WORST_CASE(Omega(1),?)

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

Initial linear ITS problem
   Start location: l12
      0: l0 -> l1 : Inner10^0'=Inner10^post_1, InnerIndex7^0'=InnerIndex7^post_1, Ncnt14^0'=Ncnt14^post_1, Negcnt^0'=Negcnt^post_1, Negtotal^0'=Negtotal^post_1, Ntotal12^0'=Ntotal12^post_1, Outer9^0'=Outer9^post_1, OuterIndex6^0'=OuterIndex6^post_1, Pcnt13^0'=Pcnt13^post_1, Poscnt^0'=Poscnt^post_1, Postotal^0'=Postotal^post_1, Ptotal11^0'=Ptotal11^post_1, Seed^0'=Seed^post_1, StartTime2^0'=StartTime2^post_1, StopTime3^0'=StopTime3^post_1, TotalTime4^0'=TotalTime4^post_1, ret_RandomInteger15^0'=ret_RandomInteger15^post_1, [ Inner10^0==Inner10^post_1 && InnerIndex7^0==InnerIndex7^post_1 && Ncnt14^0==Ncnt14^post_1 && Negcnt^0==Negcnt^post_1 && Negtotal^0==Negtotal^post_1 && Ntotal12^0==Ntotal12^post_1 && Outer9^0==Outer9^post_1 && OuterIndex6^0==OuterIndex6^post_1 && Pcnt13^0==Pcnt13^post_1 && Poscnt^0==Poscnt^post_1 && Postotal^0==Postotal^post_1 && Ptotal11^0==Ptotal11^post_1 && Seed^0==Seed^post_1 && StartTime2^0==StartTime2^post_1 && StopTime3^0==StopTime3^post_1 && TotalTime4^0==TotalTime4^post_1 && ret_RandomInteger15^0==ret_RandomInteger15^post_1 ], cost: 1
     13: l1 -> l8 : Inner10^0'=Inner10^post_14, InnerIndex7^0'=InnerIndex7^post_14, Ncnt14^0'=Ncnt14^post_14, Negcnt^0'=Negcnt^post_14, Negtotal^0'=Negtotal^post_14, Ntotal12^0'=Ntotal12^post_14, Outer9^0'=Outer9^post_14, OuterIndex6^0'=OuterIndex6^post_14, Pcnt13^0'=Pcnt13^post_14, Poscnt^0'=Poscnt^post_14, Postotal^0'=Postotal^post_14, Ptotal11^0'=Ptotal11^post_14, Seed^0'=Seed^post_14, StartTime2^0'=StartTime2^post_14, StopTime3^0'=StopTime3^post_14, TotalTime4^0'=TotalTime4^post_14, ret_RandomInteger15^0'=ret_RandomInteger15^post_14, [ 10<=OuterIndex6^0 && StartTime2^post_14==1000 && Ptotal11^post_14==0 && Ntotal12^post_14==0 && Pcnt13^post_14==0 && Ncnt14^post_14==0 && Outer9^post_14==0 && Inner10^0==Inner10^post_14 && InnerIndex7^0==InnerIndex7^post_14 && Negcnt^0==Negcnt^post_14 && Negtotal^0==Negtotal^post_14 && OuterIndex6^0==OuterIndex6^post_14 && Poscnt^0==Poscnt^post_14 && Postotal^0==Postotal^post_14 && Seed^0==Seed^post_14 && StopTime3^0==StopTime3^post_14 && TotalTime4^0==TotalTime4^post_14 && ret_RandomInteger15^0==ret_RandomInteger15^post_14 ], cost: 1
     14: l1 -> l4 : Inner10^0'=Inner10^post_15, InnerIndex7^0'=InnerIndex7^post_15, Ncnt14^0'=Ncnt14^post_15, Negcnt^0'=Negcnt^post_15, Negtotal^0'=Negtotal^post_15, Ntotal12^0'=Ntotal12^post_15, Outer9^0'=Outer9^post_15, OuterIndex6^0'=OuterIndex6^post_15, Pcnt13^0'=Pcnt13^post_15, Poscnt^0'=Poscnt^post_15, Postotal^0'=Postotal^post_15, Ptotal11^0'=Ptotal11^post_15, Seed^0'=Seed^post_15, StartTime2^0'=StartTime2^post_15, StopTime3^0'=StopTime3^post_15, TotalTime4^0'=TotalTime4^post_15, ret_RandomInteger15^0'=ret_RandomInteger15^post_15, [ 1+OuterIndex6^0<=10 && InnerIndex7^post_15==0 && Inner10^0==Inner10^post_15 && Ncnt14^0==Ncnt14^post_15 && Negcnt^0==Negcnt^post_15 && Negtotal^0==Negtotal^post_15 && Ntotal12^0==Ntotal12^post_15 && Outer9^0==Outer9^post_15 && OuterIndex6^0==OuterIndex6^post_15 && Pcnt13^0==Pcnt13^post_15 && Poscnt^0==Poscnt^post_15 && Postotal^0==Postotal^post_15 && Ptotal11^0==Ptotal11^post_15 && Seed^0==Seed^post_15 && StartTime2^0==StartTime2^post_15 && StopTime3^0==StopTime3^post_15 && TotalTime4^0==TotalTime4^post_15 && ret_RandomInteger15^0==ret_RandomInteger15^post_15 ], cost: 1
      1: l2 -> l3 : Inner10^0'=Inner10^post_2, InnerIndex7^0'=InnerIndex7^post_2, Ncnt14^0'=Ncnt14^post_2, Negcnt^0'=Negcnt^post_2, Negtotal^0'=Negtotal^post_2, Ntotal12^0'=Ntotal12^post_2, Outer9^0'=Outer9^post_2, OuterIndex6^0'=OuterIndex6^post_2, Pcnt13^0'=Pcnt13^post_2, Poscnt^0'=Poscnt^post_2, Postotal^0'=Postotal^post_2, Ptotal11^0'=Ptotal11^post_2, Seed^0'=Seed^post_2, StartTime2^0'=StartTime2^post_2, StopTime3^0'=StopTime3^post_2, TotalTime4^0'=TotalTime4^post_2, ret_RandomInteger15^0'=ret_RandomInteger15^post_2, [ Inner10^post_2==1+Inner10^0 && InnerIndex7^0==InnerIndex7^post_2 && Ncnt14^0==Ncnt14^post_2 && Negcnt^0==Negcnt^post_2 && Negtotal^0==Negtotal^post_2 && Ntotal12^0==Ntotal12^post_2 && Outer9^0==Outer9^post_2 && OuterIndex6^0==OuterIndex6^post_2 && Pcnt13^0==Pcnt13^post_2 && Poscnt^0==Poscnt^post_2 && Postotal^0==Postotal^post_2 && Ptotal11^0==Ptotal11^post_2 && Seed^0==Seed^post_2 && StartTime2^0==StartTime2^post_2 && StopTime3^0==StopTime3^post_2 && TotalTime4^0==TotalTime4^post_2 && ret_RandomInteger15^0==ret_RandomInteger15^post_2 ], cost: 1
     10: l3 -> l7 : Inner10^0'=Inner10^post_11, InnerIndex7^0'=InnerIndex7^post_11, Ncnt14^0'=Ncnt14^post_11, Negcnt^0'=Negcnt^post_11, Negtotal^0'=Negtotal^post_11, Ntotal12^0'=Ntotal12^post_11, Outer9^0'=Outer9^post_11, OuterIndex6^0'=OuterIndex6^post_11, Pcnt13^0'=Pcnt13^post_11, Poscnt^0'=Poscnt^post_11, Postotal^0'=Postotal^post_11, Ptotal11^0'=Ptotal11^post_11, Seed^0'=Seed^post_11, StartTime2^0'=StartTime2^post_11, StopTime3^0'=StopTime3^post_11, TotalTime4^0'=TotalTime4^post_11, ret_RandomInteger15^0'=ret_RandomInteger15^post_11, [ Inner10^0==Inner10^post_11 && InnerIndex7^0==InnerIndex7^post_11 && Ncnt14^0==Ncnt14^post_11 && Negcnt^0==Negcnt^post_11 && Negtotal^0==Negtotal^post_11 && Ntotal12^0==Ntotal12^post_11 && Outer9^0==Outer9^post_11 && OuterIndex6^0==OuterIndex6^post_11 && Pcnt13^0==Pcnt13^post_11 && Poscnt^0==Poscnt^post_11 && Postotal^0==Postotal^post_11 && Ptotal11^0==Ptotal11^post_11 && Seed^0==Seed^post_11 && StartTime2^0==StartTime2^post_11 && StopTime3^0==StopTime3^post_11 && TotalTime4^0==TotalTime4^post_11 && ret_RandomInteger15^0==ret_RandomInteger15^post_11 ], cost: 1
      2: l4 -> l5 : Inner10^0'=Inner10^post_3, InnerIndex7^0'=InnerIndex7^post_3, Ncnt14^0'=Ncnt14^post_3, Negcnt^0'=Negcnt^post_3, Negtotal^0'=Negtotal^post_3, Ntotal12^0'=Ntotal12^post_3, Outer9^0'=Outer9^post_3, OuterIndex6^0'=OuterIndex6^post_3, Pcnt13^0'=Pcnt13^post_3, Poscnt^0'=Poscnt^post_3, Postotal^0'=Postotal^post_3, Ptotal11^0'=Ptotal11^post_3, Seed^0'=Seed^post_3, StartTime2^0'=StartTime2^post_3, StopTime3^0'=StopTime3^post_3, TotalTime4^0'=TotalTime4^post_3, ret_RandomInteger15^0'=ret_RandomInteger15^post_3, [ Inner10^0==Inner10^post_3 && InnerIndex7^0==InnerIndex7^post_3 && Ncnt14^0==Ncnt14^post_3 && Negcnt^0==Negcnt^post_3 && Negtotal^0==Negtotal^post_3 && Ntotal12^0==Ntotal12^post_3 && Outer9^0==Outer9^post_3 && OuterIndex6^0==OuterIndex6^post_3 && Pcnt13^0==Pcnt13^post_3 && Poscnt^0==Poscnt^post_3 && Postotal^0==Postotal^post_3 && Ptotal11^0==Ptotal11^post_3 && Seed^0==Seed^post_3 && StartTime2^0==StartTime2^post_3 && StopTime3^0==StopTime3^post_3 && TotalTime4^0==TotalTime4^post_3 && ret_RandomInteger15^0==ret_RandomInteger15^post_3 ], cost: 1
     11: l5 -> l0 : Inner10^0'=Inner10^post_12, InnerIndex7^0'=InnerIndex7^post_12, Ncnt14^0'=Ncnt14^post_12, Negcnt^0'=Negcnt^post_12, Negtotal^0'=Negtotal^post_12, Ntotal12^0'=Ntotal12^post_12, Outer9^0'=Outer9^post_12, OuterIndex6^0'=OuterIndex6^post_12, Pcnt13^0'=Pcnt13^post_12, Poscnt^0'=Poscnt^post_12, Postotal^0'=Postotal^post_12, Ptotal11^0'=Ptotal11^post_12, Seed^0'=Seed^post_12, StartTime2^0'=StartTime2^post_12, StopTime3^0'=StopTime3^post_12, TotalTime4^0'=TotalTime4^post_12, ret_RandomInteger15^0'=ret_RandomInteger15^post_12, [ 10<=InnerIndex7^0 && OuterIndex6^post_12==1+OuterIndex6^0 && Inner10^0==Inner10^post_12 && InnerIndex7^0==InnerIndex7^post_12 && Ncnt14^0==Ncnt14^post_12 && Negcnt^0==Negcnt^post_12 && Negtotal^0==Negtotal^post_12 && Ntotal12^0==Ntotal12^post_12 && Outer9^0==Outer9^post_12 && Pcnt13^0==Pcnt13^post_12 && Poscnt^0==Poscnt^post_12 && Postotal^0==Postotal^post_12 && Ptotal11^0==Ptotal11^post_12 && Seed^0==Seed^post_12 && StartTime2^0==StartTime2^post_12 && StopTime3^0==StopTime3^post_12 && TotalTime4^0==TotalTime4^post_12 && ret_RandomInteger15^0==ret_RandomInteger15^post_12 ], cost: 1
     12: l5 -> l4 : Inner10^0'=Inner10^post_13, InnerIndex7^0'=InnerIndex7^post_13, Ncnt14^0'=Ncnt14^post_13, Negcnt^0'=Negcnt^post_13, Negtotal^0'=Negtotal^post_13, Ntotal12^0'=Ntotal12^post_13, Outer9^0'=Outer9^post_13, OuterIndex6^0'=OuterIndex6^post_13, Pcnt13^0'=Pcnt13^post_13, Poscnt^0'=Poscnt^post_13, Postotal^0'=Postotal^post_13, Ptotal11^0'=Ptotal11^post_13, Seed^0'=Seed^post_13, StartTime2^0'=StartTime2^post_13, StopTime3^0'=StopTime3^post_13, TotalTime4^0'=TotalTime4^post_13, ret_RandomInteger15^0'=ret_RandomInteger15^post_13, [ 1+InnerIndex7^0<=10 && Seed^post_13==Seed^post_13 && ret_RandomInteger15^post_13==Seed^post_13 && InnerIndex7^post_13==1+InnerIndex7^0 && Inner10^0==Inner10^post_13 && Ncnt14^0==Ncnt14^post_13 && Negcnt^0==Negcnt^post_13 && Negtotal^0==Negtotal^post_13 && Ntotal12^0==Ntotal12^post_13 && Outer9^0==Outer9^post_13 && OuterIndex6^0==OuterIndex6^post_13 && Pcnt13^0==Pcnt13^post_13 && Poscnt^0==Poscnt^post_13 && Postotal^0==Postotal^post_13 && Ptotal11^0==Ptotal11^post_13 && StartTime2^0==StartTime2^post_13 && StopTime3^0==StopTime3^post_13 && TotalTime4^0==TotalTime4^post_13 ], cost: 1
      3: l6 -> l2 : Inner10^0'=Inner10^post_4, InnerIndex7^0'=InnerIndex7^post_4, Ncnt14^0'=Ncnt14^post_4, Negcnt^0'=Negcnt^post_4, Negtotal^0'=Negtotal^post_4, Ntotal12^0'=Ntotal12^post_4, Outer9^0'=Outer9^post_4, OuterIndex6^0'=OuterIndex6^post_4, Pcnt13^0'=Pcnt13^post_4, Poscnt^0'=Poscnt^post_4, Postotal^0'=Postotal^post_4, Ptotal11^0'=Ptotal11^post_4, Seed^0'=Seed^post_4, StartTime2^0'=StartTime2^post_4, StopTime3^0'=StopTime3^post_4, TotalTime4^0'=TotalTime4^post_4, ret_RandomInteger15^0'=ret_RandomInteger15^post_4, [ Ptotal11^post_4==Ptotal11^post_4 && Pcnt13^post_4==1+Pcnt13^0 && Inner10^0==Inner10^post_4 && InnerIndex7^0==InnerIndex7^post_4 && Ncnt14^0==Ncnt14^post_4 && Negcnt^0==Negcnt^post_4 && Negtotal^0==Negtotal^post_4 && Ntotal12^0==Ntotal12^post_4 && Outer9^0==Outer9^post_4 && OuterIndex6^0==OuterIndex6^post_4 && Poscnt^0==Poscnt^post_4 && Postotal^0==Postotal^post_4 && Seed^0==Seed^post_4 && StartTime2^0==StartTime2^post_4 && StopTime3^0==StopTime3^post_4 && TotalTime4^0==TotalTime4^post_4 && ret_RandomInteger15^0==ret_RandomInteger15^post_4 ], cost: 1
      4: l6 -> l2 : Inner10^0'=Inner10^post_5, InnerIndex7^0'=InnerIndex7^post_5, Ncnt14^0'=Ncnt14^post_5, Negcnt^0'=Negcnt^post_5, Negtotal^0'=Negtotal^post_5, Ntotal12^0'=Ntotal12^post_5, Outer9^0'=Outer9^post_5, OuterIndex6^0'=OuterIndex6^post_5, Pcnt13^0'=Pcnt13^post_5, Poscnt^0'=Poscnt^post_5, Postotal^0'=Postotal^post_5, Ptotal11^0'=Ptotal11^post_5, Seed^0'=Seed^post_5, StartTime2^0'=StartTime2^post_5, StopTime3^0'=StopTime3^post_5, TotalTime4^0'=TotalTime4^post_5, ret_RandomInteger15^0'=ret_RandomInteger15^post_5, [ Ntotal12^post_5==Ntotal12^post_5 && Ncnt14^post_5==1+Ncnt14^0 && Inner10^0==Inner10^post_5 && InnerIndex7^0==InnerIndex7^post_5 && Negcnt^0==Negcnt^post_5 && Negtotal^0==Negtotal^post_5 && Outer9^0==Outer9^post_5 && OuterIndex6^0==OuterIndex6^post_5 && Pcnt13^0==Pcnt13^post_5 && Poscnt^0==Poscnt^post_5 && Postotal^0==Postotal^post_5 && Ptotal11^0==Ptotal11^post_5 && Seed^0==Seed^post_5 && StartTime2^0==StartTime2^post_5 && StopTime3^0==StopTime3^post_5 && TotalTime4^0==TotalTime4^post_5 && ret_RandomInteger15^0==ret_RandomInteger15^post_5 ], cost: 1
      5: l7 -> l8 : Inner10^0'=Inner10^post_6, InnerIndex7^0'=InnerIndex7^post_6, Ncnt14^0'=Ncnt14^post_6, Negcnt^0'=Negcnt^post_6, Negtotal^0'=Negtotal^post_6, Ntotal12^0'=Ntotal12^post_6, Outer9^0'=Outer9^post_6, OuterIndex6^0'=OuterIndex6^post_6, Pcnt13^0'=Pcnt13^post_6, Poscnt^0'=Poscnt^post_6, Postotal^0'=Postotal^post_6, Ptotal11^0'=Ptotal11^post_6, Seed^0'=Seed^post_6, StartTime2^0'=StartTime2^post_6, StopTime3^0'=StopTime3^post_6, TotalTime4^0'=TotalTime4^post_6, ret_RandomInteger15^0'=ret_RandomInteger15^post_6, [ 10<=Inner10^0 && Outer9^post_6==1+Outer9^0 && Inner10^0==Inner10^post_6 && InnerIndex7^0==InnerIndex7^post_6 && Ncnt14^0==Ncnt14^post_6 && Negcnt^0==Negcnt^post_6 && Negtotal^0==Negtotal^post_6 && Ntotal12^0==Ntotal12^post_6 && OuterIndex6^0==OuterIndex6^post_6 && Pcnt13^0==Pcnt13^post_6 && Poscnt^0==Poscnt^post_6 && Postotal^0==Postotal^post_6 && Ptotal11^0==Ptotal11^post_6 && Seed^0==Seed^post_6 && StartTime2^0==StartTime2^post_6 && StopTime3^0==StopTime3^post_6 && TotalTime4^0==TotalTime4^post_6 && ret_RandomInteger15^0==ret_RandomInteger15^post_6 ], cost: 1
      6: l7 -> l6 : Inner10^0'=Inner10^post_7, InnerIndex7^0'=InnerIndex7^post_7, Ncnt14^0'=Ncnt14^post_7, Negcnt^0'=Negcnt^post_7, Negtotal^0'=Negtotal^post_7, Ntotal12^0'=Ntotal12^post_7, Outer9^0'=Outer9^post_7, OuterIndex6^0'=OuterIndex6^post_7, Pcnt13^0'=Pcnt13^post_7, Poscnt^0'=Poscnt^post_7, Postotal^0'=Postotal^post_7, Ptotal11^0'=Ptotal11^post_7, Seed^0'=Seed^post_7, StartTime2^0'=StartTime2^post_7, StopTime3^0'=StopTime3^post_7, TotalTime4^0'=TotalTime4^post_7, ret_RandomInteger15^0'=ret_RandomInteger15^post_7, [ 1+Inner10^0<=10 && Inner10^0==Inner10^post_7 && InnerIndex7^0==InnerIndex7^post_7 && Ncnt14^0==Ncnt14^post_7 && Negcnt^0==Negcnt^post_7 && Negtotal^0==Negtotal^post_7 && Ntotal12^0==Ntotal12^post_7 && Outer9^0==Outer9^post_7 && OuterIndex6^0==OuterIndex6^post_7 && Pcnt13^0==Pcnt13^post_7 && Poscnt^0==Poscnt^post_7 && Postotal^0==Postotal^post_7 && Ptotal11^0==Ptotal11^post_7 && Seed^0==Seed^post_7 && StartTime2^0==StartTime2^post_7 && StopTime3^0==StopTime3^post_7 && TotalTime4^0==TotalTime4^post_7 && ret_RandomInteger15^0==ret_RandomInteger15^post_7 ], cost: 1
      9: l8 -> l9 : Inner10^0'=Inner10^post_10, InnerIndex7^0'=InnerIndex7^post_10, Ncnt14^0'=Ncnt14^post_10, Negcnt^0'=Negcnt^post_10, Negtotal^0'=Negtotal^post_10, Ntotal12^0'=Ntotal12^post_10, Outer9^0'=Outer9^post_10, OuterIndex6^0'=OuterIndex6^post_10, Pcnt13^0'=Pcnt13^post_10, Poscnt^0'=Poscnt^post_10, Postotal^0'=Postotal^post_10, Ptotal11^0'=Ptotal11^post_10, Seed^0'=Seed^post_10, StartTime2^0'=StartTime2^post_10, StopTime3^0'=StopTime3^post_10, TotalTime4^0'=TotalTime4^post_10, ret_RandomInteger15^0'=ret_RandomInteger15^post_10, [ Inner10^0==Inner10^post_10 && InnerIndex7^0==InnerIndex7^post_10 && Ncnt14^0==Ncnt14^post_10 && Negcnt^0==Negcnt^post_10 && Negtotal^0==Negtotal^post_10 && Ntotal12^0==Ntotal12^post_10 && Outer9^0==Outer9^post_10 && OuterIndex6^0==OuterIndex6^post_10 && Pcnt13^0==Pcnt13^post_10 && Poscnt^0==Poscnt^post_10 && Postotal^0==Postotal^post_10 && Ptotal11^0==Ptotal11^post_10 && Seed^0==Seed^post_10 && StartTime2^0==StartTime2^post_10 && StopTime3^0==StopTime3^post_10 && TotalTime4^0==TotalTime4^post_10 && ret_RandomInteger15^0==ret_RandomInteger15^post_10 ], cost: 1
      7: l9 -> l10 : Inner10^0'=Inner10^post_8, InnerIndex7^0'=InnerIndex7^post_8, Ncnt14^0'=Ncnt14^post_8, Negcnt^0'=Negcnt^post_8, Negtotal^0'=Negtotal^post_8, Ntotal12^0'=Ntotal12^post_8, Outer9^0'=Outer9^post_8, OuterIndex6^0'=OuterIndex6^post_8, Pcnt13^0'=Pcnt13^post_8, Poscnt^0'=Poscnt^post_8, Postotal^0'=Postotal^post_8, Ptotal11^0'=Ptotal11^post_8, Seed^0'=Seed^post_8, StartTime2^0'=StartTime2^post_8, StopTime3^0'=StopTime3^post_8, TotalTime4^0'=TotalTime4^post_8, ret_RandomInteger15^0'=ret_RandomInteger15^post_8, [ 10<=Outer9^0 && Postotal^post_8==Ptotal11^0 && Poscnt^post_8==Pcnt13^0 && Negtotal^post_8==Ntotal12^0 && Negcnt^post_8==Ncnt14^0 && StopTime3^post_8==1500 && TotalTime4^post_8==TotalTime4^post_8 && Inner10^0==Inner10^post_8 && InnerIndex7^0==InnerIndex7^post_8 && Ncnt14^0==Ncnt14^post_8 && Ntotal12^0==Ntotal12^post_8 && Outer9^0==Outer9^post_8 && OuterIndex6^0==OuterIndex6^post_8 && Pcnt13^0==Pcnt13^post_8 && Ptotal11^0==Ptotal11^post_8 && Seed^0==Seed^post_8 && StartTime2^0==StartTime2^post_8 && ret_RandomInteger15^0==ret_RandomInteger15^post_8 ], cost: 1
      8: l9 -> l3 : Inner10^0'=Inner10^post_9, InnerIndex7^0'=InnerIndex7^post_9, Ncnt14^0'=Ncnt14^post_9, Negcnt^0'=Negcnt^post_9, Negtotal^0'=Negtotal^post_9, Ntotal12^0'=Ntotal12^post_9, Outer9^0'=Outer9^post_9, OuterIndex6^0'=OuterIndex6^post_9, Pcnt13^0'=Pcnt13^post_9, Poscnt^0'=Poscnt^post_9, Postotal^0'=Postotal^post_9, Ptotal11^0'=Ptotal11^post_9, Seed^0'=Seed^post_9, StartTime2^0'=StartTime2^post_9, StopTime3^0'=StopTime3^post_9, TotalTime4^0'=TotalTime4^post_9, ret_RandomInteger15^0'=ret_RandomInteger15^post_9, [ 1+Outer9^0<=10 && Inner10^post_9==0 && InnerIndex7^0==InnerIndex7^post_9 && Ncnt14^0==Ncnt14^post_9 && Negcnt^0==Negcnt^post_9 && Negtotal^0==Negtotal^post_9 && Ntotal12^0==Ntotal12^post_9 && Outer9^0==Outer9^post_9 && OuterIndex6^0==OuterIndex6^post_9 && Pcnt13^0==Pcnt13^post_9 && Poscnt^0==Poscnt^post_9 && Postotal^0==Postotal^post_9 && Ptotal11^0==Ptotal11^post_9 && Seed^0==Seed^post_9 && StartTime2^0==StartTime2^post_9 && StopTime3^0==StopTime3^post_9 && TotalTime4^0==TotalTime4^post_9 && ret_RandomInteger15^0==ret_RandomInteger15^post_9 ], cost: 1
     15: l11 -> l0 : Inner10^0'=Inner10^post_16, InnerIndex7^0'=InnerIndex7^post_16, Ncnt14^0'=Ncnt14^post_16, Negcnt^0'=Negcnt^post_16, Negtotal^0'=Negtotal^post_16, Ntotal12^0'=Ntotal12^post_16, Outer9^0'=Outer9^post_16, OuterIndex6^0'=OuterIndex6^post_16, Pcnt13^0'=Pcnt13^post_16, Poscnt^0'=Poscnt^post_16, Postotal^0'=Postotal^post_16, Ptotal11^0'=Ptotal11^post_16, Seed^0'=Seed^post_16, StartTime2^0'=StartTime2^post_16, StopTime3^0'=StopTime3^post_16, TotalTime4^0'=TotalTime4^post_16, ret_RandomInteger15^0'=ret_RandomInteger15^post_16, [ Seed^post_16==0 && OuterIndex6^post_16==0 && Inner10^0==Inner10^post_16 && InnerIndex7^0==InnerIndex7^post_16 && Ncnt14^0==Ncnt14^post_16 && Negcnt^0==Negcnt^post_16 && Negtotal^0==Negtotal^post_16 && Ntotal12^0==Ntotal12^post_16 && Outer9^0==Outer9^post_16 && Pcnt13^0==Pcnt13^post_16 && Poscnt^0==Poscnt^post_16 && Postotal^0==Postotal^post_16 && Ptotal11^0==Ptotal11^post_16 && StartTime2^0==StartTime2^post_16 && StopTime3^0==StopTime3^post_16 && TotalTime4^0==TotalTime4^post_16 && ret_RandomInteger15^0==ret_RandomInteger15^post_16 ], cost: 1
     16: l12 -> l11 : Inner10^0'=Inner10^post_17, InnerIndex7^0'=InnerIndex7^post_17, Ncnt14^0'=Ncnt14^post_17, Negcnt^0'=Negcnt^post_17, Negtotal^0'=Negtotal^post_17, Ntotal12^0'=Ntotal12^post_17, Outer9^0'=Outer9^post_17, OuterIndex6^0'=OuterIndex6^post_17, Pcnt13^0'=Pcnt13^post_17, Poscnt^0'=Poscnt^post_17, Postotal^0'=Postotal^post_17, Ptotal11^0'=Ptotal11^post_17, Seed^0'=Seed^post_17, StartTime2^0'=StartTime2^post_17, StopTime3^0'=StopTime3^post_17, TotalTime4^0'=TotalTime4^post_17, ret_RandomInteger15^0'=ret_RandomInteger15^post_17, [ Inner10^0==Inner10^post_17 && InnerIndex7^0==InnerIndex7^post_17 && Ncnt14^0==Ncnt14^post_17 && Negcnt^0==Negcnt^post_17 && Negtotal^0==Negtotal^post_17 && Ntotal12^0==Ntotal12^post_17 && Outer9^0==Outer9^post_17 && OuterIndex6^0==OuterIndex6^post_17 && Pcnt13^0==Pcnt13^post_17 && Poscnt^0==Poscnt^post_17 && Postotal^0==Postotal^post_17 && Ptotal11^0==Ptotal11^post_17 && Seed^0==Seed^post_17 && StartTime2^0==StartTime2^post_17 && StopTime3^0==StopTime3^post_17 && TotalTime4^0==TotalTime4^post_17 && ret_RandomInteger15^0==ret_RandomInteger15^post_17 ], cost: 1

Checking for constant complexity:
   The following rule is satisfiable with cost >= 1, yielding constant complexity:
     16: l12 -> l11 : Inner10^0'=Inner10^post_17, InnerIndex7^0'=InnerIndex7^post_17, Ncnt14^0'=Ncnt14^post_17, Negcnt^0'=Negcnt^post_17, Negtotal^0'=Negtotal^post_17, Ntotal12^0'=Ntotal12^post_17, Outer9^0'=Outer9^post_17, OuterIndex6^0'=OuterIndex6^post_17, Pcnt13^0'=Pcnt13^post_17, Poscnt^0'=Poscnt^post_17, Postotal^0'=Postotal^post_17, Ptotal11^0'=Ptotal11^post_17, Seed^0'=Seed^post_17, StartTime2^0'=StartTime2^post_17, StopTime3^0'=StopTime3^post_17, TotalTime4^0'=TotalTime4^post_17, ret_RandomInteger15^0'=ret_RandomInteger15^post_17, [ Inner10^0==Inner10^post_17 && InnerIndex7^0==InnerIndex7^post_17 && Ncnt14^0==Ncnt14^post_17 && Negcnt^0==Negcnt^post_17 && Negtotal^0==Negtotal^post_17 && Ntotal12^0==Ntotal12^post_17 && Outer9^0==Outer9^post_17 && OuterIndex6^0==OuterIndex6^post_17 && Pcnt13^0==Pcnt13^post_17 && Poscnt^0==Poscnt^post_17 && Postotal^0==Postotal^post_17 && Ptotal11^0==Ptotal11^post_17 && Seed^0==Seed^post_17 && StartTime2^0==StartTime2^post_17 && StopTime3^0==StopTime3^post_17 && TotalTime4^0==TotalTime4^post_17 && ret_RandomInteger15^0==ret_RandomInteger15^post_17 ], cost: 1

Removed unreachable and leaf rules:
   Start location: l12
      0: l0 -> l1 : Inner10^0'=Inner10^post_1, InnerIndex7^0'=InnerIndex7^post_1, Ncnt14^0'=Ncnt14^post_1, Negcnt^0'=Negcnt^post_1, Negtotal^0'=Negtotal^post_1, Ntotal12^0'=Ntotal12^post_1, Outer9^0'=Outer9^post_1, OuterIndex6^0'=OuterIndex6^post_1, Pcnt13^0'=Pcnt13^post_1, Poscnt^0'=Poscnt^post_1, Postotal^0'=Postotal^post_1, Ptotal11^0'=Ptotal11^post_1, Seed^0'=Seed^post_1, StartTime2^0'=StartTime2^post_1, StopTime3^0'=StopTime3^post_1, TotalTime4^0'=TotalTime4^post_1, ret_RandomInteger15^0'=ret_RandomInteger15^post_1, [ Inner10^0==Inner10^post_1 && InnerIndex7^0==InnerIndex7^post_1 && Ncnt14^0==Ncnt14^post_1 && Negcnt^0==Negcnt^post_1 && Negtotal^0==Negtotal^post_1 && Ntotal12^0==Ntotal12^post_1 && Outer9^0==Outer9^post_1 && OuterIndex6^0==OuterIndex6^post_1 && Pcnt13^0==Pcnt13^post_1 && Poscnt^0==Poscnt^post_1 && Postotal^0==Postotal^post_1 && Ptotal11^0==Ptotal11^post_1 && Seed^0==Seed^post_1 && StartTime2^0==StartTime2^post_1 && StopTime3^0==StopTime3^post_1 && TotalTime4^0==TotalTime4^post_1 && ret_RandomInteger15^0==ret_RandomInteger15^post_1 ], cost: 1
     13: l1 -> l8 : Inner10^0'=Inner10^post_14, InnerIndex7^0'=InnerIndex7^post_14, Ncnt14^0'=Ncnt14^post_14, Negcnt^0'=Negcnt^post_14, Negtotal^0'=Negtotal^post_14, Ntotal12^0'=Ntotal12^post_14, Outer9^0'=Outer9^post_14, OuterIndex6^0'=OuterIndex6^post_14, Pcnt13^0'=Pcnt13^post_14, Poscnt^0'=Poscnt^post_14, Postotal^0'=Postotal^post_14, Ptotal11^0'=Ptotal11^post_14, Seed^0'=Seed^post_14, StartTime2^0'=StartTime2^post_14, StopTime3^0'=StopTime3^post_14, TotalTime4^0'=TotalTime4^post_14, ret_RandomInteger15^0'=ret_RandomInteger15^post_14, [ 10<=OuterIndex6^0 && StartTime2^post_14==1000 && Ptotal11^post_14==0 && Ntotal12^post_14==0 && Pcnt13^post_14==0 && Ncnt14^post_14==0 && Outer9^post_14==0 && Inner10^0==Inner10^post_14 && InnerIndex7^0==InnerIndex7^post_14 && Negcnt^0==Negcnt^post_14 && Negtotal^0==Negtotal^post_14 && OuterIndex6^0==OuterIndex6^post_14 && Poscnt^0==Poscnt^post_14 && Postotal^0==Postotal^post_14 && Seed^0==Seed^post_14 && StopTime3^0==StopTime3^post_14 && TotalTime4^0==TotalTime4^post_14 && ret_RandomInteger15^0==ret_RandomInteger15^post_14 ], cost: 1
     14: l1 -> l4 : Inner10^0'=Inner10^post_15, InnerIndex7^0'=InnerIndex7^post_15, Ncnt14^0'=Ncnt14^post_15, Negcnt^0'=Negcnt^post_15, Negtotal^0'=Negtotal^post_15, Ntotal12^0'=Ntotal12^post_15, Outer9^0'=Outer9^post_15, OuterIndex6^0'=OuterIndex6^post_15, Pcnt13^0'=Pcnt13^post_15, Poscnt^0'=Poscnt^post_15, Postotal^0'=Postotal^post_15, Ptotal11^0'=Ptotal11^post_15, Seed^0'=Seed^post_15, StartTime2^0'=StartTime2^post_15, StopTime3^0'=StopTime3^post_15, TotalTime4^0'=TotalTime4^post_15, ret_RandomInteger15^0'=ret_RandomInteger15^post_15, [ 1+OuterIndex6^0<=10 && InnerIndex7^post_15==0 && Inner10^0==Inner10^post_15 && Ncnt14^0==Ncnt14^post_15 && Negcnt^0==Negcnt^post_15 && Negtotal^0==Negtotal^post_15 && Ntotal12^0==Ntotal12^post_15 && Outer9^0==Outer9^post_15 && OuterIndex6^0==OuterIndex6^post_15 && Pcnt13^0==Pcnt13^post_15 && Poscnt^0==Poscnt^post_15 && Postotal^0==Postotal^post_15 && Ptotal11^0==Ptotal11^post_15 && Seed^0==Seed^post_15 && StartTime2^0==StartTime2^post_15 && StopTime3^0==StopTime3^post_15 && TotalTime4^0==TotalTime4^post_15 && ret_RandomInteger15^0==ret_RandomInteger15^post_15 ], cost: 1
      1: l2 -> l3 : Inner10^0'=Inner10^post_2, InnerIndex7^0'=InnerIndex7^post_2, Ncnt14^0'=Ncnt14^post_2, Negcnt^0'=Negcnt^post_2, Negtotal^0'=Negtotal^post_2, Ntotal12^0'=Ntotal12^post_2, Outer9^0'=Outer9^post_2, OuterIndex6^0'=OuterIndex6^post_2, Pcnt13^0'=Pcnt13^post_2, Poscnt^0'=Poscnt^post_2, Postotal^0'=Postotal^post_2, Ptotal11^0'=Ptotal11^post_2, Seed^0'=Seed^post_2, StartTime2^0'=StartTime2^post_2, StopTime3^0'=StopTime3^post_2, TotalTime4^0'=TotalTime4^post_2, ret_RandomInteger15^0'=ret_RandomInteger15^post_2, [ Inner10^post_2==1+Inner10^0 && InnerIndex7^0==InnerIndex7^post_2 && Ncnt14^0==Ncnt14^post_2 && Negcnt^0==Negcnt^post_2 && Negtotal^0==Negtotal^post_2 && Ntotal12^0==Ntotal12^post_2 && Outer9^0==Outer9^post_2 && OuterIndex6^0==OuterIndex6^post_2 && Pcnt13^0==Pcnt13^post_2 && Poscnt^0==Poscnt^post_2 && Postotal^0==Postotal^post_2 && Ptotal11^0==Ptotal11^post_2 && Seed^0==Seed^post_2 && StartTime2^0==StartTime2^post_2 && StopTime3^0==StopTime3^post_2 && TotalTime4^0==TotalTime4^post_2 && ret_RandomInteger15^0==ret_RandomInteger15^post_2 ], cost: 1
     10: l3 -> l7 : Inner10^0'=Inner10^post_11, InnerIndex7^0'=InnerIndex7^post_11, Ncnt14^0'=Ncnt14^post_11, Negcnt^0'=Negcnt^post_11, Negtotal^0'=Negtotal^post_11, Ntotal12^0'=Ntotal12^post_11, Outer9^0'=Outer9^post_11, OuterIndex6^0'=OuterIndex6^post_11, Pcnt13^0'=Pcnt13^post_11, Poscnt^0'=Poscnt^post_11, Postotal^0'=Postotal^post_11, Ptotal11^0'=Ptotal11^post_11, Seed^0'=Seed^post_11, StartTime2^0'=StartTime2^post_11, StopTime3^0'=StopTime3^post_11, TotalTime4^0'=TotalTime4^post_11, ret_RandomInteger15^0'=ret_RandomInteger15^post_11, [ Inner10^0==Inner10^post_11 && InnerIndex7^0==InnerIndex7^post_11 && Ncnt14^0==Ncnt14^post_11 && Negcnt^0==Negcnt^post_11 && Negtotal^0==Negtotal^post_11 && Ntotal12^0==Ntotal12^post_11 && Outer9^0==Outer9^post_11 && OuterIndex6^0==OuterIndex6^post_11 && Pcnt13^0==Pcnt13^post_11 && Poscnt^0==Poscnt^post_11 && Postotal^0==Postotal^post_11 && Ptotal11^0==Ptotal11^post_11 && Seed^0==Seed^post_11 && StartTime2^0==StartTime2^post_11 && StopTime3^0==StopTime3^post_11 && TotalTime4^0==TotalTime4^post_11 && ret_RandomInteger15^0==ret_RandomInteger15^post_11 ], cost: 1
      2: l4 -> l5 : Inner10^0'=Inner10^post_3, InnerIndex7^0'=InnerIndex7^post_3, Ncnt14^0'=Ncnt14^post_3, Negcnt^0'=Negcnt^post_3, Negtotal^0'=Negtotal^post_3, Ntotal12^0'=Ntotal12^post_3, Outer9^0'=Outer9^post_3, OuterIndex6^0'=OuterIndex6^post_3, Pcnt13^0'=Pcnt13^post_3, Poscnt^0'=Poscnt^post_3, Postotal^0'=Postotal^post_3, Ptotal11^0'=Ptotal11^post_3, Seed^0'=Seed^post_3, StartTime2^0'=StartTime2^post_3, StopTime3^0'=StopTime3^post_3, TotalTime4^0'=TotalTime4^post_3, ret_RandomInteger15^0'=ret_RandomInteger15^post_3, [ Inner10^0==Inner10^post_3 && InnerIndex7^0==InnerIndex7^post_3 && Ncnt14^0==Ncnt14^post_3 && Negcnt^0==Negcnt^post_3 && Negtotal^0==Negtotal^post_3 && Ntotal12^0==Ntotal12^post_3 && Outer9^0==Outer9^post_3 && OuterIndex6^0==OuterIndex6^post_3 && Pcnt13^0==Pcnt13^post_3 && Poscnt^0==Poscnt^post_3 && Postotal^0==Postotal^post_3 && Ptotal11^0==Ptotal11^post_3 && Seed^0==Seed^post_3 && StartTime2^0==StartTime2^post_3 && StopTime3^0==StopTime3^post_3 && TotalTime4^0==TotalTime4^post_3 && ret_RandomInteger15^0==ret_RandomInteger15^post_3 ], cost: 1
     11: l5 -> l0 : Inner10^0'=Inner10^post_12, InnerIndex7^0'=InnerIndex7^post_12, Ncnt14^0'=Ncnt14^post_12, Negcnt^0'=Negcnt^post_12, Negtotal^0'=Negtotal^post_12, Ntotal12^0'=Ntotal12^post_12, Outer9^0'=Outer9^post_12, OuterIndex6^0'=OuterIndex6^post_12, Pcnt13^0'=Pcnt13^post_12, Poscnt^0'=Poscnt^post_12, Postotal^0'=Postotal^post_12, Ptotal11^0'=Ptotal11^post_12, Seed^0'=Seed^post_12, StartTime2^0'=StartTime2^post_12, StopTime3^0'=StopTime3^post_12, TotalTime4^0'=TotalTime4^post_12, ret_RandomInteger15^0'=ret_RandomInteger15^post_12, [ 10<=InnerIndex7^0 && OuterIndex6^post_12==1+OuterIndex6^0 && Inner10^0==Inner10^post_12 && InnerIndex7^0==InnerIndex7^post_12 && Ncnt14^0==Ncnt14^post_12 && Negcnt^0==Negcnt^post_12 && Negtotal^0==Negtotal^post_12 && Ntotal12^0==Ntotal12^post_12 && Outer9^0==Outer9^post_12 && Pcnt13^0==Pcnt13^post_12 && Poscnt^0==Poscnt^post_12 && Postotal^0==Postotal^post_12 && Ptotal11^0==Ptotal11^post_12 && Seed^0==Seed^post_12 && StartTime2^0==StartTime2^post_12 && StopTime3^0==StopTime3^post_12 && TotalTime4^0==TotalTime4^post_12 && ret_RandomInteger15^0==ret_RandomInteger15^post_12 ], cost: 1
     12: l5 -> l4 : Inner10^0'=Inner10^post_13, InnerIndex7^0'=InnerIndex7^post_13, Ncnt14^0'=Ncnt14^post_13, Negcnt^0'=Negcnt^post_13, Negtotal^0'=Negtotal^post_13, Ntotal12^0'=Ntotal12^post_13, Outer9^0'=Outer9^post_13, OuterIndex6^0'=OuterIndex6^post_13, Pcnt13^0'=Pcnt13^post_13, Poscnt^0'=Poscnt^post_13, Postotal^0'=Postotal^post_13, Ptotal11^0'=Ptotal11^post_13, Seed^0'=Seed^post_13, StartTime2^0'=StartTime2^post_13, StopTime3^0'=StopTime3^post_13, TotalTime4^0'=TotalTime4^post_13, ret_RandomInteger15^0'=ret_RandomInteger15^post_13, [ 1+InnerIndex7^0<=10 && Seed^post_13==Seed^post_13 && ret_RandomInteger15^post_13==Seed^post_13 && InnerIndex7^post_13==1+InnerIndex7^0 && Inner10^0==Inner10^post_13 && Ncnt14^0==Ncnt14^post_13 && Negcnt^0==Negcnt^post_13 && Negtotal^0==Negtotal^post_13 && Ntotal12^0==Ntotal12^post_13 && Outer9^0==Outer9^post_13 && OuterIndex6^0==OuterIndex6^post_13 && Pcnt13^0==Pcnt13^post_13 && Poscnt^0==Poscnt^post_13 && Postotal^0==Postotal^post_13 && Ptotal11^0==Ptotal11^post_13 && StartTime2^0==StartTime2^post_13 && StopTime3^0==StopTime3^post_13 && TotalTime4^0==TotalTime4^post_13 ], cost: 1
      3: l6 -> l2 : Inner10^0'=Inner10^post_4, InnerIndex7^0'=InnerIndex7^post_4, Ncnt14^0'=Ncnt14^post_4, Negcnt^0'=Negcnt^post_4, Negtotal^0'=Negtotal^post_4, Ntotal12^0'=Ntotal12^post_4, Outer9^0'=Outer9^post_4, OuterIndex6^0'=OuterIndex6^post_4, Pcnt13^0'=Pcnt13^post_4, Poscnt^0'=Poscnt^post_4, Postotal^0'=Postotal^post_4, Ptotal11^0'=Ptotal11^post_4, Seed^0'=Seed^post_4, StartTime2^0'=StartTime2^post_4, StopTime3^0'=StopTime3^post_4, TotalTime4^0'=TotalTime4^post_4, ret_RandomInteger15^0'=ret_RandomInteger15^post_4, [ Ptotal11^post_4==Ptotal11^post_4 && Pcnt13^post_4==1+Pcnt13^0 && Inner10^0==Inner10^post_4 && InnerIndex7^0==InnerIndex7^post_4 && Ncnt14^0==Ncnt14^post_4 && Negcnt^0==Negcnt^post_4 && Negtotal^0==Negtotal^post_4 && Ntotal12^0==Ntotal12^post_4 && Outer9^0==Outer9^post_4 && OuterIndex6^0==OuterIndex6^post_4 && Poscnt^0==Poscnt^post_4 && Postotal^0==Postotal^post_4 && Seed^0==Seed^post_4 && StartTime2^0==StartTime2^post_4 && StopTime3^0==StopTime3^post_4 && TotalTime4^0==TotalTime4^post_4 && ret_RandomInteger15^0==ret_RandomInteger15^post_4 ], cost: 1
      4: l6 -> l2 : Inner10^0'=Inner10^post_5, InnerIndex7^0'=InnerIndex7^post_5, Ncnt14^0'=Ncnt14^post_5, Negcnt^0'=Negcnt^post_5, Negtotal^0'=Negtotal^post_5, Ntotal12^0'=Ntotal12^post_5, Outer9^0'=Outer9^post_5, OuterIndex6^0'=OuterIndex6^post_5, Pcnt13^0'=Pcnt13^post_5, Poscnt^0'=Poscnt^post_5, Postotal^0'=Postotal^post_5, Ptotal11^0'=Ptotal11^post_5, Seed^0'=Seed^post_5, StartTime2^0'=StartTime2^post_5, StopTime3^0'=StopTime3^post_5, TotalTime4^0'=TotalTime4^post_5, ret_RandomInteger15^0'=ret_RandomInteger15^post_5, [ Ntotal12^post_5==Ntotal12^post_5 && Ncnt14^post_5==1+Ncnt14^0 && Inner10^0==Inner10^post_5 && InnerIndex7^0==InnerIndex7^post_5 && Negcnt^0==Negcnt^post_5 && Negtotal^0==Negtotal^post_5 && Outer9^0==Outer9^post_5 && OuterIndex6^0==OuterIndex6^post_5 && Pcnt13^0==Pcnt13^post_5 && Poscnt^0==Poscnt^post_5 && Postotal^0==Postotal^post_5 && Ptotal11^0==Ptotal11^post_5 && Seed^0==Seed^post_5 && StartTime2^0==StartTime2^post_5 && StopTime3^0==StopTime3^post_5 && TotalTime4^0==TotalTime4^post_5 && ret_RandomInteger15^0==ret_RandomInteger15^post_5 ], cost: 1
      5: l7 -> l8 : Inner10^0'=Inner10^post_6, InnerIndex7^0'=InnerIndex7^post_6, Ncnt14^0'=Ncnt14^post_6, Negcnt^0'=Negcnt^post_6, Negtotal^0'=Negtotal^post_6, Ntotal12^0'=Ntotal12^post_6, Outer9^0'=Outer9^post_6, OuterIndex6^0'=OuterIndex6^post_6, Pcnt13^0'=Pcnt13^post_6, Poscnt^0'=Poscnt^post_6, Postotal^0'=Postotal^post_6, Ptotal11^0'=Ptotal11^post_6, Seed^0'=Seed^post_6, StartTime2^0'=StartTime2^post_6, StopTime3^0'=StopTime3^post_6, TotalTime4^0'=TotalTime4^post_6, ret_RandomInteger15^0'=ret_RandomInteger15^post_6, [ 10<=Inner10^0 && Outer9^post_6==1+Outer9^0 && Inner10^0==Inner10^post_6 && InnerIndex7^0==InnerIndex7^post_6 && Ncnt14^0==Ncnt14^post_6 && Negcnt^0==Negcnt^post_6 && Negtotal^0==Negtotal^post_6 && Ntotal12^0==Ntotal12^post_6 && OuterIndex6^0==OuterIndex6^post_6 && Pcnt13^0==Pcnt13^post_6 && Poscnt^0==Poscnt^post_6 && Postotal^0==Postotal^post_6 && Ptotal11^0==Ptotal11^post_6 && Seed^0==Seed^post_6 && StartTime2^0==StartTime2^post_6 && StopTime3^0==StopTime3^post_6 && TotalTime4^0==TotalTime4^post_6 && ret_RandomInteger15^0==ret_RandomInteger15^post_6 ], cost: 1
      6: l7 -> l6 : Inner10^0'=Inner10^post_7, InnerIndex7^0'=InnerIndex7^post_7, Ncnt14^0'=Ncnt14^post_7, Negcnt^0'=Negcnt^post_7, Negtotal^0'=Negtotal^post_7, Ntotal12^0'=Ntotal12^post_7, Outer9^0'=Outer9^post_7, OuterIndex6^0'=OuterIndex6^post_7, Pcnt13^0'=Pcnt13^post_7, Poscnt^0'=Poscnt^post_7, Postotal^0'=Postotal^post_7, Ptotal11^0'=Ptotal11^post_7, Seed^0'=Seed^post_7, StartTime2^0'=StartTime2^post_7, StopTime3^0'=StopTime3^post_7, TotalTime4^0'=TotalTime4^post_7, ret_RandomInteger15^0'=ret_RandomInteger15^post_7, [ 1+Inner10^0<=10 && Inner10^0==Inner10^post_7 && InnerIndex7^0==InnerIndex7^post_7 && Ncnt14^0==Ncnt14^post_7 && Negcnt^0==Negcnt^post_7 && Negtotal^0==Negtotal^post_7 && Ntotal12^0==Ntotal12^post_7 && Outer9^0==Outer9^post_7 && OuterIndex6^0==OuterIndex6^post_7 && Pcnt13^0==Pcnt13^post_7 && Poscnt^0==Poscnt^post_7 && Postotal^0==Postotal^post_7 && Ptotal11^0==Ptotal11^post_7 && Seed^0==Seed^post_7 && StartTime2^0==StartTime2^post_7 && StopTime3^0==StopTime3^post_7 && TotalTime4^0==TotalTime4^post_7 && ret_RandomInteger15^0==ret_RandomInteger15^post_7 ], cost: 1
      9: l8 -> l9 : Inner10^0'=Inner10^post_10, InnerIndex7^0'=InnerIndex7^post_10, Ncnt14^0'=Ncnt14^post_10, Negcnt^0'=Negcnt^post_10, Negtotal^0'=Negtotal^post_10, Ntotal12^0'=Ntotal12^post_10, Outer9^0'=Outer9^post_10, OuterIndex6^0'=OuterIndex6^post_10, Pcnt13^0'=Pcnt13^post_10, Poscnt^0'=Poscnt^post_10, Postotal^0'=Postotal^post_10, Ptotal11^0'=Ptotal11^post_10, Seed^0'=Seed^post_10, StartTime2^0'=StartTime2^post_10, StopTime3^0'=StopTime3^post_10, TotalTime4^0'=TotalTime4^post_10, ret_RandomInteger15^0'=ret_RandomInteger15^post_10, [ Inner10^0==Inner10^post_10 && InnerIndex7^0==InnerIndex7^post_10 && Ncnt14^0==Ncnt14^post_10 && Negcnt^0==Negcnt^post_10 && Negtotal^0==Negtotal^post_10 && Ntotal12^0==Ntotal12^post_10 && Outer9^0==Outer9^post_10 && OuterIndex6^0==OuterIndex6^post_10 && Pcnt13^0==Pcnt13^post_10 && Poscnt^0==Poscnt^post_10 && Postotal^0==Postotal^post_10 && Ptotal11^0==Ptotal11^post_10 && Seed^0==Seed^post_10 && StartTime2^0==StartTime2^post_10 && StopTime3^0==StopTime3^post_10 && TotalTime4^0==TotalTime4^post_10 && ret_RandomInteger15^0==ret_RandomInteger15^post_10 ], cost: 1
      8: l9 -> l3 : Inner10^0'=Inner10^post_9, InnerIndex7^0'=InnerIndex7^post_9, Ncnt14^0'=Ncnt14^post_9, Negcnt^0'=Negcnt^post_9, Negtotal^0'=Negtotal^post_9, Ntotal12^0'=Ntotal12^post_9, Outer9^0'=Outer9^post_9, OuterIndex6^0'=OuterIndex6^post_9, Pcnt13^0'=Pcnt13^post_9, Poscnt^0'=Poscnt^post_9, Postotal^0'=Postotal^post_9, Ptotal11^0'=Ptotal11^post_9, Seed^0'=Seed^post_9, StartTime2^0'=StartTime2^post_9, StopTime3^0'=StopTime3^post_9, TotalTime4^0'=TotalTime4^post_9, ret_RandomInteger15^0'=ret_RandomInteger15^post_9, [ 1+Outer9^0<=10 && Inner10^post_9==0 && InnerIndex7^0==InnerIndex7^post_9 && Ncnt14^0==Ncnt14^post_9 && Negcnt^0==Negcnt^post_9 && Negtotal^0==Negtotal^post_9 && Ntotal12^0==Ntotal12^post_9 && Outer9^0==Outer9^post_9 && OuterIndex6^0==OuterIndex6^post_9 && Pcnt13^0==Pcnt13^post_9 && Poscnt^0==Poscnt^post_9 && Postotal^0==Postotal^post_9 && Ptotal11^0==Ptotal11^post_9 && Seed^0==Seed^post_9 && StartTime2^0==StartTime2^post_9 && StopTime3^0==StopTime3^post_9 && TotalTime4^0==TotalTime4^post_9 && ret_RandomInteger15^0==ret_RandomInteger15^post_9 ], cost: 1
     15: l11 -> l0 : Inner10^0'=Inner10^post_16, InnerIndex7^0'=InnerIndex7^post_16, Ncnt14^0'=Ncnt14^post_16, Negcnt^0'=Negcnt^post_16, Negtotal^0'=Negtotal^post_16, Ntotal12^0'=Ntotal12^post_16, Outer9^0'=Outer9^post_16, OuterIndex6^0'=OuterIndex6^post_16, Pcnt13^0'=Pcnt13^post_16, Poscnt^0'=Poscnt^post_16, Postotal^0'=Postotal^post_16, Ptotal11^0'=Ptotal11^post_16, Seed^0'=Seed^post_16, StartTime2^0'=StartTime2^post_16, StopTime3^0'=StopTime3^post_16, TotalTime4^0'=TotalTime4^post_16, ret_RandomInteger15^0'=ret_RandomInteger15^post_16, [ Seed^post_16==0 && OuterIndex6^post_16==0 && Inner10^0==Inner10^post_16 && InnerIndex7^0==InnerIndex7^post_16 && Ncnt14^0==Ncnt14^post_16 && Negcnt^0==Negcnt^post_16 && Negtotal^0==Negtotal^post_16 && Ntotal12^0==Ntotal12^post_16 && Outer9^0==Outer9^post_16 && Pcnt13^0==Pcnt13^post_16 && Poscnt^0==Poscnt^post_16 && Postotal^0==Postotal^post_16 && Ptotal11^0==Ptotal11^post_16 && StartTime2^0==StartTime2^post_16 && StopTime3^0==StopTime3^post_16 && TotalTime4^0==TotalTime4^post_16 && ret_RandomInteger15^0==ret_RandomInteger15^post_16 ], cost: 1
     16: l12 -> l11 : Inner10^0'=Inner10^post_17, InnerIndex7^0'=InnerIndex7^post_17, Ncnt14^0'=Ncnt14^post_17, Negcnt^0'=Negcnt^post_17, Negtotal^0'=Negtotal^post_17, Ntotal12^0'=Ntotal12^post_17, Outer9^0'=Outer9^post_17, OuterIndex6^0'=OuterIndex6^post_17, Pcnt13^0'=Pcnt13^post_17, Poscnt^0'=Poscnt^post_17, Postotal^0'=Postotal^post_17, Ptotal11^0'=Ptotal11^post_17, Seed^0'=Seed^post_17, StartTime2^0'=StartTime2^post_17, StopTime3^0'=StopTime3^post_17, TotalTime4^0'=TotalTime4^post_17, ret_RandomInteger15^0'=ret_RandomInteger15^post_17, [ Inner10^0==Inner10^post_17 && InnerIndex7^0==InnerIndex7^post_17 && Ncnt14^0==Ncnt14^post_17 && Negcnt^0==Negcnt^post_17 && Negtotal^0==Negtotal^post_17 && Ntotal12^0==Ntotal12^post_17 && Outer9^0==Outer9^post_17 && OuterIndex6^0==OuterIndex6^post_17 && Pcnt13^0==Pcnt13^post_17 && Poscnt^0==Poscnt^post_17 && Postotal^0==Postotal^post_17 && Ptotal11^0==Ptotal11^post_17 && Seed^0==Seed^post_17 && StartTime2^0==StartTime2^post_17 && StopTime3^0==StopTime3^post_17 && TotalTime4^0==TotalTime4^post_17 && ret_RandomInteger15^0==ret_RandomInteger15^post_17 ], cost: 1

Simplified all rules, resulting in:
   Start location: l12
      0: l0 -> l1 : [], cost: 1
     13: l1 -> l8 : Ncnt14^0'=0, Ntotal12^0'=0, Outer9^0'=0, Pcnt13^0'=0, Ptotal11^0'=0, StartTime2^0'=1000, [ 10<=OuterIndex6^0 ], cost: 1
     14: l1 -> l4 : InnerIndex7^0'=0, [ 1+OuterIndex6^0<=10 ], cost: 1
      1: l2 -> l3 : Inner10^0'=1+Inner10^0, [], cost: 1
     10: l3 -> l7 : [], cost: 1
      2: l4 -> l5 : [], cost: 1
     11: l5 -> l0 : OuterIndex6^0'=1+OuterIndex6^0, [ 10<=InnerIndex7^0 ], cost: 1
     12: l5 -> l4 : InnerIndex7^0'=1+InnerIndex7^0, Seed^0'=Seed^post_13, ret_RandomInteger15^0'=Seed^post_13, [ 1+InnerIndex7^0<=10 ], cost: 1
      3: l6 -> l2 : Pcnt13^0'=1+Pcnt13^0, Ptotal11^0'=Ptotal11^post_4, [], cost: 1
      4: l6 -> l2 : Ncnt14^0'=1+Ncnt14^0, Ntotal12^0'=Ntotal12^post_5, [], cost: 1
      5: l7 -> l8 : Outer9^0'=1+Outer9^0, [ 10<=Inner10^0 ], cost: 1
      6: l7 -> l6 : [ 1+Inner10^0<=10 ], cost: 1
      9: l8 -> l9 : [], cost: 1
      8: l9 -> l3 : Inner10^0'=0, [ 1+Outer9^0<=10 ], cost: 1
     15: l11 -> l0 : OuterIndex6^0'=0, Seed^0'=0, [], cost: 1
     16: l12 -> l11 : [], cost: 1

### Simplification by acceleration and chaining ###

Eliminated locations (on linear paths):
   Start location: l12
      0: l0 -> l1 : [], cost: 1
     13: l1 -> l8 : Ncnt14^0'=0, Ntotal12^0'=0, Outer9^0'=0, Pcnt13^0'=0, Ptotal11^0'=0, StartTime2^0'=1000, [ 10<=OuterIndex6^0 ], cost: 1
     14: l1 -> l4 : InnerIndex7^0'=0, [ 1+OuterIndex6^0<=10 ], cost: 1
      1: l2 -> l3 : Inner10^0'=1+Inner10^0, [], cost: 1
     10: l3 -> l7 : [], cost: 1
      2: l4 -> l5 : [], cost: 1
     11: l5 -> l0 : OuterIndex6^0'=1+OuterIndex6^0, [ 10<=InnerIndex7^0 ], cost: 1
     12: l5 -> l4 : InnerIndex7^0'=1+InnerIndex7^0, Seed^0'=Seed^post_13, ret_RandomInteger15^0'=Seed^post_13, [ 1+InnerIndex7^0<=10 ], cost: 1
      3: l6 -> l2 : Pcnt13^0'=1+Pcnt13^0, Ptotal11^0'=Ptotal11^post_4, [], cost: 1
      4: l6 -> l2 : Ncnt14^0'=1+Ncnt14^0, Ntotal12^0'=Ntotal12^post_5, [], cost: 1
      5: l7 -> l8 : Outer9^0'=1+Outer9^0, [ 10<=Inner10^0 ], cost: 1
      6: l7 -> l6 : [ 1+Inner10^0<=10 ], cost: 1
     18: l8 -> l3 : Inner10^0'=0, [ 1+Outer9^0<=10 ], cost: 2
     17: l12 -> l0 : OuterIndex6^0'=0, Seed^0'=0, [], cost: 2

Eliminated locations (on tree-shaped paths):
   Start location: l12
     19: l0 -> l8 : Ncnt14^0'=0, Ntotal12^0'=0, Outer9^0'=0, Pcnt13^0'=0, Ptotal11^0'=0, StartTime2^0'=1000, [ 10<=OuterIndex6^0 ], cost: 2
     20: l0 -> l4 : InnerIndex7^0'=0, [ 1+OuterIndex6^0<=10 ], cost: 2
     23: l3 -> l8 : Outer9^0'=1+Outer9^0, [ 10<=Inner10^0 ], cost: 2
     24: l3 -> l6 : [ 1+Inner10^0<=10 ], cost: 2
     21: l4 -> l0 : OuterIndex6^0'=1+OuterIndex6^0, [ 10<=InnerIndex7^0 ], cost: 2
     22: l4 -> l4 : InnerIndex7^0'=1+InnerIndex7^0, Seed^0'=Seed^post_13, ret_RandomInteger15^0'=Seed^post_13, [ 1+InnerIndex7^0<=10 ], cost: 2
     25: l6 -> l3 : Inner10^0'=1+Inner10^0, Pcnt13^0'=1+Pcnt13^0, Ptotal11^0'=Ptotal11^post_4, [], cost: 2
     26: l6 -> l3 : Inner10^0'=1+Inner10^0, Ncnt14^0'=1+Ncnt14^0, Ntotal12^0'=Ntotal12^post_5, [], cost: 2
     18: l8 -> l3 : Inner10^0'=0, [ 1+Outer9^0<=10 ], cost: 2
     17: l12 -> l0 : OuterIndex6^0'=0, Seed^0'=0, [], cost: 2

Accelerating simple loops of location 4.
   Accelerating the following rules:
     22: l4 -> l4 : InnerIndex7^0'=1+InnerIndex7^0, Seed^0'=Seed^post_13, ret_RandomInteger15^0'=Seed^post_13, [ 1+InnerIndex7^0<=10 ], cost: 2

   Accelerated rule 22 with backward acceleration, yielding the new rule 27.
[accelerate] Nesting with 1 inner and 1 outer candidates
   Removing the simple loops: 22.

Accelerated all simple loops using metering functions (where possible):
   Start location: l12
     19: l0 -> l8 : Ncnt14^0'=0, Ntotal12^0'=0, Outer9^0'=0, Pcnt13^0'=0, Ptotal11^0'=0, StartTime2^0'=1000, [ 10<=OuterIndex6^0 ], cost: 2
     20: l0 -> l4 : InnerIndex7^0'=0, [ 1+OuterIndex6^0<=10 ], cost: 2
     23: l3 -> l8 : Outer9^0'=1+Outer9^0, [ 10<=Inner10^0 ], cost: 2
     24: l3 -> l6 : [ 1+Inner10^0<=10 ], cost: 2
     21: l4 -> l0 : OuterIndex6^0'=1+OuterIndex6^0, [ 10<=InnerIndex7^0 ], cost: 2
     27: l4 -> l4 : InnerIndex7^0'=10, Seed^0'=Seed^post_13, ret_RandomInteger15^0'=Seed^post_13, [ 10-InnerIndex7^0>=1 ], cost: 20-2*InnerIndex7^0
     25: l6 -> l3 : Inner10^0'=1+Inner10^0, Pcnt13^0'=1+Pcnt13^0, Ptotal11^0'=Ptotal11^post_4, [], cost: 2
     26: l6 -> l3 : Inner10^0'=1+Inner10^0, Ncnt14^0'=1+Ncnt14^0, Ntotal12^0'=Ntotal12^post_5, [], cost: 2
     18: l8 -> l3 : Inner10^0'=0, [ 1+Outer9^0<=10 ], cost: 2
     17: l12 -> l0 : OuterIndex6^0'=0, Seed^0'=0, [], cost: 2

Chained accelerated rules (with incoming rules):
   Start location: l12
     19: l0 -> l8 : Ncnt14^0'=0, Ntotal12^0'=0, Outer9^0'=0, Pcnt13^0'=0, Ptotal11^0'=0, StartTime2^0'=1000, [ 10<=OuterIndex6^0 ], cost: 2
     20: l0 -> l4 : InnerIndex7^0'=0, [ 1+OuterIndex6^0<=10 ], cost: 2
     28: l0 -> l4 : InnerIndex7^0'=10, Seed^0'=Seed^post_13, ret_RandomInteger15^0'=Seed^post_13, [ 1+OuterIndex6^0<=10 ], cost: 22
     23: l3 -> l8 : Outer9^0'=1+Outer9^0, [ 10<=Inner10^0 ], cost: 2
     24: l3 -> l6 : [ 1+Inner10^0<=10 ], cost: 2
     21: l4 -> l0 : OuterIndex6^0'=1+OuterIndex6^0, [ 10<=InnerIndex7^0 ], cost: 2
     25: l6 -> l3 : Inner10^0'=1+Inner10^0, Pcnt13^0'=1+Pcnt13^0, Ptotal11^0'=Ptotal11^post_4, [], cost: 2
     26: l6 -> l3 : Inner10^0'=1+Inner10^0, Ncnt14^0'=1+Ncnt14^0, Ntotal12^0'=Ntotal12^post_5, [], cost: 2
     18: l8 -> l3 : Inner10^0'=0, [ 1+Outer9^0<=10 ], cost: 2
     17: l12 -> l0 : OuterIndex6^0'=0, Seed^0'=0, [], cost: 2

Eliminated locations (on tree-shaped paths):
   Start location: l12
     19: l0 -> l8 : Ncnt14^0'=0, Ntotal12^0'=0, Outer9^0'=0, Pcnt13^0'=0, Ptotal11^0'=0, StartTime2^0'=1000, [ 10<=OuterIndex6^0 ], cost: 2
     29: l0 -> l0 : InnerIndex7^0'=10, OuterIndex6^0'=1+OuterIndex6^0, Seed^0'=Seed^post_13, ret_RandomInteger15^0'=Seed^post_13, [ 1+OuterIndex6^0<=10 ], cost: 24
     23: l3 -> l8 : Outer9^0'=1+Outer9^0, [ 10<=Inner10^0 ], cost: 2
     30: l3 -> l3 : Inner10^0'=1+Inner10^0, Pcnt13^0'=1+Pcnt13^0, Ptotal11^0'=Ptotal11^post_4, [ 1+Inner10^0<=10 ], cost: 4
     31: l3 -> l3 : Inner10^0'=1+Inner10^0, Ncnt14^0'=1+Ncnt14^0, Ntotal12^0'=Ntotal12^post_5, [ 1+Inner10^0<=10 ], cost: 4
     18: l8 -> l3 : Inner10^0'=0, [ 1+Outer9^0<=10 ], cost: 2
     17: l12 -> l0 : OuterIndex6^0'=0, Seed^0'=0, [], cost: 2

Accelerating simple loops of location 0.
   Accelerating the following rules:
     29: l0 -> l0 : InnerIndex7^0'=10, OuterIndex6^0'=1+OuterIndex6^0, Seed^0'=Seed^post_13, ret_RandomInteger15^0'=Seed^post_13, [ 1+OuterIndex6^0<=10 ], cost: 24

   Accelerated rule 29 with backward acceleration, yielding the new rule 32.
[accelerate] Nesting with 1 inner and 1 outer candidates
   Removing the simple loops: 29.

Accelerating simple loops of location 3.
   Accelerating the following rules:
     30: l3 -> l3 : Inner10^0'=1+Inner10^0, Pcnt13^0'=1+Pcnt13^0, Ptotal11^0'=Ptotal11^post_4, [ 1+Inner10^0<=10 ], cost: 4
     31: l3 -> l3 : Inner10^0'=1+Inner10^0, Ncnt14^0'=1+Ncnt14^0, Ntotal12^0'=Ntotal12^post_5, [ 1+Inner10^0<=10 ], cost: 4

   Accelerated rule 30 with backward acceleration, yielding the new rule 33.
   Accelerated rule 31 with backward acceleration, yielding the new rule 34.
[accelerate] Nesting with 2 inner and 2 outer candidates
   Removing the simple loops: 30 31.

Accelerated all simple loops using metering functions (where possible):
   Start location: l12
     19: l0 -> l8 : Ncnt14^0'=0, Ntotal12^0'=0, Outer9^0'=0, Pcnt13^0'=0, Ptotal11^0'=0, StartTime2^0'=1000, [ 10<=OuterIndex6^0 ], cost: 2
     32: l0 -> l0 : InnerIndex7^0'=10, OuterIndex6^0'=10, Seed^0'=Seed^post_13, ret_RandomInteger15^0'=Seed^post_13, [ 10-OuterIndex6^0>=1 ], cost: 240-24*OuterIndex6^0
     23: l3 -> l8 : Outer9^0'=1+Outer9^0, [ 10<=Inner10^0 ], cost: 2
     33: l3 -> l3 : Inner10^0'=10, Pcnt13^0'=10+Pcnt13^0-Inner10^0, Ptotal11^0'=Ptotal11^post_4, [ 10-Inner10^0>=1 ], cost: 40-4*Inner10^0
     34: l3 -> l3 : Inner10^0'=10, Ncnt14^0'=10+Ncnt14^0-Inner10^0, Ntotal12^0'=Ntotal12^post_5, [ 10-Inner10^0>=1 ], cost: 40-4*Inner10^0
     18: l8 -> l3 : Inner10^0'=0, [ 1+Outer9^0<=10 ], cost: 2
     17: l12 -> l0 : OuterIndex6^0'=0, Seed^0'=0, [], cost: 2

Chained accelerated rules (with incoming rules):
   Start location: l12
     19: l0 -> l8 : Ncnt14^0'=0, Ntotal12^0'=0, Outer9^0'=0, Pcnt13^0'=0, Ptotal11^0'=0, StartTime2^0'=1000, [ 10<=OuterIndex6^0 ], cost: 2
     23: l3 -> l8 : Outer9^0'=1+Outer9^0, [ 10<=Inner10^0 ], cost: 2
     18: l8 -> l3 : Inner10^0'=0, [ 1+Outer9^0<=10 ], cost: 2
     36: l8 -> l3 : Inner10^0'=10, Pcnt13^0'=10+Pcnt13^0, Ptotal11^0'=Ptotal11^post_4, [ 1+Outer9^0<=10 ], cost: 42
     37: l8 -> l3 : Inner10^0'=10, Ncnt14^0'=10+Ncnt14^0, Ntotal12^0'=Ntotal12^post_5, [ 1+Outer9^0<=10 ], cost: 42
     17: l12 -> l0 : OuterIndex6^0'=0, Seed^0'=0, [], cost: 2
     35: l12 -> l0 : InnerIndex7^0'=10, OuterIndex6^0'=10, Seed^0'=Seed^post_13, ret_RandomInteger15^0'=Seed^post_13, [], cost: 242

Eliminated locations (on tree-shaped paths):
   Start location: l12
     39: l8 -> l8 : Inner10^0'=10, Outer9^0'=1+Outer9^0, Pcnt13^0'=10+Pcnt13^0, Ptotal11^0'=Ptotal11^post_4, [ 1+Outer9^0<=10 ], cost: 44
     40: l8 -> l8 : Inner10^0'=10, Ncnt14^0'=10+Ncnt14^0, Ntotal12^0'=Ntotal12^post_5, Outer9^0'=1+Outer9^0, [ 1+Outer9^0<=10 ], cost: 44
     38: l12 -> l8 : InnerIndex7^0'=10, Ncnt14^0'=0, Ntotal12^0'=0, Outer9^0'=0, OuterIndex6^0'=10, Pcnt13^0'=0, Ptotal11^0'=0, Seed^0'=Seed^post_13, StartTime2^0'=1000, ret_RandomInteger15^0'=Seed^post_13, [], cost: 244

Accelerating simple loops of location 8.
   Accelerating the following rules:
     39: l8 -> l8 : Inner10^0'=10, Outer9^0'=1+Outer9^0, Pcnt13^0'=10+Pcnt13^0, Ptotal11^0'=Ptotal11^post_4, [ 1+Outer9^0<=10 ], cost: 44
     40: l8 -> l8 : Inner10^0'=10, Ncnt14^0'=10+Ncnt14^0, Ntotal12^0'=Ntotal12^post_5, Outer9^0'=1+Outer9^0, [ 1+Outer9^0<=10 ], cost: 44

   Accelerated rule 39 with backward acceleration, yielding the new rule 41.
   Accelerated rule 40 with backward acceleration, yielding the new rule 42.
[accelerate] Nesting with 2 inner and 2 outer candidates
   Removing the simple loops: 39 40.

Accelerated all simple loops using metering functions (where possible):
   Start location: l12
     41: l8 -> l8 : Inner10^0'=10, Outer9^0'=10, Pcnt13^0'=100+Pcnt13^0-10*Outer9^0, Ptotal11^0'=Ptotal11^post_4, [ 10-Outer9^0>=1 ], cost: 440-44*Outer9^0
     42: l8 -> l8 : Inner10^0'=10, Ncnt14^0'=100+Ncnt14^0-10*Outer9^0, Ntotal12^0'=Ntotal12^post_5, Outer9^0'=10, [ 10-Outer9^0>=1 ], cost: 440-44*Outer9^0
     38: l12 -> l8 : InnerIndex7^0'=10, Ncnt14^0'=0, Ntotal12^0'=0, Outer9^0'=0, OuterIndex6^0'=10, Pcnt13^0'=0, Ptotal11^0'=0, Seed^0'=Seed^post_13, StartTime2^0'=1000, ret_RandomInteger15^0'=Seed^post_13, [], cost: 244

Chained accelerated rules (with incoming rules):
   Start location: l12
     38: l12 -> l8 : InnerIndex7^0'=10, Ncnt14^0'=0, Ntotal12^0'=0, Outer9^0'=0, OuterIndex6^0'=10, Pcnt13^0'=0, Ptotal11^0'=0, Seed^0'=Seed^post_13, StartTime2^0'=1000, ret_RandomInteger15^0'=Seed^post_13, [], cost: 244
     43: l12 -> l8 : Inner10^0'=10, InnerIndex7^0'=10, Ncnt14^0'=0, Ntotal12^0'=0, Outer9^0'=10, OuterIndex6^0'=10, Pcnt13^0'=100, Ptotal11^0'=Ptotal11^post_4, Seed^0'=Seed^post_13, StartTime2^0'=1000, ret_RandomInteger15^0'=Seed^post_13, [], cost: 684
     44: l12 -> l8 : Inner10^0'=10, InnerIndex7^0'=10, Ncnt14^0'=100, Ntotal12^0'=Ntotal12^post_5, Outer9^0'=10, OuterIndex6^0'=10, Pcnt13^0'=0, Ptotal11^0'=0, Seed^0'=Seed^post_13, StartTime2^0'=1000, ret_RandomInteger15^0'=Seed^post_13, [], cost: 684

Removed unreachable locations (and leaf rules with constant cost):
   Start location: l12
     <empty>

### Computing asymptotic complexity ###

Fully simplified ITS problem
   Start location: l12
     <empty>

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:  [ Inner10^0==Inner10^post_17 && InnerIndex7^0==InnerIndex7^post_17 && Ncnt14^0==Ncnt14^post_17 && Negcnt^0==Negcnt^post_17 && Negtotal^0==Negtotal^post_17 && Ntotal12^0==Ntotal12^post_17 && Outer9^0==Outer9^post_17 && OuterIndex6^0==OuterIndex6^post_17 && Pcnt13^0==Pcnt13^post_17 && Poscnt^0==Poscnt^post_17 && Postotal^0==Postotal^post_17 && Ptotal11^0==Ptotal11^post_17 && Seed^0==Seed^post_17 && StartTime2^0==StartTime2^post_17 && StopTime3^0==StopTime3^post_17 && TotalTime4^0==TotalTime4^post_17 && ret_RandomInteger15^0==ret_RandomInteger15^post_17 ]

WORST_CASE(Omega(1),?)