WORST_CASE(Omega(1),?) ### Pre-processing the ITS problem ### Initial linear ITS problem Start location: l14 0: l0 -> l1 : a_123^0'=a_123^post_1, a_158^0'=a_158^post_1, a_204^0'=a_204^post_1, a_239^0'=a_239^post_1, a_264^0'=a_264^post_1, a_290^0'=a_290^post_1, a_76^0'=a_76^post_1, ct_18^0'=ct_18^post_1, f_190^0'=f_190^post_1, h_15^0'=h_15^post_1, h_30^0'=h_30^post_1, i_115^0'=i_115^post_1, i_187^0'=i_187^post_1, i_28^0'=i_28^post_1, i_98^0'=i_98^post_1, l_143^0'=l_143^post_1, l_203^0'=l_203^post_1, l_27^0'=l_27^post_1, nd_12^0'=nd_12^post_1, r_135^0'=r_135^post_1, r_183^0'=r_183^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_140^0'=x_140^post_1, x_14^0'=x_14^post_1, x_17^0'=x_17^post_1, x_195^0'=x_195^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_158^0==a_158^post_1 && a_204^0==a_204^post_1 && a_239^0==a_239^post_1 && a_264^0==a_264^post_1 && a_290^0==a_290^post_1 && a_76^0==a_76^post_1 && ct_18^0==ct_18^post_1 && f_190^0==f_190^post_1 && h_15^0==h_15^post_1 && i_115^0==i_115^post_1 && i_187^0==i_187^post_1 && i_98^0==i_98^post_1 && l_143^0==l_143^post_1 && l_203^0==l_203^post_1 && r_135^0==r_135^post_1 && r_183^0==r_183^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_14^0==x_14^post_1 && x_140^0==x_140^post_1 && x_17^0==x_17^post_1 && x_19^0==x_19^post_1 && x_195^0==x_195^post_1 && x_21^0==x_21^post_1 && y_20^0==y_20^post_1 ], cost: 1 18: l1 -> l3 : a_123^0'=a_123^post_19, a_158^0'=a_158^post_19, a_204^0'=a_204^post_19, a_239^0'=a_239^post_19, a_264^0'=a_264^post_19, a_290^0'=a_290^post_19, a_76^0'=a_76^post_19, ct_18^0'=ct_18^post_19, f_190^0'=f_190^post_19, h_15^0'=h_15^post_19, h_30^0'=h_30^post_19, i_115^0'=i_115^post_19, i_187^0'=i_187^post_19, i_28^0'=i_28^post_19, i_98^0'=i_98^post_19, l_143^0'=l_143^post_19, l_203^0'=l_203^post_19, l_27^0'=l_27^post_19, nd_12^0'=nd_12^post_19, r_135^0'=r_135^post_19, r_183^0'=r_183^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_140^0'=x_140^post_19, x_14^0'=x_14^post_19, x_17^0'=x_17^post_19, x_195^0'=x_195^post_19, x_19^0'=x_19^post_19, x_21^0'=x_21^post_19, y_20^0'=y_20^post_19, [ rv_13^1_2_1==rv_13^1_2_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_19==l_27^post_19 && i_28^post_19==i_28^post_19 && st_29^post_19==st_29^post_19 && h_30^post_19==h_30^post_19 && rv_31^post_19==rv_31^post_19 && t_32^post_19==t_32^post_19 && tp_33^post_19==tp_33^post_19 && h_15^post_19==rt_11^1_3_1 && rt_11^2_2_1==rt_11^2_2_1 && x_14^post_19==h_15^post_19 && 0<=x_14^post_19 && x_14^post_19<=0 && 0<=h_15^post_19 && h_15^post_19<=0 && x_14^post_19<=h_15^post_19 && h_15^post_19<=x_14^post_19 && rv_13^1_2_1<=0 && rv_13^2_2_1==rv_13^2_2_1 && 0<=x_14^post_19 && x_14^post_19<=0 && x_17^1_2_1==h_15^post_19 && ct_18^1_4==0 && x_19^1_4_1==x_17^1_2_1 && y_20^1_4_1==ct_18^1_4 && x_21^1_4_1==x_19^1_4_1 && 0<=x_14^post_19 && x_14^post_19<=0 && 0<=h_15^post_19 && h_15^post_19<=0 && 0<=x_17^1_2_1 && x_17^1_2_1<=0 && 0<=ct_18^1_4 && ct_18^1_4<=0 && 0<=x_19^1_4_1 && x_19^1_4_1<=0 && 0<=y_20^1_4_1 && y_20^1_4_1<=0 && 0<=x_21^1_4_1 && x_21^1_4_1<=0 && x_14^post_19<=h_15^post_19 && h_15^post_19<=x_14^post_19 && h_15^post_19<=x_17^1_2_1 && x_17^1_2_1<=h_15^post_19 && x_17^1_2_1<=x_19^1_4_1 && x_19^1_4_1<=x_17^1_2_1 && ct_18^1_4<=y_20^1_4_1 && y_20^1_4_1<=ct_18^1_4 && x_19^1_4_1<=x_21^1_4_1 && x_21^1_4_1<=x_19^1_4_1 && rv_13^2_2_1<=0 && rv_13^post_19==rv_13^post_19 && y_20^1_4_1<=x_21^1_4_1 && x_21^1_4_1<=y_20^1_4_1 && x_19^2_2_1==x_19^2_2_1 && y_20^2_2_1==y_20^2_2_1 && x_21^2_2_1==x_21^2_2_1 && t_24^1_4_1==t_24^1_4_1 && ct_18^2_2_1==ct_18^2_2_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 && rv_13^post_19<=0 && a_123^0==a_123^post_19 && a_158^0==a_158^post_19 && a_204^0==a_204^post_19 && a_239^0==a_239^post_19 && a_264^0==a_264^post_19 && a_290^0==a_290^post_19 && a_76^0==a_76^post_19 && f_190^0==f_190^post_19 && i_115^0==i_115^post_19 && i_187^0==i_187^post_19 && i_98^0==i_98^post_19 && l_143^0==l_143^post_19 && l_203^0==l_203^post_19 && nd_12^0==nd_12^post_19 && r_135^0==r_135^post_19 && r_183^0==r_183^post_19 && r_37^0==r_37^post_19 && r_57^0==r_57^post_19 && r_92^0==r_92^post_19 && st_16^0==st_16^post_19 && x_140^0==x_140^post_19 && x_195^0==x_195^post_19 ], cost: 1 19: l1 -> l7 : a_123^0'=a_123^post_20, a_158^0'=a_158^post_20, a_204^0'=a_204^post_20, a_239^0'=a_239^post_20, a_264^0'=a_264^post_20, a_290^0'=a_290^post_20, a_76^0'=a_76^post_20, ct_18^0'=ct_18^post_20, f_190^0'=f_190^post_20, h_15^0'=h_15^post_20, h_30^0'=h_30^post_20, i_115^0'=i_115^post_20, i_187^0'=i_187^post_20, i_28^0'=i_28^post_20, i_98^0'=i_98^post_20, l_143^0'=l_143^post_20, l_203^0'=l_203^post_20, l_27^0'=l_27^post_20, nd_12^0'=nd_12^post_20, r_135^0'=r_135^post_20, r_183^0'=r_183^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_140^0'=x_140^post_20, x_14^0'=x_14^post_20, x_17^0'=x_17^post_20, x_195^0'=x_195^post_20, x_19^0'=x_19^post_20, x_21^0'=x_21^post_20, y_20^0'=y_20^post_20, [ rv_13^post_20==rv_13^post_20 && rv_31^post_20==rv_31^post_20 && 1+i_28^0<=l_27^0 && t_32^post_20==tp_33^0 && tp_33^post_20==tp_33^post_20 && h_30^post_20==t_32^post_20 && i_28^post_20==1+i_28^0 && 1<=i_28^post_20 && i_28^post_20<=1 && rv_13^post_20<=l_27^0 && l_27^0<=rv_13^post_20 && h_30^post_20<=rv_31^post_20 && rv_31^post_20<=h_30^post_20 && h_30^post_20<=t_32^post_20 && t_32^post_20<=h_30^post_20 && rv_31^post_20<=t_32^post_20 && t_32^post_20<=rv_31^post_20 && 1<=l_27^0 && a_123^0==a_123^post_20 && a_158^0==a_158^post_20 && a_204^0==a_204^post_20 && a_239^0==a_239^post_20 && a_264^0==a_264^post_20 && a_290^0==a_290^post_20 && a_76^0==a_76^post_20 && ct_18^0==ct_18^post_20 && f_190^0==f_190^post_20 && h_15^0==h_15^post_20 && i_115^0==i_115^post_20 && i_187^0==i_187^post_20 && i_98^0==i_98^post_20 && l_143^0==l_143^post_20 && l_203^0==l_203^post_20 && l_27^0==l_27^post_20 && nd_12^0==nd_12^post_20 && r_135^0==r_135^post_20 && r_183^0==r_183^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 && st_16^0==st_16^post_20 && st_29^0==st_29^post_20 && t_24^0==t_24^post_20 && x_14^0==x_14^post_20 && x_140^0==x_140^post_20 && x_17^0==x_17^post_20 && x_19^0==x_19^post_20 && x_195^0==x_195^post_20 && x_21^0==x_21^post_20 && y_20^0==y_20^post_20 ], cost: 1 1: l2 -> l3 : a_123^0'=a_123^post_2, a_158^0'=a_158^post_2, a_204^0'=a_204^post_2, a_239^0'=a_239^post_2, a_264^0'=a_264^post_2, a_290^0'=a_290^post_2, a_76^0'=a_76^post_2, ct_18^0'=ct_18^post_2, f_190^0'=f_190^post_2, h_15^0'=h_15^post_2, h_30^0'=h_30^post_2, i_115^0'=i_115^post_2, i_187^0'=i_187^post_2, i_28^0'=i_28^post_2, i_98^0'=i_98^post_2, l_143^0'=l_143^post_2, l_203^0'=l_203^post_2, l_27^0'=l_27^post_2, nd_12^0'=nd_12^post_2, r_135^0'=r_135^post_2, r_183^0'=r_183^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_140^0'=x_140^post_2, x_14^0'=x_14^post_2, x_17^0'=x_17^post_2, x_195^0'=x_195^post_2, x_19^0'=x_19^post_2, x_21^0'=x_21^post_2, y_20^0'=y_20^post_2, [ 0<=a_264^0 && rv_13^post_2==rv_13^post_2 && 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_2==x_17^post_2 && ct_18^post_2==ct_18^post_2 && x_19^post_2==x_19^post_2 && y_20^post_2==y_20^post_2 && x_21^post_2==x_21^post_2 && t_24^post_2==t_24^post_2 && rt_11^post_2==st_16^0 && 1<=rv_13^post_2 && 2<=rv_13^post_2 && a_123^0==a_123^post_2 && a_158^0==a_158^post_2 && a_204^0==a_204^post_2 && a_239^0==a_239^post_2 && a_264^0==a_264^post_2 && a_290^0==a_290^post_2 && a_76^0==a_76^post_2 && f_190^0==f_190^post_2 && h_15^0==h_15^post_2 && h_30^0==h_30^post_2 && i_115^0==i_115^post_2 && i_187^0==i_187^post_2 && i_28^0==i_28^post_2 && i_98^0==i_98^post_2 && l_143^0==l_143^post_2 && l_203^0==l_203^post_2 && l_27^0==l_27^post_2 && nd_12^0==nd_12^post_2 && r_135^0==r_135^post_2 && r_183^0==r_183^post_2 && r_37^0==r_37^post_2 && r_57^0==r_57^post_2 && r_92^0==r_92^post_2 && rv_31^0==rv_31^post_2 && st_16^0==st_16^post_2 && st_29^0==st_29^post_2 && t_32^0==t_32^post_2 && tp_33^0==tp_33^post_2 && x_14^0==x_14^post_2 && x_140^0==x_140^post_2 && x_195^0==x_195^post_2 ], cost: 1 2: l2 -> l4 : a_123^0'=a_123^post_3, a_158^0'=a_158^post_3, a_204^0'=a_204^post_3, a_239^0'=a_239^post_3, a_264^0'=a_264^post_3, a_290^0'=a_290^post_3, a_76^0'=a_76^post_3, ct_18^0'=ct_18^post_3, f_190^0'=f_190^post_3, h_15^0'=h_15^post_3, h_30^0'=h_30^post_3, i_115^0'=i_115^post_3, i_187^0'=i_187^post_3, i_28^0'=i_28^post_3, i_98^0'=i_98^post_3, l_143^0'=l_143^post_3, l_203^0'=l_203^post_3, l_27^0'=l_27^post_3, nd_12^0'=nd_12^post_3, r_135^0'=r_135^post_3, r_183^0'=r_183^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_140^0'=x_140^post_3, x_14^0'=x_14^post_3, x_17^0'=x_17^post_3, x_195^0'=x_195^post_3, x_19^0'=x_19^post_3, x_21^0'=x_21^post_3, y_20^0'=y_20^post_3, [ 0<=a_264^0 && rv_13^post_3==rv_13^post_3 && x_14^post_3==x_14^post_3 && h_15^post_3==h_15^post_3 && x_17^post_3==x_17^post_3 && ct_18^post_3==ct_18^post_3 && x_19^post_3==x_19^post_3 && r_37^post_3==r_37^post_3 && t_24^post_3==x_21^0 && a_290^post_3==a_290^post_3 && 0<=x_14^post_3 && x_14^post_3<=0 && 0<=ct_18^post_3 && ct_18^post_3<=0 && 0<=y_20^0 && y_20^0<=0 && h_15^post_3<=x_17^post_3 && x_17^post_3<=h_15^post_3 && h_15^post_3<=x_19^post_3 && x_19^post_3<=h_15^post_3 && x_17^post_3<=x_19^post_3 && x_19^post_3<=x_17^post_3 && ct_18^post_3<=y_20^0 && y_20^0<=ct_18^post_3 && a_290^post_3<=-1+a_264^0 && -1+a_264^0<=a_290^post_3 && 1<=rv_13^post_3 && 2<=rv_13^post_3 && a_264^post_3==a_264^post_3 && a_264^post_3<=a_290^post_3 && a_290^post_3<=a_264^post_3 && a_123^0==a_123^post_3 && a_158^0==a_158^post_3 && a_204^0==a_204^post_3 && a_239^0==a_239^post_3 && a_76^0==a_76^post_3 && f_190^0==f_190^post_3 && h_30^0==h_30^post_3 && i_115^0==i_115^post_3 && i_187^0==i_187^post_3 && i_28^0==i_28^post_3 && i_98^0==i_98^post_3 && l_143^0==l_143^post_3 && l_203^0==l_203^post_3 && l_27^0==l_27^post_3 && nd_12^0==nd_12^post_3 && r_135^0==r_135^post_3 && r_183^0==r_183^post_3 && r_57^0==r_57^post_3 && r_92^0==r_92^post_3 && rt_11^0==rt_11^post_3 && rv_31^0==rv_31^post_3 && st_16^0==st_16^post_3 && st_29^0==st_29^post_3 && t_32^0==t_32^post_3 && tp_33^0==tp_33^post_3 && x_140^0==x_140^post_3 && x_195^0==x_195^post_3 && x_21^0==x_21^post_3 && y_20^0==y_20^post_3 ], cost: 1 3: l4 -> l2 : a_123^0'=a_123^post_4, a_158^0'=a_158^post_4, a_204^0'=a_204^post_4, a_239^0'=a_239^post_4, a_264^0'=a_264^post_4, a_290^0'=a_290^post_4, a_76^0'=a_76^post_4, ct_18^0'=ct_18^post_4, f_190^0'=f_190^post_4, h_15^0'=h_15^post_4, h_30^0'=h_30^post_4, i_115^0'=i_115^post_4, i_187^0'=i_187^post_4, i_28^0'=i_28^post_4, i_98^0'=i_98^post_4, l_143^0'=l_143^post_4, l_203^0'=l_203^post_4, l_27^0'=l_27^post_4, nd_12^0'=nd_12^post_4, r_135^0'=r_135^post_4, r_183^0'=r_183^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_140^0'=x_140^post_4, x_14^0'=x_14^post_4, x_17^0'=x_17^post_4, x_195^0'=x_195^post_4, x_19^0'=x_19^post_4, x_21^0'=x_21^post_4, y_20^0'=y_20^post_4, [ a_123^0==a_123^post_4 && a_158^0==a_158^post_4 && a_204^0==a_204^post_4 && a_239^0==a_239^post_4 && a_264^0==a_264^post_4 && a_290^0==a_290^post_4 && a_76^0==a_76^post_4 && ct_18^0==ct_18^post_4 && f_190^0==f_190^post_4 && h_15^0==h_15^post_4 && h_30^0==h_30^post_4 && i_115^0==i_115^post_4 && i_187^0==i_187^post_4 && i_28^0==i_28^post_4 && i_98^0==i_98^post_4 && l_143^0==l_143^post_4 && l_203^0==l_203^post_4 && l_27^0==l_27^post_4 && nd_12^0==nd_12^post_4 && r_135^0==r_135^post_4 && r_183^0==r_183^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_14^0==x_14^post_4 && x_140^0==x_140^post_4 && x_17^0==x_17^post_4 && x_19^0==x_19^post_4 && x_195^0==x_195^post_4 && x_21^0==x_21^post_4 && y_20^0==y_20^post_4 ], cost: 1 4: l5 -> l2 : a_123^0'=a_123^post_5, a_158^0'=a_158^post_5, a_204^0'=a_204^post_5, a_239^0'=a_239^post_5, a_264^0'=a_264^post_5, a_290^0'=a_290^post_5, a_76^0'=a_76^post_5, ct_18^0'=ct_18^post_5, f_190^0'=f_190^post_5, h_15^0'=h_15^post_5, h_30^0'=h_30^post_5, i_115^0'=i_115^post_5, i_187^0'=i_187^post_5, i_28^0'=i_28^post_5, i_98^0'=i_98^post_5, l_143^0'=l_143^post_5, l_203^0'=l_203^post_5, l_27^0'=l_27^post_5, nd_12^0'=nd_12^post_5, r_135^0'=r_135^post_5, r_183^0'=r_183^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_140^0'=x_140^post_5, x_14^0'=x_14^post_5, x_17^0'=x_17^post_5, x_195^0'=x_195^post_5, x_19^0'=x_19^post_5, x_21^0'=x_21^post_5, y_20^0'=y_20^post_5, [ 0<=a_239^0 && rv_13^post_5==rv_13^post_5 && x_14^post_5==x_14^post_5 && h_15^post_5==h_15^post_5 && x_17^post_5==x_17^post_5 && ct_18^post_5==ct_18^post_5 && x_19^post_5==x_19^post_5 && t_24^post_5==x_21^0 && 0<=x_14^post_5 && x_14^post_5<=0 && 0<=ct_18^post_5 && ct_18^post_5<=0 && 0<=y_20^0 && y_20^0<=0 && h_15^post_5<=x_17^post_5 && x_17^post_5<=h_15^post_5 && h_15^post_5<=x_19^post_5 && x_19^post_5<=h_15^post_5 && x_17^post_5<=x_19^post_5 && x_19^post_5<=x_17^post_5 && ct_18^post_5<=y_20^0 && y_20^0<=ct_18^post_5 && 1<=rv_13^post_5 && 2<=rv_13^post_5 && a_123^0==a_123^post_5 && a_158^0==a_158^post_5 && a_204^0==a_204^post_5 && a_239^0==a_239^post_5 && a_264^0==a_264^post_5 && a_290^0==a_290^post_5 && a_76^0==a_76^post_5 && f_190^0==f_190^post_5 && h_30^0==h_30^post_5 && i_115^0==i_115^post_5 && i_187^0==i_187^post_5 && i_28^0==i_28^post_5 && i_98^0==i_98^post_5 && l_143^0==l_143^post_5 && l_203^0==l_203^post_5 && l_27^0==l_27^post_5 && nd_12^0==nd_12^post_5 && r_135^0==r_135^post_5 && r_183^0==r_183^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_31^0==rv_31^post_5 && st_16^0==st_16^post_5 && st_29^0==st_29^post_5 && t_32^0==t_32^post_5 && tp_33^0==tp_33^post_5 && x_140^0==x_140^post_5 && x_195^0==x_195^post_5 && x_21^0==x_21^post_5 && y_20^0==y_20^post_5 ], cost: 1 5: l5 -> l3 : a_123^0'=a_123^post_6, a_158^0'=a_158^post_6, a_204^0'=a_204^post_6, a_239^0'=a_239^post_6, a_264^0'=a_264^post_6, a_290^0'=a_290^post_6, a_76^0'=a_76^post_6, ct_18^0'=ct_18^post_6, f_190^0'=f_190^post_6, h_15^0'=h_15^post_6, h_30^0'=h_30^post_6, i_115^0'=i_115^post_6, i_187^0'=i_187^post_6, i_28^0'=i_28^post_6, i_98^0'=i_98^post_6, l_143^0'=l_143^post_6, l_203^0'=l_203^post_6, l_27^0'=l_27^post_6, nd_12^0'=nd_12^post_6, r_135^0'=r_135^post_6, r_183^0'=r_183^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_140^0'=x_140^post_6, x_14^0'=x_14^post_6, x_17^0'=x_17^post_6, x_195^0'=x_195^post_6, x_19^0'=x_19^post_6, x_21^0'=x_21^post_6, y_20^0'=y_20^post_6, [ 0<=a_239^0 && rv_13^post_6==rv_13^post_6 && h_15^post_6==h_15^post_6 && 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_6==x_17^post_6 && ct_18^post_6==ct_18^post_6 && x_19^post_6==x_19^post_6 && y_20^post_6==y_20^post_6 && x_21^post_6==x_21^post_6 && t_24^post_6==t_24^post_6 && rt_11^post_6==st_16^0 && 1<=rv_13^post_6 && 2<=rv_13^post_6 && a_123^0==a_123^post_6 && a_158^0==a_158^post_6 && a_204^0==a_204^post_6 && a_239^0==a_239^post_6 && a_264^0==a_264^post_6 && a_290^0==a_290^post_6 && a_76^0==a_76^post_6 && f_190^0==f_190^post_6 && h_30^0==h_30^post_6 && i_115^0==i_115^post_6 && i_187^0==i_187^post_6 && i_28^0==i_28^post_6 && i_98^0==i_98^post_6 && l_143^0==l_143^post_6 && l_203^0==l_203^post_6 && l_27^0==l_27^post_6 && nd_12^0==nd_12^post_6 && r_135^0==r_135^post_6 && r_183^0==r_183^post_6 && r_37^0==r_37^post_6 && r_57^0==r_57^post_6 && r_92^0==r_92^post_6 && rv_31^0==rv_31^post_6 && st_16^0==st_16^post_6 && st_29^0==st_29^post_6 && t_32^0==t_32^post_6 && tp_33^0==tp_33^post_6 && x_14^0==x_14^post_6 && x_140^0==x_140^post_6 && x_195^0==x_195^post_6 ], cost: 1 6: l6 -> l2 : a_123^0'=a_123^post_7, a_158^0'=a_158^post_7, a_204^0'=a_204^post_7, a_239^0'=a_239^post_7, a_264^0'=a_264^post_7, a_290^0'=a_290^post_7, a_76^0'=a_76^post_7, ct_18^0'=ct_18^post_7, f_190^0'=f_190^post_7, h_15^0'=h_15^post_7, h_30^0'=h_30^post_7, i_115^0'=i_115^post_7, i_187^0'=i_187^post_7, i_28^0'=i_28^post_7, i_98^0'=i_98^post_7, l_143^0'=l_143^post_7, l_203^0'=l_203^post_7, l_27^0'=l_27^post_7, nd_12^0'=nd_12^post_7, r_135^0'=r_135^post_7, r_183^0'=r_183^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_140^0'=x_140^post_7, x_14^0'=x_14^post_7, x_17^0'=x_17^post_7, x_195^0'=x_195^post_7, x_19^0'=x_19^post_7, x_21^0'=x_21^post_7, y_20^0'=y_20^post_7, [ 0<=l_143^0 && rv_13^post_7==rv_13^post_7 && x_14^post_7==x_14^post_7 && h_15^post_7==h_15^post_7 && x_17^post_7==x_17^post_7 && ct_18^post_7==ct_18^post_7 && x_19^post_7==x_19^post_7 && t_24^post_7==x_21^0 && a_239^post_7==a_239^post_7 && 0<=x_14^post_7 && x_14^post_7<=0 && 0<=ct_18^post_7 && ct_18^post_7<=0 && 0<=y_20^0 && y_20^0<=0 && 0<=a_264^0-a_239^post_7 && a_264^0-a_239^post_7<=0 && h_15^post_7<=x_17^post_7 && x_17^post_7<=h_15^post_7 && h_15^post_7<=x_19^post_7 && x_19^post_7<=h_15^post_7 && h_15^post_7<=t_24^post_7 && t_24^post_7<=h_15^post_7 && x_17^post_7<=x_19^post_7 && x_19^post_7<=x_17^post_7 && ct_18^post_7<=y_20^0 && y_20^0<=ct_18^post_7 && a_239^post_7<=a_264^0 && a_264^0<=a_239^post_7 && 1<=rv_13^post_7 && 2<=rv_13^post_7 && l_143^post_7==l_143^post_7 && -1+l_143^post_7<=a_239^post_7 && a_239^post_7<=-1+l_143^post_7 && a_123^0==a_123^post_7 && a_158^0==a_158^post_7 && a_204^0==a_204^post_7 && a_264^0==a_264^post_7 && a_290^0==a_290^post_7 && a_76^0==a_76^post_7 && f_190^0==f_190^post_7 && h_30^0==h_30^post_7 && i_115^0==i_115^post_7 && i_187^0==i_187^post_7 && i_28^0==i_28^post_7 && i_98^0==i_98^post_7 && l_203^0==l_203^post_7 && l_27^0==l_27^post_7 && nd_12^0==nd_12^post_7 && r_135^0==r_135^post_7 && r_183^0==r_183^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_31^0==rv_31^post_7 && st_16^0==st_16^post_7 && st_29^0==st_29^post_7 && t_32^0==t_32^post_7 && tp_33^0==tp_33^post_7 && x_140^0==x_140^post_7 && x_195^0==x_195^post_7 && x_21^0==x_21^post_7 && y_20^0==y_20^post_7 ], cost: 1 7: l7 -> l3 : a_123^0'=a_123^post_8, a_158^0'=a_158^post_8, a_204^0'=a_204^post_8, a_239^0'=a_239^post_8, a_264^0'=a_264^post_8, a_290^0'=a_290^post_8, a_76^0'=a_76^post_8, ct_18^0'=ct_18^post_8, f_190^0'=f_190^post_8, h_15^0'=h_15^post_8, h_30^0'=h_30^post_8, i_115^0'=i_115^post_8, i_187^0'=i_187^post_8, i_28^0'=i_28^post_8, i_98^0'=i_98^post_8, l_143^0'=l_143^post_8, l_203^0'=l_203^post_8, l_27^0'=l_27^post_8, nd_12^0'=nd_12^post_8, r_135^0'=r_135^post_8, r_183^0'=r_183^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_140^0'=x_140^post_8, x_14^0'=x_14^post_8, x_17^0'=x_17^post_8, x_195^0'=x_195^post_8, x_19^0'=x_19^post_8, x_21^0'=x_21^post_8, y_20^0'=y_20^post_8, [ 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_8==l_27^post_8 && i_28^post_8==i_28^post_8 && st_29^post_8==st_29^post_8 && h_30^post_8==h_30^post_8 && rv_31^post_8==rv_31^post_8 && t_32^post_8==t_32^post_8 && tp_33^post_8==tp_33^post_8 && h_15^1_1==rt_11^1_1 && rt_11^2_1==rt_11^2_1 && x_14^1_1==h_15^1_1 && 1<=rv_13^1_1 && rv_13^1_1<=1 && x_14^1_1<=h_15^1_1 && h_15^1_1<=x_14^1_1 && 1<=rv_13^1_1 && rv_13^1_1<=1 && rv_13^2_1==rv_13^2_1 && h_15^2_1==h_15^2_1 && 0<=x_14^1_1 && x_14^1_1<=0 && 1<=rv_13^2_1 && rv_13^2_1<=1 && 1<=rv_13^2_1 && rv_13^2_1<=1 && rv_13^3_1==rv_13^3_1 && 0<=x_14^1_1 && x_14^1_1<=0 && x_17^1_1==h_15^2_1 && 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_14^1_1 && x_14^1_1<=0 && 0<=ct_18^1_3 && ct_18^1_3<=0 && 0<=y_20^1_3_1 && y_20^1_3_1<=0 && 1<=rv_13^3_1 && rv_13^3_1<=1 && h_15^2_1<=x_17^1_1 && x_17^1_1<=h_15^2_1 && h_15^2_1<=x_19^1_3_1 && x_19^1_3_1<=h_15^2_1 && h_15^2_1<=x_21^1_3_1 && x_21^1_3_1<=h_15^2_1 && 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 && 1<=rv_13^3_1 && rv_13^3_1<=1 && rv_13^post_8==rv_13^post_8 && x_14^post_8==x_14^post_8 && h_15^3_1==h_15^3_1 && x_17^2_1==x_17^2_1 && ct_18^2_1==ct_18^2_1 && x_19^2_1==x_19^2_1 && t_24^1_3_1==x_21^1_3_1 && 0<=x_14^post_8 && x_14^post_8<=0 && 0<=ct_18^2_1 && ct_18^2_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 && 1<=rv_13^post_8 && rv_13^post_8<=1 && h_15^3_1<=x_17^2_1 && x_17^2_1<=h_15^3_1 && h_15^3_1<=x_19^2_1 && x_19^2_1<=h_15^3_1 && h_15^3_1<=t_24^1_3_1 && t_24^1_3_1<=h_15^3_1 && x_17^2_1<=x_19^2_1 && x_19^2_1<=x_17^2_1 && ct_18^2_1<=y_20^1_3_1 && y_20^1_3_1<=ct_18^2_1 && 1<=rv_13^post_8 && rv_13^post_8<=1 && h_15^post_8==h_15^post_8 && y_20^1_3_1<=x_21^1_3_1 && x_21^1_3_1<=y_20^1_3_1 && x_19^3_1==x_19^3_1 && y_20^2_1==y_20^2_1 && x_21^2_1==x_21^2_1 && t_24^2_1==t_24^2_1 && ct_18^3_1==ct_18^3_1 && x_17^post_8==x_17^post_8 && ct_18^post_8==ct_18^post_8 && x_19^post_8==x_19^post_8 && y_20^post_8==y_20^post_8 && x_21^post_8==x_21^post_8 && t_24^post_8==t_24^post_8 && rt_11^post_8==st_16^0 && a_123^0==a_123^post_8 && a_158^0==a_158^post_8 && a_204^0==a_204^post_8 && a_239^0==a_239^post_8 && a_264^0==a_264^post_8 && a_290^0==a_290^post_8 && a_76^0==a_76^post_8 && f_190^0==f_190^post_8 && i_115^0==i_115^post_8 && i_187^0==i_187^post_8 && i_98^0==i_98^post_8 && l_143^0==l_143^post_8 && l_203^0==l_203^post_8 && nd_12^0==nd_12^post_8 && r_135^0==r_135^post_8 && r_183^0==r_183^post_8 && r_37^0==r_37^post_8 && r_57^0==r_57^post_8 && r_92^0==r_92^post_8 && st_16^0==st_16^post_8 && x_140^0==x_140^post_8 && x_195^0==x_195^post_8 ], cost: 1 8: l7 -> l8 : a_123^0'=a_123^post_9, a_158^0'=a_158^post_9, a_204^0'=a_204^post_9, a_239^0'=a_239^post_9, a_264^0'=a_264^post_9, a_290^0'=a_290^post_9, a_76^0'=a_76^post_9, ct_18^0'=ct_18^post_9, f_190^0'=f_190^post_9, h_15^0'=h_15^post_9, h_30^0'=h_30^post_9, i_115^0'=i_115^post_9, i_187^0'=i_187^post_9, i_28^0'=i_28^post_9, i_98^0'=i_98^post_9, l_143^0'=l_143^post_9, l_203^0'=l_203^post_9, l_27^0'=l_27^post_9, nd_12^0'=nd_12^post_9, r_135^0'=r_135^post_9, r_183^0'=r_183^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_140^0'=x_140^post_9, x_14^0'=x_14^post_9, x_17^0'=x_17^post_9, x_195^0'=x_195^post_9, x_19^0'=x_19^post_9, x_21^0'=x_21^post_9, y_20^0'=y_20^post_9, [ rv_13^post_9==rv_13^post_9 && rv_31^post_9==rv_31^post_9 && r_57^post_9==r_57^post_9 && 1+i_28^0<=l_27^0 && t_32^post_9==tp_33^0 && tp_33^post_9==tp_33^post_9 && h_30^post_9==t_32^post_9 && i_28^1_1==1+i_28^0 && i_28^post_9==i_28^post_9 && 2<=i_28^post_9 && i_28^post_9<=2 && rv_13^post_9<=l_27^0 && l_27^0<=rv_13^post_9 && h_30^post_9<=rv_31^post_9 && rv_31^post_9<=h_30^post_9 && h_30^post_9<=t_32^post_9 && t_32^post_9<=h_30^post_9 && rv_31^post_9<=t_32^post_9 && t_32^post_9<=rv_31^post_9 && 1<=l_27^0 && 2<=l_27^0 && a_76^post_9==a_76^post_9 && a_76^post_9<=i_28^post_9 && i_28^post_9<=a_76^post_9 && a_123^0==a_123^post_9 && a_158^0==a_158^post_9 && a_204^0==a_204^post_9 && a_239^0==a_239^post_9 && a_264^0==a_264^post_9 && a_290^0==a_290^post_9 && ct_18^0==ct_18^post_9 && f_190^0==f_190^post_9 && h_15^0==h_15^post_9 && i_115^0==i_115^post_9 && i_187^0==i_187^post_9 && i_98^0==i_98^post_9 && l_143^0==l_143^post_9 && l_203^0==l_203^post_9 && l_27^0==l_27^post_9 && nd_12^0==nd_12^post_9 && r_135^0==r_135^post_9 && r_183^0==r_183^post_9 && r_37^0==r_37^post_9 && r_92^0==r_92^post_9 && rt_11^0==rt_11^post_9 && st_16^0==st_16^post_9 && st_29^0==st_29^post_9 && t_24^0==t_24^post_9 && x_14^0==x_14^post_9 && x_140^0==x_140^post_9 && x_17^0==x_17^post_9 && x_19^0==x_19^post_9 && x_195^0==x_195^post_9 && x_21^0==x_21^post_9 && y_20^0==y_20^post_9 ], cost: 1 15: l8 -> l9 : a_123^0'=a_123^post_16, a_158^0'=a_158^post_16, a_204^0'=a_204^post_16, a_239^0'=a_239^post_16, a_264^0'=a_264^post_16, a_290^0'=a_290^post_16, a_76^0'=a_76^post_16, ct_18^0'=ct_18^post_16, f_190^0'=f_190^post_16, h_15^0'=h_15^post_16, h_30^0'=h_30^post_16, i_115^0'=i_115^post_16, i_187^0'=i_187^post_16, i_28^0'=i_28^post_16, i_98^0'=i_98^post_16, l_143^0'=l_143^post_16, l_203^0'=l_203^post_16, l_27^0'=l_27^post_16, nd_12^0'=nd_12^post_16, r_135^0'=r_135^post_16, r_183^0'=r_183^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_140^0'=x_140^post_16, x_14^0'=x_14^post_16, x_17^0'=x_17^post_16, x_195^0'=x_195^post_16, x_19^0'=x_19^post_16, x_21^0'=x_21^post_16, y_20^0'=y_20^post_16, [ 0<=i_28^0 && rv_13^post_16==rv_13^post_16 && i_187^post_16==i_187^post_16 && l_27^0<=i_28^0 && st_29^1_2_1==h_30^0 && rt_11^1_2==st_29^1_2_1 && l_27^post_16==l_27^post_16 && i_28^post_16==i_28^post_16 && st_29^post_16==st_29^post_16 && h_30^post_16==h_30^post_16 && rv_31^post_16==rv_31^post_16 && t_32^post_16==t_32^post_16 && tp_33^post_16==tp_33^post_16 && h_15^post_16==rt_11^1_2 && rt_11^post_16==rt_11^post_16 && x_14^post_16==h_15^post_16 && 0<=l_143^0 && l_143^0<=0 && 0<=a_158^0-i_28^post_16 && a_158^0-i_28^post_16<=0 && x_14^post_16<=h_15^post_16 && h_15^post_16<=x_14^post_16 && i_28^post_16<=a_158^0 && a_158^0<=i_28^post_16 && 1<=rv_13^post_16 && 2<=rv_13^post_16 && rv_13^post_16<=i_28^post_16 && rv_13^post_16<=i_187^post_16 && a_123^0==a_123^post_16 && a_158^0==a_158^post_16 && a_204^0==a_204^post_16 && a_239^0==a_239^post_16 && a_264^0==a_264^post_16 && a_290^0==a_290^post_16 && a_76^0==a_76^post_16 && ct_18^0==ct_18^post_16 && f_190^0==f_190^post_16 && i_115^0==i_115^post_16 && i_98^0==i_98^post_16 && l_143^0==l_143^post_16 && l_203^0==l_203^post_16 && nd_12^0==nd_12^post_16 && r_135^0==r_135^post_16 && r_183^0==r_183^post_16 && r_37^0==r_37^post_16 && r_57^0==r_57^post_16 && r_92^0==r_92^post_16 && st_16^0==st_16^post_16 && t_24^0==t_24^post_16 && x_140^0==x_140^post_16 && x_17^0==x_17^post_16 && x_19^0==x_19^post_16 && x_195^0==x_195^post_16 && x_21^0==x_21^post_16 && y_20^0==y_20^post_16 ], cost: 1 16: l8 -> l13 : a_123^0'=a_123^post_17, a_158^0'=a_158^post_17, a_204^0'=a_204^post_17, a_239^0'=a_239^post_17, a_264^0'=a_264^post_17, a_290^0'=a_290^post_17, a_76^0'=a_76^post_17, ct_18^0'=ct_18^post_17, f_190^0'=f_190^post_17, h_15^0'=h_15^post_17, h_30^0'=h_30^post_17, i_115^0'=i_115^post_17, i_187^0'=i_187^post_17, i_28^0'=i_28^post_17, i_98^0'=i_98^post_17, l_143^0'=l_143^post_17, l_203^0'=l_203^post_17, l_27^0'=l_27^post_17, nd_12^0'=nd_12^post_17, r_135^0'=r_135^post_17, r_183^0'=r_183^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_140^0'=x_140^post_17, x_14^0'=x_14^post_17, x_17^0'=x_17^post_17, x_195^0'=x_195^post_17, x_19^0'=x_19^post_17, x_21^0'=x_21^post_17, y_20^0'=y_20^post_17, [ 0<=i_28^0 && r_92^post_17==r_92^post_17 && i_98^post_17==i_98^post_17 && 1+i_28^0<=l_27^0 && t_32^post_17==tp_33^0 && tp_33^post_17==tp_33^post_17 && h_30^post_17==t_32^post_17 && i_28^post_17==1+i_28^0 && i_28^post_17<=1+i_98^post_17 && 1+i_98^post_17<=i_28^post_17 && i_98^post_17<=-1+i_28^post_17 && -1+i_28^post_17<=i_98^post_17 && 1+i_98^post_17<=l_27^0 && a_123^0==a_123^post_17 && a_158^0==a_158^post_17 && a_204^0==a_204^post_17 && a_239^0==a_239^post_17 && a_264^0==a_264^post_17 && a_290^0==a_290^post_17 && a_76^0==a_76^post_17 && ct_18^0==ct_18^post_17 && f_190^0==f_190^post_17 && h_15^0==h_15^post_17 && i_115^0==i_115^post_17 && i_187^0==i_187^post_17 && l_143^0==l_143^post_17 && l_203^0==l_203^post_17 && l_27^0==l_27^post_17 && nd_12^0==nd_12^post_17 && r_135^0==r_135^post_17 && r_183^0==r_183^post_17 && r_37^0==r_37^post_17 && r_57^0==r_57^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 && x_14^0==x_14^post_17 && x_140^0==x_140^post_17 && x_17^0==x_17^post_17 && x_19^0==x_19^post_17 && x_195^0==x_195^post_17 && x_21^0==x_21^post_17 && y_20^0==y_20^post_17 ], cost: 1 9: l9 -> l6 : a_123^0'=a_123^post_10, a_158^0'=a_158^post_10, a_204^0'=a_204^post_10, a_239^0'=a_239^post_10, a_264^0'=a_264^post_10, a_290^0'=a_290^post_10, a_76^0'=a_76^post_10, ct_18^0'=ct_18^post_10, f_190^0'=f_190^post_10, h_15^0'=h_15^post_10, h_30^0'=h_30^post_10, i_115^0'=i_115^post_10, i_187^0'=i_187^post_10, i_28^0'=i_28^post_10, i_98^0'=i_98^post_10, l_143^0'=l_143^post_10, l_203^0'=l_203^post_10, l_27^0'=l_27^post_10, nd_12^0'=nd_12^post_10, r_135^0'=r_135^post_10, r_183^0'=r_183^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_140^0'=x_140^post_10, x_14^0'=x_14^post_10, x_17^0'=x_17^post_10, x_195^0'=x_195^post_10, x_19^0'=x_19^post_10, x_21^0'=x_21^post_10, y_20^0'=y_20^post_10, [ 0<=a_158^0 && 0<=l_143^0 && rv_13^post_10==rv_13^post_10 && 0<=x_14^0 && x_14^0<=0 && x_17^post_10==h_15^0 && ct_18^post_10==0 && x_19^post_10==x_17^post_10 && y_20^post_10==ct_18^post_10 && x_21^post_10==x_19^post_10 && 0<=x_14^0 && x_14^0<=0 && 0<=ct_18^post_10 && ct_18^post_10<=0 && 0<=y_20^post_10 && y_20^post_10<=0 && h_15^0<=x_17^post_10 && x_17^post_10<=h_15^0 && h_15^0<=x_19^post_10 && x_19^post_10<=h_15^0 && h_15^0<=x_21^post_10 && x_21^post_10<=h_15^0 && x_17^post_10<=x_19^post_10 && x_19^post_10<=x_17^post_10 && ct_18^post_10<=y_20^post_10 && y_20^post_10<=ct_18^post_10 && x_19^post_10<=x_21^post_10 && x_21^post_10<=x_19^post_10 && 1<=rv_13^post_10 && 2<=rv_13^post_10 && a_123^0==a_123^post_10 && a_158^0==a_158^post_10 && a_204^0==a_204^post_10 && a_239^0==a_239^post_10 && a_264^0==a_264^post_10 && a_290^0==a_290^post_10 && a_76^0==a_76^post_10 && f_190^0==f_190^post_10 && h_15^0==h_15^post_10 && h_30^0==h_30^post_10 && i_115^0==i_115^post_10 && i_187^0==i_187^post_10 && i_28^0==i_28^post_10 && i_98^0==i_98^post_10 && l_143^0==l_143^post_10 && l_203^0==l_203^post_10 && l_27^0==l_27^post_10 && nd_12^0==nd_12^post_10 && r_135^0==r_135^post_10 && r_183^0==r_183^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_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_14^0==x_14^post_10 && x_140^0==x_140^post_10 && x_195^0==x_195^post_10 ], cost: 1 10: l9 -> l10 : a_123^0'=a_123^post_11, a_158^0'=a_158^post_11, a_204^0'=a_204^post_11, a_239^0'=a_239^post_11, a_264^0'=a_264^post_11, a_290^0'=a_290^post_11, a_76^0'=a_76^post_11, ct_18^0'=ct_18^post_11, f_190^0'=f_190^post_11, h_15^0'=h_15^post_11, h_30^0'=h_30^post_11, i_115^0'=i_115^post_11, i_187^0'=i_187^post_11, i_28^0'=i_28^post_11, i_98^0'=i_98^post_11, l_143^0'=l_143^post_11, l_203^0'=l_203^post_11, l_27^0'=l_27^post_11, nd_12^0'=nd_12^post_11, r_135^0'=r_135^post_11, r_183^0'=r_183^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_140^0'=x_140^post_11, x_14^0'=x_14^post_11, x_17^0'=x_17^post_11, x_195^0'=x_195^post_11, x_19^0'=x_19^post_11, x_21^0'=x_21^post_11, y_20^0'=y_20^post_11, [ 0<=a_158^0 && 0<=l_143^0 && rv_13^post_11==rv_13^post_11 && h_15^post_11==h_15^post_11 && r_37^post_11==r_37^post_11 && f_190^post_11==f_190^post_11 && x_195^post_11==x_195^post_11 && l_203^post_11==l_203^post_11 && a_204^post_11==a_204^post_11 && 1<=-l_143^0+l_203^post_11 && -l_143^0+l_203^post_11<=1 && x_14^0<=f_190^post_11 && f_190^post_11<=x_14^0 && a_204^post_11<=-1+a_158^0 && -1+a_158^0<=a_204^post_11 && 1<=rv_13^post_11 && 2<=rv_13^post_11 && a_158^post_11==a_158^post_11 && a_158^post_11<=a_204^post_11 && a_204^post_11<=a_158^post_11 && l_143^post_11==l_143^post_11 && l_143^post_11<=l_203^post_11 && l_203^post_11<=l_143^post_11 && a_123^0==a_123^post_11 && a_239^0==a_239^post_11 && a_264^0==a_264^post_11 && a_290^0==a_290^post_11 && a_76^0==a_76^post_11 && ct_18^0==ct_18^post_11 && h_30^0==h_30^post_11 && i_115^0==i_115^post_11 && i_187^0==i_187^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_183^0==r_183^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_14^0==x_14^post_11 && x_140^0==x_140^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 ], cost: 1 11: l10 -> l9 : a_123^0'=a_123^post_12, a_158^0'=a_158^post_12, a_204^0'=a_204^post_12, a_239^0'=a_239^post_12, a_264^0'=a_264^post_12, a_290^0'=a_290^post_12, a_76^0'=a_76^post_12, ct_18^0'=ct_18^post_12, f_190^0'=f_190^post_12, h_15^0'=h_15^post_12, h_30^0'=h_30^post_12, i_115^0'=i_115^post_12, i_187^0'=i_187^post_12, i_28^0'=i_28^post_12, i_98^0'=i_98^post_12, l_143^0'=l_143^post_12, l_203^0'=l_203^post_12, l_27^0'=l_27^post_12, nd_12^0'=nd_12^post_12, r_135^0'=r_135^post_12, r_183^0'=r_183^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_140^0'=x_140^post_12, x_14^0'=x_14^post_12, x_17^0'=x_17^post_12, x_195^0'=x_195^post_12, x_19^0'=x_19^post_12, x_21^0'=x_21^post_12, y_20^0'=y_20^post_12, [ a_123^0==a_123^post_12 && a_158^0==a_158^post_12 && a_204^0==a_204^post_12 && a_239^0==a_239^post_12 && a_264^0==a_264^post_12 && a_290^0==a_290^post_12 && a_76^0==a_76^post_12 && ct_18^0==ct_18^post_12 && f_190^0==f_190^post_12 && h_15^0==h_15^post_12 && h_30^0==h_30^post_12 && i_115^0==i_115^post_12 && i_187^0==i_187^post_12 && i_28^0==i_28^post_12 && i_98^0==i_98^post_12 && l_143^0==l_143^post_12 && l_203^0==l_203^post_12 && l_27^0==l_27^post_12 && nd_12^0==nd_12^post_12 && r_135^0==r_135^post_12 && r_183^0==r_183^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_14^0==x_14^post_12 && x_140^0==x_140^post_12 && x_17^0==x_17^post_12 && x_19^0==x_19^post_12 && x_195^0==x_195^post_12 && x_21^0==x_21^post_12 && y_20^0==y_20^post_12 ], cost: 1 12: l11 -> l6 : a_123^0'=a_123^post_13, a_158^0'=a_158^post_13, a_204^0'=a_204^post_13, a_239^0'=a_239^post_13, a_264^0'=a_264^post_13, a_290^0'=a_290^post_13, a_76^0'=a_76^post_13, ct_18^0'=ct_18^post_13, f_190^0'=f_190^post_13, h_15^0'=h_15^post_13, h_30^0'=h_30^post_13, i_115^0'=i_115^post_13, i_187^0'=i_187^post_13, i_28^0'=i_28^post_13, i_98^0'=i_98^post_13, l_143^0'=l_143^post_13, l_203^0'=l_203^post_13, l_27^0'=l_27^post_13, nd_12^0'=nd_12^post_13, r_135^0'=r_135^post_13, r_183^0'=r_183^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_140^0'=x_140^post_13, x_14^0'=x_14^post_13, x_17^0'=x_17^post_13, x_195^0'=x_195^post_13, x_19^0'=x_19^post_13, x_21^0'=x_21^post_13, y_20^0'=y_20^post_13, [ 0<=a_123^0 && rv_13^post_13==rv_13^post_13 && 0<=x_14^0 && x_14^0<=0 && x_17^post_13==h_15^0 && ct_18^post_13==0 && x_19^post_13==x_17^post_13 && y_20^post_13==ct_18^post_13 && x_21^post_13==x_19^post_13 && 0<=x_14^0 && x_14^0<=0 && 0<=ct_18^post_13 && ct_18^post_13<=0 && 0<=y_20^post_13 && y_20^post_13<=0 && 0<=a_123^0 && a_123^0<=0 && 1<=l_143^0 && l_143^0<=1 && h_15^0<=x_17^post_13 && x_17^post_13<=h_15^0 && h_15^0<=x_19^post_13 && x_19^post_13<=h_15^0 && h_15^0<=x_21^post_13 && x_21^post_13<=h_15^0 && x_17^post_13<=x_19^post_13 && x_19^post_13<=x_17^post_13 && ct_18^post_13<=y_20^post_13 && y_20^post_13<=ct_18^post_13 && x_19^post_13<=x_21^post_13 && x_21^post_13<=x_19^post_13 && 1<=rv_13^post_13 && 2<=rv_13^post_13 && a_123^0==a_123^post_13 && a_158^0==a_158^post_13 && a_204^0==a_204^post_13 && a_239^0==a_239^post_13 && a_264^0==a_264^post_13 && a_290^0==a_290^post_13 && a_76^0==a_76^post_13 && f_190^0==f_190^post_13 && h_15^0==h_15^post_13 && h_30^0==h_30^post_13 && i_115^0==i_115^post_13 && i_187^0==i_187^post_13 && i_28^0==i_28^post_13 && i_98^0==i_98^post_13 && l_143^0==l_143^post_13 && l_203^0==l_203^post_13 && l_27^0==l_27^post_13 && nd_12^0==nd_12^post_13 && r_135^0==r_135^post_13 && r_183^0==r_183^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_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_14^0==x_14^post_13 && x_140^0==x_140^post_13 && x_195^0==x_195^post_13 ], cost: 1 13: l11 -> l9 : a_123^0'=a_123^post_14, a_158^0'=a_158^post_14, a_204^0'=a_204^post_14, a_239^0'=a_239^post_14, a_264^0'=a_264^post_14, a_290^0'=a_290^post_14, a_76^0'=a_76^post_14, ct_18^0'=ct_18^post_14, f_190^0'=f_190^post_14, h_15^0'=h_15^post_14, h_30^0'=h_30^post_14, i_115^0'=i_115^post_14, i_187^0'=i_187^post_14, i_28^0'=i_28^post_14, i_98^0'=i_98^post_14, l_143^0'=l_143^post_14, l_203^0'=l_203^post_14, l_27^0'=l_27^post_14, nd_12^0'=nd_12^post_14, r_135^0'=r_135^post_14, r_183^0'=r_183^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_140^0'=x_140^post_14, x_14^0'=x_14^post_14, x_17^0'=x_17^post_14, x_195^0'=x_195^post_14, x_19^0'=x_19^post_14, x_21^0'=x_21^post_14, y_20^0'=y_20^post_14, [ 0<=a_123^0 && rv_13^post_14==rv_13^post_14 && h_15^post_14==h_15^post_14 && r_135^post_14==r_135^post_14 && x_140^post_14==x_140^post_14 && 1<=rv_13^post_14 && 2<=rv_13^post_14 && a_123^0==a_123^post_14 && a_158^0==a_158^post_14 && a_204^0==a_204^post_14 && a_239^0==a_239^post_14 && a_264^0==a_264^post_14 && a_290^0==a_290^post_14 && a_76^0==a_76^post_14 && ct_18^0==ct_18^post_14 && f_190^0==f_190^post_14 && h_30^0==h_30^post_14 && i_115^0==i_115^post_14 && i_187^0==i_187^post_14 && i_28^0==i_28^post_14 && i_98^0==i_98^post_14 && l_143^0==l_143^post_14 && l_203^0==l_203^post_14 && l_27^0==l_27^post_14 && nd_12^0==nd_12^post_14 && r_183^0==r_183^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_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_14^0==x_14^post_14 && x_17^0==x_17^post_14 && x_19^0==x_19^post_14 && x_195^0==x_195^post_14 && x_21^0==x_21^post_14 && y_20^0==y_20^post_14 ], cost: 1 14: l12 -> l9 : a_123^0'=a_123^post_15, a_158^0'=a_158^post_15, a_204^0'=a_204^post_15, a_239^0'=a_239^post_15, a_264^0'=a_264^post_15, a_290^0'=a_290^post_15, a_76^0'=a_76^post_15, ct_18^0'=ct_18^post_15, f_190^0'=f_190^post_15, h_15^0'=h_15^post_15, h_30^0'=h_30^post_15, i_115^0'=i_115^post_15, i_187^0'=i_187^post_15, i_28^0'=i_28^post_15, i_98^0'=i_98^post_15, l_143^0'=l_143^post_15, l_203^0'=l_203^post_15, l_27^0'=l_27^post_15, nd_12^0'=nd_12^post_15, r_135^0'=r_135^post_15, r_183^0'=r_183^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_140^0'=x_140^post_15, x_14^0'=x_14^post_15, x_17^0'=x_17^post_15, x_195^0'=x_195^post_15, x_19^0'=x_19^post_15, x_21^0'=x_21^post_15, y_20^0'=y_20^post_15, [ 0<=i_28^0 && rv_13^post_15==rv_13^post_15 && h_15^post_15==h_15^post_15 && r_37^post_15==r_37^post_15 && i_115^1_1==i_115^1_1 && r_183^post_15==r_183^post_15 && a_123^post_15==a_123^post_15 && 0<=-a_123^post_15+a_158^0 && -a_123^post_15+a_158^0<=0 && 1<=l_143^0 && l_143^0<=1 && a_123^post_15<=a_158^0 && a_158^0<=a_123^post_15 && 1<=rv_13^post_15 && 2<=rv_13^post_15 && rv_13^post_15<=i_115^1_1 && i_115^post_15==i_115^post_15 && -1+i_115^post_15<=a_123^post_15 && a_123^post_15<=-1+i_115^post_15 && a_158^0==a_158^post_15 && a_204^0==a_204^post_15 && a_239^0==a_239^post_15 && a_264^0==a_264^post_15 && a_290^0==a_290^post_15 && a_76^0==a_76^post_15 && ct_18^0==ct_18^post_15 && f_190^0==f_190^post_15 && h_30^0==h_30^post_15 && i_187^0==i_187^post_15 && i_28^0==i_28^post_15 && i_98^0==i_98^post_15 && l_143^0==l_143^post_15 && l_203^0==l_203^post_15 && l_27^0==l_27^post_15 && nd_12^0==nd_12^post_15 && r_135^0==r_135^post_15 && r_57^0==r_57^post_15 && r_92^0==r_92^post_15 && rt_11^0==rt_11^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_14^0==x_14^post_15 && x_140^0==x_140^post_15 && x_17^0==x_17^post_15 && x_19^0==x_19^post_15 && x_195^0==x_195^post_15 && x_21^0==x_21^post_15 && y_20^0==y_20^post_15 ], cost: 1 17: l13 -> l8 : a_123^0'=a_123^post_18, a_158^0'=a_158^post_18, a_204^0'=a_204^post_18, a_239^0'=a_239^post_18, a_264^0'=a_264^post_18, a_290^0'=a_290^post_18, a_76^0'=a_76^post_18, ct_18^0'=ct_18^post_18, f_190^0'=f_190^post_18, h_15^0'=h_15^post_18, h_30^0'=h_30^post_18, i_115^0'=i_115^post_18, i_187^0'=i_187^post_18, i_28^0'=i_28^post_18, i_98^0'=i_98^post_18, l_143^0'=l_143^post_18, l_203^0'=l_203^post_18, l_27^0'=l_27^post_18, nd_12^0'=nd_12^post_18, r_135^0'=r_135^post_18, r_183^0'=r_183^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_140^0'=x_140^post_18, x_14^0'=x_14^post_18, x_17^0'=x_17^post_18, x_195^0'=x_195^post_18, x_19^0'=x_19^post_18, x_21^0'=x_21^post_18, y_20^0'=y_20^post_18, [ a_123^0==a_123^post_18 && a_158^0==a_158^post_18 && a_204^0==a_204^post_18 && a_239^0==a_239^post_18 && a_264^0==a_264^post_18 && a_290^0==a_290^post_18 && a_76^0==a_76^post_18 && ct_18^0==ct_18^post_18 && f_190^0==f_190^post_18 && h_15^0==h_15^post_18 && h_30^0==h_30^post_18 && i_115^0==i_115^post_18 && i_187^0==i_187^post_18 && i_28^0==i_28^post_18 && i_98^0==i_98^post_18 && l_143^0==l_143^post_18 && l_203^0==l_203^post_18 && l_27^0==l_27^post_18 && nd_12^0==nd_12^post_18 && r_135^0==r_135^post_18 && r_183^0==r_183^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_14^0==x_14^post_18 && x_140^0==x_140^post_18 && x_17^0==x_17^post_18 && x_19^0==x_19^post_18 && x_195^0==x_195^post_18 && x_21^0==x_21^post_18 && y_20^0==y_20^post_18 ], cost: 1 20: l14 -> l0 : a_123^0'=a_123^post_21, a_158^0'=a_158^post_21, a_204^0'=a_204^post_21, a_239^0'=a_239^post_21, a_264^0'=a_264^post_21, a_290^0'=a_290^post_21, a_76^0'=a_76^post_21, ct_18^0'=ct_18^post_21, f_190^0'=f_190^post_21, h_15^0'=h_15^post_21, h_30^0'=h_30^post_21, i_115^0'=i_115^post_21, i_187^0'=i_187^post_21, i_28^0'=i_28^post_21, i_98^0'=i_98^post_21, l_143^0'=l_143^post_21, l_203^0'=l_203^post_21, l_27^0'=l_27^post_21, nd_12^0'=nd_12^post_21, r_135^0'=r_135^post_21, r_183^0'=r_183^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_140^0'=x_140^post_21, x_14^0'=x_14^post_21, x_17^0'=x_17^post_21, x_195^0'=x_195^post_21, x_19^0'=x_19^post_21, x_21^0'=x_21^post_21, y_20^0'=y_20^post_21, [ a_123^0==a_123^post_21 && a_158^0==a_158^post_21 && a_204^0==a_204^post_21 && a_239^0==a_239^post_21 && a_264^0==a_264^post_21 && a_290^0==a_290^post_21 && a_76^0==a_76^post_21 && ct_18^0==ct_18^post_21 && f_190^0==f_190^post_21 && h_15^0==h_15^post_21 && h_30^0==h_30^post_21 && i_115^0==i_115^post_21 && i_187^0==i_187^post_21 && i_28^0==i_28^post_21 && i_98^0==i_98^post_21 && l_143^0==l_143^post_21 && l_203^0==l_203^post_21 && l_27^0==l_27^post_21 && nd_12^0==nd_12^post_21 && r_135^0==r_135^post_21 && r_183^0==r_183^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_14^0==x_14^post_21 && x_140^0==x_140^post_21 && x_17^0==x_17^post_21 && x_19^0==x_19^post_21 && x_195^0==x_195^post_21 && x_21^0==x_21^post_21 && y_20^0==y_20^post_21 ], cost: 1 Checking for constant complexity: The following rule is satisfiable with cost >= 1, yielding constant complexity: 20: l14 -> l0 : a_123^0'=a_123^post_21, a_158^0'=a_158^post_21, a_204^0'=a_204^post_21, a_239^0'=a_239^post_21, a_264^0'=a_264^post_21, a_290^0'=a_290^post_21, a_76^0'=a_76^post_21, ct_18^0'=ct_18^post_21, f_190^0'=f_190^post_21, h_15^0'=h_15^post_21, h_30^0'=h_30^post_21, i_115^0'=i_115^post_21, i_187^0'=i_187^post_21, i_28^0'=i_28^post_21, i_98^0'=i_98^post_21, l_143^0'=l_143^post_21, l_203^0'=l_203^post_21, l_27^0'=l_27^post_21, nd_12^0'=nd_12^post_21, r_135^0'=r_135^post_21, r_183^0'=r_183^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_140^0'=x_140^post_21, x_14^0'=x_14^post_21, x_17^0'=x_17^post_21, x_195^0'=x_195^post_21, x_19^0'=x_19^post_21, x_21^0'=x_21^post_21, y_20^0'=y_20^post_21, [ a_123^0==a_123^post_21 && a_158^0==a_158^post_21 && a_204^0==a_204^post_21 && a_239^0==a_239^post_21 && a_264^0==a_264^post_21 && a_290^0==a_290^post_21 && a_76^0==a_76^post_21 && ct_18^0==ct_18^post_21 && f_190^0==f_190^post_21 && h_15^0==h_15^post_21 && h_30^0==h_30^post_21 && i_115^0==i_115^post_21 && i_187^0==i_187^post_21 && i_28^0==i_28^post_21 && i_98^0==i_98^post_21 && l_143^0==l_143^post_21 && l_203^0==l_203^post_21 && l_27^0==l_27^post_21 && nd_12^0==nd_12^post_21 && r_135^0==r_135^post_21 && r_183^0==r_183^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_14^0==x_14^post_21 && x_140^0==x_140^post_21 && x_17^0==x_17^post_21 && x_19^0==x_19^post_21 && x_195^0==x_195^post_21 && x_21^0==x_21^post_21 && y_20^0==y_20^post_21 ], cost: 1 Removed unreachable and leaf rules: Start location: l14 0: l0 -> l1 : a_123^0'=a_123^post_1, a_158^0'=a_158^post_1, a_204^0'=a_204^post_1, a_239^0'=a_239^post_1, a_264^0'=a_264^post_1, a_290^0'=a_290^post_1, a_76^0'=a_76^post_1, ct_18^0'=ct_18^post_1, f_190^0'=f_190^post_1, h_15^0'=h_15^post_1, h_30^0'=h_30^post_1, i_115^0'=i_115^post_1, i_187^0'=i_187^post_1, i_28^0'=i_28^post_1, i_98^0'=i_98^post_1, l_143^0'=l_143^post_1, l_203^0'=l_203^post_1, l_27^0'=l_27^post_1, nd_12^0'=nd_12^post_1, r_135^0'=r_135^post_1, r_183^0'=r_183^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_140^0'=x_140^post_1, x_14^0'=x_14^post_1, x_17^0'=x_17^post_1, x_195^0'=x_195^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_158^0==a_158^post_1 && a_204^0==a_204^post_1 && a_239^0==a_239^post_1 && a_264^0==a_264^post_1 && a_290^0==a_290^post_1 && a_76^0==a_76^post_1 && ct_18^0==ct_18^post_1 && f_190^0==f_190^post_1 && h_15^0==h_15^post_1 && i_115^0==i_115^post_1 && i_187^0==i_187^post_1 && i_98^0==i_98^post_1 && l_143^0==l_143^post_1 && l_203^0==l_203^post_1 && r_135^0==r_135^post_1 && r_183^0==r_183^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_14^0==x_14^post_1 && x_140^0==x_140^post_1 && x_17^0==x_17^post_1 && x_19^0==x_19^post_1 && x_195^0==x_195^post_1 && x_21^0==x_21^post_1 && y_20^0==y_20^post_1 ], cost: 1 19: l1 -> l7 : a_123^0'=a_123^post_20, a_158^0'=a_158^post_20, a_204^0'=a_204^post_20, a_239^0'=a_239^post_20, a_264^0'=a_264^post_20, a_290^0'=a_290^post_20, a_76^0'=a_76^post_20, ct_18^0'=ct_18^post_20, f_190^0'=f_190^post_20, h_15^0'=h_15^post_20, h_30^0'=h_30^post_20, i_115^0'=i_115^post_20, i_187^0'=i_187^post_20, i_28^0'=i_28^post_20, i_98^0'=i_98^post_20, l_143^0'=l_143^post_20, l_203^0'=l_203^post_20, l_27^0'=l_27^post_20, nd_12^0'=nd_12^post_20, r_135^0'=r_135^post_20, r_183^0'=r_183^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_140^0'=x_140^post_20, x_14^0'=x_14^post_20, x_17^0'=x_17^post_20, x_195^0'=x_195^post_20, x_19^0'=x_19^post_20, x_21^0'=x_21^post_20, y_20^0'=y_20^post_20, [ rv_13^post_20==rv_13^post_20 && rv_31^post_20==rv_31^post_20 && 1+i_28^0<=l_27^0 && t_32^post_20==tp_33^0 && tp_33^post_20==tp_33^post_20 && h_30^post_20==t_32^post_20 && i_28^post_20==1+i_28^0 && 1<=i_28^post_20 && i_28^post_20<=1 && rv_13^post_20<=l_27^0 && l_27^0<=rv_13^post_20 && h_30^post_20<=rv_31^post_20 && rv_31^post_20<=h_30^post_20 && h_30^post_20<=t_32^post_20 && t_32^post_20<=h_30^post_20 && rv_31^post_20<=t_32^post_20 && t_32^post_20<=rv_31^post_20 && 1<=l_27^0 && a_123^0==a_123^post_20 && a_158^0==a_158^post_20 && a_204^0==a_204^post_20 && a_239^0==a_239^post_20 && a_264^0==a_264^post_20 && a_290^0==a_290^post_20 && a_76^0==a_76^post_20 && ct_18^0==ct_18^post_20 && f_190^0==f_190^post_20 && h_15^0==h_15^post_20 && i_115^0==i_115^post_20 && i_187^0==i_187^post_20 && i_98^0==i_98^post_20 && l_143^0==l_143^post_20 && l_203^0==l_203^post_20 && l_27^0==l_27^post_20 && nd_12^0==nd_12^post_20 && r_135^0==r_135^post_20 && r_183^0==r_183^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 && st_16^0==st_16^post_20 && st_29^0==st_29^post_20 && t_24^0==t_24^post_20 && x_14^0==x_14^post_20 && x_140^0==x_140^post_20 && x_17^0==x_17^post_20 && x_19^0==x_19^post_20 && x_195^0==x_195^post_20 && x_21^0==x_21^post_20 && y_20^0==y_20^post_20 ], cost: 1 2: l2 -> l4 : a_123^0'=a_123^post_3, a_158^0'=a_158^post_3, a_204^0'=a_204^post_3, a_239^0'=a_239^post_3, a_264^0'=a_264^post_3, a_290^0'=a_290^post_3, a_76^0'=a_76^post_3, ct_18^0'=ct_18^post_3, f_190^0'=f_190^post_3, h_15^0'=h_15^post_3, h_30^0'=h_30^post_3, i_115^0'=i_115^post_3, i_187^0'=i_187^post_3, i_28^0'=i_28^post_3, i_98^0'=i_98^post_3, l_143^0'=l_143^post_3, l_203^0'=l_203^post_3, l_27^0'=l_27^post_3, nd_12^0'=nd_12^post_3, r_135^0'=r_135^post_3, r_183^0'=r_183^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_140^0'=x_140^post_3, x_14^0'=x_14^post_3, x_17^0'=x_17^post_3, x_195^0'=x_195^post_3, x_19^0'=x_19^post_3, x_21^0'=x_21^post_3, y_20^0'=y_20^post_3, [ 0<=a_264^0 && rv_13^post_3==rv_13^post_3 && x_14^post_3==x_14^post_3 && h_15^post_3==h_15^post_3 && x_17^post_3==x_17^post_3 && ct_18^post_3==ct_18^post_3 && x_19^post_3==x_19^post_3 && r_37^post_3==r_37^post_3 && t_24^post_3==x_21^0 && a_290^post_3==a_290^post_3 && 0<=x_14^post_3 && x_14^post_3<=0 && 0<=ct_18^post_3 && ct_18^post_3<=0 && 0<=y_20^0 && y_20^0<=0 && h_15^post_3<=x_17^post_3 && x_17^post_3<=h_15^post_3 && h_15^post_3<=x_19^post_3 && x_19^post_3<=h_15^post_3 && x_17^post_3<=x_19^post_3 && x_19^post_3<=x_17^post_3 && ct_18^post_3<=y_20^0 && y_20^0<=ct_18^post_3 && a_290^post_3<=-1+a_264^0 && -1+a_264^0<=a_290^post_3 && 1<=rv_13^post_3 && 2<=rv_13^post_3 && a_264^post_3==a_264^post_3 && a_264^post_3<=a_290^post_3 && a_290^post_3<=a_264^post_3 && a_123^0==a_123^post_3 && a_158^0==a_158^post_3 && a_204^0==a_204^post_3 && a_239^0==a_239^post_3 && a_76^0==a_76^post_3 && f_190^0==f_190^post_3 && h_30^0==h_30^post_3 && i_115^0==i_115^post_3 && i_187^0==i_187^post_3 && i_28^0==i_28^post_3 && i_98^0==i_98^post_3 && l_143^0==l_143^post_3 && l_203^0==l_203^post_3 && l_27^0==l_27^post_3 && nd_12^0==nd_12^post_3 && r_135^0==r_135^post_3 && r_183^0==r_183^post_3 && r_57^0==r_57^post_3 && r_92^0==r_92^post_3 && rt_11^0==rt_11^post_3 && rv_31^0==rv_31^post_3 && st_16^0==st_16^post_3 && st_29^0==st_29^post_3 && t_32^0==t_32^post_3 && tp_33^0==tp_33^post_3 && x_140^0==x_140^post_3 && x_195^0==x_195^post_3 && x_21^0==x_21^post_3 && y_20^0==y_20^post_3 ], cost: 1 3: l4 -> l2 : a_123^0'=a_123^post_4, a_158^0'=a_158^post_4, a_204^0'=a_204^post_4, a_239^0'=a_239^post_4, a_264^0'=a_264^post_4, a_290^0'=a_290^post_4, a_76^0'=a_76^post_4, ct_18^0'=ct_18^post_4, f_190^0'=f_190^post_4, h_15^0'=h_15^post_4, h_30^0'=h_30^post_4, i_115^0'=i_115^post_4, i_187^0'=i_187^post_4, i_28^0'=i_28^post_4, i_98^0'=i_98^post_4, l_143^0'=l_143^post_4, l_203^0'=l_203^post_4, l_27^0'=l_27^post_4, nd_12^0'=nd_12^post_4, r_135^0'=r_135^post_4, r_183^0'=r_183^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_140^0'=x_140^post_4, x_14^0'=x_14^post_4, x_17^0'=x_17^post_4, x_195^0'=x_195^post_4, x_19^0'=x_19^post_4, x_21^0'=x_21^post_4, y_20^0'=y_20^post_4, [ a_123^0==a_123^post_4 && a_158^0==a_158^post_4 && a_204^0==a_204^post_4 && a_239^0==a_239^post_4 && a_264^0==a_264^post_4 && a_290^0==a_290^post_4 && a_76^0==a_76^post_4 && ct_18^0==ct_18^post_4 && f_190^0==f_190^post_4 && h_15^0==h_15^post_4 && h_30^0==h_30^post_4 && i_115^0==i_115^post_4 && i_187^0==i_187^post_4 && i_28^0==i_28^post_4 && i_98^0==i_98^post_4 && l_143^0==l_143^post_4 && l_203^0==l_203^post_4 && l_27^0==l_27^post_4 && nd_12^0==nd_12^post_4 && r_135^0==r_135^post_4 && r_183^0==r_183^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_14^0==x_14^post_4 && x_140^0==x_140^post_4 && x_17^0==x_17^post_4 && x_19^0==x_19^post_4 && x_195^0==x_195^post_4 && x_21^0==x_21^post_4 && y_20^0==y_20^post_4 ], cost: 1 6: l6 -> l2 : a_123^0'=a_123^post_7, a_158^0'=a_158^post_7, a_204^0'=a_204^post_7, a_239^0'=a_239^post_7, a_264^0'=a_264^post_7, a_290^0'=a_290^post_7, a_76^0'=a_76^post_7, ct_18^0'=ct_18^post_7, f_190^0'=f_190^post_7, h_15^0'=h_15^post_7, h_30^0'=h_30^post_7, i_115^0'=i_115^post_7, i_187^0'=i_187^post_7, i_28^0'=i_28^post_7, i_98^0'=i_98^post_7, l_143^0'=l_143^post_7, l_203^0'=l_203^post_7, l_27^0'=l_27^post_7, nd_12^0'=nd_12^post_7, r_135^0'=r_135^post_7, r_183^0'=r_183^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_140^0'=x_140^post_7, x_14^0'=x_14^post_7, x_17^0'=x_17^post_7, x_195^0'=x_195^post_7, x_19^0'=x_19^post_7, x_21^0'=x_21^post_7, y_20^0'=y_20^post_7, [ 0<=l_143^0 && rv_13^post_7==rv_13^post_7 && x_14^post_7==x_14^post_7 && h_15^post_7==h_15^post_7 && x_17^post_7==x_17^post_7 && ct_18^post_7==ct_18^post_7 && x_19^post_7==x_19^post_7 && t_24^post_7==x_21^0 && a_239^post_7==a_239^post_7 && 0<=x_14^post_7 && x_14^post_7<=0 && 0<=ct_18^post_7 && ct_18^post_7<=0 && 0<=y_20^0 && y_20^0<=0 && 0<=a_264^0-a_239^post_7 && a_264^0-a_239^post_7<=0 && h_15^post_7<=x_17^post_7 && x_17^post_7<=h_15^post_7 && h_15^post_7<=x_19^post_7 && x_19^post_7<=h_15^post_7 && h_15^post_7<=t_24^post_7 && t_24^post_7<=h_15^post_7 && x_17^post_7<=x_19^post_7 && x_19^post_7<=x_17^post_7 && ct_18^post_7<=y_20^0 && y_20^0<=ct_18^post_7 && a_239^post_7<=a_264^0 && a_264^0<=a_239^post_7 && 1<=rv_13^post_7 && 2<=rv_13^post_7 && l_143^post_7==l_143^post_7 && -1+l_143^post_7<=a_239^post_7 && a_239^post_7<=-1+l_143^post_7 && a_123^0==a_123^post_7 && a_158^0==a_158^post_7 && a_204^0==a_204^post_7 && a_264^0==a_264^post_7 && a_290^0==a_290^post_7 && a_76^0==a_76^post_7 && f_190^0==f_190^post_7 && h_30^0==h_30^post_7 && i_115^0==i_115^post_7 && i_187^0==i_187^post_7 && i_28^0==i_28^post_7 && i_98^0==i_98^post_7 && l_203^0==l_203^post_7 && l_27^0==l_27^post_7 && nd_12^0==nd_12^post_7 && r_135^0==r_135^post_7 && r_183^0==r_183^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_31^0==rv_31^post_7 && st_16^0==st_16^post_7 && st_29^0==st_29^post_7 && t_32^0==t_32^post_7 && tp_33^0==tp_33^post_7 && x_140^0==x_140^post_7 && x_195^0==x_195^post_7 && x_21^0==x_21^post_7 && y_20^0==y_20^post_7 ], cost: 1 8: l7 -> l8 : a_123^0'=a_123^post_9, a_158^0'=a_158^post_9, a_204^0'=a_204^post_9, a_239^0'=a_239^post_9, a_264^0'=a_264^post_9, a_290^0'=a_290^post_9, a_76^0'=a_76^post_9, ct_18^0'=ct_18^post_9, f_190^0'=f_190^post_9, h_15^0'=h_15^post_9, h_30^0'=h_30^post_9, i_115^0'=i_115^post_9, i_187^0'=i_187^post_9, i_28^0'=i_28^post_9, i_98^0'=i_98^post_9, l_143^0'=l_143^post_9, l_203^0'=l_203^post_9, l_27^0'=l_27^post_9, nd_12^0'=nd_12^post_9, r_135^0'=r_135^post_9, r_183^0'=r_183^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_140^0'=x_140^post_9, x_14^0'=x_14^post_9, x_17^0'=x_17^post_9, x_195^0'=x_195^post_9, x_19^0'=x_19^post_9, x_21^0'=x_21^post_9, y_20^0'=y_20^post_9, [ rv_13^post_9==rv_13^post_9 && rv_31^post_9==rv_31^post_9 && r_57^post_9==r_57^post_9 && 1+i_28^0<=l_27^0 && t_32^post_9==tp_33^0 && tp_33^post_9==tp_33^post_9 && h_30^post_9==t_32^post_9 && i_28^1_1==1+i_28^0 && i_28^post_9==i_28^post_9 && 2<=i_28^post_9 && i_28^post_9<=2 && rv_13^post_9<=l_27^0 && l_27^0<=rv_13^post_9 && h_30^post_9<=rv_31^post_9 && rv_31^post_9<=h_30^post_9 && h_30^post_9<=t_32^post_9 && t_32^post_9<=h_30^post_9 && rv_31^post_9<=t_32^post_9 && t_32^post_9<=rv_31^post_9 && 1<=l_27^0 && 2<=l_27^0 && a_76^post_9==a_76^post_9 && a_76^post_9<=i_28^post_9 && i_28^post_9<=a_76^post_9 && a_123^0==a_123^post_9 && a_158^0==a_158^post_9 && a_204^0==a_204^post_9 && a_239^0==a_239^post_9 && a_264^0==a_264^post_9 && a_290^0==a_290^post_9 && ct_18^0==ct_18^post_9 && f_190^0==f_190^post_9 && h_15^0==h_15^post_9 && i_115^0==i_115^post_9 && i_187^0==i_187^post_9 && i_98^0==i_98^post_9 && l_143^0==l_143^post_9 && l_203^0==l_203^post_9 && l_27^0==l_27^post_9 && nd_12^0==nd_12^post_9 && r_135^0==r_135^post_9 && r_183^0==r_183^post_9 && r_37^0==r_37^post_9 && r_92^0==r_92^post_9 && rt_11^0==rt_11^post_9 && st_16^0==st_16^post_9 && st_29^0==st_29^post_9 && t_24^0==t_24^post_9 && x_14^0==x_14^post_9 && x_140^0==x_140^post_9 && x_17^0==x_17^post_9 && x_19^0==x_19^post_9 && x_195^0==x_195^post_9 && x_21^0==x_21^post_9 && y_20^0==y_20^post_9 ], cost: 1 15: l8 -> l9 : a_123^0'=a_123^post_16, a_158^0'=a_158^post_16, a_204^0'=a_204^post_16, a_239^0'=a_239^post_16, a_264^0'=a_264^post_16, a_290^0'=a_290^post_16, a_76^0'=a_76^post_16, ct_18^0'=ct_18^post_16, f_190^0'=f_190^post_16, h_15^0'=h_15^post_16, h_30^0'=h_30^post_16, i_115^0'=i_115^post_16, i_187^0'=i_187^post_16, i_28^0'=i_28^post_16, i_98^0'=i_98^post_16, l_143^0'=l_143^post_16, l_203^0'=l_203^post_16, l_27^0'=l_27^post_16, nd_12^0'=nd_12^post_16, r_135^0'=r_135^post_16, r_183^0'=r_183^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_140^0'=x_140^post_16, x_14^0'=x_14^post_16, x_17^0'=x_17^post_16, x_195^0'=x_195^post_16, x_19^0'=x_19^post_16, x_21^0'=x_21^post_16, y_20^0'=y_20^post_16, [ 0<=i_28^0 && rv_13^post_16==rv_13^post_16 && i_187^post_16==i_187^post_16 && l_27^0<=i_28^0 && st_29^1_2_1==h_30^0 && rt_11^1_2==st_29^1_2_1 && l_27^post_16==l_27^post_16 && i_28^post_16==i_28^post_16 && st_29^post_16==st_29^post_16 && h_30^post_16==h_30^post_16 && rv_31^post_16==rv_31^post_16 && t_32^post_16==t_32^post_16 && tp_33^post_16==tp_33^post_16 && h_15^post_16==rt_11^1_2 && rt_11^post_16==rt_11^post_16 && x_14^post_16==h_15^post_16 && 0<=l_143^0 && l_143^0<=0 && 0<=a_158^0-i_28^post_16 && a_158^0-i_28^post_16<=0 && x_14^post_16<=h_15^post_16 && h_15^post_16<=x_14^post_16 && i_28^post_16<=a_158^0 && a_158^0<=i_28^post_16 && 1<=rv_13^post_16 && 2<=rv_13^post_16 && rv_13^post_16<=i_28^post_16 && rv_13^post_16<=i_187^post_16 && a_123^0==a_123^post_16 && a_158^0==a_158^post_16 && a_204^0==a_204^post_16 && a_239^0==a_239^post_16 && a_264^0==a_264^post_16 && a_290^0==a_290^post_16 && a_76^0==a_76^post_16 && ct_18^0==ct_18^post_16 && f_190^0==f_190^post_16 && i_115^0==i_115^post_16 && i_98^0==i_98^post_16 && l_143^0==l_143^post_16 && l_203^0==l_203^post_16 && nd_12^0==nd_12^post_16 && r_135^0==r_135^post_16 && r_183^0==r_183^post_16 && r_37^0==r_37^post_16 && r_57^0==r_57^post_16 && r_92^0==r_92^post_16 && st_16^0==st_16^post_16 && t_24^0==t_24^post_16 && x_140^0==x_140^post_16 && x_17^0==x_17^post_16 && x_19^0==x_19^post_16 && x_195^0==x_195^post_16 && x_21^0==x_21^post_16 && y_20^0==y_20^post_16 ], cost: 1 16: l8 -> l13 : a_123^0'=a_123^post_17, a_158^0'=a_158^post_17, a_204^0'=a_204^post_17, a_239^0'=a_239^post_17, a_264^0'=a_264^post_17, a_290^0'=a_290^post_17, a_76^0'=a_76^post_17, ct_18^0'=ct_18^post_17, f_190^0'=f_190^post_17, h_15^0'=h_15^post_17, h_30^0'=h_30^post_17, i_115^0'=i_115^post_17, i_187^0'=i_187^post_17, i_28^0'=i_28^post_17, i_98^0'=i_98^post_17, l_143^0'=l_143^post_17, l_203^0'=l_203^post_17, l_27^0'=l_27^post_17, nd_12^0'=nd_12^post_17, r_135^0'=r_135^post_17, r_183^0'=r_183^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_140^0'=x_140^post_17, x_14^0'=x_14^post_17, x_17^0'=x_17^post_17, x_195^0'=x_195^post_17, x_19^0'=x_19^post_17, x_21^0'=x_21^post_17, y_20^0'=y_20^post_17, [ 0<=i_28^0 && r_92^post_17==r_92^post_17 && i_98^post_17==i_98^post_17 && 1+i_28^0<=l_27^0 && t_32^post_17==tp_33^0 && tp_33^post_17==tp_33^post_17 && h_30^post_17==t_32^post_17 && i_28^post_17==1+i_28^0 && i_28^post_17<=1+i_98^post_17 && 1+i_98^post_17<=i_28^post_17 && i_98^post_17<=-1+i_28^post_17 && -1+i_28^post_17<=i_98^post_17 && 1+i_98^post_17<=l_27^0 && a_123^0==a_123^post_17 && a_158^0==a_158^post_17 && a_204^0==a_204^post_17 && a_239^0==a_239^post_17 && a_264^0==a_264^post_17 && a_290^0==a_290^post_17 && a_76^0==a_76^post_17 && ct_18^0==ct_18^post_17 && f_190^0==f_190^post_17 && h_15^0==h_15^post_17 && i_115^0==i_115^post_17 && i_187^0==i_187^post_17 && l_143^0==l_143^post_17 && l_203^0==l_203^post_17 && l_27^0==l_27^post_17 && nd_12^0==nd_12^post_17 && r_135^0==r_135^post_17 && r_183^0==r_183^post_17 && r_37^0==r_37^post_17 && r_57^0==r_57^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 && x_14^0==x_14^post_17 && x_140^0==x_140^post_17 && x_17^0==x_17^post_17 && x_19^0==x_19^post_17 && x_195^0==x_195^post_17 && x_21^0==x_21^post_17 && y_20^0==y_20^post_17 ], cost: 1 9: l9 -> l6 : a_123^0'=a_123^post_10, a_158^0'=a_158^post_10, a_204^0'=a_204^post_10, a_239^0'=a_239^post_10, a_264^0'=a_264^post_10, a_290^0'=a_290^post_10, a_76^0'=a_76^post_10, ct_18^0'=ct_18^post_10, f_190^0'=f_190^post_10, h_15^0'=h_15^post_10, h_30^0'=h_30^post_10, i_115^0'=i_115^post_10, i_187^0'=i_187^post_10, i_28^0'=i_28^post_10, i_98^0'=i_98^post_10, l_143^0'=l_143^post_10, l_203^0'=l_203^post_10, l_27^0'=l_27^post_10, nd_12^0'=nd_12^post_10, r_135^0'=r_135^post_10, r_183^0'=r_183^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_140^0'=x_140^post_10, x_14^0'=x_14^post_10, x_17^0'=x_17^post_10, x_195^0'=x_195^post_10, x_19^0'=x_19^post_10, x_21^0'=x_21^post_10, y_20^0'=y_20^post_10, [ 0<=a_158^0 && 0<=l_143^0 && rv_13^post_10==rv_13^post_10 && 0<=x_14^0 && x_14^0<=0 && x_17^post_10==h_15^0 && ct_18^post_10==0 && x_19^post_10==x_17^post_10 && y_20^post_10==ct_18^post_10 && x_21^post_10==x_19^post_10 && 0<=x_14^0 && x_14^0<=0 && 0<=ct_18^post_10 && ct_18^post_10<=0 && 0<=y_20^post_10 && y_20^post_10<=0 && h_15^0<=x_17^post_10 && x_17^post_10<=h_15^0 && h_15^0<=x_19^post_10 && x_19^post_10<=h_15^0 && h_15^0<=x_21^post_10 && x_21^post_10<=h_15^0 && x_17^post_10<=x_19^post_10 && x_19^post_10<=x_17^post_10 && ct_18^post_10<=y_20^post_10 && y_20^post_10<=ct_18^post_10 && x_19^post_10<=x_21^post_10 && x_21^post_10<=x_19^post_10 && 1<=rv_13^post_10 && 2<=rv_13^post_10 && a_123^0==a_123^post_10 && a_158^0==a_158^post_10 && a_204^0==a_204^post_10 && a_239^0==a_239^post_10 && a_264^0==a_264^post_10 && a_290^0==a_290^post_10 && a_76^0==a_76^post_10 && f_190^0==f_190^post_10 && h_15^0==h_15^post_10 && h_30^0==h_30^post_10 && i_115^0==i_115^post_10 && i_187^0==i_187^post_10 && i_28^0==i_28^post_10 && i_98^0==i_98^post_10 && l_143^0==l_143^post_10 && l_203^0==l_203^post_10 && l_27^0==l_27^post_10 && nd_12^0==nd_12^post_10 && r_135^0==r_135^post_10 && r_183^0==r_183^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_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_14^0==x_14^post_10 && x_140^0==x_140^post_10 && x_195^0==x_195^post_10 ], cost: 1 10: l9 -> l10 : a_123^0'=a_123^post_11, a_158^0'=a_158^post_11, a_204^0'=a_204^post_11, a_239^0'=a_239^post_11, a_264^0'=a_264^post_11, a_290^0'=a_290^post_11, a_76^0'=a_76^post_11, ct_18^0'=ct_18^post_11, f_190^0'=f_190^post_11, h_15^0'=h_15^post_11, h_30^0'=h_30^post_11, i_115^0'=i_115^post_11, i_187^0'=i_187^post_11, i_28^0'=i_28^post_11, i_98^0'=i_98^post_11, l_143^0'=l_143^post_11, l_203^0'=l_203^post_11, l_27^0'=l_27^post_11, nd_12^0'=nd_12^post_11, r_135^0'=r_135^post_11, r_183^0'=r_183^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_140^0'=x_140^post_11, x_14^0'=x_14^post_11, x_17^0'=x_17^post_11, x_195^0'=x_195^post_11, x_19^0'=x_19^post_11, x_21^0'=x_21^post_11, y_20^0'=y_20^post_11, [ 0<=a_158^0 && 0<=l_143^0 && rv_13^post_11==rv_13^post_11 && h_15^post_11==h_15^post_11 && r_37^post_11==r_37^post_11 && f_190^post_11==f_190^post_11 && x_195^post_11==x_195^post_11 && l_203^post_11==l_203^post_11 && a_204^post_11==a_204^post_11 && 1<=-l_143^0+l_203^post_11 && -l_143^0+l_203^post_11<=1 && x_14^0<=f_190^post_11 && f_190^post_11<=x_14^0 && a_204^post_11<=-1+a_158^0 && -1+a_158^0<=a_204^post_11 && 1<=rv_13^post_11 && 2<=rv_13^post_11 && a_158^post_11==a_158^post_11 && a_158^post_11<=a_204^post_11 && a_204^post_11<=a_158^post_11 && l_143^post_11==l_143^post_11 && l_143^post_11<=l_203^post_11 && l_203^post_11<=l_143^post_11 && a_123^0==a_123^post_11 && a_239^0==a_239^post_11 && a_264^0==a_264^post_11 && a_290^0==a_290^post_11 && a_76^0==a_76^post_11 && ct_18^0==ct_18^post_11 && h_30^0==h_30^post_11 && i_115^0==i_115^post_11 && i_187^0==i_187^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_183^0==r_183^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_14^0==x_14^post_11 && x_140^0==x_140^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 ], cost: 1 11: l10 -> l9 : a_123^0'=a_123^post_12, a_158^0'=a_158^post_12, a_204^0'=a_204^post_12, a_239^0'=a_239^post_12, a_264^0'=a_264^post_12, a_290^0'=a_290^post_12, a_76^0'=a_76^post_12, ct_18^0'=ct_18^post_12, f_190^0'=f_190^post_12, h_15^0'=h_15^post_12, h_30^0'=h_30^post_12, i_115^0'=i_115^post_12, i_187^0'=i_187^post_12, i_28^0'=i_28^post_12, i_98^0'=i_98^post_12, l_143^0'=l_143^post_12, l_203^0'=l_203^post_12, l_27^0'=l_27^post_12, nd_12^0'=nd_12^post_12, r_135^0'=r_135^post_12, r_183^0'=r_183^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_140^0'=x_140^post_12, x_14^0'=x_14^post_12, x_17^0'=x_17^post_12, x_195^0'=x_195^post_12, x_19^0'=x_19^post_12, x_21^0'=x_21^post_12, y_20^0'=y_20^post_12, [ a_123^0==a_123^post_12 && a_158^0==a_158^post_12 && a_204^0==a_204^post_12 && a_239^0==a_239^post_12 && a_264^0==a_264^post_12 && a_290^0==a_290^post_12 && a_76^0==a_76^post_12 && ct_18^0==ct_18^post_12 && f_190^0==f_190^post_12 && h_15^0==h_15^post_12 && h_30^0==h_30^post_12 && i_115^0==i_115^post_12 && i_187^0==i_187^post_12 && i_28^0==i_28^post_12 && i_98^0==i_98^post_12 && l_143^0==l_143^post_12 && l_203^0==l_203^post_12 && l_27^0==l_27^post_12 && nd_12^0==nd_12^post_12 && r_135^0==r_135^post_12 && r_183^0==r_183^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_14^0==x_14^post_12 && x_140^0==x_140^post_12 && x_17^0==x_17^post_12 && x_19^0==x_19^post_12 && x_195^0==x_195^post_12 && x_21^0==x_21^post_12 && y_20^0==y_20^post_12 ], cost: 1 17: l13 -> l8 : a_123^0'=a_123^post_18, a_158^0'=a_158^post_18, a_204^0'=a_204^post_18, a_239^0'=a_239^post_18, a_264^0'=a_264^post_18, a_290^0'=a_290^post_18, a_76^0'=a_76^post_18, ct_18^0'=ct_18^post_18, f_190^0'=f_190^post_18, h_15^0'=h_15^post_18, h_30^0'=h_30^post_18, i_115^0'=i_115^post_18, i_187^0'=i_187^post_18, i_28^0'=i_28^post_18, i_98^0'=i_98^post_18, l_143^0'=l_143^post_18, l_203^0'=l_203^post_18, l_27^0'=l_27^post_18, nd_12^0'=nd_12^post_18, r_135^0'=r_135^post_18, r_183^0'=r_183^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_140^0'=x_140^post_18, x_14^0'=x_14^post_18, x_17^0'=x_17^post_18, x_195^0'=x_195^post_18, x_19^0'=x_19^post_18, x_21^0'=x_21^post_18, y_20^0'=y_20^post_18, [ a_123^0==a_123^post_18 && a_158^0==a_158^post_18 && a_204^0==a_204^post_18 && a_239^0==a_239^post_18 && a_264^0==a_264^post_18 && a_290^0==a_290^post_18 && a_76^0==a_76^post_18 && ct_18^0==ct_18^post_18 && f_190^0==f_190^post_18 && h_15^0==h_15^post_18 && h_30^0==h_30^post_18 && i_115^0==i_115^post_18 && i_187^0==i_187^post_18 && i_28^0==i_28^post_18 && i_98^0==i_98^post_18 && l_143^0==l_143^post_18 && l_203^0==l_203^post_18 && l_27^0==l_27^post_18 && nd_12^0==nd_12^post_18 && r_135^0==r_135^post_18 && r_183^0==r_183^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_14^0==x_14^post_18 && x_140^0==x_140^post_18 && x_17^0==x_17^post_18 && x_19^0==x_19^post_18 && x_195^0==x_195^post_18 && x_21^0==x_21^post_18 && y_20^0==y_20^post_18 ], cost: 1 20: l14 -> l0 : a_123^0'=a_123^post_21, a_158^0'=a_158^post_21, a_204^0'=a_204^post_21, a_239^0'=a_239^post_21, a_264^0'=a_264^post_21, a_290^0'=a_290^post_21, a_76^0'=a_76^post_21, ct_18^0'=ct_18^post_21, f_190^0'=f_190^post_21, h_15^0'=h_15^post_21, h_30^0'=h_30^post_21, i_115^0'=i_115^post_21, i_187^0'=i_187^post_21, i_28^0'=i_28^post_21, i_98^0'=i_98^post_21, l_143^0'=l_143^post_21, l_203^0'=l_203^post_21, l_27^0'=l_27^post_21, nd_12^0'=nd_12^post_21, r_135^0'=r_135^post_21, r_183^0'=r_183^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_140^0'=x_140^post_21, x_14^0'=x_14^post_21, x_17^0'=x_17^post_21, x_195^0'=x_195^post_21, x_19^0'=x_19^post_21, x_21^0'=x_21^post_21, y_20^0'=y_20^post_21, [ a_123^0==a_123^post_21 && a_158^0==a_158^post_21 && a_204^0==a_204^post_21 && a_239^0==a_239^post_21 && a_264^0==a_264^post_21 && a_290^0==a_290^post_21 && a_76^0==a_76^post_21 && ct_18^0==ct_18^post_21 && f_190^0==f_190^post_21 && h_15^0==h_15^post_21 && h_30^0==h_30^post_21 && i_115^0==i_115^post_21 && i_187^0==i_187^post_21 && i_28^0==i_28^post_21 && i_98^0==i_98^post_21 && l_143^0==l_143^post_21 && l_203^0==l_203^post_21 && l_27^0==l_27^post_21 && nd_12^0==nd_12^post_21 && r_135^0==r_135^post_21 && r_183^0==r_183^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_14^0==x_14^post_21 && x_140^0==x_140^post_21 && x_17^0==x_17^post_21 && x_19^0==x_19^post_21 && x_195^0==x_195^post_21 && x_21^0==x_21^post_21 && y_20^0==y_20^post_21 ], cost: 1 Removed unreachable and leaf rules: Start location: l14 0: l0 -> l1 : a_123^0'=a_123^post_1, a_158^0'=a_158^post_1, a_204^0'=a_204^post_1, a_239^0'=a_239^post_1, a_264^0'=a_264^post_1, a_290^0'=a_290^post_1, a_76^0'=a_76^post_1, ct_18^0'=ct_18^post_1, f_190^0'=f_190^post_1, h_15^0'=h_15^post_1, h_30^0'=h_30^post_1, i_115^0'=i_115^post_1, i_187^0'=i_187^post_1, i_28^0'=i_28^post_1, i_98^0'=i_98^post_1, l_143^0'=l_143^post_1, l_203^0'=l_203^post_1, l_27^0'=l_27^post_1, nd_12^0'=nd_12^post_1, r_135^0'=r_135^post_1, r_183^0'=r_183^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_140^0'=x_140^post_1, x_14^0'=x_14^post_1, x_17^0'=x_17^post_1, x_195^0'=x_195^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_158^0==a_158^post_1 && a_204^0==a_204^post_1 && a_239^0==a_239^post_1 && a_264^0==a_264^post_1 && a_290^0==a_290^post_1 && a_76^0==a_76^post_1 && ct_18^0==ct_18^post_1 && f_190^0==f_190^post_1 && h_15^0==h_15^post_1 && i_115^0==i_115^post_1 && i_187^0==i_187^post_1 && i_98^0==i_98^post_1 && l_143^0==l_143^post_1 && l_203^0==l_203^post_1 && r_135^0==r_135^post_1 && r_183^0==r_183^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_14^0==x_14^post_1 && x_140^0==x_140^post_1 && x_17^0==x_17^post_1 && x_19^0==x_19^post_1 && x_195^0==x_195^post_1 && x_21^0==x_21^post_1 && y_20^0==y_20^post_1 ], cost: 1 19: l1 -> l7 : a_123^0'=a_123^post_20, a_158^0'=a_158^post_20, a_204^0'=a_204^post_20, a_239^0'=a_239^post_20, a_264^0'=a_264^post_20, a_290^0'=a_290^post_20, a_76^0'=a_76^post_20, ct_18^0'=ct_18^post_20, f_190^0'=f_190^post_20, h_15^0'=h_15^post_20, h_30^0'=h_30^post_20, i_115^0'=i_115^post_20, i_187^0'=i_187^post_20, i_28^0'=i_28^post_20, i_98^0'=i_98^post_20, l_143^0'=l_143^post_20, l_203^0'=l_203^post_20, l_27^0'=l_27^post_20, nd_12^0'=nd_12^post_20, r_135^0'=r_135^post_20, r_183^0'=r_183^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_140^0'=x_140^post_20, x_14^0'=x_14^post_20, x_17^0'=x_17^post_20, x_195^0'=x_195^post_20, x_19^0'=x_19^post_20, x_21^0'=x_21^post_20, y_20^0'=y_20^post_20, [ rv_13^post_20==rv_13^post_20 && rv_31^post_20==rv_31^post_20 && 1+i_28^0<=l_27^0 && t_32^post_20==tp_33^0 && tp_33^post_20==tp_33^post_20 && h_30^post_20==t_32^post_20 && i_28^post_20==1+i_28^0 && 1<=i_28^post_20 && i_28^post_20<=1 && rv_13^post_20<=l_27^0 && l_27^0<=rv_13^post_20 && h_30^post_20<=rv_31^post_20 && rv_31^post_20<=h_30^post_20 && h_30^post_20<=t_32^post_20 && t_32^post_20<=h_30^post_20 && rv_31^post_20<=t_32^post_20 && t_32^post_20<=rv_31^post_20 && 1<=l_27^0 && a_123^0==a_123^post_20 && a_158^0==a_158^post_20 && a_204^0==a_204^post_20 && a_239^0==a_239^post_20 && a_264^0==a_264^post_20 && a_290^0==a_290^post_20 && a_76^0==a_76^post_20 && ct_18^0==ct_18^post_20 && f_190^0==f_190^post_20 && h_15^0==h_15^post_20 && i_115^0==i_115^post_20 && i_187^0==i_187^post_20 && i_98^0==i_98^post_20 && l_143^0==l_143^post_20 && l_203^0==l_203^post_20 && l_27^0==l_27^post_20 && nd_12^0==nd_12^post_20 && r_135^0==r_135^post_20 && r_183^0==r_183^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 && st_16^0==st_16^post_20 && st_29^0==st_29^post_20 && t_24^0==t_24^post_20 && x_14^0==x_14^post_20 && x_140^0==x_140^post_20 && x_17^0==x_17^post_20 && x_19^0==x_19^post_20 && x_195^0==x_195^post_20 && x_21^0==x_21^post_20 && y_20^0==y_20^post_20 ], cost: 1 2: l2 -> l4 : a_123^0'=a_123^post_3, a_158^0'=a_158^post_3, a_204^0'=a_204^post_3, a_239^0'=a_239^post_3, a_264^0'=a_264^post_3, a_290^0'=a_290^post_3, a_76^0'=a_76^post_3, ct_18^0'=ct_18^post_3, f_190^0'=f_190^post_3, h_15^0'=h_15^post_3, h_30^0'=h_30^post_3, i_115^0'=i_115^post_3, i_187^0'=i_187^post_3, i_28^0'=i_28^post_3, i_98^0'=i_98^post_3, l_143^0'=l_143^post_3, l_203^0'=l_203^post_3, l_27^0'=l_27^post_3, nd_12^0'=nd_12^post_3, r_135^0'=r_135^post_3, r_183^0'=r_183^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_140^0'=x_140^post_3, x_14^0'=x_14^post_3, x_17^0'=x_17^post_3, x_195^0'=x_195^post_3, x_19^0'=x_19^post_3, x_21^0'=x_21^post_3, y_20^0'=y_20^post_3, [ 0<=a_264^0 && rv_13^post_3==rv_13^post_3 && x_14^post_3==x_14^post_3 && h_15^post_3==h_15^post_3 && x_17^post_3==x_17^post_3 && ct_18^post_3==ct_18^post_3 && x_19^post_3==x_19^post_3 && r_37^post_3==r_37^post_3 && t_24^post_3==x_21^0 && a_290^post_3==a_290^post_3 && 0<=x_14^post_3 && x_14^post_3<=0 && 0<=ct_18^post_3 && ct_18^post_3<=0 && 0<=y_20^0 && y_20^0<=0 && h_15^post_3<=x_17^post_3 && x_17^post_3<=h_15^post_3 && h_15^post_3<=x_19^post_3 && x_19^post_3<=h_15^post_3 && x_17^post_3<=x_19^post_3 && x_19^post_3<=x_17^post_3 && ct_18^post_3<=y_20^0 && y_20^0<=ct_18^post_3 && a_290^post_3<=-1+a_264^0 && -1+a_264^0<=a_290^post_3 && 1<=rv_13^post_3 && 2<=rv_13^post_3 && a_264^post_3==a_264^post_3 && a_264^post_3<=a_290^post_3 && a_290^post_3<=a_264^post_3 && a_123^0==a_123^post_3 && a_158^0==a_158^post_3 && a_204^0==a_204^post_3 && a_239^0==a_239^post_3 && a_76^0==a_76^post_3 && f_190^0==f_190^post_3 && h_30^0==h_30^post_3 && i_115^0==i_115^post_3 && i_187^0==i_187^post_3 && i_28^0==i_28^post_3 && i_98^0==i_98^post_3 && l_143^0==l_143^post_3 && l_203^0==l_203^post_3 && l_27^0==l_27^post_3 && nd_12^0==nd_12^post_3 && r_135^0==r_135^post_3 && r_183^0==r_183^post_3 && r_57^0==r_57^post_3 && r_92^0==r_92^post_3 && rt_11^0==rt_11^post_3 && rv_31^0==rv_31^post_3 && st_16^0==st_16^post_3 && st_29^0==st_29^post_3 && t_32^0==t_32^post_3 && tp_33^0==tp_33^post_3 && x_140^0==x_140^post_3 && x_195^0==x_195^post_3 && x_21^0==x_21^post_3 && y_20^0==y_20^post_3 ], cost: 1 3: l4 -> l2 : a_123^0'=a_123^post_4, a_158^0'=a_158^post_4, a_204^0'=a_204^post_4, a_239^0'=a_239^post_4, a_264^0'=a_264^post_4, a_290^0'=a_290^post_4, a_76^0'=a_76^post_4, ct_18^0'=ct_18^post_4, f_190^0'=f_190^post_4, h_15^0'=h_15^post_4, h_30^0'=h_30^post_4, i_115^0'=i_115^post_4, i_187^0'=i_187^post_4, i_28^0'=i_28^post_4, i_98^0'=i_98^post_4, l_143^0'=l_143^post_4, l_203^0'=l_203^post_4, l_27^0'=l_27^post_4, nd_12^0'=nd_12^post_4, r_135^0'=r_135^post_4, r_183^0'=r_183^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_140^0'=x_140^post_4, x_14^0'=x_14^post_4, x_17^0'=x_17^post_4, x_195^0'=x_195^post_4, x_19^0'=x_19^post_4, x_21^0'=x_21^post_4, y_20^0'=y_20^post_4, [ a_123^0==a_123^post_4 && a_158^0==a_158^post_4 && a_204^0==a_204^post_4 && a_239^0==a_239^post_4 && a_264^0==a_264^post_4 && a_290^0==a_290^post_4 && a_76^0==a_76^post_4 && ct_18^0==ct_18^post_4 && f_190^0==f_190^post_4 && h_15^0==h_15^post_4 && h_30^0==h_30^post_4 && i_115^0==i_115^post_4 && i_187^0==i_187^post_4 && i_28^0==i_28^post_4 && i_98^0==i_98^post_4 && l_143^0==l_143^post_4 && l_203^0==l_203^post_4 && l_27^0==l_27^post_4 && nd_12^0==nd_12^post_4 && r_135^0==r_135^post_4 && r_183^0==r_183^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_14^0==x_14^post_4 && x_140^0==x_140^post_4 && x_17^0==x_17^post_4 && x_19^0==x_19^post_4 && x_195^0==x_195^post_4 && x_21^0==x_21^post_4 && y_20^0==y_20^post_4 ], cost: 1 6: l6 -> l2 : a_123^0'=a_123^post_7, a_158^0'=a_158^post_7, a_204^0'=a_204^post_7, a_239^0'=a_239^post_7, a_264^0'=a_264^post_7, a_290^0'=a_290^post_7, a_76^0'=a_76^post_7, ct_18^0'=ct_18^post_7, f_190^0'=f_190^post_7, h_15^0'=h_15^post_7, h_30^0'=h_30^post_7, i_115^0'=i_115^post_7, i_187^0'=i_187^post_7, i_28^0'=i_28^post_7, i_98^0'=i_98^post_7, l_143^0'=l_143^post_7, l_203^0'=l_203^post_7, l_27^0'=l_27^post_7, nd_12^0'=nd_12^post_7, r_135^0'=r_135^post_7, r_183^0'=r_183^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_140^0'=x_140^post_7, x_14^0'=x_14^post_7, x_17^0'=x_17^post_7, x_195^0'=x_195^post_7, x_19^0'=x_19^post_7, x_21^0'=x_21^post_7, y_20^0'=y_20^post_7, [ 0<=l_143^0 && rv_13^post_7==rv_13^post_7 && x_14^post_7==x_14^post_7 && h_15^post_7==h_15^post_7 && x_17^post_7==x_17^post_7 && ct_18^post_7==ct_18^post_7 && x_19^post_7==x_19^post_7 && t_24^post_7==x_21^0 && a_239^post_7==a_239^post_7 && 0<=x_14^post_7 && x_14^post_7<=0 && 0<=ct_18^post_7 && ct_18^post_7<=0 && 0<=y_20^0 && y_20^0<=0 && 0<=a_264^0-a_239^post_7 && a_264^0-a_239^post_7<=0 && h_15^post_7<=x_17^post_7 && x_17^post_7<=h_15^post_7 && h_15^post_7<=x_19^post_7 && x_19^post_7<=h_15^post_7 && h_15^post_7<=t_24^post_7 && t_24^post_7<=h_15^post_7 && x_17^post_7<=x_19^post_7 && x_19^post_7<=x_17^post_7 && ct_18^post_7<=y_20^0 && y_20^0<=ct_18^post_7 && a_239^post_7<=a_264^0 && a_264^0<=a_239^post_7 && 1<=rv_13^post_7 && 2<=rv_13^post_7 && l_143^post_7==l_143^post_7 && -1+l_143^post_7<=a_239^post_7 && a_239^post_7<=-1+l_143^post_7 && a_123^0==a_123^post_7 && a_158^0==a_158^post_7 && a_204^0==a_204^post_7 && a_264^0==a_264^post_7 && a_290^0==a_290^post_7 && a_76^0==a_76^post_7 && f_190^0==f_190^post_7 && h_30^0==h_30^post_7 && i_115^0==i_115^post_7 && i_187^0==i_187^post_7 && i_28^0==i_28^post_7 && i_98^0==i_98^post_7 && l_203^0==l_203^post_7 && l_27^0==l_27^post_7 && nd_12^0==nd_12^post_7 && r_135^0==r_135^post_7 && r_183^0==r_183^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_31^0==rv_31^post_7 && st_16^0==st_16^post_7 && st_29^0==st_29^post_7 && t_32^0==t_32^post_7 && tp_33^0==tp_33^post_7 && x_140^0==x_140^post_7 && x_195^0==x_195^post_7 && x_21^0==x_21^post_7 && y_20^0==y_20^post_7 ], cost: 1 8: l7 -> l8 : a_123^0'=a_123^post_9, a_158^0'=a_158^post_9, a_204^0'=a_204^post_9, a_239^0'=a_239^post_9, a_264^0'=a_264^post_9, a_290^0'=a_290^post_9, a_76^0'=a_76^post_9, ct_18^0'=ct_18^post_9, f_190^0'=f_190^post_9, h_15^0'=h_15^post_9, h_30^0'=h_30^post_9, i_115^0'=i_115^post_9, i_187^0'=i_187^post_9, i_28^0'=i_28^post_9, i_98^0'=i_98^post_9, l_143^0'=l_143^post_9, l_203^0'=l_203^post_9, l_27^0'=l_27^post_9, nd_12^0'=nd_12^post_9, r_135^0'=r_135^post_9, r_183^0'=r_183^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_140^0'=x_140^post_9, x_14^0'=x_14^post_9, x_17^0'=x_17^post_9, x_195^0'=x_195^post_9, x_19^0'=x_19^post_9, x_21^0'=x_21^post_9, y_20^0'=y_20^post_9, [ rv_13^post_9==rv_13^post_9 && rv_31^post_9==rv_31^post_9 && r_57^post_9==r_57^post_9 && 1+i_28^0<=l_27^0 && t_32^post_9==tp_33^0 && tp_33^post_9==tp_33^post_9 && h_30^post_9==t_32^post_9 && i_28^1_1==1+i_28^0 && i_28^post_9==i_28^post_9 && 2<=i_28^post_9 && i_28^post_9<=2 && rv_13^post_9<=l_27^0 && l_27^0<=rv_13^post_9 && h_30^post_9<=rv_31^post_9 && rv_31^post_9<=h_30^post_9 && h_30^post_9<=t_32^post_9 && t_32^post_9<=h_30^post_9 && rv_31^post_9<=t_32^post_9 && t_32^post_9<=rv_31^post_9 && 1<=l_27^0 && 2<=l_27^0 && a_76^post_9==a_76^post_9 && a_76^post_9<=i_28^post_9 && i_28^post_9<=a_76^post_9 && a_123^0==a_123^post_9 && a_158^0==a_158^post_9 && a_204^0==a_204^post_9 && a_239^0==a_239^post_9 && a_264^0==a_264^post_9 && a_290^0==a_290^post_9 && ct_18^0==ct_18^post_9 && f_190^0==f_190^post_9 && h_15^0==h_15^post_9 && i_115^0==i_115^post_9 && i_187^0==i_187^post_9 && i_98^0==i_98^post_9 && l_143^0==l_143^post_9 && l_203^0==l_203^post_9 && l_27^0==l_27^post_9 && nd_12^0==nd_12^post_9 && r_135^0==r_135^post_9 && r_183^0==r_183^post_9 && r_37^0==r_37^post_9 && r_92^0==r_92^post_9 && rt_11^0==rt_11^post_9 && st_16^0==st_16^post_9 && st_29^0==st_29^post_9 && t_24^0==t_24^post_9 && x_14^0==x_14^post_9 && x_140^0==x_140^post_9 && x_17^0==x_17^post_9 && x_19^0==x_19^post_9 && x_195^0==x_195^post_9 && x_21^0==x_21^post_9 && y_20^0==y_20^post_9 ], cost: 1 15: l8 -> l9 : a_123^0'=a_123^post_16, a_158^0'=a_158^post_16, a_204^0'=a_204^post_16, a_239^0'=a_239^post_16, a_264^0'=a_264^post_16, a_290^0'=a_290^post_16, a_76^0'=a_76^post_16, ct_18^0'=ct_18^post_16, f_190^0'=f_190^post_16, h_15^0'=h_15^post_16, h_30^0'=h_30^post_16, i_115^0'=i_115^post_16, i_187^0'=i_187^post_16, i_28^0'=i_28^post_16, i_98^0'=i_98^post_16, l_143^0'=l_143^post_16, l_203^0'=l_203^post_16, l_27^0'=l_27^post_16, nd_12^0'=nd_12^post_16, r_135^0'=r_135^post_16, r_183^0'=r_183^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_140^0'=x_140^post_16, x_14^0'=x_14^post_16, x_17^0'=x_17^post_16, x_195^0'=x_195^post_16, x_19^0'=x_19^post_16, x_21^0'=x_21^post_16, y_20^0'=y_20^post_16, [ 0<=i_28^0 && rv_13^post_16==rv_13^post_16 && i_187^post_16==i_187^post_16 && l_27^0<=i_28^0 && st_29^1_2_1==h_30^0 && rt_11^1_2==st_29^1_2_1 && l_27^post_16==l_27^post_16 && i_28^post_16==i_28^post_16 && st_29^post_16==st_29^post_16 && h_30^post_16==h_30^post_16 && rv_31^post_16==rv_31^post_16 && t_32^post_16==t_32^post_16 && tp_33^post_16==tp_33^post_16 && h_15^post_16==rt_11^1_2 && rt_11^post_16==rt_11^post_16 && x_14^post_16==h_15^post_16 && 0<=l_143^0 && l_143^0<=0 && 0<=a_158^0-i_28^post_16 && a_158^0-i_28^post_16<=0 && x_14^post_16<=h_15^post_16 && h_15^post_16<=x_14^post_16 && i_28^post_16<=a_158^0 && a_158^0<=i_28^post_16 && 1<=rv_13^post_16 && 2<=rv_13^post_16 && rv_13^post_16<=i_28^post_16 && rv_13^post_16<=i_187^post_16 && a_123^0==a_123^post_16 && a_158^0==a_158^post_16 && a_204^0==a_204^post_16 && a_239^0==a_239^post_16 && a_264^0==a_264^post_16 && a_290^0==a_290^post_16 && a_76^0==a_76^post_16 && ct_18^0==ct_18^post_16 && f_190^0==f_190^post_16 && i_115^0==i_115^post_16 && i_98^0==i_98^post_16 && l_143^0==l_143^post_16 && l_203^0==l_203^post_16 && nd_12^0==nd_12^post_16 && r_135^0==r_135^post_16 && r_183^0==r_183^post_16 && r_37^0==r_37^post_16 && r_57^0==r_57^post_16 && r_92^0==r_92^post_16 && st_16^0==st_16^post_16 && t_24^0==t_24^post_16 && x_140^0==x_140^post_16 && x_17^0==x_17^post_16 && x_19^0==x_19^post_16 && x_195^0==x_195^post_16 && x_21^0==x_21^post_16 && y_20^0==y_20^post_16 ], cost: 1 16: l8 -> l13 : a_123^0'=a_123^post_17, a_158^0'=a_158^post_17, a_204^0'=a_204^post_17, a_239^0'=a_239^post_17, a_264^0'=a_264^post_17, a_290^0'=a_290^post_17, a_76^0'=a_76^post_17, ct_18^0'=ct_18^post_17, f_190^0'=f_190^post_17, h_15^0'=h_15^post_17, h_30^0'=h_30^post_17, i_115^0'=i_115^post_17, i_187^0'=i_187^post_17, i_28^0'=i_28^post_17, i_98^0'=i_98^post_17, l_143^0'=l_143^post_17, l_203^0'=l_203^post_17, l_27^0'=l_27^post_17, nd_12^0'=nd_12^post_17, r_135^0'=r_135^post_17, r_183^0'=r_183^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_140^0'=x_140^post_17, x_14^0'=x_14^post_17, x_17^0'=x_17^post_17, x_195^0'=x_195^post_17, x_19^0'=x_19^post_17, x_21^0'=x_21^post_17, y_20^0'=y_20^post_17, [ 0<=i_28^0 && r_92^post_17==r_92^post_17 && i_98^post_17==i_98^post_17 && 1+i_28^0<=l_27^0 && t_32^post_17==tp_33^0 && tp_33^post_17==tp_33^post_17 && h_30^post_17==t_32^post_17 && i_28^post_17==1+i_28^0 && i_28^post_17<=1+i_98^post_17 && 1+i_98^post_17<=i_28^post_17 && i_98^post_17<=-1+i_28^post_17 && -1+i_28^post_17<=i_98^post_17 && 1+i_98^post_17<=l_27^0 && a_123^0==a_123^post_17 && a_158^0==a_158^post_17 && a_204^0==a_204^post_17 && a_239^0==a_239^post_17 && a_264^0==a_264^post_17 && a_290^0==a_290^post_17 && a_76^0==a_76^post_17 && ct_18^0==ct_18^post_17 && f_190^0==f_190^post_17 && h_15^0==h_15^post_17 && i_115^0==i_115^post_17 && i_187^0==i_187^post_17 && l_143^0==l_143^post_17 && l_203^0==l_203^post_17 && l_27^0==l_27^post_17 && nd_12^0==nd_12^post_17 && r_135^0==r_135^post_17 && r_183^0==r_183^post_17 && r_37^0==r_37^post_17 && r_57^0==r_57^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 && x_14^0==x_14^post_17 && x_140^0==x_140^post_17 && x_17^0==x_17^post_17 && x_19^0==x_19^post_17 && x_195^0==x_195^post_17 && x_21^0==x_21^post_17 && y_20^0==y_20^post_17 ], cost: 1 9: l9 -> l6 : a_123^0'=a_123^post_10, a_158^0'=a_158^post_10, a_204^0'=a_204^post_10, a_239^0'=a_239^post_10, a_264^0'=a_264^post_10, a_290^0'=a_290^post_10, a_76^0'=a_76^post_10, ct_18^0'=ct_18^post_10, f_190^0'=f_190^post_10, h_15^0'=h_15^post_10, h_30^0'=h_30^post_10, i_115^0'=i_115^post_10, i_187^0'=i_187^post_10, i_28^0'=i_28^post_10, i_98^0'=i_98^post_10, l_143^0'=l_143^post_10, l_203^0'=l_203^post_10, l_27^0'=l_27^post_10, nd_12^0'=nd_12^post_10, r_135^0'=r_135^post_10, r_183^0'=r_183^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_140^0'=x_140^post_10, x_14^0'=x_14^post_10, x_17^0'=x_17^post_10, x_195^0'=x_195^post_10, x_19^0'=x_19^post_10, x_21^0'=x_21^post_10, y_20^0'=y_20^post_10, [ 0<=a_158^0 && 0<=l_143^0 && rv_13^post_10==rv_13^post_10 && 0<=x_14^0 && x_14^0<=0 && x_17^post_10==h_15^0 && ct_18^post_10==0 && x_19^post_10==x_17^post_10 && y_20^post_10==ct_18^post_10 && x_21^post_10==x_19^post_10 && 0<=x_14^0 && x_14^0<=0 && 0<=ct_18^post_10 && ct_18^post_10<=0 && 0<=y_20^post_10 && y_20^post_10<=0 && h_15^0<=x_17^post_10 && x_17^post_10<=h_15^0 && h_15^0<=x_19^post_10 && x_19^post_10<=h_15^0 && h_15^0<=x_21^post_10 && x_21^post_10<=h_15^0 && x_17^post_10<=x_19^post_10 && x_19^post_10<=x_17^post_10 && ct_18^post_10<=y_20^post_10 && y_20^post_10<=ct_18^post_10 && x_19^post_10<=x_21^post_10 && x_21^post_10<=x_19^post_10 && 1<=rv_13^post_10 && 2<=rv_13^post_10 && a_123^0==a_123^post_10 && a_158^0==a_158^post_10 && a_204^0==a_204^post_10 && a_239^0==a_239^post_10 && a_264^0==a_264^post_10 && a_290^0==a_290^post_10 && a_76^0==a_76^post_10 && f_190^0==f_190^post_10 && h_15^0==h_15^post_10 && h_30^0==h_30^post_10 && i_115^0==i_115^post_10 && i_187^0==i_187^post_10 && i_28^0==i_28^post_10 && i_98^0==i_98^post_10 && l_143^0==l_143^post_10 && l_203^0==l_203^post_10 && l_27^0==l_27^post_10 && nd_12^0==nd_12^post_10 && r_135^0==r_135^post_10 && r_183^0==r_183^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_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_14^0==x_14^post_10 && x_140^0==x_140^post_10 && x_195^0==x_195^post_10 ], cost: 1 10: l9 -> l10 : a_123^0'=a_123^post_11, a_158^0'=a_158^post_11, a_204^0'=a_204^post_11, a_239^0'=a_239^post_11, a_264^0'=a_264^post_11, a_290^0'=a_290^post_11, a_76^0'=a_76^post_11, ct_18^0'=ct_18^post_11, f_190^0'=f_190^post_11, h_15^0'=h_15^post_11, h_30^0'=h_30^post_11, i_115^0'=i_115^post_11, i_187^0'=i_187^post_11, i_28^0'=i_28^post_11, i_98^0'=i_98^post_11, l_143^0'=l_143^post_11, l_203^0'=l_203^post_11, l_27^0'=l_27^post_11, nd_12^0'=nd_12^post_11, r_135^0'=r_135^post_11, r_183^0'=r_183^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_140^0'=x_140^post_11, x_14^0'=x_14^post_11, x_17^0'=x_17^post_11, x_195^0'=x_195^post_11, x_19^0'=x_19^post_11, x_21^0'=x_21^post_11, y_20^0'=y_20^post_11, [ 0<=a_158^0 && 0<=l_143^0 && rv_13^post_11==rv_13^post_11 && h_15^post_11==h_15^post_11 && r_37^post_11==r_37^post_11 && f_190^post_11==f_190^post_11 && x_195^post_11==x_195^post_11 && l_203^post_11==l_203^post_11 && a_204^post_11==a_204^post_11 && 1<=-l_143^0+l_203^post_11 && -l_143^0+l_203^post_11<=1 && x_14^0<=f_190^post_11 && f_190^post_11<=x_14^0 && a_204^post_11<=-1+a_158^0 && -1+a_158^0<=a_204^post_11 && 1<=rv_13^post_11 && 2<=rv_13^post_11 && a_158^post_11==a_158^post_11 && a_158^post_11<=a_204^post_11 && a_204^post_11<=a_158^post_11 && l_143^post_11==l_143^post_11 && l_143^post_11<=l_203^post_11 && l_203^post_11<=l_143^post_11 && a_123^0==a_123^post_11 && a_239^0==a_239^post_11 && a_264^0==a_264^post_11 && a_290^0==a_290^post_11 && a_76^0==a_76^post_11 && ct_18^0==ct_18^post_11 && h_30^0==h_30^post_11 && i_115^0==i_115^post_11 && i_187^0==i_187^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_183^0==r_183^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_14^0==x_14^post_11 && x_140^0==x_140^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 ], cost: 1 11: l10 -> l9 : a_123^0'=a_123^post_12, a_158^0'=a_158^post_12, a_204^0'=a_204^post_12, a_239^0'=a_239^post_12, a_264^0'=a_264^post_12, a_290^0'=a_290^post_12, a_76^0'=a_76^post_12, ct_18^0'=ct_18^post_12, f_190^0'=f_190^post_12, h_15^0'=h_15^post_12, h_30^0'=h_30^post_12, i_115^0'=i_115^post_12, i_187^0'=i_187^post_12, i_28^0'=i_28^post_12, i_98^0'=i_98^post_12, l_143^0'=l_143^post_12, l_203^0'=l_203^post_12, l_27^0'=l_27^post_12, nd_12^0'=nd_12^post_12, r_135^0'=r_135^post_12, r_183^0'=r_183^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_140^0'=x_140^post_12, x_14^0'=x_14^post_12, x_17^0'=x_17^post_12, x_195^0'=x_195^post_12, x_19^0'=x_19^post_12, x_21^0'=x_21^post_12, y_20^0'=y_20^post_12, [ a_123^0==a_123^post_12 && a_158^0==a_158^post_12 && a_204^0==a_204^post_12 && a_239^0==a_239^post_12 && a_264^0==a_264^post_12 && a_290^0==a_290^post_12 && a_76^0==a_76^post_12 && ct_18^0==ct_18^post_12 && f_190^0==f_190^post_12 && h_15^0==h_15^post_12 && h_30^0==h_30^post_12 && i_115^0==i_115^post_12 && i_187^0==i_187^post_12 && i_28^0==i_28^post_12 && i_98^0==i_98^post_12 && l_143^0==l_143^post_12 && l_203^0==l_203^post_12 && l_27^0==l_27^post_12 && nd_12^0==nd_12^post_12 && r_135^0==r_135^post_12 && r_183^0==r_183^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_14^0==x_14^post_12 && x_140^0==x_140^post_12 && x_17^0==x_17^post_12 && x_19^0==x_19^post_12 && x_195^0==x_195^post_12 && x_21^0==x_21^post_12 && y_20^0==y_20^post_12 ], cost: 1 17: l13 -> l8 : a_123^0'=a_123^post_18, a_158^0'=a_158^post_18, a_204^0'=a_204^post_18, a_239^0'=a_239^post_18, a_264^0'=a_264^post_18, a_290^0'=a_290^post_18, a_76^0'=a_76^post_18, ct_18^0'=ct_18^post_18, f_190^0'=f_190^post_18, h_15^0'=h_15^post_18, h_30^0'=h_30^post_18, i_115^0'=i_115^post_18, i_187^0'=i_187^post_18, i_28^0'=i_28^post_18, i_98^0'=i_98^post_18, l_143^0'=l_143^post_18, l_203^0'=l_203^post_18, l_27^0'=l_27^post_18, nd_12^0'=nd_12^post_18, r_135^0'=r_135^post_18, r_183^0'=r_183^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_140^0'=x_140^post_18, x_14^0'=x_14^post_18, x_17^0'=x_17^post_18, x_195^0'=x_195^post_18, x_19^0'=x_19^post_18, x_21^0'=x_21^post_18, y_20^0'=y_20^post_18, [ a_123^0==a_123^post_18 && a_158^0==a_158^post_18 && a_204^0==a_204^post_18 && a_239^0==a_239^post_18 && a_264^0==a_264^post_18 && a_290^0==a_290^post_18 && a_76^0==a_76^post_18 && ct_18^0==ct_18^post_18 && f_190^0==f_190^post_18 && h_15^0==h_15^post_18 && h_30^0==h_30^post_18 && i_115^0==i_115^post_18 && i_187^0==i_187^post_18 && i_28^0==i_28^post_18 && i_98^0==i_98^post_18 && l_143^0==l_143^post_18 && l_203^0==l_203^post_18 && l_27^0==l_27^post_18 && nd_12^0==nd_12^post_18 && r_135^0==r_135^post_18 && r_183^0==r_183^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_14^0==x_14^post_18 && x_140^0==x_140^post_18 && x_17^0==x_17^post_18 && x_19^0==x_19^post_18 && x_195^0==x_195^post_18 && x_21^0==x_21^post_18 && y_20^0==y_20^post_18 ], cost: 1 20: l14 -> l0 : a_123^0'=a_123^post_21, a_158^0'=a_158^post_21, a_204^0'=a_204^post_21, a_239^0'=a_239^post_21, a_264^0'=a_264^post_21, a_290^0'=a_290^post_21, a_76^0'=a_76^post_21, ct_18^0'=ct_18^post_21, f_190^0'=f_190^post_21, h_15^0'=h_15^post_21, h_30^0'=h_30^post_21, i_115^0'=i_115^post_21, i_187^0'=i_187^post_21, i_28^0'=i_28^post_21, i_98^0'=i_98^post_21, l_143^0'=l_143^post_21, l_203^0'=l_203^post_21, l_27^0'=l_27^post_21, nd_12^0'=nd_12^post_21, r_135^0'=r_135^post_21, r_183^0'=r_183^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_140^0'=x_140^post_21, x_14^0'=x_14^post_21, x_17^0'=x_17^post_21, x_195^0'=x_195^post_21, x_19^0'=x_19^post_21, x_21^0'=x_21^post_21, y_20^0'=y_20^post_21, [ a_123^0==a_123^post_21 && a_158^0==a_158^post_21 && a_204^0==a_204^post_21 && a_239^0==a_239^post_21 && a_264^0==a_264^post_21 && a_290^0==a_290^post_21 && a_76^0==a_76^post_21 && ct_18^0==ct_18^post_21 && f_190^0==f_190^post_21 && h_15^0==h_15^post_21 && h_30^0==h_30^post_21 && i_115^0==i_115^post_21 && i_187^0==i_187^post_21 && i_28^0==i_28^post_21 && i_98^0==i_98^post_21 && l_143^0==l_143^post_21 && l_203^0==l_203^post_21 && l_27^0==l_27^post_21 && nd_12^0==nd_12^post_21 && r_135^0==r_135^post_21 && r_183^0==r_183^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_14^0==x_14^post_21 && x_140^0==x_140^post_21 && x_17^0==x_17^post_21 && x_19^0==x_19^post_21 && x_195^0==x_195^post_21 && x_21^0==x_21^post_21 && y_20^0==y_20^post_21 ], cost: 1 Simplified all rules, resulting in: Start location: l14 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 19: l1 -> l7 : 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_20, [ 1+i_28^0<=l_27^0 && -i_28^0==0 ], cost: 1 2: l2 -> l4 : a_264^0'=-1+a_264^0, a_290^0'=-1+a_264^0, ct_18^0'=0, h_15^0'=x_19^post_3, r_37^0'=r_37^post_3, rv_13^0'=rv_13^post_3, t_24^0'=x_21^0, x_14^0'=0, x_17^0'=x_19^post_3, x_19^0'=x_19^post_3, [ 0<=a_264^0 && -y_20^0==0 && 2<=rv_13^post_3 ], cost: 1 3: l4 -> l2 : [], cost: 1 6: l6 -> l2 : a_239^0'=a_264^0, ct_18^0'=0, h_15^0'=x_21^0, l_143^0'=1+a_264^0, rv_13^0'=rv_13^post_7, t_24^0'=x_21^0, x_14^0'=0, x_17^0'=x_21^0, x_19^0'=x_21^0, [ 0<=l_143^0 && -y_20^0==0 && 2<=rv_13^post_7 ], cost: 1 8: l7 -> l8 : a_76^0'=2, h_30^0'=tp_33^0, i_28^0'=2, r_57^0'=r_57^post_9, rv_13^0'=l_27^0, rv_31^0'=tp_33^0, t_32^0'=tp_33^0, tp_33^0'=tp_33^post_9, [ 1+i_28^0<=l_27^0 && 2<=l_27^0 ], cost: 1 15: l8 -> l9 : h_15^0'=h_30^0, h_30^0'=h_30^post_16, i_187^0'=i_187^post_16, i_28^0'=a_158^0, l_27^0'=l_27^post_16, rt_11^0'=rt_11^post_16, rv_13^0'=rv_13^post_16, rv_31^0'=rv_31^post_16, st_29^0'=st_29^post_16, t_32^0'=t_32^post_16, tp_33^0'=tp_33^post_16, x_14^0'=h_30^0, [ 0<=i_28^0 && l_27^0<=i_28^0 && -l_143^0==0 && 2<=rv_13^post_16 && rv_13^post_16<=a_158^0 && rv_13^post_16<=i_187^post_16 ], cost: 1 16: l8 -> l13 : 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_17, t_32^0'=tp_33^0, tp_33^0'=tp_33^post_17, [ 0<=i_28^0 && 1+i_28^0<=l_27^0 ], cost: 1 9: l9 -> l6 : ct_18^0'=0, rv_13^0'=rv_13^post_10, x_17^0'=h_15^0, x_19^0'=h_15^0, x_21^0'=h_15^0, y_20^0'=0, [ 0<=a_158^0 && 0<=l_143^0 && -x_14^0==0 && 2<=rv_13^post_10 ], cost: 1 10: l9 -> l10 : a_158^0'=-1+a_158^0, a_204^0'=-1+a_158^0, f_190^0'=x_14^0, h_15^0'=h_15^post_11, l_143^0'=1+l_143^0, l_203^0'=1+l_143^0, r_37^0'=r_37^post_11, rv_13^0'=rv_13^post_11, x_195^0'=x_195^post_11, [ 0<=a_158^0 && 0<=l_143^0 && 2<=rv_13^post_11 ], cost: 1 11: l10 -> l9 : [], cost: 1 17: l13 -> l8 : [], cost: 1 20: l14 -> l0 : [], cost: 1 ### Simplification by acceleration and chaining ### Eliminated locations (on linear paths): Start location: l14 27: l2 -> l2 : a_264^0'=-1+a_264^0, a_290^0'=-1+a_264^0, ct_18^0'=0, h_15^0'=x_19^post_3, r_37^0'=r_37^post_3, rv_13^0'=rv_13^post_3, t_24^0'=x_21^0, x_14^0'=0, x_17^0'=x_19^post_3, x_19^0'=x_19^post_3, [ 0<=a_264^0 && -y_20^0==0 && 2<=rv_13^post_3 ], cost: 2 15: l8 -> l9 : h_15^0'=h_30^0, h_30^0'=h_30^post_16, i_187^0'=i_187^post_16, i_28^0'=a_158^0, l_27^0'=l_27^post_16, rt_11^0'=rt_11^post_16, rv_13^0'=rv_13^post_16, rv_31^0'=rv_31^post_16, st_29^0'=st_29^post_16, t_32^0'=t_32^post_16, tp_33^0'=tp_33^post_16, x_14^0'=h_30^0, [ 0<=i_28^0 && l_27^0<=i_28^0 && -l_143^0==0 && 2<=rv_13^post_16 && rv_13^post_16<=a_158^0 && rv_13^post_16<=i_187^post_16 ], cost: 1 24: l8 -> l8 : 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_17, t_32^0'=tp_33^0, tp_33^0'=tp_33^post_17, [ 0<=i_28^0 && 1+i_28^0<=l_27^0 ], cost: 2 25: l9 -> l2 : a_239^0'=a_264^0, ct_18^0'=0, h_15^0'=h_15^0, l_143^0'=1+a_264^0, rv_13^0'=rv_13^post_7, t_24^0'=h_15^0, x_14^0'=0, x_17^0'=h_15^0, x_19^0'=h_15^0, x_21^0'=h_15^0, y_20^0'=0, [ 0<=a_158^0 && 0<=l_143^0 && -x_14^0==0 && 2<=rv_13^post_10 && 2<=rv_13^post_7 ], cost: 2 26: l9 -> l9 : a_158^0'=-1+a_158^0, a_204^0'=-1+a_158^0, f_190^0'=x_14^0, h_15^0'=h_15^post_11, l_143^0'=1+l_143^0, l_203^0'=1+l_143^0, r_37^0'=r_37^post_11, rv_13^0'=rv_13^post_11, x_195^0'=x_195^post_11, [ 0<=a_158^0 && 0<=l_143^0 && 2<=rv_13^post_11 ], cost: 2 23: l14 -> l8 : a_76^0'=2, h_30^0'=tp_33^post_20, i_28^0'=2, l_27^0'=nd_12^1_1, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_9, rv_13^0'=nd_12^1_1, rv_31^0'=tp_33^post_20, t_32^0'=tp_33^post_20, tp_33^0'=tp_33^post_9, [ 2<=nd_12^1_1 ], cost: 4 Accelerating simple loops of location 2. Accelerating the following rules: 27: l2 -> l2 : a_264^0'=-1+a_264^0, a_290^0'=-1+a_264^0, ct_18^0'=0, h_15^0'=x_19^post_3, r_37^0'=r_37^post_3, rv_13^0'=rv_13^post_3, t_24^0'=x_21^0, x_14^0'=0, x_17^0'=x_19^post_3, x_19^0'=x_19^post_3, [ 0<=a_264^0 && -y_20^0==0 && 2<=rv_13^post_3 ], cost: 2 Accelerated rule 27 with backward acceleration, yielding the new rule 28. [accelerate] Nesting with 1 inner and 1 outer candidates Removing the simple loops: 27. Accelerating simple loops of location 8. Accelerating the following rules: 24: l8 -> l8 : 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_17, t_32^0'=tp_33^0, tp_33^0'=tp_33^post_17, [ 0<=i_28^0 && 1+i_28^0<=l_27^0 ], cost: 2 Accelerated rule 24 with backward acceleration, yielding the new rule 29. [accelerate] Nesting with 1 inner and 1 outer candidates Removing the simple loops: 24. Accelerating simple loops of location 9. Accelerating the following rules: 26: l9 -> l9 : a_158^0'=-1+a_158^0, a_204^0'=-1+a_158^0, f_190^0'=x_14^0, h_15^0'=h_15^post_11, l_143^0'=1+l_143^0, l_203^0'=1+l_143^0, r_37^0'=r_37^post_11, rv_13^0'=rv_13^post_11, x_195^0'=x_195^post_11, [ 0<=a_158^0 && 0<=l_143^0 && 2<=rv_13^post_11 ], cost: 2 Accelerated rule 26 with backward acceleration, yielding the new rule 30. [accelerate] Nesting with 1 inner and 1 outer candidates Removing the simple loops: 26. Accelerated all simple loops using metering functions (where possible): Start location: l14 28: l2 -> l2 : a_264^0'=-1, a_290^0'=-1, ct_18^0'=0, h_15^0'=x_19^post_3, r_37^0'=r_37^post_3, rv_13^0'=rv_13^post_3, t_24^0'=x_21^0, x_14^0'=0, x_17^0'=x_19^post_3, x_19^0'=x_19^post_3, [ -y_20^0==0 && 2<=rv_13^post_3 && 1+a_264^0>=1 ], cost: 2+2*a_264^0 15: l8 -> l9 : h_15^0'=h_30^0, h_30^0'=h_30^post_16, i_187^0'=i_187^post_16, i_28^0'=a_158^0, l_27^0'=l_27^post_16, rt_11^0'=rt_11^post_16, rv_13^0'=rv_13^post_16, rv_31^0'=rv_31^post_16, st_29^0'=st_29^post_16, t_32^0'=t_32^post_16, tp_33^0'=tp_33^post_16, x_14^0'=h_30^0, [ 0<=i_28^0 && l_27^0<=i_28^0 && -l_143^0==0 && 2<=rv_13^post_16 && rv_13^post_16<=a_158^0 && rv_13^post_16<=i_187^post_16 ], cost: 1 29: l8 -> l8 : h_30^0'=tp_33^post_17, i_28^0'=l_27^0, i_98^0'=-1+l_27^0, r_92^0'=r_92^post_17, t_32^0'=tp_33^post_17, tp_33^0'=tp_33^post_17, [ 0<=i_28^0 && l_27^0-i_28^0>=1 ], cost: 2*l_27^0-2*i_28^0 25: l9 -> l2 : a_239^0'=a_264^0, ct_18^0'=0, h_15^0'=h_15^0, l_143^0'=1+a_264^0, rv_13^0'=rv_13^post_7, t_24^0'=h_15^0, x_14^0'=0, x_17^0'=h_15^0, x_19^0'=h_15^0, x_21^0'=h_15^0, y_20^0'=0, [ 0<=a_158^0 && 0<=l_143^0 && -x_14^0==0 && 2<=rv_13^post_10 && 2<=rv_13^post_7 ], cost: 2 30: l9 -> l9 : a_158^0'=-1, a_204^0'=-1, f_190^0'=x_14^0, h_15^0'=h_15^post_11, l_143^0'=1+a_158^0+l_143^0, l_203^0'=1+a_158^0+l_143^0, r_37^0'=r_37^post_11, rv_13^0'=rv_13^post_11, x_195^0'=x_195^post_11, [ 0<=l_143^0 && 2<=rv_13^post_11 && 1+a_158^0>=1 ], cost: 2+2*a_158^0 23: l14 -> l8 : a_76^0'=2, h_30^0'=tp_33^post_20, i_28^0'=2, l_27^0'=nd_12^1_1, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_9, rv_13^0'=nd_12^1_1, rv_31^0'=tp_33^post_20, t_32^0'=tp_33^post_20, tp_33^0'=tp_33^post_9, [ 2<=nd_12^1_1 ], cost: 4 Chained accelerated rules (with incoming rules): Start location: l14 15: l8 -> l9 : h_15^0'=h_30^0, h_30^0'=h_30^post_16, i_187^0'=i_187^post_16, i_28^0'=a_158^0, l_27^0'=l_27^post_16, rt_11^0'=rt_11^post_16, rv_13^0'=rv_13^post_16, rv_31^0'=rv_31^post_16, st_29^0'=st_29^post_16, t_32^0'=t_32^post_16, tp_33^0'=tp_33^post_16, x_14^0'=h_30^0, [ 0<=i_28^0 && l_27^0<=i_28^0 && -l_143^0==0 && 2<=rv_13^post_16 && rv_13^post_16<=a_158^0 && rv_13^post_16<=i_187^post_16 ], cost: 1 33: l8 -> l9 : a_158^0'=-1, a_204^0'=-1, f_190^0'=h_30^0, h_15^0'=h_15^post_11, h_30^0'=h_30^post_16, i_187^0'=i_187^post_16, i_28^0'=a_158^0, l_143^0'=1+a_158^0+l_143^0, l_203^0'=1+a_158^0+l_143^0, l_27^0'=l_27^post_16, r_37^0'=r_37^post_11, rt_11^0'=rt_11^post_16, rv_13^0'=rv_13^post_11, rv_31^0'=rv_31^post_16, st_29^0'=st_29^post_16, t_32^0'=t_32^post_16, tp_33^0'=tp_33^post_16, x_14^0'=h_30^0, x_195^0'=x_195^post_11, [ 0<=i_28^0 && l_27^0<=i_28^0 && -l_143^0==0 && 2<=rv_13^post_11 && 2<=a_158^0 && 2<=i_187^post_16 ], cost: 3+2*a_158^0 25: l9 -> l2 : a_239^0'=a_264^0, ct_18^0'=0, h_15^0'=h_15^0, l_143^0'=1+a_264^0, rv_13^0'=rv_13^post_7, t_24^0'=h_15^0, x_14^0'=0, x_17^0'=h_15^0, x_19^0'=h_15^0, x_21^0'=h_15^0, y_20^0'=0, [ 0<=a_158^0 && 0<=l_143^0 && -x_14^0==0 && 2<=rv_13^post_10 && 2<=rv_13^post_7 ], cost: 2 31: l9 -> l2 : a_239^0'=a_264^0, a_264^0'=-1, a_290^0'=-1, ct_18^0'=0, h_15^0'=x_19^post_3, l_143^0'=1+a_264^0, r_37^0'=r_37^post_3, rv_13^0'=rv_13^post_3, t_24^0'=h_15^0, x_14^0'=0, x_17^0'=x_19^post_3, x_19^0'=x_19^post_3, x_21^0'=h_15^0, y_20^0'=0, [ 0<=a_158^0 && 0<=l_143^0 && -x_14^0==0 && 2<=rv_13^post_3 && 1+a_264^0>=1 ], cost: 4+2*a_264^0 23: l14 -> l8 : a_76^0'=2, h_30^0'=tp_33^post_20, i_28^0'=2, l_27^0'=nd_12^1_1, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_9, rv_13^0'=nd_12^1_1, rv_31^0'=tp_33^post_20, t_32^0'=tp_33^post_20, tp_33^0'=tp_33^post_9, [ 2<=nd_12^1_1 ], cost: 4 32: l14 -> l8 : a_76^0'=2, h_30^0'=tp_33^post_17, 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_9, r_92^0'=r_92^post_17, rv_13^0'=nd_12^1_1, rv_31^0'=tp_33^post_20, t_32^0'=tp_33^post_17, tp_33^0'=tp_33^post_17, [ -2+nd_12^1_1>=1 ], cost: 2*nd_12^1_1 Removed unreachable locations (and leaf rules with constant cost): Start location: l14 15: l8 -> l9 : h_15^0'=h_30^0, h_30^0'=h_30^post_16, i_187^0'=i_187^post_16, i_28^0'=a_158^0, l_27^0'=l_27^post_16, rt_11^0'=rt_11^post_16, rv_13^0'=rv_13^post_16, rv_31^0'=rv_31^post_16, st_29^0'=st_29^post_16, t_32^0'=t_32^post_16, tp_33^0'=tp_33^post_16, x_14^0'=h_30^0, [ 0<=i_28^0 && l_27^0<=i_28^0 && -l_143^0==0 && 2<=rv_13^post_16 && rv_13^post_16<=a_158^0 && rv_13^post_16<=i_187^post_16 ], cost: 1 33: l8 -> l9 : a_158^0'=-1, a_204^0'=-1, f_190^0'=h_30^0, h_15^0'=h_15^post_11, h_30^0'=h_30^post_16, i_187^0'=i_187^post_16, i_28^0'=a_158^0, l_143^0'=1+a_158^0+l_143^0, l_203^0'=1+a_158^0+l_143^0, l_27^0'=l_27^post_16, r_37^0'=r_37^post_11, rt_11^0'=rt_11^post_16, rv_13^0'=rv_13^post_11, rv_31^0'=rv_31^post_16, st_29^0'=st_29^post_16, t_32^0'=t_32^post_16, tp_33^0'=tp_33^post_16, x_14^0'=h_30^0, x_195^0'=x_195^post_11, [ 0<=i_28^0 && l_27^0<=i_28^0 && -l_143^0==0 && 2<=rv_13^post_11 && 2<=a_158^0 && 2<=i_187^post_16 ], cost: 3+2*a_158^0 31: l9 -> l2 : a_239^0'=a_264^0, a_264^0'=-1, a_290^0'=-1, ct_18^0'=0, h_15^0'=x_19^post_3, l_143^0'=1+a_264^0, r_37^0'=r_37^post_3, rv_13^0'=rv_13^post_3, t_24^0'=h_15^0, x_14^0'=0, x_17^0'=x_19^post_3, x_19^0'=x_19^post_3, x_21^0'=h_15^0, y_20^0'=0, [ 0<=a_158^0 && 0<=l_143^0 && -x_14^0==0 && 2<=rv_13^post_3 && 1+a_264^0>=1 ], cost: 4+2*a_264^0 23: l14 -> l8 : a_76^0'=2, h_30^0'=tp_33^post_20, i_28^0'=2, l_27^0'=nd_12^1_1, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_9, rv_13^0'=nd_12^1_1, rv_31^0'=tp_33^post_20, t_32^0'=tp_33^post_20, tp_33^0'=tp_33^post_9, [ 2<=nd_12^1_1 ], cost: 4 32: l14 -> l8 : a_76^0'=2, h_30^0'=tp_33^post_17, 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_9, r_92^0'=r_92^post_17, rv_13^0'=nd_12^1_1, rv_31^0'=tp_33^post_20, t_32^0'=tp_33^post_17, tp_33^0'=tp_33^post_17, [ -2+nd_12^1_1>=1 ], cost: 2*nd_12^1_1 Eliminated locations (on tree-shaped paths): Start location: l14 31: l9 -> l2 : a_239^0'=a_264^0, a_264^0'=-1, a_290^0'=-1, ct_18^0'=0, h_15^0'=x_19^post_3, l_143^0'=1+a_264^0, r_37^0'=r_37^post_3, rv_13^0'=rv_13^post_3, t_24^0'=h_15^0, x_14^0'=0, x_17^0'=x_19^post_3, x_19^0'=x_19^post_3, x_21^0'=h_15^0, y_20^0'=0, [ 0<=a_158^0 && 0<=l_143^0 && -x_14^0==0 && 2<=rv_13^post_3 && 1+a_264^0>=1 ], cost: 4+2*a_264^0 34: l14 -> l9 : a_76^0'=2, h_15^0'=tp_33^post_20, h_30^0'=h_30^post_16, i_187^0'=i_187^post_16, i_28^0'=a_158^0, l_27^0'=l_27^post_16, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_9, rt_11^0'=rt_11^post_16, rv_13^0'=rv_13^post_16, rv_31^0'=rv_31^post_16, st_29^0'=st_29^post_16, t_32^0'=t_32^post_16, tp_33^0'=tp_33^post_16, x_14^0'=tp_33^post_20, [ 2<=nd_12^1_1 && nd_12^1_1<=2 && -l_143^0==0 && 2<=rv_13^post_16 && rv_13^post_16<=a_158^0 && rv_13^post_16<=i_187^post_16 ], cost: 5 35: l14 -> l9 : a_158^0'=-1, a_204^0'=-1, a_76^0'=2, f_190^0'=tp_33^post_20, h_15^0'=h_15^post_11, h_30^0'=h_30^post_16, i_187^0'=i_187^post_16, i_28^0'=a_158^0, l_143^0'=1+a_158^0+l_143^0, l_203^0'=1+a_158^0+l_143^0, l_27^0'=l_27^post_16, nd_12^0'=nd_12^post_1, r_37^0'=r_37^post_11, r_57^0'=r_57^post_9, rt_11^0'=rt_11^post_16, rv_13^0'=rv_13^post_11, rv_31^0'=rv_31^post_16, st_29^0'=st_29^post_16, t_32^0'=t_32^post_16, tp_33^0'=tp_33^post_16, x_14^0'=tp_33^post_20, x_195^0'=x_195^post_11, [ 2<=nd_12^1_1 && nd_12^1_1<=2 && -l_143^0==0 && 2<=rv_13^post_11 && 2<=a_158^0 && 2<=i_187^post_16 ], cost: 7+2*a_158^0 36: l14 -> l9 : a_76^0'=2, h_15^0'=tp_33^post_17, h_30^0'=h_30^post_16, i_187^0'=i_187^post_16, i_28^0'=a_158^0, i_98^0'=-1+nd_12^1_1, l_27^0'=l_27^post_16, nd_12^0'=nd_12^post_1, r_57^0'=r_57^post_9, r_92^0'=r_92^post_17, rt_11^0'=rt_11^post_16, rv_13^0'=rv_13^post_16, rv_31^0'=rv_31^post_16, st_29^0'=st_29^post_16, t_32^0'=t_32^post_16, tp_33^0'=tp_33^post_16, x_14^0'=tp_33^post_17, [ -2+nd_12^1_1>=1 && -l_143^0==0 && 2<=rv_13^post_16 && rv_13^post_16<=a_158^0 && rv_13^post_16<=i_187^post_16 ], cost: 1+2*nd_12^1_1 37: l14 -> l9 : a_158^0'=-1, a_204^0'=-1, a_76^0'=2, f_190^0'=tp_33^post_17, h_15^0'=h_15^post_11, h_30^0'=h_30^post_16, i_187^0'=i_187^post_16, i_28^0'=a_158^0, i_98^0'=-1+nd_12^1_1, l_143^0'=1+a_158^0+l_143^0, l_203^0'=1+a_158^0+l_143^0, l_27^0'=l_27^post_16, nd_12^0'=nd_12^post_1, r_37^0'=r_37^post_11, r_57^0'=r_57^post_9, r_92^0'=r_92^post_17, rt_11^0'=rt_11^post_16, rv_13^0'=rv_13^post_11, rv_31^0'=rv_31^post_16, st_29^0'=st_29^post_16, t_32^0'=t_32^post_16, tp_33^0'=tp_33^post_16, x_14^0'=tp_33^post_17, x_195^0'=x_195^post_11, [ -2+nd_12^1_1>=1 && -l_143^0==0 && 2<=rv_13^post_11 && 2<=a_158^0 && 2<=i_187^post_16 ], cost: 3+2*a_158^0+2*nd_12^1_1 Eliminated locations (on tree-shaped paths): Start location: l14 38: l14 -> l2 : a_239^0'=a_264^0, a_264^0'=-1, a_290^0'=-1, a_76^0'=2, ct_18^0'=0, h_15^0'=x_19^post_3, h_30^0'=h_30^post_16, i_187^0'=i_187^post_16, i_28^0'=a_158^0, l_143^0'=1+a_264^0, l_27^0'=l_27^post_16, nd_12^0'=nd_12^post_1, r_37^0'=r_37^post_3, r_57^0'=r_57^post_9, rt_11^0'=rt_11^post_16, rv_13^0'=rv_13^post_3, rv_31^0'=rv_31^post_16, st_29^0'=st_29^post_16, t_24^0'=tp_33^post_20, t_32^0'=t_32^post_16, tp_33^0'=tp_33^post_16, x_14^0'=0, x_17^0'=x_19^post_3, x_19^0'=x_19^post_3, x_21^0'=tp_33^post_20, y_20^0'=0, [ 2<=nd_12^1_1 && nd_12^1_1<=2 && -l_143^0==0 && 2<=rv_13^post_16 && rv_13^post_16<=a_158^0 && rv_13^post_16<=i_187^post_16 && 0<=a_158^0 && -tp_33^post_20==0 && 2<=rv_13^post_3 && 1+a_264^0>=1 ], cost: 9+2*a_264^0 39: l14 -> l2 : a_239^0'=a_264^0, a_264^0'=-1, a_290^0'=-1, a_76^0'=2, ct_18^0'=0, h_15^0'=x_19^post_3, h_30^0'=h_30^post_16, i_187^0'=i_187^post_16, i_28^0'=a_158^0, i_98^0'=-1+nd_12^1_1, l_143^0'=1+a_264^0, l_27^0'=l_27^post_16, nd_12^0'=nd_12^post_1, r_37^0'=r_37^post_3, r_57^0'=r_57^post_9, r_92^0'=r_92^post_17, rt_11^0'=rt_11^post_16, rv_13^0'=rv_13^post_3, rv_31^0'=rv_31^post_16, st_29^0'=st_29^post_16, t_24^0'=tp_33^post_17, t_32^0'=t_32^post_16, tp_33^0'=tp_33^post_16, x_14^0'=0, x_17^0'=x_19^post_3, x_19^0'=x_19^post_3, x_21^0'=tp_33^post_17, y_20^0'=0, [ -2+nd_12^1_1>=1 && -l_143^0==0 && 2<=rv_13^post_16 && rv_13^post_16<=a_158^0 && rv_13^post_16<=i_187^post_16 && 0<=a_158^0 && -tp_33^post_17==0 && 2<=rv_13^post_3 && 1+a_264^0>=1 ], cost: 5+2*a_264^0+2*nd_12^1_1 40: l14 -> [18] : [ 2<=nd_12^1_1 && nd_12^1_1<=2 && -l_143^0==0 && 2<=rv_13^post_11 && 2<=a_158^0 && 2<=i_187^post_16 ], cost: 7+2*a_158^0 41: l14 -> [18] : [ -2+nd_12^1_1>=1 && -l_143^0==0 && 2<=rv_13^post_11 && 2<=a_158^0 && 2<=i_187^post_16 ], cost: 3+2*a_158^0+2*nd_12^1_1 ### Computing asymptotic complexity ### Fully simplified ITS problem Start location: l14 38: l14 -> l2 : a_239^0'=a_264^0, a_264^0'=-1, a_290^0'=-1, a_76^0'=2, ct_18^0'=0, h_15^0'=x_19^post_3, h_30^0'=h_30^post_16, i_187^0'=i_187^post_16, i_28^0'=a_158^0, l_143^0'=1+a_264^0, l_27^0'=l_27^post_16, nd_12^0'=nd_12^post_1, r_37^0'=r_37^post_3, r_57^0'=r_57^post_9, rt_11^0'=rt_11^post_16, rv_13^0'=rv_13^post_3, rv_31^0'=rv_31^post_16, st_29^0'=st_29^post_16, t_24^0'=tp_33^post_20, t_32^0'=t_32^post_16, tp_33^0'=tp_33^post_16, x_14^0'=0, x_17^0'=x_19^post_3, x_19^0'=x_19^post_3, x_21^0'=tp_33^post_20, y_20^0'=0, [ 2<=nd_12^1_1 && nd_12^1_1<=2 && -l_143^0==0 && 2<=rv_13^post_16 && rv_13^post_16<=a_158^0 && rv_13^post_16<=i_187^post_16 && 0<=a_158^0 && -tp_33^post_20==0 && 2<=rv_13^post_3 && 1+a_264^0>=1 ], cost: 9+2*a_264^0 39: l14 -> l2 : a_239^0'=a_264^0, a_264^0'=-1, a_290^0'=-1, a_76^0'=2, ct_18^0'=0, h_15^0'=x_19^post_3, h_30^0'=h_30^post_16, i_187^0'=i_187^post_16, i_28^0'=a_158^0, i_98^0'=-1+nd_12^1_1, l_143^0'=1+a_264^0, l_27^0'=l_27^post_16, nd_12^0'=nd_12^post_1, r_37^0'=r_37^post_3, r_57^0'=r_57^post_9, r_92^0'=r_92^post_17, rt_11^0'=rt_11^post_16, rv_13^0'=rv_13^post_3, rv_31^0'=rv_31^post_16, st_29^0'=st_29^post_16, t_24^0'=tp_33^post_17, t_32^0'=t_32^post_16, tp_33^0'=tp_33^post_16, x_14^0'=0, x_17^0'=x_19^post_3, x_19^0'=x_19^post_3, x_21^0'=tp_33^post_17, y_20^0'=0, [ -2+nd_12^1_1>=1 && -l_143^0==0 && 2<=rv_13^post_16 && rv_13^post_16<=a_158^0 && rv_13^post_16<=i_187^post_16 && 0<=a_158^0 && -tp_33^post_17==0 && 2<=rv_13^post_3 && 1+a_264^0>=1 ], cost: 5+2*a_264^0+2*nd_12^1_1 40: l14 -> [18] : [ 2<=nd_12^1_1 && nd_12^1_1<=2 && -l_143^0==0 && 2<=rv_13^post_11 && 2<=a_158^0 && 2<=i_187^post_16 ], cost: 7+2*a_158^0 41: l14 -> [18] : [ -2+nd_12^1_1>=1 && -l_143^0==0 && 2<=rv_13^post_11 && 2<=a_158^0 && 2<=i_187^post_16 ], cost: 3+2*a_158^0+2*nd_12^1_1 Computing asymptotic complexity for rule 41 Resulting cost 0 has complexity: Unknown Computing asymptotic complexity for rule 39 Resulting cost 0 has complexity: Unknown Computing asymptotic complexity for rule 40 Resulting cost 0 has complexity: Unknown Computing asymptotic complexity for rule 38 Resulting cost 0 has complexity: Unknown Obtained the following overall complexity (w.r.t. the length of the input n): Complexity: Constant Cpx degree: 0 Solved cost: 1 Rule cost: 1 Rule guard: [ a_123^0==a_123^post_21 && a_158^0==a_158^post_21 && a_204^0==a_204^post_21 && a_239^0==a_239^post_21 && a_264^0==a_264^post_21 && a_290^0==a_290^post_21 && a_76^0==a_76^post_21 && ct_18^0==ct_18^post_21 && f_190^0==f_190^post_21 && h_15^0==h_15^post_21 && h_30^0==h_30^post_21 && i_115^0==i_115^post_21 && i_187^0==i_187^post_21 && i_28^0==i_28^post_21 && i_98^0==i_98^post_21 && l_143^0==l_143^post_21 && l_203^0==l_203^post_21 && l_27^0==l_27^post_21 && nd_12^0==nd_12^post_21 && r_135^0==r_135^post_21 && r_183^0==r_183^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_14^0==x_14^post_21 && x_140^0==x_140^post_21 && x_17^0==x_17^post_21 && x_19^0==x_19^post_21 && x_195^0==x_195^post_21 && x_21^0==x_21^post_21 && y_20^0==y_20^post_21 ] WORST_CASE(Omega(1),?)