/export/starexec/sandbox2/solver/bin/starexec_run_termcomp17 /export/starexec/sandbox2/benchmark/theBenchmark.smt2 /export/starexec/sandbox2/output/output_files -------------------------------------------------------------------------------- YES Solver Timeout: 4 Global Timeout: 300 Maximum number of concurrent processes: 900 No parsing errors! Init Location: 0 Transitions: undef1, oldX1^0 -> undef6, oldX2^0 -> undef7, oldX3^0 -> undef8, oldX4^0 -> undef9, oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef12, oldX8^0 -> undef13, x0^0 -> (0 + undef1), x1^0 -> (0 + undef6), x2^0 -> (0 + undef7), x3^0 -> (0 + undef8), x4^0 -> (0 + undef9), x5^0 -> (0 + undef12), x6^0 -> (0 + undef13)}> undef22, oldX1^0 -> undef27, oldX2^0 -> undef28, oldX3^0 -> undef29, oldX4^0 -> undef30, oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef33, oldX8^0 -> undef34, x0^0 -> (0 + undef22), x1^0 -> (0 + undef27), x2^0 -> (0 + undef28), x3^0 -> (0 + undef29), x4^0 -> (0 + undef30), x5^0 -> (0 + undef33), x6^0 -> (0 + undef34)}> undef43, oldX1^0 -> undef48, oldX2^0 -> undef49, oldX3^0 -> undef50, oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef54, oldX8^0 -> undef55, oldX9^0 -> undef56, x0^0 -> (0 + undef43), x1^0 -> (0 + undef48), x2^0 -> (0 + undef49), x3^0 -> (~(32) + undef50), x4^0 -> (0 + undef54), x5^0 -> (0 + undef55), x6^0 -> (0 + undef56)}> undef64, oldX1^0 -> undef69, oldX2^0 -> undef70, oldX3^0 -> undef71, oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef75, oldX8^0 -> undef76, x0^0 -> (0 + undef64), x1^0 -> (0 + undef69), x2^0 -> (0 + undef70), x3^0 -> (0 + undef71), x4^0 -> (0 + undef71), x5^0 -> (0 + undef75), x6^0 -> (0 + undef76)}> undef85, oldX1^0 -> undef90, oldX2^0 -> undef91, oldX3^0 -> undef92, oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef96, oldX8^0 -> undef97, oldX9^0 -> undef98, x0^0 -> (0 + undef85), x1^0 -> (0 + undef90), x2^0 -> (0 + undef91), x3^0 -> (0 + undef92), x4^0 -> (0 + undef96), x5^0 -> (0 + undef97), x6^0 -> (0 + undef98)}> undef106, oldX10^0 -> undef107, oldX1^0 -> undef111, oldX2^0 -> undef112, oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef117, oldX8^0 -> undef118, oldX9^0 -> undef119, x0^0 -> (0 + undef106), x1^0 -> (0 + undef111), x2^0 -> (~(1) + undef112), x3^0 -> (0 + undef117), x4^0 -> (0 + undef118), x5^0 -> (0 + undef119), x6^0 -> (0 + undef107)}> undef127, oldX10^0 -> undef128, oldX11^0 -> undef129, oldX1^0 -> undef132, oldX2^0 -> undef133, oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef138, oldX8^0 -> undef139, oldX9^0 -> undef140, x0^0 -> (0 + undef127), x1^0 -> (0 + undef132), x2^0 -> (0 + undef133), x3^0 -> (0 + undef138), x4^0 -> (0 + undef139), x5^0 -> (0 + undef140), x6^0 -> (0 + undef128)}> undef148, oldX10^0 -> undef149, oldX11^0 -> undef150, oldX1^0 -> undef153, oldX2^0 -> undef154, oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef159, oldX8^0 -> undef160, oldX9^0 -> undef161, x0^0 -> (0 + undef148), x1^0 -> (0 + undef153), x2^0 -> (0 + undef154), x3^0 -> (0 + undef159), x4^0 -> (0 + undef160), x5^0 -> (0 + undef161), x6^0 -> (0 + undef149)}> undef169, oldX10^0 -> undef170, oldX11^0 -> undef171, oldX1^0 -> undef174, oldX2^0 -> undef175, oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef180, oldX8^0 -> undef181, oldX9^0 -> undef182, x0^0 -> (0 + undef169), x1^0 -> (0 + undef174), x2^0 -> (0 + undef175), x3^0 -> (0 + undef180), x4^0 -> (0 + undef181), x5^0 -> (0 + undef182), x6^0 -> (0 + undef170)}> undef190, oldX1^0 -> undef195, oldX2^0 -> undef196, oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef201, oldX8^0 -> undef202, oldX9^0 -> undef203, x0^0 -> (0 + undef190), x1^0 -> (0 + undef195), x2^0 -> (0 + undef196), x3^0 -> (0 + undef196), x4^0 -> (0 + undef201), x5^0 -> (0 + undef202), x6^0 -> (0 + undef203)}> undef211, oldX10^0 -> undef212, oldX1^0 -> undef216, oldX2^0 -> undef217, oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef222, oldX8^0 -> undef223, oldX9^0 -> undef224, x0^0 -> (0 + undef211), x1^0 -> (0 + undef216), x2^0 -> (0 + undef217), x3^0 -> (0 + undef222), x4^0 -> (0 + undef223), x5^0 -> (0 + undef224), x6^0 -> (0 + undef212)}> undef232, oldX10^0 -> undef233, oldX1^0 -> undef237, oldX2^0 -> undef238, oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef243, oldX8^0 -> undef244, oldX9^0 -> undef245, x0^0 -> (0 + undef232), x1^0 -> (0 + undef237), x2^0 -> (0 + undef238), x3^0 -> (0 + undef243), x4^0 -> (0 + undef244), x5^0 -> (0 + undef245), x6^0 -> (0 + undef233)}> (0 + x0^0), oldX10^0 -> undef254, oldX11^0 -> undef255, oldX12^0 -> undef256, oldX13^0 -> undef257, oldX1^0 -> (0 + x1^0), oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef264, oldX8^0 -> undef265, oldX9^0 -> undef266, x0^0 -> (0 + undef264), x1^0 -> (0 + undef265), x2^0 -> (0 + undef266), x3^0 -> (0 + undef254), x4^0 -> (0 + undef255), x5^0 -> (0 + undef256), x6^0 -> (0 + undef257)}> undef274, oldX1^0 -> undef279, oldX2^0 -> undef280, oldX3^0 -> undef281, oldX4^0 -> undef282, oldX5^0 -> undef283, oldX6^0 -> undef284, x0^0 -> (0 + undef274), x1^0 -> (0 + undef279), x2^0 -> (0 + undef280), x3^0 -> (0 + undef281), x4^0 -> (0 + undef282), x5^0 -> (0 + undef283), x6^0 -> (0 + undef284)}> undef295, oldX1^0 -> undef300, oldX2^0 -> undef301, oldX3^0 -> undef302, oldX4^0 -> undef303, oldX5^0 -> undef304, oldX6^0 -> undef305, x0^0 -> (0 + undef295), x1^0 -> (0 + undef300), x2^0 -> (0 + undef301), x3^0 -> (0 + undef302), x4^0 -> (0 + undef303), x5^0 -> (0 + undef304), x6^0 -> (~(1) + undef305)}> undef337, oldX1^0 -> undef342, oldX2^0 -> undef343, oldX3^0 -> undef344, oldX4^0 -> undef345, oldX5^0 -> undef346, oldX6^0 -> (0 + x6^0), oldX7^0 -> undef348, x0^0 -> (0 + undef337), x1^0 -> (0 + undef342), x2^0 -> (0 + undef343), x3^0 -> (0 + undef344), x4^0 -> (0 + undef345), x5^0 -> (0 + undef346), x6^0 -> (0 + undef348)}> undef358, oldX1^0 -> undef363, oldX2^0 -> undef364, oldX3^0 -> undef365, oldX4^0 -> undef366, oldX5^0 -> undef367, oldX6^0 -> (0 + x6^0), x0^0 -> (0 + undef358), x1^0 -> (0 + undef363), x2^0 -> (0 + undef364), x3^0 -> (0 + undef365), x4^0 -> (0 + undef366), x5^0 -> (0 + undef367), x6^0 -> (0 + undef367)}> undef379, oldX1^0 -> undef384, oldX2^0 -> undef385, oldX3^0 -> undef386, oldX4^0 -> undef387, oldX5^0 -> undef388, oldX6^0 -> (0 + x6^0), oldX7^0 -> undef390, x0^0 -> (0 + undef379), x1^0 -> (0 + undef384), x2^0 -> (0 + undef385), x3^0 -> (0 + undef386), x4^0 -> (0 + undef387), x5^0 -> (~(4) + undef388), x6^0 -> (0 + undef390)}> undef400, oldX1^0 -> undef405, oldX2^0 -> undef406, oldX3^0 -> undef407, oldX4^0 -> undef408, oldX5^0 -> undef409, oldX6^0 -> (0 + x6^0), oldX7^0 -> undef411, x0^0 -> (0 + undef400), x1^0 -> (0 + undef405), x2^0 -> (0 + undef406), x3^0 -> (0 + undef407), x4^0 -> (0 + undef408), x5^0 -> (0 + undef409), x6^0 -> (0 + undef411)}> undef421, oldX1^0 -> undef426, oldX2^0 -> undef427, oldX3^0 -> undef428, oldX4^0 -> undef429, oldX5^0 -> undef430, oldX6^0 -> (0 + x6^0), oldX7^0 -> undef432, x0^0 -> (0 + undef421), x1^0 -> (0 + undef426), x2^0 -> (0 + undef427), x3^0 -> (0 + undef428), x4^0 -> (0 + undef429), x5^0 -> (0 + undef430), x6^0 -> (0 + undef432)}> undef442, oldX1^0 -> undef447, oldX2^0 -> undef448, oldX3^0 -> undef449, oldX4^0 -> undef450, oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef453, oldX8^0 -> undef454, x0^0 -> (0 + undef442), x1^0 -> (0 + undef447), x2^0 -> (0 + undef448), x3^0 -> (0 + undef449), x4^0 -> (~(32) + undef450), x5^0 -> (0 + undef453), x6^0 -> (0 + undef454)}> undef463, oldX1^0 -> undef468, oldX2^0 -> undef469, oldX3^0 -> undef470, oldX4^0 -> undef471, oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef474, x0^0 -> (0 + undef463), x1^0 -> (0 + undef468), x2^0 -> (0 + undef469), x3^0 -> (0 + undef470), x4^0 -> (0 + undef471), x5^0 -> (0 + undef471), x6^0 -> (0 + undef474)}> undef484, oldX1^0 -> undef489, oldX2^0 -> undef490, oldX3^0 -> undef491, oldX4^0 -> undef492, oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef495, oldX8^0 -> undef496, x0^0 -> (0 + undef484), x1^0 -> (0 + undef489), x2^0 -> (0 + undef490), x3^0 -> (0 + undef491), x4^0 -> (0 + undef492), x5^0 -> (0 + undef495), x6^0 -> (0 + undef496)}> undef505, oldX10^0 -> undef506, oldX1^0 -> undef510, oldX2^0 -> (0 + x2^0), oldX3^0 -> undef512, oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef516, oldX8^0 -> undef517, oldX9^0 -> undef518, x0^0 -> (0 + undef505), x1^0 -> (0 + undef510), x2^0 -> (0 + undef516), x3^0 -> (~(1) + undef512), x4^0 -> (0 + undef517), x5^0 -> (0 + undef518), x6^0 -> (0 + undef506)}> undef526, oldX10^0 -> undef527, oldX1^0 -> undef531, oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef537, oldX8^0 -> undef538, oldX9^0 -> undef539, x0^0 -> (0 + undef526), x1^0 -> (0 + undef531), x2^0 -> (0 + undef531), x3^0 -> (0 + undef537), x4^0 -> (0 + undef538), x5^0 -> (0 + undef539), x6^0 -> (0 + undef527)}> undef547, oldX10^0 -> undef548, oldX1^0 -> undef552, oldX2^0 -> undef553, oldX3^0 -> undef554, oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef558, oldX8^0 -> undef559, oldX9^0 -> undef560, x0^0 -> (0 + undef547), x1^0 -> (0 + undef552), x2^0 -> (0 + undef553), x3^0 -> (0 + undef554), x4^0 -> (0 + undef558), x5^0 -> (0 + undef559), x6^0 -> (0 + undef560)}> undef568, oldX10^0 -> undef569, oldX1^0 -> undef573, oldX2^0 -> undef574, oldX3^0 -> undef575, oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef579, oldX8^0 -> undef580, oldX9^0 -> undef581, x0^0 -> (0 + undef568), x1^0 -> (0 + undef573), x2^0 -> (0 + undef574), x3^0 -> (0 + undef575), x4^0 -> (0 + undef579), x5^0 -> (0 + undef580), x6^0 -> (0 + undef581)}> undef589, oldX10^0 -> undef590, oldX1^0 -> undef594, oldX2^0 -> undef595, oldX3^0 -> undef596, oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef600, oldX8^0 -> undef601, oldX9^0 -> undef602, x0^0 -> (0 + undef589), x1^0 -> (0 + undef594), x2^0 -> (0 + undef595), x3^0 -> (0 + undef596), x4^0 -> (0 + undef600), x5^0 -> (0 + undef601), x6^0 -> (0 + undef602)}> undef610, oldX1^0 -> undef615, oldX2^0 -> undef616, oldX3^0 -> undef617, oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef621, oldX8^0 -> undef622, x0^0 -> (0 + undef610), x1^0 -> (0 + undef615), x2^0 -> (0 + undef616), x3^0 -> (0 + undef617), x4^0 -> (0 + undef617), x5^0 -> (0 + undef621), x6^0 -> (0 + undef622)}> undef631, oldX1^0 -> undef636, oldX2^0 -> undef637, oldX3^0 -> undef638, oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef642, oldX8^0 -> undef643, oldX9^0 -> undef644, x0^0 -> (0 + undef631), x1^0 -> (0 + undef636), x2^0 -> (0 + undef637), x3^0 -> (0 + undef638), x4^0 -> (0 + undef642), x5^0 -> (0 + undef643), x6^0 -> (0 + undef644)}> undef652, oldX1^0 -> undef657, oldX2^0 -> undef658, oldX3^0 -> undef659, oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef663, oldX8^0 -> undef664, oldX9^0 -> undef665, x0^0 -> (0 + undef652), x1^0 -> (0 + undef657), x2^0 -> (0 + undef658), x3^0 -> (0 + undef659), x4^0 -> (0 + undef663), x5^0 -> (0 + undef664), x6^0 -> (0 + undef665)}> undef673, oldX10^0 -> undef674, oldX11^0 -> undef675, oldX12^0 -> undef676, oldX13^0 -> undef677, oldX1^0 -> undef678, oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef684, oldX8^0 -> undef685, oldX9^0 -> undef686, x0^0 -> (0 + undef673), x1^0 -> (0 + undef678), x2^0 -> ((((~(1) + (~(1) * undef674)) + (~(1) * undef684)) + (~(1) * undef685)) + (~(1) * undef686)), x3^0 -> (0 + undef678), x4^0 -> (0 + undef675), x5^0 -> (0 + undef676), x6^0 -> (0 + undef677)}> (0 + x0^0), oldX10^0 -> undef695, oldX11^0 -> undef696, oldX12^0 -> undef697, oldX13^0 -> undef698, oldX1^0 -> (0 + x1^0), oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef705, oldX8^0 -> undef706, oldX9^0 -> undef707, x0^0 -> (0 + undef705), x1^0 -> (0 + undef706), x2^0 -> (0 + undef707), x3^0 -> (0 + undef695), x4^0 -> (0 + undef696), x5^0 -> (0 + undef697), x6^0 -> (0 + undef698)}> undef715, oldX1^0 -> undef720, oldX2^0 -> undef721, oldX3^0 -> undef722, oldX4^0 -> undef723, oldX5^0 -> undef724, oldX6^0 -> (0 + x6^0), oldX7^0 -> undef726, x0^0 -> (0 + undef715), x1^0 -> (0 + undef720), x2^0 -> (0 + undef721), x3^0 -> (0 + undef722), x4^0 -> (0 + undef723), x5^0 -> (0 + undef724), x6^0 -> (0 + undef726)}> undef736, oldX1^0 -> undef741, oldX2^0 -> undef742, oldX3^0 -> undef743, oldX4^0 -> undef744, oldX5^0 -> undef745, oldX6^0 -> (0 + x6^0), oldX7^0 -> undef747, x0^0 -> (0 + undef736), x1^0 -> (0 + undef741), x2^0 -> (0 + undef742), x3^0 -> (0 + undef743), x4^0 -> (0 + undef744), x5^0 -> (~(1) + undef745), x6^0 -> (0 + undef747)}> undef778, oldX1^0 -> undef783, oldX2^0 -> undef784, oldX3^0 -> undef785, oldX4^0 -> undef786, oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef789, oldX8^0 -> undef790, x0^0 -> (0 + undef778), x1^0 -> (0 + undef783), x2^0 -> (0 + undef784), x3^0 -> (0 + undef785), x4^0 -> (0 + undef786), x5^0 -> (0 + undef789), x6^0 -> (0 + undef790)}> undef799, oldX1^0 -> undef804, oldX2^0 -> undef805, oldX3^0 -> undef806, oldX4^0 -> undef807, oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef810, x0^0 -> (0 + undef799), x1^0 -> (0 + undef804), x2^0 -> (0 + undef805), x3^0 -> (0 + undef806), x4^0 -> (0 + undef807), x5^0 -> (0 + undef807), x6^0 -> (0 + undef810)}> undef820, oldX1^0 -> undef825, oldX2^0 -> undef826, oldX3^0 -> undef827, oldX4^0 -> undef828, oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef831, oldX8^0 -> undef832, x0^0 -> (0 + undef820), x1^0 -> (0 + undef825), x2^0 -> (0 + undef826), x3^0 -> (0 + undef827), x4^0 -> (~(4) + undef828), x5^0 -> (0 + undef831), x6^0 -> (0 + undef832)}> (0 + x0^0), oldX10^0 -> undef842, oldX11^0 -> undef843, oldX12^0 -> undef844, oldX13^0 -> undef845, oldX1^0 -> (0 + x1^0), oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef852, oldX8^0 -> undef853, oldX9^0 -> undef854, x0^0 -> (0 + undef852), x1^0 -> (0 + undef853), x2^0 -> (0 + undef854), x3^0 -> (0 + undef842), x4^0 -> (0 + undef843), x5^0 -> (0 + undef844), x6^0 -> (0 + undef845)}> undef862, oldX10^0 -> undef863, oldX11^0 -> undef864, oldX1^0 -> undef867, oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef873, oldX8^0 -> undef874, oldX9^0 -> undef875, x0^0 -> (0 + undef862), x1^0 -> (0 + undef867), x2^0 -> (0 + undef873), x3^0 -> (0 + undef874), x4^0 -> (0 + undef875), x5^0 -> (0 + undef863), x6^0 -> (0 + undef864)}> undef883, oldX10^0 -> undef884, oldX11^0 -> undef885, oldX1^0 -> undef888, oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> undef894, oldX8^0 -> undef895, oldX9^0 -> undef896, x0^0 -> (0 + undef883), x1^0 -> (0 + undef888), x2^0 -> (0 + undef894), x3^0 -> (0 + undef895), x4^0 -> (0 + undef896), x5^0 -> (0 + undef884), x6^0 -> (0 + undef885)}> Fresh variables: undef1, undef6, undef7, undef8, undef9, undef12, undef13, undef22, undef27, undef28, undef29, undef30, undef33, undef34, undef43, undef48, undef49, undef50, undef54, undef55, undef56, undef64, undef69, undef70, undef71, undef75, undef76, undef85, undef90, undef91, undef92, undef96, undef97, undef98, undef106, undef107, undef111, undef112, undef117, undef118, undef119, undef127, undef128, undef129, undef132, undef133, undef138, undef139, undef140, undef148, undef149, undef150, undef153, undef154, undef159, undef160, undef161, undef169, undef170, undef171, undef174, undef175, undef180, undef181, undef182, undef190, undef195, undef196, undef201, undef202, undef203, undef211, undef212, undef216, undef217, undef222, undef223, undef224, undef232, undef233, undef237, undef238, undef243, undef244, undef245, undef254, undef255, undef256, undef257, undef264, undef265, undef266, undef274, undef279, undef280, undef281, undef282, undef283, undef284, undef295, undef300, undef301, undef302, undef303, undef304, undef305, undef337, undef342, undef343, undef344, undef345, undef346, undef348, undef358, undef363, undef364, undef365, undef366, undef367, undef379, undef384, undef385, undef386, undef387, undef388, undef390, undef400, undef405, undef406, undef407, undef408, undef409, undef411, undef421, undef426, undef427, undef428, undef429, undef430, undef432, undef442, undef447, undef448, undef449, undef450, undef453, undef454, undef463, undef468, undef469, undef470, undef471, undef474, undef484, undef489, undef490, undef491, undef492, undef495, undef496, undef505, undef506, undef510, undef512, undef516, undef517, undef518, undef526, undef527, undef531, undef537, undef538, undef539, undef547, undef548, undef552, undef553, undef554, undef558, undef559, undef560, undef568, undef569, undef573, undef574, undef575, undef579, undef580, undef581, undef589, undef590, undef594, undef595, undef596, undef600, undef601, undef602, undef610, undef615, undef616, undef617, undef621, undef622, undef631, undef636, undef637, undef638, undef642, undef643, undef644, undef652, undef657, undef658, undef659, undef663, undef664, undef665, undef673, undef674, undef675, undef676, undef677, undef678, undef684, undef685, undef686, undef695, undef696, undef697, undef698, undef705, undef706, undef707, undef715, undef720, undef721, undef722, undef723, undef724, undef726, undef736, undef741, undef742, undef743, undef744, undef745, undef747, undef778, undef783, undef784, undef785, undef786, undef789, undef790, undef799, undef804, undef805, undef806, undef807, undef810, undef820, undef825, undef826, undef827, undef828, undef831, undef832, undef842, undef843, undef844, undef845, undef852, undef853, undef854, undef862, undef863, undef864, undef867, undef873, undef874, undef875, undef883, undef884, undef885, undef888, undef894, undef895, undef896, Undef variables: undef1, undef6, undef7, undef8, undef9, undef12, undef13, undef22, undef27, undef28, undef29, undef30, undef33, undef34, undef43, undef48, undef49, undef50, undef54, undef55, undef56, undef64, undef69, undef70, undef71, undef75, undef76, undef85, undef90, undef91, undef92, undef96, undef97, undef98, undef106, undef107, undef111, undef112, undef117, undef118, undef119, undef127, undef128, undef129, undef132, undef133, undef138, undef139, undef140, undef148, undef149, undef150, undef153, undef154, undef159, undef160, undef161, undef169, undef170, undef171, undef174, undef175, undef180, undef181, undef182, undef190, undef195, undef196, undef201, undef202, undef203, undef211, undef212, undef216, undef217, undef222, undef223, undef224, undef232, undef233, undef237, undef238, undef243, undef244, undef245, undef254, undef255, undef256, undef257, undef264, undef265, undef266, undef274, undef279, undef280, undef281, undef282, undef283, undef284, undef295, undef300, undef301, undef302, undef303, undef304, undef305, undef337, undef342, undef343, undef344, undef345, undef346, undef348, undef358, undef363, undef364, undef365, undef366, undef367, undef379, undef384, undef385, undef386, undef387, undef388, undef390, undef400, undef405, undef406, undef407, undef408, undef409, undef411, undef421, undef426, undef427, undef428, undef429, undef430, undef432, undef442, undef447, undef448, undef449, undef450, undef453, undef454, undef463, undef468, undef469, undef470, undef471, undef474, undef484, undef489, undef490, undef491, undef492, undef495, undef496, undef505, undef506, undef510, undef512, undef516, undef517, undef518, undef526, undef527, undef531, undef537, undef538, undef539, undef547, undef548, undef552, undef553, undef554, undef558, undef559, undef560, undef568, undef569, undef573, undef574, undef575, undef579, undef580, undef581, undef589, undef590, undef594, undef595, undef596, undef600, undef601, undef602, undef610, undef615, undef616, undef617, undef621, undef622, undef631, undef636, undef637, undef638, undef642, undef643, undef644, undef652, undef657, undef658, undef659, undef663, undef664, undef665, undef673, undef674, undef675, undef676, undef677, undef678, undef684, undef685, undef686, undef695, undef696, undef697, undef698, undef705, undef706, undef707, undef715, undef720, undef721, undef722, undef723, undef724, undef726, undef736, undef741, undef742, undef743, undef744, undef745, undef747, undef778, undef783, undef784, undef785, undef786, undef789, undef790, undef799, undef804, undef805, undef806, undef807, undef810, undef820, undef825, undef826, undef827, undef828, undef831, undef832, undef842, undef843, undef844, undef845, undef852, undef853, undef854, undef862, undef863, undef864, undef867, undef873, undef874, undef875, undef883, undef884, undef885, undef888, undef894, undef895, undef896, Abstraction variables: Exit nodes: Accepting locations: Asserts: Preprocessed LLVMGraph Init Location: 0 Transitions: (0 + undef852), x1^0 -> (0 + undef853), x2^0 -> (0 + undef854), x3^0 -> (0 + undef842), x4^0 -> (0 + undef843), x5^0 -> (0 + undef844), x6^0 -> (0 + undef845)}> (0 + undef673), x1^0 -> (0 + undef678), x2^0 -> ((((~(1) + (~(1) * undef674)) + (~(1) * undef684)) + (~(1) * undef685)) + (~(1) * undef686)), x3^0 -> (0 + undef678), x4^0 -> (0 + undef675), x5^0 -> (0 + undef676), x6^0 -> (0 + undef677)}> (0 + undef526), x1^0 -> (0 + undef531), x2^0 -> (0 + undef531), x3^0 -> (0 + undef537), x4^0 -> (0 + undef538), x5^0 -> (0 + undef539), x6^0 -> (0 + undef527)}> (0 + undef190), x1^0 -> (0 + undef195), x2^0 -> (0 + undef196), x3^0 -> (0 + undef196), x4^0 -> (0 + undef201), x5^0 -> (0 + undef202), x6^0 -> (0 + undef203)}> (0 + undef264), x1^0 -> (0 + undef265), x2^0 -> (0 + undef266), x3^0 -> (0 + undef254), x4^0 -> (0 + undef255), x5^0 -> (0 + undef256), x6^0 -> (0 + undef257)}> (0 + undef526), x1^0 -> (0 + undef531), x2^0 -> (0 + undef531), x3^0 -> (0 + undef537), x4^0 -> (0 + undef538), x5^0 -> (0 + undef539), x6^0 -> (0 + undef527)}> (0 + undef610), x1^0 -> (0 + undef615), x2^0 -> (0 + undef616), x3^0 -> (0 + undef617), x4^0 -> (0 + undef617), x5^0 -> (0 + undef621), x6^0 -> (0 + undef622)}> (0 + undef673), x1^0 -> (0 + undef678), x2^0 -> ((((~(1) + (~(1) * undef674)) + (~(1) * undef684)) + (~(1) * undef685)) + (~(1) * undef686)), x3^0 -> (0 + undef678), x4^0 -> (0 + undef675), x5^0 -> (0 + undef676), x6^0 -> (0 + undef677)}> (0 + undef705), x1^0 -> (0 + undef706), x2^0 -> (0 + undef707), x3^0 -> (0 + undef695), x4^0 -> (0 + undef696), x5^0 -> (0 + undef697), x6^0 -> (0 + undef698)}> (0 + undef820), x1^0 -> (0 + undef825), x2^0 -> (0 + undef826), x3^0 -> (0 + undef827), x4^0 -> (~(4) + undef828), x5^0 -> (0 + undef831), x6^0 -> (0 + undef832)}> (0 + undef1), x1^0 -> (0 + undef6), x2^0 -> (0 + undef7), x3^0 -> (0 + undef8), x4^0 -> (0 + undef9), x5^0 -> (0 + undef12), x6^0 -> (0 + undef13)}> (0 + undef820), x1^0 -> (0 + undef825), x2^0 -> (0 + undef826), x3^0 -> (0 + undef827), x4^0 -> (~(4) + undef828), x5^0 -> (0 + undef831), x6^0 -> (0 + undef832)}> (0 + undef705), x1^0 -> (0 + undef706), x2^0 -> (0 + undef707), x3^0 -> (0 + undef695), x4^0 -> (0 + undef696), x5^0 -> (0 + undef697), x6^0 -> (0 + undef698)}> (0 + undef799), x1^0 -> (0 + undef804), x2^0 -> (0 + undef805), x3^0 -> (0 + undef806), x4^0 -> (0 + undef807), x5^0 -> (0 + undef807), x6^0 -> (0 + undef810)}> (0 + undef43), x1^0 -> (0 + undef48), x2^0 -> (0 + undef49), x3^0 -> (~(32) + undef50), x4^0 -> (0 + undef54), x5^0 -> (0 + undef55), x6^0 -> (0 + undef56)}> (0 + undef64), x1^0 -> (0 + undef69), x2^0 -> (0 + undef70), x3^0 -> (0 + undef71), x4^0 -> (0 + undef71), x5^0 -> (0 + undef75), x6^0 -> (0 + undef76)}> (0 + undef85), x1^0 -> (0 + undef90), x2^0 -> (0 + undef91), x3^0 -> (0 + undef92), x4^0 -> (0 + undef96), x5^0 -> (0 + undef97), x6^0 -> (0 + undef98)}> (0 + undef106), x1^0 -> (0 + undef111), x2^0 -> (~(1) + undef112), x3^0 -> (0 + undef117), x4^0 -> (0 + undef118), x5^0 -> (0 + undef119), x6^0 -> (0 + undef107)}> (0 + undef211), x1^0 -> (0 + undef216), x2^0 -> (0 + undef217), x3^0 -> (0 + undef222), x4^0 -> (0 + undef223), x5^0 -> (0 + undef224), x6^0 -> (0 + undef212)}> (0 + undef190), x1^0 -> (0 + undef195), x2^0 -> (0 + undef196), x3^0 -> (0 + undef196), x4^0 -> (0 + undef201), x5^0 -> (0 + undef202), x6^0 -> (0 + undef203)}> (0 + undef190), x1^0 -> (0 + undef195), x2^0 -> (0 + undef196), x3^0 -> (0 + undef196), x4^0 -> (0 + undef201), x5^0 -> (0 + undef202), x6^0 -> (0 + undef203)}> (0 + undef148), x1^0 -> (0 + undef153), x2^0 -> (0 + undef154), x3^0 -> (0 + undef159), x4^0 -> (0 + undef160), x5^0 -> (0 + undef161), x6^0 -> (0 + undef149)}> (0 + undef169), x1^0 -> (0 + undef174), x2^0 -> (0 + undef175), x3^0 -> (0 + undef180), x4^0 -> (0 + undef181), x5^0 -> (0 + undef182), x6^0 -> (0 + undef170)}> (0 + undef264), x1^0 -> (0 + undef265), x2^0 -> (0 + undef266), x3^0 -> (0 + undef254), x4^0 -> (0 + undef255), x5^0 -> (0 + undef256), x6^0 -> (0 + undef257)}> (0 + undef295), x1^0 -> (0 + undef300), x2^0 -> (0 + undef301), x3^0 -> (0 + undef302), x4^0 -> (0 + undef303), x5^0 -> (0 + undef304), x6^0 -> (~(1) + undef305)}> (0 + undef264), x1^0 -> (0 + undef265), x2^0 -> (0 + undef266), x3^0 -> (0 + undef254), x4^0 -> (0 + undef255), x5^0 -> (0 + undef256), x6^0 -> (0 + undef257)}> (0 + undef358), x1^0 -> (0 + undef363), x2^0 -> (0 + undef364), x3^0 -> (0 + undef365), x4^0 -> (0 + undef366), x5^0 -> (0 + undef367), x6^0 -> (0 + undef367)}> (0 + undef379), x1^0 -> (0 + undef384), x2^0 -> (0 + undef385), x3^0 -> (0 + undef386), x4^0 -> (0 + undef387), x5^0 -> (~(4) + undef388), x6^0 -> (0 + undef390)}> (0 + undef400), x1^0 -> (0 + undef405), x2^0 -> (0 + undef406), x3^0 -> (0 + undef407), x4^0 -> (0 + undef408), x5^0 -> (0 + undef409), x6^0 -> (0 + undef411)}> (0 + undef421), x1^0 -> (0 + undef426), x2^0 -> (0 + undef427), x3^0 -> (0 + undef428), x4^0 -> (0 + undef429), x5^0 -> (0 + undef430), x6^0 -> (0 + undef432)}> (0 + undef442), x1^0 -> (0 + undef447), x2^0 -> (0 + undef448), x3^0 -> (0 + undef449), x4^0 -> (~(32) + undef450), x5^0 -> (0 + undef453), x6^0 -> (0 + undef454)}> (0 + undef463), x1^0 -> (0 + undef468), x2^0 -> (0 + undef469), x3^0 -> (0 + undef470), x4^0 -> (0 + undef471), x5^0 -> (0 + undef471), x6^0 -> (0 + undef474)}> (0 + undef484), x1^0 -> (0 + undef489), x2^0 -> (0 + undef490), x3^0 -> (0 + undef491), x4^0 -> (0 + undef492), x5^0 -> (0 + undef495), x6^0 -> (0 + undef496)}> (0 + undef505), x1^0 -> (0 + undef510), x2^0 -> (0 + undef516), x3^0 -> (~(1) + undef512), x4^0 -> (0 + undef517), x5^0 -> (0 + undef518), x6^0 -> (0 + undef506)}> (0 + undef631), x1^0 -> (0 + undef636), x2^0 -> (0 + undef637), x3^0 -> (0 + undef638), x4^0 -> (0 + undef642), x5^0 -> (0 + undef643), x6^0 -> (0 + undef644)}> (0 + undef610), x1^0 -> (0 + undef615), x2^0 -> (0 + undef616), x3^0 -> (0 + undef617), x4^0 -> (0 + undef617), x5^0 -> (0 + undef621), x6^0 -> (0 + undef622)}> (0 + undef610), x1^0 -> (0 + undef615), x2^0 -> (0 + undef616), x3^0 -> (0 + undef617), x4^0 -> (0 + undef617), x5^0 -> (0 + undef621), x6^0 -> (0 + undef622)}> (0 + undef568), x1^0 -> (0 + undef573), x2^0 -> (0 + undef574), x3^0 -> (0 + undef575), x4^0 -> (0 + undef579), x5^0 -> (0 + undef580), x6^0 -> (0 + undef581)}> (0 + undef589), x1^0 -> (0 + undef594), x2^0 -> (0 + undef595), x3^0 -> (0 + undef596), x4^0 -> (0 + undef600), x5^0 -> (0 + undef601), x6^0 -> (0 + undef602)}> (0 + undef705), x1^0 -> (0 + undef706), x2^0 -> (0 + undef707), x3^0 -> (0 + undef695), x4^0 -> (0 + undef696), x5^0 -> (0 + undef697), x6^0 -> (0 + undef698)}> (0 + undef736), x1^0 -> (0 + undef741), x2^0 -> (0 + undef742), x3^0 -> (0 + undef743), x4^0 -> (0 + undef744), x5^0 -> (~(1) + undef745), x6^0 -> (0 + undef747)}> Fresh variables: undef1, undef6, undef7, undef8, undef9, undef12, undef13, undef22, undef27, undef28, undef29, undef30, undef33, undef34, undef43, undef48, undef49, undef50, undef54, undef55, undef56, undef64, undef69, undef70, undef71, undef75, undef76, undef85, undef90, undef91, undef92, undef96, undef97, undef98, undef106, undef107, undef111, undef112, undef117, undef118, undef119, undef127, undef128, undef129, undef132, undef133, undef138, undef139, undef140, undef148, undef149, undef150, undef153, undef154, undef159, undef160, undef161, undef169, undef170, undef171, undef174, undef175, undef180, undef181, undef182, undef190, undef195, undef196, undef201, undef202, undef203, undef211, undef212, undef216, undef217, undef222, undef223, undef224, undef232, undef233, undef237, undef238, undef243, undef244, undef245, undef254, undef255, undef256, undef257, undef264, undef265, undef266, undef274, undef279, undef280, undef281, undef282, undef283, undef284, undef295, undef300, undef301, undef302, undef303, undef304, undef305, undef337, undef342, undef343, undef344, undef345, undef346, undef348, undef358, undef363, undef364, undef365, undef366, undef367, undef379, undef384, undef385, undef386, undef387, undef388, undef390, undef400, undef405, undef406, undef407, undef408, undef409, undef411, undef421, undef426, undef427, undef428, undef429, undef430, undef432, undef442, undef447, undef448, undef449, undef450, undef453, undef454, undef463, undef468, undef469, undef470, undef471, undef474, undef484, undef489, undef490, undef491, undef492, undef495, undef496, undef505, undef506, undef510, undef512, undef516, undef517, undef518, undef526, undef527, undef531, undef537, undef538, undef539, undef547, undef548, undef552, undef553, undef554, undef558, undef559, undef560, undef568, undef569, undef573, undef574, undef575, undef579, undef580, undef581, undef589, undef590, undef594, undef595, undef596, undef600, undef601, undef602, undef610, undef615, undef616, undef617, undef621, undef622, undef631, undef636, undef637, undef638, undef642, undef643, undef644, undef652, undef657, undef658, undef659, undef663, undef664, undef665, undef673, undef674, undef675, undef676, undef677, undef678, undef684, undef685, undef686, undef695, undef696, undef697, undef698, undef705, undef706, undef707, undef715, undef720, undef721, undef722, undef723, undef724, undef726, undef736, undef741, undef742, undef743, undef744, undef745, undef747, undef778, undef783, undef784, undef785, undef786, undef789, undef790, undef799, undef804, undef805, undef806, undef807, undef810, undef820, undef825, undef826, undef827, undef828, undef831, undef832, undef842, undef843, undef844, undef845, undef852, undef853, undef854, undef862, undef863, undef864, undef867, undef873, undef874, undef875, undef883, undef884, undef885, undef888, undef894, undef895, undef896, Undef variables: undef1, undef6, undef7, undef8, undef9, undef12, undef13, undef22, undef27, undef28, undef29, undef30, undef33, undef34, undef43, undef48, undef49, undef50, undef54, undef55, undef56, undef64, undef69, undef70, undef71, undef75, undef76, undef85, undef90, undef91, undef92, undef96, undef97, undef98, undef106, undef107, undef111, undef112, undef117, undef118, undef119, undef127, undef128, undef129, undef132, undef133, undef138, undef139, undef140, undef148, undef149, undef150, undef153, undef154, undef159, undef160, undef161, undef169, undef170, undef171, undef174, undef175, undef180, undef181, undef182, undef190, undef195, undef196, undef201, undef202, undef203, undef211, undef212, undef216, undef217, undef222, undef223, undef224, undef232, undef233, undef237, undef238, undef243, undef244, undef245, undef254, undef255, undef256, undef257, undef264, undef265, undef266, undef274, undef279, undef280, undef281, undef282, undef283, undef284, undef295, undef300, undef301, undef302, undef303, undef304, undef305, undef337, undef342, undef343, undef344, undef345, undef346, undef348, undef358, undef363, undef364, undef365, undef366, undef367, undef379, undef384, undef385, undef386, undef387, undef388, undef390, undef400, undef405, undef406, undef407, undef408, undef409, undef411, undef421, undef426, undef427, undef428, undef429, undef430, undef432, undef442, undef447, undef448, undef449, undef450, undef453, undef454, undef463, undef468, undef469, undef470, undef471, undef474, undef484, undef489, undef490, undef491, undef492, undef495, undef496, undef505, undef506, undef510, undef512, undef516, undef517, undef518, undef526, undef527, undef531, undef537, undef538, undef539, undef547, undef548, undef552, undef553, undef554, undef558, undef559, undef560, undef568, undef569, undef573, undef574, undef575, undef579, undef580, undef581, undef589, undef590, undef594, undef595, undef596, undef600, undef601, undef602, undef610, undef615, undef616, undef617, undef621, undef622, undef631, undef636, undef637, undef638, undef642, undef643, undef644, undef652, undef657, undef658, undef659, undef663, undef664, undef665, undef673, undef674, undef675, undef676, undef677, undef678, undef684, undef685, undef686, undef695, undef696, undef697, undef698, undef705, undef706, undef707, undef715, undef720, undef721, undef722, undef723, undef724, undef726, undef736, undef741, undef742, undef743, undef744, undef745, undef747, undef778, undef783, undef784, undef785, undef786, undef789, undef790, undef799, undef804, undef805, undef806, undef807, undef810, undef820, undef825, undef826, undef827, undef828, undef831, undef832, undef842, undef843, undef844, undef845, undef852, undef853, undef854, undef862, undef863, undef864, undef867, undef873, undef874, undef875, undef883, undef884, undef885, undef888, undef894, undef895, undef896, Abstraction variables: Exit nodes: Accepting locations: Asserts: ************************************************************* ******************************************************************************************* *********************** WORKING TRANSITION SYSTEM (DAG) *********************** ******************************************************************************************* Init Location: 0 Graph 0: Transitions: Variables: Graph 1: Transitions: undef106, x1^0 -> undef111, x2^0 -> -1 + undef112, x3^0 -> undef117, x4^0 -> undef118, x5^0 -> undef119, x6^0 -> undef107, rest remain the same}> undef211, x1^0 -> undef216, x2^0 -> undef217, x3^0 -> undef222, x4^0 -> undef223, x5^0 -> undef224, x6^0 -> undef212, rest remain the same}> undef148, x1^0 -> undef153, x2^0 -> undef154, x3^0 -> undef159, x4^0 -> undef160, x5^0 -> undef161, x6^0 -> undef149, rest remain the same}> undef169, x1^0 -> undef174, x2^0 -> undef175, x3^0 -> undef180, x4^0 -> undef181, x5^0 -> undef182, x6^0 -> undef170, rest remain the same}> Variables: x0^0, x1^0, x2^0, x3^0, x4^0, x5^0, x6^0 Graph 2: Transitions: undef43, x1^0 -> undef48, x2^0 -> undef49, x3^0 -> -32 + undef50, x4^0 -> undef54, x5^0 -> undef55, x6^0 -> undef56, rest remain the same}> undef85, x1^0 -> undef90, x2^0 -> undef91, x3^0 -> undef92, x4^0 -> undef96, x5^0 -> undef97, x6^0 -> undef98, rest remain the same}> Variables: x0^0, x1^0, x2^0, x3^0, x4^0, x5^0, x6^0 Graph 3: Transitions: undef820, x1^0 -> undef825, x2^0 -> undef826, x3^0 -> undef827, x4^0 -> -4 + undef828, x5^0 -> undef831, x6^0 -> undef832, rest remain the same}> Variables: x0^0, x1^0, x2^0, x3^0, x4^0, x5^0, x6^0 Graph 4: Transitions: Variables: Graph 5: Transitions: undef736, x1^0 -> undef741, x2^0 -> undef742, x3^0 -> undef743, x4^0 -> undef744, x5^0 -> -1 + undef745, x6^0 -> undef747, rest remain the same}> Variables: x0^0, x1^0, x2^0, x3^0, x4^0, x5^0, x6^0 Graph 6: Transitions: Variables: Graph 7: Transitions: undef505, x1^0 -> undef510, x2^0 -> undef516, x3^0 -> -1 + undef512, x4^0 -> undef517, x5^0 -> undef518, x6^0 -> undef506, rest remain the same}> undef631, x1^0 -> undef636, x2^0 -> undef637, x3^0 -> undef638, x4^0 -> undef642, x5^0 -> undef643, x6^0 -> undef644, rest remain the same}> undef568, x1^0 -> undef573, x2^0 -> undef574, x3^0 -> undef575, x4^0 -> undef579, x5^0 -> undef580, x6^0 -> undef581, rest remain the same}> undef589, x1^0 -> undef594, x2^0 -> undef595, x3^0 -> undef596, x4^0 -> undef600, x5^0 -> undef601, x6^0 -> undef602, rest remain the same}> Variables: x0^0, x1^0, x2^0, x3^0, x4^0, x5^0, x6^0 Graph 8: Transitions: undef442, x1^0 -> undef447, x2^0 -> undef448, x3^0 -> undef449, x4^0 -> -32 + undef450, x5^0 -> undef453, x6^0 -> undef454, rest remain the same}> undef484, x1^0 -> undef489, x2^0 -> undef490, x3^0 -> undef491, x4^0 -> undef492, x5^0 -> undef495, x6^0 -> undef496, rest remain the same}> Variables: x0^0, x1^0, x2^0, x3^0, x4^0, x5^0, x6^0 Graph 9: Transitions: undef379, x1^0 -> undef384, x2^0 -> undef385, x3^0 -> undef386, x4^0 -> undef387, x5^0 -> -4 + undef388, x6^0 -> undef390, rest remain the same}> undef421, x1^0 -> undef426, x2^0 -> undef427, x3^0 -> undef428, x4^0 -> undef429, x5^0 -> undef430, x6^0 -> undef432, rest remain the same}> Variables: x0^0, x1^0, x2^0, x3^0, x4^0, x5^0, x6^0 Graph 10: Transitions: Variables: Graph 11: Transitions: undef295, x1^0 -> undef300, x2^0 -> undef301, x3^0 -> undef302, x4^0 -> undef303, x5^0 -> undef304, x6^0 -> -1 + undef305, rest remain the same}> Variables: x0^0, x1^0, x2^0, x3^0, x4^0, x5^0, x6^0 Graph 12: Transitions: Variables: Graph 13: Transitions: Variables: Precedence: Graph 0 Graph 1 undef526, x1^0 -> undef531, x2^0 -> undef531, x3^0 -> undef537, x4^0 -> undef538, x5^0 -> undef539, x6^0 -> undef527, rest remain the same}> undef526, x1^0 -> undef531, x2^0 -> undef531, x3^0 -> undef537, x4^0 -> undef538, x5^0 -> undef539, x6^0 -> undef527, rest remain the same}> Graph 2 undef190, x1^0 -> undef195, x2^0 -> undef196, x3^0 -> undef196, x4^0 -> undef201, x5^0 -> undef202, x6^0 -> undef203, rest remain the same}> undef190, x1^0 -> undef195, x2^0 -> undef196, x3^0 -> undef196, x4^0 -> undef201, x5^0 -> undef202, x6^0 -> undef203, rest remain the same}> undef190, x1^0 -> undef195, x2^0 -> undef196, x3^0 -> undef196, x4^0 -> undef201, x5^0 -> undef202, x6^0 -> undef203, rest remain the same}> Graph 3 undef820, x1^0 -> undef825, x2^0 -> undef826, x3^0 -> undef827, x4^0 -> -4 + undef828, x5^0 -> undef831, x6^0 -> undef832, rest remain the same}> undef64, x1^0 -> undef69, x2^0 -> undef70, x3^0 -> undef71, x4^0 -> undef71, x5^0 -> undef75, x6^0 -> undef76, rest remain the same}> Graph 4 undef1, x1^0 -> undef6, x2^0 -> undef7, x3^0 -> undef8, x4^0 -> undef9, x5^0 -> undef12, x6^0 -> undef13, rest remain the same}> Graph 5 undef799, x1^0 -> undef804, x2^0 -> undef805, x3^0 -> undef806, x4^0 -> undef807, x5^0 -> undef807, x6^0 -> undef810, rest remain the same}> Graph 6 undef705, x1^0 -> undef706, x2^0 -> undef707, x3^0 -> undef695, x4^0 -> undef696, x5^0 -> undef697, x6^0 -> undef698, rest remain the same}> undef705, x1^0 -> undef706, x2^0 -> undef707, x3^0 -> undef695, x4^0 -> undef696, x5^0 -> undef697, x6^0 -> undef698, rest remain the same}> undef705, x1^0 -> undef706, x2^0 -> undef707, x3^0 -> undef695, x4^0 -> undef696, x5^0 -> undef697, x6^0 -> undef698, rest remain the same}> Graph 7 undef673, x1^0 -> undef678, x2^0 -> -1 - undef674 - undef684 - undef685 - undef686, x3^0 -> undef678, x4^0 -> undef675, x5^0 -> undef676, x6^0 -> undef677, rest remain the same}> undef673, x1^0 -> undef678, x2^0 -> -1 - undef674 - undef684 - undef685 - undef686, x3^0 -> undef678, x4^0 -> undef675, x5^0 -> undef676, x6^0 -> undef677, rest remain the same}> Graph 8 undef610, x1^0 -> undef615, x2^0 -> undef616, x3^0 -> undef617, x4^0 -> undef617, x5^0 -> undef621, x6^0 -> undef622, rest remain the same}> undef610, x1^0 -> undef615, x2^0 -> undef616, x3^0 -> undef617, x4^0 -> undef617, x5^0 -> undef621, x6^0 -> undef622, rest remain the same}> undef610, x1^0 -> undef615, x2^0 -> undef616, x3^0 -> undef617, x4^0 -> undef617, x5^0 -> undef621, x6^0 -> undef622, rest remain the same}> Graph 9 undef463, x1^0 -> undef468, x2^0 -> undef469, x3^0 -> undef470, x4^0 -> undef471, x5^0 -> undef471, x6^0 -> undef474, rest remain the same}> Graph 10 undef400, x1^0 -> undef405, x2^0 -> undef406, x3^0 -> undef407, x4^0 -> undef408, x5^0 -> undef409, x6^0 -> undef411, rest remain the same}> Graph 11 undef358, x1^0 -> undef363, x2^0 -> undef364, x3^0 -> undef365, x4^0 -> undef366, x5^0 -> undef367, x6^0 -> undef367, rest remain the same}> Graph 12 undef264, x1^0 -> undef265, x2^0 -> undef266, x3^0 -> undef254, x4^0 -> undef255, x5^0 -> undef256, x6^0 -> undef257, rest remain the same}> undef264, x1^0 -> undef265, x2^0 -> undef266, x3^0 -> undef254, x4^0 -> undef255, x5^0 -> undef256, x6^0 -> undef257, rest remain the same}> undef264, x1^0 -> undef265, x2^0 -> undef266, x3^0 -> undef254, x4^0 -> undef255, x5^0 -> undef256, x6^0 -> undef257, rest remain the same}> Graph 13 undef852, x1^0 -> undef853, x2^0 -> undef854, x3^0 -> undef842, x4^0 -> undef843, x5^0 -> undef844, x6^0 -> undef845, rest remain the same}> Map Locations to Subgraph: ( 0 , 0 ) ( 1 , 3 ) ( 2 , 4 ) ( 4 , 2 ) ( 5 , 2 ) ( 6 , 1 ) ( 7 , 1 ) ( 8 , 1 ) ( 11 , 12 ) ( 12 , 11 ) ( 14 , 10 ) ( 15 , 9 ) ( 16 , 9 ) ( 17 , 8 ) ( 18 , 8 ) ( 19 , 7 ) ( 20 , 7 ) ( 22 , 7 ) ( 26 , 6 ) ( 27 , 5 ) ( 30 , 13 ) ******************************************************************************************* ******************************** CHECKING ASSERTIONS ******************************** ******************************************************************************************* Proving termination of subgraph 0 Proving termination of subgraph 1 Checking unfeasibility... Time used: 0.020535 Checking conditional termination of SCC {l6, l7, l8}... LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.004035s LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.014145s [28453 : 28454] [28453 : 28455] Successful child: 28454 [ Invariant Graph ] Strengthening and disabling transitions... LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Strengthening transition (result): undef106, x1^0 -> undef111, x2^0 -> -1 + undef112, x3^0 -> undef117, x4^0 -> undef118, x5^0 -> undef119, x6^0 -> undef107, rest remain the same}> LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Strengthening transition (result): undef148, x1^0 -> undef153, x2^0 -> undef154, x3^0 -> undef159, x4^0 -> undef160, x5^0 -> undef161, x6^0 -> undef149, rest remain the same}> LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Strengthening transition (result): undef169, x1^0 -> undef174, x2^0 -> undef175, x3^0 -> undef180, x4^0 -> undef181, x5^0 -> undef182, x6^0 -> undef170, rest remain the same}> [ Termination Graph ] Strengthening and disabling transitions... LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Strengthening transition (result): undef106, x1^0 -> undef111, x2^0 -> -1 + undef112, x3^0 -> undef117, x4^0 -> undef118, x5^0 -> undef119, x6^0 -> undef107, rest remain the same}> LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Strengthening transition (result): undef148, x1^0 -> undef153, x2^0 -> undef154, x3^0 -> undef159, x4^0 -> undef160, x5^0 -> undef161, x6^0 -> undef149, rest remain the same}> LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Strengthening transition (result): undef169, x1^0 -> undef174, x2^0 -> undef175, x3^0 -> undef180, x4^0 -> undef181, x5^0 -> undef182, x6^0 -> undef170, rest remain the same}> Ranking function: 121 + x2^0 New Graphs: [28453 : 28459] [28453 : 28460] INVARIANTS: 6: 8: Quasi-INVARIANTS to narrow Graph: 6: 0 <= 121 + x2^0 , 8: 0 <= 121 + x2^0 , Narrowing transition: undef106, x1^0 -> undef111, x2^0 -> -1 + undef112, x3^0 -> undef117, x4^0 -> undef118, x5^0 -> undef119, x6^0 -> undef107, rest remain the same}> LOG: Narrow transition size 1 It's unfeasible. Removing transition: undef211, x1^0 -> undef216, x2^0 -> undef217, x3^0 -> undef222, x4^0 -> undef223, x5^0 -> undef224, x6^0 -> undef212, rest remain the same}> Narrowing transition: undef148, x1^0 -> undef153, x2^0 -> undef154, x3^0 -> undef159, x4^0 -> undef160, x5^0 -> undef161, x6^0 -> undef149, rest remain the same}> LOG: Narrow transition size 1 Narrowing transition: undef169, x1^0 -> undef174, x2^0 -> undef175, x3^0 -> undef180, x4^0 -> undef181, x5^0 -> undef182, x6^0 -> undef170, rest remain the same}> LOG: Narrow transition size 1 invGraph after Narrowing: Transitions: undef106, x1^0 -> undef111, x2^0 -> -1 + undef112, x3^0 -> undef117, x4^0 -> undef118, x5^0 -> undef119, x6^0 -> undef107, rest remain the same}> undef148, x1^0 -> undef153, x2^0 -> undef154, x3^0 -> undef159, x4^0 -> undef160, x5^0 -> undef161, x6^0 -> undef149, rest remain the same}> undef169, x1^0 -> undef174, x2^0 -> undef175, x3^0 -> undef180, x4^0 -> undef181, x5^0 -> undef182, x6^0 -> undef170, rest remain the same}> Variables: x0^0, x1^0, x2^0, x3^0, x4^0, x5^0, x6^0 Proving termination of subgraph 2 Checking unfeasibility... Time used: 0.012642 Checking conditional termination of SCC {l4, l5}... LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.002567s LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.008731s [28453 : 28461] [28453 : 28462] Successful child: 28461 [ Invariant Graph ] Strengthening and disabling transitions... LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Strengthening transition (result): undef43, x1^0 -> undef48, x2^0 -> undef49, x3^0 -> -32 + undef50, x4^0 -> undef54, x5^0 -> undef55, x6^0 -> undef56, rest remain the same}> LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility [ Termination Graph ] Strengthening and disabling transitions... LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Strengthening transition (result): undef43, x1^0 -> undef48, x2^0 -> undef49, x3^0 -> -32 + undef50, x4^0 -> undef54, x5^0 -> undef55, x6^0 -> undef56, rest remain the same}> LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Ranking function: 126 + x3^0 New Graphs: LOG: CALL check - Post:0 <= 126 + x3^0 - Process 1 * Exit transition: * Postcondition : 0 <= 126 + x3^0 LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.001158s > Postcondition is not implied! LOG: RETURN check - Elapsed time: 0.001225s INVARIANTS: 4: Quasi-INVARIANTS to narrow Graph: 4: 0 <= 126 + x3^0 , Narrowing transition: undef43, x1^0 -> undef48, x2^0 -> undef49, x3^0 -> -32 + undef50, x4^0 -> undef54, x5^0 -> undef55, x6^0 -> undef56, rest remain the same}> LOG: Narrow transition size 1 It's unfeasible. Removing transition: undef85, x1^0 -> undef90, x2^0 -> undef91, x3^0 -> undef92, x4^0 -> undef96, x5^0 -> undef97, x6^0 -> undef98, rest remain the same}> invGraph after Narrowing: Transitions: undef43, x1^0 -> undef48, x2^0 -> undef49, x3^0 -> -32 + undef50, x4^0 -> undef54, x5^0 -> undef55, x6^0 -> undef56, rest remain the same}> Variables: x0^0, x1^0, x2^0, x3^0, x4^0, x5^0, x6^0 Proving termination of subgraph 3 Checking unfeasibility... Time used: 0.00683 Checking conditional termination of SCC {l1}... LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.003602s Ranking function: -1 + (1 / 4)*x4^0 New Graphs: Proving termination of subgraph 4 Analyzing SCC {l2}... No cycles found. Proving termination of subgraph 5 Checking unfeasibility... Time used: 0.004865 Checking conditional termination of SCC {l27}... LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.003122s Ranking function: -2 + x5^0 New Graphs: Proving termination of subgraph 6 Analyzing SCC {l26}... No cycles found. Proving termination of subgraph 7 Checking unfeasibility... Time used: 0.019214 Checking conditional termination of SCC {l19, l20, l22}... LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.004790s LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.018048s [28453 : 28466] [28453 : 28467] Successful child: 28466 [ Invariant Graph ] Strengthening and disabling transitions... LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Strengthening transition (result): undef505, x1^0 -> undef510, x2^0 -> undef516, x3^0 -> -1 + undef512, x4^0 -> undef517, x5^0 -> undef518, x6^0 -> undef506, rest remain the same}> LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Strengthening transition (result): undef568, x1^0 -> undef573, x2^0 -> undef574, x3^0 -> undef575, x4^0 -> undef579, x5^0 -> undef580, x6^0 -> undef581, rest remain the same}> LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Strengthening transition (result): undef589, x1^0 -> undef594, x2^0 -> undef595, x3^0 -> undef596, x4^0 -> undef600, x5^0 -> undef601, x6^0 -> undef602, rest remain the same}> [ Termination Graph ] Strengthening and disabling transitions... LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Strengthening transition (result): undef505, x1^0 -> undef510, x2^0 -> undef516, x3^0 -> -1 + undef512, x4^0 -> undef517, x5^0 -> undef518, x6^0 -> undef506, rest remain the same}> LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Strengthening transition (result): undef568, x1^0 -> undef573, x2^0 -> undef574, x3^0 -> undef575, x4^0 -> undef579, x5^0 -> undef580, x6^0 -> undef581, rest remain the same}> LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Strengthening transition (result): undef589, x1^0 -> undef594, x2^0 -> undef595, x3^0 -> undef596, x4^0 -> undef600, x5^0 -> undef601, x6^0 -> undef602, rest remain the same}> Ranking function: 102 + x3^0 New Graphs: [28453 : 28471] [28453 : 28472] INVARIANTS: 19: 22: Quasi-INVARIANTS to narrow Graph: 19: 0 <= 102 + x3^0 , 22: 1 <= x3^0 , Narrowing transition: undef505, x1^0 -> undef510, x2^0 -> undef516, x3^0 -> -1 + undef512, x4^0 -> undef517, x5^0 -> undef518, x6^0 -> undef506, rest remain the same}> LOG: Narrow transition size 1 It's unfeasible. Removing transition: undef631, x1^0 -> undef636, x2^0 -> undef637, x3^0 -> undef638, x4^0 -> undef642, x5^0 -> undef643, x6^0 -> undef644, rest remain the same}> Narrowing transition: undef568, x1^0 -> undef573, x2^0 -> undef574, x3^0 -> undef575, x4^0 -> undef579, x5^0 -> undef580, x6^0 -> undef581, rest remain the same}> LOG: Narrow transition size 1 Narrowing transition: undef589, x1^0 -> undef594, x2^0 -> undef595, x3^0 -> undef596, x4^0 -> undef600, x5^0 -> undef601, x6^0 -> undef602, rest remain the same}> LOG: Narrow transition size 1 invGraph after Narrowing: Transitions: undef505, x1^0 -> undef510, x2^0 -> undef516, x3^0 -> -1 + undef512, x4^0 -> undef517, x5^0 -> undef518, x6^0 -> undef506, rest remain the same}> undef568, x1^0 -> undef573, x2^0 -> undef574, x3^0 -> undef575, x4^0 -> undef579, x5^0 -> undef580, x6^0 -> undef581, rest remain the same}> undef589, x1^0 -> undef594, x2^0 -> undef595, x3^0 -> undef596, x4^0 -> undef600, x5^0 -> undef601, x6^0 -> undef602, rest remain the same}> Variables: x0^0, x1^0, x2^0, x3^0, x4^0, x5^0, x6^0 Proving termination of subgraph 8 Checking unfeasibility... Time used: 0.014549 Checking conditional termination of SCC {l17, l18}... LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.002946s LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.009537s [28453 : 28473] [28453 : 28474] Successful child: 28473 [ Invariant Graph ] Strengthening and disabling transitions... LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Strengthening transition (result): undef442, x1^0 -> undef447, x2^0 -> undef448, x3^0 -> undef449, x4^0 -> -32 + undef450, x5^0 -> undef453, x6^0 -> undef454, rest remain the same}> LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility [ Termination Graph ] Strengthening and disabling transitions... LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Strengthening transition (result): undef442, x1^0 -> undef447, x2^0 -> undef448, x3^0 -> undef449, x4^0 -> -32 + undef450, x5^0 -> undef453, x6^0 -> undef454, rest remain the same}> LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Ranking function: 98 + x4^0 New Graphs: LOG: CALL check - Post:0 <= 98 + x4^0 - Process 2 * Exit transition: * Postcondition : 0 <= 98 + x4^0 LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.001507s > Postcondition is not implied! LOG: RETURN check - Elapsed time: 0.001570s INVARIANTS: 17: Quasi-INVARIANTS to narrow Graph: 17: 0 <= 98 + x4^0 , Narrowing transition: undef442, x1^0 -> undef447, x2^0 -> undef448, x3^0 -> undef449, x4^0 -> -32 + undef450, x5^0 -> undef453, x6^0 -> undef454, rest remain the same}> LOG: Narrow transition size 1 It's unfeasible. Removing transition: undef484, x1^0 -> undef489, x2^0 -> undef490, x3^0 -> undef491, x4^0 -> undef492, x5^0 -> undef495, x6^0 -> undef496, rest remain the same}> invGraph after Narrowing: Transitions: undef442, x1^0 -> undef447, x2^0 -> undef448, x3^0 -> undef449, x4^0 -> -32 + undef450, x5^0 -> undef453, x6^0 -> undef454, rest remain the same}> Variables: x0^0, x1^0, x2^0, x3^0, x4^0, x5^0, x6^0 Proving termination of subgraph 9 Checking unfeasibility... Time used: 0.011799 Checking conditional termination of SCC {l15, l16}... LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.003024s LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.010746s [28453 : 28486] [28453 : 28487] Successful child: 28486 [ Invariant Graph ] Strengthening and disabling transitions... LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Strengthening transition (result): undef379, x1^0 -> undef384, x2^0 -> undef385, x3^0 -> undef386, x4^0 -> undef387, x5^0 -> -4 + undef388, x6^0 -> undef390, rest remain the same}> LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility [ Termination Graph ] Strengthening and disabling transitions... LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Strengthening transition (result): undef379, x1^0 -> undef384, x2^0 -> undef385, x3^0 -> undef386, x4^0 -> undef387, x5^0 -> -4 + undef388, x6^0 -> undef390, rest remain the same}> LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Ranking function: 107 + x5^0 New Graphs: LOG: CALL check - Post:0 <= 107 + x5^0 - Process 3 * Exit transition: * Postcondition : 0 <= 107 + x5^0 LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.001606s > Postcondition is not implied! LOG: RETURN check - Elapsed time: 0.001670s INVARIANTS: 15: Quasi-INVARIANTS to narrow Graph: 15: 0 <= 107 + x5^0 , Narrowing transition: undef379, x1^0 -> undef384, x2^0 -> undef385, x3^0 -> undef386, x4^0 -> undef387, x5^0 -> -4 + undef388, x6^0 -> undef390, rest remain the same}> LOG: Narrow transition size 1 It's unfeasible. Removing transition: undef421, x1^0 -> undef426, x2^0 -> undef427, x3^0 -> undef428, x4^0 -> undef429, x5^0 -> undef430, x6^0 -> undef432, rest remain the same}> invGraph after Narrowing: Transitions: undef379, x1^0 -> undef384, x2^0 -> undef385, x3^0 -> undef386, x4^0 -> undef387, x5^0 -> -4 + undef388, x6^0 -> undef390, rest remain the same}> Variables: x0^0, x1^0, x2^0, x3^0, x4^0, x5^0, x6^0 Proving termination of subgraph 10 Analyzing SCC {l14}... No cycles found. Proving termination of subgraph 11 Checking unfeasibility... Time used: 0.006206 Checking conditional termination of SCC {l12}... LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.004129s Ranking function: -2 + x6^0 New Graphs: Proving termination of subgraph 12 Analyzing SCC {l11}... No cycles found. Proving termination of subgraph 13 Analyzing SCC {l30}... No cycles found. Program Terminates