WORST_CASE(Omega(1),?)

### Pre-processing the ITS problem ###

Initial linear ITS problem
   Start location: l55
      0: l0 -> l1 : c_16^0'=c_16^post_1, e_21^0'=e_21^post_1, nd_12^0'=nd_12^post_1, o_19^0'=o_19^post_1, o_20^0'=o_20^post_1, rt_11^0'=rt_11^post_1, rv_17^0'=rv_17^post_1, rv_18^0'=rv_18^post_1, st_14^0'=st_14^post_1, x_13^0'=x_13^post_1, y_15^0'=y_15^post_1, [ e_21^post_1==0 && c_16^post_1==0 && nd_12^0==nd_12^post_1 && o_19^0==o_19^post_1 && o_20^0==o_20^post_1 && rt_11^0==rt_11^post_1 && rv_17^0==rv_17^post_1 && rv_18^0==rv_18^post_1 && st_14^0==st_14^post_1 && x_13^0==x_13^post_1 && y_15^0==y_15^post_1 ], cost: 1
     19: l1 -> l3 : c_16^0'=c_16^post_20, e_21^0'=e_21^post_20, nd_12^0'=nd_12^post_20, o_19^0'=o_19^post_20, o_20^0'=o_20^post_20, rt_11^0'=rt_11^post_20, rv_17^0'=rv_17^post_20, rv_18^0'=rv_18^post_20, st_14^0'=st_14^post_20, x_13^0'=x_13^post_20, y_15^0'=y_15^post_20, [ x_13^0<=0 && rt_11^post_20==st_14^0 && c_16^0==c_16^post_20 && e_21^0==e_21^post_20 && nd_12^0==nd_12^post_20 && o_19^0==o_19^post_20 && o_20^0==o_20^post_20 && rv_17^0==rv_17^post_20 && rv_18^0==rv_18^post_20 && st_14^0==st_14^post_20 && x_13^0==x_13^post_20 && y_15^0==y_15^post_20 ], cost: 1
     20: l1 -> l3 : c_16^0'=c_16^post_21, e_21^0'=e_21^post_21, nd_12^0'=nd_12^post_21, o_19^0'=o_19^post_21, o_20^0'=o_20^post_21, rt_11^0'=rt_11^post_21, rv_17^0'=rv_17^post_21, rv_18^0'=rv_18^post_21, st_14^0'=st_14^post_21, x_13^0'=x_13^post_21, y_15^0'=y_15^post_21, [ 1<=x_13^0 && y_15^0<=0 && rt_11^post_21==st_14^0 && c_16^0==c_16^post_21 && e_21^0==e_21^post_21 && nd_12^0==nd_12^post_21 && o_19^0==o_19^post_21 && o_20^0==o_20^post_21 && rv_17^0==rv_17^post_21 && rv_18^0==rv_18^post_21 && st_14^0==st_14^post_21 && x_13^0==x_13^post_21 && y_15^0==y_15^post_21 ], cost: 1
     21: l1 -> l16 : c_16^0'=c_16^post_22, e_21^0'=e_21^post_22, nd_12^0'=nd_12^post_22, o_19^0'=o_19^post_22, o_20^0'=o_20^post_22, rt_11^0'=rt_11^post_22, rv_17^0'=rv_17^post_22, rv_18^0'=rv_18^post_22, st_14^0'=st_14^post_22, x_13^0'=x_13^post_22, y_15^0'=y_15^post_22, [ 1<=x_13^0 && 1<=y_15^0 && 1<=x_13^0+y_15^0 && 0<=c_16^0 && c_16^0<=0 && nd_12^1_1==nd_12^1_1 && rv_17^post_22==nd_12^1_1 && nd_12^post_22==nd_12^post_22 && 0<=rv_17^post_22 && rv_17^post_22<=0 && c_16^0==c_16^post_22 && e_21^0==e_21^post_22 && o_19^0==o_19^post_22 && o_20^0==o_20^post_22 && rt_11^0==rt_11^post_22 && rv_18^0==rv_18^post_22 && st_14^0==st_14^post_22 && x_13^0==x_13^post_22 && y_15^0==y_15^post_22 ], cost: 1
     24: l1 -> l18 : c_16^0'=c_16^post_25, e_21^0'=e_21^post_25, nd_12^0'=nd_12^post_25, o_19^0'=o_19^post_25, o_20^0'=o_20^post_25, rt_11^0'=rt_11^post_25, rv_17^0'=rv_17^post_25, rv_18^0'=rv_18^post_25, st_14^0'=st_14^post_25, x_13^0'=x_13^post_25, y_15^0'=y_15^post_25, [ 1<=x_13^0 && 1<=y_15^0 && 1<=x_13^0+y_15^0 && 0<=c_16^0 && c_16^0<=0 && nd_12^1_2==nd_12^1_2 && rv_17^post_25==nd_12^1_2 && nd_12^post_25==nd_12^post_25 && c_16^0==c_16^post_25 && e_21^0==e_21^post_25 && o_19^0==o_19^post_25 && o_20^0==o_20^post_25 && rt_11^0==rt_11^post_25 && rv_18^0==rv_18^post_25 && st_14^0==st_14^post_25 && x_13^0==x_13^post_25 && y_15^0==y_15^post_25 ], cost: 1
      1: l2 -> l3 : c_16^0'=c_16^post_2, e_21^0'=e_21^post_2, nd_12^0'=nd_12^post_2, o_19^0'=o_19^post_2, o_20^0'=o_20^post_2, rt_11^0'=rt_11^post_2, rv_17^0'=rv_17^post_2, rv_18^0'=rv_18^post_2, st_14^0'=st_14^post_2, x_13^0'=x_13^post_2, y_15^0'=y_15^post_2, [ x_13^0<=0 && rt_11^post_2==st_14^0 && c_16^0==c_16^post_2 && e_21^0==e_21^post_2 && nd_12^0==nd_12^post_2 && o_19^0==o_19^post_2 && o_20^0==o_20^post_2 && rv_17^0==rv_17^post_2 && rv_18^0==rv_18^post_2 && st_14^0==st_14^post_2 && x_13^0==x_13^post_2 && y_15^0==y_15^post_2 ], cost: 1
      2: l2 -> l5 : c_16^0'=c_16^post_3, e_21^0'=e_21^post_3, nd_12^0'=nd_12^post_3, o_19^0'=o_19^post_3, o_20^0'=o_20^post_3, rt_11^0'=rt_11^post_3, rv_17^0'=rv_17^post_3, rv_18^0'=rv_18^post_3, st_14^0'=st_14^post_3, x_13^0'=x_13^post_3, y_15^0'=y_15^post_3, [ 1<=x_13^0 && 1<=y_15^0 && 1<=x_13^0+y_15^0 && c_16^0==c_16^post_3 && e_21^0==e_21^post_3 && nd_12^0==nd_12^post_3 && o_19^0==o_19^post_3 && o_20^0==o_20^post_3 && rt_11^0==rt_11^post_3 && rv_17^0==rv_17^post_3 && rv_18^0==rv_18^post_3 && st_14^0==st_14^post_3 && x_13^0==x_13^post_3 && y_15^0==y_15^post_3 ], cost: 1
      3: l5 -> l4 : c_16^0'=c_16^post_4, e_21^0'=e_21^post_4, nd_12^0'=nd_12^post_4, o_19^0'=o_19^post_4, o_20^0'=o_20^post_4, rt_11^0'=rt_11^post_4, rv_17^0'=rv_17^post_4, rv_18^0'=rv_18^post_4, st_14^0'=st_14^post_4, x_13^0'=x_13^post_4, y_15^0'=y_15^post_4, [ 1<=c_16^0 && c_16^0==c_16^post_4 && e_21^0==e_21^post_4 && nd_12^0==nd_12^post_4 && o_19^0==o_19^post_4 && o_20^0==o_20^post_4 && rt_11^0==rt_11^post_4 && rv_17^0==rv_17^post_4 && rv_18^0==rv_18^post_4 && st_14^0==st_14^post_4 && x_13^0==x_13^post_4 && y_15^0==y_15^post_4 ], cost: 1
      4: l5 -> l4 : c_16^0'=c_16^post_5, e_21^0'=e_21^post_5, nd_12^0'=nd_12^post_5, o_19^0'=o_19^post_5, o_20^0'=o_20^post_5, rt_11^0'=rt_11^post_5, rv_17^0'=rv_17^post_5, rv_18^0'=rv_18^post_5, st_14^0'=st_14^post_5, x_13^0'=x_13^post_5, y_15^0'=y_15^post_5, [ 1+c_16^0<=0 && c_16^0==c_16^post_5 && e_21^0==e_21^post_5 && nd_12^0==nd_12^post_5 && o_19^0==o_19^post_5 && o_20^0==o_20^post_5 && rt_11^0==rt_11^post_5 && rv_17^0==rv_17^post_5 && rv_18^0==rv_18^post_5 && st_14^0==st_14^post_5 && x_13^0==x_13^post_5 && y_15^0==y_15^post_5 ], cost: 1
     28: l4 -> l20 : c_16^0'=c_16^post_29, e_21^0'=e_21^post_29, nd_12^0'=nd_12^post_29, o_19^0'=o_19^post_29, o_20^0'=o_20^post_29, rt_11^0'=rt_11^post_29, rv_17^0'=rv_17^post_29, rv_18^0'=rv_18^post_29, st_14^0'=st_14^post_29, x_13^0'=x_13^post_29, y_15^0'=y_15^post_29, [ 1<=c_16^0 && c_16^0<=1 && 1+x_13^0<=o_19^0 && c_16^0==c_16^post_29 && e_21^0==e_21^post_29 && nd_12^0==nd_12^post_29 && o_19^0==o_19^post_29 && o_20^0==o_20^post_29 && rt_11^0==rt_11^post_29 && rv_17^0==rv_17^post_29 && rv_18^0==rv_18^post_29 && st_14^0==st_14^post_29 && x_13^0==x_13^post_29 && y_15^0==y_15^post_29 ], cost: 1
     29: l4 -> l21 : c_16^0'=c_16^post_30, e_21^0'=e_21^post_30, nd_12^0'=nd_12^post_30, o_19^0'=o_19^post_30, o_20^0'=o_20^post_30, rt_11^0'=rt_11^post_30, rv_17^0'=rv_17^post_30, rv_18^0'=rv_18^post_30, st_14^0'=st_14^post_30, x_13^0'=x_13^post_30, y_15^0'=y_15^post_30, [ 1<=c_16^0 && c_16^0<=1 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && c_16^0==c_16^post_30 && e_21^0==e_21^post_30 && nd_12^0==nd_12^post_30 && o_19^0==o_19^post_30 && o_20^0==o_20^post_30 && rt_11^0==rt_11^post_30 && rv_17^0==rv_17^post_30 && rv_18^0==rv_18^post_30 && st_14^0==st_14^post_30 && x_13^0==x_13^post_30 && y_15^0==y_15^post_30 ], cost: 1
     30: l4 -> l22 : c_16^0'=c_16^post_31, e_21^0'=e_21^post_31, nd_12^0'=nd_12^post_31, o_19^0'=o_19^post_31, o_20^0'=o_20^post_31, rt_11^0'=rt_11^post_31, rv_17^0'=rv_17^post_31, rv_18^0'=rv_18^post_31, st_14^0'=st_14^post_31, x_13^0'=x_13^post_31, y_15^0'=y_15^post_31, [ 1<=c_16^0 && c_16^0<=1 && o_19^0<=x_13^0 && o_20^0<=y_15^0 && o_20^0+o_19^0<=x_13^0+y_15^0 && e_21^post_31==1 && c_16^0==c_16^post_31 && nd_12^0==nd_12^post_31 && o_19^0==o_19^post_31 && o_20^0==o_20^post_31 && rt_11^0==rt_11^post_31 && rv_17^0==rv_17^post_31 && rv_18^0==rv_18^post_31 && st_14^0==st_14^post_31 && x_13^0==x_13^post_31 && y_15^0==y_15^post_31 ], cost: 1
      5: l6 -> l3 : c_16^0'=c_16^post_6, e_21^0'=e_21^post_6, nd_12^0'=nd_12^post_6, o_19^0'=o_19^post_6, o_20^0'=o_20^post_6, rt_11^0'=rt_11^post_6, rv_17^0'=rv_17^post_6, rv_18^0'=rv_18^post_6, st_14^0'=st_14^post_6, x_13^0'=x_13^post_6, y_15^0'=y_15^post_6, [ x_13^0<=0 && rt_11^post_6==st_14^0 && c_16^0==c_16^post_6 && e_21^0==e_21^post_6 && nd_12^0==nd_12^post_6 && o_19^0==o_19^post_6 && o_20^0==o_20^post_6 && rv_17^0==rv_17^post_6 && rv_18^0==rv_18^post_6 && st_14^0==st_14^post_6 && x_13^0==x_13^post_6 && y_15^0==y_15^post_6 ], cost: 1
      6: l6 -> l8 : c_16^0'=c_16^post_7, e_21^0'=e_21^post_7, nd_12^0'=nd_12^post_7, o_19^0'=o_19^post_7, o_20^0'=o_20^post_7, rt_11^0'=rt_11^post_7, rv_17^0'=rv_17^post_7, rv_18^0'=rv_18^post_7, st_14^0'=st_14^post_7, x_13^0'=x_13^post_7, y_15^0'=y_15^post_7, [ 1<=x_13^0 && 1<=y_15^0 && 1<=x_13^0+y_15^0 && c_16^0==c_16^post_7 && e_21^0==e_21^post_7 && nd_12^0==nd_12^post_7 && o_19^0==o_19^post_7 && o_20^0==o_20^post_7 && rt_11^0==rt_11^post_7 && rv_17^0==rv_17^post_7 && rv_18^0==rv_18^post_7 && st_14^0==st_14^post_7 && x_13^0==x_13^post_7 && y_15^0==y_15^post_7 ], cost: 1
      7: l8 -> l7 : c_16^0'=c_16^post_8, e_21^0'=e_21^post_8, nd_12^0'=nd_12^post_8, o_19^0'=o_19^post_8, o_20^0'=o_20^post_8, rt_11^0'=rt_11^post_8, rv_17^0'=rv_17^post_8, rv_18^0'=rv_18^post_8, st_14^0'=st_14^post_8, x_13^0'=x_13^post_8, y_15^0'=y_15^post_8, [ 1<=c_16^0 && c_16^0==c_16^post_8 && e_21^0==e_21^post_8 && nd_12^0==nd_12^post_8 && o_19^0==o_19^post_8 && o_20^0==o_20^post_8 && rt_11^0==rt_11^post_8 && rv_17^0==rv_17^post_8 && rv_18^0==rv_18^post_8 && st_14^0==st_14^post_8 && x_13^0==x_13^post_8 && y_15^0==y_15^post_8 ], cost: 1
      8: l8 -> l7 : c_16^0'=c_16^post_9, e_21^0'=e_21^post_9, nd_12^0'=nd_12^post_9, o_19^0'=o_19^post_9, o_20^0'=o_20^post_9, rt_11^0'=rt_11^post_9, rv_17^0'=rv_17^post_9, rv_18^0'=rv_18^post_9, st_14^0'=st_14^post_9, x_13^0'=x_13^post_9, y_15^0'=y_15^post_9, [ 1+c_16^0<=0 && c_16^0==c_16^post_9 && e_21^0==e_21^post_9 && nd_12^0==nd_12^post_9 && o_19^0==o_19^post_9 && o_20^0==o_20^post_9 && rt_11^0==rt_11^post_9 && rv_17^0==rv_17^post_9 && rv_18^0==rv_18^post_9 && st_14^0==st_14^post_9 && x_13^0==x_13^post_9 && y_15^0==y_15^post_9 ], cost: 1
     31: l7 -> l23 : c_16^0'=c_16^post_32, e_21^0'=e_21^post_32, nd_12^0'=nd_12^post_32, o_19^0'=o_19^post_32, o_20^0'=o_20^post_32, rt_11^0'=rt_11^post_32, rv_17^0'=rv_17^post_32, rv_18^0'=rv_18^post_32, st_14^0'=st_14^post_32, x_13^0'=x_13^post_32, y_15^0'=y_15^post_32, [ 1<=c_16^0 && c_16^0<=1 && 1+x_13^0<=o_19^0 && c_16^0==c_16^post_32 && e_21^0==e_21^post_32 && nd_12^0==nd_12^post_32 && o_19^0==o_19^post_32 && o_20^0==o_20^post_32 && rt_11^0==rt_11^post_32 && rv_17^0==rv_17^post_32 && rv_18^0==rv_18^post_32 && st_14^0==st_14^post_32 && x_13^0==x_13^post_32 && y_15^0==y_15^post_32 ], cost: 1
     32: l7 -> l24 : c_16^0'=c_16^post_33, e_21^0'=e_21^post_33, nd_12^0'=nd_12^post_33, o_19^0'=o_19^post_33, o_20^0'=o_20^post_33, rt_11^0'=rt_11^post_33, rv_17^0'=rv_17^post_33, rv_18^0'=rv_18^post_33, st_14^0'=st_14^post_33, x_13^0'=x_13^post_33, y_15^0'=y_15^post_33, [ 1<=c_16^0 && c_16^0<=1 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && c_16^0==c_16^post_33 && e_21^0==e_21^post_33 && nd_12^0==nd_12^post_33 && o_19^0==o_19^post_33 && o_20^0==o_20^post_33 && rt_11^0==rt_11^post_33 && rv_17^0==rv_17^post_33 && rv_18^0==rv_18^post_33 && st_14^0==st_14^post_33 && x_13^0==x_13^post_33 && y_15^0==y_15^post_33 ], cost: 1
     33: l7 -> l22 : c_16^0'=c_16^post_34, e_21^0'=e_21^post_34, nd_12^0'=nd_12^post_34, o_19^0'=o_19^post_34, o_20^0'=o_20^post_34, rt_11^0'=rt_11^post_34, rv_17^0'=rv_17^post_34, rv_18^0'=rv_18^post_34, st_14^0'=st_14^post_34, x_13^0'=x_13^post_34, y_15^0'=y_15^post_34, [ 1<=c_16^0 && c_16^0<=1 && o_19^0<=x_13^0 && o_20^0<=y_15^0 && o_20^0+o_19^0<=x_13^0+y_15^0 && e_21^post_34==1 && c_16^0==c_16^post_34 && nd_12^0==nd_12^post_34 && o_19^0==o_19^post_34 && o_20^0==o_20^post_34 && rt_11^0==rt_11^post_34 && rv_17^0==rv_17^post_34 && rv_18^0==rv_18^post_34 && st_14^0==st_14^post_34 && x_13^0==x_13^post_34 && y_15^0==y_15^post_34 ], cost: 1
      9: l9 -> l3 : c_16^0'=c_16^post_10, e_21^0'=e_21^post_10, nd_12^0'=nd_12^post_10, o_19^0'=o_19^post_10, o_20^0'=o_20^post_10, rt_11^0'=rt_11^post_10, rv_17^0'=rv_17^post_10, rv_18^0'=rv_18^post_10, st_14^0'=st_14^post_10, x_13^0'=x_13^post_10, y_15^0'=y_15^post_10, [ x_13^0<=0 && rt_11^post_10==st_14^0 && c_16^0==c_16^post_10 && e_21^0==e_21^post_10 && nd_12^0==nd_12^post_10 && o_19^0==o_19^post_10 && o_20^0==o_20^post_10 && rv_17^0==rv_17^post_10 && rv_18^0==rv_18^post_10 && st_14^0==st_14^post_10 && x_13^0==x_13^post_10 && y_15^0==y_15^post_10 ], cost: 1
     10: l9 -> l3 : c_16^0'=c_16^post_11, e_21^0'=e_21^post_11, nd_12^0'=nd_12^post_11, o_19^0'=o_19^post_11, o_20^0'=o_20^post_11, rt_11^0'=rt_11^post_11, rv_17^0'=rv_17^post_11, rv_18^0'=rv_18^post_11, st_14^0'=st_14^post_11, x_13^0'=x_13^post_11, y_15^0'=y_15^post_11, [ 1<=x_13^0 && y_15^0<=0 && rt_11^post_11==st_14^0 && c_16^0==c_16^post_11 && e_21^0==e_21^post_11 && nd_12^0==nd_12^post_11 && o_19^0==o_19^post_11 && o_20^0==o_20^post_11 && rv_17^0==rv_17^post_11 && rv_18^0==rv_18^post_11 && st_14^0==st_14^post_11 && x_13^0==x_13^post_11 && y_15^0==y_15^post_11 ], cost: 1
     11: l9 -> l11 : c_16^0'=c_16^post_12, e_21^0'=e_21^post_12, nd_12^0'=nd_12^post_12, o_19^0'=o_19^post_12, o_20^0'=o_20^post_12, rt_11^0'=rt_11^post_12, rv_17^0'=rv_17^post_12, rv_18^0'=rv_18^post_12, st_14^0'=st_14^post_12, x_13^0'=x_13^post_12, y_15^0'=y_15^post_12, [ 1<=x_13^0 && 1<=y_15^0 && 1<=x_13^0+y_15^0 && c_16^0==c_16^post_12 && e_21^0==e_21^post_12 && nd_12^0==nd_12^post_12 && o_19^0==o_19^post_12 && o_20^0==o_20^post_12 && rt_11^0==rt_11^post_12 && rv_17^0==rv_17^post_12 && rv_18^0==rv_18^post_12 && st_14^0==st_14^post_12 && x_13^0==x_13^post_12 && y_15^0==y_15^post_12 ], cost: 1
     12: l11 -> l10 : c_16^0'=c_16^post_13, e_21^0'=e_21^post_13, nd_12^0'=nd_12^post_13, o_19^0'=o_19^post_13, o_20^0'=o_20^post_13, rt_11^0'=rt_11^post_13, rv_17^0'=rv_17^post_13, rv_18^0'=rv_18^post_13, st_14^0'=st_14^post_13, x_13^0'=x_13^post_13, y_15^0'=y_15^post_13, [ 1<=c_16^0 && c_16^0==c_16^post_13 && e_21^0==e_21^post_13 && nd_12^0==nd_12^post_13 && o_19^0==o_19^post_13 && o_20^0==o_20^post_13 && rt_11^0==rt_11^post_13 && rv_17^0==rv_17^post_13 && rv_18^0==rv_18^post_13 && st_14^0==st_14^post_13 && x_13^0==x_13^post_13 && y_15^0==y_15^post_13 ], cost: 1
     13: l11 -> l10 : c_16^0'=c_16^post_14, e_21^0'=e_21^post_14, nd_12^0'=nd_12^post_14, o_19^0'=o_19^post_14, o_20^0'=o_20^post_14, rt_11^0'=rt_11^post_14, rv_17^0'=rv_17^post_14, rv_18^0'=rv_18^post_14, st_14^0'=st_14^post_14, x_13^0'=x_13^post_14, y_15^0'=y_15^post_14, [ 1+c_16^0<=0 && c_16^0==c_16^post_14 && e_21^0==e_21^post_14 && nd_12^0==nd_12^post_14 && o_19^0==o_19^post_14 && o_20^0==o_20^post_14 && rt_11^0==rt_11^post_14 && rv_17^0==rv_17^post_14 && rv_18^0==rv_18^post_14 && st_14^0==st_14^post_14 && x_13^0==x_13^post_14 && y_15^0==y_15^post_14 ], cost: 1
     34: l10 -> l25 : c_16^0'=c_16^post_35, e_21^0'=e_21^post_35, nd_12^0'=nd_12^post_35, o_19^0'=o_19^post_35, o_20^0'=o_20^post_35, rt_11^0'=rt_11^post_35, rv_17^0'=rv_17^post_35, rv_18^0'=rv_18^post_35, st_14^0'=st_14^post_35, x_13^0'=x_13^post_35, y_15^0'=y_15^post_35, [ 1<=c_16^0 && c_16^0<=1 && 1+x_13^0<=o_19^0 && c_16^0==c_16^post_35 && e_21^0==e_21^post_35 && nd_12^0==nd_12^post_35 && o_19^0==o_19^post_35 && o_20^0==o_20^post_35 && rt_11^0==rt_11^post_35 && rv_17^0==rv_17^post_35 && rv_18^0==rv_18^post_35 && st_14^0==st_14^post_35 && x_13^0==x_13^post_35 && y_15^0==y_15^post_35 ], cost: 1
     35: l10 -> l26 : c_16^0'=c_16^post_36, e_21^0'=e_21^post_36, nd_12^0'=nd_12^post_36, o_19^0'=o_19^post_36, o_20^0'=o_20^post_36, rt_11^0'=rt_11^post_36, rv_17^0'=rv_17^post_36, rv_18^0'=rv_18^post_36, st_14^0'=st_14^post_36, x_13^0'=x_13^post_36, y_15^0'=y_15^post_36, [ 1<=c_16^0 && c_16^0<=1 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && c_16^0==c_16^post_36 && e_21^0==e_21^post_36 && nd_12^0==nd_12^post_36 && o_19^0==o_19^post_36 && o_20^0==o_20^post_36 && rt_11^0==rt_11^post_36 && rv_17^0==rv_17^post_36 && rv_18^0==rv_18^post_36 && st_14^0==st_14^post_36 && x_13^0==x_13^post_36 && y_15^0==y_15^post_36 ], cost: 1
     36: l10 -> l22 : c_16^0'=c_16^post_37, e_21^0'=e_21^post_37, nd_12^0'=nd_12^post_37, o_19^0'=o_19^post_37, o_20^0'=o_20^post_37, rt_11^0'=rt_11^post_37, rv_17^0'=rv_17^post_37, rv_18^0'=rv_18^post_37, st_14^0'=st_14^post_37, x_13^0'=x_13^post_37, y_15^0'=y_15^post_37, [ 1<=c_16^0 && c_16^0<=1 && o_19^0<=x_13^0 && o_20^0<=y_15^0 && o_20^0+o_19^0<=x_13^0+y_15^0 && e_21^post_37==1 && c_16^0==c_16^post_37 && nd_12^0==nd_12^post_37 && o_19^0==o_19^post_37 && o_20^0==o_20^post_37 && rt_11^0==rt_11^post_37 && rv_17^0==rv_17^post_37 && rv_18^0==rv_18^post_37 && st_14^0==st_14^post_37 && x_13^0==x_13^post_37 && y_15^0==y_15^post_37 ], cost: 1
     14: l12 -> l3 : c_16^0'=c_16^post_15, e_21^0'=e_21^post_15, nd_12^0'=nd_12^post_15, o_19^0'=o_19^post_15, o_20^0'=o_20^post_15, rt_11^0'=rt_11^post_15, rv_17^0'=rv_17^post_15, rv_18^0'=rv_18^post_15, st_14^0'=st_14^post_15, x_13^0'=x_13^post_15, y_15^0'=y_15^post_15, [ x_13^0<=0 && rt_11^post_15==st_14^0 && c_16^0==c_16^post_15 && e_21^0==e_21^post_15 && nd_12^0==nd_12^post_15 && o_19^0==o_19^post_15 && o_20^0==o_20^post_15 && rv_17^0==rv_17^post_15 && rv_18^0==rv_18^post_15 && st_14^0==st_14^post_15 && x_13^0==x_13^post_15 && y_15^0==y_15^post_15 ], cost: 1
     15: l12 -> l3 : c_16^0'=c_16^post_16, e_21^0'=e_21^post_16, nd_12^0'=nd_12^post_16, o_19^0'=o_19^post_16, o_20^0'=o_20^post_16, rt_11^0'=rt_11^post_16, rv_17^0'=rv_17^post_16, rv_18^0'=rv_18^post_16, st_14^0'=st_14^post_16, x_13^0'=x_13^post_16, y_15^0'=y_15^post_16, [ 1<=x_13^0 && y_15^0<=0 && rt_11^post_16==st_14^0 && c_16^0==c_16^post_16 && e_21^0==e_21^post_16 && nd_12^0==nd_12^post_16 && o_19^0==o_19^post_16 && o_20^0==o_20^post_16 && rv_17^0==rv_17^post_16 && rv_18^0==rv_18^post_16 && st_14^0==st_14^post_16 && x_13^0==x_13^post_16 && y_15^0==y_15^post_16 ], cost: 1
     16: l12 -> l14 : c_16^0'=c_16^post_17, e_21^0'=e_21^post_17, nd_12^0'=nd_12^post_17, o_19^0'=o_19^post_17, o_20^0'=o_20^post_17, rt_11^0'=rt_11^post_17, rv_17^0'=rv_17^post_17, rv_18^0'=rv_18^post_17, st_14^0'=st_14^post_17, x_13^0'=x_13^post_17, y_15^0'=y_15^post_17, [ 1<=x_13^0 && 1<=y_15^0 && 1<=x_13^0+y_15^0 && c_16^0==c_16^post_17 && e_21^0==e_21^post_17 && nd_12^0==nd_12^post_17 && o_19^0==o_19^post_17 && o_20^0==o_20^post_17 && rt_11^0==rt_11^post_17 && rv_17^0==rv_17^post_17 && rv_18^0==rv_18^post_17 && st_14^0==st_14^post_17 && x_13^0==x_13^post_17 && y_15^0==y_15^post_17 ], cost: 1
     17: l14 -> l13 : c_16^0'=c_16^post_18, e_21^0'=e_21^post_18, nd_12^0'=nd_12^post_18, o_19^0'=o_19^post_18, o_20^0'=o_20^post_18, rt_11^0'=rt_11^post_18, rv_17^0'=rv_17^post_18, rv_18^0'=rv_18^post_18, st_14^0'=st_14^post_18, x_13^0'=x_13^post_18, y_15^0'=y_15^post_18, [ 1<=c_16^0 && c_16^0==c_16^post_18 && e_21^0==e_21^post_18 && nd_12^0==nd_12^post_18 && o_19^0==o_19^post_18 && o_20^0==o_20^post_18 && rt_11^0==rt_11^post_18 && rv_17^0==rv_17^post_18 && rv_18^0==rv_18^post_18 && st_14^0==st_14^post_18 && x_13^0==x_13^post_18 && y_15^0==y_15^post_18 ], cost: 1
     18: l14 -> l13 : c_16^0'=c_16^post_19, e_21^0'=e_21^post_19, nd_12^0'=nd_12^post_19, o_19^0'=o_19^post_19, o_20^0'=o_20^post_19, rt_11^0'=rt_11^post_19, rv_17^0'=rv_17^post_19, rv_18^0'=rv_18^post_19, st_14^0'=st_14^post_19, x_13^0'=x_13^post_19, y_15^0'=y_15^post_19, [ 1+c_16^0<=0 && c_16^0==c_16^post_19 && e_21^0==e_21^post_19 && nd_12^0==nd_12^post_19 && o_19^0==o_19^post_19 && o_20^0==o_20^post_19 && rt_11^0==rt_11^post_19 && rv_17^0==rv_17^post_19 && rv_18^0==rv_18^post_19 && st_14^0==st_14^post_19 && x_13^0==x_13^post_19 && y_15^0==y_15^post_19 ], cost: 1
     37: l13 -> l27 : c_16^0'=c_16^post_38, e_21^0'=e_21^post_38, nd_12^0'=nd_12^post_38, o_19^0'=o_19^post_38, o_20^0'=o_20^post_38, rt_11^0'=rt_11^post_38, rv_17^0'=rv_17^post_38, rv_18^0'=rv_18^post_38, st_14^0'=st_14^post_38, x_13^0'=x_13^post_38, y_15^0'=y_15^post_38, [ 1<=c_16^0 && c_16^0<=1 && 1+x_13^0<=o_19^0 && c_16^0==c_16^post_38 && e_21^0==e_21^post_38 && nd_12^0==nd_12^post_38 && o_19^0==o_19^post_38 && o_20^0==o_20^post_38 && rt_11^0==rt_11^post_38 && rv_17^0==rv_17^post_38 && rv_18^0==rv_18^post_38 && st_14^0==st_14^post_38 && x_13^0==x_13^post_38 && y_15^0==y_15^post_38 ], cost: 1
     38: l13 -> l28 : c_16^0'=c_16^post_39, e_21^0'=e_21^post_39, nd_12^0'=nd_12^post_39, o_19^0'=o_19^post_39, o_20^0'=o_20^post_39, rt_11^0'=rt_11^post_39, rv_17^0'=rv_17^post_39, rv_18^0'=rv_18^post_39, st_14^0'=st_14^post_39, x_13^0'=x_13^post_39, y_15^0'=y_15^post_39, [ 1<=c_16^0 && c_16^0<=1 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && c_16^0==c_16^post_39 && e_21^0==e_21^post_39 && nd_12^0==nd_12^post_39 && o_19^0==o_19^post_39 && o_20^0==o_20^post_39 && rt_11^0==rt_11^post_39 && rv_17^0==rv_17^post_39 && rv_18^0==rv_18^post_39 && st_14^0==st_14^post_39 && x_13^0==x_13^post_39 && y_15^0==y_15^post_39 ], cost: 1
     39: l13 -> l22 : c_16^0'=c_16^post_40, e_21^0'=e_21^post_40, nd_12^0'=nd_12^post_40, o_19^0'=o_19^post_40, o_20^0'=o_20^post_40, rt_11^0'=rt_11^post_40, rv_17^0'=rv_17^post_40, rv_18^0'=rv_18^post_40, st_14^0'=st_14^post_40, x_13^0'=x_13^post_40, y_15^0'=y_15^post_40, [ 1<=c_16^0 && c_16^0<=1 && o_19^0<=x_13^0 && o_20^0<=y_15^0 && o_20^0+o_19^0<=x_13^0+y_15^0 && e_21^post_40==1 && c_16^0==c_16^post_40 && nd_12^0==nd_12^post_40 && o_19^0==o_19^post_40 && o_20^0==o_20^post_40 && rt_11^0==rt_11^post_40 && rv_17^0==rv_17^post_40 && rv_18^0==rv_18^post_40 && st_14^0==st_14^post_40 && x_13^0==x_13^post_40 && y_15^0==y_15^post_40 ], cost: 1
     22: l16 -> l15 : c_16^0'=c_16^post_23, e_21^0'=e_21^post_23, nd_12^0'=nd_12^post_23, o_19^0'=o_19^post_23, o_20^0'=o_20^post_23, rt_11^0'=rt_11^post_23, rv_17^0'=rv_17^post_23, rv_18^0'=rv_18^post_23, st_14^0'=st_14^post_23, x_13^0'=x_13^post_23, y_15^0'=y_15^post_23, [ 2<=c_16^0 && c_16^0==c_16^post_23 && e_21^0==e_21^post_23 && nd_12^0==nd_12^post_23 && o_19^0==o_19^post_23 && o_20^0==o_20^post_23 && rt_11^0==rt_11^post_23 && rv_17^0==rv_17^post_23 && rv_18^0==rv_18^post_23 && st_14^0==st_14^post_23 && x_13^0==x_13^post_23 && y_15^0==y_15^post_23 ], cost: 1
     23: l16 -> l15 : c_16^0'=c_16^post_24, e_21^0'=e_21^post_24, nd_12^0'=nd_12^post_24, o_19^0'=o_19^post_24, o_20^0'=o_20^post_24, rt_11^0'=rt_11^post_24, rv_17^0'=rv_17^post_24, rv_18^0'=rv_18^post_24, st_14^0'=st_14^post_24, x_13^0'=x_13^post_24, y_15^0'=y_15^post_24, [ 1+c_16^0<=1 && c_16^0==c_16^post_24 && e_21^0==e_21^post_24 && nd_12^0==nd_12^post_24 && o_19^0==o_19^post_24 && o_20^0==o_20^post_24 && rt_11^0==rt_11^post_24 && rv_17^0==rv_17^post_24 && rv_18^0==rv_18^post_24 && st_14^0==st_14^post_24 && x_13^0==x_13^post_24 && y_15^0==y_15^post_24 ], cost: 1
     95: l15 -> l1 : c_16^0'=c_16^post_96, e_21^0'=e_21^post_96, nd_12^0'=nd_12^post_96, o_19^0'=o_19^post_96, o_20^0'=o_20^post_96, rt_11^0'=rt_11^post_96, rv_17^0'=rv_17^post_96, rv_18^0'=rv_18^post_96, st_14^0'=st_14^post_96, x_13^0'=x_13^post_96, y_15^0'=y_15^post_96, [ nd_12^1_25==nd_12^1_25 && rv_18^post_96==nd_12^1_25 && nd_12^post_96==nd_12^post_96 && 0<=rv_18^post_96 && rv_18^post_96<=0 && x_13^post_96==-2+y_15^0 && y_15^post_96==1+x_13^post_96 && c_16^0==c_16^post_96 && e_21^0==e_21^post_96 && o_19^0==o_19^post_96 && o_20^0==o_20^post_96 && rt_11^0==rt_11^post_96 && rv_17^0==rv_17^post_96 && st_14^0==st_14^post_96 ], cost: 1
     96: l15 -> l53 : c_16^0'=c_16^post_97, e_21^0'=e_21^post_97, nd_12^0'=nd_12^post_97, o_19^0'=o_19^post_97, o_20^0'=o_20^post_97, rt_11^0'=rt_11^post_97, rv_17^0'=rv_17^post_97, rv_18^0'=rv_18^post_97, st_14^0'=st_14^post_97, x_13^0'=x_13^post_97, y_15^0'=y_15^post_97, [ nd_12^1_26==nd_12^1_26 && rv_18^post_97==nd_12^1_26 && nd_12^post_97==nd_12^post_97 && c_16^0==c_16^post_97 && e_21^0==e_21^post_97 && o_19^0==o_19^post_97 && o_20^0==o_20^post_97 && rt_11^0==rt_11^post_97 && rv_17^0==rv_17^post_97 && st_14^0==st_14^post_97 && x_13^0==x_13^post_97 && y_15^0==y_15^post_97 ], cost: 1
     25: l18 -> l19 : c_16^0'=c_16^post_26, e_21^0'=e_21^post_26, nd_12^0'=nd_12^post_26, o_19^0'=o_19^post_26, o_20^0'=o_20^post_26, rt_11^0'=rt_11^post_26, rv_17^0'=rv_17^post_26, rv_18^0'=rv_18^post_26, st_14^0'=st_14^post_26, x_13^0'=x_13^post_26, y_15^0'=y_15^post_26, [ 1<=rv_17^0 && c_16^0==c_16^post_26 && e_21^0==e_21^post_26 && nd_12^0==nd_12^post_26 && o_19^0==o_19^post_26 && o_20^0==o_20^post_26 && rt_11^0==rt_11^post_26 && rv_17^0==rv_17^post_26 && rv_18^0==rv_18^post_26 && st_14^0==st_14^post_26 && x_13^0==x_13^post_26 && y_15^0==y_15^post_26 ], cost: 1
     26: l18 -> l19 : c_16^0'=c_16^post_27, e_21^0'=e_21^post_27, nd_12^0'=nd_12^post_27, o_19^0'=o_19^post_27, o_20^0'=o_20^post_27, rt_11^0'=rt_11^post_27, rv_17^0'=rv_17^post_27, rv_18^0'=rv_18^post_27, st_14^0'=st_14^post_27, x_13^0'=x_13^post_27, y_15^0'=y_15^post_27, [ 1+rv_17^0<=0 && c_16^0==c_16^post_27 && e_21^0==e_21^post_27 && nd_12^0==nd_12^post_27 && o_19^0==o_19^post_27 && o_20^0==o_20^post_27 && rt_11^0==rt_11^post_27 && rv_17^0==rv_17^post_27 && rv_18^0==rv_18^post_27 && st_14^0==st_14^post_27 && x_13^0==x_13^post_27 && y_15^0==y_15^post_27 ], cost: 1
     27: l19 -> l17 : c_16^0'=c_16^post_28, e_21^0'=e_21^post_28, nd_12^0'=nd_12^post_28, o_19^0'=o_19^post_28, o_20^0'=o_20^post_28, rt_11^0'=rt_11^post_28, rv_17^0'=rv_17^post_28, rv_18^0'=rv_18^post_28, st_14^0'=st_14^post_28, x_13^0'=x_13^post_28, y_15^0'=y_15^post_28, [ c_16^post_28==1 && o_19^post_28==x_13^0 && o_20^post_28==y_15^0 && e_21^0==e_21^post_28 && nd_12^0==nd_12^post_28 && rt_11^0==rt_11^post_28 && rv_17^0==rv_17^post_28 && rv_18^0==rv_18^post_28 && st_14^0==st_14^post_28 && x_13^0==x_13^post_28 && y_15^0==y_15^post_28 ], cost: 1
     55: l17 -> l12 : c_16^0'=c_16^post_56, e_21^0'=e_21^post_56, nd_12^0'=nd_12^post_56, o_19^0'=o_19^post_56, o_20^0'=o_20^post_56, rt_11^0'=rt_11^post_56, rv_17^0'=rv_17^post_56, rv_18^0'=rv_18^post_56, st_14^0'=st_14^post_56, x_13^0'=x_13^post_56, y_15^0'=y_15^post_56, [ nd_12^1_9==nd_12^1_9 && rv_18^post_56==nd_12^1_9 && nd_12^post_56==nd_12^post_56 && 0<=rv_18^post_56 && rv_18^post_56<=0 && x_13^post_56==-2+y_15^0 && y_15^post_56==1+x_13^post_56 && c_16^0==c_16^post_56 && e_21^0==e_21^post_56 && o_19^0==o_19^post_56 && o_20^0==o_20^post_56 && rt_11^0==rt_11^post_56 && rv_17^0==rv_17^post_56 && st_14^0==st_14^post_56 ], cost: 1
     56: l17 -> l36 : c_16^0'=c_16^post_57, e_21^0'=e_21^post_57, nd_12^0'=nd_12^post_57, o_19^0'=o_19^post_57, o_20^0'=o_20^post_57, rt_11^0'=rt_11^post_57, rv_17^0'=rv_17^post_57, rv_18^0'=rv_18^post_57, st_14^0'=st_14^post_57, x_13^0'=x_13^post_57, y_15^0'=y_15^post_57, [ nd_12^1_10==nd_12^1_10 && rv_18^post_57==nd_12^1_10 && nd_12^post_57==nd_12^post_57 && c_16^0==c_16^post_57 && e_21^0==e_21^post_57 && o_19^0==o_19^post_57 && o_20^0==o_20^post_57 && rt_11^0==rt_11^post_57 && rv_17^0==rv_17^post_57 && st_14^0==st_14^post_57 && x_13^0==x_13^post_57 && y_15^0==y_15^post_57 ], cost: 1
     40: l20 -> l9 : c_16^0'=c_16^post_41, e_21^0'=e_21^post_41, nd_12^0'=nd_12^post_41, o_19^0'=o_19^post_41, o_20^0'=o_20^post_41, rt_11^0'=rt_11^post_41, rv_17^0'=rv_17^post_41, rv_18^0'=rv_18^post_41, st_14^0'=st_14^post_41, x_13^0'=x_13^post_41, y_15^0'=y_15^post_41, [ nd_12^1_3==nd_12^1_3 && rv_18^post_41==nd_12^1_3 && nd_12^post_41==nd_12^post_41 && 0<=rv_18^post_41 && rv_18^post_41<=0 && x_13^post_41==-2+y_15^0 && y_15^post_41==1+x_13^post_41 && c_16^0==c_16^post_41 && e_21^0==e_21^post_41 && o_19^0==o_19^post_41 && o_20^0==o_20^post_41 && rt_11^0==rt_11^post_41 && rv_17^0==rv_17^post_41 && st_14^0==st_14^post_41 ], cost: 1
     41: l20 -> l29 : c_16^0'=c_16^post_42, e_21^0'=e_21^post_42, nd_12^0'=nd_12^post_42, o_19^0'=o_19^post_42, o_20^0'=o_20^post_42, rt_11^0'=rt_11^post_42, rv_17^0'=rv_17^post_42, rv_18^0'=rv_18^post_42, st_14^0'=st_14^post_42, x_13^0'=x_13^post_42, y_15^0'=y_15^post_42, [ nd_12^1_4==nd_12^1_4 && rv_18^post_42==nd_12^1_4 && nd_12^post_42==nd_12^post_42 && c_16^0==c_16^post_42 && e_21^0==e_21^post_42 && o_19^0==o_19^post_42 && o_20^0==o_20^post_42 && rt_11^0==rt_11^post_42 && rv_17^0==rv_17^post_42 && st_14^0==st_14^post_42 && x_13^0==x_13^post_42 && y_15^0==y_15^post_42 ], cost: 1
     45: l21 -> l9 : c_16^0'=c_16^post_46, e_21^0'=e_21^post_46, nd_12^0'=nd_12^post_46, o_19^0'=o_19^post_46, o_20^0'=o_20^post_46, rt_11^0'=rt_11^post_46, rv_17^0'=rv_17^post_46, rv_18^0'=rv_18^post_46, st_14^0'=st_14^post_46, x_13^0'=x_13^post_46, y_15^0'=y_15^post_46, [ nd_12^1_5==nd_12^1_5 && rv_18^post_46==nd_12^1_5 && nd_12^post_46==nd_12^post_46 && 0<=rv_18^post_46 && rv_18^post_46<=0 && x_13^post_46==-2+y_15^0 && y_15^post_46==1+x_13^post_46 && c_16^0==c_16^post_46 && e_21^0==e_21^post_46 && o_19^0==o_19^post_46 && o_20^0==o_20^post_46 && rt_11^0==rt_11^post_46 && rv_17^0==rv_17^post_46 && st_14^0==st_14^post_46 ], cost: 1
     46: l21 -> l31 : c_16^0'=c_16^post_47, e_21^0'=e_21^post_47, nd_12^0'=nd_12^post_47, o_19^0'=o_19^post_47, o_20^0'=o_20^post_47, rt_11^0'=rt_11^post_47, rv_17^0'=rv_17^post_47, rv_18^0'=rv_18^post_47, st_14^0'=st_14^post_47, x_13^0'=x_13^post_47, y_15^0'=y_15^post_47, [ nd_12^1_6==nd_12^1_6 && rv_18^post_47==nd_12^1_6 && nd_12^post_47==nd_12^post_47 && c_16^0==c_16^post_47 && e_21^0==e_21^post_47 && o_19^0==o_19^post_47 && o_20^0==o_20^post_47 && rt_11^0==rt_11^post_47 && rv_17^0==rv_17^post_47 && st_14^0==st_14^post_47 && x_13^0==x_13^post_47 && y_15^0==y_15^post_47 ], cost: 1
     60: l23 -> l12 : c_16^0'=c_16^post_61, e_21^0'=e_21^post_61, nd_12^0'=nd_12^post_61, o_19^0'=o_19^post_61, o_20^0'=o_20^post_61, rt_11^0'=rt_11^post_61, rv_17^0'=rv_17^post_61, rv_18^0'=rv_18^post_61, st_14^0'=st_14^post_61, x_13^0'=x_13^post_61, y_15^0'=y_15^post_61, [ nd_12^1_11==nd_12^1_11 && rv_18^post_61==nd_12^1_11 && nd_12^post_61==nd_12^post_61 && 0<=rv_18^post_61 && rv_18^post_61<=0 && x_13^post_61==-2+y_15^0 && y_15^post_61==1+x_13^post_61 && c_16^0==c_16^post_61 && e_21^0==e_21^post_61 && o_19^0==o_19^post_61 && o_20^0==o_20^post_61 && rt_11^0==rt_11^post_61 && rv_17^0==rv_17^post_61 && st_14^0==st_14^post_61 ], cost: 1
     61: l23 -> l38 : c_16^0'=c_16^post_62, e_21^0'=e_21^post_62, nd_12^0'=nd_12^post_62, o_19^0'=o_19^post_62, o_20^0'=o_20^post_62, rt_11^0'=rt_11^post_62, rv_17^0'=rv_17^post_62, rv_18^0'=rv_18^post_62, st_14^0'=st_14^post_62, x_13^0'=x_13^post_62, y_15^0'=y_15^post_62, [ nd_12^1_12==nd_12^1_12 && rv_18^post_62==nd_12^1_12 && nd_12^post_62==nd_12^post_62 && c_16^0==c_16^post_62 && e_21^0==e_21^post_62 && o_19^0==o_19^post_62 && o_20^0==o_20^post_62 && rt_11^0==rt_11^post_62 && rv_17^0==rv_17^post_62 && st_14^0==st_14^post_62 && x_13^0==x_13^post_62 && y_15^0==y_15^post_62 ], cost: 1
     65: l24 -> l12 : c_16^0'=c_16^post_66, e_21^0'=e_21^post_66, nd_12^0'=nd_12^post_66, o_19^0'=o_19^post_66, o_20^0'=o_20^post_66, rt_11^0'=rt_11^post_66, rv_17^0'=rv_17^post_66, rv_18^0'=rv_18^post_66, st_14^0'=st_14^post_66, x_13^0'=x_13^post_66, y_15^0'=y_15^post_66, [ nd_12^1_13==nd_12^1_13 && rv_18^post_66==nd_12^1_13 && nd_12^post_66==nd_12^post_66 && 0<=rv_18^post_66 && rv_18^post_66<=0 && x_13^post_66==-2+y_15^0 && y_15^post_66==1+x_13^post_66 && c_16^0==c_16^post_66 && e_21^0==e_21^post_66 && o_19^0==o_19^post_66 && o_20^0==o_20^post_66 && rt_11^0==rt_11^post_66 && rv_17^0==rv_17^post_66 && st_14^0==st_14^post_66 ], cost: 1
     66: l24 -> l40 : c_16^0'=c_16^post_67, e_21^0'=e_21^post_67, nd_12^0'=nd_12^post_67, o_19^0'=o_19^post_67, o_20^0'=o_20^post_67, rt_11^0'=rt_11^post_67, rv_17^0'=rv_17^post_67, rv_18^0'=rv_18^post_67, st_14^0'=st_14^post_67, x_13^0'=x_13^post_67, y_15^0'=y_15^post_67, [ nd_12^1_14==nd_12^1_14 && rv_18^post_67==nd_12^1_14 && nd_12^post_67==nd_12^post_67 && c_16^0==c_16^post_67 && e_21^0==e_21^post_67 && o_19^0==o_19^post_67 && o_20^0==o_20^post_67 && rt_11^0==rt_11^post_67 && rv_17^0==rv_17^post_67 && st_14^0==st_14^post_67 && x_13^0==x_13^post_67 && y_15^0==y_15^post_67 ], cost: 1
     70: l25 -> l9 : c_16^0'=c_16^post_71, e_21^0'=e_21^post_71, nd_12^0'=nd_12^post_71, o_19^0'=o_19^post_71, o_20^0'=o_20^post_71, rt_11^0'=rt_11^post_71, rv_17^0'=rv_17^post_71, rv_18^0'=rv_18^post_71, st_14^0'=st_14^post_71, x_13^0'=x_13^post_71, y_15^0'=y_15^post_71, [ nd_12^1_15==nd_12^1_15 && rv_18^post_71==nd_12^1_15 && nd_12^post_71==nd_12^post_71 && 0<=rv_18^post_71 && rv_18^post_71<=0 && x_13^post_71==-2+y_15^0 && y_15^post_71==1+x_13^post_71 && c_16^0==c_16^post_71 && e_21^0==e_21^post_71 && o_19^0==o_19^post_71 && o_20^0==o_20^post_71 && rt_11^0==rt_11^post_71 && rv_17^0==rv_17^post_71 && st_14^0==st_14^post_71 ], cost: 1
     71: l25 -> l42 : c_16^0'=c_16^post_72, e_21^0'=e_21^post_72, nd_12^0'=nd_12^post_72, o_19^0'=o_19^post_72, o_20^0'=o_20^post_72, rt_11^0'=rt_11^post_72, rv_17^0'=rv_17^post_72, rv_18^0'=rv_18^post_72, st_14^0'=st_14^post_72, x_13^0'=x_13^post_72, y_15^0'=y_15^post_72, [ nd_12^1_16==nd_12^1_16 && rv_18^post_72==nd_12^1_16 && nd_12^post_72==nd_12^post_72 && c_16^0==c_16^post_72 && e_21^0==e_21^post_72 && o_19^0==o_19^post_72 && o_20^0==o_20^post_72 && rt_11^0==rt_11^post_72 && rv_17^0==rv_17^post_72 && st_14^0==st_14^post_72 && x_13^0==x_13^post_72 && y_15^0==y_15^post_72 ], cost: 1
     75: l26 -> l9 : c_16^0'=c_16^post_76, e_21^0'=e_21^post_76, nd_12^0'=nd_12^post_76, o_19^0'=o_19^post_76, o_20^0'=o_20^post_76, rt_11^0'=rt_11^post_76, rv_17^0'=rv_17^post_76, rv_18^0'=rv_18^post_76, st_14^0'=st_14^post_76, x_13^0'=x_13^post_76, y_15^0'=y_15^post_76, [ nd_12^1_17==nd_12^1_17 && rv_18^post_76==nd_12^1_17 && nd_12^post_76==nd_12^post_76 && 0<=rv_18^post_76 && rv_18^post_76<=0 && x_13^post_76==-2+y_15^0 && y_15^post_76==1+x_13^post_76 && c_16^0==c_16^post_76 && e_21^0==e_21^post_76 && o_19^0==o_19^post_76 && o_20^0==o_20^post_76 && rt_11^0==rt_11^post_76 && rv_17^0==rv_17^post_76 && st_14^0==st_14^post_76 ], cost: 1
     76: l26 -> l44 : c_16^0'=c_16^post_77, e_21^0'=e_21^post_77, nd_12^0'=nd_12^post_77, o_19^0'=o_19^post_77, o_20^0'=o_20^post_77, rt_11^0'=rt_11^post_77, rv_17^0'=rv_17^post_77, rv_18^0'=rv_18^post_77, st_14^0'=st_14^post_77, x_13^0'=x_13^post_77, y_15^0'=y_15^post_77, [ nd_12^1_18==nd_12^1_18 && rv_18^post_77==nd_12^1_18 && nd_12^post_77==nd_12^post_77 && c_16^0==c_16^post_77 && e_21^0==e_21^post_77 && o_19^0==o_19^post_77 && o_20^0==o_20^post_77 && rt_11^0==rt_11^post_77 && rv_17^0==rv_17^post_77 && st_14^0==st_14^post_77 && x_13^0==x_13^post_77 && y_15^0==y_15^post_77 ], cost: 1
     85: l27 -> l12 : c_16^0'=c_16^post_86, e_21^0'=e_21^post_86, nd_12^0'=nd_12^post_86, o_19^0'=o_19^post_86, o_20^0'=o_20^post_86, rt_11^0'=rt_11^post_86, rv_17^0'=rv_17^post_86, rv_18^0'=rv_18^post_86, st_14^0'=st_14^post_86, x_13^0'=x_13^post_86, y_15^0'=y_15^post_86, [ nd_12^1_21==nd_12^1_21 && rv_18^post_86==nd_12^1_21 && nd_12^post_86==nd_12^post_86 && 0<=rv_18^post_86 && rv_18^post_86<=0 && x_13^post_86==-2+y_15^0 && y_15^post_86==1+x_13^post_86 && c_16^0==c_16^post_86 && e_21^0==e_21^post_86 && o_19^0==o_19^post_86 && o_20^0==o_20^post_86 && rt_11^0==rt_11^post_86 && rv_17^0==rv_17^post_86 && st_14^0==st_14^post_86 ], cost: 1
     86: l27 -> l49 : c_16^0'=c_16^post_87, e_21^0'=e_21^post_87, nd_12^0'=nd_12^post_87, o_19^0'=o_19^post_87, o_20^0'=o_20^post_87, rt_11^0'=rt_11^post_87, rv_17^0'=rv_17^post_87, rv_18^0'=rv_18^post_87, st_14^0'=st_14^post_87, x_13^0'=x_13^post_87, y_15^0'=y_15^post_87, [ nd_12^1_22==nd_12^1_22 && rv_18^post_87==nd_12^1_22 && nd_12^post_87==nd_12^post_87 && c_16^0==c_16^post_87 && e_21^0==e_21^post_87 && o_19^0==o_19^post_87 && o_20^0==o_20^post_87 && rt_11^0==rt_11^post_87 && rv_17^0==rv_17^post_87 && st_14^0==st_14^post_87 && x_13^0==x_13^post_87 && y_15^0==y_15^post_87 ], cost: 1
     90: l28 -> l12 : c_16^0'=c_16^post_91, e_21^0'=e_21^post_91, nd_12^0'=nd_12^post_91, o_19^0'=o_19^post_91, o_20^0'=o_20^post_91, rt_11^0'=rt_11^post_91, rv_17^0'=rv_17^post_91, rv_18^0'=rv_18^post_91, st_14^0'=st_14^post_91, x_13^0'=x_13^post_91, y_15^0'=y_15^post_91, [ nd_12^1_23==nd_12^1_23 && rv_18^post_91==nd_12^1_23 && nd_12^post_91==nd_12^post_91 && 0<=rv_18^post_91 && rv_18^post_91<=0 && x_13^post_91==-2+y_15^0 && y_15^post_91==1+x_13^post_91 && c_16^0==c_16^post_91 && e_21^0==e_21^post_91 && o_19^0==o_19^post_91 && o_20^0==o_20^post_91 && rt_11^0==rt_11^post_91 && rv_17^0==rv_17^post_91 && st_14^0==st_14^post_91 ], cost: 1
     91: l28 -> l51 : c_16^0'=c_16^post_92, e_21^0'=e_21^post_92, nd_12^0'=nd_12^post_92, o_19^0'=o_19^post_92, o_20^0'=o_20^post_92, rt_11^0'=rt_11^post_92, rv_17^0'=rv_17^post_92, rv_18^0'=rv_18^post_92, st_14^0'=st_14^post_92, x_13^0'=x_13^post_92, y_15^0'=y_15^post_92, [ nd_12^1_24==nd_12^1_24 && rv_18^post_92==nd_12^1_24 && nd_12^post_92==nd_12^post_92 && c_16^0==c_16^post_92 && e_21^0==e_21^post_92 && o_19^0==o_19^post_92 && o_20^0==o_20^post_92 && rt_11^0==rt_11^post_92 && rv_17^0==rv_17^post_92 && st_14^0==st_14^post_92 && x_13^0==x_13^post_92 && y_15^0==y_15^post_92 ], cost: 1
     42: l29 -> l30 : c_16^0'=c_16^post_43, e_21^0'=e_21^post_43, nd_12^0'=nd_12^post_43, o_19^0'=o_19^post_43, o_20^0'=o_20^post_43, rt_11^0'=rt_11^post_43, rv_17^0'=rv_17^post_43, rv_18^0'=rv_18^post_43, st_14^0'=st_14^post_43, x_13^0'=x_13^post_43, y_15^0'=y_15^post_43, [ 1<=rv_18^0 && c_16^0==c_16^post_43 && e_21^0==e_21^post_43 && nd_12^0==nd_12^post_43 && o_19^0==o_19^post_43 && o_20^0==o_20^post_43 && rt_11^0==rt_11^post_43 && rv_17^0==rv_17^post_43 && rv_18^0==rv_18^post_43 && st_14^0==st_14^post_43 && x_13^0==x_13^post_43 && y_15^0==y_15^post_43 ], cost: 1
     43: l29 -> l30 : c_16^0'=c_16^post_44, e_21^0'=e_21^post_44, nd_12^0'=nd_12^post_44, o_19^0'=o_19^post_44, o_20^0'=o_20^post_44, rt_11^0'=rt_11^post_44, rv_17^0'=rv_17^post_44, rv_18^0'=rv_18^post_44, st_14^0'=st_14^post_44, x_13^0'=x_13^post_44, y_15^0'=y_15^post_44, [ 1+rv_18^0<=0 && c_16^0==c_16^post_44 && e_21^0==e_21^post_44 && nd_12^0==nd_12^post_44 && o_19^0==o_19^post_44 && o_20^0==o_20^post_44 && rt_11^0==rt_11^post_44 && rv_17^0==rv_17^post_44 && rv_18^0==rv_18^post_44 && st_14^0==st_14^post_44 && x_13^0==x_13^post_44 && y_15^0==y_15^post_44 ], cost: 1
     44: l30 -> l2 : c_16^0'=c_16^post_45, e_21^0'=e_21^post_45, nd_12^0'=nd_12^post_45, o_19^0'=o_19^post_45, o_20^0'=o_20^post_45, rt_11^0'=rt_11^post_45, rv_17^0'=rv_17^post_45, rv_18^0'=rv_18^post_45, st_14^0'=st_14^post_45, x_13^0'=x_13^post_45, y_15^0'=y_15^post_45, [ x_13^post_45==-1+x_13^0 && y_15^post_45==x_13^post_45 && c_16^0==c_16^post_45 && e_21^0==e_21^post_45 && nd_12^0==nd_12^post_45 && o_19^0==o_19^post_45 && o_20^0==o_20^post_45 && rt_11^0==rt_11^post_45 && rv_17^0==rv_17^post_45 && rv_18^0==rv_18^post_45 && st_14^0==st_14^post_45 ], cost: 1
     47: l31 -> l32 : c_16^0'=c_16^post_48, e_21^0'=e_21^post_48, nd_12^0'=nd_12^post_48, o_19^0'=o_19^post_48, o_20^0'=o_20^post_48, rt_11^0'=rt_11^post_48, rv_17^0'=rv_17^post_48, rv_18^0'=rv_18^post_48, st_14^0'=st_14^post_48, x_13^0'=x_13^post_48, y_15^0'=y_15^post_48, [ 1<=rv_18^0 && c_16^0==c_16^post_48 && e_21^0==e_21^post_48 && nd_12^0==nd_12^post_48 && o_19^0==o_19^post_48 && o_20^0==o_20^post_48 && rt_11^0==rt_11^post_48 && rv_17^0==rv_17^post_48 && rv_18^0==rv_18^post_48 && st_14^0==st_14^post_48 && x_13^0==x_13^post_48 && y_15^0==y_15^post_48 ], cost: 1
     48: l31 -> l32 : c_16^0'=c_16^post_49, e_21^0'=e_21^post_49, nd_12^0'=nd_12^post_49, o_19^0'=o_19^post_49, o_20^0'=o_20^post_49, rt_11^0'=rt_11^post_49, rv_17^0'=rv_17^post_49, rv_18^0'=rv_18^post_49, st_14^0'=st_14^post_49, x_13^0'=x_13^post_49, y_15^0'=y_15^post_49, [ 1+rv_18^0<=0 && c_16^0==c_16^post_49 && e_21^0==e_21^post_49 && nd_12^0==nd_12^post_49 && o_19^0==o_19^post_49 && o_20^0==o_20^post_49 && rt_11^0==rt_11^post_49 && rv_17^0==rv_17^post_49 && rv_18^0==rv_18^post_49 && st_14^0==st_14^post_49 && x_13^0==x_13^post_49 && y_15^0==y_15^post_49 ], cost: 1
     49: l32 -> l2 : c_16^0'=c_16^post_50, e_21^0'=e_21^post_50, nd_12^0'=nd_12^post_50, o_19^0'=o_19^post_50, o_20^0'=o_20^post_50, rt_11^0'=rt_11^post_50, rv_17^0'=rv_17^post_50, rv_18^0'=rv_18^post_50, st_14^0'=st_14^post_50, x_13^0'=x_13^post_50, y_15^0'=y_15^post_50, [ x_13^post_50==-1+x_13^0 && y_15^post_50==x_13^post_50 && c_16^0==c_16^post_50 && e_21^0==e_21^post_50 && nd_12^0==nd_12^post_50 && o_19^0==o_19^post_50 && o_20^0==o_20^post_50 && rt_11^0==rt_11^post_50 && rv_17^0==rv_17^post_50 && rv_18^0==rv_18^post_50 && st_14^0==st_14^post_50 ], cost: 1
     50: l33 -> l9 : c_16^0'=c_16^post_51, e_21^0'=e_21^post_51, nd_12^0'=nd_12^post_51, o_19^0'=o_19^post_51, o_20^0'=o_20^post_51, rt_11^0'=rt_11^post_51, rv_17^0'=rv_17^post_51, rv_18^0'=rv_18^post_51, st_14^0'=st_14^post_51, x_13^0'=x_13^post_51, y_15^0'=y_15^post_51, [ nd_12^1_7==nd_12^1_7 && rv_18^post_51==nd_12^1_7 && nd_12^post_51==nd_12^post_51 && 0<=rv_18^post_51 && rv_18^post_51<=0 && x_13^post_51==-2+y_15^0 && y_15^post_51==1+x_13^post_51 && c_16^0==c_16^post_51 && e_21^0==e_21^post_51 && o_19^0==o_19^post_51 && o_20^0==o_20^post_51 && rt_11^0==rt_11^post_51 && rv_17^0==rv_17^post_51 && st_14^0==st_14^post_51 ], cost: 1
     51: l33 -> l34 : c_16^0'=c_16^post_52, e_21^0'=e_21^post_52, nd_12^0'=nd_12^post_52, o_19^0'=o_19^post_52, o_20^0'=o_20^post_52, rt_11^0'=rt_11^post_52, rv_17^0'=rv_17^post_52, rv_18^0'=rv_18^post_52, st_14^0'=st_14^post_52, x_13^0'=x_13^post_52, y_15^0'=y_15^post_52, [ nd_12^1_8==nd_12^1_8 && rv_18^post_52==nd_12^1_8 && nd_12^post_52==nd_12^post_52 && c_16^0==c_16^post_52 && e_21^0==e_21^post_52 && o_19^0==o_19^post_52 && o_20^0==o_20^post_52 && rt_11^0==rt_11^post_52 && rv_17^0==rv_17^post_52 && st_14^0==st_14^post_52 && x_13^0==x_13^post_52 && y_15^0==y_15^post_52 ], cost: 1
     52: l34 -> l35 : c_16^0'=c_16^post_53, e_21^0'=e_21^post_53, nd_12^0'=nd_12^post_53, o_19^0'=o_19^post_53, o_20^0'=o_20^post_53, rt_11^0'=rt_11^post_53, rv_17^0'=rv_17^post_53, rv_18^0'=rv_18^post_53, st_14^0'=st_14^post_53, x_13^0'=x_13^post_53, y_15^0'=y_15^post_53, [ 1<=rv_18^0 && c_16^0==c_16^post_53 && e_21^0==e_21^post_53 && nd_12^0==nd_12^post_53 && o_19^0==o_19^post_53 && o_20^0==o_20^post_53 && rt_11^0==rt_11^post_53 && rv_17^0==rv_17^post_53 && rv_18^0==rv_18^post_53 && st_14^0==st_14^post_53 && x_13^0==x_13^post_53 && y_15^0==y_15^post_53 ], cost: 1
     53: l34 -> l35 : c_16^0'=c_16^post_54, e_21^0'=e_21^post_54, nd_12^0'=nd_12^post_54, o_19^0'=o_19^post_54, o_20^0'=o_20^post_54, rt_11^0'=rt_11^post_54, rv_17^0'=rv_17^post_54, rv_18^0'=rv_18^post_54, st_14^0'=st_14^post_54, x_13^0'=x_13^post_54, y_15^0'=y_15^post_54, [ 1+rv_18^0<=0 && c_16^0==c_16^post_54 && e_21^0==e_21^post_54 && nd_12^0==nd_12^post_54 && o_19^0==o_19^post_54 && o_20^0==o_20^post_54 && rt_11^0==rt_11^post_54 && rv_17^0==rv_17^post_54 && rv_18^0==rv_18^post_54 && st_14^0==st_14^post_54 && x_13^0==x_13^post_54 && y_15^0==y_15^post_54 ], cost: 1
     54: l35 -> l2 : c_16^0'=c_16^post_55, e_21^0'=e_21^post_55, nd_12^0'=nd_12^post_55, o_19^0'=o_19^post_55, o_20^0'=o_20^post_55, rt_11^0'=rt_11^post_55, rv_17^0'=rv_17^post_55, rv_18^0'=rv_18^post_55, st_14^0'=st_14^post_55, x_13^0'=x_13^post_55, y_15^0'=y_15^post_55, [ x_13^post_55==-1+x_13^0 && y_15^post_55==x_13^post_55 && c_16^0==c_16^post_55 && e_21^0==e_21^post_55 && nd_12^0==nd_12^post_55 && o_19^0==o_19^post_55 && o_20^0==o_20^post_55 && rt_11^0==rt_11^post_55 && rv_17^0==rv_17^post_55 && rv_18^0==rv_18^post_55 && st_14^0==st_14^post_55 ], cost: 1
     57: l36 -> l37 : c_16^0'=c_16^post_58, e_21^0'=e_21^post_58, nd_12^0'=nd_12^post_58, o_19^0'=o_19^post_58, o_20^0'=o_20^post_58, rt_11^0'=rt_11^post_58, rv_17^0'=rv_17^post_58, rv_18^0'=rv_18^post_58, st_14^0'=st_14^post_58, x_13^0'=x_13^post_58, y_15^0'=y_15^post_58, [ 1<=rv_18^0 && c_16^0==c_16^post_58 && e_21^0==e_21^post_58 && nd_12^0==nd_12^post_58 && o_19^0==o_19^post_58 && o_20^0==o_20^post_58 && rt_11^0==rt_11^post_58 && rv_17^0==rv_17^post_58 && rv_18^0==rv_18^post_58 && st_14^0==st_14^post_58 && x_13^0==x_13^post_58 && y_15^0==y_15^post_58 ], cost: 1
     58: l36 -> l37 : c_16^0'=c_16^post_59, e_21^0'=e_21^post_59, nd_12^0'=nd_12^post_59, o_19^0'=o_19^post_59, o_20^0'=o_20^post_59, rt_11^0'=rt_11^post_59, rv_17^0'=rv_17^post_59, rv_18^0'=rv_18^post_59, st_14^0'=st_14^post_59, x_13^0'=x_13^post_59, y_15^0'=y_15^post_59, [ 1+rv_18^0<=0 && c_16^0==c_16^post_59 && e_21^0==e_21^post_59 && nd_12^0==nd_12^post_59 && o_19^0==o_19^post_59 && o_20^0==o_20^post_59 && rt_11^0==rt_11^post_59 && rv_17^0==rv_17^post_59 && rv_18^0==rv_18^post_59 && st_14^0==st_14^post_59 && x_13^0==x_13^post_59 && y_15^0==y_15^post_59 ], cost: 1
     59: l37 -> l6 : c_16^0'=c_16^post_60, e_21^0'=e_21^post_60, nd_12^0'=nd_12^post_60, o_19^0'=o_19^post_60, o_20^0'=o_20^post_60, rt_11^0'=rt_11^post_60, rv_17^0'=rv_17^post_60, rv_18^0'=rv_18^post_60, st_14^0'=st_14^post_60, x_13^0'=x_13^post_60, y_15^0'=y_15^post_60, [ x_13^post_60==-1+x_13^0 && y_15^post_60==x_13^post_60 && c_16^0==c_16^post_60 && e_21^0==e_21^post_60 && nd_12^0==nd_12^post_60 && o_19^0==o_19^post_60 && o_20^0==o_20^post_60 && rt_11^0==rt_11^post_60 && rv_17^0==rv_17^post_60 && rv_18^0==rv_18^post_60 && st_14^0==st_14^post_60 ], cost: 1
     62: l38 -> l39 : c_16^0'=c_16^post_63, e_21^0'=e_21^post_63, nd_12^0'=nd_12^post_63, o_19^0'=o_19^post_63, o_20^0'=o_20^post_63, rt_11^0'=rt_11^post_63, rv_17^0'=rv_17^post_63, rv_18^0'=rv_18^post_63, st_14^0'=st_14^post_63, x_13^0'=x_13^post_63, y_15^0'=y_15^post_63, [ 1<=rv_18^0 && c_16^0==c_16^post_63 && e_21^0==e_21^post_63 && nd_12^0==nd_12^post_63 && o_19^0==o_19^post_63 && o_20^0==o_20^post_63 && rt_11^0==rt_11^post_63 && rv_17^0==rv_17^post_63 && rv_18^0==rv_18^post_63 && st_14^0==st_14^post_63 && x_13^0==x_13^post_63 && y_15^0==y_15^post_63 ], cost: 1
     63: l38 -> l39 : c_16^0'=c_16^post_64, e_21^0'=e_21^post_64, nd_12^0'=nd_12^post_64, o_19^0'=o_19^post_64, o_20^0'=o_20^post_64, rt_11^0'=rt_11^post_64, rv_17^0'=rv_17^post_64, rv_18^0'=rv_18^post_64, st_14^0'=st_14^post_64, x_13^0'=x_13^post_64, y_15^0'=y_15^post_64, [ 1+rv_18^0<=0 && c_16^0==c_16^post_64 && e_21^0==e_21^post_64 && nd_12^0==nd_12^post_64 && o_19^0==o_19^post_64 && o_20^0==o_20^post_64 && rt_11^0==rt_11^post_64 && rv_17^0==rv_17^post_64 && rv_18^0==rv_18^post_64 && st_14^0==st_14^post_64 && x_13^0==x_13^post_64 && y_15^0==y_15^post_64 ], cost: 1
     64: l39 -> l6 : c_16^0'=c_16^post_65, e_21^0'=e_21^post_65, nd_12^0'=nd_12^post_65, o_19^0'=o_19^post_65, o_20^0'=o_20^post_65, rt_11^0'=rt_11^post_65, rv_17^0'=rv_17^post_65, rv_18^0'=rv_18^post_65, st_14^0'=st_14^post_65, x_13^0'=x_13^post_65, y_15^0'=y_15^post_65, [ x_13^post_65==-1+x_13^0 && y_15^post_65==x_13^post_65 && c_16^0==c_16^post_65 && e_21^0==e_21^post_65 && nd_12^0==nd_12^post_65 && o_19^0==o_19^post_65 && o_20^0==o_20^post_65 && rt_11^0==rt_11^post_65 && rv_17^0==rv_17^post_65 && rv_18^0==rv_18^post_65 && st_14^0==st_14^post_65 ], cost: 1
     67: l40 -> l41 : c_16^0'=c_16^post_68, e_21^0'=e_21^post_68, nd_12^0'=nd_12^post_68, o_19^0'=o_19^post_68, o_20^0'=o_20^post_68, rt_11^0'=rt_11^post_68, rv_17^0'=rv_17^post_68, rv_18^0'=rv_18^post_68, st_14^0'=st_14^post_68, x_13^0'=x_13^post_68, y_15^0'=y_15^post_68, [ 1<=rv_18^0 && c_16^0==c_16^post_68 && e_21^0==e_21^post_68 && nd_12^0==nd_12^post_68 && o_19^0==o_19^post_68 && o_20^0==o_20^post_68 && rt_11^0==rt_11^post_68 && rv_17^0==rv_17^post_68 && rv_18^0==rv_18^post_68 && st_14^0==st_14^post_68 && x_13^0==x_13^post_68 && y_15^0==y_15^post_68 ], cost: 1
     68: l40 -> l41 : c_16^0'=c_16^post_69, e_21^0'=e_21^post_69, nd_12^0'=nd_12^post_69, o_19^0'=o_19^post_69, o_20^0'=o_20^post_69, rt_11^0'=rt_11^post_69, rv_17^0'=rv_17^post_69, rv_18^0'=rv_18^post_69, st_14^0'=st_14^post_69, x_13^0'=x_13^post_69, y_15^0'=y_15^post_69, [ 1+rv_18^0<=0 && c_16^0==c_16^post_69 && e_21^0==e_21^post_69 && nd_12^0==nd_12^post_69 && o_19^0==o_19^post_69 && o_20^0==o_20^post_69 && rt_11^0==rt_11^post_69 && rv_17^0==rv_17^post_69 && rv_18^0==rv_18^post_69 && st_14^0==st_14^post_69 && x_13^0==x_13^post_69 && y_15^0==y_15^post_69 ], cost: 1
     69: l41 -> l6 : c_16^0'=c_16^post_70, e_21^0'=e_21^post_70, nd_12^0'=nd_12^post_70, o_19^0'=o_19^post_70, o_20^0'=o_20^post_70, rt_11^0'=rt_11^post_70, rv_17^0'=rv_17^post_70, rv_18^0'=rv_18^post_70, st_14^0'=st_14^post_70, x_13^0'=x_13^post_70, y_15^0'=y_15^post_70, [ x_13^post_70==-1+x_13^0 && y_15^post_70==x_13^post_70 && c_16^0==c_16^post_70 && e_21^0==e_21^post_70 && nd_12^0==nd_12^post_70 && o_19^0==o_19^post_70 && o_20^0==o_20^post_70 && rt_11^0==rt_11^post_70 && rv_17^0==rv_17^post_70 && rv_18^0==rv_18^post_70 && st_14^0==st_14^post_70 ], cost: 1
     72: l42 -> l43 : c_16^0'=c_16^post_73, e_21^0'=e_21^post_73, nd_12^0'=nd_12^post_73, o_19^0'=o_19^post_73, o_20^0'=o_20^post_73, rt_11^0'=rt_11^post_73, rv_17^0'=rv_17^post_73, rv_18^0'=rv_18^post_73, st_14^0'=st_14^post_73, x_13^0'=x_13^post_73, y_15^0'=y_15^post_73, [ 1<=rv_18^0 && c_16^0==c_16^post_73 && e_21^0==e_21^post_73 && nd_12^0==nd_12^post_73 && o_19^0==o_19^post_73 && o_20^0==o_20^post_73 && rt_11^0==rt_11^post_73 && rv_17^0==rv_17^post_73 && rv_18^0==rv_18^post_73 && st_14^0==st_14^post_73 && x_13^0==x_13^post_73 && y_15^0==y_15^post_73 ], cost: 1
     73: l42 -> l43 : c_16^0'=c_16^post_74, e_21^0'=e_21^post_74, nd_12^0'=nd_12^post_74, o_19^0'=o_19^post_74, o_20^0'=o_20^post_74, rt_11^0'=rt_11^post_74, rv_17^0'=rv_17^post_74, rv_18^0'=rv_18^post_74, st_14^0'=st_14^post_74, x_13^0'=x_13^post_74, y_15^0'=y_15^post_74, [ 1+rv_18^0<=0 && c_16^0==c_16^post_74 && e_21^0==e_21^post_74 && nd_12^0==nd_12^post_74 && o_19^0==o_19^post_74 && o_20^0==o_20^post_74 && rt_11^0==rt_11^post_74 && rv_17^0==rv_17^post_74 && rv_18^0==rv_18^post_74 && st_14^0==st_14^post_74 && x_13^0==x_13^post_74 && y_15^0==y_15^post_74 ], cost: 1
     74: l43 -> l2 : c_16^0'=c_16^post_75, e_21^0'=e_21^post_75, nd_12^0'=nd_12^post_75, o_19^0'=o_19^post_75, o_20^0'=o_20^post_75, rt_11^0'=rt_11^post_75, rv_17^0'=rv_17^post_75, rv_18^0'=rv_18^post_75, st_14^0'=st_14^post_75, x_13^0'=x_13^post_75, y_15^0'=y_15^post_75, [ x_13^post_75==-1+x_13^0 && y_15^post_75==x_13^post_75 && c_16^0==c_16^post_75 && e_21^0==e_21^post_75 && nd_12^0==nd_12^post_75 && o_19^0==o_19^post_75 && o_20^0==o_20^post_75 && rt_11^0==rt_11^post_75 && rv_17^0==rv_17^post_75 && rv_18^0==rv_18^post_75 && st_14^0==st_14^post_75 ], cost: 1
     77: l44 -> l45 : c_16^0'=c_16^post_78, e_21^0'=e_21^post_78, nd_12^0'=nd_12^post_78, o_19^0'=o_19^post_78, o_20^0'=o_20^post_78, rt_11^0'=rt_11^post_78, rv_17^0'=rv_17^post_78, rv_18^0'=rv_18^post_78, st_14^0'=st_14^post_78, x_13^0'=x_13^post_78, y_15^0'=y_15^post_78, [ 1<=rv_18^0 && c_16^0==c_16^post_78 && e_21^0==e_21^post_78 && nd_12^0==nd_12^post_78 && o_19^0==o_19^post_78 && o_20^0==o_20^post_78 && rt_11^0==rt_11^post_78 && rv_17^0==rv_17^post_78 && rv_18^0==rv_18^post_78 && st_14^0==st_14^post_78 && x_13^0==x_13^post_78 && y_15^0==y_15^post_78 ], cost: 1
     78: l44 -> l45 : c_16^0'=c_16^post_79, e_21^0'=e_21^post_79, nd_12^0'=nd_12^post_79, o_19^0'=o_19^post_79, o_20^0'=o_20^post_79, rt_11^0'=rt_11^post_79, rv_17^0'=rv_17^post_79, rv_18^0'=rv_18^post_79, st_14^0'=st_14^post_79, x_13^0'=x_13^post_79, y_15^0'=y_15^post_79, [ 1+rv_18^0<=0 && c_16^0==c_16^post_79 && e_21^0==e_21^post_79 && nd_12^0==nd_12^post_79 && o_19^0==o_19^post_79 && o_20^0==o_20^post_79 && rt_11^0==rt_11^post_79 && rv_17^0==rv_17^post_79 && rv_18^0==rv_18^post_79 && st_14^0==st_14^post_79 && x_13^0==x_13^post_79 && y_15^0==y_15^post_79 ], cost: 1
     79: l45 -> l2 : c_16^0'=c_16^post_80, e_21^0'=e_21^post_80, nd_12^0'=nd_12^post_80, o_19^0'=o_19^post_80, o_20^0'=o_20^post_80, rt_11^0'=rt_11^post_80, rv_17^0'=rv_17^post_80, rv_18^0'=rv_18^post_80, st_14^0'=st_14^post_80, x_13^0'=x_13^post_80, y_15^0'=y_15^post_80, [ x_13^post_80==-1+x_13^0 && y_15^post_80==x_13^post_80 && c_16^0==c_16^post_80 && e_21^0==e_21^post_80 && nd_12^0==nd_12^post_80 && o_19^0==o_19^post_80 && o_20^0==o_20^post_80 && rt_11^0==rt_11^post_80 && rv_17^0==rv_17^post_80 && rv_18^0==rv_18^post_80 && st_14^0==st_14^post_80 ], cost: 1
     80: l46 -> l9 : c_16^0'=c_16^post_81, e_21^0'=e_21^post_81, nd_12^0'=nd_12^post_81, o_19^0'=o_19^post_81, o_20^0'=o_20^post_81, rt_11^0'=rt_11^post_81, rv_17^0'=rv_17^post_81, rv_18^0'=rv_18^post_81, st_14^0'=st_14^post_81, x_13^0'=x_13^post_81, y_15^0'=y_15^post_81, [ nd_12^1_19==nd_12^1_19 && rv_18^post_81==nd_12^1_19 && nd_12^post_81==nd_12^post_81 && 0<=rv_18^post_81 && rv_18^post_81<=0 && x_13^post_81==-2+y_15^0 && y_15^post_81==1+x_13^post_81 && c_16^0==c_16^post_81 && e_21^0==e_21^post_81 && o_19^0==o_19^post_81 && o_20^0==o_20^post_81 && rt_11^0==rt_11^post_81 && rv_17^0==rv_17^post_81 && st_14^0==st_14^post_81 ], cost: 1
     81: l46 -> l47 : c_16^0'=c_16^post_82, e_21^0'=e_21^post_82, nd_12^0'=nd_12^post_82, o_19^0'=o_19^post_82, o_20^0'=o_20^post_82, rt_11^0'=rt_11^post_82, rv_17^0'=rv_17^post_82, rv_18^0'=rv_18^post_82, st_14^0'=st_14^post_82, x_13^0'=x_13^post_82, y_15^0'=y_15^post_82, [ nd_12^1_20==nd_12^1_20 && rv_18^post_82==nd_12^1_20 && nd_12^post_82==nd_12^post_82 && c_16^0==c_16^post_82 && e_21^0==e_21^post_82 && o_19^0==o_19^post_82 && o_20^0==o_20^post_82 && rt_11^0==rt_11^post_82 && rv_17^0==rv_17^post_82 && st_14^0==st_14^post_82 && x_13^0==x_13^post_82 && y_15^0==y_15^post_82 ], cost: 1
     82: l47 -> l48 : c_16^0'=c_16^post_83, e_21^0'=e_21^post_83, nd_12^0'=nd_12^post_83, o_19^0'=o_19^post_83, o_20^0'=o_20^post_83, rt_11^0'=rt_11^post_83, rv_17^0'=rv_17^post_83, rv_18^0'=rv_18^post_83, st_14^0'=st_14^post_83, x_13^0'=x_13^post_83, y_15^0'=y_15^post_83, [ 1<=rv_18^0 && c_16^0==c_16^post_83 && e_21^0==e_21^post_83 && nd_12^0==nd_12^post_83 && o_19^0==o_19^post_83 && o_20^0==o_20^post_83 && rt_11^0==rt_11^post_83 && rv_17^0==rv_17^post_83 && rv_18^0==rv_18^post_83 && st_14^0==st_14^post_83 && x_13^0==x_13^post_83 && y_15^0==y_15^post_83 ], cost: 1
     83: l47 -> l48 : c_16^0'=c_16^post_84, e_21^0'=e_21^post_84, nd_12^0'=nd_12^post_84, o_19^0'=o_19^post_84, o_20^0'=o_20^post_84, rt_11^0'=rt_11^post_84, rv_17^0'=rv_17^post_84, rv_18^0'=rv_18^post_84, st_14^0'=st_14^post_84, x_13^0'=x_13^post_84, y_15^0'=y_15^post_84, [ 1+rv_18^0<=0 && c_16^0==c_16^post_84 && e_21^0==e_21^post_84 && nd_12^0==nd_12^post_84 && o_19^0==o_19^post_84 && o_20^0==o_20^post_84 && rt_11^0==rt_11^post_84 && rv_17^0==rv_17^post_84 && rv_18^0==rv_18^post_84 && st_14^0==st_14^post_84 && x_13^0==x_13^post_84 && y_15^0==y_15^post_84 ], cost: 1
     84: l48 -> l2 : c_16^0'=c_16^post_85, e_21^0'=e_21^post_85, nd_12^0'=nd_12^post_85, o_19^0'=o_19^post_85, o_20^0'=o_20^post_85, rt_11^0'=rt_11^post_85, rv_17^0'=rv_17^post_85, rv_18^0'=rv_18^post_85, st_14^0'=st_14^post_85, x_13^0'=x_13^post_85, y_15^0'=y_15^post_85, [ x_13^post_85==-1+x_13^0 && y_15^post_85==x_13^post_85 && c_16^0==c_16^post_85 && e_21^0==e_21^post_85 && nd_12^0==nd_12^post_85 && o_19^0==o_19^post_85 && o_20^0==o_20^post_85 && rt_11^0==rt_11^post_85 && rv_17^0==rv_17^post_85 && rv_18^0==rv_18^post_85 && st_14^0==st_14^post_85 ], cost: 1
     87: l49 -> l50 : c_16^0'=c_16^post_88, e_21^0'=e_21^post_88, nd_12^0'=nd_12^post_88, o_19^0'=o_19^post_88, o_20^0'=o_20^post_88, rt_11^0'=rt_11^post_88, rv_17^0'=rv_17^post_88, rv_18^0'=rv_18^post_88, st_14^0'=st_14^post_88, x_13^0'=x_13^post_88, y_15^0'=y_15^post_88, [ 1<=rv_18^0 && c_16^0==c_16^post_88 && e_21^0==e_21^post_88 && nd_12^0==nd_12^post_88 && o_19^0==o_19^post_88 && o_20^0==o_20^post_88 && rt_11^0==rt_11^post_88 && rv_17^0==rv_17^post_88 && rv_18^0==rv_18^post_88 && st_14^0==st_14^post_88 && x_13^0==x_13^post_88 && y_15^0==y_15^post_88 ], cost: 1
     88: l49 -> l50 : c_16^0'=c_16^post_89, e_21^0'=e_21^post_89, nd_12^0'=nd_12^post_89, o_19^0'=o_19^post_89, o_20^0'=o_20^post_89, rt_11^0'=rt_11^post_89, rv_17^0'=rv_17^post_89, rv_18^0'=rv_18^post_89, st_14^0'=st_14^post_89, x_13^0'=x_13^post_89, y_15^0'=y_15^post_89, [ 1+rv_18^0<=0 && c_16^0==c_16^post_89 && e_21^0==e_21^post_89 && nd_12^0==nd_12^post_89 && o_19^0==o_19^post_89 && o_20^0==o_20^post_89 && rt_11^0==rt_11^post_89 && rv_17^0==rv_17^post_89 && rv_18^0==rv_18^post_89 && st_14^0==st_14^post_89 && x_13^0==x_13^post_89 && y_15^0==y_15^post_89 ], cost: 1
     89: l50 -> l6 : c_16^0'=c_16^post_90, e_21^0'=e_21^post_90, nd_12^0'=nd_12^post_90, o_19^0'=o_19^post_90, o_20^0'=o_20^post_90, rt_11^0'=rt_11^post_90, rv_17^0'=rv_17^post_90, rv_18^0'=rv_18^post_90, st_14^0'=st_14^post_90, x_13^0'=x_13^post_90, y_15^0'=y_15^post_90, [ x_13^post_90==-1+x_13^0 && y_15^post_90==x_13^post_90 && c_16^0==c_16^post_90 && e_21^0==e_21^post_90 && nd_12^0==nd_12^post_90 && o_19^0==o_19^post_90 && o_20^0==o_20^post_90 && rt_11^0==rt_11^post_90 && rv_17^0==rv_17^post_90 && rv_18^0==rv_18^post_90 && st_14^0==st_14^post_90 ], cost: 1
     92: l51 -> l52 : c_16^0'=c_16^post_93, e_21^0'=e_21^post_93, nd_12^0'=nd_12^post_93, o_19^0'=o_19^post_93, o_20^0'=o_20^post_93, rt_11^0'=rt_11^post_93, rv_17^0'=rv_17^post_93, rv_18^0'=rv_18^post_93, st_14^0'=st_14^post_93, x_13^0'=x_13^post_93, y_15^0'=y_15^post_93, [ 1<=rv_18^0 && c_16^0==c_16^post_93 && e_21^0==e_21^post_93 && nd_12^0==nd_12^post_93 && o_19^0==o_19^post_93 && o_20^0==o_20^post_93 && rt_11^0==rt_11^post_93 && rv_17^0==rv_17^post_93 && rv_18^0==rv_18^post_93 && st_14^0==st_14^post_93 && x_13^0==x_13^post_93 && y_15^0==y_15^post_93 ], cost: 1
     93: l51 -> l52 : c_16^0'=c_16^post_94, e_21^0'=e_21^post_94, nd_12^0'=nd_12^post_94, o_19^0'=o_19^post_94, o_20^0'=o_20^post_94, rt_11^0'=rt_11^post_94, rv_17^0'=rv_17^post_94, rv_18^0'=rv_18^post_94, st_14^0'=st_14^post_94, x_13^0'=x_13^post_94, y_15^0'=y_15^post_94, [ 1+rv_18^0<=0 && c_16^0==c_16^post_94 && e_21^0==e_21^post_94 && nd_12^0==nd_12^post_94 && o_19^0==o_19^post_94 && o_20^0==o_20^post_94 && rt_11^0==rt_11^post_94 && rv_17^0==rv_17^post_94 && rv_18^0==rv_18^post_94 && st_14^0==st_14^post_94 && x_13^0==x_13^post_94 && y_15^0==y_15^post_94 ], cost: 1
     94: l52 -> l6 : c_16^0'=c_16^post_95, e_21^0'=e_21^post_95, nd_12^0'=nd_12^post_95, o_19^0'=o_19^post_95, o_20^0'=o_20^post_95, rt_11^0'=rt_11^post_95, rv_17^0'=rv_17^post_95, rv_18^0'=rv_18^post_95, st_14^0'=st_14^post_95, x_13^0'=x_13^post_95, y_15^0'=y_15^post_95, [ x_13^post_95==-1+x_13^0 && y_15^post_95==x_13^post_95 && c_16^0==c_16^post_95 && e_21^0==e_21^post_95 && nd_12^0==nd_12^post_95 && o_19^0==o_19^post_95 && o_20^0==o_20^post_95 && rt_11^0==rt_11^post_95 && rv_17^0==rv_17^post_95 && rv_18^0==rv_18^post_95 && st_14^0==st_14^post_95 ], cost: 1
     97: l53 -> l54 : c_16^0'=c_16^post_98, e_21^0'=e_21^post_98, nd_12^0'=nd_12^post_98, o_19^0'=o_19^post_98, o_20^0'=o_20^post_98, rt_11^0'=rt_11^post_98, rv_17^0'=rv_17^post_98, rv_18^0'=rv_18^post_98, st_14^0'=st_14^post_98, x_13^0'=x_13^post_98, y_15^0'=y_15^post_98, [ 1<=rv_18^0 && c_16^0==c_16^post_98 && e_21^0==e_21^post_98 && nd_12^0==nd_12^post_98 && o_19^0==o_19^post_98 && o_20^0==o_20^post_98 && rt_11^0==rt_11^post_98 && rv_17^0==rv_17^post_98 && rv_18^0==rv_18^post_98 && st_14^0==st_14^post_98 && x_13^0==x_13^post_98 && y_15^0==y_15^post_98 ], cost: 1
     98: l53 -> l54 : c_16^0'=c_16^post_99, e_21^0'=e_21^post_99, nd_12^0'=nd_12^post_99, o_19^0'=o_19^post_99, o_20^0'=o_20^post_99, rt_11^0'=rt_11^post_99, rv_17^0'=rv_17^post_99, rv_18^0'=rv_18^post_99, st_14^0'=st_14^post_99, x_13^0'=x_13^post_99, y_15^0'=y_15^post_99, [ 1+rv_18^0<=0 && c_16^0==c_16^post_99 && e_21^0==e_21^post_99 && nd_12^0==nd_12^post_99 && o_19^0==o_19^post_99 && o_20^0==o_20^post_99 && rt_11^0==rt_11^post_99 && rv_17^0==rv_17^post_99 && rv_18^0==rv_18^post_99 && st_14^0==st_14^post_99 && x_13^0==x_13^post_99 && y_15^0==y_15^post_99 ], cost: 1
     99: l54 -> l1 : c_16^0'=c_16^post_100, e_21^0'=e_21^post_100, nd_12^0'=nd_12^post_100, o_19^0'=o_19^post_100, o_20^0'=o_20^post_100, rt_11^0'=rt_11^post_100, rv_17^0'=rv_17^post_100, rv_18^0'=rv_18^post_100, st_14^0'=st_14^post_100, x_13^0'=x_13^post_100, y_15^0'=y_15^post_100, [ x_13^post_100==-1+x_13^0 && y_15^post_100==x_13^post_100 && c_16^0==c_16^post_100 && e_21^0==e_21^post_100 && nd_12^0==nd_12^post_100 && o_19^0==o_19^post_100 && o_20^0==o_20^post_100 && rt_11^0==rt_11^post_100 && rv_17^0==rv_17^post_100 && rv_18^0==rv_18^post_100 && st_14^0==st_14^post_100 ], cost: 1
    100: l55 -> l0 : c_16^0'=c_16^post_101, e_21^0'=e_21^post_101, nd_12^0'=nd_12^post_101, o_19^0'=o_19^post_101, o_20^0'=o_20^post_101, rt_11^0'=rt_11^post_101, rv_17^0'=rv_17^post_101, rv_18^0'=rv_18^post_101, st_14^0'=st_14^post_101, x_13^0'=x_13^post_101, y_15^0'=y_15^post_101, [ c_16^0==c_16^post_101 && e_21^0==e_21^post_101 && nd_12^0==nd_12^post_101 && o_19^0==o_19^post_101 && o_20^0==o_20^post_101 && rt_11^0==rt_11^post_101 && rv_17^0==rv_17^post_101 && rv_18^0==rv_18^post_101 && st_14^0==st_14^post_101 && x_13^0==x_13^post_101 && y_15^0==y_15^post_101 ], cost: 1

Checking for constant complexity:
   The following rule is satisfiable with cost >= 1, yielding constant complexity:
    100: l55 -> l0 : c_16^0'=c_16^post_101, e_21^0'=e_21^post_101, nd_12^0'=nd_12^post_101, o_19^0'=o_19^post_101, o_20^0'=o_20^post_101, rt_11^0'=rt_11^post_101, rv_17^0'=rv_17^post_101, rv_18^0'=rv_18^post_101, st_14^0'=st_14^post_101, x_13^0'=x_13^post_101, y_15^0'=y_15^post_101, [ c_16^0==c_16^post_101 && e_21^0==e_21^post_101 && nd_12^0==nd_12^post_101 && o_19^0==o_19^post_101 && o_20^0==o_20^post_101 && rt_11^0==rt_11^post_101 && rv_17^0==rv_17^post_101 && rv_18^0==rv_18^post_101 && st_14^0==st_14^post_101 && x_13^0==x_13^post_101 && y_15^0==y_15^post_101 ], cost: 1

Removed unreachable and leaf rules:
   Start location: l55
      0: l0 -> l1 : c_16^0'=c_16^post_1, e_21^0'=e_21^post_1, nd_12^0'=nd_12^post_1, o_19^0'=o_19^post_1, o_20^0'=o_20^post_1, rt_11^0'=rt_11^post_1, rv_17^0'=rv_17^post_1, rv_18^0'=rv_18^post_1, st_14^0'=st_14^post_1, x_13^0'=x_13^post_1, y_15^0'=y_15^post_1, [ e_21^post_1==0 && c_16^post_1==0 && nd_12^0==nd_12^post_1 && o_19^0==o_19^post_1 && o_20^0==o_20^post_1 && rt_11^0==rt_11^post_1 && rv_17^0==rv_17^post_1 && rv_18^0==rv_18^post_1 && st_14^0==st_14^post_1 && x_13^0==x_13^post_1 && y_15^0==y_15^post_1 ], cost: 1
     21: l1 -> l16 : c_16^0'=c_16^post_22, e_21^0'=e_21^post_22, nd_12^0'=nd_12^post_22, o_19^0'=o_19^post_22, o_20^0'=o_20^post_22, rt_11^0'=rt_11^post_22, rv_17^0'=rv_17^post_22, rv_18^0'=rv_18^post_22, st_14^0'=st_14^post_22, x_13^0'=x_13^post_22, y_15^0'=y_15^post_22, [ 1<=x_13^0 && 1<=y_15^0 && 1<=x_13^0+y_15^0 && 0<=c_16^0 && c_16^0<=0 && nd_12^1_1==nd_12^1_1 && rv_17^post_22==nd_12^1_1 && nd_12^post_22==nd_12^post_22 && 0<=rv_17^post_22 && rv_17^post_22<=0 && c_16^0==c_16^post_22 && e_21^0==e_21^post_22 && o_19^0==o_19^post_22 && o_20^0==o_20^post_22 && rt_11^0==rt_11^post_22 && rv_18^0==rv_18^post_22 && st_14^0==st_14^post_22 && x_13^0==x_13^post_22 && y_15^0==y_15^post_22 ], cost: 1
     24: l1 -> l18 : c_16^0'=c_16^post_25, e_21^0'=e_21^post_25, nd_12^0'=nd_12^post_25, o_19^0'=o_19^post_25, o_20^0'=o_20^post_25, rt_11^0'=rt_11^post_25, rv_17^0'=rv_17^post_25, rv_18^0'=rv_18^post_25, st_14^0'=st_14^post_25, x_13^0'=x_13^post_25, y_15^0'=y_15^post_25, [ 1<=x_13^0 && 1<=y_15^0 && 1<=x_13^0+y_15^0 && 0<=c_16^0 && c_16^0<=0 && nd_12^1_2==nd_12^1_2 && rv_17^post_25==nd_12^1_2 && nd_12^post_25==nd_12^post_25 && c_16^0==c_16^post_25 && e_21^0==e_21^post_25 && o_19^0==o_19^post_25 && o_20^0==o_20^post_25 && rt_11^0==rt_11^post_25 && rv_18^0==rv_18^post_25 && st_14^0==st_14^post_25 && x_13^0==x_13^post_25 && y_15^0==y_15^post_25 ], cost: 1
      6: l6 -> l8 : c_16^0'=c_16^post_7, e_21^0'=e_21^post_7, nd_12^0'=nd_12^post_7, o_19^0'=o_19^post_7, o_20^0'=o_20^post_7, rt_11^0'=rt_11^post_7, rv_17^0'=rv_17^post_7, rv_18^0'=rv_18^post_7, st_14^0'=st_14^post_7, x_13^0'=x_13^post_7, y_15^0'=y_15^post_7, [ 1<=x_13^0 && 1<=y_15^0 && 1<=x_13^0+y_15^0 && c_16^0==c_16^post_7 && e_21^0==e_21^post_7 && nd_12^0==nd_12^post_7 && o_19^0==o_19^post_7 && o_20^0==o_20^post_7 && rt_11^0==rt_11^post_7 && rv_17^0==rv_17^post_7 && rv_18^0==rv_18^post_7 && st_14^0==st_14^post_7 && x_13^0==x_13^post_7 && y_15^0==y_15^post_7 ], cost: 1
      7: l8 -> l7 : c_16^0'=c_16^post_8, e_21^0'=e_21^post_8, nd_12^0'=nd_12^post_8, o_19^0'=o_19^post_8, o_20^0'=o_20^post_8, rt_11^0'=rt_11^post_8, rv_17^0'=rv_17^post_8, rv_18^0'=rv_18^post_8, st_14^0'=st_14^post_8, x_13^0'=x_13^post_8, y_15^0'=y_15^post_8, [ 1<=c_16^0 && c_16^0==c_16^post_8 && e_21^0==e_21^post_8 && nd_12^0==nd_12^post_8 && o_19^0==o_19^post_8 && o_20^0==o_20^post_8 && rt_11^0==rt_11^post_8 && rv_17^0==rv_17^post_8 && rv_18^0==rv_18^post_8 && st_14^0==st_14^post_8 && x_13^0==x_13^post_8 && y_15^0==y_15^post_8 ], cost: 1
      8: l8 -> l7 : c_16^0'=c_16^post_9, e_21^0'=e_21^post_9, nd_12^0'=nd_12^post_9, o_19^0'=o_19^post_9, o_20^0'=o_20^post_9, rt_11^0'=rt_11^post_9, rv_17^0'=rv_17^post_9, rv_18^0'=rv_18^post_9, st_14^0'=st_14^post_9, x_13^0'=x_13^post_9, y_15^0'=y_15^post_9, [ 1+c_16^0<=0 && c_16^0==c_16^post_9 && e_21^0==e_21^post_9 && nd_12^0==nd_12^post_9 && o_19^0==o_19^post_9 && o_20^0==o_20^post_9 && rt_11^0==rt_11^post_9 && rv_17^0==rv_17^post_9 && rv_18^0==rv_18^post_9 && st_14^0==st_14^post_9 && x_13^0==x_13^post_9 && y_15^0==y_15^post_9 ], cost: 1
     31: l7 -> l23 : c_16^0'=c_16^post_32, e_21^0'=e_21^post_32, nd_12^0'=nd_12^post_32, o_19^0'=o_19^post_32, o_20^0'=o_20^post_32, rt_11^0'=rt_11^post_32, rv_17^0'=rv_17^post_32, rv_18^0'=rv_18^post_32, st_14^0'=st_14^post_32, x_13^0'=x_13^post_32, y_15^0'=y_15^post_32, [ 1<=c_16^0 && c_16^0<=1 && 1+x_13^0<=o_19^0 && c_16^0==c_16^post_32 && e_21^0==e_21^post_32 && nd_12^0==nd_12^post_32 && o_19^0==o_19^post_32 && o_20^0==o_20^post_32 && rt_11^0==rt_11^post_32 && rv_17^0==rv_17^post_32 && rv_18^0==rv_18^post_32 && st_14^0==st_14^post_32 && x_13^0==x_13^post_32 && y_15^0==y_15^post_32 ], cost: 1
     32: l7 -> l24 : c_16^0'=c_16^post_33, e_21^0'=e_21^post_33, nd_12^0'=nd_12^post_33, o_19^0'=o_19^post_33, o_20^0'=o_20^post_33, rt_11^0'=rt_11^post_33, rv_17^0'=rv_17^post_33, rv_18^0'=rv_18^post_33, st_14^0'=st_14^post_33, x_13^0'=x_13^post_33, y_15^0'=y_15^post_33, [ 1<=c_16^0 && c_16^0<=1 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && c_16^0==c_16^post_33 && e_21^0==e_21^post_33 && nd_12^0==nd_12^post_33 && o_19^0==o_19^post_33 && o_20^0==o_20^post_33 && rt_11^0==rt_11^post_33 && rv_17^0==rv_17^post_33 && rv_18^0==rv_18^post_33 && st_14^0==st_14^post_33 && x_13^0==x_13^post_33 && y_15^0==y_15^post_33 ], cost: 1
     16: l12 -> l14 : c_16^0'=c_16^post_17, e_21^0'=e_21^post_17, nd_12^0'=nd_12^post_17, o_19^0'=o_19^post_17, o_20^0'=o_20^post_17, rt_11^0'=rt_11^post_17, rv_17^0'=rv_17^post_17, rv_18^0'=rv_18^post_17, st_14^0'=st_14^post_17, x_13^0'=x_13^post_17, y_15^0'=y_15^post_17, [ 1<=x_13^0 && 1<=y_15^0 && 1<=x_13^0+y_15^0 && c_16^0==c_16^post_17 && e_21^0==e_21^post_17 && nd_12^0==nd_12^post_17 && o_19^0==o_19^post_17 && o_20^0==o_20^post_17 && rt_11^0==rt_11^post_17 && rv_17^0==rv_17^post_17 && rv_18^0==rv_18^post_17 && st_14^0==st_14^post_17 && x_13^0==x_13^post_17 && y_15^0==y_15^post_17 ], cost: 1
     17: l14 -> l13 : c_16^0'=c_16^post_18, e_21^0'=e_21^post_18, nd_12^0'=nd_12^post_18, o_19^0'=o_19^post_18, o_20^0'=o_20^post_18, rt_11^0'=rt_11^post_18, rv_17^0'=rv_17^post_18, rv_18^0'=rv_18^post_18, st_14^0'=st_14^post_18, x_13^0'=x_13^post_18, y_15^0'=y_15^post_18, [ 1<=c_16^0 && c_16^0==c_16^post_18 && e_21^0==e_21^post_18 && nd_12^0==nd_12^post_18 && o_19^0==o_19^post_18 && o_20^0==o_20^post_18 && rt_11^0==rt_11^post_18 && rv_17^0==rv_17^post_18 && rv_18^0==rv_18^post_18 && st_14^0==st_14^post_18 && x_13^0==x_13^post_18 && y_15^0==y_15^post_18 ], cost: 1
     18: l14 -> l13 : c_16^0'=c_16^post_19, e_21^0'=e_21^post_19, nd_12^0'=nd_12^post_19, o_19^0'=o_19^post_19, o_20^0'=o_20^post_19, rt_11^0'=rt_11^post_19, rv_17^0'=rv_17^post_19, rv_18^0'=rv_18^post_19, st_14^0'=st_14^post_19, x_13^0'=x_13^post_19, y_15^0'=y_15^post_19, [ 1+c_16^0<=0 && c_16^0==c_16^post_19 && e_21^0==e_21^post_19 && nd_12^0==nd_12^post_19 && o_19^0==o_19^post_19 && o_20^0==o_20^post_19 && rt_11^0==rt_11^post_19 && rv_17^0==rv_17^post_19 && rv_18^0==rv_18^post_19 && st_14^0==st_14^post_19 && x_13^0==x_13^post_19 && y_15^0==y_15^post_19 ], cost: 1
     37: l13 -> l27 : c_16^0'=c_16^post_38, e_21^0'=e_21^post_38, nd_12^0'=nd_12^post_38, o_19^0'=o_19^post_38, o_20^0'=o_20^post_38, rt_11^0'=rt_11^post_38, rv_17^0'=rv_17^post_38, rv_18^0'=rv_18^post_38, st_14^0'=st_14^post_38, x_13^0'=x_13^post_38, y_15^0'=y_15^post_38, [ 1<=c_16^0 && c_16^0<=1 && 1+x_13^0<=o_19^0 && c_16^0==c_16^post_38 && e_21^0==e_21^post_38 && nd_12^0==nd_12^post_38 && o_19^0==o_19^post_38 && o_20^0==o_20^post_38 && rt_11^0==rt_11^post_38 && rv_17^0==rv_17^post_38 && rv_18^0==rv_18^post_38 && st_14^0==st_14^post_38 && x_13^0==x_13^post_38 && y_15^0==y_15^post_38 ], cost: 1
     38: l13 -> l28 : c_16^0'=c_16^post_39, e_21^0'=e_21^post_39, nd_12^0'=nd_12^post_39, o_19^0'=o_19^post_39, o_20^0'=o_20^post_39, rt_11^0'=rt_11^post_39, rv_17^0'=rv_17^post_39, rv_18^0'=rv_18^post_39, st_14^0'=st_14^post_39, x_13^0'=x_13^post_39, y_15^0'=y_15^post_39, [ 1<=c_16^0 && c_16^0<=1 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && c_16^0==c_16^post_39 && e_21^0==e_21^post_39 && nd_12^0==nd_12^post_39 && o_19^0==o_19^post_39 && o_20^0==o_20^post_39 && rt_11^0==rt_11^post_39 && rv_17^0==rv_17^post_39 && rv_18^0==rv_18^post_39 && st_14^0==st_14^post_39 && x_13^0==x_13^post_39 && y_15^0==y_15^post_39 ], cost: 1
     22: l16 -> l15 : c_16^0'=c_16^post_23, e_21^0'=e_21^post_23, nd_12^0'=nd_12^post_23, o_19^0'=o_19^post_23, o_20^0'=o_20^post_23, rt_11^0'=rt_11^post_23, rv_17^0'=rv_17^post_23, rv_18^0'=rv_18^post_23, st_14^0'=st_14^post_23, x_13^0'=x_13^post_23, y_15^0'=y_15^post_23, [ 2<=c_16^0 && c_16^0==c_16^post_23 && e_21^0==e_21^post_23 && nd_12^0==nd_12^post_23 && o_19^0==o_19^post_23 && o_20^0==o_20^post_23 && rt_11^0==rt_11^post_23 && rv_17^0==rv_17^post_23 && rv_18^0==rv_18^post_23 && st_14^0==st_14^post_23 && x_13^0==x_13^post_23 && y_15^0==y_15^post_23 ], cost: 1
     23: l16 -> l15 : c_16^0'=c_16^post_24, e_21^0'=e_21^post_24, nd_12^0'=nd_12^post_24, o_19^0'=o_19^post_24, o_20^0'=o_20^post_24, rt_11^0'=rt_11^post_24, rv_17^0'=rv_17^post_24, rv_18^0'=rv_18^post_24, st_14^0'=st_14^post_24, x_13^0'=x_13^post_24, y_15^0'=y_15^post_24, [ 1+c_16^0<=1 && c_16^0==c_16^post_24 && e_21^0==e_21^post_24 && nd_12^0==nd_12^post_24 && o_19^0==o_19^post_24 && o_20^0==o_20^post_24 && rt_11^0==rt_11^post_24 && rv_17^0==rv_17^post_24 && rv_18^0==rv_18^post_24 && st_14^0==st_14^post_24 && x_13^0==x_13^post_24 && y_15^0==y_15^post_24 ], cost: 1
     95: l15 -> l1 : c_16^0'=c_16^post_96, e_21^0'=e_21^post_96, nd_12^0'=nd_12^post_96, o_19^0'=o_19^post_96, o_20^0'=o_20^post_96, rt_11^0'=rt_11^post_96, rv_17^0'=rv_17^post_96, rv_18^0'=rv_18^post_96, st_14^0'=st_14^post_96, x_13^0'=x_13^post_96, y_15^0'=y_15^post_96, [ nd_12^1_25==nd_12^1_25 && rv_18^post_96==nd_12^1_25 && nd_12^post_96==nd_12^post_96 && 0<=rv_18^post_96 && rv_18^post_96<=0 && x_13^post_96==-2+y_15^0 && y_15^post_96==1+x_13^post_96 && c_16^0==c_16^post_96 && e_21^0==e_21^post_96 && o_19^0==o_19^post_96 && o_20^0==o_20^post_96 && rt_11^0==rt_11^post_96 && rv_17^0==rv_17^post_96 && st_14^0==st_14^post_96 ], cost: 1
     96: l15 -> l53 : c_16^0'=c_16^post_97, e_21^0'=e_21^post_97, nd_12^0'=nd_12^post_97, o_19^0'=o_19^post_97, o_20^0'=o_20^post_97, rt_11^0'=rt_11^post_97, rv_17^0'=rv_17^post_97, rv_18^0'=rv_18^post_97, st_14^0'=st_14^post_97, x_13^0'=x_13^post_97, y_15^0'=y_15^post_97, [ nd_12^1_26==nd_12^1_26 && rv_18^post_97==nd_12^1_26 && nd_12^post_97==nd_12^post_97 && c_16^0==c_16^post_97 && e_21^0==e_21^post_97 && o_19^0==o_19^post_97 && o_20^0==o_20^post_97 && rt_11^0==rt_11^post_97 && rv_17^0==rv_17^post_97 && st_14^0==st_14^post_97 && x_13^0==x_13^post_97 && y_15^0==y_15^post_97 ], cost: 1
     25: l18 -> l19 : c_16^0'=c_16^post_26, e_21^0'=e_21^post_26, nd_12^0'=nd_12^post_26, o_19^0'=o_19^post_26, o_20^0'=o_20^post_26, rt_11^0'=rt_11^post_26, rv_17^0'=rv_17^post_26, rv_18^0'=rv_18^post_26, st_14^0'=st_14^post_26, x_13^0'=x_13^post_26, y_15^0'=y_15^post_26, [ 1<=rv_17^0 && c_16^0==c_16^post_26 && e_21^0==e_21^post_26 && nd_12^0==nd_12^post_26 && o_19^0==o_19^post_26 && o_20^0==o_20^post_26 && rt_11^0==rt_11^post_26 && rv_17^0==rv_17^post_26 && rv_18^0==rv_18^post_26 && st_14^0==st_14^post_26 && x_13^0==x_13^post_26 && y_15^0==y_15^post_26 ], cost: 1
     26: l18 -> l19 : c_16^0'=c_16^post_27, e_21^0'=e_21^post_27, nd_12^0'=nd_12^post_27, o_19^0'=o_19^post_27, o_20^0'=o_20^post_27, rt_11^0'=rt_11^post_27, rv_17^0'=rv_17^post_27, rv_18^0'=rv_18^post_27, st_14^0'=st_14^post_27, x_13^0'=x_13^post_27, y_15^0'=y_15^post_27, [ 1+rv_17^0<=0 && c_16^0==c_16^post_27 && e_21^0==e_21^post_27 && nd_12^0==nd_12^post_27 && o_19^0==o_19^post_27 && o_20^0==o_20^post_27 && rt_11^0==rt_11^post_27 && rv_17^0==rv_17^post_27 && rv_18^0==rv_18^post_27 && st_14^0==st_14^post_27 && x_13^0==x_13^post_27 && y_15^0==y_15^post_27 ], cost: 1
     27: l19 -> l17 : c_16^0'=c_16^post_28, e_21^0'=e_21^post_28, nd_12^0'=nd_12^post_28, o_19^0'=o_19^post_28, o_20^0'=o_20^post_28, rt_11^0'=rt_11^post_28, rv_17^0'=rv_17^post_28, rv_18^0'=rv_18^post_28, st_14^0'=st_14^post_28, x_13^0'=x_13^post_28, y_15^0'=y_15^post_28, [ c_16^post_28==1 && o_19^post_28==x_13^0 && o_20^post_28==y_15^0 && e_21^0==e_21^post_28 && nd_12^0==nd_12^post_28 && rt_11^0==rt_11^post_28 && rv_17^0==rv_17^post_28 && rv_18^0==rv_18^post_28 && st_14^0==st_14^post_28 && x_13^0==x_13^post_28 && y_15^0==y_15^post_28 ], cost: 1
     55: l17 -> l12 : c_16^0'=c_16^post_56, e_21^0'=e_21^post_56, nd_12^0'=nd_12^post_56, o_19^0'=o_19^post_56, o_20^0'=o_20^post_56, rt_11^0'=rt_11^post_56, rv_17^0'=rv_17^post_56, rv_18^0'=rv_18^post_56, st_14^0'=st_14^post_56, x_13^0'=x_13^post_56, y_15^0'=y_15^post_56, [ nd_12^1_9==nd_12^1_9 && rv_18^post_56==nd_12^1_9 && nd_12^post_56==nd_12^post_56 && 0<=rv_18^post_56 && rv_18^post_56<=0 && x_13^post_56==-2+y_15^0 && y_15^post_56==1+x_13^post_56 && c_16^0==c_16^post_56 && e_21^0==e_21^post_56 && o_19^0==o_19^post_56 && o_20^0==o_20^post_56 && rt_11^0==rt_11^post_56 && rv_17^0==rv_17^post_56 && st_14^0==st_14^post_56 ], cost: 1
     56: l17 -> l36 : c_16^0'=c_16^post_57, e_21^0'=e_21^post_57, nd_12^0'=nd_12^post_57, o_19^0'=o_19^post_57, o_20^0'=o_20^post_57, rt_11^0'=rt_11^post_57, rv_17^0'=rv_17^post_57, rv_18^0'=rv_18^post_57, st_14^0'=st_14^post_57, x_13^0'=x_13^post_57, y_15^0'=y_15^post_57, [ nd_12^1_10==nd_12^1_10 && rv_18^post_57==nd_12^1_10 && nd_12^post_57==nd_12^post_57 && c_16^0==c_16^post_57 && e_21^0==e_21^post_57 && o_19^0==o_19^post_57 && o_20^0==o_20^post_57 && rt_11^0==rt_11^post_57 && rv_17^0==rv_17^post_57 && st_14^0==st_14^post_57 && x_13^0==x_13^post_57 && y_15^0==y_15^post_57 ], cost: 1
     60: l23 -> l12 : c_16^0'=c_16^post_61, e_21^0'=e_21^post_61, nd_12^0'=nd_12^post_61, o_19^0'=o_19^post_61, o_20^0'=o_20^post_61, rt_11^0'=rt_11^post_61, rv_17^0'=rv_17^post_61, rv_18^0'=rv_18^post_61, st_14^0'=st_14^post_61, x_13^0'=x_13^post_61, y_15^0'=y_15^post_61, [ nd_12^1_11==nd_12^1_11 && rv_18^post_61==nd_12^1_11 && nd_12^post_61==nd_12^post_61 && 0<=rv_18^post_61 && rv_18^post_61<=0 && x_13^post_61==-2+y_15^0 && y_15^post_61==1+x_13^post_61 && c_16^0==c_16^post_61 && e_21^0==e_21^post_61 && o_19^0==o_19^post_61 && o_20^0==o_20^post_61 && rt_11^0==rt_11^post_61 && rv_17^0==rv_17^post_61 && st_14^0==st_14^post_61 ], cost: 1
     61: l23 -> l38 : c_16^0'=c_16^post_62, e_21^0'=e_21^post_62, nd_12^0'=nd_12^post_62, o_19^0'=o_19^post_62, o_20^0'=o_20^post_62, rt_11^0'=rt_11^post_62, rv_17^0'=rv_17^post_62, rv_18^0'=rv_18^post_62, st_14^0'=st_14^post_62, x_13^0'=x_13^post_62, y_15^0'=y_15^post_62, [ nd_12^1_12==nd_12^1_12 && rv_18^post_62==nd_12^1_12 && nd_12^post_62==nd_12^post_62 && c_16^0==c_16^post_62 && e_21^0==e_21^post_62 && o_19^0==o_19^post_62 && o_20^0==o_20^post_62 && rt_11^0==rt_11^post_62 && rv_17^0==rv_17^post_62 && st_14^0==st_14^post_62 && x_13^0==x_13^post_62 && y_15^0==y_15^post_62 ], cost: 1
     65: l24 -> l12 : c_16^0'=c_16^post_66, e_21^0'=e_21^post_66, nd_12^0'=nd_12^post_66, o_19^0'=o_19^post_66, o_20^0'=o_20^post_66, rt_11^0'=rt_11^post_66, rv_17^0'=rv_17^post_66, rv_18^0'=rv_18^post_66, st_14^0'=st_14^post_66, x_13^0'=x_13^post_66, y_15^0'=y_15^post_66, [ nd_12^1_13==nd_12^1_13 && rv_18^post_66==nd_12^1_13 && nd_12^post_66==nd_12^post_66 && 0<=rv_18^post_66 && rv_18^post_66<=0 && x_13^post_66==-2+y_15^0 && y_15^post_66==1+x_13^post_66 && c_16^0==c_16^post_66 && e_21^0==e_21^post_66 && o_19^0==o_19^post_66 && o_20^0==o_20^post_66 && rt_11^0==rt_11^post_66 && rv_17^0==rv_17^post_66 && st_14^0==st_14^post_66 ], cost: 1
     66: l24 -> l40 : c_16^0'=c_16^post_67, e_21^0'=e_21^post_67, nd_12^0'=nd_12^post_67, o_19^0'=o_19^post_67, o_20^0'=o_20^post_67, rt_11^0'=rt_11^post_67, rv_17^0'=rv_17^post_67, rv_18^0'=rv_18^post_67, st_14^0'=st_14^post_67, x_13^0'=x_13^post_67, y_15^0'=y_15^post_67, [ nd_12^1_14==nd_12^1_14 && rv_18^post_67==nd_12^1_14 && nd_12^post_67==nd_12^post_67 && c_16^0==c_16^post_67 && e_21^0==e_21^post_67 && o_19^0==o_19^post_67 && o_20^0==o_20^post_67 && rt_11^0==rt_11^post_67 && rv_17^0==rv_17^post_67 && st_14^0==st_14^post_67 && x_13^0==x_13^post_67 && y_15^0==y_15^post_67 ], cost: 1
     85: l27 -> l12 : c_16^0'=c_16^post_86, e_21^0'=e_21^post_86, nd_12^0'=nd_12^post_86, o_19^0'=o_19^post_86, o_20^0'=o_20^post_86, rt_11^0'=rt_11^post_86, rv_17^0'=rv_17^post_86, rv_18^0'=rv_18^post_86, st_14^0'=st_14^post_86, x_13^0'=x_13^post_86, y_15^0'=y_15^post_86, [ nd_12^1_21==nd_12^1_21 && rv_18^post_86==nd_12^1_21 && nd_12^post_86==nd_12^post_86 && 0<=rv_18^post_86 && rv_18^post_86<=0 && x_13^post_86==-2+y_15^0 && y_15^post_86==1+x_13^post_86 && c_16^0==c_16^post_86 && e_21^0==e_21^post_86 && o_19^0==o_19^post_86 && o_20^0==o_20^post_86 && rt_11^0==rt_11^post_86 && rv_17^0==rv_17^post_86 && st_14^0==st_14^post_86 ], cost: 1
     86: l27 -> l49 : c_16^0'=c_16^post_87, e_21^0'=e_21^post_87, nd_12^0'=nd_12^post_87, o_19^0'=o_19^post_87, o_20^0'=o_20^post_87, rt_11^0'=rt_11^post_87, rv_17^0'=rv_17^post_87, rv_18^0'=rv_18^post_87, st_14^0'=st_14^post_87, x_13^0'=x_13^post_87, y_15^0'=y_15^post_87, [ nd_12^1_22==nd_12^1_22 && rv_18^post_87==nd_12^1_22 && nd_12^post_87==nd_12^post_87 && c_16^0==c_16^post_87 && e_21^0==e_21^post_87 && o_19^0==o_19^post_87 && o_20^0==o_20^post_87 && rt_11^0==rt_11^post_87 && rv_17^0==rv_17^post_87 && st_14^0==st_14^post_87 && x_13^0==x_13^post_87 && y_15^0==y_15^post_87 ], cost: 1
     90: l28 -> l12 : c_16^0'=c_16^post_91, e_21^0'=e_21^post_91, nd_12^0'=nd_12^post_91, o_19^0'=o_19^post_91, o_20^0'=o_20^post_91, rt_11^0'=rt_11^post_91, rv_17^0'=rv_17^post_91, rv_18^0'=rv_18^post_91, st_14^0'=st_14^post_91, x_13^0'=x_13^post_91, y_15^0'=y_15^post_91, [ nd_12^1_23==nd_12^1_23 && rv_18^post_91==nd_12^1_23 && nd_12^post_91==nd_12^post_91 && 0<=rv_18^post_91 && rv_18^post_91<=0 && x_13^post_91==-2+y_15^0 && y_15^post_91==1+x_13^post_91 && c_16^0==c_16^post_91 && e_21^0==e_21^post_91 && o_19^0==o_19^post_91 && o_20^0==o_20^post_91 && rt_11^0==rt_11^post_91 && rv_17^0==rv_17^post_91 && st_14^0==st_14^post_91 ], cost: 1
     91: l28 -> l51 : c_16^0'=c_16^post_92, e_21^0'=e_21^post_92, nd_12^0'=nd_12^post_92, o_19^0'=o_19^post_92, o_20^0'=o_20^post_92, rt_11^0'=rt_11^post_92, rv_17^0'=rv_17^post_92, rv_18^0'=rv_18^post_92, st_14^0'=st_14^post_92, x_13^0'=x_13^post_92, y_15^0'=y_15^post_92, [ nd_12^1_24==nd_12^1_24 && rv_18^post_92==nd_12^1_24 && nd_12^post_92==nd_12^post_92 && c_16^0==c_16^post_92 && e_21^0==e_21^post_92 && o_19^0==o_19^post_92 && o_20^0==o_20^post_92 && rt_11^0==rt_11^post_92 && rv_17^0==rv_17^post_92 && st_14^0==st_14^post_92 && x_13^0==x_13^post_92 && y_15^0==y_15^post_92 ], cost: 1
     57: l36 -> l37 : c_16^0'=c_16^post_58, e_21^0'=e_21^post_58, nd_12^0'=nd_12^post_58, o_19^0'=o_19^post_58, o_20^0'=o_20^post_58, rt_11^0'=rt_11^post_58, rv_17^0'=rv_17^post_58, rv_18^0'=rv_18^post_58, st_14^0'=st_14^post_58, x_13^0'=x_13^post_58, y_15^0'=y_15^post_58, [ 1<=rv_18^0 && c_16^0==c_16^post_58 && e_21^0==e_21^post_58 && nd_12^0==nd_12^post_58 && o_19^0==o_19^post_58 && o_20^0==o_20^post_58 && rt_11^0==rt_11^post_58 && rv_17^0==rv_17^post_58 && rv_18^0==rv_18^post_58 && st_14^0==st_14^post_58 && x_13^0==x_13^post_58 && y_15^0==y_15^post_58 ], cost: 1
     58: l36 -> l37 : c_16^0'=c_16^post_59, e_21^0'=e_21^post_59, nd_12^0'=nd_12^post_59, o_19^0'=o_19^post_59, o_20^0'=o_20^post_59, rt_11^0'=rt_11^post_59, rv_17^0'=rv_17^post_59, rv_18^0'=rv_18^post_59, st_14^0'=st_14^post_59, x_13^0'=x_13^post_59, y_15^0'=y_15^post_59, [ 1+rv_18^0<=0 && c_16^0==c_16^post_59 && e_21^0==e_21^post_59 && nd_12^0==nd_12^post_59 && o_19^0==o_19^post_59 && o_20^0==o_20^post_59 && rt_11^0==rt_11^post_59 && rv_17^0==rv_17^post_59 && rv_18^0==rv_18^post_59 && st_14^0==st_14^post_59 && x_13^0==x_13^post_59 && y_15^0==y_15^post_59 ], cost: 1
     59: l37 -> l6 : c_16^0'=c_16^post_60, e_21^0'=e_21^post_60, nd_12^0'=nd_12^post_60, o_19^0'=o_19^post_60, o_20^0'=o_20^post_60, rt_11^0'=rt_11^post_60, rv_17^0'=rv_17^post_60, rv_18^0'=rv_18^post_60, st_14^0'=st_14^post_60, x_13^0'=x_13^post_60, y_15^0'=y_15^post_60, [ x_13^post_60==-1+x_13^0 && y_15^post_60==x_13^post_60 && c_16^0==c_16^post_60 && e_21^0==e_21^post_60 && nd_12^0==nd_12^post_60 && o_19^0==o_19^post_60 && o_20^0==o_20^post_60 && rt_11^0==rt_11^post_60 && rv_17^0==rv_17^post_60 && rv_18^0==rv_18^post_60 && st_14^0==st_14^post_60 ], cost: 1
     62: l38 -> l39 : c_16^0'=c_16^post_63, e_21^0'=e_21^post_63, nd_12^0'=nd_12^post_63, o_19^0'=o_19^post_63, o_20^0'=o_20^post_63, rt_11^0'=rt_11^post_63, rv_17^0'=rv_17^post_63, rv_18^0'=rv_18^post_63, st_14^0'=st_14^post_63, x_13^0'=x_13^post_63, y_15^0'=y_15^post_63, [ 1<=rv_18^0 && c_16^0==c_16^post_63 && e_21^0==e_21^post_63 && nd_12^0==nd_12^post_63 && o_19^0==o_19^post_63 && o_20^0==o_20^post_63 && rt_11^0==rt_11^post_63 && rv_17^0==rv_17^post_63 && rv_18^0==rv_18^post_63 && st_14^0==st_14^post_63 && x_13^0==x_13^post_63 && y_15^0==y_15^post_63 ], cost: 1
     63: l38 -> l39 : c_16^0'=c_16^post_64, e_21^0'=e_21^post_64, nd_12^0'=nd_12^post_64, o_19^0'=o_19^post_64, o_20^0'=o_20^post_64, rt_11^0'=rt_11^post_64, rv_17^0'=rv_17^post_64, rv_18^0'=rv_18^post_64, st_14^0'=st_14^post_64, x_13^0'=x_13^post_64, y_15^0'=y_15^post_64, [ 1+rv_18^0<=0 && c_16^0==c_16^post_64 && e_21^0==e_21^post_64 && nd_12^0==nd_12^post_64 && o_19^0==o_19^post_64 && o_20^0==o_20^post_64 && rt_11^0==rt_11^post_64 && rv_17^0==rv_17^post_64 && rv_18^0==rv_18^post_64 && st_14^0==st_14^post_64 && x_13^0==x_13^post_64 && y_15^0==y_15^post_64 ], cost: 1
     64: l39 -> l6 : c_16^0'=c_16^post_65, e_21^0'=e_21^post_65, nd_12^0'=nd_12^post_65, o_19^0'=o_19^post_65, o_20^0'=o_20^post_65, rt_11^0'=rt_11^post_65, rv_17^0'=rv_17^post_65, rv_18^0'=rv_18^post_65, st_14^0'=st_14^post_65, x_13^0'=x_13^post_65, y_15^0'=y_15^post_65, [ x_13^post_65==-1+x_13^0 && y_15^post_65==x_13^post_65 && c_16^0==c_16^post_65 && e_21^0==e_21^post_65 && nd_12^0==nd_12^post_65 && o_19^0==o_19^post_65 && o_20^0==o_20^post_65 && rt_11^0==rt_11^post_65 && rv_17^0==rv_17^post_65 && rv_18^0==rv_18^post_65 && st_14^0==st_14^post_65 ], cost: 1
     67: l40 -> l41 : c_16^0'=c_16^post_68, e_21^0'=e_21^post_68, nd_12^0'=nd_12^post_68, o_19^0'=o_19^post_68, o_20^0'=o_20^post_68, rt_11^0'=rt_11^post_68, rv_17^0'=rv_17^post_68, rv_18^0'=rv_18^post_68, st_14^0'=st_14^post_68, x_13^0'=x_13^post_68, y_15^0'=y_15^post_68, [ 1<=rv_18^0 && c_16^0==c_16^post_68 && e_21^0==e_21^post_68 && nd_12^0==nd_12^post_68 && o_19^0==o_19^post_68 && o_20^0==o_20^post_68 && rt_11^0==rt_11^post_68 && rv_17^0==rv_17^post_68 && rv_18^0==rv_18^post_68 && st_14^0==st_14^post_68 && x_13^0==x_13^post_68 && y_15^0==y_15^post_68 ], cost: 1
     68: l40 -> l41 : c_16^0'=c_16^post_69, e_21^0'=e_21^post_69, nd_12^0'=nd_12^post_69, o_19^0'=o_19^post_69, o_20^0'=o_20^post_69, rt_11^0'=rt_11^post_69, rv_17^0'=rv_17^post_69, rv_18^0'=rv_18^post_69, st_14^0'=st_14^post_69, x_13^0'=x_13^post_69, y_15^0'=y_15^post_69, [ 1+rv_18^0<=0 && c_16^0==c_16^post_69 && e_21^0==e_21^post_69 && nd_12^0==nd_12^post_69 && o_19^0==o_19^post_69 && o_20^0==o_20^post_69 && rt_11^0==rt_11^post_69 && rv_17^0==rv_17^post_69 && rv_18^0==rv_18^post_69 && st_14^0==st_14^post_69 && x_13^0==x_13^post_69 && y_15^0==y_15^post_69 ], cost: 1
     69: l41 -> l6 : c_16^0'=c_16^post_70, e_21^0'=e_21^post_70, nd_12^0'=nd_12^post_70, o_19^0'=o_19^post_70, o_20^0'=o_20^post_70, rt_11^0'=rt_11^post_70, rv_17^0'=rv_17^post_70, rv_18^0'=rv_18^post_70, st_14^0'=st_14^post_70, x_13^0'=x_13^post_70, y_15^0'=y_15^post_70, [ x_13^post_70==-1+x_13^0 && y_15^post_70==x_13^post_70 && c_16^0==c_16^post_70 && e_21^0==e_21^post_70 && nd_12^0==nd_12^post_70 && o_19^0==o_19^post_70 && o_20^0==o_20^post_70 && rt_11^0==rt_11^post_70 && rv_17^0==rv_17^post_70 && rv_18^0==rv_18^post_70 && st_14^0==st_14^post_70 ], cost: 1
     87: l49 -> l50 : c_16^0'=c_16^post_88, e_21^0'=e_21^post_88, nd_12^0'=nd_12^post_88, o_19^0'=o_19^post_88, o_20^0'=o_20^post_88, rt_11^0'=rt_11^post_88, rv_17^0'=rv_17^post_88, rv_18^0'=rv_18^post_88, st_14^0'=st_14^post_88, x_13^0'=x_13^post_88, y_15^0'=y_15^post_88, [ 1<=rv_18^0 && c_16^0==c_16^post_88 && e_21^0==e_21^post_88 && nd_12^0==nd_12^post_88 && o_19^0==o_19^post_88 && o_20^0==o_20^post_88 && rt_11^0==rt_11^post_88 && rv_17^0==rv_17^post_88 && rv_18^0==rv_18^post_88 && st_14^0==st_14^post_88 && x_13^0==x_13^post_88 && y_15^0==y_15^post_88 ], cost: 1
     88: l49 -> l50 : c_16^0'=c_16^post_89, e_21^0'=e_21^post_89, nd_12^0'=nd_12^post_89, o_19^0'=o_19^post_89, o_20^0'=o_20^post_89, rt_11^0'=rt_11^post_89, rv_17^0'=rv_17^post_89, rv_18^0'=rv_18^post_89, st_14^0'=st_14^post_89, x_13^0'=x_13^post_89, y_15^0'=y_15^post_89, [ 1+rv_18^0<=0 && c_16^0==c_16^post_89 && e_21^0==e_21^post_89 && nd_12^0==nd_12^post_89 && o_19^0==o_19^post_89 && o_20^0==o_20^post_89 && rt_11^0==rt_11^post_89 && rv_17^0==rv_17^post_89 && rv_18^0==rv_18^post_89 && st_14^0==st_14^post_89 && x_13^0==x_13^post_89 && y_15^0==y_15^post_89 ], cost: 1
     89: l50 -> l6 : c_16^0'=c_16^post_90, e_21^0'=e_21^post_90, nd_12^0'=nd_12^post_90, o_19^0'=o_19^post_90, o_20^0'=o_20^post_90, rt_11^0'=rt_11^post_90, rv_17^0'=rv_17^post_90, rv_18^0'=rv_18^post_90, st_14^0'=st_14^post_90, x_13^0'=x_13^post_90, y_15^0'=y_15^post_90, [ x_13^post_90==-1+x_13^0 && y_15^post_90==x_13^post_90 && c_16^0==c_16^post_90 && e_21^0==e_21^post_90 && nd_12^0==nd_12^post_90 && o_19^0==o_19^post_90 && o_20^0==o_20^post_90 && rt_11^0==rt_11^post_90 && rv_17^0==rv_17^post_90 && rv_18^0==rv_18^post_90 && st_14^0==st_14^post_90 ], cost: 1
     92: l51 -> l52 : c_16^0'=c_16^post_93, e_21^0'=e_21^post_93, nd_12^0'=nd_12^post_93, o_19^0'=o_19^post_93, o_20^0'=o_20^post_93, rt_11^0'=rt_11^post_93, rv_17^0'=rv_17^post_93, rv_18^0'=rv_18^post_93, st_14^0'=st_14^post_93, x_13^0'=x_13^post_93, y_15^0'=y_15^post_93, [ 1<=rv_18^0 && c_16^0==c_16^post_93 && e_21^0==e_21^post_93 && nd_12^0==nd_12^post_93 && o_19^0==o_19^post_93 && o_20^0==o_20^post_93 && rt_11^0==rt_11^post_93 && rv_17^0==rv_17^post_93 && rv_18^0==rv_18^post_93 && st_14^0==st_14^post_93 && x_13^0==x_13^post_93 && y_15^0==y_15^post_93 ], cost: 1
     93: l51 -> l52 : c_16^0'=c_16^post_94, e_21^0'=e_21^post_94, nd_12^0'=nd_12^post_94, o_19^0'=o_19^post_94, o_20^0'=o_20^post_94, rt_11^0'=rt_11^post_94, rv_17^0'=rv_17^post_94, rv_18^0'=rv_18^post_94, st_14^0'=st_14^post_94, x_13^0'=x_13^post_94, y_15^0'=y_15^post_94, [ 1+rv_18^0<=0 && c_16^0==c_16^post_94 && e_21^0==e_21^post_94 && nd_12^0==nd_12^post_94 && o_19^0==o_19^post_94 && o_20^0==o_20^post_94 && rt_11^0==rt_11^post_94 && rv_17^0==rv_17^post_94 && rv_18^0==rv_18^post_94 && st_14^0==st_14^post_94 && x_13^0==x_13^post_94 && y_15^0==y_15^post_94 ], cost: 1
     94: l52 -> l6 : c_16^0'=c_16^post_95, e_21^0'=e_21^post_95, nd_12^0'=nd_12^post_95, o_19^0'=o_19^post_95, o_20^0'=o_20^post_95, rt_11^0'=rt_11^post_95, rv_17^0'=rv_17^post_95, rv_18^0'=rv_18^post_95, st_14^0'=st_14^post_95, x_13^0'=x_13^post_95, y_15^0'=y_15^post_95, [ x_13^post_95==-1+x_13^0 && y_15^post_95==x_13^post_95 && c_16^0==c_16^post_95 && e_21^0==e_21^post_95 && nd_12^0==nd_12^post_95 && o_19^0==o_19^post_95 && o_20^0==o_20^post_95 && rt_11^0==rt_11^post_95 && rv_17^0==rv_17^post_95 && rv_18^0==rv_18^post_95 && st_14^0==st_14^post_95 ], cost: 1
     97: l53 -> l54 : c_16^0'=c_16^post_98, e_21^0'=e_21^post_98, nd_12^0'=nd_12^post_98, o_19^0'=o_19^post_98, o_20^0'=o_20^post_98, rt_11^0'=rt_11^post_98, rv_17^0'=rv_17^post_98, rv_18^0'=rv_18^post_98, st_14^0'=st_14^post_98, x_13^0'=x_13^post_98, y_15^0'=y_15^post_98, [ 1<=rv_18^0 && c_16^0==c_16^post_98 && e_21^0==e_21^post_98 && nd_12^0==nd_12^post_98 && o_19^0==o_19^post_98 && o_20^0==o_20^post_98 && rt_11^0==rt_11^post_98 && rv_17^0==rv_17^post_98 && rv_18^0==rv_18^post_98 && st_14^0==st_14^post_98 && x_13^0==x_13^post_98 && y_15^0==y_15^post_98 ], cost: 1
     98: l53 -> l54 : c_16^0'=c_16^post_99, e_21^0'=e_21^post_99, nd_12^0'=nd_12^post_99, o_19^0'=o_19^post_99, o_20^0'=o_20^post_99, rt_11^0'=rt_11^post_99, rv_17^0'=rv_17^post_99, rv_18^0'=rv_18^post_99, st_14^0'=st_14^post_99, x_13^0'=x_13^post_99, y_15^0'=y_15^post_99, [ 1+rv_18^0<=0 && c_16^0==c_16^post_99 && e_21^0==e_21^post_99 && nd_12^0==nd_12^post_99 && o_19^0==o_19^post_99 && o_20^0==o_20^post_99 && rt_11^0==rt_11^post_99 && rv_17^0==rv_17^post_99 && rv_18^0==rv_18^post_99 && st_14^0==st_14^post_99 && x_13^0==x_13^post_99 && y_15^0==y_15^post_99 ], cost: 1
     99: l54 -> l1 : c_16^0'=c_16^post_100, e_21^0'=e_21^post_100, nd_12^0'=nd_12^post_100, o_19^0'=o_19^post_100, o_20^0'=o_20^post_100, rt_11^0'=rt_11^post_100, rv_17^0'=rv_17^post_100, rv_18^0'=rv_18^post_100, st_14^0'=st_14^post_100, x_13^0'=x_13^post_100, y_15^0'=y_15^post_100, [ x_13^post_100==-1+x_13^0 && y_15^post_100==x_13^post_100 && c_16^0==c_16^post_100 && e_21^0==e_21^post_100 && nd_12^0==nd_12^post_100 && o_19^0==o_19^post_100 && o_20^0==o_20^post_100 && rt_11^0==rt_11^post_100 && rv_17^0==rv_17^post_100 && rv_18^0==rv_18^post_100 && st_14^0==st_14^post_100 ], cost: 1
    100: l55 -> l0 : c_16^0'=c_16^post_101, e_21^0'=e_21^post_101, nd_12^0'=nd_12^post_101, o_19^0'=o_19^post_101, o_20^0'=o_20^post_101, rt_11^0'=rt_11^post_101, rv_17^0'=rv_17^post_101, rv_18^0'=rv_18^post_101, st_14^0'=st_14^post_101, x_13^0'=x_13^post_101, y_15^0'=y_15^post_101, [ c_16^0==c_16^post_101 && e_21^0==e_21^post_101 && nd_12^0==nd_12^post_101 && o_19^0==o_19^post_101 && o_20^0==o_20^post_101 && rt_11^0==rt_11^post_101 && rv_17^0==rv_17^post_101 && rv_18^0==rv_18^post_101 && st_14^0==st_14^post_101 && x_13^0==x_13^post_101 && y_15^0==y_15^post_101 ], cost: 1

Removed unreachable and leaf rules:
   Start location: l55
      0: l0 -> l1 : c_16^0'=c_16^post_1, e_21^0'=e_21^post_1, nd_12^0'=nd_12^post_1, o_19^0'=o_19^post_1, o_20^0'=o_20^post_1, rt_11^0'=rt_11^post_1, rv_17^0'=rv_17^post_1, rv_18^0'=rv_18^post_1, st_14^0'=st_14^post_1, x_13^0'=x_13^post_1, y_15^0'=y_15^post_1, [ e_21^post_1==0 && c_16^post_1==0 && nd_12^0==nd_12^post_1 && o_19^0==o_19^post_1 && o_20^0==o_20^post_1 && rt_11^0==rt_11^post_1 && rv_17^0==rv_17^post_1 && rv_18^0==rv_18^post_1 && st_14^0==st_14^post_1 && x_13^0==x_13^post_1 && y_15^0==y_15^post_1 ], cost: 1
     21: l1 -> l16 : c_16^0'=c_16^post_22, e_21^0'=e_21^post_22, nd_12^0'=nd_12^post_22, o_19^0'=o_19^post_22, o_20^0'=o_20^post_22, rt_11^0'=rt_11^post_22, rv_17^0'=rv_17^post_22, rv_18^0'=rv_18^post_22, st_14^0'=st_14^post_22, x_13^0'=x_13^post_22, y_15^0'=y_15^post_22, [ 1<=x_13^0 && 1<=y_15^0 && 1<=x_13^0+y_15^0 && 0<=c_16^0 && c_16^0<=0 && nd_12^1_1==nd_12^1_1 && rv_17^post_22==nd_12^1_1 && nd_12^post_22==nd_12^post_22 && 0<=rv_17^post_22 && rv_17^post_22<=0 && c_16^0==c_16^post_22 && e_21^0==e_21^post_22 && o_19^0==o_19^post_22 && o_20^0==o_20^post_22 && rt_11^0==rt_11^post_22 && rv_18^0==rv_18^post_22 && st_14^0==st_14^post_22 && x_13^0==x_13^post_22 && y_15^0==y_15^post_22 ], cost: 1
     24: l1 -> l18 : c_16^0'=c_16^post_25, e_21^0'=e_21^post_25, nd_12^0'=nd_12^post_25, o_19^0'=o_19^post_25, o_20^0'=o_20^post_25, rt_11^0'=rt_11^post_25, rv_17^0'=rv_17^post_25, rv_18^0'=rv_18^post_25, st_14^0'=st_14^post_25, x_13^0'=x_13^post_25, y_15^0'=y_15^post_25, [ 1<=x_13^0 && 1<=y_15^0 && 1<=x_13^0+y_15^0 && 0<=c_16^0 && c_16^0<=0 && nd_12^1_2==nd_12^1_2 && rv_17^post_25==nd_12^1_2 && nd_12^post_25==nd_12^post_25 && c_16^0==c_16^post_25 && e_21^0==e_21^post_25 && o_19^0==o_19^post_25 && o_20^0==o_20^post_25 && rt_11^0==rt_11^post_25 && rv_18^0==rv_18^post_25 && st_14^0==st_14^post_25 && x_13^0==x_13^post_25 && y_15^0==y_15^post_25 ], cost: 1
      6: l6 -> l8 : c_16^0'=c_16^post_7, e_21^0'=e_21^post_7, nd_12^0'=nd_12^post_7, o_19^0'=o_19^post_7, o_20^0'=o_20^post_7, rt_11^0'=rt_11^post_7, rv_17^0'=rv_17^post_7, rv_18^0'=rv_18^post_7, st_14^0'=st_14^post_7, x_13^0'=x_13^post_7, y_15^0'=y_15^post_7, [ 1<=x_13^0 && 1<=y_15^0 && 1<=x_13^0+y_15^0 && c_16^0==c_16^post_7 && e_21^0==e_21^post_7 && nd_12^0==nd_12^post_7 && o_19^0==o_19^post_7 && o_20^0==o_20^post_7 && rt_11^0==rt_11^post_7 && rv_17^0==rv_17^post_7 && rv_18^0==rv_18^post_7 && st_14^0==st_14^post_7 && x_13^0==x_13^post_7 && y_15^0==y_15^post_7 ], cost: 1
      7: l8 -> l7 : c_16^0'=c_16^post_8, e_21^0'=e_21^post_8, nd_12^0'=nd_12^post_8, o_19^0'=o_19^post_8, o_20^0'=o_20^post_8, rt_11^0'=rt_11^post_8, rv_17^0'=rv_17^post_8, rv_18^0'=rv_18^post_8, st_14^0'=st_14^post_8, x_13^0'=x_13^post_8, y_15^0'=y_15^post_8, [ 1<=c_16^0 && c_16^0==c_16^post_8 && e_21^0==e_21^post_8 && nd_12^0==nd_12^post_8 && o_19^0==o_19^post_8 && o_20^0==o_20^post_8 && rt_11^0==rt_11^post_8 && rv_17^0==rv_17^post_8 && rv_18^0==rv_18^post_8 && st_14^0==st_14^post_8 && x_13^0==x_13^post_8 && y_15^0==y_15^post_8 ], cost: 1
      8: l8 -> l7 : c_16^0'=c_16^post_9, e_21^0'=e_21^post_9, nd_12^0'=nd_12^post_9, o_19^0'=o_19^post_9, o_20^0'=o_20^post_9, rt_11^0'=rt_11^post_9, rv_17^0'=rv_17^post_9, rv_18^0'=rv_18^post_9, st_14^0'=st_14^post_9, x_13^0'=x_13^post_9, y_15^0'=y_15^post_9, [ 1+c_16^0<=0 && c_16^0==c_16^post_9 && e_21^0==e_21^post_9 && nd_12^0==nd_12^post_9 && o_19^0==o_19^post_9 && o_20^0==o_20^post_9 && rt_11^0==rt_11^post_9 && rv_17^0==rv_17^post_9 && rv_18^0==rv_18^post_9 && st_14^0==st_14^post_9 && x_13^0==x_13^post_9 && y_15^0==y_15^post_9 ], cost: 1
     31: l7 -> l23 : c_16^0'=c_16^post_32, e_21^0'=e_21^post_32, nd_12^0'=nd_12^post_32, o_19^0'=o_19^post_32, o_20^0'=o_20^post_32, rt_11^0'=rt_11^post_32, rv_17^0'=rv_17^post_32, rv_18^0'=rv_18^post_32, st_14^0'=st_14^post_32, x_13^0'=x_13^post_32, y_15^0'=y_15^post_32, [ 1<=c_16^0 && c_16^0<=1 && 1+x_13^0<=o_19^0 && c_16^0==c_16^post_32 && e_21^0==e_21^post_32 && nd_12^0==nd_12^post_32 && o_19^0==o_19^post_32 && o_20^0==o_20^post_32 && rt_11^0==rt_11^post_32 && rv_17^0==rv_17^post_32 && rv_18^0==rv_18^post_32 && st_14^0==st_14^post_32 && x_13^0==x_13^post_32 && y_15^0==y_15^post_32 ], cost: 1
     32: l7 -> l24 : c_16^0'=c_16^post_33, e_21^0'=e_21^post_33, nd_12^0'=nd_12^post_33, o_19^0'=o_19^post_33, o_20^0'=o_20^post_33, rt_11^0'=rt_11^post_33, rv_17^0'=rv_17^post_33, rv_18^0'=rv_18^post_33, st_14^0'=st_14^post_33, x_13^0'=x_13^post_33, y_15^0'=y_15^post_33, [ 1<=c_16^0 && c_16^0<=1 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && c_16^0==c_16^post_33 && e_21^0==e_21^post_33 && nd_12^0==nd_12^post_33 && o_19^0==o_19^post_33 && o_20^0==o_20^post_33 && rt_11^0==rt_11^post_33 && rv_17^0==rv_17^post_33 && rv_18^0==rv_18^post_33 && st_14^0==st_14^post_33 && x_13^0==x_13^post_33 && y_15^0==y_15^post_33 ], cost: 1
     16: l12 -> l14 : c_16^0'=c_16^post_17, e_21^0'=e_21^post_17, nd_12^0'=nd_12^post_17, o_19^0'=o_19^post_17, o_20^0'=o_20^post_17, rt_11^0'=rt_11^post_17, rv_17^0'=rv_17^post_17, rv_18^0'=rv_18^post_17, st_14^0'=st_14^post_17, x_13^0'=x_13^post_17, y_15^0'=y_15^post_17, [ 1<=x_13^0 && 1<=y_15^0 && 1<=x_13^0+y_15^0 && c_16^0==c_16^post_17 && e_21^0==e_21^post_17 && nd_12^0==nd_12^post_17 && o_19^0==o_19^post_17 && o_20^0==o_20^post_17 && rt_11^0==rt_11^post_17 && rv_17^0==rv_17^post_17 && rv_18^0==rv_18^post_17 && st_14^0==st_14^post_17 && x_13^0==x_13^post_17 && y_15^0==y_15^post_17 ], cost: 1
     17: l14 -> l13 : c_16^0'=c_16^post_18, e_21^0'=e_21^post_18, nd_12^0'=nd_12^post_18, o_19^0'=o_19^post_18, o_20^0'=o_20^post_18, rt_11^0'=rt_11^post_18, rv_17^0'=rv_17^post_18, rv_18^0'=rv_18^post_18, st_14^0'=st_14^post_18, x_13^0'=x_13^post_18, y_15^0'=y_15^post_18, [ 1<=c_16^0 && c_16^0==c_16^post_18 && e_21^0==e_21^post_18 && nd_12^0==nd_12^post_18 && o_19^0==o_19^post_18 && o_20^0==o_20^post_18 && rt_11^0==rt_11^post_18 && rv_17^0==rv_17^post_18 && rv_18^0==rv_18^post_18 && st_14^0==st_14^post_18 && x_13^0==x_13^post_18 && y_15^0==y_15^post_18 ], cost: 1
     18: l14 -> l13 : c_16^0'=c_16^post_19, e_21^0'=e_21^post_19, nd_12^0'=nd_12^post_19, o_19^0'=o_19^post_19, o_20^0'=o_20^post_19, rt_11^0'=rt_11^post_19, rv_17^0'=rv_17^post_19, rv_18^0'=rv_18^post_19, st_14^0'=st_14^post_19, x_13^0'=x_13^post_19, y_15^0'=y_15^post_19, [ 1+c_16^0<=0 && c_16^0==c_16^post_19 && e_21^0==e_21^post_19 && nd_12^0==nd_12^post_19 && o_19^0==o_19^post_19 && o_20^0==o_20^post_19 && rt_11^0==rt_11^post_19 && rv_17^0==rv_17^post_19 && rv_18^0==rv_18^post_19 && st_14^0==st_14^post_19 && x_13^0==x_13^post_19 && y_15^0==y_15^post_19 ], cost: 1
     37: l13 -> l27 : c_16^0'=c_16^post_38, e_21^0'=e_21^post_38, nd_12^0'=nd_12^post_38, o_19^0'=o_19^post_38, o_20^0'=o_20^post_38, rt_11^0'=rt_11^post_38, rv_17^0'=rv_17^post_38, rv_18^0'=rv_18^post_38, st_14^0'=st_14^post_38, x_13^0'=x_13^post_38, y_15^0'=y_15^post_38, [ 1<=c_16^0 && c_16^0<=1 && 1+x_13^0<=o_19^0 && c_16^0==c_16^post_38 && e_21^0==e_21^post_38 && nd_12^0==nd_12^post_38 && o_19^0==o_19^post_38 && o_20^0==o_20^post_38 && rt_11^0==rt_11^post_38 && rv_17^0==rv_17^post_38 && rv_18^0==rv_18^post_38 && st_14^0==st_14^post_38 && x_13^0==x_13^post_38 && y_15^0==y_15^post_38 ], cost: 1
     38: l13 -> l28 : c_16^0'=c_16^post_39, e_21^0'=e_21^post_39, nd_12^0'=nd_12^post_39, o_19^0'=o_19^post_39, o_20^0'=o_20^post_39, rt_11^0'=rt_11^post_39, rv_17^0'=rv_17^post_39, rv_18^0'=rv_18^post_39, st_14^0'=st_14^post_39, x_13^0'=x_13^post_39, y_15^0'=y_15^post_39, [ 1<=c_16^0 && c_16^0<=1 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && c_16^0==c_16^post_39 && e_21^0==e_21^post_39 && nd_12^0==nd_12^post_39 && o_19^0==o_19^post_39 && o_20^0==o_20^post_39 && rt_11^0==rt_11^post_39 && rv_17^0==rv_17^post_39 && rv_18^0==rv_18^post_39 && st_14^0==st_14^post_39 && x_13^0==x_13^post_39 && y_15^0==y_15^post_39 ], cost: 1
     22: l16 -> l15 : c_16^0'=c_16^post_23, e_21^0'=e_21^post_23, nd_12^0'=nd_12^post_23, o_19^0'=o_19^post_23, o_20^0'=o_20^post_23, rt_11^0'=rt_11^post_23, rv_17^0'=rv_17^post_23, rv_18^0'=rv_18^post_23, st_14^0'=st_14^post_23, x_13^0'=x_13^post_23, y_15^0'=y_15^post_23, [ 2<=c_16^0 && c_16^0==c_16^post_23 && e_21^0==e_21^post_23 && nd_12^0==nd_12^post_23 && o_19^0==o_19^post_23 && o_20^0==o_20^post_23 && rt_11^0==rt_11^post_23 && rv_17^0==rv_17^post_23 && rv_18^0==rv_18^post_23 && st_14^0==st_14^post_23 && x_13^0==x_13^post_23 && y_15^0==y_15^post_23 ], cost: 1
     23: l16 -> l15 : c_16^0'=c_16^post_24, e_21^0'=e_21^post_24, nd_12^0'=nd_12^post_24, o_19^0'=o_19^post_24, o_20^0'=o_20^post_24, rt_11^0'=rt_11^post_24, rv_17^0'=rv_17^post_24, rv_18^0'=rv_18^post_24, st_14^0'=st_14^post_24, x_13^0'=x_13^post_24, y_15^0'=y_15^post_24, [ 1+c_16^0<=1 && c_16^0==c_16^post_24 && e_21^0==e_21^post_24 && nd_12^0==nd_12^post_24 && o_19^0==o_19^post_24 && o_20^0==o_20^post_24 && rt_11^0==rt_11^post_24 && rv_17^0==rv_17^post_24 && rv_18^0==rv_18^post_24 && st_14^0==st_14^post_24 && x_13^0==x_13^post_24 && y_15^0==y_15^post_24 ], cost: 1
     95: l15 -> l1 : c_16^0'=c_16^post_96, e_21^0'=e_21^post_96, nd_12^0'=nd_12^post_96, o_19^0'=o_19^post_96, o_20^0'=o_20^post_96, rt_11^0'=rt_11^post_96, rv_17^0'=rv_17^post_96, rv_18^0'=rv_18^post_96, st_14^0'=st_14^post_96, x_13^0'=x_13^post_96, y_15^0'=y_15^post_96, [ nd_12^1_25==nd_12^1_25 && rv_18^post_96==nd_12^1_25 && nd_12^post_96==nd_12^post_96 && 0<=rv_18^post_96 && rv_18^post_96<=0 && x_13^post_96==-2+y_15^0 && y_15^post_96==1+x_13^post_96 && c_16^0==c_16^post_96 && e_21^0==e_21^post_96 && o_19^0==o_19^post_96 && o_20^0==o_20^post_96 && rt_11^0==rt_11^post_96 && rv_17^0==rv_17^post_96 && st_14^0==st_14^post_96 ], cost: 1
     96: l15 -> l53 : c_16^0'=c_16^post_97, e_21^0'=e_21^post_97, nd_12^0'=nd_12^post_97, o_19^0'=o_19^post_97, o_20^0'=o_20^post_97, rt_11^0'=rt_11^post_97, rv_17^0'=rv_17^post_97, rv_18^0'=rv_18^post_97, st_14^0'=st_14^post_97, x_13^0'=x_13^post_97, y_15^0'=y_15^post_97, [ nd_12^1_26==nd_12^1_26 && rv_18^post_97==nd_12^1_26 && nd_12^post_97==nd_12^post_97 && c_16^0==c_16^post_97 && e_21^0==e_21^post_97 && o_19^0==o_19^post_97 && o_20^0==o_20^post_97 && rt_11^0==rt_11^post_97 && rv_17^0==rv_17^post_97 && st_14^0==st_14^post_97 && x_13^0==x_13^post_97 && y_15^0==y_15^post_97 ], cost: 1
     25: l18 -> l19 : c_16^0'=c_16^post_26, e_21^0'=e_21^post_26, nd_12^0'=nd_12^post_26, o_19^0'=o_19^post_26, o_20^0'=o_20^post_26, rt_11^0'=rt_11^post_26, rv_17^0'=rv_17^post_26, rv_18^0'=rv_18^post_26, st_14^0'=st_14^post_26, x_13^0'=x_13^post_26, y_15^0'=y_15^post_26, [ 1<=rv_17^0 && c_16^0==c_16^post_26 && e_21^0==e_21^post_26 && nd_12^0==nd_12^post_26 && o_19^0==o_19^post_26 && o_20^0==o_20^post_26 && rt_11^0==rt_11^post_26 && rv_17^0==rv_17^post_26 && rv_18^0==rv_18^post_26 && st_14^0==st_14^post_26 && x_13^0==x_13^post_26 && y_15^0==y_15^post_26 ], cost: 1
     26: l18 -> l19 : c_16^0'=c_16^post_27, e_21^0'=e_21^post_27, nd_12^0'=nd_12^post_27, o_19^0'=o_19^post_27, o_20^0'=o_20^post_27, rt_11^0'=rt_11^post_27, rv_17^0'=rv_17^post_27, rv_18^0'=rv_18^post_27, st_14^0'=st_14^post_27, x_13^0'=x_13^post_27, y_15^0'=y_15^post_27, [ 1+rv_17^0<=0 && c_16^0==c_16^post_27 && e_21^0==e_21^post_27 && nd_12^0==nd_12^post_27 && o_19^0==o_19^post_27 && o_20^0==o_20^post_27 && rt_11^0==rt_11^post_27 && rv_17^0==rv_17^post_27 && rv_18^0==rv_18^post_27 && st_14^0==st_14^post_27 && x_13^0==x_13^post_27 && y_15^0==y_15^post_27 ], cost: 1
     27: l19 -> l17 : c_16^0'=c_16^post_28, e_21^0'=e_21^post_28, nd_12^0'=nd_12^post_28, o_19^0'=o_19^post_28, o_20^0'=o_20^post_28, rt_11^0'=rt_11^post_28, rv_17^0'=rv_17^post_28, rv_18^0'=rv_18^post_28, st_14^0'=st_14^post_28, x_13^0'=x_13^post_28, y_15^0'=y_15^post_28, [ c_16^post_28==1 && o_19^post_28==x_13^0 && o_20^post_28==y_15^0 && e_21^0==e_21^post_28 && nd_12^0==nd_12^post_28 && rt_11^0==rt_11^post_28 && rv_17^0==rv_17^post_28 && rv_18^0==rv_18^post_28 && st_14^0==st_14^post_28 && x_13^0==x_13^post_28 && y_15^0==y_15^post_28 ], cost: 1
     55: l17 -> l12 : c_16^0'=c_16^post_56, e_21^0'=e_21^post_56, nd_12^0'=nd_12^post_56, o_19^0'=o_19^post_56, o_20^0'=o_20^post_56, rt_11^0'=rt_11^post_56, rv_17^0'=rv_17^post_56, rv_18^0'=rv_18^post_56, st_14^0'=st_14^post_56, x_13^0'=x_13^post_56, y_15^0'=y_15^post_56, [ nd_12^1_9==nd_12^1_9 && rv_18^post_56==nd_12^1_9 && nd_12^post_56==nd_12^post_56 && 0<=rv_18^post_56 && rv_18^post_56<=0 && x_13^post_56==-2+y_15^0 && y_15^post_56==1+x_13^post_56 && c_16^0==c_16^post_56 && e_21^0==e_21^post_56 && o_19^0==o_19^post_56 && o_20^0==o_20^post_56 && rt_11^0==rt_11^post_56 && rv_17^0==rv_17^post_56 && st_14^0==st_14^post_56 ], cost: 1
     56: l17 -> l36 : c_16^0'=c_16^post_57, e_21^0'=e_21^post_57, nd_12^0'=nd_12^post_57, o_19^0'=o_19^post_57, o_20^0'=o_20^post_57, rt_11^0'=rt_11^post_57, rv_17^0'=rv_17^post_57, rv_18^0'=rv_18^post_57, st_14^0'=st_14^post_57, x_13^0'=x_13^post_57, y_15^0'=y_15^post_57, [ nd_12^1_10==nd_12^1_10 && rv_18^post_57==nd_12^1_10 && nd_12^post_57==nd_12^post_57 && c_16^0==c_16^post_57 && e_21^0==e_21^post_57 && o_19^0==o_19^post_57 && o_20^0==o_20^post_57 && rt_11^0==rt_11^post_57 && rv_17^0==rv_17^post_57 && st_14^0==st_14^post_57 && x_13^0==x_13^post_57 && y_15^0==y_15^post_57 ], cost: 1
     60: l23 -> l12 : c_16^0'=c_16^post_61, e_21^0'=e_21^post_61, nd_12^0'=nd_12^post_61, o_19^0'=o_19^post_61, o_20^0'=o_20^post_61, rt_11^0'=rt_11^post_61, rv_17^0'=rv_17^post_61, rv_18^0'=rv_18^post_61, st_14^0'=st_14^post_61, x_13^0'=x_13^post_61, y_15^0'=y_15^post_61, [ nd_12^1_11==nd_12^1_11 && rv_18^post_61==nd_12^1_11 && nd_12^post_61==nd_12^post_61 && 0<=rv_18^post_61 && rv_18^post_61<=0 && x_13^post_61==-2+y_15^0 && y_15^post_61==1+x_13^post_61 && c_16^0==c_16^post_61 && e_21^0==e_21^post_61 && o_19^0==o_19^post_61 && o_20^0==o_20^post_61 && rt_11^0==rt_11^post_61 && rv_17^0==rv_17^post_61 && st_14^0==st_14^post_61 ], cost: 1
     61: l23 -> l38 : c_16^0'=c_16^post_62, e_21^0'=e_21^post_62, nd_12^0'=nd_12^post_62, o_19^0'=o_19^post_62, o_20^0'=o_20^post_62, rt_11^0'=rt_11^post_62, rv_17^0'=rv_17^post_62, rv_18^0'=rv_18^post_62, st_14^0'=st_14^post_62, x_13^0'=x_13^post_62, y_15^0'=y_15^post_62, [ nd_12^1_12==nd_12^1_12 && rv_18^post_62==nd_12^1_12 && nd_12^post_62==nd_12^post_62 && c_16^0==c_16^post_62 && e_21^0==e_21^post_62 && o_19^0==o_19^post_62 && o_20^0==o_20^post_62 && rt_11^0==rt_11^post_62 && rv_17^0==rv_17^post_62 && st_14^0==st_14^post_62 && x_13^0==x_13^post_62 && y_15^0==y_15^post_62 ], cost: 1
     65: l24 -> l12 : c_16^0'=c_16^post_66, e_21^0'=e_21^post_66, nd_12^0'=nd_12^post_66, o_19^0'=o_19^post_66, o_20^0'=o_20^post_66, rt_11^0'=rt_11^post_66, rv_17^0'=rv_17^post_66, rv_18^0'=rv_18^post_66, st_14^0'=st_14^post_66, x_13^0'=x_13^post_66, y_15^0'=y_15^post_66, [ nd_12^1_13==nd_12^1_13 && rv_18^post_66==nd_12^1_13 && nd_12^post_66==nd_12^post_66 && 0<=rv_18^post_66 && rv_18^post_66<=0 && x_13^post_66==-2+y_15^0 && y_15^post_66==1+x_13^post_66 && c_16^0==c_16^post_66 && e_21^0==e_21^post_66 && o_19^0==o_19^post_66 && o_20^0==o_20^post_66 && rt_11^0==rt_11^post_66 && rv_17^0==rv_17^post_66 && st_14^0==st_14^post_66 ], cost: 1
     66: l24 -> l40 : c_16^0'=c_16^post_67, e_21^0'=e_21^post_67, nd_12^0'=nd_12^post_67, o_19^0'=o_19^post_67, o_20^0'=o_20^post_67, rt_11^0'=rt_11^post_67, rv_17^0'=rv_17^post_67, rv_18^0'=rv_18^post_67, st_14^0'=st_14^post_67, x_13^0'=x_13^post_67, y_15^0'=y_15^post_67, [ nd_12^1_14==nd_12^1_14 && rv_18^post_67==nd_12^1_14 && nd_12^post_67==nd_12^post_67 && c_16^0==c_16^post_67 && e_21^0==e_21^post_67 && o_19^0==o_19^post_67 && o_20^0==o_20^post_67 && rt_11^0==rt_11^post_67 && rv_17^0==rv_17^post_67 && st_14^0==st_14^post_67 && x_13^0==x_13^post_67 && y_15^0==y_15^post_67 ], cost: 1
     85: l27 -> l12 : c_16^0'=c_16^post_86, e_21^0'=e_21^post_86, nd_12^0'=nd_12^post_86, o_19^0'=o_19^post_86, o_20^0'=o_20^post_86, rt_11^0'=rt_11^post_86, rv_17^0'=rv_17^post_86, rv_18^0'=rv_18^post_86, st_14^0'=st_14^post_86, x_13^0'=x_13^post_86, y_15^0'=y_15^post_86, [ nd_12^1_21==nd_12^1_21 && rv_18^post_86==nd_12^1_21 && nd_12^post_86==nd_12^post_86 && 0<=rv_18^post_86 && rv_18^post_86<=0 && x_13^post_86==-2+y_15^0 && y_15^post_86==1+x_13^post_86 && c_16^0==c_16^post_86 && e_21^0==e_21^post_86 && o_19^0==o_19^post_86 && o_20^0==o_20^post_86 && rt_11^0==rt_11^post_86 && rv_17^0==rv_17^post_86 && st_14^0==st_14^post_86 ], cost: 1
     86: l27 -> l49 : c_16^0'=c_16^post_87, e_21^0'=e_21^post_87, nd_12^0'=nd_12^post_87, o_19^0'=o_19^post_87, o_20^0'=o_20^post_87, rt_11^0'=rt_11^post_87, rv_17^0'=rv_17^post_87, rv_18^0'=rv_18^post_87, st_14^0'=st_14^post_87, x_13^0'=x_13^post_87, y_15^0'=y_15^post_87, [ nd_12^1_22==nd_12^1_22 && rv_18^post_87==nd_12^1_22 && nd_12^post_87==nd_12^post_87 && c_16^0==c_16^post_87 && e_21^0==e_21^post_87 && o_19^0==o_19^post_87 && o_20^0==o_20^post_87 && rt_11^0==rt_11^post_87 && rv_17^0==rv_17^post_87 && st_14^0==st_14^post_87 && x_13^0==x_13^post_87 && y_15^0==y_15^post_87 ], cost: 1
     90: l28 -> l12 : c_16^0'=c_16^post_91, e_21^0'=e_21^post_91, nd_12^0'=nd_12^post_91, o_19^0'=o_19^post_91, o_20^0'=o_20^post_91, rt_11^0'=rt_11^post_91, rv_17^0'=rv_17^post_91, rv_18^0'=rv_18^post_91, st_14^0'=st_14^post_91, x_13^0'=x_13^post_91, y_15^0'=y_15^post_91, [ nd_12^1_23==nd_12^1_23 && rv_18^post_91==nd_12^1_23 && nd_12^post_91==nd_12^post_91 && 0<=rv_18^post_91 && rv_18^post_91<=0 && x_13^post_91==-2+y_15^0 && y_15^post_91==1+x_13^post_91 && c_16^0==c_16^post_91 && e_21^0==e_21^post_91 && o_19^0==o_19^post_91 && o_20^0==o_20^post_91 && rt_11^0==rt_11^post_91 && rv_17^0==rv_17^post_91 && st_14^0==st_14^post_91 ], cost: 1
     91: l28 -> l51 : c_16^0'=c_16^post_92, e_21^0'=e_21^post_92, nd_12^0'=nd_12^post_92, o_19^0'=o_19^post_92, o_20^0'=o_20^post_92, rt_11^0'=rt_11^post_92, rv_17^0'=rv_17^post_92, rv_18^0'=rv_18^post_92, st_14^0'=st_14^post_92, x_13^0'=x_13^post_92, y_15^0'=y_15^post_92, [ nd_12^1_24==nd_12^1_24 && rv_18^post_92==nd_12^1_24 && nd_12^post_92==nd_12^post_92 && c_16^0==c_16^post_92 && e_21^0==e_21^post_92 && o_19^0==o_19^post_92 && o_20^0==o_20^post_92 && rt_11^0==rt_11^post_92 && rv_17^0==rv_17^post_92 && st_14^0==st_14^post_92 && x_13^0==x_13^post_92 && y_15^0==y_15^post_92 ], cost: 1
     57: l36 -> l37 : c_16^0'=c_16^post_58, e_21^0'=e_21^post_58, nd_12^0'=nd_12^post_58, o_19^0'=o_19^post_58, o_20^0'=o_20^post_58, rt_11^0'=rt_11^post_58, rv_17^0'=rv_17^post_58, rv_18^0'=rv_18^post_58, st_14^0'=st_14^post_58, x_13^0'=x_13^post_58, y_15^0'=y_15^post_58, [ 1<=rv_18^0 && c_16^0==c_16^post_58 && e_21^0==e_21^post_58 && nd_12^0==nd_12^post_58 && o_19^0==o_19^post_58 && o_20^0==o_20^post_58 && rt_11^0==rt_11^post_58 && rv_17^0==rv_17^post_58 && rv_18^0==rv_18^post_58 && st_14^0==st_14^post_58 && x_13^0==x_13^post_58 && y_15^0==y_15^post_58 ], cost: 1
     58: l36 -> l37 : c_16^0'=c_16^post_59, e_21^0'=e_21^post_59, nd_12^0'=nd_12^post_59, o_19^0'=o_19^post_59, o_20^0'=o_20^post_59, rt_11^0'=rt_11^post_59, rv_17^0'=rv_17^post_59, rv_18^0'=rv_18^post_59, st_14^0'=st_14^post_59, x_13^0'=x_13^post_59, y_15^0'=y_15^post_59, [ 1+rv_18^0<=0 && c_16^0==c_16^post_59 && e_21^0==e_21^post_59 && nd_12^0==nd_12^post_59 && o_19^0==o_19^post_59 && o_20^0==o_20^post_59 && rt_11^0==rt_11^post_59 && rv_17^0==rv_17^post_59 && rv_18^0==rv_18^post_59 && st_14^0==st_14^post_59 && x_13^0==x_13^post_59 && y_15^0==y_15^post_59 ], cost: 1
     59: l37 -> l6 : c_16^0'=c_16^post_60, e_21^0'=e_21^post_60, nd_12^0'=nd_12^post_60, o_19^0'=o_19^post_60, o_20^0'=o_20^post_60, rt_11^0'=rt_11^post_60, rv_17^0'=rv_17^post_60, rv_18^0'=rv_18^post_60, st_14^0'=st_14^post_60, x_13^0'=x_13^post_60, y_15^0'=y_15^post_60, [ x_13^post_60==-1+x_13^0 && y_15^post_60==x_13^post_60 && c_16^0==c_16^post_60 && e_21^0==e_21^post_60 && nd_12^0==nd_12^post_60 && o_19^0==o_19^post_60 && o_20^0==o_20^post_60 && rt_11^0==rt_11^post_60 && rv_17^0==rv_17^post_60 && rv_18^0==rv_18^post_60 && st_14^0==st_14^post_60 ], cost: 1
     62: l38 -> l39 : c_16^0'=c_16^post_63, e_21^0'=e_21^post_63, nd_12^0'=nd_12^post_63, o_19^0'=o_19^post_63, o_20^0'=o_20^post_63, rt_11^0'=rt_11^post_63, rv_17^0'=rv_17^post_63, rv_18^0'=rv_18^post_63, st_14^0'=st_14^post_63, x_13^0'=x_13^post_63, y_15^0'=y_15^post_63, [ 1<=rv_18^0 && c_16^0==c_16^post_63 && e_21^0==e_21^post_63 && nd_12^0==nd_12^post_63 && o_19^0==o_19^post_63 && o_20^0==o_20^post_63 && rt_11^0==rt_11^post_63 && rv_17^0==rv_17^post_63 && rv_18^0==rv_18^post_63 && st_14^0==st_14^post_63 && x_13^0==x_13^post_63 && y_15^0==y_15^post_63 ], cost: 1
     63: l38 -> l39 : c_16^0'=c_16^post_64, e_21^0'=e_21^post_64, nd_12^0'=nd_12^post_64, o_19^0'=o_19^post_64, o_20^0'=o_20^post_64, rt_11^0'=rt_11^post_64, rv_17^0'=rv_17^post_64, rv_18^0'=rv_18^post_64, st_14^0'=st_14^post_64, x_13^0'=x_13^post_64, y_15^0'=y_15^post_64, [ 1+rv_18^0<=0 && c_16^0==c_16^post_64 && e_21^0==e_21^post_64 && nd_12^0==nd_12^post_64 && o_19^0==o_19^post_64 && o_20^0==o_20^post_64 && rt_11^0==rt_11^post_64 && rv_17^0==rv_17^post_64 && rv_18^0==rv_18^post_64 && st_14^0==st_14^post_64 && x_13^0==x_13^post_64 && y_15^0==y_15^post_64 ], cost: 1
     64: l39 -> l6 : c_16^0'=c_16^post_65, e_21^0'=e_21^post_65, nd_12^0'=nd_12^post_65, o_19^0'=o_19^post_65, o_20^0'=o_20^post_65, rt_11^0'=rt_11^post_65, rv_17^0'=rv_17^post_65, rv_18^0'=rv_18^post_65, st_14^0'=st_14^post_65, x_13^0'=x_13^post_65, y_15^0'=y_15^post_65, [ x_13^post_65==-1+x_13^0 && y_15^post_65==x_13^post_65 && c_16^0==c_16^post_65 && e_21^0==e_21^post_65 && nd_12^0==nd_12^post_65 && o_19^0==o_19^post_65 && o_20^0==o_20^post_65 && rt_11^0==rt_11^post_65 && rv_17^0==rv_17^post_65 && rv_18^0==rv_18^post_65 && st_14^0==st_14^post_65 ], cost: 1
     67: l40 -> l41 : c_16^0'=c_16^post_68, e_21^0'=e_21^post_68, nd_12^0'=nd_12^post_68, o_19^0'=o_19^post_68, o_20^0'=o_20^post_68, rt_11^0'=rt_11^post_68, rv_17^0'=rv_17^post_68, rv_18^0'=rv_18^post_68, st_14^0'=st_14^post_68, x_13^0'=x_13^post_68, y_15^0'=y_15^post_68, [ 1<=rv_18^0 && c_16^0==c_16^post_68 && e_21^0==e_21^post_68 && nd_12^0==nd_12^post_68 && o_19^0==o_19^post_68 && o_20^0==o_20^post_68 && rt_11^0==rt_11^post_68 && rv_17^0==rv_17^post_68 && rv_18^0==rv_18^post_68 && st_14^0==st_14^post_68 && x_13^0==x_13^post_68 && y_15^0==y_15^post_68 ], cost: 1
     68: l40 -> l41 : c_16^0'=c_16^post_69, e_21^0'=e_21^post_69, nd_12^0'=nd_12^post_69, o_19^0'=o_19^post_69, o_20^0'=o_20^post_69, rt_11^0'=rt_11^post_69, rv_17^0'=rv_17^post_69, rv_18^0'=rv_18^post_69, st_14^0'=st_14^post_69, x_13^0'=x_13^post_69, y_15^0'=y_15^post_69, [ 1+rv_18^0<=0 && c_16^0==c_16^post_69 && e_21^0==e_21^post_69 && nd_12^0==nd_12^post_69 && o_19^0==o_19^post_69 && o_20^0==o_20^post_69 && rt_11^0==rt_11^post_69 && rv_17^0==rv_17^post_69 && rv_18^0==rv_18^post_69 && st_14^0==st_14^post_69 && x_13^0==x_13^post_69 && y_15^0==y_15^post_69 ], cost: 1
     69: l41 -> l6 : c_16^0'=c_16^post_70, e_21^0'=e_21^post_70, nd_12^0'=nd_12^post_70, o_19^0'=o_19^post_70, o_20^0'=o_20^post_70, rt_11^0'=rt_11^post_70, rv_17^0'=rv_17^post_70, rv_18^0'=rv_18^post_70, st_14^0'=st_14^post_70, x_13^0'=x_13^post_70, y_15^0'=y_15^post_70, [ x_13^post_70==-1+x_13^0 && y_15^post_70==x_13^post_70 && c_16^0==c_16^post_70 && e_21^0==e_21^post_70 && nd_12^0==nd_12^post_70 && o_19^0==o_19^post_70 && o_20^0==o_20^post_70 && rt_11^0==rt_11^post_70 && rv_17^0==rv_17^post_70 && rv_18^0==rv_18^post_70 && st_14^0==st_14^post_70 ], cost: 1
     87: l49 -> l50 : c_16^0'=c_16^post_88, e_21^0'=e_21^post_88, nd_12^0'=nd_12^post_88, o_19^0'=o_19^post_88, o_20^0'=o_20^post_88, rt_11^0'=rt_11^post_88, rv_17^0'=rv_17^post_88, rv_18^0'=rv_18^post_88, st_14^0'=st_14^post_88, x_13^0'=x_13^post_88, y_15^0'=y_15^post_88, [ 1<=rv_18^0 && c_16^0==c_16^post_88 && e_21^0==e_21^post_88 && nd_12^0==nd_12^post_88 && o_19^0==o_19^post_88 && o_20^0==o_20^post_88 && rt_11^0==rt_11^post_88 && rv_17^0==rv_17^post_88 && rv_18^0==rv_18^post_88 && st_14^0==st_14^post_88 && x_13^0==x_13^post_88 && y_15^0==y_15^post_88 ], cost: 1
     88: l49 -> l50 : c_16^0'=c_16^post_89, e_21^0'=e_21^post_89, nd_12^0'=nd_12^post_89, o_19^0'=o_19^post_89, o_20^0'=o_20^post_89, rt_11^0'=rt_11^post_89, rv_17^0'=rv_17^post_89, rv_18^0'=rv_18^post_89, st_14^0'=st_14^post_89, x_13^0'=x_13^post_89, y_15^0'=y_15^post_89, [ 1+rv_18^0<=0 && c_16^0==c_16^post_89 && e_21^0==e_21^post_89 && nd_12^0==nd_12^post_89 && o_19^0==o_19^post_89 && o_20^0==o_20^post_89 && rt_11^0==rt_11^post_89 && rv_17^0==rv_17^post_89 && rv_18^0==rv_18^post_89 && st_14^0==st_14^post_89 && x_13^0==x_13^post_89 && y_15^0==y_15^post_89 ], cost: 1
     89: l50 -> l6 : c_16^0'=c_16^post_90, e_21^0'=e_21^post_90, nd_12^0'=nd_12^post_90, o_19^0'=o_19^post_90, o_20^0'=o_20^post_90, rt_11^0'=rt_11^post_90, rv_17^0'=rv_17^post_90, rv_18^0'=rv_18^post_90, st_14^0'=st_14^post_90, x_13^0'=x_13^post_90, y_15^0'=y_15^post_90, [ x_13^post_90==-1+x_13^0 && y_15^post_90==x_13^post_90 && c_16^0==c_16^post_90 && e_21^0==e_21^post_90 && nd_12^0==nd_12^post_90 && o_19^0==o_19^post_90 && o_20^0==o_20^post_90 && rt_11^0==rt_11^post_90 && rv_17^0==rv_17^post_90 && rv_18^0==rv_18^post_90 && st_14^0==st_14^post_90 ], cost: 1
     92: l51 -> l52 : c_16^0'=c_16^post_93, e_21^0'=e_21^post_93, nd_12^0'=nd_12^post_93, o_19^0'=o_19^post_93, o_20^0'=o_20^post_93, rt_11^0'=rt_11^post_93, rv_17^0'=rv_17^post_93, rv_18^0'=rv_18^post_93, st_14^0'=st_14^post_93, x_13^0'=x_13^post_93, y_15^0'=y_15^post_93, [ 1<=rv_18^0 && c_16^0==c_16^post_93 && e_21^0==e_21^post_93 && nd_12^0==nd_12^post_93 && o_19^0==o_19^post_93 && o_20^0==o_20^post_93 && rt_11^0==rt_11^post_93 && rv_17^0==rv_17^post_93 && rv_18^0==rv_18^post_93 && st_14^0==st_14^post_93 && x_13^0==x_13^post_93 && y_15^0==y_15^post_93 ], cost: 1
     93: l51 -> l52 : c_16^0'=c_16^post_94, e_21^0'=e_21^post_94, nd_12^0'=nd_12^post_94, o_19^0'=o_19^post_94, o_20^0'=o_20^post_94, rt_11^0'=rt_11^post_94, rv_17^0'=rv_17^post_94, rv_18^0'=rv_18^post_94, st_14^0'=st_14^post_94, x_13^0'=x_13^post_94, y_15^0'=y_15^post_94, [ 1+rv_18^0<=0 && c_16^0==c_16^post_94 && e_21^0==e_21^post_94 && nd_12^0==nd_12^post_94 && o_19^0==o_19^post_94 && o_20^0==o_20^post_94 && rt_11^0==rt_11^post_94 && rv_17^0==rv_17^post_94 && rv_18^0==rv_18^post_94 && st_14^0==st_14^post_94 && x_13^0==x_13^post_94 && y_15^0==y_15^post_94 ], cost: 1
     94: l52 -> l6 : c_16^0'=c_16^post_95, e_21^0'=e_21^post_95, nd_12^0'=nd_12^post_95, o_19^0'=o_19^post_95, o_20^0'=o_20^post_95, rt_11^0'=rt_11^post_95, rv_17^0'=rv_17^post_95, rv_18^0'=rv_18^post_95, st_14^0'=st_14^post_95, x_13^0'=x_13^post_95, y_15^0'=y_15^post_95, [ x_13^post_95==-1+x_13^0 && y_15^post_95==x_13^post_95 && c_16^0==c_16^post_95 && e_21^0==e_21^post_95 && nd_12^0==nd_12^post_95 && o_19^0==o_19^post_95 && o_20^0==o_20^post_95 && rt_11^0==rt_11^post_95 && rv_17^0==rv_17^post_95 && rv_18^0==rv_18^post_95 && st_14^0==st_14^post_95 ], cost: 1
     97: l53 -> l54 : c_16^0'=c_16^post_98, e_21^0'=e_21^post_98, nd_12^0'=nd_12^post_98, o_19^0'=o_19^post_98, o_20^0'=o_20^post_98, rt_11^0'=rt_11^post_98, rv_17^0'=rv_17^post_98, rv_18^0'=rv_18^post_98, st_14^0'=st_14^post_98, x_13^0'=x_13^post_98, y_15^0'=y_15^post_98, [ 1<=rv_18^0 && c_16^0==c_16^post_98 && e_21^0==e_21^post_98 && nd_12^0==nd_12^post_98 && o_19^0==o_19^post_98 && o_20^0==o_20^post_98 && rt_11^0==rt_11^post_98 && rv_17^0==rv_17^post_98 && rv_18^0==rv_18^post_98 && st_14^0==st_14^post_98 && x_13^0==x_13^post_98 && y_15^0==y_15^post_98 ], cost: 1
     98: l53 -> l54 : c_16^0'=c_16^post_99, e_21^0'=e_21^post_99, nd_12^0'=nd_12^post_99, o_19^0'=o_19^post_99, o_20^0'=o_20^post_99, rt_11^0'=rt_11^post_99, rv_17^0'=rv_17^post_99, rv_18^0'=rv_18^post_99, st_14^0'=st_14^post_99, x_13^0'=x_13^post_99, y_15^0'=y_15^post_99, [ 1+rv_18^0<=0 && c_16^0==c_16^post_99 && e_21^0==e_21^post_99 && nd_12^0==nd_12^post_99 && o_19^0==o_19^post_99 && o_20^0==o_20^post_99 && rt_11^0==rt_11^post_99 && rv_17^0==rv_17^post_99 && rv_18^0==rv_18^post_99 && st_14^0==st_14^post_99 && x_13^0==x_13^post_99 && y_15^0==y_15^post_99 ], cost: 1
     99: l54 -> l1 : c_16^0'=c_16^post_100, e_21^0'=e_21^post_100, nd_12^0'=nd_12^post_100, o_19^0'=o_19^post_100, o_20^0'=o_20^post_100, rt_11^0'=rt_11^post_100, rv_17^0'=rv_17^post_100, rv_18^0'=rv_18^post_100, st_14^0'=st_14^post_100, x_13^0'=x_13^post_100, y_15^0'=y_15^post_100, [ x_13^post_100==-1+x_13^0 && y_15^post_100==x_13^post_100 && c_16^0==c_16^post_100 && e_21^0==e_21^post_100 && nd_12^0==nd_12^post_100 && o_19^0==o_19^post_100 && o_20^0==o_20^post_100 && rt_11^0==rt_11^post_100 && rv_17^0==rv_17^post_100 && rv_18^0==rv_18^post_100 && st_14^0==st_14^post_100 ], cost: 1
    100: l55 -> l0 : c_16^0'=c_16^post_101, e_21^0'=e_21^post_101, nd_12^0'=nd_12^post_101, o_19^0'=o_19^post_101, o_20^0'=o_20^post_101, rt_11^0'=rt_11^post_101, rv_17^0'=rv_17^post_101, rv_18^0'=rv_18^post_101, st_14^0'=st_14^post_101, x_13^0'=x_13^post_101, y_15^0'=y_15^post_101, [ c_16^0==c_16^post_101 && e_21^0==e_21^post_101 && nd_12^0==nd_12^post_101 && o_19^0==o_19^post_101 && o_20^0==o_20^post_101 && rt_11^0==rt_11^post_101 && rv_17^0==rv_17^post_101 && rv_18^0==rv_18^post_101 && st_14^0==st_14^post_101 && x_13^0==x_13^post_101 && y_15^0==y_15^post_101 ], cost: 1

Simplified all rules, resulting in:
   Start location: l55
      0: l0 -> l1 : c_16^0'=0, e_21^0'=0, [], cost: 1
     21: l1 -> l16 : nd_12^0'=nd_12^post_22, rv_17^0'=0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 ], cost: 1
     24: l1 -> l18 : nd_12^0'=nd_12^post_25, rv_17^0'=nd_12^1_2, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 ], cost: 1
      6: l6 -> l8 : [ 1<=x_13^0 && 1<=y_15^0 ], cost: 1
      7: l8 -> l7 : [ 1<=c_16^0 ], cost: 1
      8: l8 -> l7 : [ 1+c_16^0<=0 ], cost: 1
     31: l7 -> l23 : [ 1-c_16^0==0 && 1+x_13^0<=o_19^0 ], cost: 1
     32: l7 -> l24 : [ 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 ], cost: 1
     16: l12 -> l14 : [ 1<=x_13^0 && 1<=y_15^0 ], cost: 1
     17: l14 -> l13 : [ 1<=c_16^0 ], cost: 1
     18: l14 -> l13 : [ 1+c_16^0<=0 ], cost: 1
     37: l13 -> l27 : [ 1-c_16^0==0 && 1+x_13^0<=o_19^0 ], cost: 1
     38: l13 -> l28 : [ 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 ], cost: 1
     22: l16 -> l15 : [ 2<=c_16^0 ], cost: 1
     23: l16 -> l15 : [ 1+c_16^0<=1 ], cost: 1
     95: l15 -> l1 : nd_12^0'=nd_12^post_96, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [], cost: 1
     96: l15 -> l53 : nd_12^0'=nd_12^post_97, rv_18^0'=nd_12^1_26, [], cost: 1
     25: l18 -> l19 : [ 1<=rv_17^0 ], cost: 1
     26: l18 -> l19 : [ 1+rv_17^0<=0 ], cost: 1
     27: l19 -> l17 : c_16^0'=1, o_19^0'=x_13^0, o_20^0'=y_15^0, [], cost: 1
     55: l17 -> l12 : nd_12^0'=nd_12^post_56, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [], cost: 1
     56: l17 -> l36 : nd_12^0'=nd_12^post_57, rv_18^0'=nd_12^1_10, [], cost: 1
     60: l23 -> l12 : nd_12^0'=nd_12^post_61, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [], cost: 1
     61: l23 -> l38 : nd_12^0'=nd_12^post_62, rv_18^0'=nd_12^1_12, [], cost: 1
     65: l24 -> l12 : nd_12^0'=nd_12^post_66, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [], cost: 1
     66: l24 -> l40 : nd_12^0'=nd_12^post_67, rv_18^0'=nd_12^1_14, [], cost: 1
     85: l27 -> l12 : nd_12^0'=nd_12^post_86, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [], cost: 1
     86: l27 -> l49 : nd_12^0'=nd_12^post_87, rv_18^0'=nd_12^1_22, [], cost: 1
     90: l28 -> l12 : nd_12^0'=nd_12^post_91, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [], cost: 1
     91: l28 -> l51 : nd_12^0'=nd_12^post_92, rv_18^0'=nd_12^1_24, [], cost: 1
     57: l36 -> l37 : [ 1<=rv_18^0 ], cost: 1
     58: l36 -> l37 : [ 1+rv_18^0<=0 ], cost: 1
     59: l37 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [], cost: 1
     62: l38 -> l39 : [ 1<=rv_18^0 ], cost: 1
     63: l38 -> l39 : [ 1+rv_18^0<=0 ], cost: 1
     64: l39 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [], cost: 1
     67: l40 -> l41 : [ 1<=rv_18^0 ], cost: 1
     68: l40 -> l41 : [ 1+rv_18^0<=0 ], cost: 1
     69: l41 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [], cost: 1
     87: l49 -> l50 : [ 1<=rv_18^0 ], cost: 1
     88: l49 -> l50 : [ 1+rv_18^0<=0 ], cost: 1
     89: l50 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [], cost: 1
     92: l51 -> l52 : [ 1<=rv_18^0 ], cost: 1
     93: l51 -> l52 : [ 1+rv_18^0<=0 ], cost: 1
     94: l52 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [], cost: 1
     97: l53 -> l54 : [ 1<=rv_18^0 ], cost: 1
     98: l53 -> l54 : [ 1+rv_18^0<=0 ], cost: 1
     99: l54 -> l1 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [], cost: 1
    100: l55 -> l0 : [], cost: 1

### Simplification by acceleration and chaining ###

Eliminated locations (on linear paths):
   Start location: l55
     21: l1 -> l16 : nd_12^0'=nd_12^post_22, rv_17^0'=0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 ], cost: 1
     24: l1 -> l18 : nd_12^0'=nd_12^post_25, rv_17^0'=nd_12^1_2, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 ], cost: 1
      6: l6 -> l8 : [ 1<=x_13^0 && 1<=y_15^0 ], cost: 1
      7: l8 -> l7 : [ 1<=c_16^0 ], cost: 1
      8: l8 -> l7 : [ 1+c_16^0<=0 ], cost: 1
     31: l7 -> l23 : [ 1-c_16^0==0 && 1+x_13^0<=o_19^0 ], cost: 1
     32: l7 -> l24 : [ 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 ], cost: 1
     16: l12 -> l14 : [ 1<=x_13^0 && 1<=y_15^0 ], cost: 1
     17: l14 -> l13 : [ 1<=c_16^0 ], cost: 1
     18: l14 -> l13 : [ 1+c_16^0<=0 ], cost: 1
     37: l13 -> l27 : [ 1-c_16^0==0 && 1+x_13^0<=o_19^0 ], cost: 1
     38: l13 -> l28 : [ 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 ], cost: 1
     22: l16 -> l15 : [ 2<=c_16^0 ], cost: 1
     23: l16 -> l15 : [ 1+c_16^0<=1 ], cost: 1
     95: l15 -> l1 : nd_12^0'=nd_12^post_96, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [], cost: 1
     96: l15 -> l53 : nd_12^0'=nd_12^post_97, rv_18^0'=nd_12^1_26, [], cost: 1
     25: l18 -> l19 : [ 1<=rv_17^0 ], cost: 1
     26: l18 -> l19 : [ 1+rv_17^0<=0 ], cost: 1
     27: l19 -> l17 : c_16^0'=1, o_19^0'=x_13^0, o_20^0'=y_15^0, [], cost: 1
     55: l17 -> l12 : nd_12^0'=nd_12^post_56, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [], cost: 1
     56: l17 -> l36 : nd_12^0'=nd_12^post_57, rv_18^0'=nd_12^1_10, [], cost: 1
     60: l23 -> l12 : nd_12^0'=nd_12^post_61, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [], cost: 1
     61: l23 -> l38 : nd_12^0'=nd_12^post_62, rv_18^0'=nd_12^1_12, [], cost: 1
     65: l24 -> l12 : nd_12^0'=nd_12^post_66, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [], cost: 1
     66: l24 -> l40 : nd_12^0'=nd_12^post_67, rv_18^0'=nd_12^1_14, [], cost: 1
     85: l27 -> l12 : nd_12^0'=nd_12^post_86, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [], cost: 1
     86: l27 -> l49 : nd_12^0'=nd_12^post_87, rv_18^0'=nd_12^1_22, [], cost: 1
     90: l28 -> l12 : nd_12^0'=nd_12^post_91, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [], cost: 1
     91: l28 -> l51 : nd_12^0'=nd_12^post_92, rv_18^0'=nd_12^1_24, [], cost: 1
     57: l36 -> l37 : [ 1<=rv_18^0 ], cost: 1
     58: l36 -> l37 : [ 1+rv_18^0<=0 ], cost: 1
     59: l37 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [], cost: 1
     62: l38 -> l39 : [ 1<=rv_18^0 ], cost: 1
     63: l38 -> l39 : [ 1+rv_18^0<=0 ], cost: 1
     64: l39 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [], cost: 1
     67: l40 -> l41 : [ 1<=rv_18^0 ], cost: 1
     68: l40 -> l41 : [ 1+rv_18^0<=0 ], cost: 1
     69: l41 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [], cost: 1
     87: l49 -> l50 : [ 1<=rv_18^0 ], cost: 1
     88: l49 -> l50 : [ 1+rv_18^0<=0 ], cost: 1
     89: l50 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [], cost: 1
     92: l51 -> l52 : [ 1<=rv_18^0 ], cost: 1
     93: l51 -> l52 : [ 1+rv_18^0<=0 ], cost: 1
     94: l52 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [], cost: 1
     97: l53 -> l54 : [ 1<=rv_18^0 ], cost: 1
     98: l53 -> l54 : [ 1+rv_18^0<=0 ], cost: 1
     99: l54 -> l1 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [], cost: 1
    101: l55 -> l1 : c_16^0'=0, e_21^0'=0, [], cost: 2

Eliminated locations (on tree-shaped paths):
   Start location: l55
    102: l1 -> l15 : nd_12^0'=nd_12^post_22, rv_17^0'=0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 ], cost: 2
    103: l1 -> l19 : nd_12^0'=nd_12^post_25, rv_17^0'=nd_12^1_2, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_2 ], cost: 2
    104: l1 -> l19 : nd_12^0'=nd_12^post_25, rv_17^0'=nd_12^1_2, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_2<=0 ], cost: 2
    117: l6 -> l7 : [ 1<=x_13^0 && 1<=y_15^0 && 1<=c_16^0 ], cost: 2
    118: l6 -> l7 : [ 1<=x_13^0 && 1<=y_15^0 && 1+c_16^0<=0 ], cost: 2
    119: l7 -> l12 : nd_12^0'=nd_12^post_61, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1-c_16^0==0 && 1+x_13^0<=o_19^0 ], cost: 2
    120: l7 -> l38 : nd_12^0'=nd_12^post_62, rv_18^0'=nd_12^1_12, [ 1-c_16^0==0 && 1+x_13^0<=o_19^0 ], cost: 2
    121: l7 -> l12 : nd_12^0'=nd_12^post_66, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 ], cost: 2
    122: l7 -> l40 : nd_12^0'=nd_12^post_67, rv_18^0'=nd_12^1_14, [ 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 ], cost: 2
    109: l12 -> l13 : [ 1<=x_13^0 && 1<=y_15^0 && 1<=c_16^0 ], cost: 2
    110: l12 -> l13 : [ 1<=x_13^0 && 1<=y_15^0 && 1+c_16^0<=0 ], cost: 2
    111: l13 -> l12 : nd_12^0'=nd_12^post_86, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1-c_16^0==0 && 1+x_13^0<=o_19^0 ], cost: 2
    112: l13 -> l49 : nd_12^0'=nd_12^post_87, rv_18^0'=nd_12^1_22, [ 1-c_16^0==0 && 1+x_13^0<=o_19^0 ], cost: 2
    113: l13 -> l12 : nd_12^0'=nd_12^post_91, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 ], cost: 2
    114: l13 -> l51 : nd_12^0'=nd_12^post_92, rv_18^0'=nd_12^1_24, [ 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 ], cost: 2
     95: l15 -> l1 : nd_12^0'=nd_12^post_96, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [], cost: 1
    105: l15 -> l54 : nd_12^0'=nd_12^post_97, rv_18^0'=nd_12^1_26, [ 1<=nd_12^1_26 ], cost: 2
    106: l15 -> l54 : nd_12^0'=nd_12^post_97, rv_18^0'=nd_12^1_26, [ 1+nd_12^1_26<=0 ], cost: 2
    107: l19 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_56, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [], cost: 2
    108: l19 -> l36 : c_16^0'=1, nd_12^0'=nd_12^post_57, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_18^0'=nd_12^1_10, [], cost: 2
    129: l36 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=rv_18^0 ], cost: 2
    130: l36 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1+rv_18^0<=0 ], cost: 2
    123: l38 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=rv_18^0 ], cost: 2
    124: l38 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1+rv_18^0<=0 ], cost: 2
    125: l40 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=rv_18^0 ], cost: 2
    126: l40 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1+rv_18^0<=0 ], cost: 2
    115: l49 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=rv_18^0 ], cost: 2
    116: l49 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1+rv_18^0<=0 ], cost: 2
    127: l51 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=rv_18^0 ], cost: 2
    128: l51 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1+rv_18^0<=0 ], cost: 2
     99: l54 -> l1 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [], cost: 1
    101: l55 -> l1 : c_16^0'=0, e_21^0'=0, [], cost: 2

Eliminated locations (on tree-shaped paths):
   Start location: l55
    131: l1 -> l1 : nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 ], cost: 3
    132: l1 -> l54 : nd_12^0'=nd_12^post_97, rv_17^0'=0, rv_18^0'=nd_12^1_26, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_26 ], cost: 4
    133: l1 -> l54 : nd_12^0'=nd_12^post_97, rv_17^0'=0, rv_18^0'=nd_12^1_26, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_26<=0 ], cost: 4
    134: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_56, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_2 ], cost: 4
    135: l1 -> l36 : c_16^0'=1, nd_12^0'=nd_12^post_57, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_10, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_2 ], cost: 4
    136: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_56, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_2<=0 ], cost: 4
    137: l1 -> l36 : c_16^0'=1, nd_12^0'=nd_12^post_57, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_10, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_2<=0 ], cost: 4
    142: l6 -> l12 : nd_12^0'=nd_12^post_61, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 ], cost: 4
    143: l6 -> l38 : nd_12^0'=nd_12^post_62, rv_18^0'=nd_12^1_12, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 ], cost: 4
    144: l6 -> l12 : nd_12^0'=nd_12^post_66, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 ], cost: 4
    145: l6 -> l40 : nd_12^0'=nd_12^post_67, rv_18^0'=nd_12^1_14, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 ], cost: 4
    138: l12 -> l12 : nd_12^0'=nd_12^post_86, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 ], cost: 4
    139: l12 -> l49 : nd_12^0'=nd_12^post_87, rv_18^0'=nd_12^1_22, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 ], cost: 4
    140: l12 -> l12 : nd_12^0'=nd_12^post_91, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 ], cost: 4
    141: l12 -> l51 : nd_12^0'=nd_12^post_92, rv_18^0'=nd_12^1_24, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 ], cost: 4
    129: l36 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=rv_18^0 ], cost: 2
    130: l36 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1+rv_18^0<=0 ], cost: 2
    123: l38 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=rv_18^0 ], cost: 2
    124: l38 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1+rv_18^0<=0 ], cost: 2
    125: l40 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=rv_18^0 ], cost: 2
    126: l40 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1+rv_18^0<=0 ], cost: 2
    115: l49 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=rv_18^0 ], cost: 2
    116: l49 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1+rv_18^0<=0 ], cost: 2
    127: l51 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=rv_18^0 ], cost: 2
    128: l51 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1+rv_18^0<=0 ], cost: 2
     99: l54 -> l1 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [], cost: 1
    101: l55 -> l1 : c_16^0'=0, e_21^0'=0, [], cost: 2

Accelerating simple loops of location 1.
   Accelerating the following rules:
    131: l1 -> l1 : nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 ], cost: 3

[test] deduced pseudo-invariant -2-x_13^0+y_15^0<=0, also trying 2+x_13^0-y_15^0<=-1
   Accelerated rule 131 with backward acceleration, yielding the new rule 146.
   Accelerated rule 131 with backward acceleration, yielding the new rule 147.
[accelerate] Nesting with 2 inner and 1 outer candidates

Accelerating simple loops of location 12.
   Accelerating the following rules:
    138: l12 -> l12 : nd_12^0'=nd_12^post_86, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 ], cost: 4
    140: l12 -> l12 : nd_12^0'=nd_12^post_91, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 ], cost: 4

   Failed to prove monotonicity of the guard of rule 138.
   Failed to prove monotonicity of the guard of rule 140.
[accelerate] Nesting with 2 inner and 2 outer candidates

Accelerated all simple loops using metering functions (where possible):
   Start location: l55
    131: l1 -> l1 : nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 ], cost: 3
    132: l1 -> l54 : nd_12^0'=nd_12^post_97, rv_17^0'=0, rv_18^0'=nd_12^1_26, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_26 ], cost: 4
    133: l1 -> l54 : nd_12^0'=nd_12^post_97, rv_17^0'=0, rv_18^0'=nd_12^1_26, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_26<=0 ], cost: 4
    134: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_56, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_2 ], cost: 4
    135: l1 -> l36 : c_16^0'=1, nd_12^0'=nd_12^post_57, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_10, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_2 ], cost: 4
    136: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_56, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_2<=0 ], cost: 4
    137: l1 -> l36 : c_16^0'=1, nd_12^0'=nd_12^post_57, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_10, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_2<=0 ], cost: 4
    146: l1 -> l1 : nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=0, y_15^0'=1, [ -c_16^0==0 && -2-x_13^0+y_15^0<=0 && -1+y_15^0>=1 ], cost: -3+3*y_15^0
    147: l1 -> l1 : nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=-1, y_15^0'=0, [ 1<=0 ], cost: 3*y_15^0
    142: l6 -> l12 : nd_12^0'=nd_12^post_61, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 ], cost: 4
    143: l6 -> l38 : nd_12^0'=nd_12^post_62, rv_18^0'=nd_12^1_12, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 ], cost: 4
    144: l6 -> l12 : nd_12^0'=nd_12^post_66, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 ], cost: 4
    145: l6 -> l40 : nd_12^0'=nd_12^post_67, rv_18^0'=nd_12^1_14, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 ], cost: 4
    138: l12 -> l12 : nd_12^0'=nd_12^post_86, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 ], cost: 4
    139: l12 -> l49 : nd_12^0'=nd_12^post_87, rv_18^0'=nd_12^1_22, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 ], cost: 4
    140: l12 -> l12 : nd_12^0'=nd_12^post_91, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 ], cost: 4
    141: l12 -> l51 : nd_12^0'=nd_12^post_92, rv_18^0'=nd_12^1_24, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 ], cost: 4
    129: l36 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=rv_18^0 ], cost: 2
    130: l36 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1+rv_18^0<=0 ], cost: 2
    123: l38 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=rv_18^0 ], cost: 2
    124: l38 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1+rv_18^0<=0 ], cost: 2
    125: l40 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=rv_18^0 ], cost: 2
    126: l40 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1+rv_18^0<=0 ], cost: 2
    115: l49 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=rv_18^0 ], cost: 2
    116: l49 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1+rv_18^0<=0 ], cost: 2
    127: l51 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=rv_18^0 ], cost: 2
    128: l51 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1+rv_18^0<=0 ], cost: 2
     99: l54 -> l1 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [], cost: 1
    101: l55 -> l1 : c_16^0'=0, e_21^0'=0, [], cost: 2

Chained accelerated rules (with incoming rules):
   Start location: l55
    132: l1 -> l54 : nd_12^0'=nd_12^post_97, rv_17^0'=0, rv_18^0'=nd_12^1_26, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_26 ], cost: 4
    133: l1 -> l54 : nd_12^0'=nd_12^post_97, rv_17^0'=0, rv_18^0'=nd_12^1_26, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_26<=0 ], cost: 4
    134: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_56, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_2 ], cost: 4
    135: l1 -> l36 : c_16^0'=1, nd_12^0'=nd_12^post_57, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_10, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_2 ], cost: 4
    136: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_56, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_2<=0 ], cost: 4
    137: l1 -> l36 : c_16^0'=1, nd_12^0'=nd_12^post_57, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_10, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_2<=0 ], cost: 4
    152: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_86, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && -c_16^0==0 && 1<=nd_12^1_2 && 1<=-2+y_15^0 && -1+y_15^0<=x_13^0 ], cost: 8
    153: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_86, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && -c_16^0==0 && 1+nd_12^1_2<=0 && 1<=-2+y_15^0 && -1+y_15^0<=x_13^0 ], cost: 8
    156: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_91, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && -c_16^0==0 && 1<=nd_12^1_2 && 1<=-2+y_15^0 && x_13^0<=-2+y_15^0 ], cost: 8
    157: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_91, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && -c_16^0==0 && 1+nd_12^1_2<=0 && 1<=-2+y_15^0 && x_13^0<=-2+y_15^0 ], cost: 8
    142: l6 -> l12 : nd_12^0'=nd_12^post_61, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 ], cost: 4
    143: l6 -> l38 : nd_12^0'=nd_12^post_62, rv_18^0'=nd_12^1_12, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 ], cost: 4
    144: l6 -> l12 : nd_12^0'=nd_12^post_66, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 ], cost: 4
    145: l6 -> l40 : nd_12^0'=nd_12^post_67, rv_18^0'=nd_12^1_14, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 ], cost: 4
    154: l6 -> l12 : nd_12^0'=nd_12^post_86, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1<=-2+y_15^0 && -1+y_15^0<=o_19^0 ], cost: 8
    155: l6 -> l12 : nd_12^0'=nd_12^post_86, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1<=-2+y_15^0 && -1+y_15^0<=o_19^0 ], cost: 8
    158: l6 -> l12 : nd_12^0'=nd_12^post_91, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1<=-2+y_15^0 && o_19^0<=-2+y_15^0 && y_15^0<=o_20^0 ], cost: 8
    159: l6 -> l12 : nd_12^0'=nd_12^post_91, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1<=-2+y_15^0 && o_19^0<=-2+y_15^0 ], cost: 8
    139: l12 -> l49 : nd_12^0'=nd_12^post_87, rv_18^0'=nd_12^1_22, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 ], cost: 4
    141: l12 -> l51 : nd_12^0'=nd_12^post_92, rv_18^0'=nd_12^1_24, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 ], cost: 4
    129: l36 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=rv_18^0 ], cost: 2
    130: l36 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1+rv_18^0<=0 ], cost: 2
    123: l38 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=rv_18^0 ], cost: 2
    124: l38 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1+rv_18^0<=0 ], cost: 2
    125: l40 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=rv_18^0 ], cost: 2
    126: l40 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1+rv_18^0<=0 ], cost: 2
    115: l49 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=rv_18^0 ], cost: 2
    116: l49 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1+rv_18^0<=0 ], cost: 2
    127: l51 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=rv_18^0 ], cost: 2
    128: l51 -> l6 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1+rv_18^0<=0 ], cost: 2
     99: l54 -> l1 : x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [], cost: 1
    148: l54 -> l1 : nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=-3+x_13^0, y_15^0'=-2+x_13^0, [ 1<=-1+x_13^0 && -c_16^0==0 ], cost: 4
    150: l54 -> l1 : nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=0, y_15^0'=1, [ -c_16^0==0 && -2+x_13^0>=1 ], cost: -5+3*x_13^0
    101: l55 -> l1 : c_16^0'=0, e_21^0'=0, [], cost: 2
    149: l55 -> l1 : c_16^0'=0, e_21^0'=0, nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 ], cost: 5
    151: l55 -> l1 : c_16^0'=0, e_21^0'=0, nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=0, y_15^0'=1, [ -2-x_13^0+y_15^0<=0 && -1+y_15^0>=1 ], cost: -1+3*y_15^0

Eliminated locations (on tree-shaped paths):
   Start location: l55
    134: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_56, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_2 ], cost: 4
    136: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_56, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_2<=0 ], cost: 4
    152: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_86, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && -c_16^0==0 && 1<=nd_12^1_2 && 1<=-2+y_15^0 && -1+y_15^0<=x_13^0 ], cost: 8
    153: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_86, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && -c_16^0==0 && 1+nd_12^1_2<=0 && 1<=-2+y_15^0 && -1+y_15^0<=x_13^0 ], cost: 8
    156: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_91, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && -c_16^0==0 && 1<=nd_12^1_2 && 1<=-2+y_15^0 && x_13^0<=-2+y_15^0 ], cost: 8
    157: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_91, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && -c_16^0==0 && 1+nd_12^1_2<=0 && 1<=-2+y_15^0 && x_13^0<=-2+y_15^0 ], cost: 8
    160: l1 -> l6 : c_16^0'=1, nd_12^0'=nd_12^post_57, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_10, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_2 && 1<=nd_12^1_10 ], cost: 6
    161: l1 -> l6 : c_16^0'=1, nd_12^0'=nd_12^post_57, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_10, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_2 && 1+nd_12^1_10<=0 ], cost: 6
    162: l1 -> l6 : c_16^0'=1, nd_12^0'=nd_12^post_57, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_10, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_2<=0 && 1<=nd_12^1_10 ], cost: 6
    163: l1 -> l6 : c_16^0'=1, nd_12^0'=nd_12^post_57, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_10, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_2<=0 && 1+nd_12^1_10<=0 ], cost: 6
    164: l1 -> l1 : nd_12^0'=nd_12^post_97, rv_17^0'=0, rv_18^0'=nd_12^1_26, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_26 ], cost: 5
    165: l1 -> l1 : nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=-3+x_13^0, y_15^0'=-2+x_13^0, [ 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_26 && 1<=-1+x_13^0 ], cost: 8
    166: l1 -> l1 : nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=0, y_15^0'=1, [ 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_26 && -2+x_13^0>=1 ], cost: -1+3*x_13^0
    167: l1 -> l1 : nd_12^0'=nd_12^post_97, rv_17^0'=0, rv_18^0'=nd_12^1_26, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_26<=0 ], cost: 5
    168: l1 -> l1 : nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=-3+x_13^0, y_15^0'=-2+x_13^0, [ 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_26<=0 && 1<=-1+x_13^0 ], cost: 8
    169: l1 -> l1 : nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=0, y_15^0'=1, [ 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_26<=0 && -2+x_13^0>=1 ], cost: -1+3*x_13^0
    142: l6 -> l12 : nd_12^0'=nd_12^post_61, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 ], cost: 4
    144: l6 -> l12 : nd_12^0'=nd_12^post_66, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 ], cost: 4
    154: l6 -> l12 : nd_12^0'=nd_12^post_86, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1<=-2+y_15^0 && -1+y_15^0<=o_19^0 ], cost: 8
    155: l6 -> l12 : nd_12^0'=nd_12^post_86, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1<=-2+y_15^0 && -1+y_15^0<=o_19^0 ], cost: 8
    158: l6 -> l12 : nd_12^0'=nd_12^post_91, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1<=-2+y_15^0 && o_19^0<=-2+y_15^0 && y_15^0<=o_20^0 ], cost: 8
    159: l6 -> l12 : nd_12^0'=nd_12^post_91, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1<=-2+y_15^0 && o_19^0<=-2+y_15^0 ], cost: 8
    170: l6 -> l6 : nd_12^0'=nd_12^post_62, rv_18^0'=nd_12^1_12, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1<=nd_12^1_12 ], cost: 6
    171: l6 -> l6 : nd_12^0'=nd_12^post_62, rv_18^0'=nd_12^1_12, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1+nd_12^1_12<=0 ], cost: 6
    172: l6 -> l6 : nd_12^0'=nd_12^post_67, rv_18^0'=nd_12^1_14, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1<=nd_12^1_14 ], cost: 6
    173: l6 -> l6 : nd_12^0'=nd_12^post_67, rv_18^0'=nd_12^1_14, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1+nd_12^1_14<=0 ], cost: 6
    174: l12 -> l6 : nd_12^0'=nd_12^post_87, rv_18^0'=nd_12^1_22, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1<=nd_12^1_22 ], cost: 6
    175: l12 -> l6 : nd_12^0'=nd_12^post_87, rv_18^0'=nd_12^1_22, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1+nd_12^1_22<=0 ], cost: 6
    176: l12 -> l6 : nd_12^0'=nd_12^post_92, rv_18^0'=nd_12^1_24, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1<=nd_12^1_24 ], cost: 6
    177: l12 -> l6 : nd_12^0'=nd_12^post_92, rv_18^0'=nd_12^1_24, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1+nd_12^1_24<=0 ], cost: 6
    101: l55 -> l1 : c_16^0'=0, e_21^0'=0, [], cost: 2
    149: l55 -> l1 : c_16^0'=0, e_21^0'=0, nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 ], cost: 5
    151: l55 -> l1 : c_16^0'=0, e_21^0'=0, nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=0, y_15^0'=1, [ -2-x_13^0+y_15^0<=0 && -1+y_15^0>=1 ], cost: -1+3*y_15^0

Applied pruning (of leafs and parallel rules):
   Start location: l55
    134: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_56, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_2 ], cost: 4
    136: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_56, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_2<=0 ], cost: 4
    152: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_86, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && -c_16^0==0 && 1<=nd_12^1_2 && 1<=-2+y_15^0 && -1+y_15^0<=x_13^0 ], cost: 8
    153: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_86, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && -c_16^0==0 && 1+nd_12^1_2<=0 && 1<=-2+y_15^0 && -1+y_15^0<=x_13^0 ], cost: 8
    157: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_91, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && -c_16^0==0 && 1+nd_12^1_2<=0 && 1<=-2+y_15^0 && x_13^0<=-2+y_15^0 ], cost: 8
    160: l1 -> l6 : c_16^0'=1, nd_12^0'=nd_12^post_57, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_10, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_2 && 1<=nd_12^1_10 ], cost: 6
    161: l1 -> l6 : c_16^0'=1, nd_12^0'=nd_12^post_57, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_10, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_2 && 1+nd_12^1_10<=0 ], cost: 6
    162: l1 -> l6 : c_16^0'=1, nd_12^0'=nd_12^post_57, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_10, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_2<=0 && 1<=nd_12^1_10 ], cost: 6
    163: l1 -> l6 : c_16^0'=1, nd_12^0'=nd_12^post_57, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_10, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_2<=0 && 1+nd_12^1_10<=0 ], cost: 6
    164: l1 -> l1 : nd_12^0'=nd_12^post_97, rv_17^0'=0, rv_18^0'=nd_12^1_26, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_26 ], cost: 5
    165: l1 -> l1 : nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=-3+x_13^0, y_15^0'=-2+x_13^0, [ 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_26 && 1<=-1+x_13^0 ], cost: 8
    166: l1 -> l1 : nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=0, y_15^0'=1, [ 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_26 && -2+x_13^0>=1 ], cost: -1+3*x_13^0
    167: l1 -> l1 : nd_12^0'=nd_12^post_97, rv_17^0'=0, rv_18^0'=nd_12^1_26, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_26<=0 ], cost: 5
    169: l1 -> l1 : nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=0, y_15^0'=1, [ 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_26<=0 && -2+x_13^0>=1 ], cost: -1+3*x_13^0
    142: l6 -> l12 : nd_12^0'=nd_12^post_61, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 ], cost: 4
    144: l6 -> l12 : nd_12^0'=nd_12^post_66, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 ], cost: 4
    154: l6 -> l12 : nd_12^0'=nd_12^post_86, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1<=-2+y_15^0 && -1+y_15^0<=o_19^0 ], cost: 8
    155: l6 -> l12 : nd_12^0'=nd_12^post_86, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1<=-2+y_15^0 && -1+y_15^0<=o_19^0 ], cost: 8
    159: l6 -> l12 : nd_12^0'=nd_12^post_91, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1<=-2+y_15^0 && o_19^0<=-2+y_15^0 ], cost: 8
    170: l6 -> l6 : nd_12^0'=nd_12^post_62, rv_18^0'=nd_12^1_12, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1<=nd_12^1_12 ], cost: 6
    171: l6 -> l6 : nd_12^0'=nd_12^post_62, rv_18^0'=nd_12^1_12, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1+nd_12^1_12<=0 ], cost: 6
    172: l6 -> l6 : nd_12^0'=nd_12^post_67, rv_18^0'=nd_12^1_14, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1<=nd_12^1_14 ], cost: 6
    173: l6 -> l6 : nd_12^0'=nd_12^post_67, rv_18^0'=nd_12^1_14, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1+nd_12^1_14<=0 ], cost: 6
    174: l12 -> l6 : nd_12^0'=nd_12^post_87, rv_18^0'=nd_12^1_22, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1<=nd_12^1_22 ], cost: 6
    175: l12 -> l6 : nd_12^0'=nd_12^post_87, rv_18^0'=nd_12^1_22, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1+nd_12^1_22<=0 ], cost: 6
    176: l12 -> l6 : nd_12^0'=nd_12^post_92, rv_18^0'=nd_12^1_24, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1<=nd_12^1_24 ], cost: 6
    177: l12 -> l6 : nd_12^0'=nd_12^post_92, rv_18^0'=nd_12^1_24, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1+nd_12^1_24<=0 ], cost: 6
    101: l55 -> l1 : c_16^0'=0, e_21^0'=0, [], cost: 2
    149: l55 -> l1 : c_16^0'=0, e_21^0'=0, nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 ], cost: 5
    151: l55 -> l1 : c_16^0'=0, e_21^0'=0, nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=0, y_15^0'=1, [ -2-x_13^0+y_15^0<=0 && -1+y_15^0>=1 ], cost: -1+3*y_15^0

Accelerating simple loops of location 1.
[accelerate] Removed some duplicate simple loops
   Simplified some of the simple loops (and removed duplicate rules).
   Accelerating the following rules:
    164: l1 -> l1 : nd_12^0'=nd_12^post_97, rv_17^0'=0, rv_18^0'=nd_12^1_26, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_26 ], cost: 5
    165: l1 -> l1 : nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=-3+x_13^0, y_15^0'=-2+x_13^0, [ 1<=y_15^0 && -c_16^0==0 && 1<=-1+x_13^0 ], cost: 8
    167: l1 -> l1 : nd_12^0'=nd_12^post_97, rv_17^0'=0, rv_18^0'=nd_12^1_26, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_26<=0 ], cost: 5
    169: l1 -> l1 : nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=0, y_15^0'=1, [ 1<=y_15^0 && -c_16^0==0 && -2+x_13^0>=1 ], cost: -1+3*x_13^0

   Failed to prove monotonicity of the guard of rule 164.
   Failed to prove monotonicity of the guard of rule 165.
   Failed to prove monotonicity of the guard of rule 167.
   Failed to prove monotonicity of the guard of rule 169.
[accelerate] Nesting with 4 inner and 4 outer candidates

Accelerating simple loops of location 6.
   Accelerating the following rules:
    170: l6 -> l6 : nd_12^0'=nd_12^post_62, rv_18^0'=nd_12^1_12, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1<=nd_12^1_12 ], cost: 6
    171: l6 -> l6 : nd_12^0'=nd_12^post_62, rv_18^0'=nd_12^1_12, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1+nd_12^1_12<=0 ], cost: 6
    172: l6 -> l6 : nd_12^0'=nd_12^post_67, rv_18^0'=nd_12^1_14, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1<=nd_12^1_14 ], cost: 6
    173: l6 -> l6 : nd_12^0'=nd_12^post_67, rv_18^0'=nd_12^1_14, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1+nd_12^1_14<=0 ], cost: 6

[test] deduced pseudo-invariant -1+x_13^0-y_15^0<=0, also trying 1-x_13^0+y_15^0<=-1
   Accelerated rule 170 with backward acceleration, yielding the new rule 178.
   Accelerated rule 170 with backward acceleration, yielding the new rule 179.
[test] deduced pseudo-invariant -1+x_13^0-y_15^0<=0, also trying 1-x_13^0+y_15^0<=-1
   Accelerated rule 171 with backward acceleration, yielding the new rule 180.
   Accelerated rule 171 with backward acceleration, yielding the new rule 181.
[test] deduced pseudo-invariant -o_20^0+x_13^0<=0, also trying o_20^0-x_13^0<=-1
   Failed to prove monotonicity of the guard of rule 172.
[test] deduced pseudo-invariant -1+x_13^0-y_15^0<=0, also trying 1-x_13^0+y_15^0<=-1
   Accelerated rule 173 with backward acceleration, yielding the new rule 182.
   Accelerated rule 173 with backward acceleration, yielding the new rule 183.
   Accelerated rule 173 with backward acceleration, yielding the new rule 184.
[accelerate] Nesting with 8 inner and 4 outer candidates

Accelerated all simple loops using metering functions (where possible):
   Start location: l55
    134: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_56, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_2 ], cost: 4
    136: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_56, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_2<=0 ], cost: 4
    152: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_86, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && -c_16^0==0 && 1<=nd_12^1_2 && 1<=-2+y_15^0 && -1+y_15^0<=x_13^0 ], cost: 8
    153: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_86, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && -c_16^0==0 && 1+nd_12^1_2<=0 && 1<=-2+y_15^0 && -1+y_15^0<=x_13^0 ], cost: 8
    157: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_91, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && -c_16^0==0 && 1+nd_12^1_2<=0 && 1<=-2+y_15^0 && x_13^0<=-2+y_15^0 ], cost: 8
    160: l1 -> l6 : c_16^0'=1, nd_12^0'=nd_12^post_57, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_10, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_2 && 1<=nd_12^1_10 ], cost: 6
    161: l1 -> l6 : c_16^0'=1, nd_12^0'=nd_12^post_57, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_10, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_2 && 1+nd_12^1_10<=0 ], cost: 6
    162: l1 -> l6 : c_16^0'=1, nd_12^0'=nd_12^post_57, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_10, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_2<=0 && 1<=nd_12^1_10 ], cost: 6
    163: l1 -> l6 : c_16^0'=1, nd_12^0'=nd_12^post_57, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_10, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_2<=0 && 1+nd_12^1_10<=0 ], cost: 6
    164: l1 -> l1 : nd_12^0'=nd_12^post_97, rv_17^0'=0, rv_18^0'=nd_12^1_26, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_26 ], cost: 5
    165: l1 -> l1 : nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=-3+x_13^0, y_15^0'=-2+x_13^0, [ 1<=y_15^0 && -c_16^0==0 && 1<=-1+x_13^0 ], cost: 8
    167: l1 -> l1 : nd_12^0'=nd_12^post_97, rv_17^0'=0, rv_18^0'=nd_12^1_26, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_26<=0 ], cost: 5
    169: l1 -> l1 : nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=0, y_15^0'=1, [ 1<=y_15^0 && -c_16^0==0 && -2+x_13^0>=1 ], cost: -1+3*x_13^0
    142: l6 -> l12 : nd_12^0'=nd_12^post_61, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 ], cost: 4
    144: l6 -> l12 : nd_12^0'=nd_12^post_66, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 ], cost: 4
    154: l6 -> l12 : nd_12^0'=nd_12^post_86, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1<=-2+y_15^0 && -1+y_15^0<=o_19^0 ], cost: 8
    155: l6 -> l12 : nd_12^0'=nd_12^post_86, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1<=-2+y_15^0 && -1+y_15^0<=o_19^0 ], cost: 8
    159: l6 -> l12 : nd_12^0'=nd_12^post_91, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1<=-2+y_15^0 && o_19^0<=-2+y_15^0 ], cost: 8
    170: l6 -> l6 : nd_12^0'=nd_12^post_62, rv_18^0'=nd_12^1_12, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1<=nd_12^1_12 ], cost: 6
    171: l6 -> l6 : nd_12^0'=nd_12^post_62, rv_18^0'=nd_12^1_12, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1+nd_12^1_12<=0 ], cost: 6
    172: l6 -> l6 : nd_12^0'=nd_12^post_67, rv_18^0'=nd_12^1_14, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1<=nd_12^1_14 ], cost: 6
    173: l6 -> l6 : nd_12^0'=nd_12^post_67, rv_18^0'=nd_12^1_14, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1+nd_12^1_14<=0 ], cost: 6
    178: l6 -> l6 : nd_12^0'=nd_12^post_62, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1<=nd_12^1_12 && -1+x_13^0-y_15^0<=0 && x_13^0>=1 && 1<=1 && 1<=1 ], cost: 6*x_13^0
    179: l6 -> l6 : nd_12^0'=nd_12^post_62, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1<=nd_12^1_12 && -1+x_13^0-y_15^0<=0 && x_13^0>=1 && 1<=1 && 1<=1 ], cost: 6*x_13^0
    180: l6 -> l6 : nd_12^0'=nd_12^post_62, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1+nd_12^1_12<=0 && -1+x_13^0-y_15^0<=0 && x_13^0>=1 && 1<=1 && 1<=1 ], cost: 6*x_13^0
    181: l6 -> l6 : nd_12^0'=nd_12^post_62, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1+nd_12^1_12<=0 && -1+x_13^0-y_15^0<=0 && x_13^0>=1 && 1<=1 && 1<=1 ], cost: 6*x_13^0
    182: l6 -> l6 : nd_12^0'=nd_12^post_67, rv_18^0'=nd_12^1_14, x_13^0'=0, y_15^0'=0, [ 1-c_16^0==0 && 1+y_15^0<=o_20^0 && 1+nd_12^1_14<=0 && -1+x_13^0-y_15^0<=0 && x_13^0>=1 && 1<=1 && 1<=1 && o_19^0<=1 ], cost: 6*x_13^0
    183: l6 -> l6 : nd_12^0'=nd_12^post_67, rv_18^0'=nd_12^1_14, x_13^0'=0, y_15^0'=0, [ 1-c_16^0==0 && 1+y_15^0<=o_20^0 && 1+nd_12^1_14<=0 && -1+x_13^0-y_15^0<=0 && x_13^0>=1 && 1<=1 && 1<=1 && o_19^0<=1 ], cost: 6*x_13^0
    184: l6 -> l6 : nd_12^0'=nd_12^post_67, rv_18^0'=nd_12^1_14, x_13^0'=-1+o_19^0, y_15^0'=-1+o_19^0, [ 1-c_16^0==0 && 1+y_15^0<=o_20^0 && 1+nd_12^1_14<=0 && -1+x_13^0-y_15^0<=0 && 1+x_13^0-o_19^0>=1 && 1<=o_19^0 && 1<=o_19^0 && o_19^0<=o_19^0 ], cost: 6+6*x_13^0-6*o_19^0
    174: l12 -> l6 : nd_12^0'=nd_12^post_87, rv_18^0'=nd_12^1_22, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1<=nd_12^1_22 ], cost: 6
    175: l12 -> l6 : nd_12^0'=nd_12^post_87, rv_18^0'=nd_12^1_22, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1+nd_12^1_22<=0 ], cost: 6
    176: l12 -> l6 : nd_12^0'=nd_12^post_92, rv_18^0'=nd_12^1_24, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1<=nd_12^1_24 ], cost: 6
    177: l12 -> l6 : nd_12^0'=nd_12^post_92, rv_18^0'=nd_12^1_24, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1+nd_12^1_24<=0 ], cost: 6
    101: l55 -> l1 : c_16^0'=0, e_21^0'=0, [], cost: 2
    149: l55 -> l1 : c_16^0'=0, e_21^0'=0, nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 ], cost: 5
    151: l55 -> l1 : c_16^0'=0, e_21^0'=0, nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=0, y_15^0'=1, [ -2-x_13^0+y_15^0<=0 && -1+y_15^0>=1 ], cost: -1+3*y_15^0

Aborted due to lack of remaining time


### Computing asymptotic complexity ###

Fully simplified ITS problem
   Start location: l55
    134: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_56, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_2 ], cost: 4
    136: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_56, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_2<=0 ], cost: 4
    152: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_86, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && -c_16^0==0 && 1<=nd_12^1_2 && 1<=-2+y_15^0 && -1+y_15^0<=x_13^0 ], cost: 8
    153: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_86, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && -c_16^0==0 && 1+nd_12^1_2<=0 && 1<=-2+y_15^0 && -1+y_15^0<=x_13^0 ], cost: 8
    157: l1 -> l12 : c_16^0'=1, nd_12^0'=nd_12^post_91, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && -c_16^0==0 && 1+nd_12^1_2<=0 && 1<=-2+y_15^0 && x_13^0<=-2+y_15^0 ], cost: 8
    160: l1 -> l6 : c_16^0'=1, nd_12^0'=nd_12^post_57, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_10, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_2 && 1<=nd_12^1_10 ], cost: 6
    161: l1 -> l6 : c_16^0'=1, nd_12^0'=nd_12^post_57, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_10, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_2 && 1+nd_12^1_10<=0 ], cost: 6
    162: l1 -> l6 : c_16^0'=1, nd_12^0'=nd_12^post_57, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_10, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_2<=0 && 1<=nd_12^1_10 ], cost: 6
    163: l1 -> l6 : c_16^0'=1, nd_12^0'=nd_12^post_57, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_10, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_2<=0 && 1+nd_12^1_10<=0 ], cost: 6
    164: l1 -> l1 : nd_12^0'=nd_12^post_97, rv_17^0'=0, rv_18^0'=nd_12^1_26, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1<=nd_12^1_26 ], cost: 5
    165: l1 -> l1 : nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=-3+x_13^0, y_15^0'=-2+x_13^0, [ 1<=y_15^0 && -c_16^0==0 && 1<=-1+x_13^0 ], cost: 8
    167: l1 -> l1 : nd_12^0'=nd_12^post_97, rv_17^0'=0, rv_18^0'=nd_12^1_26, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && -c_16^0==0 && 1+nd_12^1_26<=0 ], cost: 5
    169: l1 -> l1 : nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=0, y_15^0'=1, [ 1<=y_15^0 && -c_16^0==0 && -2+x_13^0>=1 ], cost: -1+3*x_13^0
    142: l6 -> l12 : nd_12^0'=nd_12^post_61, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 ], cost: 4
    144: l6 -> l12 : nd_12^0'=nd_12^post_66, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 ], cost: 4
    154: l6 -> l12 : nd_12^0'=nd_12^post_86, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1<=-2+y_15^0 && -1+y_15^0<=o_19^0 ], cost: 8
    155: l6 -> l12 : nd_12^0'=nd_12^post_86, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1<=-2+y_15^0 && -1+y_15^0<=o_19^0 ], cost: 8
    159: l6 -> l12 : nd_12^0'=nd_12^post_91, rv_18^0'=0, x_13^0'=-3+y_15^0, y_15^0'=-2+y_15^0, [ 1<=x_13^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1<=-2+y_15^0 && o_19^0<=-2+y_15^0 ], cost: 8
    170: l6 -> l6 : nd_12^0'=nd_12^post_62, rv_18^0'=nd_12^1_12, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1<=nd_12^1_12 ], cost: 6
    171: l6 -> l6 : nd_12^0'=nd_12^post_62, rv_18^0'=nd_12^1_12, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1+nd_12^1_12<=0 ], cost: 6
    172: l6 -> l6 : nd_12^0'=nd_12^post_67, rv_18^0'=nd_12^1_14, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1<=nd_12^1_14 ], cost: 6
    173: l6 -> l6 : nd_12^0'=nd_12^post_67, rv_18^0'=nd_12^1_14, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1+nd_12^1_14<=0 ], cost: 6
    178: l6 -> l6 : nd_12^0'=nd_12^post_62, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1<=nd_12^1_12 && -1+x_13^0-y_15^0<=0 && x_13^0>=1 && 1<=1 && 1<=1 ], cost: 6*x_13^0
    179: l6 -> l6 : nd_12^0'=nd_12^post_62, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1<=nd_12^1_12 && -1+x_13^0-y_15^0<=0 && x_13^0>=1 && 1<=1 && 1<=1 ], cost: 6*x_13^0
    180: l6 -> l6 : nd_12^0'=nd_12^post_62, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1+nd_12^1_12<=0 && -1+x_13^0-y_15^0<=0 && x_13^0>=1 && 1<=1 && 1<=1 ], cost: 6*x_13^0
    181: l6 -> l6 : nd_12^0'=nd_12^post_62, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1+nd_12^1_12<=0 && -1+x_13^0-y_15^0<=0 && x_13^0>=1 && 1<=1 && 1<=1 ], cost: 6*x_13^0
    182: l6 -> l6 : nd_12^0'=nd_12^post_67, rv_18^0'=nd_12^1_14, x_13^0'=0, y_15^0'=0, [ 1-c_16^0==0 && 1+y_15^0<=o_20^0 && 1+nd_12^1_14<=0 && -1+x_13^0-y_15^0<=0 && x_13^0>=1 && 1<=1 && 1<=1 && o_19^0<=1 ], cost: 6*x_13^0
    183: l6 -> l6 : nd_12^0'=nd_12^post_67, rv_18^0'=nd_12^1_14, x_13^0'=0, y_15^0'=0, [ 1-c_16^0==0 && 1+y_15^0<=o_20^0 && 1+nd_12^1_14<=0 && -1+x_13^0-y_15^0<=0 && x_13^0>=1 && 1<=1 && 1<=1 && o_19^0<=1 ], cost: 6*x_13^0
    184: l6 -> l6 : nd_12^0'=nd_12^post_67, rv_18^0'=nd_12^1_14, x_13^0'=-1+o_19^0, y_15^0'=-1+o_19^0, [ 1-c_16^0==0 && 1+y_15^0<=o_20^0 && 1+nd_12^1_14<=0 && -1+x_13^0-y_15^0<=0 && 1+x_13^0-o_19^0>=1 && 1<=o_19^0 && 1<=o_19^0 && o_19^0<=o_19^0 ], cost: 6+6*x_13^0-6*o_19^0
    174: l12 -> l6 : nd_12^0'=nd_12^post_87, rv_18^0'=nd_12^1_22, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1<=nd_12^1_22 ], cost: 6
    175: l12 -> l6 : nd_12^0'=nd_12^post_87, rv_18^0'=nd_12^1_22, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && 1+x_13^0<=o_19^0 && 1+nd_12^1_22<=0 ], cost: 6
    176: l12 -> l6 : nd_12^0'=nd_12^post_92, rv_18^0'=nd_12^1_24, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1<=nd_12^1_24 ], cost: 6
    177: l12 -> l6 : nd_12^0'=nd_12^post_92, rv_18^0'=nd_12^1_24, x_13^0'=-1+x_13^0, y_15^0'=-1+x_13^0, [ 1<=x_13^0 && 1<=y_15^0 && 1-c_16^0==0 && o_19^0<=x_13^0 && 1+y_15^0<=o_20^0 && 1+nd_12^1_24<=0 ], cost: 6
    101: l55 -> l1 : c_16^0'=0, e_21^0'=0, [], cost: 2
    149: l55 -> l1 : c_16^0'=0, e_21^0'=0, nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=-2+y_15^0, y_15^0'=-1+y_15^0, [ 1<=x_13^0 && 1<=y_15^0 ], cost: 5
    151: l55 -> l1 : c_16^0'=0, e_21^0'=0, nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=0, y_15^0'=1, [ -2-x_13^0+y_15^0<=0 && -1+y_15^0>=1 ], cost: -1+3*y_15^0

This is only a partial result (probably due to a timeout).

Trying to find the maximal complexity that has already been derived.

Computing asymptotic complexity for rule 151
   Resulting cost 0 has complexity: Unknown

Performed chaining from the start location:

Computing asymptotic complexity for rule 189
   Simplified the guard:
    189: l55 -> l1 : c_16^0'=0, e_21^0'=0, nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=0, y_15^0'=1, [ 1<=y_15^0 && -2+x_13^0>=1 ], cost: 1+3*x_13^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 194
   Simplified the guard:
    194: l55 -> l1 : c_16^0'=0, e_21^0'=0, nd_12^0'=nd_12^post_96, rv_17^0'=0, rv_18^0'=0, x_13^0'=0, y_15^0'=1, [ 1<=x_13^0 && -4+y_15^0>=1 ], cost: -2+3*y_15^0
   Resulting cost 0 has complexity: Unknown

Performed chaining from the start location:

Computing asymptotic complexity for rule 196
   Simplified the guard:
    196: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=y_15^0 && 1<=nd_12^1_2 && 1<=nd_12^1_10 && 1<=nd_12^1_12 && -1+x_13^0>=1 ], cost: 2+6*x_13^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 195
   Simplified the guard:
    195: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=y_15^0 && 1<=nd_12^1_2 && 1<=nd_12^1_10 && 1<=nd_12^1_12 && -1+x_13^0>=1 ], cost: 2+6*x_13^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 210
   Simplified the guard:
    210: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=y_15^0 && 1+nd_12^1_2<=0 && 1+nd_12^1_10<=0 && 1+nd_12^1_12<=0 && -1+x_13^0>=1 ], cost: 2+6*x_13^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 209
   Simplified the guard:
    209: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=y_15^0 && 1+nd_12^1_2<=0 && 1+nd_12^1_10<=0 && 1+nd_12^1_12<=0 && -1+x_13^0>=1 ], cost: 2+6*x_13^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 208
   Simplified the guard:
    208: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=y_15^0 && 1+nd_12^1_2<=0 && 1+nd_12^1_10<=0 && 1<=nd_12^1_12 && -1+x_13^0>=1 ], cost: 2+6*x_13^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 207
   Simplified the guard:
    207: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=y_15^0 && 1+nd_12^1_2<=0 && 1+nd_12^1_10<=0 && 1<=nd_12^1_12 && -1+x_13^0>=1 ], cost: 2+6*x_13^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 206
   Simplified the guard:
    206: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=y_15^0 && 1+nd_12^1_2<=0 && 1<=nd_12^1_10 && 1+nd_12^1_12<=0 && -1+x_13^0>=1 ], cost: 2+6*x_13^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 205
   Simplified the guard:
    205: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=y_15^0 && 1+nd_12^1_2<=0 && 1<=nd_12^1_10 && 1+nd_12^1_12<=0 && -1+x_13^0>=1 ], cost: 2+6*x_13^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 204
   Simplified the guard:
    204: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=y_15^0 && 1+nd_12^1_2<=0 && 1<=nd_12^1_10 && 1<=nd_12^1_12 && -1+x_13^0>=1 ], cost: 2+6*x_13^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 203
   Simplified the guard:
    203: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=y_15^0 && 1+nd_12^1_2<=0 && 1<=nd_12^1_10 && 1<=nd_12^1_12 && -1+x_13^0>=1 ], cost: 2+6*x_13^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 202
   Simplified the guard:
    202: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=y_15^0 && 1<=nd_12^1_2 && 1+nd_12^1_10<=0 && 1+nd_12^1_12<=0 && -1+x_13^0>=1 ], cost: 2+6*x_13^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 201
   Simplified the guard:
    201: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=y_15^0 && 1<=nd_12^1_2 && 1+nd_12^1_10<=0 && 1+nd_12^1_12<=0 && -1+x_13^0>=1 ], cost: 2+6*x_13^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 200
   Simplified the guard:
    200: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=y_15^0 && 1<=nd_12^1_2 && 1+nd_12^1_10<=0 && 1<=nd_12^1_12 && -1+x_13^0>=1 ], cost: 2+6*x_13^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 199
   Simplified the guard:
    199: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=y_15^0 && 1<=nd_12^1_2 && 1+nd_12^1_10<=0 && 1<=nd_12^1_12 && -1+x_13^0>=1 ], cost: 2+6*x_13^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 198
   Simplified the guard:
    198: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=y_15^0 && 1<=nd_12^1_2 && 1<=nd_12^1_10 && 1+nd_12^1_12<=0 && -1+x_13^0>=1 ], cost: 2+6*x_13^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 197
   Simplified the guard:
    197: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=x_13^0, o_20^0'=y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=y_15^0 && 1<=nd_12^1_2 && 1<=nd_12^1_10 && 1+nd_12^1_12<=0 && -1+x_13^0>=1 ], cost: 2+6*x_13^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 226
   Simplified the guard:
    226: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=-2+y_15^0, o_20^0'=-1+y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=x_13^0 && 1+nd_12^1_2<=0 && 1+nd_12^1_10<=0 && 1+nd_12^1_12<=0 && -3+y_15^0>=1 ], cost: -7+6*y_15^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 225
   Simplified the guard:
    225: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=-2+y_15^0, o_20^0'=-1+y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=x_13^0 && 1+nd_12^1_2<=0 && 1+nd_12^1_10<=0 && 1+nd_12^1_12<=0 && -3+y_15^0>=1 ], cost: -7+6*y_15^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 224
   Simplified the guard:
    224: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=-2+y_15^0, o_20^0'=-1+y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=x_13^0 && 1+nd_12^1_2<=0 && 1+nd_12^1_10<=0 && 1<=nd_12^1_12 && -3+y_15^0>=1 ], cost: -7+6*y_15^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 223
   Simplified the guard:
    223: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=-2+y_15^0, o_20^0'=-1+y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=x_13^0 && 1+nd_12^1_2<=0 && 1+nd_12^1_10<=0 && 1<=nd_12^1_12 && -3+y_15^0>=1 ], cost: -7+6*y_15^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 222
   Simplified the guard:
    222: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=-2+y_15^0, o_20^0'=-1+y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=x_13^0 && 1+nd_12^1_2<=0 && 1<=nd_12^1_10 && 1+nd_12^1_12<=0 && -3+y_15^0>=1 ], cost: -7+6*y_15^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 221
   Simplified the guard:
    221: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=-2+y_15^0, o_20^0'=-1+y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=x_13^0 && 1+nd_12^1_2<=0 && 1<=nd_12^1_10 && 1+nd_12^1_12<=0 && -3+y_15^0>=1 ], cost: -7+6*y_15^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 220
   Simplified the guard:
    220: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=-2+y_15^0, o_20^0'=-1+y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=x_13^0 && 1+nd_12^1_2<=0 && 1<=nd_12^1_10 && 1<=nd_12^1_12 && -3+y_15^0>=1 ], cost: -7+6*y_15^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 219
   Simplified the guard:
    219: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=-2+y_15^0, o_20^0'=-1+y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=x_13^0 && 1+nd_12^1_2<=0 && 1<=nd_12^1_10 && 1<=nd_12^1_12 && -3+y_15^0>=1 ], cost: -7+6*y_15^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 218
   Simplified the guard:
    218: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=-2+y_15^0, o_20^0'=-1+y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=x_13^0 && 1<=nd_12^1_2 && 1+nd_12^1_10<=0 && 1+nd_12^1_12<=0 && -3+y_15^0>=1 ], cost: -7+6*y_15^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 217
   Simplified the guard:
    217: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=-2+y_15^0, o_20^0'=-1+y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=x_13^0 && 1<=nd_12^1_2 && 1+nd_12^1_10<=0 && 1+nd_12^1_12<=0 && -3+y_15^0>=1 ], cost: -7+6*y_15^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 216
   Simplified the guard:
    216: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=-2+y_15^0, o_20^0'=-1+y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=x_13^0 && 1<=nd_12^1_2 && 1+nd_12^1_10<=0 && 1<=nd_12^1_12 && -3+y_15^0>=1 ], cost: -7+6*y_15^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 215
   Simplified the guard:
    215: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=-2+y_15^0, o_20^0'=-1+y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=x_13^0 && 1<=nd_12^1_2 && 1+nd_12^1_10<=0 && 1<=nd_12^1_12 && -3+y_15^0>=1 ], cost: -7+6*y_15^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 214
   Simplified the guard:
    214: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=-2+y_15^0, o_20^0'=-1+y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=x_13^0 && 1<=nd_12^1_2 && 1<=nd_12^1_10 && 1+nd_12^1_12<=0 && -3+y_15^0>=1 ], cost: -7+6*y_15^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 213
   Simplified the guard:
    213: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=-2+y_15^0, o_20^0'=-1+y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=x_13^0 && 1<=nd_12^1_2 && 1<=nd_12^1_10 && 1+nd_12^1_12<=0 && -3+y_15^0>=1 ], cost: -7+6*y_15^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 212
   Simplified the guard:
    212: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=-2+y_15^0, o_20^0'=-1+y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=x_13^0 && 1<=nd_12^1_2 && 1<=nd_12^1_10 && 1<=nd_12^1_12 && -3+y_15^0>=1 ], cost: -7+6*y_15^0
   Resulting cost 0 has complexity: Unknown

Computing asymptotic complexity for rule 211
   Simplified the guard:
    211: l55 -> l6 : c_16^0'=1, e_21^0'=0, nd_12^0'=nd_12^post_62, o_19^0'=-2+y_15^0, o_20^0'=-1+y_15^0, rv_17^0'=nd_12^1_2, rv_18^0'=nd_12^1_12, x_13^0'=0, y_15^0'=0, [ 1<=x_13^0 && 1<=nd_12^1_2 && 1<=nd_12^1_10 && 1<=nd_12^1_12 && -3+y_15^0>=1 ], cost: -7+6*y_15^0
   Resulting cost 0 has complexity: Unknown

Performed chaining from the start location:

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:  [ c_16^0==c_16^post_101 && e_21^0==e_21^post_101 && nd_12^0==nd_12^post_101 && o_19^0==o_19^post_101 && o_20^0==o_20^post_101 && rt_11^0==rt_11^post_101 && rv_17^0==rv_17^post_101 && rv_18^0==rv_18^post_101 && st_14^0==st_14^post_101 && x_13^0==x_13^post_101 && y_15^0==y_15^post_101 ]

WORST_CASE(Omega(1),?)