NO

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

Initial linear ITS problem
   Start location: l8
      0: l0 -> l1 : Result_4^0'=Result_4^post_1, a_6^0'=a_6^post_1, b_7^0'=b_7^post_1, c_8^0'=c_8^post_1, cnt_38^0'=cnt_38^post_1, d_9^0'=d_9^post_1, e_10^0'=e_10^post_1, f_11^0'=f_11^post_1, g_12^0'=g_12^post_1, h_13^0'=h_13^post_1, lt_14^0'=lt_14^post_1, lt_15^0'=lt_15^post_1, lt_16^0'=lt_16^post_1, lt_17^0'=lt_17^post_1, lt_18^0'=lt_18^post_1, lt_19^0'=lt_19^post_1, lt_20^0'=lt_20^post_1, lt_21^0'=lt_21^post_1, lt_22^0'=lt_22^post_1, lt_23^0'=lt_23^post_1, lt_24^0'=lt_24^post_1, lt_25^0'=lt_25^post_1, x_5^0'=x_5^post_1, [ Result_4^post_1==Result_4^post_1 && a_6^0==a_6^post_1 && b_7^0==b_7^post_1 && c_8^0==c_8^post_1 && cnt_38^0==cnt_38^post_1 && d_9^0==d_9^post_1 && e_10^0==e_10^post_1 && f_11^0==f_11^post_1 && g_12^0==g_12^post_1 && h_13^0==h_13^post_1 && lt_14^0==lt_14^post_1 && lt_15^0==lt_15^post_1 && lt_16^0==lt_16^post_1 && lt_17^0==lt_17^post_1 && lt_18^0==lt_18^post_1 && lt_19^0==lt_19^post_1 && lt_20^0==lt_20^post_1 && lt_21^0==lt_21^post_1 && lt_22^0==lt_22^post_1 && lt_23^0==lt_23^post_1 && lt_24^0==lt_24^post_1 && lt_25^0==lt_25^post_1 && x_5^0==x_5^post_1 ], cost: 1
      1: l2 -> l3 : Result_4^0'=Result_4^post_2, a_6^0'=a_6^post_2, b_7^0'=b_7^post_2, c_8^0'=c_8^post_2, cnt_38^0'=cnt_38^post_2, d_9^0'=d_9^post_2, e_10^0'=e_10^post_2, f_11^0'=f_11^post_2, g_12^0'=g_12^post_2, h_13^0'=h_13^post_2, lt_14^0'=lt_14^post_2, lt_15^0'=lt_15^post_2, lt_16^0'=lt_16^post_2, lt_17^0'=lt_17^post_2, lt_18^0'=lt_18^post_2, lt_19^0'=lt_19^post_2, lt_20^0'=lt_20^post_2, lt_21^0'=lt_21^post_2, lt_22^0'=lt_22^post_2, lt_23^0'=lt_23^post_2, lt_24^0'=lt_24^post_2, lt_25^0'=lt_25^post_2, x_5^0'=x_5^post_2, [ x_5^post_2==x_5^post_2 && a_6^post_2==x_5^post_2 && b_7^post_2==a_6^post_2 && c_8^post_2==b_7^post_2 && d_9^post_2==c_8^post_2 && e_10^post_2==d_9^post_2 && f_11^post_2==e_10^post_2 && g_12^post_2==f_11^post_2 && h_13^post_2==g_12^post_2 && Result_4^0==Result_4^post_2 && cnt_38^0==cnt_38^post_2 && lt_14^0==lt_14^post_2 && lt_15^0==lt_15^post_2 && lt_16^0==lt_16^post_2 && lt_17^0==lt_17^post_2 && lt_18^0==lt_18^post_2 && lt_19^0==lt_19^post_2 && lt_20^0==lt_20^post_2 && lt_21^0==lt_21^post_2 && lt_22^0==lt_22^post_2 && lt_23^0==lt_23^post_2 && lt_24^0==lt_24^post_2 && lt_25^0==lt_25^post_2 ], cost: 1
      2: l3 -> l0 : Result_4^0'=Result_4^post_3, a_6^0'=a_6^post_3, b_7^0'=b_7^post_3, c_8^0'=c_8^post_3, cnt_38^0'=cnt_38^post_3, d_9^0'=d_9^post_3, e_10^0'=e_10^post_3, f_11^0'=f_11^post_3, g_12^0'=g_12^post_3, h_13^0'=h_13^post_3, lt_14^0'=lt_14^post_3, lt_15^0'=lt_15^post_3, lt_16^0'=lt_16^post_3, lt_17^0'=lt_17^post_3, lt_18^0'=lt_18^post_3, lt_19^0'=lt_19^post_3, lt_20^0'=lt_20^post_3, lt_21^0'=lt_21^post_3, lt_22^0'=lt_22^post_3, lt_23^0'=lt_23^post_3, lt_24^0'=lt_24^post_3, lt_25^0'=lt_25^post_3, x_5^0'=x_5^post_3, [ lt_25^1_1==cnt_38^0 && -lt_25^1_1<=0 && lt_25^post_3==lt_25^post_3 && lt_24^1_1==cnt_38^0 && lt_24^1_1<=0 && lt_24^post_3==lt_24^post_3 && Result_4^0==Result_4^post_3 && a_6^0==a_6^post_3 && b_7^0==b_7^post_3 && c_8^0==c_8^post_3 && cnt_38^0==cnt_38^post_3 && d_9^0==d_9^post_3 && e_10^0==e_10^post_3 && f_11^0==f_11^post_3 && g_12^0==g_12^post_3 && h_13^0==h_13^post_3 && lt_14^0==lt_14^post_3 && lt_15^0==lt_15^post_3 && lt_16^0==lt_16^post_3 && lt_17^0==lt_17^post_3 && lt_18^0==lt_18^post_3 && lt_19^0==lt_19^post_3 && lt_20^0==lt_20^post_3 && lt_21^0==lt_21^post_3 && lt_22^0==lt_22^post_3 && lt_23^0==lt_23^post_3 && x_5^0==x_5^post_3 ], cost: 1
      3: l3 -> l0 : Result_4^0'=Result_4^post_4, a_6^0'=a_6^post_4, b_7^0'=b_7^post_4, c_8^0'=c_8^post_4, cnt_38^0'=cnt_38^post_4, d_9^0'=d_9^post_4, e_10^0'=e_10^post_4, f_11^0'=f_11^post_4, g_12^0'=g_12^post_4, h_13^0'=h_13^post_4, lt_14^0'=lt_14^post_4, lt_15^0'=lt_15^post_4, lt_16^0'=lt_16^post_4, lt_17^0'=lt_17^post_4, lt_18^0'=lt_18^post_4, lt_19^0'=lt_19^post_4, lt_20^0'=lt_20^post_4, lt_21^0'=lt_21^post_4, lt_22^0'=lt_22^post_4, lt_23^0'=lt_23^post_4, lt_24^0'=lt_24^post_4, lt_25^0'=lt_25^post_4, x_5^0'=x_5^post_4, [ lt_25^1_2_1==cnt_38^0 && -lt_25^1_2_1<=0 && lt_25^post_4==lt_25^post_4 && lt_24^1_2_1==cnt_38^0 && 0<=-1+lt_24^1_2_1 && lt_24^post_4==lt_24^post_4 && lt_23^1_1==cnt_38^0 && lt_23^post_4==lt_23^post_4 && lt_22^1_1==lt_22^1_1 && lt_22^post_4==lt_22^post_4 && lt_19^1_1==lt_19^1_1 && -lt_19^1_1<=0 && lt_19^post_4==lt_19^post_4 && lt_18^1_1==lt_18^1_1 && lt_18^1_1<=0 && lt_18^post_4==lt_18^post_4 && Result_4^0==Result_4^post_4 && a_6^0==a_6^post_4 && b_7^0==b_7^post_4 && c_8^0==c_8^post_4 && cnt_38^0==cnt_38^post_4 && d_9^0==d_9^post_4 && e_10^0==e_10^post_4 && f_11^0==f_11^post_4 && g_12^0==g_12^post_4 && h_13^0==h_13^post_4 && lt_14^0==lt_14^post_4 && lt_15^0==lt_15^post_4 && lt_16^0==lt_16^post_4 && lt_17^0==lt_17^post_4 && lt_20^0==lt_20^post_4 && lt_21^0==lt_21^post_4 && x_5^0==x_5^post_4 ], cost: 1
      4: l3 -> l1 : Result_4^0'=Result_4^post_5, a_6^0'=a_6^post_5, b_7^0'=b_7^post_5, c_8^0'=c_8^post_5, cnt_38^0'=cnt_38^post_5, d_9^0'=d_9^post_5, e_10^0'=e_10^post_5, f_11^0'=f_11^post_5, g_12^0'=g_12^post_5, h_13^0'=h_13^post_5, lt_14^0'=lt_14^post_5, lt_15^0'=lt_15^post_5, lt_16^0'=lt_16^post_5, lt_17^0'=lt_17^post_5, lt_18^0'=lt_18^post_5, lt_19^0'=lt_19^post_5, lt_20^0'=lt_20^post_5, lt_21^0'=lt_21^post_5, lt_22^0'=lt_22^post_5, lt_23^0'=lt_23^post_5, lt_24^0'=lt_24^post_5, lt_25^0'=lt_25^post_5, x_5^0'=x_5^post_5, [ lt_25^1_3_1==cnt_38^0 && 0<=-1-lt_25^1_3_1 && lt_25^post_5==lt_25^post_5 && lt_21^1_1==cnt_38^0 && lt_21^post_5==lt_21^post_5 && lt_20^1_1==lt_20^1_1 && lt_20^post_5==lt_20^post_5 && lt_19^1_2_1==lt_19^1_2_1 && -lt_19^1_2_1<=0 && lt_19^post_5==lt_19^post_5 && lt_18^1_2==lt_18^1_2 && lt_18^1_2<=0 && lt_18^post_5==lt_18^post_5 && Result_4^post_5==Result_4^post_5 && a_6^0==a_6^post_5 && b_7^0==b_7^post_5 && c_8^0==c_8^post_5 && cnt_38^0==cnt_38^post_5 && d_9^0==d_9^post_5 && e_10^0==e_10^post_5 && f_11^0==f_11^post_5 && g_12^0==g_12^post_5 && h_13^0==h_13^post_5 && lt_14^0==lt_14^post_5 && lt_15^0==lt_15^post_5 && lt_16^0==lt_16^post_5 && lt_17^0==lt_17^post_5 && lt_22^0==lt_22^post_5 && lt_23^0==lt_23^post_5 && lt_24^0==lt_24^post_5 && x_5^0==x_5^post_5 ], cost: 1
      5: l3 -> l4 : Result_4^0'=Result_4^post_6, a_6^0'=a_6^post_6, b_7^0'=b_7^post_6, c_8^0'=c_8^post_6, cnt_38^0'=cnt_38^post_6, d_9^0'=d_9^post_6, e_10^0'=e_10^post_6, f_11^0'=f_11^post_6, g_12^0'=g_12^post_6, h_13^0'=h_13^post_6, lt_14^0'=lt_14^post_6, lt_15^0'=lt_15^post_6, lt_16^0'=lt_16^post_6, lt_17^0'=lt_17^post_6, lt_18^0'=lt_18^post_6, lt_19^0'=lt_19^post_6, lt_20^0'=lt_20^post_6, lt_21^0'=lt_21^post_6, lt_22^0'=lt_22^post_6, lt_23^0'=lt_23^post_6, lt_24^0'=lt_24^post_6, lt_25^0'=lt_25^post_6, x_5^0'=x_5^post_6, [ lt_25^1_4_1==cnt_38^0 && -lt_25^1_4_1<=0 && lt_25^post_6==lt_25^post_6 && lt_24^1_3_1==cnt_38^0 && 0<=-1+lt_24^1_3_1 && lt_24^post_6==lt_24^post_6 && lt_23^1_2_1==cnt_38^0 && lt_23^post_6==lt_23^post_6 && lt_22^1_2_1==lt_22^1_2_1 && lt_22^post_6==lt_22^post_6 && lt_19^1_3_1==lt_19^1_3_1 && -lt_19^1_3_1<=0 && lt_19^post_6==lt_19^post_6 && lt_18^1_3_1==lt_18^1_3_1 && 0<=-1+lt_18^1_3_1 && lt_18^post_6==lt_18^post_6 && lt_17^1_1==lt_17^1_1 && lt_17^post_6==lt_17^post_6 && lt_16^1_1==lt_16^1_1 && lt_16^post_6==lt_16^post_6 && Result_4^0==Result_4^post_6 && a_6^0==a_6^post_6 && b_7^0==b_7^post_6 && c_8^0==c_8^post_6 && cnt_38^0==cnt_38^post_6 && d_9^0==d_9^post_6 && e_10^0==e_10^post_6 && f_11^0==f_11^post_6 && g_12^0==g_12^post_6 && h_13^0==h_13^post_6 && lt_14^0==lt_14^post_6 && lt_15^0==lt_15^post_6 && lt_20^0==lt_20^post_6 && lt_21^0==lt_21^post_6 && x_5^0==x_5^post_6 ], cost: 1
      7: l3 -> l5 : Result_4^0'=Result_4^post_8, a_6^0'=a_6^post_8, b_7^0'=b_7^post_8, c_8^0'=c_8^post_8, cnt_38^0'=cnt_38^post_8, d_9^0'=d_9^post_8, e_10^0'=e_10^post_8, f_11^0'=f_11^post_8, g_12^0'=g_12^post_8, h_13^0'=h_13^post_8, lt_14^0'=lt_14^post_8, lt_15^0'=lt_15^post_8, lt_16^0'=lt_16^post_8, lt_17^0'=lt_17^post_8, lt_18^0'=lt_18^post_8, lt_19^0'=lt_19^post_8, lt_20^0'=lt_20^post_8, lt_21^0'=lt_21^post_8, lt_22^0'=lt_22^post_8, lt_23^0'=lt_23^post_8, lt_24^0'=lt_24^post_8, lt_25^0'=lt_25^post_8, x_5^0'=x_5^post_8, [ lt_25^1_5_1==cnt_38^0 && -lt_25^1_5_1<=0 && lt_25^post_8==lt_25^post_8 && lt_24^1_4_1==cnt_38^0 && 0<=-1+lt_24^1_4_1 && lt_24^post_8==lt_24^post_8 && lt_23^1_3_1==cnt_38^0 && lt_23^post_8==lt_23^post_8 && lt_22^1_3_1==lt_22^1_3_1 && lt_22^post_8==lt_22^post_8 && lt_19^1_4_1==lt_19^1_4_1 && 0<=-1-lt_19^1_4_1 && lt_19^post_8==lt_19^post_8 && lt_15^1_1==lt_15^1_1 && lt_15^post_8==lt_15^post_8 && lt_14^1_1==lt_14^1_1 && lt_14^post_8==lt_14^post_8 && Result_4^0==Result_4^post_8 && a_6^0==a_6^post_8 && b_7^0==b_7^post_8 && c_8^0==c_8^post_8 && cnt_38^0==cnt_38^post_8 && d_9^0==d_9^post_8 && e_10^0==e_10^post_8 && f_11^0==f_11^post_8 && g_12^0==g_12^post_8 && h_13^0==h_13^post_8 && lt_16^0==lt_16^post_8 && lt_17^0==lt_17^post_8 && lt_18^0==lt_18^post_8 && lt_20^0==lt_20^post_8 && lt_21^0==lt_21^post_8 && x_5^0==x_5^post_8 ], cost: 1
      9: l3 -> l6 : Result_4^0'=Result_4^post_10, a_6^0'=a_6^post_10, b_7^0'=b_7^post_10, c_8^0'=c_8^post_10, cnt_38^0'=cnt_38^post_10, d_9^0'=d_9^post_10, e_10^0'=e_10^post_10, f_11^0'=f_11^post_10, g_12^0'=g_12^post_10, h_13^0'=h_13^post_10, lt_14^0'=lt_14^post_10, lt_15^0'=lt_15^post_10, lt_16^0'=lt_16^post_10, lt_17^0'=lt_17^post_10, lt_18^0'=lt_18^post_10, lt_19^0'=lt_19^post_10, lt_20^0'=lt_20^post_10, lt_21^0'=lt_21^post_10, lt_22^0'=lt_22^post_10, lt_23^0'=lt_23^post_10, lt_24^0'=lt_24^post_10, lt_25^0'=lt_25^post_10, x_5^0'=x_5^post_10, [ lt_25^1_6_1==cnt_38^0 && 0<=-1-lt_25^1_6_1 && lt_25^post_10==lt_25^post_10 && lt_21^1_2_1==cnt_38^0 && lt_21^post_10==lt_21^post_10 && lt_20^1_2_1==lt_20^1_2_1 && lt_20^post_10==lt_20^post_10 && lt_19^1_5_1==lt_19^1_5_1 && -lt_19^1_5_1<=0 && lt_19^post_10==lt_19^post_10 && lt_18^1_4_1==lt_18^1_4_1 && 0<=-1+lt_18^1_4_1 && lt_18^post_10==lt_18^post_10 && lt_17^1_2_1==lt_17^1_2_1 && lt_17^post_10==lt_17^post_10 && lt_16^1_2==lt_16^1_2 && lt_16^post_10==lt_16^post_10 && Result_4^0==Result_4^post_10 && a_6^0==a_6^post_10 && b_7^0==b_7^post_10 && c_8^0==c_8^post_10 && cnt_38^0==cnt_38^post_10 && d_9^0==d_9^post_10 && e_10^0==e_10^post_10 && f_11^0==f_11^post_10 && g_12^0==g_12^post_10 && h_13^0==h_13^post_10 && lt_14^0==lt_14^post_10 && lt_15^0==lt_15^post_10 && lt_22^0==lt_22^post_10 && lt_23^0==lt_23^post_10 && lt_24^0==lt_24^post_10 && x_5^0==x_5^post_10 ], cost: 1
     11: l3 -> l7 : Result_4^0'=Result_4^post_12, a_6^0'=a_6^post_12, b_7^0'=b_7^post_12, c_8^0'=c_8^post_12, cnt_38^0'=cnt_38^post_12, d_9^0'=d_9^post_12, e_10^0'=e_10^post_12, f_11^0'=f_11^post_12, g_12^0'=g_12^post_12, h_13^0'=h_13^post_12, lt_14^0'=lt_14^post_12, lt_15^0'=lt_15^post_12, lt_16^0'=lt_16^post_12, lt_17^0'=lt_17^post_12, lt_18^0'=lt_18^post_12, lt_19^0'=lt_19^post_12, lt_20^0'=lt_20^post_12, lt_21^0'=lt_21^post_12, lt_22^0'=lt_22^post_12, lt_23^0'=lt_23^post_12, lt_24^0'=lt_24^post_12, lt_25^0'=lt_25^post_12, x_5^0'=x_5^post_12, [ lt_25^1_7_1==cnt_38^0 && 0<=-1-lt_25^1_7_1 && lt_25^post_12==lt_25^post_12 && lt_21^1_3_1==cnt_38^0 && lt_21^post_12==lt_21^post_12 && lt_20^1_3_1==lt_20^1_3_1 && lt_20^post_12==lt_20^post_12 && lt_19^1_6_1==lt_19^1_6_1 && 0<=-1-lt_19^1_6_1 && lt_19^post_12==lt_19^post_12 && lt_15^1_2_1==lt_15^1_2_1 && lt_15^post_12==lt_15^post_12 && lt_14^1_2==lt_14^1_2 && lt_14^post_12==lt_14^post_12 && Result_4^0==Result_4^post_12 && a_6^0==a_6^post_12 && b_7^0==b_7^post_12 && c_8^0==c_8^post_12 && cnt_38^0==cnt_38^post_12 && d_9^0==d_9^post_12 && e_10^0==e_10^post_12 && f_11^0==f_11^post_12 && g_12^0==g_12^post_12 && h_13^0==h_13^post_12 && lt_16^0==lt_16^post_12 && lt_17^0==lt_17^post_12 && lt_18^0==lt_18^post_12 && lt_22^0==lt_22^post_12 && lt_23^0==lt_23^post_12 && lt_24^0==lt_24^post_12 && x_5^0==x_5^post_12 ], cost: 1
      6: l4 -> l3 : Result_4^0'=Result_4^post_7, a_6^0'=a_6^post_7, b_7^0'=b_7^post_7, c_8^0'=c_8^post_7, cnt_38^0'=cnt_38^post_7, d_9^0'=d_9^post_7, e_10^0'=e_10^post_7, f_11^0'=f_11^post_7, g_12^0'=g_12^post_7, h_13^0'=h_13^post_7, lt_14^0'=lt_14^post_7, lt_15^0'=lt_15^post_7, lt_16^0'=lt_16^post_7, lt_17^0'=lt_17^post_7, lt_18^0'=lt_18^post_7, lt_19^0'=lt_19^post_7, lt_20^0'=lt_20^post_7, lt_21^0'=lt_21^post_7, lt_22^0'=lt_22^post_7, lt_23^0'=lt_23^post_7, lt_24^0'=lt_24^post_7, lt_25^0'=lt_25^post_7, x_5^0'=x_5^post_7, [ Result_4^0==Result_4^post_7 && a_6^0==a_6^post_7 && b_7^0==b_7^post_7 && c_8^0==c_8^post_7 && cnt_38^0==cnt_38^post_7 && d_9^0==d_9^post_7 && e_10^0==e_10^post_7 && f_11^0==f_11^post_7 && g_12^0==g_12^post_7 && h_13^0==h_13^post_7 && lt_14^0==lt_14^post_7 && lt_15^0==lt_15^post_7 && lt_16^0==lt_16^post_7 && lt_17^0==lt_17^post_7 && lt_18^0==lt_18^post_7 && lt_19^0==lt_19^post_7 && lt_20^0==lt_20^post_7 && lt_21^0==lt_21^post_7 && lt_22^0==lt_22^post_7 && lt_23^0==lt_23^post_7 && lt_24^0==lt_24^post_7 && lt_25^0==lt_25^post_7 && x_5^0==x_5^post_7 ], cost: 1
      8: l5 -> l3 : Result_4^0'=Result_4^post_9, a_6^0'=a_6^post_9, b_7^0'=b_7^post_9, c_8^0'=c_8^post_9, cnt_38^0'=cnt_38^post_9, d_9^0'=d_9^post_9, e_10^0'=e_10^post_9, f_11^0'=f_11^post_9, g_12^0'=g_12^post_9, h_13^0'=h_13^post_9, lt_14^0'=lt_14^post_9, lt_15^0'=lt_15^post_9, lt_16^0'=lt_16^post_9, lt_17^0'=lt_17^post_9, lt_18^0'=lt_18^post_9, lt_19^0'=lt_19^post_9, lt_20^0'=lt_20^post_9, lt_21^0'=lt_21^post_9, lt_22^0'=lt_22^post_9, lt_23^0'=lt_23^post_9, lt_24^0'=lt_24^post_9, lt_25^0'=lt_25^post_9, x_5^0'=x_5^post_9, [ Result_4^0==Result_4^post_9 && a_6^0==a_6^post_9 && b_7^0==b_7^post_9 && c_8^0==c_8^post_9 && cnt_38^0==cnt_38^post_9 && d_9^0==d_9^post_9 && e_10^0==e_10^post_9 && f_11^0==f_11^post_9 && g_12^0==g_12^post_9 && h_13^0==h_13^post_9 && lt_14^0==lt_14^post_9 && lt_15^0==lt_15^post_9 && lt_16^0==lt_16^post_9 && lt_17^0==lt_17^post_9 && lt_18^0==lt_18^post_9 && lt_19^0==lt_19^post_9 && lt_20^0==lt_20^post_9 && lt_21^0==lt_21^post_9 && lt_22^0==lt_22^post_9 && lt_23^0==lt_23^post_9 && lt_24^0==lt_24^post_9 && lt_25^0==lt_25^post_9 && x_5^0==x_5^post_9 ], cost: 1
     10: l6 -> l3 : Result_4^0'=Result_4^post_11, a_6^0'=a_6^post_11, b_7^0'=b_7^post_11, c_8^0'=c_8^post_11, cnt_38^0'=cnt_38^post_11, d_9^0'=d_9^post_11, e_10^0'=e_10^post_11, f_11^0'=f_11^post_11, g_12^0'=g_12^post_11, h_13^0'=h_13^post_11, lt_14^0'=lt_14^post_11, lt_15^0'=lt_15^post_11, lt_16^0'=lt_16^post_11, lt_17^0'=lt_17^post_11, lt_18^0'=lt_18^post_11, lt_19^0'=lt_19^post_11, lt_20^0'=lt_20^post_11, lt_21^0'=lt_21^post_11, lt_22^0'=lt_22^post_11, lt_23^0'=lt_23^post_11, lt_24^0'=lt_24^post_11, lt_25^0'=lt_25^post_11, x_5^0'=x_5^post_11, [ Result_4^0==Result_4^post_11 && a_6^0==a_6^post_11 && b_7^0==b_7^post_11 && c_8^0==c_8^post_11 && cnt_38^0==cnt_38^post_11 && d_9^0==d_9^post_11 && e_10^0==e_10^post_11 && f_11^0==f_11^post_11 && g_12^0==g_12^post_11 && h_13^0==h_13^post_11 && lt_14^0==lt_14^post_11 && lt_15^0==lt_15^post_11 && lt_16^0==lt_16^post_11 && lt_17^0==lt_17^post_11 && lt_18^0==lt_18^post_11 && lt_19^0==lt_19^post_11 && lt_20^0==lt_20^post_11 && lt_21^0==lt_21^post_11 && lt_22^0==lt_22^post_11 && lt_23^0==lt_23^post_11 && lt_24^0==lt_24^post_11 && lt_25^0==lt_25^post_11 && x_5^0==x_5^post_11 ], cost: 1
     12: l7 -> l3 : Result_4^0'=Result_4^post_13, a_6^0'=a_6^post_13, b_7^0'=b_7^post_13, c_8^0'=c_8^post_13, cnt_38^0'=cnt_38^post_13, d_9^0'=d_9^post_13, e_10^0'=e_10^post_13, f_11^0'=f_11^post_13, g_12^0'=g_12^post_13, h_13^0'=h_13^post_13, lt_14^0'=lt_14^post_13, lt_15^0'=lt_15^post_13, lt_16^0'=lt_16^post_13, lt_17^0'=lt_17^post_13, lt_18^0'=lt_18^post_13, lt_19^0'=lt_19^post_13, lt_20^0'=lt_20^post_13, lt_21^0'=lt_21^post_13, lt_22^0'=lt_22^post_13, lt_23^0'=lt_23^post_13, lt_24^0'=lt_24^post_13, lt_25^0'=lt_25^post_13, x_5^0'=x_5^post_13, [ Result_4^0==Result_4^post_13 && a_6^0==a_6^post_13 && b_7^0==b_7^post_13 && c_8^0==c_8^post_13 && cnt_38^0==cnt_38^post_13 && d_9^0==d_9^post_13 && e_10^0==e_10^post_13 && f_11^0==f_11^post_13 && g_12^0==g_12^post_13 && h_13^0==h_13^post_13 && lt_14^0==lt_14^post_13 && lt_15^0==lt_15^post_13 && lt_16^0==lt_16^post_13 && lt_17^0==lt_17^post_13 && lt_18^0==lt_18^post_13 && lt_19^0==lt_19^post_13 && lt_20^0==lt_20^post_13 && lt_21^0==lt_21^post_13 && lt_22^0==lt_22^post_13 && lt_23^0==lt_23^post_13 && lt_24^0==lt_24^post_13 && lt_25^0==lt_25^post_13 && x_5^0==x_5^post_13 ], cost: 1
     13: l8 -> l2 : Result_4^0'=Result_4^post_14, a_6^0'=a_6^post_14, b_7^0'=b_7^post_14, c_8^0'=c_8^post_14, cnt_38^0'=cnt_38^post_14, d_9^0'=d_9^post_14, e_10^0'=e_10^post_14, f_11^0'=f_11^post_14, g_12^0'=g_12^post_14, h_13^0'=h_13^post_14, lt_14^0'=lt_14^post_14, lt_15^0'=lt_15^post_14, lt_16^0'=lt_16^post_14, lt_17^0'=lt_17^post_14, lt_18^0'=lt_18^post_14, lt_19^0'=lt_19^post_14, lt_20^0'=lt_20^post_14, lt_21^0'=lt_21^post_14, lt_22^0'=lt_22^post_14, lt_23^0'=lt_23^post_14, lt_24^0'=lt_24^post_14, lt_25^0'=lt_25^post_14, x_5^0'=x_5^post_14, [ Result_4^0==Result_4^post_14 && a_6^0==a_6^post_14 && b_7^0==b_7^post_14 && c_8^0==c_8^post_14 && cnt_38^0==cnt_38^post_14 && d_9^0==d_9^post_14 && e_10^0==e_10^post_14 && f_11^0==f_11^post_14 && g_12^0==g_12^post_14 && h_13^0==h_13^post_14 && lt_14^0==lt_14^post_14 && lt_15^0==lt_15^post_14 && lt_16^0==lt_16^post_14 && lt_17^0==lt_17^post_14 && lt_18^0==lt_18^post_14 && lt_19^0==lt_19^post_14 && lt_20^0==lt_20^post_14 && lt_21^0==lt_21^post_14 && lt_22^0==lt_22^post_14 && lt_23^0==lt_23^post_14 && lt_24^0==lt_24^post_14 && lt_25^0==lt_25^post_14 && x_5^0==x_5^post_14 ], cost: 1

Checking for constant complexity:
   The following rule is satisfiable with cost >= 1, yielding constant complexity:
     13: l8 -> l2 : Result_4^0'=Result_4^post_14, a_6^0'=a_6^post_14, b_7^0'=b_7^post_14, c_8^0'=c_8^post_14, cnt_38^0'=cnt_38^post_14, d_9^0'=d_9^post_14, e_10^0'=e_10^post_14, f_11^0'=f_11^post_14, g_12^0'=g_12^post_14, h_13^0'=h_13^post_14, lt_14^0'=lt_14^post_14, lt_15^0'=lt_15^post_14, lt_16^0'=lt_16^post_14, lt_17^0'=lt_17^post_14, lt_18^0'=lt_18^post_14, lt_19^0'=lt_19^post_14, lt_20^0'=lt_20^post_14, lt_21^0'=lt_21^post_14, lt_22^0'=lt_22^post_14, lt_23^0'=lt_23^post_14, lt_24^0'=lt_24^post_14, lt_25^0'=lt_25^post_14, x_5^0'=x_5^post_14, [ Result_4^0==Result_4^post_14 && a_6^0==a_6^post_14 && b_7^0==b_7^post_14 && c_8^0==c_8^post_14 && cnt_38^0==cnt_38^post_14 && d_9^0==d_9^post_14 && e_10^0==e_10^post_14 && f_11^0==f_11^post_14 && g_12^0==g_12^post_14 && h_13^0==h_13^post_14 && lt_14^0==lt_14^post_14 && lt_15^0==lt_15^post_14 && lt_16^0==lt_16^post_14 && lt_17^0==lt_17^post_14 && lt_18^0==lt_18^post_14 && lt_19^0==lt_19^post_14 && lt_20^0==lt_20^post_14 && lt_21^0==lt_21^post_14 && lt_22^0==lt_22^post_14 && lt_23^0==lt_23^post_14 && lt_24^0==lt_24^post_14 && lt_25^0==lt_25^post_14 && x_5^0==x_5^post_14 ], cost: 1

Removed unreachable and leaf rules:
   Start location: l8
      1: l2 -> l3 : Result_4^0'=Result_4^post_2, a_6^0'=a_6^post_2, b_7^0'=b_7^post_2, c_8^0'=c_8^post_2, cnt_38^0'=cnt_38^post_2, d_9^0'=d_9^post_2, e_10^0'=e_10^post_2, f_11^0'=f_11^post_2, g_12^0'=g_12^post_2, h_13^0'=h_13^post_2, lt_14^0'=lt_14^post_2, lt_15^0'=lt_15^post_2, lt_16^0'=lt_16^post_2, lt_17^0'=lt_17^post_2, lt_18^0'=lt_18^post_2, lt_19^0'=lt_19^post_2, lt_20^0'=lt_20^post_2, lt_21^0'=lt_21^post_2, lt_22^0'=lt_22^post_2, lt_23^0'=lt_23^post_2, lt_24^0'=lt_24^post_2, lt_25^0'=lt_25^post_2, x_5^0'=x_5^post_2, [ x_5^post_2==x_5^post_2 && a_6^post_2==x_5^post_2 && b_7^post_2==a_6^post_2 && c_8^post_2==b_7^post_2 && d_9^post_2==c_8^post_2 && e_10^post_2==d_9^post_2 && f_11^post_2==e_10^post_2 && g_12^post_2==f_11^post_2 && h_13^post_2==g_12^post_2 && Result_4^0==Result_4^post_2 && cnt_38^0==cnt_38^post_2 && lt_14^0==lt_14^post_2 && lt_15^0==lt_15^post_2 && lt_16^0==lt_16^post_2 && lt_17^0==lt_17^post_2 && lt_18^0==lt_18^post_2 && lt_19^0==lt_19^post_2 && lt_20^0==lt_20^post_2 && lt_21^0==lt_21^post_2 && lt_22^0==lt_22^post_2 && lt_23^0==lt_23^post_2 && lt_24^0==lt_24^post_2 && lt_25^0==lt_25^post_2 ], cost: 1
      5: l3 -> l4 : Result_4^0'=Result_4^post_6, a_6^0'=a_6^post_6, b_7^0'=b_7^post_6, c_8^0'=c_8^post_6, cnt_38^0'=cnt_38^post_6, d_9^0'=d_9^post_6, e_10^0'=e_10^post_6, f_11^0'=f_11^post_6, g_12^0'=g_12^post_6, h_13^0'=h_13^post_6, lt_14^0'=lt_14^post_6, lt_15^0'=lt_15^post_6, lt_16^0'=lt_16^post_6, lt_17^0'=lt_17^post_6, lt_18^0'=lt_18^post_6, lt_19^0'=lt_19^post_6, lt_20^0'=lt_20^post_6, lt_21^0'=lt_21^post_6, lt_22^0'=lt_22^post_6, lt_23^0'=lt_23^post_6, lt_24^0'=lt_24^post_6, lt_25^0'=lt_25^post_6, x_5^0'=x_5^post_6, [ lt_25^1_4_1==cnt_38^0 && -lt_25^1_4_1<=0 && lt_25^post_6==lt_25^post_6 && lt_24^1_3_1==cnt_38^0 && 0<=-1+lt_24^1_3_1 && lt_24^post_6==lt_24^post_6 && lt_23^1_2_1==cnt_38^0 && lt_23^post_6==lt_23^post_6 && lt_22^1_2_1==lt_22^1_2_1 && lt_22^post_6==lt_22^post_6 && lt_19^1_3_1==lt_19^1_3_1 && -lt_19^1_3_1<=0 && lt_19^post_6==lt_19^post_6 && lt_18^1_3_1==lt_18^1_3_1 && 0<=-1+lt_18^1_3_1 && lt_18^post_6==lt_18^post_6 && lt_17^1_1==lt_17^1_1 && lt_17^post_6==lt_17^post_6 && lt_16^1_1==lt_16^1_1 && lt_16^post_6==lt_16^post_6 && Result_4^0==Result_4^post_6 && a_6^0==a_6^post_6 && b_7^0==b_7^post_6 && c_8^0==c_8^post_6 && cnt_38^0==cnt_38^post_6 && d_9^0==d_9^post_6 && e_10^0==e_10^post_6 && f_11^0==f_11^post_6 && g_12^0==g_12^post_6 && h_13^0==h_13^post_6 && lt_14^0==lt_14^post_6 && lt_15^0==lt_15^post_6 && lt_20^0==lt_20^post_6 && lt_21^0==lt_21^post_6 && x_5^0==x_5^post_6 ], cost: 1
      7: l3 -> l5 : Result_4^0'=Result_4^post_8, a_6^0'=a_6^post_8, b_7^0'=b_7^post_8, c_8^0'=c_8^post_8, cnt_38^0'=cnt_38^post_8, d_9^0'=d_9^post_8, e_10^0'=e_10^post_8, f_11^0'=f_11^post_8, g_12^0'=g_12^post_8, h_13^0'=h_13^post_8, lt_14^0'=lt_14^post_8, lt_15^0'=lt_15^post_8, lt_16^0'=lt_16^post_8, lt_17^0'=lt_17^post_8, lt_18^0'=lt_18^post_8, lt_19^0'=lt_19^post_8, lt_20^0'=lt_20^post_8, lt_21^0'=lt_21^post_8, lt_22^0'=lt_22^post_8, lt_23^0'=lt_23^post_8, lt_24^0'=lt_24^post_8, lt_25^0'=lt_25^post_8, x_5^0'=x_5^post_8, [ lt_25^1_5_1==cnt_38^0 && -lt_25^1_5_1<=0 && lt_25^post_8==lt_25^post_8 && lt_24^1_4_1==cnt_38^0 && 0<=-1+lt_24^1_4_1 && lt_24^post_8==lt_24^post_8 && lt_23^1_3_1==cnt_38^0 && lt_23^post_8==lt_23^post_8 && lt_22^1_3_1==lt_22^1_3_1 && lt_22^post_8==lt_22^post_8 && lt_19^1_4_1==lt_19^1_4_1 && 0<=-1-lt_19^1_4_1 && lt_19^post_8==lt_19^post_8 && lt_15^1_1==lt_15^1_1 && lt_15^post_8==lt_15^post_8 && lt_14^1_1==lt_14^1_1 && lt_14^post_8==lt_14^post_8 && Result_4^0==Result_4^post_8 && a_6^0==a_6^post_8 && b_7^0==b_7^post_8 && c_8^0==c_8^post_8 && cnt_38^0==cnt_38^post_8 && d_9^0==d_9^post_8 && e_10^0==e_10^post_8 && f_11^0==f_11^post_8 && g_12^0==g_12^post_8 && h_13^0==h_13^post_8 && lt_16^0==lt_16^post_8 && lt_17^0==lt_17^post_8 && lt_18^0==lt_18^post_8 && lt_20^0==lt_20^post_8 && lt_21^0==lt_21^post_8 && x_5^0==x_5^post_8 ], cost: 1
      9: l3 -> l6 : Result_4^0'=Result_4^post_10, a_6^0'=a_6^post_10, b_7^0'=b_7^post_10, c_8^0'=c_8^post_10, cnt_38^0'=cnt_38^post_10, d_9^0'=d_9^post_10, e_10^0'=e_10^post_10, f_11^0'=f_11^post_10, g_12^0'=g_12^post_10, h_13^0'=h_13^post_10, lt_14^0'=lt_14^post_10, lt_15^0'=lt_15^post_10, lt_16^0'=lt_16^post_10, lt_17^0'=lt_17^post_10, lt_18^0'=lt_18^post_10, lt_19^0'=lt_19^post_10, lt_20^0'=lt_20^post_10, lt_21^0'=lt_21^post_10, lt_22^0'=lt_22^post_10, lt_23^0'=lt_23^post_10, lt_24^0'=lt_24^post_10, lt_25^0'=lt_25^post_10, x_5^0'=x_5^post_10, [ lt_25^1_6_1==cnt_38^0 && 0<=-1-lt_25^1_6_1 && lt_25^post_10==lt_25^post_10 && lt_21^1_2_1==cnt_38^0 && lt_21^post_10==lt_21^post_10 && lt_20^1_2_1==lt_20^1_2_1 && lt_20^post_10==lt_20^post_10 && lt_19^1_5_1==lt_19^1_5_1 && -lt_19^1_5_1<=0 && lt_19^post_10==lt_19^post_10 && lt_18^1_4_1==lt_18^1_4_1 && 0<=-1+lt_18^1_4_1 && lt_18^post_10==lt_18^post_10 && lt_17^1_2_1==lt_17^1_2_1 && lt_17^post_10==lt_17^post_10 && lt_16^1_2==lt_16^1_2 && lt_16^post_10==lt_16^post_10 && Result_4^0==Result_4^post_10 && a_6^0==a_6^post_10 && b_7^0==b_7^post_10 && c_8^0==c_8^post_10 && cnt_38^0==cnt_38^post_10 && d_9^0==d_9^post_10 && e_10^0==e_10^post_10 && f_11^0==f_11^post_10 && g_12^0==g_12^post_10 && h_13^0==h_13^post_10 && lt_14^0==lt_14^post_10 && lt_15^0==lt_15^post_10 && lt_22^0==lt_22^post_10 && lt_23^0==lt_23^post_10 && lt_24^0==lt_24^post_10 && x_5^0==x_5^post_10 ], cost: 1
     11: l3 -> l7 : Result_4^0'=Result_4^post_12, a_6^0'=a_6^post_12, b_7^0'=b_7^post_12, c_8^0'=c_8^post_12, cnt_38^0'=cnt_38^post_12, d_9^0'=d_9^post_12, e_10^0'=e_10^post_12, f_11^0'=f_11^post_12, g_12^0'=g_12^post_12, h_13^0'=h_13^post_12, lt_14^0'=lt_14^post_12, lt_15^0'=lt_15^post_12, lt_16^0'=lt_16^post_12, lt_17^0'=lt_17^post_12, lt_18^0'=lt_18^post_12, lt_19^0'=lt_19^post_12, lt_20^0'=lt_20^post_12, lt_21^0'=lt_21^post_12, lt_22^0'=lt_22^post_12, lt_23^0'=lt_23^post_12, lt_24^0'=lt_24^post_12, lt_25^0'=lt_25^post_12, x_5^0'=x_5^post_12, [ lt_25^1_7_1==cnt_38^0 && 0<=-1-lt_25^1_7_1 && lt_25^post_12==lt_25^post_12 && lt_21^1_3_1==cnt_38^0 && lt_21^post_12==lt_21^post_12 && lt_20^1_3_1==lt_20^1_3_1 && lt_20^post_12==lt_20^post_12 && lt_19^1_6_1==lt_19^1_6_1 && 0<=-1-lt_19^1_6_1 && lt_19^post_12==lt_19^post_12 && lt_15^1_2_1==lt_15^1_2_1 && lt_15^post_12==lt_15^post_12 && lt_14^1_2==lt_14^1_2 && lt_14^post_12==lt_14^post_12 && Result_4^0==Result_4^post_12 && a_6^0==a_6^post_12 && b_7^0==b_7^post_12 && c_8^0==c_8^post_12 && cnt_38^0==cnt_38^post_12 && d_9^0==d_9^post_12 && e_10^0==e_10^post_12 && f_11^0==f_11^post_12 && g_12^0==g_12^post_12 && h_13^0==h_13^post_12 && lt_16^0==lt_16^post_12 && lt_17^0==lt_17^post_12 && lt_18^0==lt_18^post_12 && lt_22^0==lt_22^post_12 && lt_23^0==lt_23^post_12 && lt_24^0==lt_24^post_12 && x_5^0==x_5^post_12 ], cost: 1
      6: l4 -> l3 : Result_4^0'=Result_4^post_7, a_6^0'=a_6^post_7, b_7^0'=b_7^post_7, c_8^0'=c_8^post_7, cnt_38^0'=cnt_38^post_7, d_9^0'=d_9^post_7, e_10^0'=e_10^post_7, f_11^0'=f_11^post_7, g_12^0'=g_12^post_7, h_13^0'=h_13^post_7, lt_14^0'=lt_14^post_7, lt_15^0'=lt_15^post_7, lt_16^0'=lt_16^post_7, lt_17^0'=lt_17^post_7, lt_18^0'=lt_18^post_7, lt_19^0'=lt_19^post_7, lt_20^0'=lt_20^post_7, lt_21^0'=lt_21^post_7, lt_22^0'=lt_22^post_7, lt_23^0'=lt_23^post_7, lt_24^0'=lt_24^post_7, lt_25^0'=lt_25^post_7, x_5^0'=x_5^post_7, [ Result_4^0==Result_4^post_7 && a_6^0==a_6^post_7 && b_7^0==b_7^post_7 && c_8^0==c_8^post_7 && cnt_38^0==cnt_38^post_7 && d_9^0==d_9^post_7 && e_10^0==e_10^post_7 && f_11^0==f_11^post_7 && g_12^0==g_12^post_7 && h_13^0==h_13^post_7 && lt_14^0==lt_14^post_7 && lt_15^0==lt_15^post_7 && lt_16^0==lt_16^post_7 && lt_17^0==lt_17^post_7 && lt_18^0==lt_18^post_7 && lt_19^0==lt_19^post_7 && lt_20^0==lt_20^post_7 && lt_21^0==lt_21^post_7 && lt_22^0==lt_22^post_7 && lt_23^0==lt_23^post_7 && lt_24^0==lt_24^post_7 && lt_25^0==lt_25^post_7 && x_5^0==x_5^post_7 ], cost: 1
      8: l5 -> l3 : Result_4^0'=Result_4^post_9, a_6^0'=a_6^post_9, b_7^0'=b_7^post_9, c_8^0'=c_8^post_9, cnt_38^0'=cnt_38^post_9, d_9^0'=d_9^post_9, e_10^0'=e_10^post_9, f_11^0'=f_11^post_9, g_12^0'=g_12^post_9, h_13^0'=h_13^post_9, lt_14^0'=lt_14^post_9, lt_15^0'=lt_15^post_9, lt_16^0'=lt_16^post_9, lt_17^0'=lt_17^post_9, lt_18^0'=lt_18^post_9, lt_19^0'=lt_19^post_9, lt_20^0'=lt_20^post_9, lt_21^0'=lt_21^post_9, lt_22^0'=lt_22^post_9, lt_23^0'=lt_23^post_9, lt_24^0'=lt_24^post_9, lt_25^0'=lt_25^post_9, x_5^0'=x_5^post_9, [ Result_4^0==Result_4^post_9 && a_6^0==a_6^post_9 && b_7^0==b_7^post_9 && c_8^0==c_8^post_9 && cnt_38^0==cnt_38^post_9 && d_9^0==d_9^post_9 && e_10^0==e_10^post_9 && f_11^0==f_11^post_9 && g_12^0==g_12^post_9 && h_13^0==h_13^post_9 && lt_14^0==lt_14^post_9 && lt_15^0==lt_15^post_9 && lt_16^0==lt_16^post_9 && lt_17^0==lt_17^post_9 && lt_18^0==lt_18^post_9 && lt_19^0==lt_19^post_9 && lt_20^0==lt_20^post_9 && lt_21^0==lt_21^post_9 && lt_22^0==lt_22^post_9 && lt_23^0==lt_23^post_9 && lt_24^0==lt_24^post_9 && lt_25^0==lt_25^post_9 && x_5^0==x_5^post_9 ], cost: 1
     10: l6 -> l3 : Result_4^0'=Result_4^post_11, a_6^0'=a_6^post_11, b_7^0'=b_7^post_11, c_8^0'=c_8^post_11, cnt_38^0'=cnt_38^post_11, d_9^0'=d_9^post_11, e_10^0'=e_10^post_11, f_11^0'=f_11^post_11, g_12^0'=g_12^post_11, h_13^0'=h_13^post_11, lt_14^0'=lt_14^post_11, lt_15^0'=lt_15^post_11, lt_16^0'=lt_16^post_11, lt_17^0'=lt_17^post_11, lt_18^0'=lt_18^post_11, lt_19^0'=lt_19^post_11, lt_20^0'=lt_20^post_11, lt_21^0'=lt_21^post_11, lt_22^0'=lt_22^post_11, lt_23^0'=lt_23^post_11, lt_24^0'=lt_24^post_11, lt_25^0'=lt_25^post_11, x_5^0'=x_5^post_11, [ Result_4^0==Result_4^post_11 && a_6^0==a_6^post_11 && b_7^0==b_7^post_11 && c_8^0==c_8^post_11 && cnt_38^0==cnt_38^post_11 && d_9^0==d_9^post_11 && e_10^0==e_10^post_11 && f_11^0==f_11^post_11 && g_12^0==g_12^post_11 && h_13^0==h_13^post_11 && lt_14^0==lt_14^post_11 && lt_15^0==lt_15^post_11 && lt_16^0==lt_16^post_11 && lt_17^0==lt_17^post_11 && lt_18^0==lt_18^post_11 && lt_19^0==lt_19^post_11 && lt_20^0==lt_20^post_11 && lt_21^0==lt_21^post_11 && lt_22^0==lt_22^post_11 && lt_23^0==lt_23^post_11 && lt_24^0==lt_24^post_11 && lt_25^0==lt_25^post_11 && x_5^0==x_5^post_11 ], cost: 1
     12: l7 -> l3 : Result_4^0'=Result_4^post_13, a_6^0'=a_6^post_13, b_7^0'=b_7^post_13, c_8^0'=c_8^post_13, cnt_38^0'=cnt_38^post_13, d_9^0'=d_9^post_13, e_10^0'=e_10^post_13, f_11^0'=f_11^post_13, g_12^0'=g_12^post_13, h_13^0'=h_13^post_13, lt_14^0'=lt_14^post_13, lt_15^0'=lt_15^post_13, lt_16^0'=lt_16^post_13, lt_17^0'=lt_17^post_13, lt_18^0'=lt_18^post_13, lt_19^0'=lt_19^post_13, lt_20^0'=lt_20^post_13, lt_21^0'=lt_21^post_13, lt_22^0'=lt_22^post_13, lt_23^0'=lt_23^post_13, lt_24^0'=lt_24^post_13, lt_25^0'=lt_25^post_13, x_5^0'=x_5^post_13, [ Result_4^0==Result_4^post_13 && a_6^0==a_6^post_13 && b_7^0==b_7^post_13 && c_8^0==c_8^post_13 && cnt_38^0==cnt_38^post_13 && d_9^0==d_9^post_13 && e_10^0==e_10^post_13 && f_11^0==f_11^post_13 && g_12^0==g_12^post_13 && h_13^0==h_13^post_13 && lt_14^0==lt_14^post_13 && lt_15^0==lt_15^post_13 && lt_16^0==lt_16^post_13 && lt_17^0==lt_17^post_13 && lt_18^0==lt_18^post_13 && lt_19^0==lt_19^post_13 && lt_20^0==lt_20^post_13 && lt_21^0==lt_21^post_13 && lt_22^0==lt_22^post_13 && lt_23^0==lt_23^post_13 && lt_24^0==lt_24^post_13 && lt_25^0==lt_25^post_13 && x_5^0==x_5^post_13 ], cost: 1
     13: l8 -> l2 : Result_4^0'=Result_4^post_14, a_6^0'=a_6^post_14, b_7^0'=b_7^post_14, c_8^0'=c_8^post_14, cnt_38^0'=cnt_38^post_14, d_9^0'=d_9^post_14, e_10^0'=e_10^post_14, f_11^0'=f_11^post_14, g_12^0'=g_12^post_14, h_13^0'=h_13^post_14, lt_14^0'=lt_14^post_14, lt_15^0'=lt_15^post_14, lt_16^0'=lt_16^post_14, lt_17^0'=lt_17^post_14, lt_18^0'=lt_18^post_14, lt_19^0'=lt_19^post_14, lt_20^0'=lt_20^post_14, lt_21^0'=lt_21^post_14, lt_22^0'=lt_22^post_14, lt_23^0'=lt_23^post_14, lt_24^0'=lt_24^post_14, lt_25^0'=lt_25^post_14, x_5^0'=x_5^post_14, [ Result_4^0==Result_4^post_14 && a_6^0==a_6^post_14 && b_7^0==b_7^post_14 && c_8^0==c_8^post_14 && cnt_38^0==cnt_38^post_14 && d_9^0==d_9^post_14 && e_10^0==e_10^post_14 && f_11^0==f_11^post_14 && g_12^0==g_12^post_14 && h_13^0==h_13^post_14 && lt_14^0==lt_14^post_14 && lt_15^0==lt_15^post_14 && lt_16^0==lt_16^post_14 && lt_17^0==lt_17^post_14 && lt_18^0==lt_18^post_14 && lt_19^0==lt_19^post_14 && lt_20^0==lt_20^post_14 && lt_21^0==lt_21^post_14 && lt_22^0==lt_22^post_14 && lt_23^0==lt_23^post_14 && lt_24^0==lt_24^post_14 && lt_25^0==lt_25^post_14 && x_5^0==x_5^post_14 ], cost: 1

Simplified all rules, resulting in:
   Start location: l8
      1: l2 -> l3 : a_6^0'=h_13^post_2, b_7^0'=h_13^post_2, c_8^0'=h_13^post_2, d_9^0'=h_13^post_2, e_10^0'=h_13^post_2, f_11^0'=h_13^post_2, g_12^0'=h_13^post_2, h_13^0'=h_13^post_2, x_5^0'=h_13^post_2, [], cost: 1
      5: l3 -> l4 : lt_16^0'=lt_16^post_6, lt_17^0'=lt_17^post_6, lt_18^0'=lt_18^post_6, lt_19^0'=lt_19^post_6, lt_22^0'=lt_22^post_6, lt_23^0'=lt_23^post_6, lt_24^0'=lt_24^post_6, lt_25^0'=lt_25^post_6, [ 0<=-1+cnt_38^0 ], cost: 1
      7: l3 -> l5 : lt_14^0'=lt_14^post_8, lt_15^0'=lt_15^post_8, lt_19^0'=lt_19^post_8, lt_22^0'=lt_22^post_8, lt_23^0'=lt_23^post_8, lt_24^0'=lt_24^post_8, lt_25^0'=lt_25^post_8, [ 0<=-1+cnt_38^0 ], cost: 1
      9: l3 -> l6 : lt_16^0'=lt_16^post_10, lt_17^0'=lt_17^post_10, lt_18^0'=lt_18^post_10, lt_19^0'=lt_19^post_10, lt_20^0'=lt_20^post_10, lt_21^0'=lt_21^post_10, lt_25^0'=lt_25^post_10, [ 0<=-1-cnt_38^0 ], cost: 1
     11: l3 -> l7 : lt_14^0'=lt_14^post_12, lt_15^0'=lt_15^post_12, lt_19^0'=lt_19^post_12, lt_20^0'=lt_20^post_12, lt_21^0'=lt_21^post_12, lt_25^0'=lt_25^post_12, [ 0<=-1-cnt_38^0 ], cost: 1
      6: l4 -> l3 : [], cost: 1
      8: l5 -> l3 : [], cost: 1
     10: l6 -> l3 : [], cost: 1
     12: l7 -> l3 : [], cost: 1
     13: l8 -> l2 : [], cost: 1

### Simplification by acceleration and chaining ###

Eliminated locations (on linear paths):
   Start location: l8
     15: l3 -> l3 : lt_16^0'=lt_16^post_6, lt_17^0'=lt_17^post_6, lt_18^0'=lt_18^post_6, lt_19^0'=lt_19^post_6, lt_22^0'=lt_22^post_6, lt_23^0'=lt_23^post_6, lt_24^0'=lt_24^post_6, lt_25^0'=lt_25^post_6, [ 0<=-1+cnt_38^0 ], cost: 2
     16: l3 -> l3 : lt_14^0'=lt_14^post_8, lt_15^0'=lt_15^post_8, lt_19^0'=lt_19^post_8, lt_22^0'=lt_22^post_8, lt_23^0'=lt_23^post_8, lt_24^0'=lt_24^post_8, lt_25^0'=lt_25^post_8, [ 0<=-1+cnt_38^0 ], cost: 2
     17: l3 -> l3 : lt_16^0'=lt_16^post_10, lt_17^0'=lt_17^post_10, lt_18^0'=lt_18^post_10, lt_19^0'=lt_19^post_10, lt_20^0'=lt_20^post_10, lt_21^0'=lt_21^post_10, lt_25^0'=lt_25^post_10, [ 0<=-1-cnt_38^0 ], cost: 2
     18: l3 -> l3 : lt_14^0'=lt_14^post_12, lt_15^0'=lt_15^post_12, lt_19^0'=lt_19^post_12, lt_20^0'=lt_20^post_12, lt_21^0'=lt_21^post_12, lt_25^0'=lt_25^post_12, [ 0<=-1-cnt_38^0 ], cost: 2
     14: l8 -> l3 : a_6^0'=h_13^post_2, b_7^0'=h_13^post_2, c_8^0'=h_13^post_2, d_9^0'=h_13^post_2, e_10^0'=h_13^post_2, f_11^0'=h_13^post_2, g_12^0'=h_13^post_2, h_13^0'=h_13^post_2, x_5^0'=h_13^post_2, [], cost: 2

Accelerating simple loops of location 3.
   Accelerating the following rules:
     15: l3 -> l3 : lt_16^0'=lt_16^post_6, lt_17^0'=lt_17^post_6, lt_18^0'=lt_18^post_6, lt_19^0'=lt_19^post_6, lt_22^0'=lt_22^post_6, lt_23^0'=lt_23^post_6, lt_24^0'=lt_24^post_6, lt_25^0'=lt_25^post_6, [ 0<=-1+cnt_38^0 ], cost: 2
     16: l3 -> l3 : lt_14^0'=lt_14^post_8, lt_15^0'=lt_15^post_8, lt_19^0'=lt_19^post_8, lt_22^0'=lt_22^post_8, lt_23^0'=lt_23^post_8, lt_24^0'=lt_24^post_8, lt_25^0'=lt_25^post_8, [ 0<=-1+cnt_38^0 ], cost: 2
     17: l3 -> l3 : lt_16^0'=lt_16^post_10, lt_17^0'=lt_17^post_10, lt_18^0'=lt_18^post_10, lt_19^0'=lt_19^post_10, lt_20^0'=lt_20^post_10, lt_21^0'=lt_21^post_10, lt_25^0'=lt_25^post_10, [ 0<=-1-cnt_38^0 ], cost: 2
     18: l3 -> l3 : lt_14^0'=lt_14^post_12, lt_15^0'=lt_15^post_12, lt_19^0'=lt_19^post_12, lt_20^0'=lt_20^post_12, lt_21^0'=lt_21^post_12, lt_25^0'=lt_25^post_12, [ 0<=-1-cnt_38^0 ], cost: 2

   Accelerated rule 15 with non-termination, yielding the new rule 19.
   Accelerated rule 16 with non-termination, yielding the new rule 20.
   Accelerated rule 17 with non-termination, yielding the new rule 21.
   Accelerated rule 18 with non-termination, yielding the new rule 22.
[accelerate] Nesting with 0 inner and 0 outer candidates
   Removing the simple loops: 15 16 17 18.
   Also removing duplicate rules: 19 21.

Accelerated all simple loops using metering functions (where possible):
   Start location: l8
     20: l3 -> [9] : [ 0<=-1+cnt_38^0 ], cost: NONTERM
     22: l3 -> [9] : [ 0<=-1-cnt_38^0 ], cost: NONTERM
     14: l8 -> l3 : a_6^0'=h_13^post_2, b_7^0'=h_13^post_2, c_8^0'=h_13^post_2, d_9^0'=h_13^post_2, e_10^0'=h_13^post_2, f_11^0'=h_13^post_2, g_12^0'=h_13^post_2, h_13^0'=h_13^post_2, x_5^0'=h_13^post_2, [], cost: 2

Chained accelerated rules (with incoming rules):
   Start location: l8
     14: l8 -> l3 : a_6^0'=h_13^post_2, b_7^0'=h_13^post_2, c_8^0'=h_13^post_2, d_9^0'=h_13^post_2, e_10^0'=h_13^post_2, f_11^0'=h_13^post_2, g_12^0'=h_13^post_2, h_13^0'=h_13^post_2, x_5^0'=h_13^post_2, [], cost: 2
     23: l8 -> [9] : [ 0<=-1+cnt_38^0 ], cost: NONTERM
     24: l8 -> [9] : [ 0<=-1-cnt_38^0 ], cost: NONTERM

Removed unreachable locations (and leaf rules with constant cost):
   Start location: l8
     23: l8 -> [9] : [ 0<=-1+cnt_38^0 ], cost: NONTERM
     24: l8 -> [9] : [ 0<=-1-cnt_38^0 ], cost: NONTERM

### Computing asymptotic complexity ###

Fully simplified ITS problem
   Start location: l8
     23: l8 -> [9] : [ 0<=-1+cnt_38^0 ], cost: NONTERM
     24: l8 -> [9] : [ 0<=-1-cnt_38^0 ], cost: NONTERM

Computing asymptotic complexity for rule 23
   Guard is satisfiable, yielding nontermination
   Resulting cost NONTERM has complexity: Nonterm

Found new complexity Nonterm.

Obtained the following overall complexity (w.r.t. the length of the input n):
   Complexity:  Nonterm
   Cpx degree:  Nonterm
   Solved cost: NONTERM
   Rule cost:   NONTERM
   Rule guard:  [ 0<=-1+cnt_38^0 ]

NO