11^0'=rt_11^post_48, rv_13^0'=rv_13^post_48, rv_31^0'=rv_31^post_48, st_16^0'=st_16^post_48, st_29^0'=st_29^post_48, t_24^0'=t_24^post_48, t_32^0'=t_32^post_48, tp_33^0'=tp_33^post_48, x_134^0'=x_134^post_48, x_14^0'=x_14^post_48, x_17^0'=x_17^post_48, x_19^0'=x_19^post_48, x_21^0'=x_21^post_48, y_20^0'=y_20^post_48, [ 1<=h_15^0 && a_123^0==a_123^post_48 && a_136^0==a_136^post_48 && a_76^0==a_76^post_48 && ct_18^0==ct_18^post_48 && h_15^0==h_15^post_48 && h_30^0==h_30^post_48 && i_115^0==i_115^post_48 && i_28^0==i_28^post_48 && i_98^0==i_98^post_48 && l_27^0==l_27^post_48 && nd_12^0==nd_12^post_48 && r_135^0==r_135^post_48 && r_37^0==r_37^post_48 && r_57^0==r_57^post_48 && r_92^0==r_92^post_48 && rt_11^0==rt_11^post_48 && rv_13^0==rv_13^post_48 && rv_31^0==rv_31^post_48 && st_16^0==st_16^post_48 && st_29^0==st_29^post_48 && t_24^0==t_24^post_48 && t_32^0==t_32^post_48 && tp_33^0==tp_33^post_48 && x_134^0==x_134^post_48 && x_14^0==x_14^post_48 && x_17^0==x_17^post_48 && x_19^0==x_19^post_48 && x_21^0==x_21^post_48 && y_20^0==y_20^post_48 ], cost: 1 48: l32 -> l33 : a_123^0'=a_123^post_49, a_136^0'=a_136^post_49, a_76^0'=a_76^post_49, ct_18^0'=ct_18^post_49, h_15^0'=h_15^post_49, h_30^0'=h_30^post_49, i_115^0'=i_115^post_49, i_28^0'=i_28^post_49, i_98^0'=i_98^post_49, l_27^0'=l_27^post_49, nd_12^0'=nd_12^post_49, r_135^0'=r_135^post_49, r_37^0'=r_37^post_49, r_57^0'=r_57^post_49, r_92^0'=r_92^post_49, rt_11^0'=rt_11^post_49, rv_13^0'=rv_13^post_49, rv_31^0'=rv_31^post_49, st_16^0'=st_16^post_49, st_29^0'=st_29^post_49, t_24^0'=t_24^post_49, t_32^0'=t_32^post_49, tp_33^0'=tp_33^post_49, x_134^0'=x_134^post_49, x_14^0'=x_14^post_49, x_17^0'=x_17^post_49, x_19^0'=x_19^post_49, x_21^0'=x_21^post_49, y_20^0'=y_20^post_49, [ 1+h_15^0<=0 && a_123^0==a_123^post_49 && a_136^0==a_136^post_49 && a_76^0==a_76^post_49 && ct_18^0==ct_18^post_49 && h_15^0==h_15^post_49 && h_30^0==h_30^post_49 && i_115^0==i_115^post_49 && i_28^0==i_28^post_49 && i_98^0==i_98^post_49 && l_27^0==l_27^post_49 && nd_12^0==nd_12^post_49 && r_135^0==r_135^post_49 && r_37^0==r_37^post_49 && r_57^0==r_57^post_49 && r_92^0==r_92^post_49 && rt_11^0==rt_11^post_49 && rv_13^0==rv_13^post_49 && rv_31^0==rv_31^post_49 && st_16^0==st_16^post_49 && st_29^0==st_29^post_49 && t_24^0==t_24^post_49 && t_32^0==t_32^post_49 && tp_33^0==tp_33^post_49 && x_134^0==x_134^post_49 && x_14^0==x_14^post_49 && x_17^0==x_17^post_49 && x_19^0==x_19^post_49 && x_21^0==x_21^post_49 && y_20^0==y_20^post_49 ], cost: 1 49: l33 -> l17 : a_123^0'=a_123^post_50, a_136^0'=a_136^post_50, a_76^0'=a_76^post_50, ct_18^0'=ct_18^post_50, h_15^0'=h_15^post_50, h_30^0'=h_30^post_50, i_115^0'=i_115^post_50, i_28^0'=i_28^post_50, i_98^0'=i_98^post_50, l_27^0'=l_27^post_50, nd_12^0'=nd_12^post_50, r_135^0'=r_135^post_50, r_37^0'=r_37^post_50, r_57^0'=r_57^post_50, r_92^0'=r_92^post_50, rt_11^0'=rt_11^post_50, rv_13^0'=rv_13^post_50, rv_31^0'=rv_31^post_50, st_16^0'=st_16^post_50, st_29^0'=st_29^post_50, t_24^0'=t_24^post_50, t_32^0'=t_32^post_50, tp_33^0'=tp_33^post_50, x_134^0'=x_134^post_50, x_14^0'=x_14^post_50, x_17^0'=x_17^post_50, x_19^0'=x_19^post_50, x_21^0'=x_21^post_50, y_20^0'=y_20^post_50, [ 1<=rv_13^0 && 2<=rv_13^0 && rv_13^0<=i_115^0 && a_123^0==a_123^post_50 && a_136^0==a_136^post_50 && a_76^0==a_76^post_50 && ct_18^0==ct_18^post_50 && h_15^0==h_15^post_50 && h_30^0==h_30^post_50 && i_115^0==i_115^post_50 && i_28^0==i_28^post_50 && i_98^0==i_98^post_50 && l_27^0==l_27^post_50 && nd_12^0==nd_12^post_50 && r_135^0==r_135^post_50 && r_37^0==r_37^post_50 && r_57^0==r_57^post_50 && r_92^0==r_92^post_50 && rt_11^0==rt_11^post_50 && rv_13^0==rv_13^post_50 && rv_31^0==rv_31^post_50 && st_16^0==st_16^post_50 && st_29^0==st_29^post_50 && t_24^0==t_24^post_50 && t_32^0==t_32^post_50 && tp_33^0==tp_33^post_50 && x_134^0==x_134^post_50 && x_14^0==x_14^post_50 && x_17^0==x_17^post_50 && x_19^0==x_19^post_50 && x_21^0==x_21^post_50 && y_20^0==y_20^post_50 ], cost: 1 51: l34 -> l16 : a_123^0'=a_123^post_52, a_136^0'=a_136^post_52, a_76^0'=a_76^post_52, ct_18^0'=ct_18^post_52, h_15^0'=h_15^post_52, h_30^0'=h_30^post_52, i_115^0'=i_115^post_52, i_28^0'=i_28^post_52, i_98^0'=i_98^post_52, l_27^0'=l_27^post_52, nd_12^0'=nd_12^post_52, r_135^0'=r_135^post_52, r_37^0'=r_37^post_52, r_57^0'=r_57^post_52, r_92^0'=r_92^post_52, rt_11^0'=rt_11^post_52, rv_13^0'=rv_13^post_52, rv_31^0'=rv_31^post_52, st_16^0'=st_16^post_52, st_29^0'=st_29^post_52, t_24^0'=t_24^post_52, t_32^0'=t_32^post_52, tp_33^0'=tp_33^post_52, x_134^0'=x_134^post_52, x_14^0'=x_14^post_52, x_17^0'=x_17^post_52, x_19^0'=x_19^post_52, x_21^0'=x_21^post_52, y_20^0'=y_20^post_52, [ a_123^0==a_123^post_52 && a_136^0==a_136^post_52 && a_76^0==a_76^post_52 && ct_18^0==ct_18^post_52 && h_15^0==h_15^post_52 && h_30^0==h_30^post_52 && i_115^0==i_115^post_52 && i_28^0==i_28^post_52 && i_98^0==i_98^post_52 && l_27^0==l_27^post_52 && nd_12^0==nd_12^post_52 && r_135^0==r_135^post_52 && r_37^0==r_37^post_52 && r_57^0==r_57^post_52 && r_92^0==r_92^post_52 && rt_11^0==rt_11^post_52 && rv_13^0==rv_13^post_52 && rv_31^0==rv_31^post_52 && st_16^0==st_16^post_52 && st_29^0==st_29^post_52 && t_24^0==t_24^post_52 && t_32^0==t_32^post_52 && tp_33^0==tp_33^post_52 && x_134^0==x_134^post_52 && x_14^0==x_14^post_52 && x_17^0==x_17^post_52 && x_19^0==x_19^post_52 && x_21^0==x_21^post_52 && y_20^0==y_20^post_52 ], cost: 1 54: l35 -> l0 : a_123^0'=a_123^post_55, a_136^0'=a_136^post_55, a_76^0'=a_76^post_55, ct_18^0'=ct_18^post_55, h_15^0'=h_15^post_55, h_30^0'=h_30^post_55, i_115^0'=i_115^post_55, i_28^0'=i_28^post_55, i_98^0'=i_98^post_55, l_27^0'=l_27^post_55, nd_12^0'=nd_12^post_55, r_135^0'=r_135^post_55, r_37^0'=r_37^post_55, r_57^0'=r_57^post_55, r_92^0'=r_92^post_55, rt_11^0'=rt_11^post_55, rv_13^0'=rv_13^post_55, rv_31^0'=rv_31^post_55, st_16^0'=st_16^post_55, st_29^0'=st_29^post_55, t_24^0'=t_24^post_55, t_32^0'=t_32^post_55, tp_33^0'=tp_33^post_55, x_134^0'=x_134^post_55, x_14^0'=x_14^post_55, x_17^0'=x_17^post_55, x_19^0'=x_19^post_55, x_21^0'=x_21^post_55, y_20^0'=y_20^post_55, [ a_123^0==a_123^post_55 && a_136^0==a_136^post_55 && a_76^0==a_76^post_55 && ct_18^0==ct_18^post_55 && h_15^0==h_15^post_55 && h_30^0==h_30^post_55 && i_115^0==i_115^post_55 && i_28^0==i_28^post_55 && i_98^0==i_98^post_55 && l_27^0==l_27^post_55 && nd_12^0==nd_12^post_55 && r_135^0==r_135^post_55 && r_37^0==r_37^post_55 && r_57^0==r_57^post_55 && r_92^0==r_92^post_55 && rt_11^0==rt_11^post_55 && rv_13^0==rv_13^post_55 && rv_31^0==rv_31^post_55 && st_16^0==st_16^post_55 && st_29^0==st_29^post_55 && t_24^0==t_24^post_55 && t_32^0==t_32^post_55 && tp_33^0==tp_33^post_55 && x_134^0==x_134^post_55 && x_14^0==x_14^post_55 && x_17^0==x_17^post_55 && x_19^0==x_19^post_55 && x_21^0==x_21^post_55 && y_20^0==y_20^post_55 ], cost: 1 Simplified all rules, resulting in: Start location: l35 0: l0 -> l1 : h_30^0'=0, i_28^0'=0, l_27^0'=nd_12^1_1, nd_12^0'=nd_12^post_1, rv_13^0'=nd_12^1_1, [], cost: 1 53: l1 -> l2 : h_30^0'=tp_33^0, i_28^0'=1+i_28^0, rv_13^0'=l_27^0, rv_31^0'=tp_33^0, t_32^0'=tp_33^0, tp_33^0'=tp_33^post_54, [ 1+i_28^0<=l_27^0 && -i_28^0==0 ], cost: 1 21: l2 -> l16 : a_76^0'=2, h_30^0'=tp_33^0, i_28^0'=2, r_57^0'=r_57^post_22, rv_13^0'=l_27^0, rv_31^0'=tp_33^0, t_32^0'=tp_33^0, tp_33^0'=tp_33^post_22, [ 1+i_28^0<=l_27^0 && 2<=l_27^0 ], cost: 1 44: l16 -> l31 : h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, l_27^0'=l_27^post_45, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=h_30^0, [ 0<=i_28^0 && l_27^0<=i_28^0 && 2<=i_28^post_45 ], cost: 1 50: l16 -> l34 : h_30^0'=tp_33^0, i_28^0'=1+i_28^0, i_98^0'=i_28^0, r_92^0'=r_92^post_51, t_32^0'=tp_33^0, tp_33^0'=tp_33^post_51, [ 0<=i_28^0 && 1+i_28^0<=l_27^0 ], cost: 1 34: l17 -> l26 : h_15^0'=h_15^post_35, rv_13^0'=rv_13^post_35, x_134^0'=x_134^post_35, [ 0<=a_123^0 ], cost: 1 35: l26 -> l27 : [ 1<=x_14^0 ], cost: 1 36: l26 -> l27 : [ 1+x_14^0<=0 ], cost: 1 37: l27 -> l28 : a_136^0'=a_123^0, r_135^0'=r_37^0, [ -x_134^0+x_14^0==0 ], cost: 1 38: l28 -> l29 : [ 1<=h_15^0 ], cost: 1 39: l28 -> l29 : [ 1+h_15^0<=0 ], cost: 1 40: l29 -> l30 : [ 1<=x_134^0 ], cost: 1 41: l29 -> l30 : [ 1+x_134^0<=0 ], cost: 1 42: l30 -> l25 : a_123^0'=a_136^0, r_37^0'=r_135^0, [ 2<=rv_13^0 ], cost: 1 43: l25 -> l17 : [], cost: 1 45: l31 -> l32 : [ 1<=x_14^0 ], cost: 1 46: l31 -> l32 : [ 1+x_14^0<=0 ], cost: 1 47: l32 -> l33 : [ 1<=h_15^0 ], cost: 1 48: l32 -> l33 : [ 1+h_15^0<=0 ], cost: 1 49: l33 -> l17 : [ 2<=rv_13^0 && rv_13^0<=i_115^0 ], cost: 1 51: l34 -> l16 : [], cost: 1 54: l35 -> l0 : [], cost: 1 ### Simplification by acceleration and chaining ### Eliminated locations (on linear paths): Start location: l35 44: l16 -> l31 : h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, l_27^0'=l_27^post_45, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=h_30^0, [ 0<=i_28^0 && l_27^0<=i_28^0 && 2<=i_28^post_45 ], cost: 1 58: l16 -> l16 : h_30^0'=tp_33^0, i_28^0'=1+i_28^0, i_98^0'=i_28^0, r_92^0'=r_92^post_51, t_32^0'=tp_33^0, tp_33^0'=tp_33^post_51, [ 0<=i_28^0 && 1+i_28^0<=l_27^0 ], cost: 2 34: l17 -> l26 : h_15^0'=h_15^post_35, rv_13^0'=rv_13^post_35, x_134^0'=x_134^post_35, [ 0<=a_123^0 ], cost: 1 35: l26 -> l27 : [ 1<=x_14^0 ], cost: 1 36: l26 -> l27 : [ 1+x_14^0<=0 ], cost: 1 37: l27 -> l28 : a_136^0'=a_123^0, r_135^0'=r_37^0, [ -x_134^0+x_14^0==0 ], cost: 1 38: l28 -> l29 : [ 1<=h_15^0 ], cost: 1 39: l28 -> l29 : [ 1+h_15^0<=0 ], cost: 1 40: l29 -> l30 : [ 1<=x_134^0 ], cost: 1 41: l29 -> l30 : [ 1+x_134^0<=0 ], cost: 1 59: l30 -> l17 : a_123^0'=a_136^0, r_37^0'=r_135^0, [ 2<=rv_13^0 ], cost: 2 45: l31 -> l32 : [ 1<=x_14^0 ], cost: 1 46: l31 -> l32 : [ 1+x_14^0<=0 ], cost: 1 47: l32 -> l33 : [ 1<=h_15^0 ], cost: 1 48: l32 -> l33 : [ 1+h_15^0<=0 ], cost: 1 49: l33 -> l17 : [ 2<=rv_13^0 && rv_13^0<=i_115^0 ], cost: 1 57: l35 -> l16 : a_76^0'=2, h_30^0'=tp_33^post_54, i_28^0'=2, l_27^0'=nd_12^1_1, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, rv_13^0'=nd_12^1_1, rv_31^0'=tp_33^post_54, t_32^0'=tp_33^post_54, tp_33^0'=tp_33^post_22, [ 2<=nd_12^1_1 ], cost: 4 Accelerating simple loops of location 16. Accelerating the following rules: 58: l16 -> l16 : h_30^0'=tp_33^0, i_28^0'=1+i_28^0, i_98^0'=i_28^0, r_92^0'=r_92^post_51, t_32^0'=tp_33^0, tp_33^0'=tp_33^post_51, [ 0<=i_28^0 && 1+i_28^0<=l_27^0 ], cost: 2 Accelerated rule 58 with backward acceleration, yielding the new rule 60. [accelerate] Nesting with 1 inner and 1 outer candidates Removing the simple loops: 58. Accelerated all simple loops using metering functions (where possible): Start location: l35 44: l16 -> l31 : h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, l_27^0'=l_27^post_45, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=h_30^0, [ 0<=i_28^0 && l_27^0<=i_28^0 && 2<=i_28^post_45 ], cost: 1 60: l16 -> l16 : h_30^0'=tp_33^post_51, i_28^0'=l_27^0, i_98^0'=-1+l_27^0, r_92^0'=r_92^post_51, t_32^0'=tp_33^post_51, tp_33^0'=tp_33^post_51, [ 0<=i_28^0 && -i_28^0+l_27^0>=1 ], cost: -2*i_28^0+2*l_27^0 34: l17 -> l26 : h_15^0'=h_15^post_35, rv_13^0'=rv_13^post_35, x_134^0'=x_134^post_35, [ 0<=a_123^0 ], cost: 1 35: l26 -> l27 : [ 1<=x_14^0 ], cost: 1 36: l26 -> l27 : [ 1+x_14^0<=0 ], cost: 1 37: l27 -> l28 : a_136^0'=a_123^0, r_135^0'=r_37^0, [ -x_134^0+x_14^0==0 ], cost: 1 38: l28 -> l29 : [ 1<=h_15^0 ], cost: 1 39: l28 -> l29 : [ 1+h_15^0<=0 ], cost: 1 40: l29 -> l30 : [ 1<=x_134^0 ], cost: 1 41: l29 -> l30 : [ 1+x_134^0<=0 ], cost: 1 59: l30 -> l17 : a_123^0'=a_136^0, r_37^0'=r_135^0, [ 2<=rv_13^0 ], cost: 2 45: l31 -> l32 : [ 1<=x_14^0 ], cost: 1 46: l31 -> l32 : [ 1+x_14^0<=0 ], cost: 1 47: l32 -> l33 : [ 1<=h_15^0 ], cost: 1 48: l32 -> l33 : [ 1+h_15^0<=0 ], cost: 1 49: l33 -> l17 : [ 2<=rv_13^0 && rv_13^0<=i_115^0 ], cost: 1 57: l35 -> l16 : a_76^0'=2, h_30^0'=tp_33^post_54, i_28^0'=2, l_27^0'=nd_12^1_1, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, rv_13^0'=nd_12^1_1, rv_31^0'=tp_33^post_54, t_32^0'=tp_33^post_54, tp_33^0'=tp_33^post_22, [ 2<=nd_12^1_1 ], cost: 4 Chained accelerated rules (with incoming rules): Start location: l35 44: l16 -> l31 : h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, l_27^0'=l_27^post_45, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=h_30^0, [ 0<=i_28^0 && l_27^0<=i_28^0 && 2<=i_28^post_45 ], cost: 1 34: l17 -> l26 : h_15^0'=h_15^post_35, rv_13^0'=rv_13^post_35, x_134^0'=x_134^post_35, [ 0<=a_123^0 ], cost: 1 35: l26 -> l27 : [ 1<=x_14^0 ], cost: 1 36: l26 -> l27 : [ 1+x_14^0<=0 ], cost: 1 37: l27 -> l28 : a_136^0'=a_123^0, r_135^0'=r_37^0, [ -x_134^0+x_14^0==0 ], cost: 1 38: l28 -> l29 : [ 1<=h_15^0 ], cost: 1 39: l28 -> l29 : [ 1+h_15^0<=0 ], cost: 1 40: l29 -> l30 : [ 1<=x_134^0 ], cost: 1 41: l29 -> l30 : [ 1+x_134^0<=0 ], cost: 1 59: l30 -> l17 : a_123^0'=a_136^0, r_37^0'=r_135^0, [ 2<=rv_13^0 ], cost: 2 45: l31 -> l32 : [ 1<=x_14^0 ], cost: 1 46: l31 -> l32 : [ 1+x_14^0<=0 ], cost: 1 47: l32 -> l33 : [ 1<=h_15^0 ], cost: 1 48: l32 -> l33 : [ 1+h_15^0<=0 ], cost: 1 49: l33 -> l17 : [ 2<=rv_13^0 && rv_13^0<=i_115^0 ], cost: 1 57: l35 -> l16 : a_76^0'=2, h_30^0'=tp_33^post_54, i_28^0'=2, l_27^0'=nd_12^1_1, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, rv_13^0'=nd_12^1_1, rv_31^0'=tp_33^post_54, t_32^0'=tp_33^post_54, tp_33^0'=tp_33^post_22, [ 2<=nd_12^1_1 ], cost: 4 61: l35 -> l16 : a_76^0'=2, h_30^0'=tp_33^post_51, i_28^0'=nd_12^1_1, i_98^0'=-1+nd_12^1_1, l_27^0'=nd_12^1_1, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rv_13^0'=nd_12^1_1, rv_31^0'=tp_33^post_54, t_32^0'=tp_33^post_51, tp_33^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 ], cost: 2*nd_12^1_1 Eliminated locations (on tree-shaped paths): Start location: l35 68: l17 -> l27 : h_15^0'=h_15^post_35, rv_13^0'=rv_13^post_35, x_134^0'=x_134^post_35, [ 0<=a_123^0 && 1<=x_14^0 ], cost: 2 69: l17 -> l27 : h_15^0'=h_15^post_35, rv_13^0'=rv_13^post_35, x_134^0'=x_134^post_35, [ 0<=a_123^0 && 1+x_14^0<=0 ], cost: 2 70: l27 -> l29 : a_136^0'=a_123^0, r_135^0'=r_37^0, [ -x_134^0+x_14^0==0 && 1<=h_15^0 ], cost: 2 71: l27 -> l29 : a_136^0'=a_123^0, r_135^0'=r_37^0, [ -x_134^0+x_14^0==0 && 1+h_15^0<=0 ], cost: 2 72: l29 -> l17 : a_123^0'=a_136^0, r_37^0'=r_135^0, [ 1<=x_134^0 && 2<=rv_13^0 ], cost: 3 73: l29 -> l17 : a_123^0'=a_136^0, r_37^0'=r_135^0, [ 1+x_134^0<=0 && 2<=rv_13^0 ], cost: 3 64: l31 -> l33 : [ 1<=x_14^0 && 1<=h_15^0 ], cost: 2 65: l31 -> l33 : [ 1<=x_14^0 && 1+h_15^0<=0 ], cost: 2 66: l31 -> l33 : [ 1+x_14^0<=0 && 1<=h_15^0 ], cost: 2 67: l31 -> l33 : [ 1+x_14^0<=0 && 1+h_15^0<=0 ], cost: 2 49: l33 -> l17 : [ 2<=rv_13^0 && rv_13^0<=i_115^0 ], cost: 1 62: l35 -> l31 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_54, [ 2<=nd_12^1_1 && nd_12^1_1<=2 && 2<=i_28^post_45 ], cost: 5 63: l35 -> l31 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 ], cost: 1+2*nd_12^1_1 Eliminated locations (on tree-shaped paths): Start location: l35 82: l17 -> l29 : a_136^0'=a_123^0, h_15^0'=h_15^post_35, r_135^0'=r_37^0, rv_13^0'=rv_13^post_35, x_134^0'=x_134^post_35, [ 0<=a_123^0 && 1<=x_14^0 && -x_134^post_35+x_14^0==0 && 1<=h_15^post_35 ], cost: 4 83: l17 -> l29 : a_136^0'=a_123^0, h_15^0'=h_15^post_35, r_135^0'=r_37^0, rv_13^0'=rv_13^post_35, x_134^0'=x_134^post_35, [ 0<=a_123^0 && 1<=x_14^0 && -x_134^post_35+x_14^0==0 && 1+h_15^post_35<=0 ], cost: 4 84: l17 -> l29 : a_136^0'=a_123^0, h_15^0'=h_15^post_35, r_135^0'=r_37^0, rv_13^0'=rv_13^post_35, x_134^0'=x_134^post_35, [ 0<=a_123^0 && 1+x_14^0<=0 && -x_134^post_35+x_14^0==0 && 1<=h_15^post_35 ], cost: 4 85: l17 -> l29 : a_136^0'=a_123^0, h_15^0'=h_15^post_35, r_135^0'=r_37^0, rv_13^0'=rv_13^post_35, x_134^0'=x_134^post_35, [ 0<=a_123^0 && 1+x_14^0<=0 && -x_134^post_35+x_14^0==0 && 1+h_15^post_35<=0 ], cost: 4 72: l29 -> l17 : a_123^0'=a_136^0, r_37^0'=r_135^0, [ 1<=x_134^0 && 2<=rv_13^0 ], cost: 3 73: l29 -> l17 : a_123^0'=a_136^0, r_37^0'=r_135^0, [ 1+x_134^0<=0 && 2<=rv_13^0 ], cost: 3 49: l33 -> l17 : [ 2<=rv_13^0 && rv_13^0<=i_115^0 ], cost: 1 74: l35 -> l33 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_54, [ 2<=nd_12^1_1 && nd_12^1_1<=2 && 2<=i_28^post_45 && 1<=tp_33^post_54 && 1<=h_15^post_45 ], cost: 7 75: l35 -> l33 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_54, [ 2<=nd_12^1_1 && nd_12^1_1<=2 && 2<=i_28^post_45 && 1<=tp_33^post_54 && 1+h_15^post_45<=0 ], cost: 7 76: l35 -> l33 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_54, [ 2<=nd_12^1_1 && nd_12^1_1<=2 && 2<=i_28^post_45 && 1+tp_33^post_54<=0 && 1<=h_15^post_45 ], cost: 7 77: l35 -> l33 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_54, [ 2<=nd_12^1_1 && nd_12^1_1<=2 && 2<=i_28^post_45 && 1+tp_33^post_54<=0 && 1+h_15^post_45<=0 ], cost: 7 78: l35 -> l33 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1<=tp_33^post_51 && 1<=h_15^post_45 ], cost: 3+2*nd_12^1_1 79: l35 -> l33 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1<=tp_33^post_51 && 1+h_15^post_45<=0 ], cost: 3+2*nd_12^1_1 80: l35 -> l33 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1+tp_33^post_51<=0 && 1<=h_15^post_45 ], cost: 3+2*nd_12^1_1 81: l35 -> l33 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1+tp_33^post_51<=0 && 1+h_15^post_45<=0 ], cost: 3+2*nd_12^1_1 Applied pruning (of leafs and parallel rules): Start location: l35 82: l17 -> l29 : a_136^0'=a_123^0, h_15^0'=h_15^post_35, r_135^0'=r_37^0, rv_13^0'=rv_13^post_35, x_134^0'=x_134^post_35, [ 0<=a_123^0 && 1<=x_14^0 && -x_134^post_35+x_14^0==0 && 1<=h_15^post_35 ], cost: 4 83: l17 -> l29 : a_136^0'=a_123^0, h_15^0'=h_15^post_35, r_135^0'=r_37^0, rv_13^0'=rv_13^post_35, x_134^0'=x_134^post_35, [ 0<=a_123^0 && 1<=x_14^0 && -x_134^post_35+x_14^0==0 && 1+h_15^post_35<=0 ], cost: 4 84: l17 -> l29 : a_136^0'=a_123^0, h_15^0'=h_15^post_35, r_135^0'=r_37^0, rv_13^0'=rv_13^post_35, x_134^0'=x_134^post_35, [ 0<=a_123^0 && 1+x_14^0<=0 && -x_134^post_35+x_14^0==0 && 1<=h_15^post_35 ], cost: 4 85: l17 -> l29 : a_136^0'=a_123^0, h_15^0'=h_15^post_35, r_135^0'=r_37^0, rv_13^0'=rv_13^post_35, x_134^0'=x_134^post_35, [ 0<=a_123^0 && 1+x_14^0<=0 && -x_134^post_35+x_14^0==0 && 1+h_15^post_35<=0 ], cost: 4 72: l29 -> l17 : a_123^0'=a_136^0, r_37^0'=r_135^0, [ 1<=x_134^0 && 2<=rv_13^0 ], cost: 3 73: l29 -> l17 : a_123^0'=a_136^0, r_37^0'=r_135^0, [ 1+x_134^0<=0 && 2<=rv_13^0 ], cost: 3 49: l33 -> l17 : [ 2<=rv_13^0 && rv_13^0<=i_115^0 ], cost: 1 77: l35 -> l33 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_54, [ 2<=nd_12^1_1 && nd_12^1_1<=2 && 2<=i_28^post_45 && 1+tp_33^post_54<=0 && 1+h_15^post_45<=0 ], cost: 7 78: l35 -> l33 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1<=tp_33^post_51 && 1<=h_15^post_45 ], cost: 3+2*nd_12^1_1 79: l35 -> l33 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1<=tp_33^post_51 && 1+h_15^post_45<=0 ], cost: 3+2*nd_12^1_1 80: l35 -> l33 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1+tp_33^post_51<=0 && 1<=h_15^post_45 ], cost: 3+2*nd_12^1_1 81: l35 -> l33 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1+tp_33^post_51<=0 && 1+h_15^post_45<=0 ], cost: 3+2*nd_12^1_1 Eliminated locations (on tree-shaped paths): Start location: l35 91: l17 -> l17 : a_123^0'=a_123^0, a_136^0'=a_123^0, h_15^0'=h_15^post_35, r_135^0'=r_37^0, r_37^0'=r_37^0, rv_13^0'=rv_13^post_35, x_134^0'=x_134^post_35, [ 0<=a_123^0 && 1<=x_14^0 && -x_134^post_35+x_14^0==0 && 1<=h_15^post_35 && 1<=x_134^post_35 && 2<=rv_13^post_35 ], cost: 7 92: l17 -> l17 : a_123^0'=a_123^0, a_136^0'=a_123^0, h_15^0'=h_15^post_35, r_135^0'=r_37^0, r_37^0'=r_37^0, rv_13^0'=rv_13^post_35, x_134^0'=x_134^post_35, [ 0<=a_123^0 && 1<=x_14^0 && -x_134^post_35+x_14^0==0 && 1+h_15^post_35<=0 && 1<=x_134^post_35 && 2<=rv_13^post_35 ], cost: 7 93: l17 -> l17 : a_123^0'=a_123^0, a_136^0'=a_123^0, h_15^0'=h_15^post_35, r_135^0'=r_37^0, r_37^0'=r_37^0, rv_13^0'=rv_13^post_35, x_134^0'=x_134^post_35, [ 0<=a_123^0 && 1+x_14^0<=0 && -x_134^post_35+x_14^0==0 && 1<=h_15^post_35 && 1+x_134^post_35<=0 && 2<=rv_13^post_35 ], cost: 7 94: l17 -> l17 : a_123^0'=a_123^0, a_136^0'=a_123^0, h_15^0'=h_15^post_35, r_135^0'=r_37^0, r_37^0'=r_37^0, rv_13^0'=rv_13^post_35, x_134^0'=x_134^post_35, [ 0<=a_123^0 && 1+x_14^0<=0 && -x_134^post_35+x_14^0==0 && 1+h_15^post_35<=0 && 1+x_134^post_35<=0 && 2<=rv_13^post_35 ], cost: 7 86: l35 -> l17 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_54, [ 2<=nd_12^1_1 && nd_12^1_1<=2 && 2<=i_28^post_45 && 1+tp_33^post_54<=0 && 1+h_15^post_45<=0 && 2<=rv_13^post_45 && rv_13^post_45<=i_115^post_45 ], cost: 8 87: l35 -> l17 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1<=tp_33^post_51 && 1<=h_15^post_45 && 2<=rv_13^post_45 && rv_13^post_45<=i_115^post_45 ], cost: 4+2*nd_12^1_1 88: l35 -> l17 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1<=tp_33^post_51 && 1+h_15^post_45<=0 && 2<=rv_13^post_45 && rv_13^post_45<=i_115^post_45 ], cost: 4+2*nd_12^1_1 89: l35 -> l17 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1+tp_33^post_51<=0 && 1<=h_15^post_45 && 2<=rv_13^post_45 && rv_13^post_45<=i_115^post_45 ], cost: 4+2*nd_12^1_1 90: l35 -> l17 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1+tp_33^post_51<=0 && 1+h_15^post_45<=0 && 2<=rv_13^post_45 && rv_13^post_45<=i_115^post_45 ], cost: 4+2*nd_12^1_1 Accelerating simple loops of location 17. Simplified some of the simple loops (and removed duplicate rules). Accelerating the following rules: 91: l17 -> l17 : a_136^0'=a_123^0, h_15^0'=h_15^post_35, r_135^0'=r_37^0, rv_13^0'=rv_13^post_35, x_134^0'=x_14^0, [ 0<=a_123^0 && 1<=x_14^0 && 1<=h_15^post_35 && 2<=rv_13^post_35 ], cost: 7 92: l17 -> l17 : a_136^0'=a_123^0, h_15^0'=h_15^post_35, r_135^0'=r_37^0, rv_13^0'=rv_13^post_35, x_134^0'=x_14^0, [ 0<=a_123^0 && 1<=x_14^0 && 1+h_15^post_35<=0 && 2<=rv_13^post_35 ], cost: 7 93: l17 -> l17 : a_136^0'=a_123^0, h_15^0'=h_15^post_35, r_135^0'=r_37^0, rv_13^0'=rv_13^post_35, x_134^0'=x_14^0, [ 0<=a_123^0 && 1+x_14^0<=0 && 1<=h_15^post_35 && 2<=rv_13^post_35 ], cost: 7 94: l17 -> l17 : a_136^0'=a_123^0, h_15^0'=h_15^post_35, r_135^0'=r_37^0, rv_13^0'=rv_13^post_35, x_134^0'=x_14^0, [ 0<=a_123^0 && 1+x_14^0<=0 && 1+h_15^post_35<=0 && 2<=rv_13^post_35 ], cost: 7 Accelerated rule 91 with non-termination, yielding the new rule 95. Accelerated rule 92 with non-termination, yielding the new rule 96. Accelerated rule 93 with non-termination, yielding the new rule 97. Accelerated rule 94 with non-termination, yielding the new rule 98. [accelerate] Nesting with 0 inner and 0 outer candidates Removing the simple loops: 91 92 93 94. Accelerated all simple loops using metering functions (where possible): Start location: l35 95: l17 -> [37] : [ 0<=a_123^0 && 1<=x_14^0 && 1<=h_15^post_35 && 2<=rv_13^post_35 ], cost: NONTERM 96: l17 -> [37] : [ 0<=a_123^0 && 1<=x_14^0 && 1+h_15^post_35<=0 && 2<=rv_13^post_35 ], cost: NONTERM 97: l17 -> [37] : [ 0<=a_123^0 && 1+x_14^0<=0 && 1<=h_15^post_35 && 2<=rv_13^post_35 ], cost: NONTERM 98: l17 -> [37] : [ 0<=a_123^0 && 1+x_14^0<=0 && 1+h_15^post_35<=0 && 2<=rv_13^post_35 ], cost: NONTERM 86: l35 -> l17 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_54, [ 2<=nd_12^1_1 && nd_12^1_1<=2 && 2<=i_28^post_45 && 1+tp_33^post_54<=0 && 1+h_15^post_45<=0 && 2<=rv_13^post_45 && rv_13^post_45<=i_115^post_45 ], cost: 8 87: l35 -> l17 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1<=tp_33^post_51 && 1<=h_15^post_45 && 2<=rv_13^post_45 && rv_13^post_45<=i_115^post_45 ], cost: 4+2*nd_12^1_1 88: l35 -> l17 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1<=tp_33^post_51 && 1+h_15^post_45<=0 && 2<=rv_13^post_45 && rv_13^post_45<=i_115^post_45 ], cost: 4+2*nd_12^1_1 89: l35 -> l17 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1+tp_33^post_51<=0 && 1<=h_15^post_45 && 2<=rv_13^post_45 && rv_13^post_45<=i_115^post_45 ], cost: 4+2*nd_12^1_1 90: l35 -> l17 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1+tp_33^post_51<=0 && 1+h_15^post_45<=0 && 2<=rv_13^post_45 && rv_13^post_45<=i_115^post_45 ], cost: 4+2*nd_12^1_1 Chained accelerated rules (with incoming rules): Start location: l35 86: l35 -> l17 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_54, [ 2<=nd_12^1_1 && nd_12^1_1<=2 && 2<=i_28^post_45 && 1+tp_33^post_54<=0 && 1+h_15^post_45<=0 && 2<=rv_13^post_45 && rv_13^post_45<=i_115^post_45 ], cost: 8 87: l35 -> l17 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1<=tp_33^post_51 && 1<=h_15^post_45 && 2<=rv_13^post_45 && rv_13^post_45<=i_115^post_45 ], cost: 4+2*nd_12^1_1 88: l35 -> l17 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1<=tp_33^post_51 && 1+h_15^post_45<=0 && 2<=rv_13^post_45 && rv_13^post_45<=i_115^post_45 ], cost: 4+2*nd_12^1_1 89: l35 -> l17 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1+tp_33^post_51<=0 && 1<=h_15^post_45 && 2<=rv_13^post_45 && rv_13^post_45<=i_115^post_45 ], cost: 4+2*nd_12^1_1 90: l35 -> l17 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1+tp_33^post_51<=0 && 1+h_15^post_45<=0 && 2<=rv_13^post_45 && rv_13^post_45<=i_115^post_45 ], cost: 4+2*nd_12^1_1 99: l35 -> [37] : [ 0<=a_123^0 ], cost: NONTERM 100: l35 -> [37] : [ 0<=a_123^0 ], cost: NONTERM 101: l35 -> [37] : [ 0<=a_123^0 ], cost: NONTERM 102: l35 -> [37] : [ 0<=a_123^0 ], cost: NONTERM 103: l35 -> [37] : [ 0<=a_123^0 ], cost: NONTERM 104: l35 -> [37] : [ 0<=a_123^0 ], cost: NONTERM 105: l35 -> [37] : [ 0<=a_123^0 ], cost: NONTERM 106: l35 -> [37] : [ 0<=a_123^0 ], cost: NONTERM 107: l35 -> [37] : [ 0<=a_123^0 ], cost: NONTERM 108: l35 -> [37] : [ 0<=a_123^0 ], cost: NONTERM Removed unreachable locations (and leaf rules with constant cost): Start location: l35 87: l35 -> l17 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1<=tp_33^post_51 && 1<=h_15^post_45 && 2<=rv_13^post_45 && rv_13^post_45<=i_115^post_45 ], cost: 4+2*nd_12^1_1 88: l35 -> l17 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1<=tp_33^post_51 && 1+h_15^post_45<=0 && 2<=rv_13^post_45 && rv_13^post_45<=i_115^post_45 ], cost: 4+2*nd_12^1_1 89: l35 -> l17 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1+tp_33^post_51<=0 && 1<=h_15^post_45 && 2<=rv_13^post_45 && rv_13^post_45<=i_115^post_45 ], cost: 4+2*nd_12^1_1 90: l35 -> l17 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1+tp_33^post_51<=0 && 1+h_15^post_45<=0 && 2<=rv_13^post_45 && rv_13^post_45<=i_115^post_45 ], cost: 4+2*nd_12^1_1 99: l35 -> [37] : [ 0<=a_123^0 ], cost: NONTERM 100: l35 -> [37] : [ 0<=a_123^0 ], cost: NONTERM 101: l35 -> [37] : [ 0<=a_123^0 ], cost: NONTERM 102: l35 -> [37] : [ 0<=a_123^0 ], cost: NONTERM 103: l35 -> [37] : [ 0<=a_123^0 ], cost: NONTERM 104: l35 -> [37] : [ 0<=a_123^0 ], cost: NONTERM 105: l35 -> [37] : [ 0<=a_123^0 ], cost: NONTERM 106: l35 -> [37] : [ 0<=a_123^0 ], cost: NONTERM 107: l35 -> [37] : [ 0<=a_123^0 ], cost: NONTERM 108: l35 -> [37] : [ 0<=a_123^0 ], cost: NONTERM ### Computing asymptotic complexity ### Fully simplified ITS problem Start location: l35 87: l35 -> l17 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1<=tp_33^post_51 && 1<=h_15^post_45 && 2<=rv_13^post_45 && rv_13^post_45<=i_115^post_45 ], cost: 4+2*nd_12^1_1 88: l35 -> l17 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1<=tp_33^post_51 && 1+h_15^post_45<=0 && 2<=rv_13^post_45 && rv_13^post_45<=i_115^post_45 ], cost: 4+2*nd_12^1_1 89: l35 -> l17 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1+tp_33^post_51<=0 && 1<=h_15^post_45 && 2<=rv_13^post_45 && rv_13^post_45<=i_115^post_45 ], cost: 4+2*nd_12^1_1 90: l35 -> l17 : a_76^0'=2, h_15^0'=h_15^post_45, h_30^0'=h_30^post_45, i_115^0'=i_115^post_45, i_28^0'=i_28^post_45, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_45, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_22, r_92^0'=r_92^post_51, rt_11^0'=rt_11^post_45, rv_13^0'=rv_13^post_45, rv_31^0'=rv_31^post_45, st_29^0'=st_29^post_45, t_32^0'=t_32^post_45, tp_33^0'=tp_33^post_45, x_14^0'=tp_33^post_51, [ -2+nd_12^1_1>=1 && 2<=i_28^post_45 && 1+tp_33^post_51<=0 && 1+h_15^post_45<=0 && 2<=rv_13^post_45 && rv_13^post_45<=i_115^post_45 ], cost: 4+2*nd_12^1_1 108: l35 -> [37] : [ 0<=a_123^0 ], cost: NONTERM Computing asymptotic complexity for rule 108 Guard is satisfiable, yielding nontermination Resulting cost NONTERM has complexity: Nonterm Found new complexity Nonterm. Obtained the following overall complexity (w.r.t. the length of the input n): Complexity: Nonterm Cpx degree: Nonterm Solved cost: NONTERM Rule cost: NONTERM Rule guard: [ 0<=a_123^0 ] NO