YES(?,POLY) * Step 1: ArgumentFilter WORST_CASE(?,POLY) + Considered Problem: Rules: 0. eval_ax_start(v__0,v__01,v_3,v_i,v_j,v_n) -> eval_ax_bb0_in(v__0,v__01,v_3,v_i,v_j,v_n) True (1,1) 1. eval_ax_bb0_in(v__0,v__01,v_3,v_i,v_j,v_n) -> eval_ax_0(v__0,v__01,v_3,v_i,v_j,v_n) True (?,1) 2. eval_ax_0(v__0,v__01,v_3,v_i,v_j,v_n) -> eval_ax_1(v__0,v__01,v_3,v_i,v_j,v_n) True (?,1) 3. eval_ax_1(v__0,v__01,v_3,v_i,v_j,v_n) -> eval_ax_2(v__0,v__01,v_3,v_i,v_j,v_n) True (?,1) 4. eval_ax_2(v__0,v__01,v_3,v_i,v_j,v_n) -> eval_ax_3(v__0,v__01,v_3,v_i,v_j,v_n) True (?,1) 5. eval_ax_3(v__0,v__01,v_3,v_i,v_j,v_n) -> eval_ax_4(v__0,v__01,v_3,v_i,v_j,v_n) True (?,1) 6. eval_ax_4(v__0,v__01,v_3,v_i,v_j,v_n) -> eval_ax_5(v__0,v__01,v_3,v_i,v_j,v_n) True (?,1) 7. eval_ax_5(v__0,v__01,v_3,v_i,v_j,v_n) -> eval_ax_6(v__0,v__01,v_3,v_i,v_j,v_n) True (?,1) 8. eval_ax_6(v__0,v__01,v_3,v_i,v_j,v_n) -> eval_ax_bb1_in(0,v__01,v_3,v_i,v_j,v_n) True (?,1) 9. eval_ax_bb1_in(v__0,v__01,v_3,v_i,v_j,v_n) -> eval_ax_bb2_in(v__0,0,v_3,v_i,v_j,v_n) [v__0 >= 0] (?,1) 10. eval_ax_bb2_in(v__0,v__01,v_3,v_i,v_j,v_n) -> eval_ax_bb3_in(v__0,v__01,v_3,v_i,v_j,v_n) [v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0 && -2 + v_n >= v__01] (?,1) 11. eval_ax_bb2_in(v__0,v__01,v_3,v_i,v_j,v_n) -> eval_ax_bb4_in(v__0,v__01,v_3,v_i,v_j,v_n) [v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0 && v__01 >= -1 + v_n] (?,1) 12. eval_ax_bb3_in(v__0,v__01,v_3,v_i,v_j,v_n) -> eval_ax_bb2_in(v__0,1 + v__01,v_3,v_i,v_j,v_n) [-2 + v_n >= 0 (?,1) && -2 + v__01 + v_n >= 0 && -2 + -1*v__01 + v_n >= 0 && -2 + v__0 + v_n >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] 13. eval_ax_bb4_in(v__0,v__01,v_3,v_i,v_j,v_n) -> eval_ax_12(v__0,v__01,1 + v__0,v_i,v_j,v_n) [1 + v__01 + -1*v_n >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] (?,1) 14. eval_ax_12(v__0,v__01,v_3,v_i,v_j,v_n) -> eval_ax_13(v__0,v__01,v_3,v_i,v_j,v_n) [1 + v__01 + -1*v_n >= 0 (?,1) && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] 15. eval_ax_13(v__0,v__01,v_3,v_i,v_j,v_n) -> eval_ax_bb1_in(v_3,v__01,v_3,v_i,v_j,v_n) [1 + v__01 + -1*v_n >= 0 (?,1) && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0 && v__01 >= -1 + v_n && -2 + v_n >= v_3] 16. eval_ax_13(v__0,v__01,v_3,v_i,v_j,v_n) -> eval_ax_bb5_in(v__0,v__01,v_3,v_i,v_j,v_n) [1 + v__01 + -1*v_n >= 0 (?,1) && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0 && v_3 >= -1 + v_n] 17. eval_ax_bb5_in(v__0,v__01,v_3,v_i,v_j,v_n) -> eval_ax_stop(v__0,v__01,v_3,v_i,v_j,v_n) [1 + v_3 + -1*v_n >= 0 (?,1) && 1 + v__01 + -1*v_n >= 0 && 2 + v__0 + -1*v_n >= 0 && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] Signature: {(eval_ax_0,6) ;(eval_ax_1,6) ;(eval_ax_12,6) ;(eval_ax_13,6) ;(eval_ax_2,6) ;(eval_ax_3,6) ;(eval_ax_4,6) ;(eval_ax_5,6) ;(eval_ax_6,6) ;(eval_ax_bb0_in,6) ;(eval_ax_bb1_in,6) ;(eval_ax_bb2_in,6) ;(eval_ax_bb3_in,6) ;(eval_ax_bb4_in,6) ;(eval_ax_bb5_in,6) ;(eval_ax_start,6) ;(eval_ax_stop,6)} Flow Graph: [0->{1},1->{2},2->{3},3->{4},4->{5},5->{6},6->{7},7->{8},8->{9},9->{10,11},10->{12},11->{13},12->{10,11} ,13->{14},14->{15,16},15->{9},16->{17},17->{}] + Applied Processor: ArgumentFilter [3,4] + Details: We remove following argument positions: [3,4]. * Step 2: FromIts WORST_CASE(?,POLY) + Considered Problem: Rules: 0. eval_ax_start(v__0,v__01,v_3,v_n) -> eval_ax_bb0_in(v__0,v__01,v_3,v_n) True (1,1) 1. eval_ax_bb0_in(v__0,v__01,v_3,v_n) -> eval_ax_0(v__0,v__01,v_3,v_n) True (?,1) 2. eval_ax_0(v__0,v__01,v_3,v_n) -> eval_ax_1(v__0,v__01,v_3,v_n) True (?,1) 3. eval_ax_1(v__0,v__01,v_3,v_n) -> eval_ax_2(v__0,v__01,v_3,v_n) True (?,1) 4. eval_ax_2(v__0,v__01,v_3,v_n) -> eval_ax_3(v__0,v__01,v_3,v_n) True (?,1) 5. eval_ax_3(v__0,v__01,v_3,v_n) -> eval_ax_4(v__0,v__01,v_3,v_n) True (?,1) 6. eval_ax_4(v__0,v__01,v_3,v_n) -> eval_ax_5(v__0,v__01,v_3,v_n) True (?,1) 7. eval_ax_5(v__0,v__01,v_3,v_n) -> eval_ax_6(v__0,v__01,v_3,v_n) True (?,1) 8. eval_ax_6(v__0,v__01,v_3,v_n) -> eval_ax_bb1_in(0,v__01,v_3,v_n) True (?,1) 9. eval_ax_bb1_in(v__0,v__01,v_3,v_n) -> eval_ax_bb2_in(v__0,0,v_3,v_n) [v__0 >= 0] (?,1) 10. eval_ax_bb2_in(v__0,v__01,v_3,v_n) -> eval_ax_bb3_in(v__0,v__01,v_3,v_n) [v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0 && -2 + v_n >= v__01] (?,1) 11. eval_ax_bb2_in(v__0,v__01,v_3,v_n) -> eval_ax_bb4_in(v__0,v__01,v_3,v_n) [v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0 && v__01 >= -1 + v_n] (?,1) 12. eval_ax_bb3_in(v__0,v__01,v_3,v_n) -> eval_ax_bb2_in(v__0,1 + v__01,v_3,v_n) [-2 + v_n >= 0 (?,1) && -2 + v__01 + v_n >= 0 && -2 + -1*v__01 + v_n >= 0 && -2 + v__0 + v_n >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] 13. eval_ax_bb4_in(v__0,v__01,v_3,v_n) -> eval_ax_12(v__0,v__01,1 + v__0,v_n) [1 + v__01 + -1*v_n >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] (?,1) 14. eval_ax_12(v__0,v__01,v_3,v_n) -> eval_ax_13(v__0,v__01,v_3,v_n) [1 + v__01 + -1*v_n >= 0 (?,1) && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] 15. eval_ax_13(v__0,v__01,v_3,v_n) -> eval_ax_bb1_in(v_3,v__01,v_3,v_n) [1 + v__01 + -1*v_n >= 0 (?,1) && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0 && v__01 >= -1 + v_n && -2 + v_n >= v_3] 16. eval_ax_13(v__0,v__01,v_3,v_n) -> eval_ax_bb5_in(v__0,v__01,v_3,v_n) [1 + v__01 + -1*v_n >= 0 (?,1) && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0 && v_3 >= -1 + v_n] 17. eval_ax_bb5_in(v__0,v__01,v_3,v_n) -> eval_ax_stop(v__0,v__01,v_3,v_n) [1 + v_3 + -1*v_n >= 0 (?,1) && 1 + v__01 + -1*v_n >= 0 && 2 + v__0 + -1*v_n >= 0 && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] Signature: {(eval_ax_0,6) ;(eval_ax_1,6) ;(eval_ax_12,6) ;(eval_ax_13,6) ;(eval_ax_2,6) ;(eval_ax_3,6) ;(eval_ax_4,6) ;(eval_ax_5,6) ;(eval_ax_6,6) ;(eval_ax_bb0_in,6) ;(eval_ax_bb1_in,6) ;(eval_ax_bb2_in,6) ;(eval_ax_bb3_in,6) ;(eval_ax_bb4_in,6) ;(eval_ax_bb5_in,6) ;(eval_ax_start,6) ;(eval_ax_stop,6)} Flow Graph: [0->{1},1->{2},2->{3},3->{4},4->{5},5->{6},6->{7},7->{8},8->{9},9->{10,11},10->{12},11->{13},12->{10,11} ,13->{14},14->{15,16},15->{9},16->{17},17->{}] + Applied Processor: FromIts + Details: () * Step 3: AddSinks WORST_CASE(?,POLY) + Considered Problem: Rules: eval_ax_start(v__0,v__01,v_3,v_n) -> eval_ax_bb0_in(v__0,v__01,v_3,v_n) True eval_ax_bb0_in(v__0,v__01,v_3,v_n) -> eval_ax_0(v__0,v__01,v_3,v_n) True eval_ax_0(v__0,v__01,v_3,v_n) -> eval_ax_1(v__0,v__01,v_3,v_n) True eval_ax_1(v__0,v__01,v_3,v_n) -> eval_ax_2(v__0,v__01,v_3,v_n) True eval_ax_2(v__0,v__01,v_3,v_n) -> eval_ax_3(v__0,v__01,v_3,v_n) True eval_ax_3(v__0,v__01,v_3,v_n) -> eval_ax_4(v__0,v__01,v_3,v_n) True eval_ax_4(v__0,v__01,v_3,v_n) -> eval_ax_5(v__0,v__01,v_3,v_n) True eval_ax_5(v__0,v__01,v_3,v_n) -> eval_ax_6(v__0,v__01,v_3,v_n) True eval_ax_6(v__0,v__01,v_3,v_n) -> eval_ax_bb1_in(0,v__01,v_3,v_n) True eval_ax_bb1_in(v__0,v__01,v_3,v_n) -> eval_ax_bb2_in(v__0,0,v_3,v_n) [v__0 >= 0] eval_ax_bb2_in(v__0,v__01,v_3,v_n) -> eval_ax_bb3_in(v__0,v__01,v_3,v_n) [v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0 && -2 + v_n >= v__01] eval_ax_bb2_in(v__0,v__01,v_3,v_n) -> eval_ax_bb4_in(v__0,v__01,v_3,v_n) [v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0 && v__01 >= -1 + v_n] eval_ax_bb3_in(v__0,v__01,v_3,v_n) -> eval_ax_bb2_in(v__0,1 + v__01,v_3,v_n) [-2 + v_n >= 0 && -2 + v__01 + v_n >= 0 && -2 + -1*v__01 + v_n >= 0 && -2 + v__0 + v_n >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] eval_ax_bb4_in(v__0,v__01,v_3,v_n) -> eval_ax_12(v__0,v__01,1 + v__0,v_n) [1 + v__01 + -1*v_n >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] eval_ax_12(v__0,v__01,v_3,v_n) -> eval_ax_13(v__0,v__01,v_3,v_n) [1 + v__01 + -1*v_n >= 0 && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] eval_ax_13(v__0,v__01,v_3,v_n) -> eval_ax_bb1_in(v_3,v__01,v_3,v_n) [1 + v__01 + -1*v_n >= 0 && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0 && v__01 >= -1 + v_n && -2 + v_n >= v_3] eval_ax_13(v__0,v__01,v_3,v_n) -> eval_ax_bb5_in(v__0,v__01,v_3,v_n) [1 + v__01 + -1*v_n >= 0 && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0 && v_3 >= -1 + v_n] eval_ax_bb5_in(v__0,v__01,v_3,v_n) -> eval_ax_stop(v__0,v__01,v_3,v_n) [1 + v_3 + -1*v_n >= 0 && 1 + v__01 + -1*v_n >= 0 && 2 + v__0 + -1*v_n >= 0 && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] Signature: {(eval_ax_0,6) ;(eval_ax_1,6) ;(eval_ax_12,6) ;(eval_ax_13,6) ;(eval_ax_2,6) ;(eval_ax_3,6) ;(eval_ax_4,6) ;(eval_ax_5,6) ;(eval_ax_6,6) ;(eval_ax_bb0_in,6) ;(eval_ax_bb1_in,6) ;(eval_ax_bb2_in,6) ;(eval_ax_bb3_in,6) ;(eval_ax_bb4_in,6) ;(eval_ax_bb5_in,6) ;(eval_ax_start,6) ;(eval_ax_stop,6)} Rule Graph: [0->{1},1->{2},2->{3},3->{4},4->{5},5->{6},6->{7},7->{8},8->{9},9->{10,11},10->{12},11->{13},12->{10,11} ,13->{14},14->{15,16},15->{9},16->{17},17->{}] + Applied Processor: AddSinks + Details: () * Step 4: Unfold WORST_CASE(?,POLY) + Considered Problem: Rules: eval_ax_start(v__0,v__01,v_3,v_n) -> eval_ax_bb0_in(v__0,v__01,v_3,v_n) True eval_ax_bb0_in(v__0,v__01,v_3,v_n) -> eval_ax_0(v__0,v__01,v_3,v_n) True eval_ax_0(v__0,v__01,v_3,v_n) -> eval_ax_1(v__0,v__01,v_3,v_n) True eval_ax_1(v__0,v__01,v_3,v_n) -> eval_ax_2(v__0,v__01,v_3,v_n) True eval_ax_2(v__0,v__01,v_3,v_n) -> eval_ax_3(v__0,v__01,v_3,v_n) True eval_ax_3(v__0,v__01,v_3,v_n) -> eval_ax_4(v__0,v__01,v_3,v_n) True eval_ax_4(v__0,v__01,v_3,v_n) -> eval_ax_5(v__0,v__01,v_3,v_n) True eval_ax_5(v__0,v__01,v_3,v_n) -> eval_ax_6(v__0,v__01,v_3,v_n) True eval_ax_6(v__0,v__01,v_3,v_n) -> eval_ax_bb1_in(0,v__01,v_3,v_n) True eval_ax_bb1_in(v__0,v__01,v_3,v_n) -> eval_ax_bb2_in(v__0,0,v_3,v_n) [v__0 >= 0] eval_ax_bb2_in(v__0,v__01,v_3,v_n) -> eval_ax_bb3_in(v__0,v__01,v_3,v_n) [v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0 && -2 + v_n >= v__01] eval_ax_bb2_in(v__0,v__01,v_3,v_n) -> eval_ax_bb4_in(v__0,v__01,v_3,v_n) [v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0 && v__01 >= -1 + v_n] eval_ax_bb3_in(v__0,v__01,v_3,v_n) -> eval_ax_bb2_in(v__0,1 + v__01,v_3,v_n) [-2 + v_n >= 0 && -2 + v__01 + v_n >= 0 && -2 + -1*v__01 + v_n >= 0 && -2 + v__0 + v_n >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] eval_ax_bb4_in(v__0,v__01,v_3,v_n) -> eval_ax_12(v__0,v__01,1 + v__0,v_n) [1 + v__01 + -1*v_n >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] eval_ax_12(v__0,v__01,v_3,v_n) -> eval_ax_13(v__0,v__01,v_3,v_n) [1 + v__01 + -1*v_n >= 0 && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] eval_ax_13(v__0,v__01,v_3,v_n) -> eval_ax_bb1_in(v_3,v__01,v_3,v_n) [1 + v__01 + -1*v_n >= 0 && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0 && v__01 >= -1 + v_n && -2 + v_n >= v_3] eval_ax_13(v__0,v__01,v_3,v_n) -> eval_ax_bb5_in(v__0,v__01,v_3,v_n) [1 + v__01 + -1*v_n >= 0 && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0 && v_3 >= -1 + v_n] eval_ax_bb5_in(v__0,v__01,v_3,v_n) -> eval_ax_stop(v__0,v__01,v_3,v_n) [1 + v_3 + -1*v_n >= 0 && 1 + v__01 + -1*v_n >= 0 && 2 + v__0 + -1*v_n >= 0 && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] eval_ax_stop(v__0,v__01,v_3,v_n) -> exitus616(v__0,v__01,v_3,v_n) True Signature: {(eval_ax_0,6) ;(eval_ax_1,6) ;(eval_ax_12,6) ;(eval_ax_13,6) ;(eval_ax_2,6) ;(eval_ax_3,6) ;(eval_ax_4,6) ;(eval_ax_5,6) ;(eval_ax_6,6) ;(eval_ax_bb0_in,6) ;(eval_ax_bb1_in,6) ;(eval_ax_bb2_in,6) ;(eval_ax_bb3_in,6) ;(eval_ax_bb4_in,6) ;(eval_ax_bb5_in,6) ;(eval_ax_start,6) ;(eval_ax_stop,6) ;(exitus616,4)} Rule Graph: [0->{1},1->{2},2->{3},3->{4},4->{5},5->{6},6->{7},7->{8},8->{9},9->{10,11},10->{12},11->{13},12->{10,11} ,13->{14},14->{15,16},15->{9},16->{17},17->{18}] + Applied Processor: Unfold + Details: () * Step 5: Decompose WORST_CASE(?,POLY) + Considered Problem: Rules: eval_ax_start.0(v__0,v__01,v_3,v_n) -> eval_ax_bb0_in.1(v__0,v__01,v_3,v_n) True eval_ax_bb0_in.1(v__0,v__01,v_3,v_n) -> eval_ax_0.2(v__0,v__01,v_3,v_n) True eval_ax_0.2(v__0,v__01,v_3,v_n) -> eval_ax_1.3(v__0,v__01,v_3,v_n) True eval_ax_1.3(v__0,v__01,v_3,v_n) -> eval_ax_2.4(v__0,v__01,v_3,v_n) True eval_ax_2.4(v__0,v__01,v_3,v_n) -> eval_ax_3.5(v__0,v__01,v_3,v_n) True eval_ax_3.5(v__0,v__01,v_3,v_n) -> eval_ax_4.6(v__0,v__01,v_3,v_n) True eval_ax_4.6(v__0,v__01,v_3,v_n) -> eval_ax_5.7(v__0,v__01,v_3,v_n) True eval_ax_5.7(v__0,v__01,v_3,v_n) -> eval_ax_6.8(v__0,v__01,v_3,v_n) True eval_ax_6.8(v__0,v__01,v_3,v_n) -> eval_ax_bb1_in.9(0,v__01,v_3,v_n) True eval_ax_bb1_in.9(v__0,v__01,v_3,v_n) -> eval_ax_bb2_in.10(v__0,0,v_3,v_n) [v__0 >= 0] eval_ax_bb1_in.9(v__0,v__01,v_3,v_n) -> eval_ax_bb2_in.11(v__0,0,v_3,v_n) [v__0 >= 0] eval_ax_bb2_in.10(v__0,v__01,v_3,v_n) -> eval_ax_bb3_in.12(v__0,v__01,v_3,v_n) [v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0 && -2 + v_n >= v__01] eval_ax_bb2_in.11(v__0,v__01,v_3,v_n) -> eval_ax_bb4_in.13(v__0,v__01,v_3,v_n) [v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0 && v__01 >= -1 + v_n] eval_ax_bb3_in.12(v__0,v__01,v_3,v_n) -> eval_ax_bb2_in.10(v__0,1 + v__01,v_3,v_n) [-2 + v_n >= 0 && -2 + v__01 + v_n >= 0 && -2 + -1*v__01 + v_n >= 0 && -2 + v__0 + v_n >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] eval_ax_bb3_in.12(v__0,v__01,v_3,v_n) -> eval_ax_bb2_in.11(v__0,1 + v__01,v_3,v_n) [-2 + v_n >= 0 && -2 + v__01 + v_n >= 0 && -2 + -1*v__01 + v_n >= 0 && -2 + v__0 + v_n >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] eval_ax_bb4_in.13(v__0,v__01,v_3,v_n) -> eval_ax_12.14(v__0,v__01,1 + v__0,v_n) [1 + v__01 + -1*v_n >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] eval_ax_12.14(v__0,v__01,v_3,v_n) -> eval_ax_13.15(v__0,v__01,v_3,v_n) [1 + v__01 + -1*v_n >= 0 && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] eval_ax_12.14(v__0,v__01,v_3,v_n) -> eval_ax_13.16(v__0,v__01,v_3,v_n) [1 + v__01 + -1*v_n >= 0 && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] eval_ax_13.15(v__0,v__01,v_3,v_n) -> eval_ax_bb1_in.9(v_3,v__01,v_3,v_n) [1 + v__01 + -1*v_n >= 0 && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0 && v__01 >= -1 + v_n && -2 + v_n >= v_3] eval_ax_13.16(v__0,v__01,v_3,v_n) -> eval_ax_bb5_in.17(v__0,v__01,v_3,v_n) [1 + v__01 + -1*v_n >= 0 && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0 && v_3 >= -1 + v_n] eval_ax_bb5_in.17(v__0,v__01,v_3,v_n) -> eval_ax_stop.18(v__0,v__01,v_3,v_n) [1 + v_3 + -1*v_n >= 0 && 1 + v__01 + -1*v_n >= 0 && 2 + v__0 + -1*v_n >= 0 && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] eval_ax_stop.18(v__0,v__01,v_3,v_n) -> exitus616.19(v__0,v__01,v_3,v_n) True Signature: {(eval_ax_0.2,4) ;(eval_ax_1.3,4) ;(eval_ax_12.14,4) ;(eval_ax_13.15,4) ;(eval_ax_13.16,4) ;(eval_ax_2.4,4) ;(eval_ax_3.5,4) ;(eval_ax_4.6,4) ;(eval_ax_5.7,4) ;(eval_ax_6.8,4) ;(eval_ax_bb0_in.1,4) ;(eval_ax_bb1_in.9,4) ;(eval_ax_bb2_in.10,4) ;(eval_ax_bb2_in.11,4) ;(eval_ax_bb3_in.12,4) ;(eval_ax_bb4_in.13,4) ;(eval_ax_bb5_in.17,4) ;(eval_ax_start.0,4) ;(eval_ax_stop.18,4) ;(exitus616.19,4)} Rule Graph: [0->{1},1->{2},2->{3},3->{4},4->{5},5->{6},6->{7},7->{8},8->{9,10},9->{11},10->{12},11->{13,14},12->{15} ,13->{11},14->{12},15->{16,17},16->{18},17->{19},18->{9,10},19->{20},20->{21},21->{}] + Applied Processor: Decompose Greedy + Details: We construct a looptree: P: [0,1,2,3,4,5,6,7,8,9,10,11,12,13,14,15,16,17,18,19,20,21] | `- p:[9,18,16,15,12,10,14,11,13] c: [9,10,12,14,15,16,18] | `- p:[11,13] c: [11,13] * Step 6: AbstractSize WORST_CASE(?,POLY) + Considered Problem: (Rules: eval_ax_start.0(v__0,v__01,v_3,v_n) -> eval_ax_bb0_in.1(v__0,v__01,v_3,v_n) True eval_ax_bb0_in.1(v__0,v__01,v_3,v_n) -> eval_ax_0.2(v__0,v__01,v_3,v_n) True eval_ax_0.2(v__0,v__01,v_3,v_n) -> eval_ax_1.3(v__0,v__01,v_3,v_n) True eval_ax_1.3(v__0,v__01,v_3,v_n) -> eval_ax_2.4(v__0,v__01,v_3,v_n) True eval_ax_2.4(v__0,v__01,v_3,v_n) -> eval_ax_3.5(v__0,v__01,v_3,v_n) True eval_ax_3.5(v__0,v__01,v_3,v_n) -> eval_ax_4.6(v__0,v__01,v_3,v_n) True eval_ax_4.6(v__0,v__01,v_3,v_n) -> eval_ax_5.7(v__0,v__01,v_3,v_n) True eval_ax_5.7(v__0,v__01,v_3,v_n) -> eval_ax_6.8(v__0,v__01,v_3,v_n) True eval_ax_6.8(v__0,v__01,v_3,v_n) -> eval_ax_bb1_in.9(0,v__01,v_3,v_n) True eval_ax_bb1_in.9(v__0,v__01,v_3,v_n) -> eval_ax_bb2_in.10(v__0,0,v_3,v_n) [v__0 >= 0] eval_ax_bb1_in.9(v__0,v__01,v_3,v_n) -> eval_ax_bb2_in.11(v__0,0,v_3,v_n) [v__0 >= 0] eval_ax_bb2_in.10(v__0,v__01,v_3,v_n) -> eval_ax_bb3_in.12(v__0,v__01,v_3,v_n) [v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0 && -2 + v_n >= v__01] eval_ax_bb2_in.11(v__0,v__01,v_3,v_n) -> eval_ax_bb4_in.13(v__0,v__01,v_3,v_n) [v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0 && v__01 >= -1 + v_n] eval_ax_bb3_in.12(v__0,v__01,v_3,v_n) -> eval_ax_bb2_in.10(v__0,1 + v__01,v_3,v_n) [-2 + v_n >= 0 && -2 + v__01 + v_n >= 0 && -2 + -1*v__01 + v_n >= 0 && -2 + v__0 + v_n >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] eval_ax_bb3_in.12(v__0,v__01,v_3,v_n) -> eval_ax_bb2_in.11(v__0,1 + v__01,v_3,v_n) [-2 + v_n >= 0 && -2 + v__01 + v_n >= 0 && -2 + -1*v__01 + v_n >= 0 && -2 + v__0 + v_n >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] eval_ax_bb4_in.13(v__0,v__01,v_3,v_n) -> eval_ax_12.14(v__0,v__01,1 + v__0,v_n) [1 + v__01 + -1*v_n >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] eval_ax_12.14(v__0,v__01,v_3,v_n) -> eval_ax_13.15(v__0,v__01,v_3,v_n) [1 + v__01 + -1*v_n >= 0 && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] eval_ax_12.14(v__0,v__01,v_3,v_n) -> eval_ax_13.16(v__0,v__01,v_3,v_n) [1 + v__01 + -1*v_n >= 0 && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] eval_ax_13.15(v__0,v__01,v_3,v_n) -> eval_ax_bb1_in.9(v_3,v__01,v_3,v_n) [1 + v__01 + -1*v_n >= 0 && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0 && v__01 >= -1 + v_n && -2 + v_n >= v_3] eval_ax_13.16(v__0,v__01,v_3,v_n) -> eval_ax_bb5_in.17(v__0,v__01,v_3,v_n) [1 + v__01 + -1*v_n >= 0 && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0 && v_3 >= -1 + v_n] eval_ax_bb5_in.17(v__0,v__01,v_3,v_n) -> eval_ax_stop.18(v__0,v__01,v_3,v_n) [1 + v_3 + -1*v_n >= 0 && 1 + v__01 + -1*v_n >= 0 && 2 + v__0 + -1*v_n >= 0 && 1 + -1*v_3 + v__0 >= 0 && -1 + v_3 >= 0 && -1 + v_3 + v__01 >= 0 && -1 + v_3 + v__0 >= 0 && -1 + v_3 + -1*v__0 >= 0 && v__01 >= 0 && v__0 + v__01 >= 0 && v__0 >= 0] eval_ax_stop.18(v__0,v__01,v_3,v_n) -> exitus616.19(v__0,v__01,v_3,v_n) True Signature: {(eval_ax_0.2,4) ;(eval_ax_1.3,4) ;(eval_ax_12.14,4) ;(eval_ax_13.15,4) ;(eval_ax_13.16,4) ;(eval_ax_2.4,4) ;(eval_ax_3.5,4) ;(eval_ax_4.6,4) ;(eval_ax_5.7,4) ;(eval_ax_6.8,4) ;(eval_ax_bb0_in.1,4) ;(eval_ax_bb1_in.9,4) ;(eval_ax_bb2_in.10,4) ;(eval_ax_bb2_in.11,4) ;(eval_ax_bb3_in.12,4) ;(eval_ax_bb4_in.13,4) ;(eval_ax_bb5_in.17,4) ;(eval_ax_start.0,4) ;(eval_ax_stop.18,4) ;(exitus616.19,4)} Rule Graph: [0->{1},1->{2},2->{3},3->{4},4->{5},5->{6},6->{7},7->{8},8->{9,10},9->{11},10->{12},11->{13,14},12->{15} ,13->{11},14->{12},15->{16,17},16->{18},17->{19},18->{9,10},19->{20},20->{21},21->{}] ,We construct a looptree: P: [0,1,2,3,4,5,6,7,8,9,10,11,12,13,14,15,16,17,18,19,20,21] | `- p:[9,18,16,15,12,10,14,11,13] c: [9,10,12,14,15,16,18] | `- p:[11,13] c: [11,13]) + Applied Processor: AbstractSize Minimize + Details: () * Step 7: AbstractFlow WORST_CASE(?,POLY) + Considered Problem: Program: Domain: [v__0,v__01,v_3,v_n,0.0,0.0.0] eval_ax_start.0 ~> eval_ax_bb0_in.1 [v__0 <= v__0, v__01 <= v__01, v_3 <= v_3, v_n <= v_n] eval_ax_bb0_in.1 ~> eval_ax_0.2 [v__0 <= v__0, v__01 <= v__01, v_3 <= v_3, v_n <= v_n] eval_ax_0.2 ~> eval_ax_1.3 [v__0 <= v__0, v__01 <= v__01, v_3 <= v_3, v_n <= v_n] eval_ax_1.3 ~> eval_ax_2.4 [v__0 <= v__0, v__01 <= v__01, v_3 <= v_3, v_n <= v_n] eval_ax_2.4 ~> eval_ax_3.5 [v__0 <= v__0, v__01 <= v__01, v_3 <= v_3, v_n <= v_n] eval_ax_3.5 ~> eval_ax_4.6 [v__0 <= v__0, v__01 <= v__01, v_3 <= v_3, v_n <= v_n] eval_ax_4.6 ~> eval_ax_5.7 [v__0 <= v__0, v__01 <= v__01, v_3 <= v_3, v_n <= v_n] eval_ax_5.7 ~> eval_ax_6.8 [v__0 <= v__0, v__01 <= v__01, v_3 <= v_3, v_n <= v_n] eval_ax_6.8 ~> eval_ax_bb1_in.9 [v__0 <= 0*K, v__01 <= v__01, v_3 <= v_3, v_n <= v_n] eval_ax_bb1_in.9 ~> eval_ax_bb2_in.10 [v__0 <= v__0, v__01 <= 0*K, v_3 <= v_3, v_n <= v_n] eval_ax_bb1_in.9 ~> eval_ax_bb2_in.11 [v__0 <= v__0, v__01 <= 0*K, v_3 <= v_3, v_n <= v_n] eval_ax_bb2_in.10 ~> eval_ax_bb3_in.12 [v__0 <= v__0, v__01 <= v__01, v_3 <= v_3, v_n <= v_n] eval_ax_bb2_in.11 ~> eval_ax_bb4_in.13 [v__0 <= v__0, v__01 <= v__01, v_3 <= v_3, v_n <= v_n] eval_ax_bb3_in.12 ~> eval_ax_bb2_in.10 [v__0 <= v__0, v__01 <= v_n, v_3 <= v_3, v_n <= v_n] eval_ax_bb3_in.12 ~> eval_ax_bb2_in.11 [v__0 <= v__0, v__01 <= v_n, v_3 <= v_3, v_n <= v_n] eval_ax_bb4_in.13 ~> eval_ax_12.14 [v__0 <= v__0, v__01 <= v__01, v_3 <= K + v__0, v_n <= v_n] eval_ax_12.14 ~> eval_ax_13.15 [v__0 <= v__0, v__01 <= v__01, v_3 <= v_3, v_n <= v_n] eval_ax_12.14 ~> eval_ax_13.16 [v__0 <= v__0, v__01 <= v__01, v_3 <= v_3, v_n <= v_n] eval_ax_13.15 ~> eval_ax_bb1_in.9 [v__0 <= v_3, v__01 <= v__01, v_3 <= v_3, v_n <= v_n] eval_ax_13.16 ~> eval_ax_bb5_in.17 [v__0 <= v__0, v__01 <= v__01, v_3 <= v_3, v_n <= v_n] eval_ax_bb5_in.17 ~> eval_ax_stop.18 [v__0 <= v__0, v__01 <= v__01, v_3 <= v_3, v_n <= v_n] eval_ax_stop.18 ~> exitus616.19 [v__0 <= v__0, v__01 <= v__01, v_3 <= v_3, v_n <= v_n] + Loop: [0.0 <= v__0 + v_n] eval_ax_bb1_in.9 ~> eval_ax_bb2_in.10 [v__0 <= v__0, v__01 <= 0*K, v_3 <= v_3, v_n <= v_n] eval_ax_13.15 ~> eval_ax_bb1_in.9 [v__0 <= v_3, v__01 <= v__01, v_3 <= v_3, v_n <= v_n] eval_ax_12.14 ~> eval_ax_13.15 [v__0 <= v__0, v__01 <= v__01, v_3 <= v_3, v_n <= v_n] eval_ax_bb4_in.13 ~> eval_ax_12.14 [v__0 <= v__0, v__01 <= v__01, v_3 <= K + v__0, v_n <= v_n] eval_ax_bb2_in.11 ~> eval_ax_bb4_in.13 [v__0 <= v__0, v__01 <= v__01, v_3 <= v_3, v_n <= v_n] eval_ax_bb1_in.9 ~> eval_ax_bb2_in.11 [v__0 <= v__0, v__01 <= 0*K, v_3 <= v_3, v_n <= v_n] eval_ax_bb3_in.12 ~> eval_ax_bb2_in.11 [v__0 <= v__0, v__01 <= v_n, v_3 <= v_3, v_n <= v_n] eval_ax_bb2_in.10 ~> eval_ax_bb3_in.12 [v__0 <= v__0, v__01 <= v__01, v_3 <= v_3, v_n <= v_n] eval_ax_bb3_in.12 ~> eval_ax_bb2_in.10 [v__0 <= v__0, v__01 <= v_n, v_3 <= v_3, v_n <= v_n] + Loop: [0.0.0 <= 2*K + v__01 + v_n] eval_ax_bb2_in.10 ~> eval_ax_bb3_in.12 [v__0 <= v__0, v__01 <= v__01, v_3 <= v_3, v_n <= v_n] eval_ax_bb3_in.12 ~> eval_ax_bb2_in.10 [v__0 <= v__0, v__01 <= v_n, v_3 <= v_3, v_n <= v_n] + Applied Processor: AbstractFlow + Details: () * Step 8: Lare WORST_CASE(?,POLY) + Considered Problem: Program: Domain: [tick,huge,K,v__0,v__01,v_3,v_n,0.0,0.0.0] eval_ax_start.0 ~> eval_ax_bb0_in.1 [] eval_ax_bb0_in.1 ~> eval_ax_0.2 [] eval_ax_0.2 ~> eval_ax_1.3 [] eval_ax_1.3 ~> eval_ax_2.4 [] eval_ax_2.4 ~> eval_ax_3.5 [] eval_ax_3.5 ~> eval_ax_4.6 [] eval_ax_4.6 ~> eval_ax_5.7 [] eval_ax_5.7 ~> eval_ax_6.8 [] eval_ax_6.8 ~> eval_ax_bb1_in.9 [K ~=> v__0] eval_ax_bb1_in.9 ~> eval_ax_bb2_in.10 [K ~=> v__01] eval_ax_bb1_in.9 ~> eval_ax_bb2_in.11 [K ~=> v__01] eval_ax_bb2_in.10 ~> eval_ax_bb3_in.12 [] eval_ax_bb2_in.11 ~> eval_ax_bb4_in.13 [] eval_ax_bb3_in.12 ~> eval_ax_bb2_in.10 [v_n ~=> v__01] eval_ax_bb3_in.12 ~> eval_ax_bb2_in.11 [v_n ~=> v__01] eval_ax_bb4_in.13 ~> eval_ax_12.14 [v__0 ~+> v_3,K ~+> v_3] eval_ax_12.14 ~> eval_ax_13.15 [] eval_ax_12.14 ~> eval_ax_13.16 [] eval_ax_13.15 ~> eval_ax_bb1_in.9 [v_3 ~=> v__0] eval_ax_13.16 ~> eval_ax_bb5_in.17 [] eval_ax_bb5_in.17 ~> eval_ax_stop.18 [] eval_ax_stop.18 ~> exitus616.19 [] + Loop: [v__0 ~+> 0.0,v_n ~+> 0.0] eval_ax_bb1_in.9 ~> eval_ax_bb2_in.10 [K ~=> v__01] eval_ax_13.15 ~> eval_ax_bb1_in.9 [v_3 ~=> v__0] eval_ax_12.14 ~> eval_ax_13.15 [] eval_ax_bb4_in.13 ~> eval_ax_12.14 [v__0 ~+> v_3,K ~+> v_3] eval_ax_bb2_in.11 ~> eval_ax_bb4_in.13 [] eval_ax_bb1_in.9 ~> eval_ax_bb2_in.11 [K ~=> v__01] eval_ax_bb3_in.12 ~> eval_ax_bb2_in.11 [v_n ~=> v__01] eval_ax_bb2_in.10 ~> eval_ax_bb3_in.12 [] eval_ax_bb3_in.12 ~> eval_ax_bb2_in.10 [v_n ~=> v__01] + Loop: [v__01 ~+> 0.0.0,v_n ~+> 0.0.0,K ~*> 0.0.0] eval_ax_bb2_in.10 ~> eval_ax_bb3_in.12 [] eval_ax_bb3_in.12 ~> eval_ax_bb2_in.10 [v_n ~=> v__01] + Applied Processor: Lare + Details: eval_ax_start.0 ~> exitus616.19 [v_n ~=> v__01 ,K ~=> v__0 ,K ~=> v__01 ,v_n ~+> 0.0 ,v_n ~+> 0.0.0 ,v_n ~+> tick ,tick ~+> tick ,K ~+> v_3 ,K ~+> v__0 ,K ~+> 0.0 ,K ~+> 0.0.0 ,K ~+> tick ,v_n ~*> v_3 ,v_n ~*> v__0 ,v_n ~*> tick ,K ~*> v_3 ,K ~*> v__0 ,K ~*> 0.0.0 ,K ~*> tick] + eval_ax_12.14> [v_n ~=> v__01 ,K ~=> v__01 ,v__0 ~+> v_3 ,v__0 ~+> v__0 ,v__0 ~+> 0.0 ,v__0 ~+> tick ,v_n ~+> 0.0 ,v_n ~+> 0.0.0 ,v_n ~+> tick ,tick ~+> tick ,K ~+> v_3 ,K ~+> v__0 ,K ~+> 0.0.0 ,K ~+> tick ,v__0 ~*> v_3 ,v__0 ~*> v__0 ,v__0 ~*> tick ,v_n ~*> v_3 ,v_n ~*> v__0 ,v_n ~*> tick ,K ~*> v_3 ,K ~*> v__0 ,K ~*> 0.0.0 ,K ~*> tick] + eval_ax_bb3_in.12> [v_n ~=> v__01 ,v__01 ~+> 0.0.0 ,v__01 ~+> tick ,v_n ~+> 0.0.0 ,v_n ~+> tick ,tick ~+> tick ,K ~*> 0.0.0 ,K ~*> tick] YES(?,POLY)