WORST_CASE(Omega(1),?) ### Pre-processing the ITS problem ### Initial linear ITS problem Start location: l9 0: l0 -> l1 : __const_10^0'=__const_10^post_1, __const_12^0'=__const_12^post_1, __const_30^0'=__const_30^post_1, __const_5^0'=__const_5^post_1, a4^0'=a4^post_1, a^0'=a^post_1, answer^0'=answer^post_1, b5^0'=b5^post_1, b^0'=b^post_1, ret_complex6^0'=ret_complex6^post_1, [ __const_30^0<=a4^0 && ret_complex6^post_1==1 && answer^post_1==ret_complex6^post_1 && __const_10^0==__const_10^post_1 && __const_12^0==__const_12^post_1 && __const_30^0==__const_30^post_1 && __const_5^0==__const_5^post_1 && a^0==a^post_1 && a4^0==a4^post_1 && b^0==b^post_1 && b5^0==b5^post_1 ], cost: 1 1: l0 -> l2 : __const_10^0'=__const_10^post_2, __const_12^0'=__const_12^post_2, __const_30^0'=__const_30^post_2, __const_5^0'=__const_5^post_2, a4^0'=a4^post_2, a^0'=a^post_2, answer^0'=answer^post_2, b5^0'=b5^post_2, b^0'=b^post_2, ret_complex6^0'=ret_complex6^post_2, [ 1+a4^0<=__const_30^0 && __const_10^0==__const_10^post_2 && __const_12^0==__const_12^post_2 && __const_30^0==__const_30^post_2 && __const_5^0==__const_5^post_2 && a^0==a^post_2 && a4^0==a4^post_2 && answer^0==answer^post_2 && b^0==b^post_2 && b5^0==b5^post_2 && ret_complex6^0==ret_complex6^post_2 ], cost: 1 3: l2 -> l4 : __const_10^0'=__const_10^post_4, __const_12^0'=__const_12^post_4, __const_30^0'=__const_30^post_4, __const_5^0'=__const_5^post_4, a4^0'=a4^post_4, a^0'=a^post_4, answer^0'=answer^post_4, b5^0'=b5^post_4, b^0'=b^post_4, ret_complex6^0'=ret_complex6^post_4, [ __const_10^0==__const_10^post_4 && __const_12^0==__const_12^post_4 && __const_30^0==__const_30^post_4 && __const_5^0==__const_5^post_4 && a^0==a^post_4 && a4^0==a4^post_4 && answer^0==answer^post_4 && b^0==b^post_4 && b5^0==b5^post_4 && ret_complex6^0==ret_complex6^post_4 ], cost: 1 2: l3 -> l0 : __const_10^0'=__const_10^post_3, __const_12^0'=__const_12^post_3, __const_30^0'=__const_30^post_3, __const_5^0'=__const_5^post_3, a4^0'=a4^post_3, a^0'=a^post_3, answer^0'=answer^post_3, b5^0'=b5^post_3, b^0'=b^post_3, ret_complex6^0'=ret_complex6^post_3, [ __const_10^0==__const_10^post_3 && __const_12^0==__const_12^post_3 && __const_30^0==__const_30^post_3 && __const_5^0==__const_5^post_3 && a^0==a^post_3 && a4^0==a4^post_3 && answer^0==answer^post_3 && b^0==b^post_3 && b5^0==b5^post_3 && ret_complex6^0==ret_complex6^post_3 ], cost: 1 10: l4 -> l3 : __const_10^0'=__const_10^post_11, __const_12^0'=__const_12^post_11, __const_30^0'=__const_30^post_11, __const_5^0'=__const_5^post_11, a4^0'=a4^post_11, a^0'=a^post_11, answer^0'=answer^post_11, b5^0'=b5^post_11, b^0'=b^post_11, ret_complex6^0'=ret_complex6^post_11, [ a4^0<=b5^0 && a4^post_11==2+a4^0 && b5^post_11==b5^0-__const_10^0 && __const_10^0==__const_10^post_11 && __const_12^0==__const_12^post_11 && __const_30^0==__const_30^post_11 && __const_5^0==__const_5^post_11 && a^0==a^post_11 && answer^0==answer^post_11 && b^0==b^post_11 && ret_complex6^0==ret_complex6^post_11 ], cost: 1 11: l4 -> l7 : __const_10^0'=__const_10^post_12, __const_12^0'=__const_12^post_12, __const_30^0'=__const_30^post_12, __const_5^0'=__const_5^post_12, a4^0'=a4^post_12, a^0'=a^post_12, answer^0'=answer^post_12, b5^0'=b5^post_12, b^0'=b^post_12, ret_complex6^0'=ret_complex6^post_12, [ 1+b5^0<=a4^0 && __const_10^0==__const_10^post_12 && __const_12^0==__const_12^post_12 && __const_30^0==__const_30^post_12 && __const_5^0==__const_5^post_12 && a^0==a^post_12 && a4^0==a4^post_12 && answer^0==answer^post_12 && b^0==b^post_12 && b5^0==b5^post_12 && ret_complex6^0==ret_complex6^post_12 ], cost: 1 4: l5 -> l2 : __const_10^0'=__const_10^post_5, __const_12^0'=__const_12^post_5, __const_30^0'=__const_30^post_5, __const_5^0'=__const_5^post_5, a4^0'=a4^post_5, a^0'=a^post_5, answer^0'=answer^post_5, b5^0'=b5^post_5, b^0'=b^post_5, ret_complex6^0'=ret_complex6^post_5, [ 1+__const_12^0<=b5^0 && a4^post_5==1+a4^0 && __const_10^0==__const_10^post_5 && __const_12^0==__const_12^post_5 && __const_30^0==__const_30^post_5 && __const_5^0==__const_5^post_5 && a^0==a^post_5 && answer^0==answer^post_5 && b^0==b^post_5 && b5^0==b5^post_5 && ret_complex6^0==ret_complex6^post_5 ], cost: 1 5: l5 -> l2 : __const_10^0'=__const_10^post_6, __const_12^0'=__const_12^post_6, __const_30^0'=__const_30^post_6, __const_5^0'=__const_5^post_6, a4^0'=a4^post_6, a^0'=a^post_6, answer^0'=answer^post_6, b5^0'=b5^post_6, b^0'=b^post_6, ret_complex6^0'=ret_complex6^post_6, [ b5^0<=__const_12^0 && a4^post_6==a4^0+__const_10^0 && __const_10^0==__const_10^post_6 && __const_12^0==__const_12^post_6 && __const_30^0==__const_30^post_6 && __const_5^0==__const_5^post_6 && a^0==a^post_6 && answer^0==answer^post_6 && b^0==b^post_6 && b5^0==b5^post_6 && ret_complex6^0==ret_complex6^post_6 ], cost: 1 6: l6 -> l2 : __const_10^0'=__const_10^post_7, __const_12^0'=__const_12^post_7, __const_30^0'=__const_30^post_7, __const_5^0'=__const_5^post_7, a4^0'=a4^post_7, a^0'=a^post_7, answer^0'=answer^post_7, b5^0'=b5^post_7, b^0'=b^post_7, ret_complex6^0'=ret_complex6^post_7, [ 1+b5^0<=__const_10^0 && a4^post_7==1+a4^0 && __const_10^0==__const_10^post_7 && __const_12^0==__const_12^post_7 && __const_30^0==__const_30^post_7 && __const_5^0==__const_5^post_7 && a^0==a^post_7 && answer^0==answer^post_7 && b^0==b^post_7 && b5^0==b5^post_7 && ret_complex6^0==ret_complex6^post_7 ], cost: 1 7: l6 -> l5 : __const_10^0'=__const_10^post_8, __const_12^0'=__const_12^post_8, __const_30^0'=__const_30^post_8, __const_5^0'=__const_5^post_8, a4^0'=a4^post_8, a^0'=a^post_8, answer^0'=answer^post_8, b5^0'=b5^post_8, b^0'=b^post_8, ret_complex6^0'=ret_complex6^post_8, [ __const_10^0<=b5^0 && __const_10^0==__const_10^post_8 && __const_12^0==__const_12^post_8 && __const_30^0==__const_30^post_8 && __const_5^0==__const_5^post_8 && a^0==a^post_8 && a4^0==a4^post_8 && answer^0==answer^post_8 && b^0==b^post_8 && b5^0==b5^post_8 && ret_complex6^0==ret_complex6^post_8 ], cost: 1 8: l7 -> l6 : __const_10^0'=__const_10^post_9, __const_12^0'=__const_12^post_9, __const_30^0'=__const_30^post_9, __const_5^0'=__const_5^post_9, a4^0'=a4^post_9, a^0'=a^post_9, answer^0'=answer^post_9, b5^0'=b5^post_9, b^0'=b^post_9, ret_complex6^0'=ret_complex6^post_9, [ b5^0<=__const_5^0 && b5^post_9==2+b5^0 && __const_10^0==__const_10^post_9 && __const_12^0==__const_12^post_9 && __const_30^0==__const_30^post_9 && __const_5^0==__const_5^post_9 && a^0==a^post_9 && a4^0==a4^post_9 && answer^0==answer^post_9 && b^0==b^post_9 && ret_complex6^0==ret_complex6^post_9 ], cost: 1 9: l7 -> l6 : __const_10^0'=__const_10^post_10, __const_12^0'=__const_12^post_10, __const_30^0'=__const_30^post_10, __const_5^0'=__const_5^post_10, a4^0'=a4^post_10, a^0'=a^post_10, answer^0'=answer^post_10, b5^0'=b5^post_10, b^0'=b^post_10, ret_complex6^0'=ret_complex6^post_10, [ 1+__const_5^0<=b5^0 && b5^post_10==b5^post_10 && __const_10^0==__const_10^post_10 && __const_12^0==__const_12^post_10 && __const_30^0==__const_30^post_10 && __const_5^0==__const_5^post_10 && a^0==a^post_10 && a4^0==a4^post_10 && answer^0==answer^post_10 && b^0==b^post_10 && ret_complex6^0==ret_complex6^post_10 ], cost: 1 12: l8 -> l3 : __const_10^0'=__const_10^post_13, __const_12^0'=__const_12^post_13, __const_30^0'=__const_30^post_13, __const_5^0'=__const_5^post_13, a4^0'=a4^post_13, a^0'=a^post_13, answer^0'=answer^post_13, b5^0'=b5^post_13, b^0'=b^post_13, ret_complex6^0'=ret_complex6^post_13, [ a^post_13==1 && b^post_13==1 && answer^post_13==0 && a4^post_13==a^post_13 && b5^post_13==b^post_13 && __const_10^0==__const_10^post_13 && __const_12^0==__const_12^post_13 && __const_30^0==__const_30^post_13 && __const_5^0==__const_5^post_13 && ret_complex6^0==ret_complex6^post_13 ], cost: 1 13: l9 -> l8 : __const_10^0'=__const_10^post_14, __const_12^0'=__const_12^post_14, __const_30^0'=__const_30^post_14, __const_5^0'=__const_5^post_14, a4^0'=a4^post_14, a^0'=a^post_14, answer^0'=answer^post_14, b5^0'=b5^post_14, b^0'=b^post_14, ret_complex6^0'=ret_complex6^post_14, [ __const_10^0==__const_10^post_14 && __const_12^0==__const_12^post_14 && __const_30^0==__const_30^post_14 && __const_5^0==__const_5^post_14 && a^0==a^post_14 && a4^0==a4^post_14 && answer^0==answer^post_14 && b^0==b^post_14 && b5^0==b5^post_14 && ret_complex6^0==ret_complex6^post_14 ], cost: 1 Checking for constant complexity: The following rule is satisfiable with cost >= 1, yielding constant complexity: 13: l9 -> l8 : __const_10^0'=__const_10^post_14, __const_12^0'=__const_12^post_14, __const_30^0'=__const_30^post_14, __const_5^0'=__const_5^post_14, a4^0'=a4^post_14, a^0'=a^post_14, answer^0'=answer^post_14, b5^0'=b5^post_14, b^0'=b^post_14, ret_complex6^0'=ret_complex6^post_14, [ __const_10^0==__const_10^post_14 && __const_12^0==__const_12^post_14 && __const_30^0==__const_30^post_14 && __const_5^0==__const_5^post_14 && a^0==a^post_14 && a4^0==a4^post_14 && answer^0==answer^post_14 && b^0==b^post_14 && b5^0==b5^post_14 && ret_complex6^0==ret_complex6^post_14 ], cost: 1 Removed unreachable and leaf rules: Start location: l9 1: l0 -> l2 : __const_10^0'=__const_10^post_2, __const_12^0'=__const_12^post_2, __const_30^0'=__const_30^post_2, __const_5^0'=__const_5^post_2, a4^0'=a4^post_2, a^0'=a^post_2, answer^0'=answer^post_2, b5^0'=b5^post_2, b^0'=b^post_2, ret_complex6^0'=ret_complex6^post_2, [ 1+a4^0<=__const_30^0 && __const_10^0==__const_10^post_2 && __const_12^0==__const_12^post_2 && __const_30^0==__const_30^post_2 && __const_5^0==__const_5^post_2 && a^0==a^post_2 && a4^0==a4^post_2 && answer^0==answer^post_2 && b^0==b^post_2 && b5^0==b5^post_2 && ret_complex6^0==ret_complex6^post_2 ], cost: 1 3: l2 -> l4 : __const_10^0'=__const_10^post_4, __const_12^0'=__const_12^post_4, __const_30^0'=__const_30^post_4, __const_5^0'=__const_5^post_4, a4^0'=a4^post_4, a^0'=a^post_4, answer^0'=answer^post_4, b5^0'=b5^post_4, b^0'=b^post_4, ret_complex6^0'=ret_complex6^post_4, [ __const_10^0==__const_10^post_4 && __const_12^0==__const_12^post_4 && __const_30^0==__const_30^post_4 && __const_5^0==__const_5^post_4 && a^0==a^post_4 && a4^0==a4^post_4 && answer^0==answer^post_4 && b^0==b^post_4 && b5^0==b5^post_4 && ret_complex6^0==ret_complex6^post_4 ], cost: 1 2: l3 -> l0 : __const_10^0'=__const_10^post_3, __const_12^0'=__const_12^post_3, __const_30^0'=__const_30^post_3, __const_5^0'=__const_5^post_3, a4^0'=a4^post_3, a^0'=a^post_3, answer^0'=answer^post_3, b5^0'=b5^post_3, b^0'=b^post_3, ret_complex6^0'=ret_complex6^post_3, [ __const_10^0==__const_10^post_3 && __const_12^0==__const_12^post_3 && __const_30^0==__const_30^post_3 && __const_5^0==__const_5^post_3 && a^0==a^post_3 && a4^0==a4^post_3 && answer^0==answer^post_3 && b^0==b^post_3 && b5^0==b5^post_3 && ret_complex6^0==ret_complex6^post_3 ], cost: 1 10: l4 -> l3 : __const_10^0'=__const_10^post_11, __const_12^0'=__const_12^post_11, __const_30^0'=__const_30^post_11, __const_5^0'=__const_5^post_11, a4^0'=a4^post_11, a^0'=a^post_11, answer^0'=answer^post_11, b5^0'=b5^post_11, b^0'=b^post_11, ret_complex6^0'=ret_complex6^post_11, [ a4^0<=b5^0 && a4^post_11==2+a4^0 && b5^post_11==b5^0-__const_10^0 && __const_10^0==__const_10^post_11 && __const_12^0==__const_12^post_11 && __const_30^0==__const_30^post_11 && __const_5^0==__const_5^post_11 && a^0==a^post_11 && answer^0==answer^post_11 && b^0==b^post_11 && ret_complex6^0==ret_complex6^post_11 ], cost: 1 11: l4 -> l7 : __const_10^0'=__const_10^post_12, __const_12^0'=__const_12^post_12, __const_30^0'=__const_30^post_12, __const_5^0'=__const_5^post_12, a4^0'=a4^post_12, a^0'=a^post_12, answer^0'=answer^post_12, b5^0'=b5^post_12, b^0'=b^post_12, ret_complex6^0'=ret_complex6^post_12, [ 1+b5^0<=a4^0 && __const_10^0==__const_10^post_12 && __const_12^0==__const_12^post_12 && __const_30^0==__const_30^post_12 && __const_5^0==__const_5^post_12 && a^0==a^post_12 && a4^0==a4^post_12 && answer^0==answer^post_12 && b^0==b^post_12 && b5^0==b5^post_12 && ret_complex6^0==ret_complex6^post_12 ], cost: 1 4: l5 -> l2 : __const_10^0'=__const_10^post_5, __const_12^0'=__const_12^post_5, __const_30^0'=__const_30^post_5, __const_5^0'=__const_5^post_5, a4^0'=a4^post_5, a^0'=a^post_5, answer^0'=answer^post_5, b5^0'=b5^post_5, b^0'=b^post_5, ret_complex6^0'=ret_complex6^post_5, [ 1+__const_12^0<=b5^0 && a4^post_5==1+a4^0 && __const_10^0==__const_10^post_5 && __const_12^0==__const_12^post_5 && __const_30^0==__const_30^post_5 && __const_5^0==__const_5^post_5 && a^0==a^post_5 && answer^0==answer^post_5 && b^0==b^post_5 && b5^0==b5^post_5 && ret_complex6^0==ret_complex6^post_5 ], cost: 1 5: l5 -> l2 : __const_10^0'=__const_10^post_6, __const_12^0'=__const_12^post_6, __const_30^0'=__const_30^post_6, __const_5^0'=__const_5^post_6, a4^0'=a4^post_6, a^0'=a^post_6, answer^0'=answer^post_6, b5^0'=b5^post_6, b^0'=b^post_6, ret_complex6^0'=ret_complex6^post_6, [ b5^0<=__const_12^0 && a4^post_6==a4^0+__const_10^0 && __const_10^0==__const_10^post_6 && __const_12^0==__const_12^post_6 && __const_30^0==__const_30^post_6 && __const_5^0==__const_5^post_6 && a^0==a^post_6 && answer^0==answer^post_6 && b^0==b^post_6 && b5^0==b5^post_6 && ret_complex6^0==ret_complex6^post_6 ], cost: 1 6: l6 -> l2 : __const_10^0'=__const_10^post_7, __const_12^0'=__const_12^post_7, __const_30^0'=__const_30^post_7, __const_5^0'=__const_5^post_7, a4^0'=a4^post_7, a^0'=a^post_7, answer^0'=answer^post_7, b5^0'=b5^post_7, b^0'=b^post_7, ret_complex6^0'=ret_complex6^post_7, [ 1+b5^0<=__const_10^0 && a4^post_7==1+a4^0 && __const_10^0==__const_10^post_7 && __const_12^0==__const_12^post_7 && __const_30^0==__const_30^post_7 && __const_5^0==__const_5^post_7 && a^0==a^post_7 && answer^0==answer^post_7 && b^0==b^post_7 && b5^0==b5^post_7 && ret_complex6^0==ret_complex6^post_7 ], cost: 1 7: l6 -> l5 : __const_10^0'=__const_10^post_8, __const_12^0'=__const_12^post_8, __const_30^0'=__const_30^post_8, __const_5^0'=__const_5^post_8, a4^0'=a4^post_8, a^0'=a^post_8, answer^0'=answer^post_8, b5^0'=b5^post_8, b^0'=b^post_8, ret_complex6^0'=ret_complex6^post_8, [ __const_10^0<=b5^0 && __const_10^0==__const_10^post_8 && __const_12^0==__const_12^post_8 && __const_30^0==__const_30^post_8 && __const_5^0==__const_5^post_8 && a^0==a^post_8 && a4^0==a4^post_8 && answer^0==answer^post_8 && b^0==b^post_8 && b5^0==b5^post_8 && ret_complex6^0==ret_complex6^post_8 ], cost: 1 8: l7 -> l6 : __const_10^0'=__const_10^post_9, __const_12^0'=__const_12^post_9, __const_30^0'=__const_30^post_9, __const_5^0'=__const_5^post_9, a4^0'=a4^post_9, a^0'=a^post_9, answer^0'=answer^post_9, b5^0'=b5^post_9, b^0'=b^post_9, ret_complex6^0'=ret_complex6^post_9, [ b5^0<=__const_5^0 && b5^post_9==2+b5^0 && __const_10^0==__const_10^post_9 && __const_12^0==__const_12^post_9 && __const_30^0==__const_30^post_9 && __const_5^0==__const_5^post_9 && a^0==a^post_9 && a4^0==a4^post_9 && answer^0==answer^post_9 && b^0==b^post_9 && ret_complex6^0==ret_complex6^post_9 ], cost: 1 9: l7 -> l6 : __const_10^0'=__const_10^post_10, __const_12^0'=__const_12^post_10, __const_30^0'=__const_30^post_10, __const_5^0'=__const_5^post_10, a4^0'=a4^post_10, a^0'=a^post_10, answer^0'=answer^post_10, b5^0'=b5^post_10, b^0'=b^post_10, ret_complex6^0'=ret_complex6^post_10, [ 1+__const_5^0<=b5^0 && b5^post_10==b5^post_10 && __const_10^0==__const_10^post_10 && __const_12^0==__const_12^post_10 && __const_30^0==__const_30^post_10 && __const_5^0==__const_5^post_10 && a^0==a^post_10 && a4^0==a4^post_10 && answer^0==answer^post_10 && b^0==b^post_10 && ret_complex6^0==ret_complex6^post_10 ], cost: 1 12: l8 -> l3 : __const_10^0'=__const_10^post_13, __const_12^0'=__const_12^post_13, __const_30^0'=__const_30^post_13, __const_5^0'=__const_5^post_13, a4^0'=a4^post_13, a^0'=a^post_13, answer^0'=answer^post_13, b5^0'=b5^post_13, b^0'=b^post_13, ret_complex6^0'=ret_complex6^post_13, [ a^post_13==1 && b^post_13==1 && answer^post_13==0 && a4^post_13==a^post_13 && b5^post_13==b^post_13 && __const_10^0==__const_10^post_13 && __const_12^0==__const_12^post_13 && __const_30^0==__const_30^post_13 && __const_5^0==__const_5^post_13 && ret_complex6^0==ret_complex6^post_13 ], cost: 1 13: l9 -> l8 : __const_10^0'=__const_10^post_14, __const_12^0'=__const_12^post_14, __const_30^0'=__const_30^post_14, __const_5^0'=__const_5^post_14, a4^0'=a4^post_14, a^0'=a^post_14, answer^0'=answer^post_14, b5^0'=b5^post_14, b^0'=b^post_14, ret_complex6^0'=ret_complex6^post_14, [ __const_10^0==__const_10^post_14 && __const_12^0==__const_12^post_14 && __const_30^0==__const_30^post_14 && __const_5^0==__const_5^post_14 && a^0==a^post_14 && a4^0==a4^post_14 && answer^0==answer^post_14 && b^0==b^post_14 && b5^0==b5^post_14 && ret_complex6^0==ret_complex6^post_14 ], cost: 1 Simplified all rules, resulting in: Start location: l9 1: l0 -> l2 : [ 1+a4^0<=__const_30^0 ], cost: 1 3: l2 -> l4 : [], cost: 1 2: l3 -> l0 : [], cost: 1 10: l4 -> l3 : a4^0'=2+a4^0, b5^0'=b5^0-__const_10^0, [ a4^0<=b5^0 ], cost: 1 11: l4 -> l7 : [ 1+b5^0<=a4^0 ], cost: 1 4: l5 -> l2 : a4^0'=1+a4^0, [ 1+__const_12^0<=b5^0 ], cost: 1 5: l5 -> l2 : a4^0'=a4^0+__const_10^0, [ b5^0<=__const_12^0 ], cost: 1 6: l6 -> l2 : a4^0'=1+a4^0, [ 1+b5^0<=__const_10^0 ], cost: 1 7: l6 -> l5 : [ __const_10^0<=b5^0 ], cost: 1 8: l7 -> l6 : b5^0'=2+b5^0, [ b5^0<=__const_5^0 ], cost: 1 9: l7 -> l6 : b5^0'=b5^post_10, [ 1+__const_5^0<=b5^0 ], cost: 1 12: l8 -> l3 : a4^0'=1, a^0'=1, answer^0'=0, b5^0'=1, b^0'=1, [], cost: 1 13: l9 -> l8 : [], cost: 1 ### Simplification by acceleration and chaining ### Eliminated locations (on linear paths): Start location: l9 3: l2 -> l4 : [], cost: 1 15: l3 -> l2 : [ 1+a4^0<=__const_30^0 ], cost: 2 10: l4 -> l3 : a4^0'=2+a4^0, b5^0'=b5^0-__const_10^0, [ a4^0<=b5^0 ], cost: 1 11: l4 -> l7 : [ 1+b5^0<=a4^0 ], cost: 1 4: l5 -> l2 : a4^0'=1+a4^0, [ 1+__const_12^0<=b5^0 ], cost: 1 5: l5 -> l2 : a4^0'=a4^0+__const_10^0, [ b5^0<=__const_12^0 ], cost: 1 6: l6 -> l2 : a4^0'=1+a4^0, [ 1+b5^0<=__const_10^0 ], cost: 1 7: l6 -> l5 : [ __const_10^0<=b5^0 ], cost: 1 8: l7 -> l6 : b5^0'=2+b5^0, [ b5^0<=__const_5^0 ], cost: 1 9: l7 -> l6 : b5^0'=b5^post_10, [ 1+__const_5^0<=b5^0 ], cost: 1 14: l9 -> l3 : a4^0'=1, a^0'=1, answer^0'=0, b5^0'=1, b^0'=1, [], cost: 2 Eliminated locations (on tree-shaped paths): Start location: l9 16: l2 -> l3 : a4^0'=2+a4^0, b5^0'=b5^0-__const_10^0, [ a4^0<=b5^0 ], cost: 2 17: l2 -> l7 : [ 1+b5^0<=a4^0 ], cost: 2 15: l3 -> l2 : [ 1+a4^0<=__const_30^0 ], cost: 2 4: l5 -> l2 : a4^0'=1+a4^0, [ 1+__const_12^0<=b5^0 ], cost: 1 5: l5 -> l2 : a4^0'=a4^0+__const_10^0, [ b5^0<=__const_12^0 ], cost: 1 18: l7 -> l2 : a4^0'=1+a4^0, b5^0'=2+b5^0, [ b5^0<=__const_5^0 && 3+b5^0<=__const_10^0 ], cost: 2 19: l7 -> l5 : b5^0'=2+b5^0, [ b5^0<=__const_5^0 && __const_10^0<=2+b5^0 ], cost: 2 20: l7 -> l2 : a4^0'=1+a4^0, b5^0'=b5^post_10, [ 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 ], cost: 2 21: l7 -> l5 : b5^0'=b5^post_10, [ 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 ], cost: 2 14: l9 -> l3 : a4^0'=1, a^0'=1, answer^0'=0, b5^0'=1, b^0'=1, [], cost: 2 Eliminated locations (on tree-shaped paths): Start location: l9 16: l2 -> l3 : a4^0'=2+a4^0, b5^0'=b5^0-__const_10^0, [ a4^0<=b5^0 ], cost: 2 22: l2 -> l2 : a4^0'=1+a4^0, b5^0'=2+b5^0, [ 1+b5^0<=a4^0 && b5^0<=__const_5^0 && 3+b5^0<=__const_10^0 ], cost: 4 23: l2 -> l5 : b5^0'=2+b5^0, [ 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 ], cost: 4 24: l2 -> l2 : a4^0'=1+a4^0, b5^0'=b5^post_10, [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 ], cost: 4 25: l2 -> l5 : b5^0'=b5^post_10, [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 ], cost: 4 15: l3 -> l2 : [ 1+a4^0<=__const_30^0 ], cost: 2 4: l5 -> l2 : a4^0'=1+a4^0, [ 1+__const_12^0<=b5^0 ], cost: 1 5: l5 -> l2 : a4^0'=a4^0+__const_10^0, [ b5^0<=__const_12^0 ], cost: 1 14: l9 -> l3 : a4^0'=1, a^0'=1, answer^0'=0, b5^0'=1, b^0'=1, [], cost: 2 Accelerating simple loops of location 2. Accelerating the following rules: 22: l2 -> l2 : a4^0'=1+a4^0, b5^0'=2+b5^0, [ 1+b5^0<=a4^0 && b5^0<=__const_5^0 && 3+b5^0<=__const_10^0 ], cost: 4 24: l2 -> l2 : a4^0'=1+a4^0, b5^0'=b5^post_10, [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 ], cost: 4 Accelerated rule 22 with backward acceleration, yielding the new rule 26. Accelerated rule 24 with non-termination, yielding the new rule 27. [accelerate] Nesting with 1 inner and 2 outer candidates Removing the simple loops: 22. Accelerated all simple loops using metering functions (where possible): Start location: l9 16: l2 -> l3 : a4^0'=2+a4^0, b5^0'=b5^0-__const_10^0, [ a4^0<=b5^0 ], cost: 2 23: l2 -> l5 : b5^0'=2+b5^0, [ 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 ], cost: 4 24: l2 -> l2 : a4^0'=1+a4^0, b5^0'=b5^post_10, [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 ], cost: 4 25: l2 -> l5 : b5^0'=b5^post_10, [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 ], cost: 4 26: l2 -> l2 : a4^0'=a4^0+k, b5^0'=b5^0+2*k, [ k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 ], cost: 4*k 27: l2 -> [10] : [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && 1+b5^post_10<=1+a4^0 && 1+__const_5^0<=b5^post_10 ], cost: NONTERM 15: l3 -> l2 : [ 1+a4^0<=__const_30^0 ], cost: 2 4: l5 -> l2 : a4^0'=1+a4^0, [ 1+__const_12^0<=b5^0 ], cost: 1 5: l5 -> l2 : a4^0'=a4^0+__const_10^0, [ b5^0<=__const_12^0 ], cost: 1 14: l9 -> l3 : a4^0'=1, a^0'=1, answer^0'=0, b5^0'=1, b^0'=1, [], cost: 2 Chained accelerated rules (with incoming rules): Start location: l9 16: l2 -> l3 : a4^0'=2+a4^0, b5^0'=b5^0-__const_10^0, [ a4^0<=b5^0 ], cost: 2 23: l2 -> l5 : b5^0'=2+b5^0, [ 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 ], cost: 4 25: l2 -> l5 : b5^0'=b5^post_10, [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 ], cost: 4 15: l3 -> l2 : [ 1+a4^0<=__const_30^0 ], cost: 2 30: l3 -> l2 : a4^0'=1+a4^0, b5^0'=b5^post_10, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 ], cost: 6 33: l3 -> l2 : a4^0'=a4^0+k, b5^0'=b5^0+2*k, [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 ], cost: 2+4*k 36: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0 ], cost: NONTERM 4: l5 -> l2 : a4^0'=1+a4^0, [ 1+__const_12^0<=b5^0 ], cost: 1 5: l5 -> l2 : a4^0'=a4^0+__const_10^0, [ b5^0<=__const_12^0 ], cost: 1 28: l5 -> l2 : a4^0'=2+a4^0, b5^0'=b5^post_10, [ 1+__const_12^0<=b5^0 && 1+b5^0<=1+a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 ], cost: 5 29: l5 -> l2 : a4^0'=1+a4^0+__const_10^0, b5^0'=b5^post_10, [ b5^0<=__const_12^0 && 1+b5^0<=a4^0+__const_10^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 ], cost: 5 31: l5 -> l2 : a4^0'=1+a4^0+k, b5^0'=b5^0+2*k, [ 1+__const_12^0<=b5^0 && k>=0 && -1+b5^0+2*k<=a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 ], cost: 1+4*k 32: l5 -> l2 : a4^0'=a4^0+k+__const_10^0, b5^0'=b5^0+2*k, [ b5^0<=__const_12^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k+__const_10^0 && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 ], cost: 1+4*k 34: l5 -> [10] : [ 1+__const_12^0<=b5^0 && 1+b5^0<=1+a4^0 && 1+__const_5^0<=b5^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0 ], cost: NONTERM 35: l5 -> [10] : [ b5^0<=__const_12^0 && 1+b5^0<=a4^0+__const_10^0 && 1+__const_5^0<=b5^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+__const_10^0 ], cost: NONTERM 14: l9 -> l3 : a4^0'=1, a^0'=1, answer^0'=0, b5^0'=1, b^0'=1, [], cost: 2 Eliminated locations (on tree-shaped paths): Start location: l9 16: l2 -> l3 : a4^0'=2+a4^0, b5^0'=b5^0-__const_10^0, [ a4^0<=b5^0 ], cost: 2 37: l2 -> l2 : a4^0'=1+a4^0, b5^0'=2+b5^0, [ 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 ], cost: 5 38: l2 -> l2 : a4^0'=a4^0+__const_10^0, b5^0'=2+b5^0, [ 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 ], cost: 5 39: l2 -> l2 : a4^0'=2+a4^0, b5^0'=b5^post_10, [ b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && 3+b5^0<=1+a4^0 && 1+__const_5^0<=2+b5^0 && 1+b5^post_10<=__const_10^0 ], cost: 9 40: l2 -> l2 : a4^0'=1+a4^0+__const_10^0, b5^0'=b5^post_10, [ 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 && 3+b5^0<=a4^0+__const_10^0 && 1+__const_5^0<=2+b5^0 && 1+b5^post_10<=__const_10^0 ], cost: 9 41: l2 -> [10] : [ b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && 3+b5^0<=1+a4^0 && 1+__const_5^0<=2+b5^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0 ], cost: NONTERM 42: l2 -> [10] : [ 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 && 3+b5^0<=a4^0+__const_10^0 && 1+__const_5^0<=2+b5^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+__const_10^0 ], cost: NONTERM 43: l2 -> l2 : a4^0'=1+a4^0, b5^0'=b5^post_10, [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 ], cost: 5 44: l2 -> l2 : a4^0'=a4^0+__const_10^0, b5^0'=b5^post_10, [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 ], cost: 5 45: l2 -> [10] : [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+a4^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0 ], cost: NONTERM 46: l2 -> [10] : [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=a4^0+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+__const_10^0 ], cost: NONTERM 15: l3 -> l2 : [ 1+a4^0<=__const_30^0 ], cost: 2 30: l3 -> l2 : a4^0'=1+a4^0, b5^0'=b5^post_10, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 ], cost: 6 33: l3 -> l2 : a4^0'=a4^0+k, b5^0'=b5^0+2*k, [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 ], cost: 2+4*k 36: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0 ], cost: NONTERM 14: l9 -> l3 : a4^0'=1, a^0'=1, answer^0'=0, b5^0'=1, b^0'=1, [], cost: 2 Applied pruning (of leafs and parallel rules): Start location: l9 16: l2 -> l3 : a4^0'=2+a4^0, b5^0'=b5^0-__const_10^0, [ a4^0<=b5^0 ], cost: 2 37: l2 -> l2 : a4^0'=1+a4^0, b5^0'=2+b5^0, [ 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 ], cost: 5 38: l2 -> l2 : a4^0'=a4^0+__const_10^0, b5^0'=2+b5^0, [ 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 ], cost: 5 39: l2 -> l2 : a4^0'=2+a4^0, b5^0'=b5^post_10, [ b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && 3+b5^0<=1+a4^0 && 1+__const_5^0<=2+b5^0 && 1+b5^post_10<=__const_10^0 ], cost: 9 40: l2 -> l2 : a4^0'=1+a4^0+__const_10^0, b5^0'=b5^post_10, [ 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 && 3+b5^0<=a4^0+__const_10^0 && 1+__const_5^0<=2+b5^0 && 1+b5^post_10<=__const_10^0 ], cost: 9 41: l2 -> [10] : [ b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && 3+b5^0<=1+a4^0 && 1+__const_5^0<=2+b5^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0 ], cost: NONTERM 42: l2 -> [10] : [ 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 && 3+b5^0<=a4^0+__const_10^0 && 1+__const_5^0<=2+b5^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+__const_10^0 ], cost: NONTERM 44: l2 -> l2 : a4^0'=a4^0+__const_10^0, b5^0'=b5^post_10, [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 ], cost: 5 45: l2 -> [10] : [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+a4^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0 ], cost: NONTERM 46: l2 -> [10] : [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=a4^0+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+__const_10^0 ], cost: NONTERM 15: l3 -> l2 : [ 1+a4^0<=__const_30^0 ], cost: 2 30: l3 -> l2 : a4^0'=1+a4^0, b5^0'=b5^post_10, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 ], cost: 6 33: l3 -> l2 : a4^0'=a4^0+k, b5^0'=b5^0+2*k, [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 ], cost: 2+4*k 36: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0 ], cost: NONTERM 14: l9 -> l3 : a4^0'=1, a^0'=1, answer^0'=0, b5^0'=1, b^0'=1, [], cost: 2 Accelerating simple loops of location 2. Accelerating the following rules: 37: l2 -> l2 : a4^0'=1+a4^0, b5^0'=2+b5^0, [ 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 ], cost: 5 38: l2 -> l2 : a4^0'=a4^0+__const_10^0, b5^0'=2+b5^0, [ 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 ], cost: 5 39: l2 -> l2 : a4^0'=2+a4^0, b5^0'=b5^post_10, [ b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && 3+b5^0<=1+a4^0 && 1+__const_5^0<=2+b5^0 && 1+b5^post_10<=__const_10^0 ], cost: 9 40: l2 -> l2 : a4^0'=1+a4^0+__const_10^0, b5^0'=b5^post_10, [ 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 && 3+b5^0<=a4^0+__const_10^0 && 1+__const_5^0<=2+b5^0 && 1+b5^post_10<=__const_10^0 ], cost: 9 44: l2 -> l2 : a4^0'=a4^0+__const_10^0, b5^0'=b5^post_10, [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 ], cost: 5 Accelerated rule 37 with backward acceleration, yielding the new rule 47. [test] deduced pseudo-invariant -1-b5^0+3*__const_5^0-__const_10^0<=0, also trying 1+b5^0-3*__const_5^0+__const_10^0<=-1 [test] deduced pseudo-invariant -4-4*b5^0+3*__const_12^0+6*__const_5^0-2*__const_10^0<=0, also trying 4+4*b5^0-3*__const_12^0-6*__const_5^0+2*__const_10^0<=-1 [test] deduced pseudo-invariant -7-4*b5^0+6*__const_5^0-__const_10^0<=0, also trying 7+4*b5^0-6*__const_5^0+__const_10^0<=-1 [test] deduced pseudo-invariant -8-11*b5^0+__const_12^0+11*__const_5^0<=0, also trying 8+11*b5^0-__const_12^0-11*__const_5^0<=-1 Accelerated rule 38 with backward acceleration, yielding the new rule 48. Accelerated rule 38 with backward acceleration, yielding the new rule 49. Accelerated rule 38 with backward acceleration, yielding the new rule 50. Accelerated rule 39 with non-termination, yielding the new rule 51. Accelerated rule 40 with non-termination, yielding the new rule 52. [test] deduced pseudo-invariant -1+b5^post_10-__const_5^0-__const_10^0<=0, also trying 1-b5^post_10+__const_5^0+__const_10^0<=-1 [test] deduced pseudo-invariant 2+__const_5^0-__const_10^0<=0, also trying -2-__const_5^0+__const_10^0<=-1 [test] deduced pseudo-invariant 2+__const_12^0-b5^post_10+2*__const_5^0-2*__const_10^0<=0, also trying -2-__const_12^0+b5^post_10-2*__const_5^0+2*__const_10^0<=-1 [test] deduced pseudo-invariant 1+__const_5^0-__const_10^0<=0, also trying -1-__const_5^0+__const_10^0<=-1 [test] deduced pseudo-invariant -b5^0+b5^post_10<=0, also trying b5^0-b5^post_10<=-1 Accelerated rule 44 with non-termination, yielding the new rule 53. Accelerated rule 44 with non-termination, yielding the new rule 54. Accelerated rule 44 with backward acceleration, yielding the new rule 55. Accelerated rule 44 with non-termination, yielding the new rule 56. Accelerated rule 44 with backward acceleration, yielding the new rule 57. Accelerated rule 44 with non-termination, yielding the new rule 58. Accelerated rule 44 with non-termination, yielding the new rule 59. Accelerated rule 44 with backward acceleration, yielding the new rule 60. Accelerated rule 44 with non-termination, yielding the new rule 61. Accelerated rule 44 with backward acceleration, yielding the new rule 62. Accelerated rule 44 with non-termination, yielding the new rule 63. [accelerate] Nesting with 5 inner and 5 outer candidates Removing the simple loops: 37. Also removing duplicate rules: 54 56 59. Accelerated all simple loops using metering functions (where possible): Start location: l9 16: l2 -> l3 : a4^0'=2+a4^0, b5^0'=b5^0-__const_10^0, [ a4^0<=b5^0 ], cost: 2 38: l2 -> l2 : a4^0'=a4^0+__const_10^0, b5^0'=2+b5^0, [ 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 ], cost: 5 39: l2 -> l2 : a4^0'=2+a4^0, b5^0'=b5^post_10, [ b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && 3+b5^0<=1+a4^0 && 1+__const_5^0<=2+b5^0 && 1+b5^post_10<=__const_10^0 ], cost: 9 40: l2 -> l2 : a4^0'=1+a4^0+__const_10^0, b5^0'=b5^post_10, [ 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 && 3+b5^0<=a4^0+__const_10^0 && 1+__const_5^0<=2+b5^0 && 1+b5^post_10<=__const_10^0 ], cost: 9 41: l2 -> [10] : [ b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && 3+b5^0<=1+a4^0 && 1+__const_5^0<=2+b5^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0 ], cost: NONTERM 42: l2 -> [10] : [ 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 && 3+b5^0<=a4^0+__const_10^0 && 1+__const_5^0<=2+b5^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+__const_10^0 ], cost: NONTERM 44: l2 -> l2 : a4^0'=a4^0+__const_10^0, b5^0'=b5^post_10, [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 ], cost: 5 45: l2 -> [10] : [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+a4^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0 ], cost: NONTERM 46: l2 -> [10] : [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=a4^0+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+__const_10^0 ], cost: NONTERM 47: l2 -> l2 : a4^0'=a4^0+k_2, b5^0'=b5^0+2*k_2, [ __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && k_2>=0 && -1+b5^0+2*k_2<=-1+a4^0+k_2 && -2+b5^0+2*k_2<=__const_5^0 ], cost: 5*k_2 48: l2 -> l2 : a4^0'=a4^0+__const_10^0*k_4, b5^0'=b5^0+2*k_4, [ __const_10^0<=2+b5^0 && -1-b5^0+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^0+2*k_4<=a4^0+(-1+k_4)*__const_10^0 && -2+b5^0+2*k_4<=__const_5^0 && b5^0+2*k_4<=__const_12^0 ], cost: 5*k_4 49: l2 -> l2 : a4^0'=a4^0+k_5*__const_10^0, b5^0'=b5^0+2*k_5, [ __const_10^0<=2+b5^0 && -4-4*b5^0+3*__const_12^0+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+b5^0+2*k_5<=(-1+k_5)*__const_10^0+a4^0 && -2+b5^0+2*k_5<=__const_5^0 && b5^0+2*k_5<=__const_12^0 && -1+b5^0+2*k_5-3*__const_5^0+__const_10^0<=-1 ], cost: 5*k_5 50: l2 -> l2 : a4^0'=k_8*__const_10^0+a4^0, b5^0'=b5^0+2*k_8, [ __const_10^0<=2+b5^0 && -8-11*b5^0+__const_12^0+11*__const_5^0<=0 && k_8>=0 && -1+b5^0+2*k_8<=a4^0+__const_10^0*(-1+k_8) && -2+b5^0+2*k_8<=__const_5^0 && b5^0+2*k_8<=__const_12^0 && -1+b5^0+2*k_8-3*__const_5^0+__const_10^0<=-1 && -4+4*b5^0-3*__const_12^0+8*k_8-6*__const_5^0+2*__const_10^0<=-1 && -1+4*b5^0+8*k_8-6*__const_5^0+__const_10^0<=-1 ], cost: 5*k_8 51: l2 -> [11] : [ b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && 3+b5^0<=1+a4^0 && 1+__const_5^0<=2+b5^0 && 1+b5^post_10<=__const_10^0 && b5^post_10<=__const_5^0 && __const_10^0<=2+b5^post_10 && 1+__const_12^0<=2+b5^post_10 && 3+b5^post_10<=3+a4^0 && 1+__const_5^0<=2+b5^post_10 ], cost: NONTERM 52: l2 -> [11] : [ 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 && 3+b5^0<=a4^0+__const_10^0 && 1+__const_5^0<=2+b5^0 && 1+b5^post_10<=__const_10^0 && b5^0==-2 && a4^0==2 && __const_12^0==0 && b5^post_10==-2 && __const_5^0==-1 && __const_10^0==-1 ], cost: NONTERM 53: l2 -> [11] : [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && b5^0==0 && a4^0==1 && __const_12^0==0 && b5^post_10==0 && __const_5^0==-1 && __const_10^0==0 ], cost: NONTERM 55: l2 -> [11] : [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && -1+b5^post_10-__const_5^0-__const_10^0<=0 && 2+__const_5^0-__const_10^0<=0 ], cost: NONTERM 57: l2 -> [11] : [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && -1+b5^post_10-__const_5^0-__const_10^0<=0 && -2-__const_5^0+__const_10^0<=-1 && 2+__const_12^0-b5^post_10+2*__const_5^0-2*__const_10^0<=0 ], cost: NONTERM 58: l2 -> [11] : [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && -1+b5^post_10-__const_5^0-__const_10^0<=0 && -2-__const_5^0+__const_10^0<=-1 && -2-__const_12^0+b5^post_10-2*__const_5^0+2*__const_10^0<=-1 && 1+b5^post_10<=a4^0+__const_10^0 && 1+__const_5^0<=b5^post_10 ], cost: NONTERM 60: l2 -> [11] : [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && -1+b5^post_10-__const_5^0-__const_10^0<=0 && -2-__const_5^0+__const_10^0<=-1 && -2-__const_12^0+b5^post_10-2*__const_5^0+2*__const_10^0<=-1 && 1+__const_5^0-__const_10^0<=0 ], cost: NONTERM 61: l2 -> [11] : [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && -1+b5^post_10-__const_5^0-__const_10^0<=0 && -2-__const_12^0+b5^post_10-2*__const_5^0+2*__const_10^0<=-1 && -1-__const_5^0+__const_10^0<=-1 && -b5^0+b5^post_10<=0 && 1+b5^post_10<=a4^0+__const_10^0 && 1+__const_5^0<=b5^post_10 ], cost: NONTERM 62: l2 -> l2 : a4^0'=a4^0+k_14*__const_10^0, b5^0'=b5^post_10, [ 1+b5^0<=a4^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && -1+b5^post_10-__const_5^0-__const_10^0<=0 && -2-__const_12^0+b5^post_10-2*__const_5^0+2*__const_10^0<=-1 && -1-__const_5^0+__const_10^0<=-1 && -b5^0+b5^post_10<=0 && k_14>=1 && 1+__const_5^0<=b5^post_10 ], cost: 5*k_14 63: l2 -> [11] : [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1-b5^post_10+__const_5^0+__const_10^0<=-1 && b5^0==0 && a4^0==1 && __const_12^0==0 && b5^post_10==0 && __const_5^0==-2 && __const_10^0==0 ], cost: NONTERM 15: l3 -> l2 : [ 1+a4^0<=__const_30^0 ], cost: 2 30: l3 -> l2 : a4^0'=1+a4^0, b5^0'=b5^post_10, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 ], cost: 6 33: l3 -> l2 : a4^0'=a4^0+k, b5^0'=b5^0+2*k, [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 ], cost: 2+4*k 36: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0 ], cost: NONTERM 14: l9 -> l3 : a4^0'=1, a^0'=1, answer^0'=0, b5^0'=1, b^0'=1, [], cost: 2 Chained accelerated rules (with incoming rules): Start location: l9 16: l2 -> l3 : a4^0'=2+a4^0, b5^0'=b5^0-__const_10^0, [ a4^0<=b5^0 ], cost: 2 41: l2 -> [10] : [ b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && 3+b5^0<=1+a4^0 && 1+__const_5^0<=2+b5^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0 ], cost: NONTERM 42: l2 -> [10] : [ 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 && 3+b5^0<=a4^0+__const_10^0 && 1+__const_5^0<=2+b5^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+__const_10^0 ], cost: NONTERM 45: l2 -> [10] : [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+a4^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0 ], cost: NONTERM 46: l2 -> [10] : [ 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=a4^0+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+__const_10^0 ], cost: NONTERM 15: l3 -> l2 : [ 1+a4^0<=__const_30^0 ], cost: 2 30: l3 -> l2 : a4^0'=1+a4^0, b5^0'=b5^post_10, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 ], cost: 6 33: l3 -> l2 : a4^0'=a4^0+k, b5^0'=b5^0+2*k, [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 ], cost: 2+4*k 36: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0 ], cost: NONTERM 64: l3 -> l2 : a4^0'=a4^0+__const_10^0, b5^0'=2+b5^0, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 ], cost: 7 65: l3 -> l2 : a4^0'=1+a4^0+__const_10^0, b5^0'=2+b5^post_10, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && 1+b5^post_10<=1+a4^0 && b5^post_10<=__const_5^0 && __const_10^0<=2+b5^post_10 && 2+b5^post_10<=__const_12^0 ], cost: 11 66: l3 -> l2 : a4^0'=a4^0+k+__const_10^0, b5^0'=2+b5^0+2*k, [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 2+b5^0+2*k<=__const_12^0 ], cost: 7+4*k 67: l3 -> l2 : a4^0'=2+a4^0, b5^0'=b5^post_10, [ 1+a4^0<=__const_30^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && 3+b5^0<=1+a4^0 && 1+__const_5^0<=2+b5^0 && 1+b5^post_10<=__const_10^0 ], cost: 11 68: l3 -> l2 : a4^0'=3+a4^0, b5^0'=b5^post_10, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && b5^post_10<=__const_5^0 && __const_10^0<=2+b5^post_10 && 1+__const_12^0<=2+b5^post_10 && 3+b5^post_10<=2+a4^0 && 1+__const_5^0<=2+b5^post_10 ], cost: 15 69: l3 -> l2 : a4^0'=2+a4^0+k, b5^0'=b5^post_10, [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 1+__const_12^0<=2+b5^0+2*k && 3+b5^0+2*k<=1+a4^0+k && 1+__const_5^0<=2+b5^0+2*k && 1+b5^post_10<=__const_10^0 ], cost: 11+4*k 70: l3 -> l2 : a4^0'=1+a4^0+__const_10^0, b5^0'=b5^post_10, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 && 3+b5^0<=a4^0+__const_10^0 && 1+__const_5^0<=2+b5^0 && 1+b5^post_10<=__const_10^0 ], cost: 11 71: l3 -> l2 : a4^0'=2+a4^0+__const_10^0, b5^0'=b5^post_10, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && 1+b5^post_10<=1+a4^0 && b5^post_10<=__const_5^0 && __const_10^0<=2+b5^post_10 && 2+b5^post_10<=__const_12^0 && 3+b5^post_10<=1+a4^0+__const_10^0 && 1+__const_5^0<=2+b5^post_10 ], cost: 15 72: l3 -> l2 : a4^0'=1+a4^0+k+__const_10^0, b5^0'=b5^post_10, [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 2+b5^0+2*k<=__const_12^0 && 3+b5^0+2*k<=a4^0+k+__const_10^0 && 1+__const_5^0<=2+b5^0+2*k && 1+b5^post_10<=__const_10^0 ], cost: 11+4*k 73: l3 -> l2 : a4^0'=a4^0+__const_10^0, b5^0'=b5^post_10, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 ], cost: 7 74: l3 -> l2 : a4^0'=a4^0+k+__const_10^0, b5^0'=b5^post_10, [ 1+a4^0<=__const_30^0 && k>=0 && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && 1+__const_5^0<=b5^0+2*k && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 ], cost: 7+4*k 75: l3 -> l2 : a4^0'=a4^0+k_2, b5^0'=b5^0+2*k_2, [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && k_2>=0 && -1+b5^0+2*k_2<=-1+a4^0+k_2 && -2+b5^0+2*k_2<=__const_5^0 ], cost: 2+5*k_2 76: l3 -> l2 : a4^0'=1+a4^0+k_2, b5^0'=b5^post_10+2*k_2, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && 1+__const_12^0<=2+b5^post_10 && k_2>=0 && -1+b5^post_10+2*k_2<=a4^0+k_2 && -2+b5^post_10+2*k_2<=__const_5^0 ], cost: 6+5*k_2 77: l3 -> l2 : a4^0'=a4^0+k+k_2, b5^0'=b5^0+2*k+2*k_2, [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && 1+__const_12^0<=2+b5^0+2*k && k_2>=0 && -1+b5^0+2*k+2*k_2<=-1+a4^0+k+k_2 && -2+b5^0+2*k+2*k_2<=__const_5^0 ], cost: 2+4*k+5*k_2 78: l3 -> l2 : a4^0'=a4^0+__const_10^0*k_4, b5^0'=b5^0+2*k_4, [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -1-b5^0+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^0+2*k_4<=a4^0+(-1+k_4)*__const_10^0 && -2+b5^0+2*k_4<=__const_5^0 && b5^0+2*k_4<=__const_12^0 ], cost: 2+5*k_4 79: l3 -> l2 : a4^0'=1+a4^0+__const_10^0*k_4, b5^0'=b5^post_10+2*k_4, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && -1-b5^post_10+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^post_10+2*k_4<=1+a4^0+(-1+k_4)*__const_10^0 && -2+b5^post_10+2*k_4<=__const_5^0 && b5^post_10+2*k_4<=__const_12^0 ], cost: 6+5*k_4 80: l3 -> l2 : a4^0'=a4^0+k+__const_10^0*k_4, b5^0'=b5^0+2*k+2*k_4, [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -1-b5^0-2*k+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^0+2*k+2*k_4<=a4^0+k+(-1+k_4)*__const_10^0 && -2+b5^0+2*k+2*k_4<=__const_5^0 && b5^0+2*k+2*k_4<=__const_12^0 ], cost: 2+4*k+5*k_4 81: l3 -> l2 : a4^0'=a4^0+k_5*__const_10^0, b5^0'=b5^0+2*k_5, [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -4-4*b5^0+3*__const_12^0+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+b5^0+2*k_5<=(-1+k_5)*__const_10^0+a4^0 && -2+b5^0+2*k_5<=__const_5^0 && b5^0+2*k_5<=__const_12^0 && -1+b5^0+2*k_5-3*__const_5^0+__const_10^0<=-1 ], cost: 2+5*k_5 82: l3 -> l2 : a4^0'=1+a4^0+k_5*__const_10^0, b5^0'=2*k_5+b5^post_10, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && -4+3*__const_12^0-4*b5^post_10+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+2*k_5+b5^post_10<=1+(-1+k_5)*__const_10^0+a4^0 && -2+2*k_5+b5^post_10<=__const_5^0 && 2*k_5+b5^post_10<=__const_12^0 && -1+2*k_5+b5^post_10-3*__const_5^0+__const_10^0<=-1 ], cost: 6+5*k_5 83: l3 -> l2 : a4^0'=a4^0+k_5*__const_10^0+k, b5^0'=b5^0+2*k_5+2*k, [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -4-4*b5^0+3*__const_12^0-8*k+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+b5^0+2*k_5+2*k<=(-1+k_5)*__const_10^0+a4^0+k && -2+b5^0+2*k_5+2*k<=__const_5^0 && b5^0+2*k_5+2*k<=__const_12^0 && -1+b5^0+2*k_5+2*k-3*__const_5^0+__const_10^0<=-1 ], cost: 2+5*k_5+4*k 84: l3 -> l2 : a4^0'=k_8*__const_10^0+a4^0, b5^0'=b5^0+2*k_8, [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -8-11*b5^0+__const_12^0+11*__const_5^0<=0 && k_8>=0 && -1+b5^0+2*k_8<=a4^0+__const_10^0*(-1+k_8) && -2+b5^0+2*k_8<=__const_5^0 && b5^0+2*k_8<=__const_12^0 && -1+b5^0+2*k_8-3*__const_5^0+__const_10^0<=-1 && -4+4*b5^0-3*__const_12^0+8*k_8-6*__const_5^0+2*__const_10^0<=-1 && -1+4*b5^0+8*k_8-6*__const_5^0+__const_10^0<=-1 ], cost: 2+5*k_8 85: l3 -> l2 : a4^0'=1+k_8*__const_10^0+a4^0, b5^0'=2*k_8+b5^post_10, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && -8+__const_12^0-11*b5^post_10+11*__const_5^0<=0 && k_8>=0 && -1+2*k_8+b5^post_10<=1+a4^0+__const_10^0*(-1+k_8) && -2+2*k_8+b5^post_10<=__const_5^0 && 2*k_8+b5^post_10<=__const_12^0 && -1+2*k_8+b5^post_10-3*__const_5^0+__const_10^0<=-1 && -4-3*__const_12^0+8*k_8+4*b5^post_10-6*__const_5^0+2*__const_10^0<=-1 && -1+8*k_8+4*b5^post_10-6*__const_5^0+__const_10^0<=-1 ], cost: 6+5*k_8 86: l3 -> l2 : a4^0'=k_8*__const_10^0+a4^0+k, b5^0'=b5^0+2*k_8+2*k, [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -8-11*b5^0+__const_12^0-22*k+11*__const_5^0<=0 && k_8>=0 && -1+b5^0+2*k_8+2*k<=a4^0+k+__const_10^0*(-1+k_8) && -2+b5^0+2*k_8+2*k<=__const_5^0 && b5^0+2*k_8+2*k<=__const_12^0 && -1+b5^0+2*k_8+2*k-3*__const_5^0+__const_10^0<=-1 && -4+4*b5^0-3*__const_12^0+8*k_8+8*k-6*__const_5^0+2*__const_10^0<=-1 && -1+4*b5^0+8*k_8+8*k-6*__const_5^0+__const_10^0<=-1 ], cost: 2+5*k_8+4*k 87: l3 -> [11] : [ 1+a4^0<=__const_30^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && 3+b5^0<=1+a4^0 && 1+__const_5^0<=2+b5^0 && -1+__const_12^0<=-1+__const_10^0 && -1+__const_5^0<=-1+__const_10^0 && -2+__const_10^0<=__const_5^0 && -1+__const_12^0<=__const_5^0 && -2+__const_10^0<=a4^0 && -1+__const_12^0<=a4^0 && -1+__const_5^0<=a4^0 ], cost: NONTERM 88: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && -1+__const_12^0<=-1+__const_10^0 && -1+__const_5^0<=-1+__const_10^0 && -2+__const_10^0<=__const_5^0 && -1+__const_12^0<=__const_5^0 && -2+__const_10^0<=-1+a4^0 && -1+__const_12^0<=-1+a4^0 && -1+__const_5^0<=-1+a4^0 ], cost: NONTERM 89: l3 -> [11] : [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 1+__const_12^0<=2+b5^0+2*k && 3+b5^0+2*k<=1+a4^0+k && 1+__const_5^0<=2+b5^0+2*k && -1+__const_12^0<=-1+__const_10^0 && -1+__const_5^0<=-1+__const_10^0 && -2+__const_10^0<=__const_5^0 && -1+__const_12^0<=__const_5^0 && -2+__const_10^0<=a4^0+k && -1+__const_12^0<=a4^0+k && -1+__const_5^0<=a4^0+k ], cost: NONTERM 90: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 && 3+b5^0<=a4^0+__const_10^0 && 1+__const_5^0<=2+b5^0 && b5^0==-2 && a4^0==2 && __const_12^0==0 && __const_5^0==-1 && __const_10^0==-1 ], cost: NONTERM 91: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1<=1+a4^0+__const_10^0 && 1+a4^0==2 && __const_12^0==0 && __const_5^0==-1 && __const_10^0==-1 ], cost: NONTERM 92: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 2-a4^0>=0 && 5+b5^0-2*a4^0<=__const_10^0 && 4+b5^0-2*a4^0<=__const_5^0 && __const_10^0<=6+b5^0-2*a4^0 && 6+b5^0-2*a4^0<=__const_12^0 && 1+__const_5^0<=6+b5^0-2*a4^0 && 4+b5^0-2*a4^0==-2 && __const_12^0==0 && __const_5^0==-1 && __const_10^0==-1 ], cost: NONTERM 93: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && b5^0==0 && a4^0==1 && __const_12^0==0 && __const_5^0==-1 && __const_10^0==0 ], cost: NONTERM 94: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 2+__const_5^0-__const_10^0<=0 && __const_10^0<=__const_12^0 && __const_10^0<=1+__const_5^0+__const_10^0 ], cost: NONTERM 95: l3 -> [11] : [ 1+a4^0<=__const_30^0 && k>=0 && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && 1+__const_5^0<=b5^0+2*k && 2+__const_5^0-__const_10^0<=0 && __const_10^0<=__const_12^0 && __const_10^0<=1+__const_5^0+__const_10^0 ], cost: NONTERM 96: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && -2-__const_5^0+__const_10^0<=-1 && __const_10^0<=__const_12^0 && 2+__const_12^0+2*__const_5^0-2*__const_10^0<=__const_12^0 && __const_10^0<=1+__const_5^0+__const_10^0 && 2+__const_12^0+2*__const_5^0-2*__const_10^0<=1+__const_5^0+__const_10^0 ], cost: NONTERM 97: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && -2-__const_5^0+__const_10^0<=-1 && __const_10^0<=__const_12^0 && 1+__const_5^0<=__const_12^0 && __const_10^0<=1+__const_5^0+__const_10^0 && 1+__const_5^0<=1+__const_5^0+__const_10^0 && __const_10^0<=1+__const_12^0+2*__const_5^0-2*__const_10^0 && 1+__const_5^0<=1+__const_12^0+2*__const_5^0-2*__const_10^0 && __const_10^0<=-1+a4^0+__const_10^0 && 1+__const_5^0<=-1+a4^0+__const_10^0 ], cost: NONTERM 98: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && -1-__const_5^0+__const_10^0==0 && __const_10^0<=__const_12^0 && __const_10^0<=1+__const_5^0+__const_10^0 && __const_10^0<=1+__const_12^0+2*__const_5^0-2*__const_10^0 ], cost: NONTERM 99: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && -1-__const_5^0+__const_10^0<=-1 && __const_10^0<=__const_12^0 && 1+__const_5^0<=__const_12^0 && __const_10^0<=1+__const_5^0+__const_10^0 && 1+__const_5^0<=1+__const_5^0+__const_10^0 && __const_10^0<=1+__const_12^0+2*__const_5^0-2*__const_10^0 && 1+__const_5^0<=1+__const_12^0+2*__const_5^0-2*__const_10^0 && __const_10^0<=b5^0 && __const_10^0<=-1+a4^0+__const_10^0 && 1+__const_5^0<=-1+a4^0+__const_10^0 ], cost: NONTERM 100: l3 -> l2 : a4^0'=a4^0+k_14*__const_10^0, b5^0'=b5^post_10, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && -1+b5^post_10-__const_5^0-__const_10^0<=0 && -2-__const_12^0+b5^post_10-2*__const_5^0+2*__const_10^0<=-1 && -1-__const_5^0+__const_10^0<=-1 && -b5^0+b5^post_10<=0 && k_14>=1 && 1+__const_5^0<=b5^post_10 ], cost: 2+5*k_14 101: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+__const_5^0+__const_10^0<=-1 && b5^0==0 && a4^0==1 && __const_12^0==0 && __const_5^0==-2 && __const_10^0==0 ], cost: NONTERM 14: l9 -> l3 : a4^0'=1, a^0'=1, answer^0'=0, b5^0'=1, b^0'=1, [], cost: 2 Eliminated locations (on tree-shaped paths): Start location: l9 36: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0 ], cost: NONTERM 87: l3 -> [11] : [ 1+a4^0<=__const_30^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && 3+b5^0<=1+a4^0 && 1+__const_5^0<=2+b5^0 && -1+__const_12^0<=-1+__const_10^0 && -1+__const_5^0<=-1+__const_10^0 && -2+__const_10^0<=__const_5^0 && -1+__const_12^0<=__const_5^0 && -2+__const_10^0<=a4^0 && -1+__const_12^0<=a4^0 && -1+__const_5^0<=a4^0 ], cost: NONTERM 88: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && -1+__const_12^0<=-1+__const_10^0 && -1+__const_5^0<=-1+__const_10^0 && -2+__const_10^0<=__const_5^0 && -1+__const_12^0<=__const_5^0 && -2+__const_10^0<=-1+a4^0 && -1+__const_12^0<=-1+a4^0 && -1+__const_5^0<=-1+a4^0 ], cost: NONTERM 89: l3 -> [11] : [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 1+__const_12^0<=2+b5^0+2*k && 3+b5^0+2*k<=1+a4^0+k && 1+__const_5^0<=2+b5^0+2*k && -1+__const_12^0<=-1+__const_10^0 && -1+__const_5^0<=-1+__const_10^0 && -2+__const_10^0<=__const_5^0 && -1+__const_12^0<=__const_5^0 && -2+__const_10^0<=a4^0+k && -1+__const_12^0<=a4^0+k && -1+__const_5^0<=a4^0+k ], cost: NONTERM 90: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 && 3+b5^0<=a4^0+__const_10^0 && 1+__const_5^0<=2+b5^0 && b5^0==-2 && a4^0==2 && __const_12^0==0 && __const_5^0==-1 && __const_10^0==-1 ], cost: NONTERM 91: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1<=1+a4^0+__const_10^0 && 1+a4^0==2 && __const_12^0==0 && __const_5^0==-1 && __const_10^0==-1 ], cost: NONTERM 92: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 2-a4^0>=0 && 5+b5^0-2*a4^0<=__const_10^0 && 4+b5^0-2*a4^0<=__const_5^0 && __const_10^0<=6+b5^0-2*a4^0 && 6+b5^0-2*a4^0<=__const_12^0 && 1+__const_5^0<=6+b5^0-2*a4^0 && 4+b5^0-2*a4^0==-2 && __const_12^0==0 && __const_5^0==-1 && __const_10^0==-1 ], cost: NONTERM 93: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && b5^0==0 && a4^0==1 && __const_12^0==0 && __const_5^0==-1 && __const_10^0==0 ], cost: NONTERM 94: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 2+__const_5^0-__const_10^0<=0 && __const_10^0<=__const_12^0 && __const_10^0<=1+__const_5^0+__const_10^0 ], cost: NONTERM 95: l3 -> [11] : [ 1+a4^0<=__const_30^0 && k>=0 && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && 1+__const_5^0<=b5^0+2*k && 2+__const_5^0-__const_10^0<=0 && __const_10^0<=__const_12^0 && __const_10^0<=1+__const_5^0+__const_10^0 ], cost: NONTERM 96: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && -2-__const_5^0+__const_10^0<=-1 && __const_10^0<=__const_12^0 && 2+__const_12^0+2*__const_5^0-2*__const_10^0<=__const_12^0 && __const_10^0<=1+__const_5^0+__const_10^0 && 2+__const_12^0+2*__const_5^0-2*__const_10^0<=1+__const_5^0+__const_10^0 ], cost: NONTERM 97: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && -2-__const_5^0+__const_10^0<=-1 && __const_10^0<=__const_12^0 && 1+__const_5^0<=__const_12^0 && __const_10^0<=1+__const_5^0+__const_10^0 && 1+__const_5^0<=1+__const_5^0+__const_10^0 && __const_10^0<=1+__const_12^0+2*__const_5^0-2*__const_10^0 && 1+__const_5^0<=1+__const_12^0+2*__const_5^0-2*__const_10^0 && __const_10^0<=-1+a4^0+__const_10^0 && 1+__const_5^0<=-1+a4^0+__const_10^0 ], cost: NONTERM 98: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && -1-__const_5^0+__const_10^0==0 && __const_10^0<=__const_12^0 && __const_10^0<=1+__const_5^0+__const_10^0 && __const_10^0<=1+__const_12^0+2*__const_5^0-2*__const_10^0 ], cost: NONTERM 99: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && -1-__const_5^0+__const_10^0<=-1 && __const_10^0<=__const_12^0 && 1+__const_5^0<=__const_12^0 && __const_10^0<=1+__const_5^0+__const_10^0 && 1+__const_5^0<=1+__const_5^0+__const_10^0 && __const_10^0<=1+__const_12^0+2*__const_5^0-2*__const_10^0 && 1+__const_5^0<=1+__const_12^0+2*__const_5^0-2*__const_10^0 && __const_10^0<=b5^0 && __const_10^0<=-1+a4^0+__const_10^0 && 1+__const_5^0<=-1+a4^0+__const_10^0 ], cost: NONTERM 101: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+__const_5^0+__const_10^0<=-1 && b5^0==0 && a4^0==1 && __const_12^0==0 && __const_5^0==-2 && __const_10^0==0 ], cost: NONTERM 102: l3 -> l3 : a4^0'=2+a4^0, b5^0'=b5^0-__const_10^0, [ 1+a4^0<=__const_30^0 && a4^0<=b5^0 ], cost: 4 103: l3 -> [10] : [ 1+a4^0<=__const_30^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && 3+b5^0<=1+a4^0 && 1+__const_5^0<=2+b5^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0 ], cost: NONTERM 104: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 && 3+b5^0<=a4^0+__const_10^0 && 1+__const_5^0<=2+b5^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+__const_10^0 ], cost: NONTERM 105: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+a4^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0 ], cost: NONTERM 106: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=a4^0+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+__const_10^0 ], cost: NONTERM 107: l3 -> l3 : a4^0'=3+a4^0, b5^0'=b5^post_10-__const_10^0, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && 1+a4^0<=b5^post_10 ], cost: 8 108: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && b5^post_10<=__const_5^0 && __const_10^0<=2+b5^post_10 && 1+__const_12^0<=2+b5^post_10 && 3+b5^post_10<=2+a4^0 && 1+__const_5^0<=2+b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=2+a4^0 ], cost: NONTERM 109: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && 1+b5^post_10<=1+a4^0 && b5^post_10<=__const_5^0 && __const_10^0<=2+b5^post_10 && 2+b5^post_10<=__const_12^0 && 3+b5^post_10<=1+a4^0+__const_10^0 && 1+__const_5^0<=2+b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+__const_10^0 ], cost: NONTERM 110: l3 -> l3 : a4^0'=2+a4^0+k, b5^0'=b5^0+2*k-__const_10^0, [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && a4^0+k<=b5^0+2*k ], cost: 4+4*k 111: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 1+__const_12^0<=2+b5^0+2*k && 3+b5^0+2*k<=1+a4^0+k && 1+__const_5^0<=2+b5^0+2*k && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k ], cost: NONTERM 112: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 2+b5^0+2*k<=__const_12^0 && 3+b5^0+2*k<=a4^0+k+__const_10^0 && 1+__const_5^0<=2+b5^0+2*k && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+k+__const_10^0 ], cost: NONTERM 113: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && 1+__const_5^0<=b5^0+2*k && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+a4^0+k && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k ], cost: NONTERM 114: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && 1+__const_5^0<=b5^0+2*k && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=a4^0+k+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+k+__const_10^0 ], cost: NONTERM 115: l3 -> l3 : a4^0'=2+a4^0+__const_10^0, b5^0'=2+b5^0-__const_10^0, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 && a4^0+__const_10^0<=2+b5^0 ], cost: 9 116: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 && 3+b5^0<=a4^0+__const_10^0 && 1+__const_5^0<=2+b5^0 && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+a4^0+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+__const_10^0 ], cost: NONTERM 117: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 && 3+b5^0<=a4^0+__const_10^0 && 1+__const_5^0<=2+b5^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=a4^0+2*__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+2*__const_10^0 ], cost: NONTERM 118: l3 -> l3 : a4^0'=3+a4^0+__const_10^0, b5^0'=2+b5^post_10-__const_10^0, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && 1+b5^post_10<=1+a4^0 && b5^post_10<=__const_5^0 && __const_10^0<=2+b5^post_10 && 2+b5^post_10<=__const_12^0 && 1+a4^0+__const_10^0<=2+b5^post_10 ], cost: 13 119: l3 -> l3 : a4^0'=2+a4^0+k+__const_10^0, b5^0'=2+b5^0+2*k-__const_10^0, [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 2+b5^0+2*k<=__const_12^0 && a4^0+k+__const_10^0<=2+b5^0+2*k ], cost: 9+4*k 120: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 2+b5^0+2*k<=__const_12^0 && 3+b5^0+2*k<=a4^0+k+__const_10^0 && 1+__const_5^0<=2+b5^0+2*k && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+a4^0+k+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k+__const_10^0 ], cost: NONTERM 121: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 2+b5^0+2*k<=__const_12^0 && 3+b5^0+2*k<=a4^0+k+__const_10^0 && 1+__const_5^0<=2+b5^0+2*k && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=a4^0+k+2*__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+k+2*__const_10^0 ], cost: NONTERM 122: l3 -> [10] : [ 1+a4^0<=__const_30^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && 3+b5^0<=1+a4^0 && 1+__const_5^0<=2+b5^0 && 1+b5^post_10<=__const_10^0 && b5^post_10<=__const_5^0 && __const_10^0<=2+b5^post_10 && 1+__const_12^0<=2+b5^post_10 && 3+b5^post_10<=3+a4^0 && 1+__const_5^0<=2+b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=3+a4^0 ], cost: NONTERM 123: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && b5^post_10<=__const_5^0 && __const_10^0<=2+b5^post_10 && 1+__const_12^0<=2+b5^post_10 && 3+b5^post_10<=2+a4^0 && 1+__const_5^0<=2+b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=4+a4^0 ], cost: NONTERM 124: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 1+__const_12^0<=2+b5^0+2*k && 3+b5^0+2*k<=1+a4^0+k && 1+__const_5^0<=2+b5^0+2*k && 1+b5^post_10<=__const_10^0 && b5^post_10<=__const_5^0 && __const_10^0<=2+b5^post_10 && 1+__const_12^0<=2+b5^post_10 && 3+b5^post_10<=3+a4^0+k && 1+__const_5^0<=2+b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=3+a4^0+k ], cost: NONTERM 125: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 && 3+b5^0<=a4^0+__const_10^0 && 1+__const_5^0<=2+b5^0 && 1+b5^post_10<=__const_10^0 && 1+b5^post_10<=1+a4^0+__const_10^0 && b5^post_10<=__const_5^0 && __const_10^0<=2+b5^post_10 && 2+b5^post_10<=__const_12^0 && 3+b5^post_10<=1+a4^0+2*__const_10^0 && 1+__const_5^0<=2+b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+2*__const_10^0 ], cost: NONTERM 126: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && 1+b5^post_10<=1+a4^0 && b5^post_10<=__const_5^0 && __const_10^0<=2+b5^post_10 && 2+b5^post_10<=__const_12^0 && 3+b5^post_10<=1+a4^0+__const_10^0 && 1+__const_5^0<=2+b5^post_10 && 3+b5^post_10<=2+a4^0+2*__const_10^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=2+a4^0+2*__const_10^0 ], cost: NONTERM 127: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 2+b5^0+2*k<=__const_12^0 && 3+b5^0+2*k<=a4^0+k+__const_10^0 && 1+__const_5^0<=2+b5^0+2*k && 1+b5^post_10<=__const_10^0 && 1+b5^post_10<=1+a4^0+k+__const_10^0 && b5^post_10<=__const_5^0 && __const_10^0<=2+b5^post_10 && 2+b5^post_10<=__const_12^0 && 3+b5^post_10<=1+a4^0+k+2*__const_10^0 && 1+__const_5^0<=2+b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k+2*__const_10^0 ], cost: NONTERM 128: l3 -> l3 : a4^0'=2+a4^0+__const_10^0, b5^0'=b5^post_10-__const_10^0, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && a4^0+__const_10^0<=b5^post_10 ], cost: 9 129: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=a4^0+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+b5^post_10<=a4^0+2*__const_10^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+2*__const_10^0 ], cost: NONTERM 130: l3 -> l3 : a4^0'=2+a4^0+k+__const_10^0, b5^0'=b5^post_10-__const_10^0, [ 1+a4^0<=__const_30^0 && k>=0 && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && 1+__const_5^0<=b5^0+2*k && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && a4^0+k+__const_10^0<=b5^post_10 ], cost: 9+4*k 131: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && 1+__const_5^0<=b5^0+2*k && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=a4^0+k+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+b5^post_10<=a4^0+k+2*__const_10^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+k+2*__const_10^0 ], cost: NONTERM 132: l3 -> l3 : a4^0'=2+a4^0+k_2, b5^0'=b5^0+2*k_2-__const_10^0, [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && k_2>=0 && -1+b5^0+2*k_2<=-1+a4^0+k_2 && -2+b5^0+2*k_2<=__const_5^0 && a4^0+k_2<=b5^0+2*k_2 ], cost: 4+5*k_2 133: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && k_2>=0 && b5^0+2*k_2<=__const_5^0 && __const_10^0<=2+b5^0+2*k_2 && 1+__const_12^0<=2+b5^0+2*k_2 && 3+b5^0+2*k_2<=1+a4^0+k_2 && 1+__const_5^0<=2+b5^0+2*k_2 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k_2 ], cost: NONTERM 134: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && k_2>=0 && -2+b5^0+2*k_2<=__const_5^0 && 1+b5^0+2*k_2<=a4^0+k_2 && 1+__const_5^0<=b5^0+2*k_2 && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+a4^0+k_2 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k_2 ], cost: NONTERM 135: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && k_2>=0 && -2+b5^0+2*k_2<=__const_5^0 && 1+b5^0+2*k_2<=a4^0+k_2 && 1+__const_5^0<=b5^0+2*k_2 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=a4^0+k_2+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+k_2+__const_10^0 ], cost: NONTERM 136: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && 1+__const_12^0<=2+b5^post_10 && k_2>=0 && b5^post_10+2*k_2<=__const_5^0 && __const_10^0<=2+b5^post_10+2*k_2 && 1+__const_12^0<=2+b5^post_10+2*k_2 && 3+b5^post_10+2*k_2<=2+a4^0+k_2 && 1+__const_5^0<=2+b5^post_10+2*k_2 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=2+a4^0+k_2 ], cost: NONTERM 137: l3 -> l3 : a4^0'=2+a4^0+k+k_2, b5^0'=b5^0+2*k+2*k_2-__const_10^0, [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && 1+__const_12^0<=2+b5^0+2*k && k_2>=0 && -1+b5^0+2*k+2*k_2<=-1+a4^0+k+k_2 && -2+b5^0+2*k+2*k_2<=__const_5^0 && a4^0+k+k_2<=b5^0+2*k+2*k_2 ], cost: 4+4*k+5*k_2 138: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && 1+__const_12^0<=2+b5^0+2*k && k_2>=0 && b5^0+2*k+2*k_2<=__const_5^0 && __const_10^0<=2+b5^0+2*k+2*k_2 && 1+__const_12^0<=2+b5^0+2*k+2*k_2 && 3+b5^0+2*k+2*k_2<=1+a4^0+k+k_2 && 1+__const_5^0<=2+b5^0+2*k+2*k_2 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k+k_2 ], cost: NONTERM 139: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && 1+__const_12^0<=2+b5^0+2*k && k_2>=0 && -2+b5^0+2*k+2*k_2<=__const_5^0 && 1+b5^0+2*k+2*k_2<=a4^0+k+k_2 && 1+__const_5^0<=b5^0+2*k+2*k_2 && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+a4^0+k+k_2 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k+k_2 ], cost: NONTERM 140: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && 1+__const_12^0<=2+b5^0+2*k && k_2>=0 && -2+b5^0+2*k+2*k_2<=__const_5^0 && 1+b5^0+2*k+2*k_2<=a4^0+k+k_2 && 1+__const_5^0<=b5^0+2*k+2*k_2 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=a4^0+k+k_2+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+k+k_2+__const_10^0 ], cost: NONTERM 141: l3 -> l3 : a4^0'=2+a4^0+__const_10^0*k_4, b5^0'=b5^0-__const_10^0+2*k_4, [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -1-b5^0+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^0+2*k_4<=a4^0+(-1+k_4)*__const_10^0 && -2+b5^0+2*k_4<=__const_5^0 && b5^0+2*k_4<=__const_12^0 && a4^0+__const_10^0*k_4<=b5^0+2*k_4 ], cost: 4+5*k_4 142: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -1-b5^0+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^0+2*k_4<=a4^0+(-1+k_4)*__const_10^0 && b5^0+2*k_4<=__const_12^0 && b5^0+2*k_4<=__const_5^0 && __const_10^0<=2+b5^0+2*k_4 && 1+__const_12^0<=2+b5^0+2*k_4 && 3+b5^0+2*k_4<=1+a4^0+__const_10^0*k_4 && 1+__const_5^0<=2+b5^0+2*k_4 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+__const_10^0*k_4 ], cost: NONTERM 143: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -1-b5^0+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^0+2*k_4<=a4^0+(-1+k_4)*__const_10^0 && 1+b5^0+2*k_4<=a4^0+__const_10^0*k_4 && b5^0+2*k_4<=__const_5^0 && __const_10^0<=2+b5^0+2*k_4 && 2+b5^0+2*k_4<=__const_12^0 && 3+b5^0+2*k_4<=a4^0+__const_10^0*k_4+__const_10^0 && 1+__const_5^0<=2+b5^0+2*k_4 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+__const_10^0*k_4+__const_10^0 ], cost: NONTERM 144: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -1-b5^0+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^0+2*k_4<=a4^0+(-1+k_4)*__const_10^0 && -2+b5^0+2*k_4<=__const_5^0 && b5^0+2*k_4<=__const_12^0 && 1+b5^0+2*k_4<=a4^0+__const_10^0*k_4 && 1+__const_5^0<=b5^0+2*k_4 && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+a4^0+__const_10^0*k_4 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+__const_10^0*k_4 ], cost: NONTERM 145: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -1-b5^0+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^0+2*k_4<=a4^0+(-1+k_4)*__const_10^0 && -2+b5^0+2*k_4<=__const_5^0 && b5^0+2*k_4<=__const_12^0 && 1+b5^0+2*k_4<=a4^0+__const_10^0*k_4 && 1+__const_5^0<=b5^0+2*k_4 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=a4^0+__const_10^0*k_4+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+__const_10^0*k_4+__const_10^0 ], cost: NONTERM 146: l3 -> l3 : a4^0'=3+a4^0+__const_10^0*k_4, b5^0'=b5^post_10-__const_10^0+2*k_4, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && -1-b5^post_10+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^post_10+2*k_4<=1+a4^0+(-1+k_4)*__const_10^0 && -2+b5^post_10+2*k_4<=__const_5^0 && b5^post_10+2*k_4<=__const_12^0 && 1+a4^0+__const_10^0*k_4<=b5^post_10+2*k_4 ], cost: 8+5*k_4 147: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && -1-b5^post_10+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^post_10+2*k_4<=1+a4^0+(-1+k_4)*__const_10^0 && b5^post_10+2*k_4<=__const_12^0 && b5^post_10+2*k_4<=__const_5^0 && __const_10^0<=2+b5^post_10+2*k_4 && 1+__const_12^0<=2+b5^post_10+2*k_4 && 3+b5^post_10+2*k_4<=2+a4^0+__const_10^0*k_4 && 1+__const_5^0<=2+b5^post_10+2*k_4 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=2+a4^0+__const_10^0*k_4 ], cost: NONTERM 148: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && -1-b5^post_10+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^post_10+2*k_4<=1+a4^0+(-1+k_4)*__const_10^0 && 1+b5^post_10+2*k_4<=1+a4^0+__const_10^0*k_4 && b5^post_10+2*k_4<=__const_5^0 && __const_10^0<=2+b5^post_10+2*k_4 && 2+b5^post_10+2*k_4<=__const_12^0 && 3+b5^post_10+2*k_4<=1+a4^0+__const_10^0*k_4+__const_10^0 && 1+__const_5^0<=2+b5^post_10+2*k_4 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+__const_10^0*k_4+__const_10^0 ], cost: NONTERM 149: l3 -> l3 : a4^0'=2+a4^0+k+__const_10^0*k_4, b5^0'=b5^0+2*k-__const_10^0+2*k_4, [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -1-b5^0-2*k+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^0+2*k+2*k_4<=a4^0+k+(-1+k_4)*__const_10^0 && -2+b5^0+2*k+2*k_4<=__const_5^0 && b5^0+2*k+2*k_4<=__const_12^0 && a4^0+k+__const_10^0*k_4<=b5^0+2*k+2*k_4 ], cost: 4+4*k+5*k_4 150: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -1-b5^0-2*k+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^0+2*k+2*k_4<=a4^0+k+(-1+k_4)*__const_10^0 && b5^0+2*k+2*k_4<=__const_12^0 && b5^0+2*k+2*k_4<=__const_5^0 && __const_10^0<=2+b5^0+2*k+2*k_4 && 1+__const_12^0<=2+b5^0+2*k+2*k_4 && 3+b5^0+2*k+2*k_4<=1+a4^0+k+__const_10^0*k_4 && 1+__const_5^0<=2+b5^0+2*k+2*k_4 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k+__const_10^0*k_4 ], cost: NONTERM 151: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -1-b5^0-2*k+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^0+2*k+2*k_4<=a4^0+k+(-1+k_4)*__const_10^0 && 1+b5^0+2*k+2*k_4<=a4^0+k+__const_10^0*k_4 && b5^0+2*k+2*k_4<=__const_5^0 && __const_10^0<=2+b5^0+2*k+2*k_4 && 2+b5^0+2*k+2*k_4<=__const_12^0 && 3+b5^0+2*k+2*k_4<=a4^0+k+__const_10^0*k_4+__const_10^0 && 1+__const_5^0<=2+b5^0+2*k+2*k_4 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+k+__const_10^0*k_4+__const_10^0 ], cost: NONTERM 152: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -1-b5^0-2*k+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^0+2*k+2*k_4<=a4^0+k+(-1+k_4)*__const_10^0 && -2+b5^0+2*k+2*k_4<=__const_5^0 && b5^0+2*k+2*k_4<=__const_12^0 && 1+b5^0+2*k+2*k_4<=a4^0+k+__const_10^0*k_4 && 1+__const_5^0<=b5^0+2*k+2*k_4 && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+a4^0+k+__const_10^0*k_4 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k+__const_10^0*k_4 ], cost: NONTERM 153: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -1-b5^0-2*k+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^0+2*k+2*k_4<=a4^0+k+(-1+k_4)*__const_10^0 && -2+b5^0+2*k+2*k_4<=__const_5^0 && b5^0+2*k+2*k_4<=__const_12^0 && 1+b5^0+2*k+2*k_4<=a4^0+k+__const_10^0*k_4 && 1+__const_5^0<=b5^0+2*k+2*k_4 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=a4^0+k+__const_10^0*k_4+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+k+__const_10^0*k_4+__const_10^0 ], cost: NONTERM 154: l3 -> l3 : a4^0'=2+a4^0+k_5*__const_10^0, b5^0'=b5^0+2*k_5-__const_10^0, [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -4-4*b5^0+3*__const_12^0+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+b5^0+2*k_5<=(-1+k_5)*__const_10^0+a4^0 && -2+b5^0+2*k_5<=__const_5^0 && b5^0+2*k_5<=__const_12^0 && -1+b5^0+2*k_5-3*__const_5^0+__const_10^0<=-1 && a4^0+k_5*__const_10^0<=b5^0+2*k_5 ], cost: 4+5*k_5 155: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -4-4*b5^0+3*__const_12^0+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+b5^0+2*k_5<=(-1+k_5)*__const_10^0+a4^0 && b5^0+2*k_5<=__const_12^0 && -1+b5^0+2*k_5-3*__const_5^0+__const_10^0<=-1 && b5^0+2*k_5<=__const_5^0 && __const_10^0<=2+b5^0+2*k_5 && 1+__const_12^0<=2+b5^0+2*k_5 && 3+b5^0+2*k_5<=1+a4^0+k_5*__const_10^0 && 1+__const_5^0<=2+b5^0+2*k_5 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k_5*__const_10^0 ], cost: NONTERM 156: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -4-4*b5^0+3*__const_12^0+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+b5^0+2*k_5<=(-1+k_5)*__const_10^0+a4^0 && -2+b5^0+2*k_5<=__const_5^0 && b5^0+2*k_5<=__const_12^0 && -1+b5^0+2*k_5-3*__const_5^0+__const_10^0<=-1 && 1+b5^0+2*k_5<=a4^0+k_5*__const_10^0 && 1+__const_5^0<=b5^0+2*k_5 && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+a4^0+k_5*__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k_5*__const_10^0 ], cost: NONTERM 157: l3 -> l3 : a4^0'=3+a4^0+k_5*__const_10^0, b5^0'=2*k_5+b5^post_10-__const_10^0, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && -4+3*__const_12^0-4*b5^post_10+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+2*k_5+b5^post_10<=1+(-1+k_5)*__const_10^0+a4^0 && -2+2*k_5+b5^post_10<=__const_5^0 && 2*k_5+b5^post_10<=__const_12^0 && -1+2*k_5+b5^post_10-3*__const_5^0+__const_10^0<=-1 && 1+a4^0+k_5*__const_10^0<=2*k_5+b5^post_10 ], cost: 8+5*k_5 158: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && -4+3*__const_12^0-4*b5^post_10+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+2*k_5+b5^post_10<=1+(-1+k_5)*__const_10^0+a4^0 && 2*k_5+b5^post_10<=__const_12^0 && -1+2*k_5+b5^post_10-3*__const_5^0+__const_10^0<=-1 && 2*k_5+b5^post_10<=__const_5^0 && __const_10^0<=2+2*k_5+b5^post_10 && 1+__const_12^0<=2+2*k_5+b5^post_10 && 3+2*k_5+b5^post_10<=2+a4^0+k_5*__const_10^0 && 1+__const_5^0<=2+2*k_5+b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=2+a4^0+k_5*__const_10^0 ], cost: NONTERM 159: l3 -> l3 : a4^0'=2+a4^0+k_5*__const_10^0+k, b5^0'=b5^0+2*k_5+2*k-__const_10^0, [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -4-4*b5^0+3*__const_12^0-8*k+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+b5^0+2*k_5+2*k<=(-1+k_5)*__const_10^0+a4^0+k && -2+b5^0+2*k_5+2*k<=__const_5^0 && b5^0+2*k_5+2*k<=__const_12^0 && -1+b5^0+2*k_5+2*k-3*__const_5^0+__const_10^0<=-1 && a4^0+k_5*__const_10^0+k<=b5^0+2*k_5+2*k ], cost: 4+5*k_5+4*k 160: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -4-4*b5^0+3*__const_12^0-8*k+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+b5^0+2*k_5+2*k<=(-1+k_5)*__const_10^0+a4^0+k && b5^0+2*k_5+2*k<=__const_12^0 && -1+b5^0+2*k_5+2*k-3*__const_5^0+__const_10^0<=-1 && b5^0+2*k_5+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k_5+2*k && 1+__const_12^0<=2+b5^0+2*k_5+2*k && 3+b5^0+2*k_5+2*k<=1+a4^0+k_5*__const_10^0+k && 1+__const_5^0<=2+b5^0+2*k_5+2*k && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k_5*__const_10^0+k ], cost: NONTERM 161: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -4-4*b5^0+3*__const_12^0-8*k+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+b5^0+2*k_5+2*k<=(-1+k_5)*__const_10^0+a4^0+k && -2+b5^0+2*k_5+2*k<=__const_5^0 && b5^0+2*k_5+2*k<=__const_12^0 && -1+b5^0+2*k_5+2*k-3*__const_5^0+__const_10^0<=-1 && 1+b5^0+2*k_5+2*k<=a4^0+k_5*__const_10^0+k && 1+__const_5^0<=b5^0+2*k_5+2*k && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+a4^0+k_5*__const_10^0+k && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k_5*__const_10^0+k ], cost: NONTERM 162: l3 -> l3 : a4^0'=2+k_8*__const_10^0+a4^0, b5^0'=b5^0+2*k_8-__const_10^0, [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -8-11*b5^0+__const_12^0+11*__const_5^0<=0 && k_8>=0 && -1+b5^0+2*k_8<=a4^0+__const_10^0*(-1+k_8) && -2+b5^0+2*k_8<=__const_5^0 && b5^0+2*k_8<=__const_12^0 && -1+b5^0+2*k_8-3*__const_5^0+__const_10^0<=-1 && -4+4*b5^0-3*__const_12^0+8*k_8-6*__const_5^0+2*__const_10^0<=-1 && -1+4*b5^0+8*k_8-6*__const_5^0+__const_10^0<=-1 && k_8*__const_10^0+a4^0<=b5^0+2*k_8 ], cost: 4+5*k_8 163: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -8-11*b5^0+__const_12^0+11*__const_5^0<=0 && k_8>=0 && -1+b5^0+2*k_8<=a4^0+__const_10^0*(-1+k_8) && b5^0+2*k_8<=__const_12^0 && -1+b5^0+2*k_8-3*__const_5^0+__const_10^0<=-1 && -4+4*b5^0-3*__const_12^0+8*k_8-6*__const_5^0+2*__const_10^0<=-1 && -1+4*b5^0+8*k_8-6*__const_5^0+__const_10^0<=-1 && b5^0+2*k_8<=__const_5^0 && __const_10^0<=2+b5^0+2*k_8 && 1+__const_12^0<=2+b5^0+2*k_8 && 3+b5^0+2*k_8<=1+k_8*__const_10^0+a4^0 && 1+__const_5^0<=2+b5^0+2*k_8 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+k_8*__const_10^0+a4^0 ], cost: NONTERM 164: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -8-11*b5^0+__const_12^0+11*__const_5^0<=0 && k_8>=0 && -1+b5^0+2*k_8<=a4^0+__const_10^0*(-1+k_8) && -1+b5^0+2*k_8-3*__const_5^0+__const_10^0<=-1 && -4+4*b5^0-3*__const_12^0+8*k_8-6*__const_5^0+2*__const_10^0<=-1 && -1+4*b5^0+8*k_8-6*__const_5^0+__const_10^0<=-1 && 1+b5^0+2*k_8<=k_8*__const_10^0+a4^0 && b5^0+2*k_8<=__const_5^0 && __const_10^0<=2+b5^0+2*k_8 && 2+b5^0+2*k_8<=__const_12^0 && 3+b5^0+2*k_8<=k_8*__const_10^0+a4^0+__const_10^0 && 1+__const_5^0<=2+b5^0+2*k_8 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=k_8*__const_10^0+a4^0+__const_10^0 ], cost: NONTERM 165: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -8-11*b5^0+__const_12^0+11*__const_5^0<=0 && k_8>=0 && -1+b5^0+2*k_8<=a4^0+__const_10^0*(-1+k_8) && -2+b5^0+2*k_8<=__const_5^0 && b5^0+2*k_8<=__const_12^0 && -1+b5^0+2*k_8-3*__const_5^0+__const_10^0<=-1 && -4+4*b5^0-3*__const_12^0+8*k_8-6*__const_5^0+2*__const_10^0<=-1 && -1+4*b5^0+8*k_8-6*__const_5^0+__const_10^0<=-1 && 1+b5^0+2*k_8<=k_8*__const_10^0+a4^0 && 1+__const_5^0<=b5^0+2*k_8 && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+k_8*__const_10^0+a4^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+k_8*__const_10^0+a4^0 ], cost: NONTERM 166: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -8-11*b5^0+__const_12^0+11*__const_5^0<=0 && k_8>=0 && -1+b5^0+2*k_8<=a4^0+__const_10^0*(-1+k_8) && -2+b5^0+2*k_8<=__const_5^0 && b5^0+2*k_8<=__const_12^0 && -1+b5^0+2*k_8-3*__const_5^0+__const_10^0<=-1 && -4+4*b5^0-3*__const_12^0+8*k_8-6*__const_5^0+2*__const_10^0<=-1 && -1+4*b5^0+8*k_8-6*__const_5^0+__const_10^0<=-1 && 1+b5^0+2*k_8<=k_8*__const_10^0+a4^0 && 1+__const_5^0<=b5^0+2*k_8 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=k_8*__const_10^0+a4^0+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=k_8*__const_10^0+a4^0+__const_10^0 ], cost: NONTERM 167: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && -8+__const_12^0-11*b5^post_10+11*__const_5^0<=0 && k_8>=0 && -1+2*k_8+b5^post_10<=1+a4^0+__const_10^0*(-1+k_8) && 2*k_8+b5^post_10<=__const_12^0 && -1+2*k_8+b5^post_10-3*__const_5^0+__const_10^0<=-1 && -4-3*__const_12^0+8*k_8+4*b5^post_10-6*__const_5^0+2*__const_10^0<=-1 && -1+8*k_8+4*b5^post_10-6*__const_5^0+__const_10^0<=-1 && 2*k_8+b5^post_10<=__const_5^0 && __const_10^0<=2+2*k_8+b5^post_10 && 1+__const_12^0<=2+2*k_8+b5^post_10 && 3+2*k_8+b5^post_10<=2+k_8*__const_10^0+a4^0 && 1+__const_5^0<=2+2*k_8+b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=2+k_8*__const_10^0+a4^0 ], cost: NONTERM 168: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && -8+__const_12^0-11*b5^post_10+11*__const_5^0<=0 && k_8>=0 && -1+2*k_8+b5^post_10<=1+a4^0+__const_10^0*(-1+k_8) && -1+2*k_8+b5^post_10-3*__const_5^0+__const_10^0<=-1 && -4-3*__const_12^0+8*k_8+4*b5^post_10-6*__const_5^0+2*__const_10^0<=-1 && -1+8*k_8+4*b5^post_10-6*__const_5^0+__const_10^0<=-1 && 1+2*k_8+b5^post_10<=1+k_8*__const_10^0+a4^0 && 2*k_8+b5^post_10<=__const_5^0 && __const_10^0<=2+2*k_8+b5^post_10 && 2+2*k_8+b5^post_10<=__const_12^0 && 3+2*k_8+b5^post_10<=1+k_8*__const_10^0+a4^0+__const_10^0 && 1+__const_5^0<=2+2*k_8+b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+k_8*__const_10^0+a4^0+__const_10^0 ], cost: NONTERM 169: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -8-11*b5^0+__const_12^0-22*k+11*__const_5^0<=0 && k_8>=0 && -1+b5^0+2*k_8+2*k<=a4^0+k+__const_10^0*(-1+k_8) && b5^0+2*k_8+2*k<=__const_12^0 && -1+b5^0+2*k_8+2*k-3*__const_5^0+__const_10^0<=-1 && -4+4*b5^0-3*__const_12^0+8*k_8+8*k-6*__const_5^0+2*__const_10^0<=-1 && -1+4*b5^0+8*k_8+8*k-6*__const_5^0+__const_10^0<=-1 && b5^0+2*k_8+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k_8+2*k && 1+__const_12^0<=2+b5^0+2*k_8+2*k && 3+b5^0+2*k_8+2*k<=1+k_8*__const_10^0+a4^0+k && 1+__const_5^0<=2+b5^0+2*k_8+2*k && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+k_8*__const_10^0+a4^0+k ], cost: NONTERM 170: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -8-11*b5^0+__const_12^0-22*k+11*__const_5^0<=0 && k_8>=0 && -1+b5^0+2*k_8+2*k<=a4^0+k+__const_10^0*(-1+k_8) && -1+b5^0+2*k_8+2*k-3*__const_5^0+__const_10^0<=-1 && -4+4*b5^0-3*__const_12^0+8*k_8+8*k-6*__const_5^0+2*__const_10^0<=-1 && -1+4*b5^0+8*k_8+8*k-6*__const_5^0+__const_10^0<=-1 && 1+b5^0+2*k_8+2*k<=k_8*__const_10^0+a4^0+k && b5^0+2*k_8+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k_8+2*k && 2+b5^0+2*k_8+2*k<=__const_12^0 && 3+b5^0+2*k_8+2*k<=k_8*__const_10^0+a4^0+k+__const_10^0 && 1+__const_5^0<=2+b5^0+2*k_8+2*k && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=k_8*__const_10^0+a4^0+k+__const_10^0 ], cost: NONTERM 171: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -8-11*b5^0+__const_12^0-22*k+11*__const_5^0<=0 && k_8>=0 && -1+b5^0+2*k_8+2*k<=a4^0+k+__const_10^0*(-1+k_8) && -2+b5^0+2*k_8+2*k<=__const_5^0 && b5^0+2*k_8+2*k<=__const_12^0 && -1+b5^0+2*k_8+2*k-3*__const_5^0+__const_10^0<=-1 && -4+4*b5^0-3*__const_12^0+8*k_8+8*k-6*__const_5^0+2*__const_10^0<=-1 && -1+4*b5^0+8*k_8+8*k-6*__const_5^0+__const_10^0<=-1 && 1+b5^0+2*k_8+2*k<=k_8*__const_10^0+a4^0+k && 1+__const_5^0<=b5^0+2*k_8+2*k && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+k_8*__const_10^0+a4^0+k && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+k_8*__const_10^0+a4^0+k ], cost: NONTERM 172: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -8-11*b5^0+__const_12^0-22*k+11*__const_5^0<=0 && k_8>=0 && -1+b5^0+2*k_8+2*k<=a4^0+k+__const_10^0*(-1+k_8) && -2+b5^0+2*k_8+2*k<=__const_5^0 && b5^0+2*k_8+2*k<=__const_12^0 && -1+b5^0+2*k_8+2*k-3*__const_5^0+__const_10^0<=-1 && -4+4*b5^0-3*__const_12^0+8*k_8+8*k-6*__const_5^0+2*__const_10^0<=-1 && -1+4*b5^0+8*k_8+8*k-6*__const_5^0+__const_10^0<=-1 && 1+b5^0+2*k_8+2*k<=k_8*__const_10^0+a4^0+k && 1+__const_5^0<=b5^0+2*k_8+2*k && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=k_8*__const_10^0+a4^0+k+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=k_8*__const_10^0+a4^0+k+__const_10^0 ], cost: NONTERM 173: l3 -> [12] : [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 2+b5^0+2*k<=__const_12^0 ], cost: 7+4*k 174: l3 -> [12] : [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 1+__const_12^0<=2+b5^0+2*k && 3+b5^0+2*k<=1+a4^0+k && 1+__const_5^0<=2+b5^0+2*k && 1+b5^post_10<=__const_10^0 ], cost: 11+4*k 175: l3 -> [12] : [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 2+b5^0+2*k<=__const_12^0 && 3+b5^0+2*k<=a4^0+k+__const_10^0 && 1+__const_5^0<=2+b5^0+2*k && 1+b5^post_10<=__const_10^0 ], cost: 11+4*k 176: l3 -> [12] : [ 1+a4^0<=__const_30^0 && k>=0 && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && 1+__const_5^0<=b5^0+2*k && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 ], cost: 7+4*k 177: l3 -> [12] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && k_2>=0 && -1+b5^0+2*k_2<=-1+a4^0+k_2 && -2+b5^0+2*k_2<=__const_5^0 ], cost: 2+5*k_2 178: l3 -> [12] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && 1+__const_12^0<=2+b5^post_10 && k_2>=0 && -1+b5^post_10+2*k_2<=a4^0+k_2 && -2+b5^post_10+2*k_2<=__const_5^0 ], cost: 6+5*k_2 179: l3 -> [12] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && 1+__const_12^0<=2+b5^0+2*k && k_2>=0 && -1+b5^0+2*k+2*k_2<=-1+a4^0+k+k_2 && -2+b5^0+2*k+2*k_2<=__const_5^0 ], cost: 2+4*k+5*k_2 180: l3 -> [12] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && -1-b5^post_10+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^post_10+2*k_4<=1+a4^0+(-1+k_4)*__const_10^0 && -2+b5^post_10+2*k_4<=__const_5^0 && b5^post_10+2*k_4<=__const_12^0 ], cost: 6+5*k_4 181: l3 -> [12] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -4-4*b5^0+3*__const_12^0+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+b5^0+2*k_5<=(-1+k_5)*__const_10^0+a4^0 && -2+b5^0+2*k_5<=__const_5^0 && b5^0+2*k_5<=__const_12^0 && -1+b5^0+2*k_5-3*__const_5^0+__const_10^0<=-1 ], cost: 2+5*k_5 182: l3 -> [12] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && -4+3*__const_12^0-4*b5^post_10+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+2*k_5+b5^post_10<=1+(-1+k_5)*__const_10^0+a4^0 && -2+2*k_5+b5^post_10<=__const_5^0 && 2*k_5+b5^post_10<=__const_12^0 && -1+2*k_5+b5^post_10-3*__const_5^0+__const_10^0<=-1 ], cost: 6+5*k_5 183: l3 -> [12] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -4-4*b5^0+3*__const_12^0-8*k+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+b5^0+2*k_5+2*k<=(-1+k_5)*__const_10^0+a4^0+k && -2+b5^0+2*k_5+2*k<=__const_5^0 && b5^0+2*k_5+2*k<=__const_12^0 && -1+b5^0+2*k_5+2*k-3*__const_5^0+__const_10^0<=-1 ], cost: 2+5*k_5+4*k 184: l3 -> [12] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && -8+__const_12^0-11*b5^post_10+11*__const_5^0<=0 && k_8>=0 && -1+2*k_8+b5^post_10<=1+a4^0+__const_10^0*(-1+k_8) && -2+2*k_8+b5^post_10<=__const_5^0 && 2*k_8+b5^post_10<=__const_12^0 && -1+2*k_8+b5^post_10-3*__const_5^0+__const_10^0<=-1 && -4-3*__const_12^0+8*k_8+4*b5^post_10-6*__const_5^0+2*__const_10^0<=-1 && -1+8*k_8+4*b5^post_10-6*__const_5^0+__const_10^0<=-1 ], cost: 6+5*k_8 185: l3 -> [12] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -8-11*b5^0+__const_12^0-22*k+11*__const_5^0<=0 && k_8>=0 && -1+b5^0+2*k_8+2*k<=a4^0+k+__const_10^0*(-1+k_8) && -2+b5^0+2*k_8+2*k<=__const_5^0 && b5^0+2*k_8+2*k<=__const_12^0 && -1+b5^0+2*k_8+2*k-3*__const_5^0+__const_10^0<=-1 && -4+4*b5^0-3*__const_12^0+8*k_8+8*k-6*__const_5^0+2*__const_10^0<=-1 && -1+4*b5^0+8*k_8+8*k-6*__const_5^0+__const_10^0<=-1 ], cost: 2+5*k_8+4*k 186: l3 -> [12] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && -1+b5^post_10-__const_5^0-__const_10^0<=0 && -2-__const_12^0+b5^post_10-2*__const_5^0+2*__const_10^0<=-1 && -1-__const_5^0+__const_10^0<=-1 && -b5^0+b5^post_10<=0 && k_14>=1 && 1+__const_5^0<=b5^post_10 ], cost: 2+5*k_14 14: l9 -> l3 : a4^0'=1, a^0'=1, answer^0'=0, b5^0'=1, b^0'=1, [], cost: 2 Aborted due to lack of remaining time ### Computing asymptotic complexity ### Fully simplified ITS problem Start location: l9 36: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0 ], cost: NONTERM 87: l3 -> [11] : [ 1+a4^0<=__const_30^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && 3+b5^0<=1+a4^0 && 1+__const_5^0<=2+b5^0 && -1+__const_12^0<=-1+__const_10^0 && -1+__const_5^0<=-1+__const_10^0 && -2+__const_10^0<=__const_5^0 && -1+__const_12^0<=__const_5^0 && -2+__const_10^0<=a4^0 && -1+__const_12^0<=a4^0 && -1+__const_5^0<=a4^0 ], cost: NONTERM 88: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && -1+__const_12^0<=-1+__const_10^0 && -1+__const_5^0<=-1+__const_10^0 && -2+__const_10^0<=__const_5^0 && -1+__const_12^0<=__const_5^0 && -2+__const_10^0<=-1+a4^0 && -1+__const_12^0<=-1+a4^0 && -1+__const_5^0<=-1+a4^0 ], cost: NONTERM 89: l3 -> [11] : [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 1+__const_12^0<=2+b5^0+2*k && 3+b5^0+2*k<=1+a4^0+k && 1+__const_5^0<=2+b5^0+2*k && -1+__const_12^0<=-1+__const_10^0 && -1+__const_5^0<=-1+__const_10^0 && -2+__const_10^0<=__const_5^0 && -1+__const_12^0<=__const_5^0 && -2+__const_10^0<=a4^0+k && -1+__const_12^0<=a4^0+k && -1+__const_5^0<=a4^0+k ], cost: NONTERM 90: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 && 3+b5^0<=a4^0+__const_10^0 && 1+__const_5^0<=2+b5^0 && b5^0==-2 && a4^0==2 && __const_12^0==0 && __const_5^0==-1 && __const_10^0==-1 ], cost: NONTERM 91: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1<=1+a4^0+__const_10^0 && 1+a4^0==2 && __const_12^0==0 && __const_5^0==-1 && __const_10^0==-1 ], cost: NONTERM 92: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 2-a4^0>=0 && 5+b5^0-2*a4^0<=__const_10^0 && 4+b5^0-2*a4^0<=__const_5^0 && __const_10^0<=6+b5^0-2*a4^0 && 6+b5^0-2*a4^0<=__const_12^0 && 1+__const_5^0<=6+b5^0-2*a4^0 && 4+b5^0-2*a4^0==-2 && __const_12^0==0 && __const_5^0==-1 && __const_10^0==-1 ], cost: NONTERM 93: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && b5^0==0 && a4^0==1 && __const_12^0==0 && __const_5^0==-1 && __const_10^0==0 ], cost: NONTERM 94: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 2+__const_5^0-__const_10^0<=0 && __const_10^0<=__const_12^0 && __const_10^0<=1+__const_5^0+__const_10^0 ], cost: NONTERM 95: l3 -> [11] : [ 1+a4^0<=__const_30^0 && k>=0 && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && 1+__const_5^0<=b5^0+2*k && 2+__const_5^0-__const_10^0<=0 && __const_10^0<=__const_12^0 && __const_10^0<=1+__const_5^0+__const_10^0 ], cost: NONTERM 96: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && -2-__const_5^0+__const_10^0<=-1 && __const_10^0<=__const_12^0 && 2+__const_12^0+2*__const_5^0-2*__const_10^0<=__const_12^0 && __const_10^0<=1+__const_5^0+__const_10^0 && 2+__const_12^0+2*__const_5^0-2*__const_10^0<=1+__const_5^0+__const_10^0 ], cost: NONTERM 97: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && -2-__const_5^0+__const_10^0<=-1 && __const_10^0<=__const_12^0 && 1+__const_5^0<=__const_12^0 && __const_10^0<=1+__const_5^0+__const_10^0 && 1+__const_5^0<=1+__const_5^0+__const_10^0 && __const_10^0<=1+__const_12^0+2*__const_5^0-2*__const_10^0 && 1+__const_5^0<=1+__const_12^0+2*__const_5^0-2*__const_10^0 && __const_10^0<=-1+a4^0+__const_10^0 && 1+__const_5^0<=-1+a4^0+__const_10^0 ], cost: NONTERM 98: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && -1-__const_5^0+__const_10^0==0 && __const_10^0<=__const_12^0 && __const_10^0<=1+__const_5^0+__const_10^0 && __const_10^0<=1+__const_12^0+2*__const_5^0-2*__const_10^0 ], cost: NONTERM 99: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && -1-__const_5^0+__const_10^0<=-1 && __const_10^0<=__const_12^0 && 1+__const_5^0<=__const_12^0 && __const_10^0<=1+__const_5^0+__const_10^0 && 1+__const_5^0<=1+__const_5^0+__const_10^0 && __const_10^0<=1+__const_12^0+2*__const_5^0-2*__const_10^0 && 1+__const_5^0<=1+__const_12^0+2*__const_5^0-2*__const_10^0 && __const_10^0<=b5^0 && __const_10^0<=-1+a4^0+__const_10^0 && 1+__const_5^0<=-1+a4^0+__const_10^0 ], cost: NONTERM 101: l3 -> [11] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+__const_5^0+__const_10^0<=-1 && b5^0==0 && a4^0==1 && __const_12^0==0 && __const_5^0==-2 && __const_10^0==0 ], cost: NONTERM 102: l3 -> l3 : a4^0'=2+a4^0, b5^0'=b5^0-__const_10^0, [ 1+a4^0<=__const_30^0 && a4^0<=b5^0 ], cost: 4 103: l3 -> [10] : [ 1+a4^0<=__const_30^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && 3+b5^0<=1+a4^0 && 1+__const_5^0<=2+b5^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0 ], cost: NONTERM 104: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 && 3+b5^0<=a4^0+__const_10^0 && 1+__const_5^0<=2+b5^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+__const_10^0 ], cost: NONTERM 105: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+a4^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0 ], cost: NONTERM 106: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=a4^0+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+__const_10^0 ], cost: NONTERM 107: l3 -> l3 : a4^0'=3+a4^0, b5^0'=b5^post_10-__const_10^0, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && 1+a4^0<=b5^post_10 ], cost: 8 108: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && b5^post_10<=__const_5^0 && __const_10^0<=2+b5^post_10 && 1+__const_12^0<=2+b5^post_10 && 3+b5^post_10<=2+a4^0 && 1+__const_5^0<=2+b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=2+a4^0 ], cost: NONTERM 109: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && 1+b5^post_10<=1+a4^0 && b5^post_10<=__const_5^0 && __const_10^0<=2+b5^post_10 && 2+b5^post_10<=__const_12^0 && 3+b5^post_10<=1+a4^0+__const_10^0 && 1+__const_5^0<=2+b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+__const_10^0 ], cost: NONTERM 110: l3 -> l3 : a4^0'=2+a4^0+k, b5^0'=b5^0+2*k-__const_10^0, [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && a4^0+k<=b5^0+2*k ], cost: 4+4*k 111: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 1+__const_12^0<=2+b5^0+2*k && 3+b5^0+2*k<=1+a4^0+k && 1+__const_5^0<=2+b5^0+2*k && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k ], cost: NONTERM 112: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 2+b5^0+2*k<=__const_12^0 && 3+b5^0+2*k<=a4^0+k+__const_10^0 && 1+__const_5^0<=2+b5^0+2*k && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+k+__const_10^0 ], cost: NONTERM 113: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && 1+__const_5^0<=b5^0+2*k && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+a4^0+k && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k ], cost: NONTERM 114: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && 1+__const_5^0<=b5^0+2*k && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=a4^0+k+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+k+__const_10^0 ], cost: NONTERM 115: l3 -> l3 : a4^0'=2+a4^0+__const_10^0, b5^0'=2+b5^0-__const_10^0, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 && a4^0+__const_10^0<=2+b5^0 ], cost: 9 116: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 && 3+b5^0<=a4^0+__const_10^0 && 1+__const_5^0<=2+b5^0 && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+a4^0+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+__const_10^0 ], cost: NONTERM 117: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 && 3+b5^0<=a4^0+__const_10^0 && 1+__const_5^0<=2+b5^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=a4^0+2*__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+2*__const_10^0 ], cost: NONTERM 118: l3 -> l3 : a4^0'=3+a4^0+__const_10^0, b5^0'=2+b5^post_10-__const_10^0, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && 1+b5^post_10<=1+a4^0 && b5^post_10<=__const_5^0 && __const_10^0<=2+b5^post_10 && 2+b5^post_10<=__const_12^0 && 1+a4^0+__const_10^0<=2+b5^post_10 ], cost: 13 119: l3 -> l3 : a4^0'=2+a4^0+k+__const_10^0, b5^0'=2+b5^0+2*k-__const_10^0, [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 2+b5^0+2*k<=__const_12^0 && a4^0+k+__const_10^0<=2+b5^0+2*k ], cost: 9+4*k 120: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 2+b5^0+2*k<=__const_12^0 && 3+b5^0+2*k<=a4^0+k+__const_10^0 && 1+__const_5^0<=2+b5^0+2*k && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+a4^0+k+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k+__const_10^0 ], cost: NONTERM 121: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 2+b5^0+2*k<=__const_12^0 && 3+b5^0+2*k<=a4^0+k+__const_10^0 && 1+__const_5^0<=2+b5^0+2*k && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=a4^0+k+2*__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+k+2*__const_10^0 ], cost: NONTERM 122: l3 -> [10] : [ 1+a4^0<=__const_30^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && 3+b5^0<=1+a4^0 && 1+__const_5^0<=2+b5^0 && 1+b5^post_10<=__const_10^0 && b5^post_10<=__const_5^0 && __const_10^0<=2+b5^post_10 && 1+__const_12^0<=2+b5^post_10 && 3+b5^post_10<=3+a4^0 && 1+__const_5^0<=2+b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=3+a4^0 ], cost: NONTERM 123: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && b5^post_10<=__const_5^0 && __const_10^0<=2+b5^post_10 && 1+__const_12^0<=2+b5^post_10 && 3+b5^post_10<=2+a4^0 && 1+__const_5^0<=2+b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=4+a4^0 ], cost: NONTERM 124: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 1+__const_12^0<=2+b5^0+2*k && 3+b5^0+2*k<=1+a4^0+k && 1+__const_5^0<=2+b5^0+2*k && 1+b5^post_10<=__const_10^0 && b5^post_10<=__const_5^0 && __const_10^0<=2+b5^post_10 && 1+__const_12^0<=2+b5^post_10 && 3+b5^post_10<=3+a4^0+k && 1+__const_5^0<=2+b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=3+a4^0+k ], cost: NONTERM 125: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && b5^0<=__const_5^0 && __const_10^0<=2+b5^0 && 2+b5^0<=__const_12^0 && 3+b5^0<=a4^0+__const_10^0 && 1+__const_5^0<=2+b5^0 && 1+b5^post_10<=__const_10^0 && 1+b5^post_10<=1+a4^0+__const_10^0 && b5^post_10<=__const_5^0 && __const_10^0<=2+b5^post_10 && 2+b5^post_10<=__const_12^0 && 3+b5^post_10<=1+a4^0+2*__const_10^0 && 1+__const_5^0<=2+b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+2*__const_10^0 ], cost: NONTERM 126: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && 1+b5^post_10<=1+a4^0 && b5^post_10<=__const_5^0 && __const_10^0<=2+b5^post_10 && 2+b5^post_10<=__const_12^0 && 3+b5^post_10<=1+a4^0+__const_10^0 && 1+__const_5^0<=2+b5^post_10 && 3+b5^post_10<=2+a4^0+2*__const_10^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=2+a4^0+2*__const_10^0 ], cost: NONTERM 127: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 2+b5^0+2*k<=__const_12^0 && 3+b5^0+2*k<=a4^0+k+__const_10^0 && 1+__const_5^0<=2+b5^0+2*k && 1+b5^post_10<=__const_10^0 && 1+b5^post_10<=1+a4^0+k+__const_10^0 && b5^post_10<=__const_5^0 && __const_10^0<=2+b5^post_10 && 2+b5^post_10<=__const_12^0 && 3+b5^post_10<=1+a4^0+k+2*__const_10^0 && 1+__const_5^0<=2+b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k+2*__const_10^0 ], cost: NONTERM 128: l3 -> l3 : a4^0'=2+a4^0+__const_10^0, b5^0'=b5^post_10-__const_10^0, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && a4^0+__const_10^0<=b5^post_10 ], cost: 9 129: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=a4^0+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+b5^post_10<=a4^0+2*__const_10^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+2*__const_10^0 ], cost: NONTERM 130: l3 -> l3 : a4^0'=2+a4^0+k+__const_10^0, b5^0'=b5^post_10-__const_10^0, [ 1+a4^0<=__const_30^0 && k>=0 && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && 1+__const_5^0<=b5^0+2*k && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && a4^0+k+__const_10^0<=b5^post_10 ], cost: 9+4*k 131: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && 1+__const_5^0<=b5^0+2*k && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=a4^0+k+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+b5^post_10<=a4^0+k+2*__const_10^0 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+k+2*__const_10^0 ], cost: NONTERM 132: l3 -> l3 : a4^0'=2+a4^0+k_2, b5^0'=b5^0+2*k_2-__const_10^0, [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && k_2>=0 && -1+b5^0+2*k_2<=-1+a4^0+k_2 && -2+b5^0+2*k_2<=__const_5^0 && a4^0+k_2<=b5^0+2*k_2 ], cost: 4+5*k_2 133: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && k_2>=0 && b5^0+2*k_2<=__const_5^0 && __const_10^0<=2+b5^0+2*k_2 && 1+__const_12^0<=2+b5^0+2*k_2 && 3+b5^0+2*k_2<=1+a4^0+k_2 && 1+__const_5^0<=2+b5^0+2*k_2 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k_2 ], cost: NONTERM 134: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && k_2>=0 && -2+b5^0+2*k_2<=__const_5^0 && 1+b5^0+2*k_2<=a4^0+k_2 && 1+__const_5^0<=b5^0+2*k_2 && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+a4^0+k_2 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k_2 ], cost: NONTERM 135: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && k_2>=0 && -2+b5^0+2*k_2<=__const_5^0 && 1+b5^0+2*k_2<=a4^0+k_2 && 1+__const_5^0<=b5^0+2*k_2 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=a4^0+k_2+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+k_2+__const_10^0 ], cost: NONTERM 136: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && 1+__const_12^0<=2+b5^post_10 && k_2>=0 && b5^post_10+2*k_2<=__const_5^0 && __const_10^0<=2+b5^post_10+2*k_2 && 1+__const_12^0<=2+b5^post_10+2*k_2 && 3+b5^post_10+2*k_2<=2+a4^0+k_2 && 1+__const_5^0<=2+b5^post_10+2*k_2 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=2+a4^0+k_2 ], cost: NONTERM 137: l3 -> l3 : a4^0'=2+a4^0+k+k_2, b5^0'=b5^0+2*k+2*k_2-__const_10^0, [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && 1+__const_12^0<=2+b5^0+2*k && k_2>=0 && -1+b5^0+2*k+2*k_2<=-1+a4^0+k+k_2 && -2+b5^0+2*k+2*k_2<=__const_5^0 && a4^0+k+k_2<=b5^0+2*k+2*k_2 ], cost: 4+4*k+5*k_2 138: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && 1+__const_12^0<=2+b5^0+2*k && k_2>=0 && b5^0+2*k+2*k_2<=__const_5^0 && __const_10^0<=2+b5^0+2*k+2*k_2 && 1+__const_12^0<=2+b5^0+2*k+2*k_2 && 3+b5^0+2*k+2*k_2<=1+a4^0+k+k_2 && 1+__const_5^0<=2+b5^0+2*k+2*k_2 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k+k_2 ], cost: NONTERM 139: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && 1+__const_12^0<=2+b5^0+2*k && k_2>=0 && -2+b5^0+2*k+2*k_2<=__const_5^0 && 1+b5^0+2*k+2*k_2<=a4^0+k+k_2 && 1+__const_5^0<=b5^0+2*k+2*k_2 && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+a4^0+k+k_2 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k+k_2 ], cost: NONTERM 140: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && 1+__const_12^0<=2+b5^0+2*k && k_2>=0 && -2+b5^0+2*k+2*k_2<=__const_5^0 && 1+b5^0+2*k+2*k_2<=a4^0+k+k_2 && 1+__const_5^0<=b5^0+2*k+2*k_2 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=a4^0+k+k_2+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+k+k_2+__const_10^0 ], cost: NONTERM 141: l3 -> l3 : a4^0'=2+a4^0+__const_10^0*k_4, b5^0'=b5^0-__const_10^0+2*k_4, [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -1-b5^0+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^0+2*k_4<=a4^0+(-1+k_4)*__const_10^0 && -2+b5^0+2*k_4<=__const_5^0 && b5^0+2*k_4<=__const_12^0 && a4^0+__const_10^0*k_4<=b5^0+2*k_4 ], cost: 4+5*k_4 142: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -1-b5^0+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^0+2*k_4<=a4^0+(-1+k_4)*__const_10^0 && b5^0+2*k_4<=__const_12^0 && b5^0+2*k_4<=__const_5^0 && __const_10^0<=2+b5^0+2*k_4 && 1+__const_12^0<=2+b5^0+2*k_4 && 3+b5^0+2*k_4<=1+a4^0+__const_10^0*k_4 && 1+__const_5^0<=2+b5^0+2*k_4 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+__const_10^0*k_4 ], cost: NONTERM 143: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -1-b5^0+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^0+2*k_4<=a4^0+(-1+k_4)*__const_10^0 && 1+b5^0+2*k_4<=a4^0+__const_10^0*k_4 && b5^0+2*k_4<=__const_5^0 && __const_10^0<=2+b5^0+2*k_4 && 2+b5^0+2*k_4<=__const_12^0 && 3+b5^0+2*k_4<=a4^0+__const_10^0*k_4+__const_10^0 && 1+__const_5^0<=2+b5^0+2*k_4 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+__const_10^0*k_4+__const_10^0 ], cost: NONTERM 144: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -1-b5^0+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^0+2*k_4<=a4^0+(-1+k_4)*__const_10^0 && -2+b5^0+2*k_4<=__const_5^0 && b5^0+2*k_4<=__const_12^0 && 1+b5^0+2*k_4<=a4^0+__const_10^0*k_4 && 1+__const_5^0<=b5^0+2*k_4 && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+a4^0+__const_10^0*k_4 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+__const_10^0*k_4 ], cost: NONTERM 145: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -1-b5^0+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^0+2*k_4<=a4^0+(-1+k_4)*__const_10^0 && -2+b5^0+2*k_4<=__const_5^0 && b5^0+2*k_4<=__const_12^0 && 1+b5^0+2*k_4<=a4^0+__const_10^0*k_4 && 1+__const_5^0<=b5^0+2*k_4 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=a4^0+__const_10^0*k_4+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+__const_10^0*k_4+__const_10^0 ], cost: NONTERM 146: l3 -> l3 : a4^0'=3+a4^0+__const_10^0*k_4, b5^0'=b5^post_10-__const_10^0+2*k_4, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && -1-b5^post_10+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^post_10+2*k_4<=1+a4^0+(-1+k_4)*__const_10^0 && -2+b5^post_10+2*k_4<=__const_5^0 && b5^post_10+2*k_4<=__const_12^0 && 1+a4^0+__const_10^0*k_4<=b5^post_10+2*k_4 ], cost: 8+5*k_4 147: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && -1-b5^post_10+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^post_10+2*k_4<=1+a4^0+(-1+k_4)*__const_10^0 && b5^post_10+2*k_4<=__const_12^0 && b5^post_10+2*k_4<=__const_5^0 && __const_10^0<=2+b5^post_10+2*k_4 && 1+__const_12^0<=2+b5^post_10+2*k_4 && 3+b5^post_10+2*k_4<=2+a4^0+__const_10^0*k_4 && 1+__const_5^0<=2+b5^post_10+2*k_4 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=2+a4^0+__const_10^0*k_4 ], cost: NONTERM 148: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && -1-b5^post_10+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^post_10+2*k_4<=1+a4^0+(-1+k_4)*__const_10^0 && 1+b5^post_10+2*k_4<=1+a4^0+__const_10^0*k_4 && b5^post_10+2*k_4<=__const_5^0 && __const_10^0<=2+b5^post_10+2*k_4 && 2+b5^post_10+2*k_4<=__const_12^0 && 3+b5^post_10+2*k_4<=1+a4^0+__const_10^0*k_4+__const_10^0 && 1+__const_5^0<=2+b5^post_10+2*k_4 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+__const_10^0*k_4+__const_10^0 ], cost: NONTERM 149: l3 -> l3 : a4^0'=2+a4^0+k+__const_10^0*k_4, b5^0'=b5^0+2*k-__const_10^0+2*k_4, [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -1-b5^0-2*k+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^0+2*k+2*k_4<=a4^0+k+(-1+k_4)*__const_10^0 && -2+b5^0+2*k+2*k_4<=__const_5^0 && b5^0+2*k+2*k_4<=__const_12^0 && a4^0+k+__const_10^0*k_4<=b5^0+2*k+2*k_4 ], cost: 4+4*k+5*k_4 150: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -1-b5^0-2*k+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^0+2*k+2*k_4<=a4^0+k+(-1+k_4)*__const_10^0 && b5^0+2*k+2*k_4<=__const_12^0 && b5^0+2*k+2*k_4<=__const_5^0 && __const_10^0<=2+b5^0+2*k+2*k_4 && 1+__const_12^0<=2+b5^0+2*k+2*k_4 && 3+b5^0+2*k+2*k_4<=1+a4^0+k+__const_10^0*k_4 && 1+__const_5^0<=2+b5^0+2*k+2*k_4 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k+__const_10^0*k_4 ], cost: NONTERM 151: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -1-b5^0-2*k+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^0+2*k+2*k_4<=a4^0+k+(-1+k_4)*__const_10^0 && 1+b5^0+2*k+2*k_4<=a4^0+k+__const_10^0*k_4 && b5^0+2*k+2*k_4<=__const_5^0 && __const_10^0<=2+b5^0+2*k+2*k_4 && 2+b5^0+2*k+2*k_4<=__const_12^0 && 3+b5^0+2*k+2*k_4<=a4^0+k+__const_10^0*k_4+__const_10^0 && 1+__const_5^0<=2+b5^0+2*k+2*k_4 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+k+__const_10^0*k_4+__const_10^0 ], cost: NONTERM 152: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -1-b5^0-2*k+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^0+2*k+2*k_4<=a4^0+k+(-1+k_4)*__const_10^0 && -2+b5^0+2*k+2*k_4<=__const_5^0 && b5^0+2*k+2*k_4<=__const_12^0 && 1+b5^0+2*k+2*k_4<=a4^0+k+__const_10^0*k_4 && 1+__const_5^0<=b5^0+2*k+2*k_4 && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+a4^0+k+__const_10^0*k_4 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k+__const_10^0*k_4 ], cost: NONTERM 153: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -1-b5^0-2*k+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^0+2*k+2*k_4<=a4^0+k+(-1+k_4)*__const_10^0 && -2+b5^0+2*k+2*k_4<=__const_5^0 && b5^0+2*k+2*k_4<=__const_12^0 && 1+b5^0+2*k+2*k_4<=a4^0+k+__const_10^0*k_4 && 1+__const_5^0<=b5^0+2*k+2*k_4 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=a4^0+k+__const_10^0*k_4+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=a4^0+k+__const_10^0*k_4+__const_10^0 ], cost: NONTERM 154: l3 -> l3 : a4^0'=2+a4^0+k_5*__const_10^0, b5^0'=b5^0+2*k_5-__const_10^0, [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -4-4*b5^0+3*__const_12^0+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+b5^0+2*k_5<=(-1+k_5)*__const_10^0+a4^0 && -2+b5^0+2*k_5<=__const_5^0 && b5^0+2*k_5<=__const_12^0 && -1+b5^0+2*k_5-3*__const_5^0+__const_10^0<=-1 && a4^0+k_5*__const_10^0<=b5^0+2*k_5 ], cost: 4+5*k_5 155: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -4-4*b5^0+3*__const_12^0+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+b5^0+2*k_5<=(-1+k_5)*__const_10^0+a4^0 && b5^0+2*k_5<=__const_12^0 && -1+b5^0+2*k_5-3*__const_5^0+__const_10^0<=-1 && b5^0+2*k_5<=__const_5^0 && __const_10^0<=2+b5^0+2*k_5 && 1+__const_12^0<=2+b5^0+2*k_5 && 3+b5^0+2*k_5<=1+a4^0+k_5*__const_10^0 && 1+__const_5^0<=2+b5^0+2*k_5 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k_5*__const_10^0 ], cost: NONTERM 156: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -4-4*b5^0+3*__const_12^0+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+b5^0+2*k_5<=(-1+k_5)*__const_10^0+a4^0 && -2+b5^0+2*k_5<=__const_5^0 && b5^0+2*k_5<=__const_12^0 && -1+b5^0+2*k_5-3*__const_5^0+__const_10^0<=-1 && 1+b5^0+2*k_5<=a4^0+k_5*__const_10^0 && 1+__const_5^0<=b5^0+2*k_5 && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+a4^0+k_5*__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k_5*__const_10^0 ], cost: NONTERM 157: l3 -> l3 : a4^0'=3+a4^0+k_5*__const_10^0, b5^0'=2*k_5+b5^post_10-__const_10^0, [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && -4+3*__const_12^0-4*b5^post_10+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+2*k_5+b5^post_10<=1+(-1+k_5)*__const_10^0+a4^0 && -2+2*k_5+b5^post_10<=__const_5^0 && 2*k_5+b5^post_10<=__const_12^0 && -1+2*k_5+b5^post_10-3*__const_5^0+__const_10^0<=-1 && 1+a4^0+k_5*__const_10^0<=2*k_5+b5^post_10 ], cost: 8+5*k_5 158: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && -4+3*__const_12^0-4*b5^post_10+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+2*k_5+b5^post_10<=1+(-1+k_5)*__const_10^0+a4^0 && 2*k_5+b5^post_10<=__const_12^0 && -1+2*k_5+b5^post_10-3*__const_5^0+__const_10^0<=-1 && 2*k_5+b5^post_10<=__const_5^0 && __const_10^0<=2+2*k_5+b5^post_10 && 1+__const_12^0<=2+2*k_5+b5^post_10 && 3+2*k_5+b5^post_10<=2+a4^0+k_5*__const_10^0 && 1+__const_5^0<=2+2*k_5+b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=2+a4^0+k_5*__const_10^0 ], cost: NONTERM 159: l3 -> l3 : a4^0'=2+a4^0+k_5*__const_10^0+k, b5^0'=b5^0+2*k_5+2*k-__const_10^0, [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -4-4*b5^0+3*__const_12^0-8*k+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+b5^0+2*k_5+2*k<=(-1+k_5)*__const_10^0+a4^0+k && -2+b5^0+2*k_5+2*k<=__const_5^0 && b5^0+2*k_5+2*k<=__const_12^0 && -1+b5^0+2*k_5+2*k-3*__const_5^0+__const_10^0<=-1 && a4^0+k_5*__const_10^0+k<=b5^0+2*k_5+2*k ], cost: 4+5*k_5+4*k 160: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -4-4*b5^0+3*__const_12^0-8*k+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+b5^0+2*k_5+2*k<=(-1+k_5)*__const_10^0+a4^0+k && b5^0+2*k_5+2*k<=__const_12^0 && -1+b5^0+2*k_5+2*k-3*__const_5^0+__const_10^0<=-1 && b5^0+2*k_5+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k_5+2*k && 1+__const_12^0<=2+b5^0+2*k_5+2*k && 3+b5^0+2*k_5+2*k<=1+a4^0+k_5*__const_10^0+k && 1+__const_5^0<=2+b5^0+2*k_5+2*k && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k_5*__const_10^0+k ], cost: NONTERM 161: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -4-4*b5^0+3*__const_12^0-8*k+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+b5^0+2*k_5+2*k<=(-1+k_5)*__const_10^0+a4^0+k && -2+b5^0+2*k_5+2*k<=__const_5^0 && b5^0+2*k_5+2*k<=__const_12^0 && -1+b5^0+2*k_5+2*k-3*__const_5^0+__const_10^0<=-1 && 1+b5^0+2*k_5+2*k<=a4^0+k_5*__const_10^0+k && 1+__const_5^0<=b5^0+2*k_5+2*k && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+a4^0+k_5*__const_10^0+k && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+a4^0+k_5*__const_10^0+k ], cost: NONTERM 162: l3 -> l3 : a4^0'=2+k_8*__const_10^0+a4^0, b5^0'=b5^0+2*k_8-__const_10^0, [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -8-11*b5^0+__const_12^0+11*__const_5^0<=0 && k_8>=0 && -1+b5^0+2*k_8<=a4^0+__const_10^0*(-1+k_8) && -2+b5^0+2*k_8<=__const_5^0 && b5^0+2*k_8<=__const_12^0 && -1+b5^0+2*k_8-3*__const_5^0+__const_10^0<=-1 && -4+4*b5^0-3*__const_12^0+8*k_8-6*__const_5^0+2*__const_10^0<=-1 && -1+4*b5^0+8*k_8-6*__const_5^0+__const_10^0<=-1 && k_8*__const_10^0+a4^0<=b5^0+2*k_8 ], cost: 4+5*k_8 163: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -8-11*b5^0+__const_12^0+11*__const_5^0<=0 && k_8>=0 && -1+b5^0+2*k_8<=a4^0+__const_10^0*(-1+k_8) && b5^0+2*k_8<=__const_12^0 && -1+b5^0+2*k_8-3*__const_5^0+__const_10^0<=-1 && -4+4*b5^0-3*__const_12^0+8*k_8-6*__const_5^0+2*__const_10^0<=-1 && -1+4*b5^0+8*k_8-6*__const_5^0+__const_10^0<=-1 && b5^0+2*k_8<=__const_5^0 && __const_10^0<=2+b5^0+2*k_8 && 1+__const_12^0<=2+b5^0+2*k_8 && 3+b5^0+2*k_8<=1+k_8*__const_10^0+a4^0 && 1+__const_5^0<=2+b5^0+2*k_8 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+k_8*__const_10^0+a4^0 ], cost: NONTERM 164: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -8-11*b5^0+__const_12^0+11*__const_5^0<=0 && k_8>=0 && -1+b5^0+2*k_8<=a4^0+__const_10^0*(-1+k_8) && -1+b5^0+2*k_8-3*__const_5^0+__const_10^0<=-1 && -4+4*b5^0-3*__const_12^0+8*k_8-6*__const_5^0+2*__const_10^0<=-1 && -1+4*b5^0+8*k_8-6*__const_5^0+__const_10^0<=-1 && 1+b5^0+2*k_8<=k_8*__const_10^0+a4^0 && b5^0+2*k_8<=__const_5^0 && __const_10^0<=2+b5^0+2*k_8 && 2+b5^0+2*k_8<=__const_12^0 && 3+b5^0+2*k_8<=k_8*__const_10^0+a4^0+__const_10^0 && 1+__const_5^0<=2+b5^0+2*k_8 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=k_8*__const_10^0+a4^0+__const_10^0 ], cost: NONTERM 165: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -8-11*b5^0+__const_12^0+11*__const_5^0<=0 && k_8>=0 && -1+b5^0+2*k_8<=a4^0+__const_10^0*(-1+k_8) && -2+b5^0+2*k_8<=__const_5^0 && b5^0+2*k_8<=__const_12^0 && -1+b5^0+2*k_8-3*__const_5^0+__const_10^0<=-1 && -4+4*b5^0-3*__const_12^0+8*k_8-6*__const_5^0+2*__const_10^0<=-1 && -1+4*b5^0+8*k_8-6*__const_5^0+__const_10^0<=-1 && 1+b5^0+2*k_8<=k_8*__const_10^0+a4^0 && 1+__const_5^0<=b5^0+2*k_8 && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+k_8*__const_10^0+a4^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+k_8*__const_10^0+a4^0 ], cost: NONTERM 166: l3 -> [10] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -8-11*b5^0+__const_12^0+11*__const_5^0<=0 && k_8>=0 && -1+b5^0+2*k_8<=a4^0+__const_10^0*(-1+k_8) && -2+b5^0+2*k_8<=__const_5^0 && b5^0+2*k_8<=__const_12^0 && -1+b5^0+2*k_8-3*__const_5^0+__const_10^0<=-1 && -4+4*b5^0-3*__const_12^0+8*k_8-6*__const_5^0+2*__const_10^0<=-1 && -1+4*b5^0+8*k_8-6*__const_5^0+__const_10^0<=-1 && 1+b5^0+2*k_8<=k_8*__const_10^0+a4^0 && 1+__const_5^0<=b5^0+2*k_8 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=k_8*__const_10^0+a4^0+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=k_8*__const_10^0+a4^0+__const_10^0 ], cost: NONTERM 167: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && -8+__const_12^0-11*b5^post_10+11*__const_5^0<=0 && k_8>=0 && -1+2*k_8+b5^post_10<=1+a4^0+__const_10^0*(-1+k_8) && 2*k_8+b5^post_10<=__const_12^0 && -1+2*k_8+b5^post_10-3*__const_5^0+__const_10^0<=-1 && -4-3*__const_12^0+8*k_8+4*b5^post_10-6*__const_5^0+2*__const_10^0<=-1 && -1+8*k_8+4*b5^post_10-6*__const_5^0+__const_10^0<=-1 && 2*k_8+b5^post_10<=__const_5^0 && __const_10^0<=2+2*k_8+b5^post_10 && 1+__const_12^0<=2+2*k_8+b5^post_10 && 3+2*k_8+b5^post_10<=2+k_8*__const_10^0+a4^0 && 1+__const_5^0<=2+2*k_8+b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=2+k_8*__const_10^0+a4^0 ], cost: NONTERM 168: l3 -> [10] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && -8+__const_12^0-11*b5^post_10+11*__const_5^0<=0 && k_8>=0 && -1+2*k_8+b5^post_10<=1+a4^0+__const_10^0*(-1+k_8) && -1+2*k_8+b5^post_10-3*__const_5^0+__const_10^0<=-1 && -4-3*__const_12^0+8*k_8+4*b5^post_10-6*__const_5^0+2*__const_10^0<=-1 && -1+8*k_8+4*b5^post_10-6*__const_5^0+__const_10^0<=-1 && 1+2*k_8+b5^post_10<=1+k_8*__const_10^0+a4^0 && 2*k_8+b5^post_10<=__const_5^0 && __const_10^0<=2+2*k_8+b5^post_10 && 2+2*k_8+b5^post_10<=__const_12^0 && 3+2*k_8+b5^post_10<=1+k_8*__const_10^0+a4^0+__const_10^0 && 1+__const_5^0<=2+2*k_8+b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+k_8*__const_10^0+a4^0+__const_10^0 ], cost: NONTERM 169: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -8-11*b5^0+__const_12^0-22*k+11*__const_5^0<=0 && k_8>=0 && -1+b5^0+2*k_8+2*k<=a4^0+k+__const_10^0*(-1+k_8) && b5^0+2*k_8+2*k<=__const_12^0 && -1+b5^0+2*k_8+2*k-3*__const_5^0+__const_10^0<=-1 && -4+4*b5^0-3*__const_12^0+8*k_8+8*k-6*__const_5^0+2*__const_10^0<=-1 && -1+4*b5^0+8*k_8+8*k-6*__const_5^0+__const_10^0<=-1 && b5^0+2*k_8+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k_8+2*k && 1+__const_12^0<=2+b5^0+2*k_8+2*k && 3+b5^0+2*k_8+2*k<=1+k_8*__const_10^0+a4^0+k && 1+__const_5^0<=2+b5^0+2*k_8+2*k && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+k_8*__const_10^0+a4^0+k ], cost: NONTERM 170: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -8-11*b5^0+__const_12^0-22*k+11*__const_5^0<=0 && k_8>=0 && -1+b5^0+2*k_8+2*k<=a4^0+k+__const_10^0*(-1+k_8) && -1+b5^0+2*k_8+2*k-3*__const_5^0+__const_10^0<=-1 && -4+4*b5^0-3*__const_12^0+8*k_8+8*k-6*__const_5^0+2*__const_10^0<=-1 && -1+4*b5^0+8*k_8+8*k-6*__const_5^0+__const_10^0<=-1 && 1+b5^0+2*k_8+2*k<=k_8*__const_10^0+a4^0+k && b5^0+2*k_8+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k_8+2*k && 2+b5^0+2*k_8+2*k<=__const_12^0 && 3+b5^0+2*k_8+2*k<=k_8*__const_10^0+a4^0+k+__const_10^0 && 1+__const_5^0<=2+b5^0+2*k_8+2*k && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=k_8*__const_10^0+a4^0+k+__const_10^0 ], cost: NONTERM 171: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -8-11*b5^0+__const_12^0-22*k+11*__const_5^0<=0 && k_8>=0 && -1+b5^0+2*k_8+2*k<=a4^0+k+__const_10^0*(-1+k_8) && -2+b5^0+2*k_8+2*k<=__const_5^0 && b5^0+2*k_8+2*k<=__const_12^0 && -1+b5^0+2*k_8+2*k-3*__const_5^0+__const_10^0<=-1 && -4+4*b5^0-3*__const_12^0+8*k_8+8*k-6*__const_5^0+2*__const_10^0<=-1 && -1+4*b5^0+8*k_8+8*k-6*__const_5^0+__const_10^0<=-1 && 1+b5^0+2*k_8+2*k<=k_8*__const_10^0+a4^0+k && 1+__const_5^0<=b5^0+2*k_8+2*k && __const_10^0<=b5^post_10 && 1+__const_12^0<=b5^post_10 && 1+b5^post_10<=1+k_8*__const_10^0+a4^0+k && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=1+k_8*__const_10^0+a4^0+k ], cost: NONTERM 172: l3 -> [10] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -8-11*b5^0+__const_12^0-22*k+11*__const_5^0<=0 && k_8>=0 && -1+b5^0+2*k_8+2*k<=a4^0+k+__const_10^0*(-1+k_8) && -2+b5^0+2*k_8+2*k<=__const_5^0 && b5^0+2*k_8+2*k<=__const_12^0 && -1+b5^0+2*k_8+2*k-3*__const_5^0+__const_10^0<=-1 && -4+4*b5^0-3*__const_12^0+8*k_8+8*k-6*__const_5^0+2*__const_10^0<=-1 && -1+4*b5^0+8*k_8+8*k-6*__const_5^0+__const_10^0<=-1 && 1+b5^0+2*k_8+2*k<=k_8*__const_10^0+a4^0+k && 1+__const_5^0<=b5^0+2*k_8+2*k && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && 1+b5^post_10<=k_8*__const_10^0+a4^0+k+__const_10^0 && 1+__const_5^0<=b5^post_10 && 1+__const_5^0<=-1+__const_10^0 && 1+__const_5^0<=k_8*__const_10^0+a4^0+k+__const_10^0 ], cost: NONTERM 173: l3 -> [12] : [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 2+b5^0+2*k<=__const_12^0 ], cost: 7+4*k 174: l3 -> [12] : [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 1+__const_12^0<=2+b5^0+2*k && 3+b5^0+2*k<=1+a4^0+k && 1+__const_5^0<=2+b5^0+2*k && 1+b5^post_10<=__const_10^0 ], cost: 11+4*k 175: l3 -> [12] : [ 1+a4^0<=__const_30^0 && k>=0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && b5^0+2*k<=__const_5^0 && __const_10^0<=2+b5^0+2*k && 2+b5^0+2*k<=__const_12^0 && 3+b5^0+2*k<=a4^0+k+__const_10^0 && 1+__const_5^0<=2+b5^0+2*k && 1+b5^post_10<=__const_10^0 ], cost: 11+4*k 176: l3 -> [12] : [ 1+a4^0<=__const_30^0 && k>=0 && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && 1+b5^0+2*k<=a4^0+k && 1+__const_5^0<=b5^0+2*k && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 ], cost: 7+4*k 177: l3 -> [12] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && 1+__const_12^0<=2+b5^0 && k_2>=0 && -1+b5^0+2*k_2<=-1+a4^0+k_2 && -2+b5^0+2*k_2<=__const_5^0 ], cost: 2+5*k_2 178: l3 -> [12] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && 1+__const_12^0<=2+b5^post_10 && k_2>=0 && -1+b5^post_10+2*k_2<=a4^0+k_2 && -2+b5^post_10+2*k_2<=__const_5^0 ], cost: 6+5*k_2 179: l3 -> [12] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && 1+__const_12^0<=2+b5^0+2*k && k_2>=0 && -1+b5^0+2*k+2*k_2<=-1+a4^0+k+k_2 && -2+b5^0+2*k+2*k_2<=__const_5^0 ], cost: 2+4*k+5*k_2 180: l3 -> [12] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && -1-b5^post_10+3*__const_5^0-__const_10^0<=0 && k_4>=0 && -1+b5^post_10+2*k_4<=1+a4^0+(-1+k_4)*__const_10^0 && -2+b5^post_10+2*k_4<=__const_5^0 && b5^post_10+2*k_4<=__const_12^0 ], cost: 6+5*k_4 181: l3 -> [12] : [ 1+a4^0<=__const_30^0 && __const_10^0<=2+b5^0 && -4-4*b5^0+3*__const_12^0+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+b5^0+2*k_5<=(-1+k_5)*__const_10^0+a4^0 && -2+b5^0+2*k_5<=__const_5^0 && b5^0+2*k_5<=__const_12^0 && -1+b5^0+2*k_5-3*__const_5^0+__const_10^0<=-1 ], cost: 2+5*k_5 182: l3 -> [12] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && -4+3*__const_12^0-4*b5^post_10+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+2*k_5+b5^post_10<=1+(-1+k_5)*__const_10^0+a4^0 && -2+2*k_5+b5^post_10<=__const_5^0 && 2*k_5+b5^post_10<=__const_12^0 && -1+2*k_5+b5^post_10-3*__const_5^0+__const_10^0<=-1 ], cost: 6+5*k_5 183: l3 -> [12] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -4-4*b5^0+3*__const_12^0-8*k+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && -1+b5^0+2*k_5+2*k<=(-1+k_5)*__const_10^0+a4^0+k && -2+b5^0+2*k_5+2*k<=__const_5^0 && b5^0+2*k_5+2*k<=__const_12^0 && -1+b5^0+2*k_5+2*k-3*__const_5^0+__const_10^0<=-1 ], cost: 2+5*k_5+4*k 184: l3 -> [12] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && 1+__const_5^0<=b5^0 && 1+b5^post_10<=__const_10^0 && __const_10^0<=2+b5^post_10 && -8+__const_12^0-11*b5^post_10+11*__const_5^0<=0 && k_8>=0 && -1+2*k_8+b5^post_10<=1+a4^0+__const_10^0*(-1+k_8) && -2+2*k_8+b5^post_10<=__const_5^0 && 2*k_8+b5^post_10<=__const_12^0 && -1+2*k_8+b5^post_10-3*__const_5^0+__const_10^0<=-1 && -4-3*__const_12^0+8*k_8+4*b5^post_10-6*__const_5^0+2*__const_10^0<=-1 && -1+8*k_8+4*b5^post_10-6*__const_5^0+__const_10^0<=-1 ], cost: 6+5*k_8 185: l3 -> [12] : [ 1+a4^0<=__const_30^0 && k>=0 && -1+b5^0+2*k<=-1+a4^0+k && -2+b5^0+2*k<=__const_5^0 && 1+b5^0+2*k<=__const_10^0 && __const_10^0<=2+b5^0+2*k && -8-11*b5^0+__const_12^0-22*k+11*__const_5^0<=0 && k_8>=0 && -1+b5^0+2*k_8+2*k<=a4^0+k+__const_10^0*(-1+k_8) && -2+b5^0+2*k_8+2*k<=__const_5^0 && b5^0+2*k_8+2*k<=__const_12^0 && -1+b5^0+2*k_8+2*k-3*__const_5^0+__const_10^0<=-1 && -4+4*b5^0-3*__const_12^0+8*k_8+8*k-6*__const_5^0+2*__const_10^0<=-1 && -1+4*b5^0+8*k_8+8*k-6*__const_5^0+__const_10^0<=-1 ], cost: 2+5*k_8+4*k 186: l3 -> [12] : [ 1+a4^0<=__const_30^0 && 1+b5^0<=a4^0 && __const_10^0<=b5^post_10 && b5^post_10<=__const_12^0 && -1+b5^post_10-__const_5^0-__const_10^0<=0 && -2-__const_12^0+b5^post_10-2*__const_5^0+2*__const_10^0<=-1 && -1-__const_5^0+__const_10^0<=-1 && -b5^0+b5^post_10<=0 && k_14>=1 && 1+__const_5^0<=b5^post_10 ], cost: 2+5*k_14 14: l9 -> l3 : a4^0'=1, a^0'=1, answer^0'=0, b5^0'=1, b^0'=1, [], cost: 2 This is only a partial result (probably due to a timeout). Trying to find the maximal complexity that has already been derived. Performed chaining from the start location: Computing asymptotic complexity for rule 187 Simplified the guard: 187: l9 -> l3 : a4^0'=3+k, a^0'=1, answer^0'=0, b5^0'=1+2*k-__const_10^0, b^0'=1, [ 2<=__const_30^0 && k>=0 && 2*k<=k && -1+2*k<=__const_5^0 && 2+2*k<=__const_10^0 ], cost: 6+4*k Resulting cost 0 has complexity: Unknown Computing asymptotic complexity for rule 193 Resulting cost 0 has complexity: Unknown Computing asymptotic complexity for rule 188 Simplified the guard: 188: l9 -> l3 : a4^0'=3+k_2, a^0'=1, answer^0'=0, b5^0'=1+2*k_2-__const_10^0, b^0'=1, [ 2<=__const_30^0 && __const_10^0<=3 && 1+__const_12^0<=3 && k_2>=0 && 2*k_2<=k_2 && -1+2*k_2<=__const_5^0 ], cost: 6+5*k_2 Resulting cost 0 has complexity: Unknown Computing asymptotic complexity for rule 190 Resulting cost 0 has complexity: Unknown Computing asymptotic complexity for rule 195 Simplified the guard: 195: l9 -> [12] : a4^0'=1, a^0'=1, answer^0'=0, b5^0'=1, b^0'=1, [ 2<=__const_30^0 && -8+3*__const_12^0+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && 2*k_5<=1+(-1+k_5)*__const_10^0 && -1+2*k_5<=__const_5^0 && 1+2*k_5<=__const_12^0 && 2*k_5-3*__const_5^0+__const_10^0<=-1 ], cost: 4+5*k_5 Resulting cost 0 has complexity: Unknown Computing asymptotic complexity for rule 191 Simplified the guard: 191: l9 -> l3 : a4^0'=3+k_5*__const_10^0, a^0'=1, answer^0'=0, b5^0'=1+2*k_5-__const_10^0, b^0'=1, [ 2<=__const_30^0 && -8+3*__const_12^0+6*__const_5^0-2*__const_10^0<=0 && k_5>=0 && 2*k_5<=1+(-1+k_5)*__const_10^0 && -1+2*k_5<=__const_5^0 && 1+2*k_5<=__const_12^0 && 2*k_5-3*__const_5^0+__const_10^0<=-1 ], cost: 6+5*k_5 Resulting cost 0 has complexity: Unknown Computing asymptotic complexity for rule 194 Simplified the guard: 194: l9 -> [12] : a4^0'=1, a^0'=1, answer^0'=0, b5^0'=1, b^0'=1, [ 2<=__const_30^0 && k>=0 && -1+2*k<=__const_5^0 && 2+2*k<=__const_10^0 && __const_10^0<=3+2*k && 1+__const_12^0<=3+2*k && k_2>=0 && 2*k+2*k_2<=k+k_2 ], cost: 4+4*k+5*k_2 Resulting cost 0 has complexity: Unknown Computing asymptotic complexity for rule 189 Simplified the guard: 189: l9 -> l3 : a4^0'=3+k+k_2, a^0'=1, answer^0'=0, b5^0'=1+2*k+2*k_2-__const_10^0, b^0'=1, [ 2<=__const_30^0 && k>=0 && -1+2*k<=__const_5^0 && 2+2*k<=__const_10^0 && __const_10^0<=3+2*k && 1+__const_12^0<=3+2*k && k_2>=0 && 2*k+2*k_2<=k+k_2 ], cost: 6+4*k+5*k_2 Resulting cost 0 has complexity: Unknown Computing asymptotic complexity for rule 192 Simplified the guard: 192: l9 -> l3 : a4^0'=3+k_8*__const_10^0, a^0'=1, answer^0'=0, b5^0'=1+2*k_8-__const_10^0, b^0'=1, [ 2<=__const_30^0 && -19+__const_12^0+11*__const_5^0<=0 && k_8>=0 && 2*k_8<=1+__const_10^0*(-1+k_8) && -1+2*k_8<=__const_5^0 && 1+2*k_8<=__const_12^0 && 2*k_8-3*__const_5^0+__const_10^0<=-1 && 3+8*k_8-6*__const_5^0+__const_10^0<=-1 ], cost: 6+5*k_8 Resulting cost 0 has complexity: Unknown Aborting due to timeout 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: [ __const_10^0==__const_10^post_14 && __const_12^0==__const_12^post_14 && __const_30^0==__const_30^post_14 && __const_5^0==__const_5^post_14 && a^0==a^post_14 && a4^0==a4^post_14 && answer^0==answer^post_14 && b^0==b^post_14 && b5^0==b5^post_14 && ret_complex6^0==ret_complex6^post_14 ] WORST_CASE(Omega(1),?)