/export/starexec/sandbox/solver/bin/starexec_run_termcomp17 /export/starexec/sandbox/benchmark/theBenchmark.smt2 /export/starexec/sandbox/output/output_files -------------------------------------------------------------------------------- YES Solver Timeout: 4 Global Timeout: 300 Maximum number of concurrent processes: 900 No parsing errors! Init Location: 0 Transitions: undef1, oldX10^0 -> undef2, oldX1^0 -> undef9, oldX2^0 -> undef10, oldX3^0 -> undef11, oldX4^0 -> undef12, oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> (0 + x7^0), oldX8^0 -> undef16, oldX9^0 -> undef17, x0^0 -> (0 + undef1), x1^0 -> (0 + undef9), x2^0 -> (0 + undef10), x3^0 -> (0 + undef11), x4^0 -> (0 + undef12), x5^0 -> (0 + undef16), x6^0 -> (0 + undef17), x7^0 -> (0 + undef2)}> undef26, oldX10^0 -> undef27, oldX1^0 -> undef34, oldX2^0 -> undef35, oldX3^0 -> undef36, oldX4^0 -> undef37, oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> (0 + x7^0), oldX8^0 -> undef41, oldX9^0 -> undef42, x0^0 -> (0 + undef26), x1^0 -> (0 + undef34), x2^0 -> (0 + undef35), x3^0 -> (0 + undef36), x4^0 -> (0 + undef37), x5^0 -> (0 + undef41), x6^0 -> (0 + undef42), x7^0 -> (0 + undef27)}> undef51, oldX1^0 -> undef59, oldX2^0 -> undef60, oldX3^0 -> undef61, oldX4^0 -> undef62, oldX5^0 -> undef63, oldX6^0 -> (0 + x6^0), oldX7^0 -> (0 + x7^0), oldX8^0 -> undef66, x0^0 -> (0 + undef51), x1^0 -> (0 + undef59), x2^0 -> (0 + undef60), x3^0 -> (0 + undef61), x4^0 -> (0 + undef62), x5^0 -> (0 + undef63), x6^0 -> (~(1) + undef62), x7^0 -> (0 + undef66)}> undef76, oldX1^0 -> undef84, oldX2^0 -> undef85, oldX3^0 -> undef86, oldX4^0 -> undef87, oldX5^0 -> undef88, oldX6^0 -> (0 + x6^0), oldX7^0 -> (0 + x7^0), oldX8^0 -> undef91, x0^0 -> (0 + undef76), x1^0 -> (0 + undef84), x2^0 -> (0 + undef85), x3^0 -> (0 + undef86), x4^0 -> (0 + undef87), x5^0 -> (0 + undef88), x6^0 -> (~(1) + undef87), x7^0 -> (0 + undef91)}> undef101, oldX10^0 -> undef102, oldX1^0 -> undef109, oldX2^0 -> undef110, oldX3^0 -> undef111, oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> (0 + x7^0), oldX8^0 -> undef116, oldX9^0 -> undef117, x0^0 -> (0 + undef101), x1^0 -> (0 + undef109), x2^0 -> (0 + undef110), x3^0 -> (0 + undef111), x4^0 -> (0 + undef109), x5^0 -> (0 + undef116), x6^0 -> (0 + undef117), x7^0 -> (0 + undef102)}> undef126, oldX1^0 -> undef134, oldX2^0 -> undef135, oldX3^0 -> undef136, oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> (0 + x7^0), oldX8^0 -> undef141, oldX9^0 -> undef142, x0^0 -> (0 + undef126), x1^0 -> (0 + undef134), x2^0 -> (0 + undef135), x3^0 -> (0 + undef136), x4^0 -> (0 + undef134), x5^0 -> (0 + undef136), x6^0 -> (0 + undef141), x7^0 -> (0 + undef142)}> (0 + x0^0), oldX10^0 -> undef152, oldX11^0 -> undef153, oldX12^0 -> undef154, oldX13^0 -> undef155, oldX14^0 -> undef156, oldX15^0 -> undef157, 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 -> (0 + x7^0), oldX8^0 -> undef166, oldX9^0 -> undef167, x0^0 -> (0 + undef166), x1^0 -> (0 + undef167), x2^0 -> (0 + undef152), x3^0 -> (0 + undef153), x4^0 -> (0 + undef154), x5^0 -> (0 + undef155), x6^0 -> (0 + undef156), x7^0 -> (0 + undef157)}> undef176, oldX10^0 -> undef177, oldX11^0 -> undef178, oldX1^0 -> undef184, oldX2^0 -> undef185, oldX3^0 -> undef186, oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> (0 + x7^0), oldX8^0 -> undef191, oldX9^0 -> undef192, x0^0 -> (0 + undef176), x1^0 -> (0 + undef184), x2^0 -> (0 + undef185), x3^0 -> (0 + undef186), x4^0 -> (0 + undef191), x5^0 -> (0 + undef192), x6^0 -> (0 + undef177), x7^0 -> (0 + undef178)}> undef201, oldX10^0 -> undef202, oldX11^0 -> undef203, oldX1^0 -> undef209, oldX2^0 -> undef210, oldX3^0 -> undef211, oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> (0 + x7^0), oldX8^0 -> undef216, oldX9^0 -> undef217, x0^0 -> (0 + undef201), x1^0 -> (0 + undef209), x2^0 -> (0 + undef210), x3^0 -> (0 + undef211), x4^0 -> (0 + undef216), x5^0 -> (0 + undef217), x6^0 -> (0 + undef202), x7^0 -> (0 + undef203)}> (0 + x0^0), oldX10^0 -> undef227, oldX11^0 -> undef228, oldX12^0 -> undef229, oldX13^0 -> undef230, oldX14^0 -> undef231, oldX15^0 -> undef232, oldX16^0 -> undef233, oldX1^0 -> (0 + x1^0), oldX2^0 -> undef235, oldX3^0 -> undef236, oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> (0 + x7^0), oldX8^0 -> undef241, oldX9^0 -> undef242, x0^0 -> (0 + undef241), x1^0 -> (0 + undef242), x2^0 -> (0 + undef227), x3^0 -> (0 + undef228), x4^0 -> (0 + undef229), x5^0 -> (0 + undef230), x6^0 -> (0 + undef231), x7^0 -> (0 + undef232)}> (0 + x0^0), oldX10^0 -> undef252, oldX11^0 -> undef253, oldX12^0 -> undef254, oldX13^0 -> undef255, oldX14^0 -> undef256, oldX15^0 -> undef257, oldX16^0 -> undef258, oldX1^0 -> (0 + x1^0), oldX2^0 -> undef260, oldX3^0 -> undef261, oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> (0 + x7^0), oldX8^0 -> undef266, oldX9^0 -> undef267, x0^0 -> (0 + undef266), x1^0 -> (0 + undef267), x2^0 -> (0 + undef252), x3^0 -> (0 + undef253), x4^0 -> (0 + undef254), x5^0 -> (0 + undef255), x6^0 -> (0 + undef256), x7^0 -> (0 + undef257)}> (0 + x0^0), oldX10^0 -> undef277, oldX11^0 -> undef278, oldX12^0 -> undef279, oldX13^0 -> undef280, oldX14^0 -> undef281, oldX15^0 -> undef282, oldX16^0 -> undef283, oldX1^0 -> (0 + x1^0), oldX2^0 -> undef285, oldX3^0 -> undef286, oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> (0 + x7^0), oldX8^0 -> undef291, oldX9^0 -> undef292, x0^0 -> (0 + undef291), x1^0 -> (0 + undef292), x2^0 -> (0 + undef277), x3^0 -> (0 + undef278), x4^0 -> (0 + undef279), x5^0 -> (0 + undef280), x6^0 -> (0 + undef281), x7^0 -> (0 + undef282)}> (0 + x0^0), oldX10^0 -> undef302, oldX11^0 -> undef303, oldX12^0 -> undef304, oldX13^0 -> undef305, oldX14^0 -> undef306, oldX15^0 -> undef307, oldX16^0 -> undef308, oldX1^0 -> (0 + x1^0), oldX2^0 -> undef310, oldX3^0 -> undef311, oldX4^0 -> (0 + x4^0), oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> (0 + x7^0), oldX8^0 -> undef316, oldX9^0 -> undef317, x0^0 -> (0 + undef316), x1^0 -> (0 + undef317), x2^0 -> (0 + undef302), x3^0 -> (0 + undef303), x4^0 -> (0 + undef304), x5^0 -> (0 + undef305), x6^0 -> (0 + undef306), x7^0 -> (0 + undef307)}> undef326, oldX1^0 -> undef334, oldX2^0 -> undef335, oldX3^0 -> undef336, oldX4^0 -> undef337, oldX5^0 -> undef338, oldX6^0 -> (0 + x6^0), oldX7^0 -> undef340, oldX8^0 -> undef341, x0^0 -> (0 + undef326), x1^0 -> (0 + undef334), x2^0 -> (0 + undef335), x3^0 -> (0 + undef336), x4^0 -> (0 + undef337), x5^0 -> (0 + undef338), x6^0 -> (0 + undef340), x7^0 -> (0 + undef341)}> undef351, oldX10^0 -> undef352, oldX1^0 -> undef359, oldX2^0 -> undef360, oldX3^0 -> undef361, oldX4^0 -> undef362, oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> (0 + x7^0), oldX8^0 -> undef366, oldX9^0 -> undef367, x0^0 -> (0 + undef351), x1^0 -> (0 + undef359), x2^0 -> (0 + undef360), x3^0 -> (0 + undef361), x4^0 -> (0 + undef362), x5^0 -> (0 + undef366), x6^0 -> (0 + undef367), x7^0 -> (0 + undef352)}> undef376, oldX10^0 -> undef377, oldX11^0 -> undef378, oldX12^0 -> undef379, oldX13^0 -> undef380, oldX1^0 -> undef384, 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 -> (0 + x7^0), oldX8^0 -> undef391, oldX9^0 -> undef392, x0^0 -> (0 + undef376), x1^0 -> (0 + undef384), x2^0 -> (0 + undef391), x3^0 -> (0 + undef392), x4^0 -> (0 + undef377), x5^0 -> (0 + undef378), x6^0 -> (0 + undef379), x7^0 -> (0 + undef380)}> undef401, oldX10^0 -> undef402, oldX11^0 -> undef403, oldX12^0 -> undef404, oldX13^0 -> undef405, oldX1^0 -> undef409, 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 -> (0 + x7^0), oldX8^0 -> undef416, oldX9^0 -> undef417, x0^0 -> (0 + undef401), x1^0 -> (0 + undef409), x2^0 -> (0 + undef416), x3^0 -> (0 + undef417), x4^0 -> (0 + undef402), x5^0 -> (0 + undef403), x6^0 -> (0 + undef404), x7^0 -> (0 + undef405)}> undef426, oldX10^0 -> undef427, oldX11^0 -> undef428, oldX12^0 -> undef429, oldX13^0 -> undef430, oldX1^0 -> undef434, 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 -> (0 + x7^0), oldX8^0 -> undef441, oldX9^0 -> undef442, x0^0 -> (0 + undef426), x1^0 -> (0 + undef434), x2^0 -> (0 + undef441), x3^0 -> (0 + undef442), x4^0 -> (0 + undef427), x5^0 -> (0 + undef428), x6^0 -> (0 + undef429), x7^0 -> (0 + undef430)}> undef451, oldX1^0 -> undef459, oldX2^0 -> undef460, oldX3^0 -> undef461, oldX4^0 -> undef462, oldX5^0 -> undef463, oldX6^0 -> undef464, oldX7^0 -> (0 + x7^0), x0^0 -> (0 + undef451), x1^0 -> (0 + undef459), x2^0 -> (0 + undef460), x3^0 -> (0 + undef461), x4^0 -> (0 + undef462), x5^0 -> (0 + undef463), x6^0 -> (0 + undef464), x7^0 -> (~(1) + undef464)}> undef476, oldX1^0 -> undef484, oldX2^0 -> undef485, oldX3^0 -> undef486, oldX4^0 -> undef487, oldX5^0 -> undef488, oldX6^0 -> undef489, oldX7^0 -> (0 + x7^0), x0^0 -> (0 + undef476), x1^0 -> (0 + undef484), x2^0 -> (0 + undef485), x3^0 -> (0 + undef486), x4^0 -> (0 + undef487), x5^0 -> (0 + undef488), x6^0 -> (0 + undef489), x7^0 -> (~(1) + undef489)}> undef501, oldX1^0 -> undef509, oldX2^0 -> undef510, oldX3^0 -> undef511, oldX4^0 -> undef512, oldX5^0 -> undef513, oldX6^0 -> (0 + x6^0), oldX7^0 -> (0 + x7^0), oldX8^0 -> undef516, oldX9^0 -> undef517, x0^0 -> (0 + undef501), x1^0 -> (0 + undef509), x2^0 -> (0 + undef510), x3^0 -> (0 + undef511), x4^0 -> (0 + undef512), x5^0 -> (~(16) + undef513), x6^0 -> (0 + undef516), x7^0 -> (0 + undef517)}> (0 + x0^0), oldX10^0 -> undef527, oldX11^0 -> undef528, oldX12^0 -> undef529, oldX13^0 -> undef530, oldX14^0 -> undef531, oldX15^0 -> undef532, 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 -> (0 + x7^0), oldX8^0 -> undef541, oldX9^0 -> undef542, x0^0 -> (0 + undef541), x1^0 -> (0 + undef542), x2^0 -> (0 + undef527), x3^0 -> (0 + undef528), x4^0 -> (0 + undef529), x5^0 -> (0 + undef530), x6^0 -> (0 + undef531), x7^0 -> (0 + undef532)}> undef551, oldX1^0 -> undef559, oldX2^0 -> undef560, oldX3^0 -> undef561, oldX4^0 -> undef562, oldX5^0 -> undef563, oldX6^0 -> (0 + x6^0), oldX7^0 -> (0 + x7^0), oldX8^0 -> undef566, x0^0 -> (0 + undef551), x1^0 -> (0 + undef559), x2^0 -> (0 + undef560), x3^0 -> (0 + undef561), x4^0 -> (0 + undef562), x5^0 -> (0 + undef563), x6^0 -> (0 + undef563), x7^0 -> (0 + undef566)}> undef576, oldX1^0 -> undef584, oldX2^0 -> undef585, oldX3^0 -> undef586, oldX4^0 -> undef587, oldX5^0 -> undef588, oldX6^0 -> (0 + x6^0), oldX7^0 -> (0 + x7^0), oldX8^0 -> undef591, oldX9^0 -> undef592, x0^0 -> (0 + undef576), x1^0 -> (0 + undef584), x2^0 -> (0 + undef585), x3^0 -> (0 + undef586), x4^0 -> (0 + undef587), x5^0 -> (0 + undef588), x6^0 -> (0 + undef591), x7^0 -> (0 + undef592)}> undef601, oldX10^0 -> undef602, oldX1^0 -> undef609, oldX2^0 -> undef610, oldX3^0 -> undef611, oldX4^0 -> (0 + x4^0), oldX5^0 -> undef613, oldX6^0 -> (0 + x6^0), oldX7^0 -> (0 + x7^0), oldX8^0 -> undef616, oldX9^0 -> undef617, x0^0 -> (0 + undef601), x1^0 -> (0 + undef609), x2^0 -> (0 + undef610), x3^0 -> (0 + undef611), x4^0 -> (0 + undef613), x5^0 -> (0 + undef616), x6^0 -> (0 + undef617), x7^0 -> (0 + undef602)}> undef626, oldX1^0 -> undef634, oldX2^0 -> undef635, oldX3^0 -> undef636, oldX4^0 -> undef637, oldX5^0 -> undef638, oldX6^0 -> undef639, oldX7^0 -> (0 + x7^0), oldX8^0 -> undef641, x0^0 -> (0 + undef626), x1^0 -> (0 + undef634), x2^0 -> (0 + undef635), x3^0 -> (0 + undef636), x4^0 -> (0 + undef637), x5^0 -> (0 + undef638), x6^0 -> (0 + undef639), x7^0 -> (0 + undef641)}> undef651, oldX1^0 -> undef659, oldX2^0 -> undef660, oldX3^0 -> undef661, oldX4^0 -> undef662, oldX5^0 -> undef663, oldX6^0 -> undef664, oldX7^0 -> (0 + x7^0), oldX8^0 -> undef666, x0^0 -> (0 + undef651), x1^0 -> (0 + undef659), x2^0 -> (0 + undef660), x3^0 -> (0 + undef661), x4^0 -> (0 + undef662), x5^0 -> (0 + undef663), x6^0 -> (~(1) + undef664), x7^0 -> (0 + undef666)}> undef701, oldX10^0 -> undef702, oldX1^0 -> undef709, oldX2^0 -> undef710, oldX3^0 -> undef711, oldX4^0 -> undef712, oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> (0 + x7^0), oldX8^0 -> undef716, oldX9^0 -> undef717, x0^0 -> (0 + undef701), x1^0 -> (0 + undef709), x2^0 -> (0 + undef710), x3^0 -> (0 + undef711), x4^0 -> (0 + undef712), x5^0 -> (0 + undef716), x6^0 -> (0 + undef717), x7^0 -> (0 + undef702)}> undef726, oldX1^0 -> undef734, oldX2^0 -> undef735, oldX3^0 -> undef736, oldX4^0 -> undef737, oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> (0 + x7^0), oldX8^0 -> undef741, oldX9^0 -> undef742, x0^0 -> (0 + undef726), x1^0 -> (0 + undef734), x2^0 -> (0 + undef735), x3^0 -> (0 + undef736), x4^0 -> (0 + undef737), x5^0 -> (0 + undef737), x6^0 -> (0 + undef741), x7^0 -> (0 + undef742)}> undef751, oldX1^0 -> undef759, oldX2^0 -> undef760, oldX3^0 -> undef761, oldX4^0 -> undef762, oldX5^0 -> (0 + x5^0), oldX6^0 -> (0 + x6^0), oldX7^0 -> (0 + x7^0), oldX8^0 -> undef766, x0^0 -> (0 + undef751), x1^0 -> (0 + undef759), x2^0 -> (0 + undef760), x3^0 -> (0 + undef761), x4^0 -> (0 + undef762), x5^0 -> (~(5552) + undef762), x6^0 -> 347, x7^0 -> (0 + undef766)}> undef776, oldX10^0 -> undef777, oldX1^0 -> undef784, oldX2^0 -> undef785, oldX3^0 -> undef786, oldX4^0 -> (0 + x4^0), oldX5^0 -> undef788, oldX6^0 -> undef789, oldX7^0 -> (0 + x7^0), oldX8^0 -> undef791, oldX9^0 -> undef792, x0^0 -> (0 + undef776), x1^0 -> (0 + undef784), x2^0 -> (0 + undef785), x3^0 -> (0 + undef786), x4^0 -> (0 + undef789), x5^0 -> ((0 + undef788) + undef791), x6^0 -> (0 + undef792), x7^0 -> (0 + undef777)}> (0 + x0^0), oldX10^0 -> undef802, oldX11^0 -> undef803, oldX12^0 -> undef804, oldX13^0 -> undef805, oldX14^0 -> undef806, oldX15^0 -> undef807, oldX1^0 -> (0 + x1^0), oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef813, oldX6^0 -> (0 + x6^0), oldX7^0 -> (0 + x7^0), oldX8^0 -> undef816, oldX9^0 -> undef817, x0^0 -> (0 + undef816), x1^0 -> (0 + undef817), x2^0 -> (0 + undef802), x3^0 -> (0 + undef803), x4^0 -> (0 + undef804), x5^0 -> (0 + undef805), x6^0 -> (0 + undef806), x7^0 -> (0 + undef807)}> (0 + x0^0), oldX10^0 -> undef827, oldX11^0 -> undef828, oldX12^0 -> undef829, oldX13^0 -> undef830, oldX14^0 -> undef831, oldX15^0 -> undef832, oldX1^0 -> (0 + x1^0), oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef838, oldX6^0 -> (0 + x6^0), oldX7^0 -> (0 + x7^0), oldX8^0 -> undef841, oldX9^0 -> undef842, x0^0 -> (0 + undef841), x1^0 -> (0 + undef842), x2^0 -> (0 + undef827), x3^0 -> (0 + undef828), x4^0 -> (0 + undef829), x5^0 -> (0 + undef830), x6^0 -> (0 + undef831), x7^0 -> (0 + undef832)}> undef851, oldX10^0 -> undef852, oldX11^0 -> undef853, oldX12^0 -> undef854, oldX13^0 -> undef855, oldX1^0 -> undef859, 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 -> (0 + x7^0), oldX8^0 -> undef866, oldX9^0 -> undef867, x0^0 -> (0 + undef851), x1^0 -> (0 + undef859), x2^0 -> (0 + undef866), x3^0 -> (0 + undef867), x4^0 -> (0 + undef852), x5^0 -> (0 + undef853), x6^0 -> (0 + undef854), x7^0 -> (0 + undef855)}> Fresh variables: undef1, undef2, undef9, undef10, undef11, undef12, undef16, undef17, undef26, undef27, undef34, undef35, undef36, undef37, undef41, undef42, undef51, undef59, undef60, undef61, undef62, undef63, undef66, undef76, undef84, undef85, undef86, undef87, undef88, undef91, undef101, undef102, undef109, undef110, undef111, undef116, undef117, undef126, undef134, undef135, undef136, undef141, undef142, undef152, undef153, undef154, undef155, undef156, undef157, undef166, undef167, undef176, undef177, undef178, undef184, undef185, undef186, undef191, undef192, undef201, undef202, undef203, undef209, undef210, undef211, undef216, undef217, undef227, undef228, undef229, undef230, undef231, undef232, undef233, undef235, undef236, undef241, undef242, undef252, undef253, undef254, undef255, undef256, undef257, undef258, undef260, undef261, undef266, undef267, undef277, undef278, undef279, undef280, undef281, undef282, undef283, undef285, undef286, undef291, undef292, undef302, undef303, undef304, undef305, undef306, undef307, undef308, undef310, undef311, undef316, undef317, undef326, undef334, undef335, undef336, undef337, undef338, undef340, undef341, undef351, undef352, undef359, undef360, undef361, undef362, undef366, undef367, undef376, undef377, undef378, undef379, undef380, undef384, undef391, undef392, undef401, undef402, undef403, undef404, undef405, undef409, undef416, undef417, undef426, undef427, undef428, undef429, undef430, undef434, undef441, undef442, undef451, undef459, undef460, undef461, undef462, undef463, undef464, undef476, undef484, undef485, undef486, undef487, undef488, undef489, undef501, undef509, undef510, undef511, undef512, undef513, undef516, undef517, undef527, undef528, undef529, undef530, undef531, undef532, undef541, undef542, undef551, undef559, undef560, undef561, undef562, undef563, undef566, undef576, undef584, undef585, undef586, undef587, undef588, undef591, undef592, undef601, undef602, undef609, undef610, undef611, undef613, undef616, undef617, undef626, undef634, undef635, undef636, undef637, undef638, undef639, undef641, undef651, undef659, undef660, undef661, undef662, undef663, undef664, undef666, undef701, undef702, undef709, undef710, undef711, undef712, undef716, undef717, undef726, undef734, undef735, undef736, undef737, undef741, undef742, undef751, undef759, undef760, undef761, undef762, undef766, undef776, undef777, undef784, undef785, undef786, undef788, undef789, undef791, undef792, undef802, undef803, undef804, undef805, undef806, undef807, undef813, undef816, undef817, undef827, undef828, undef829, undef830, undef831, undef832, undef838, undef841, undef842, undef851, undef852, undef853, undef854, undef855, undef859, undef866, undef867, Undef variables: undef1, undef2, undef9, undef10, undef11, undef12, undef16, undef17, undef26, undef27, undef34, undef35, undef36, undef37, undef41, undef42, undef51, undef59, undef60, undef61, undef62, undef63, undef66, undef76, undef84, undef85, undef86, undef87, undef88, undef91, undef101, undef102, undef109, undef110, undef111, undef116, undef117, undef126, undef134, undef135, undef136, undef141, undef142, undef152, undef153, undef154, undef155, undef156, undef157, undef166, undef167, undef176, undef177, undef178, undef184, undef185, undef186, undef191, undef192, undef201, undef202, undef203, undef209, undef210, undef211, undef216, undef217, undef227, undef228, undef229, undef230, undef231, undef232, undef233, undef235, undef236, undef241, undef242, undef252, undef253, undef254, undef255, undef256, undef257, undef258, undef260, undef261, undef266, undef267, undef277, undef278, undef279, undef280, undef281, undef282, undef283, undef285, undef286, undef291, undef292, undef302, undef303, undef304, undef305, undef306, undef307, undef308, undef310, undef311, undef316, undef317, undef326, undef334, undef335, undef336, undef337, undef338, undef340, undef341, undef351, undef352, undef359, undef360, undef361, undef362, undef366, undef367, undef376, undef377, undef378, undef379, undef380, undef384, undef391, undef392, undef401, undef402, undef403, undef404, undef405, undef409, undef416, undef417, undef426, undef427, undef428, undef429, undef430, undef434, undef441, undef442, undef451, undef459, undef460, undef461, undef462, undef463, undef464, undef476, undef484, undef485, undef486, undef487, undef488, undef489, undef501, undef509, undef510, undef511, undef512, undef513, undef516, undef517, undef527, undef528, undef529, undef530, undef531, undef532, undef541, undef542, undef551, undef559, undef560, undef561, undef562, undef563, undef566, undef576, undef584, undef585, undef586, undef587, undef588, undef591, undef592, undef601, undef602, undef609, undef610, undef611, undef613, undef616, undef617, undef626, undef634, undef635, undef636, undef637, undef638, undef639, undef641, undef651, undef659, undef660, undef661, undef662, undef663, undef664, undef666, undef701, undef702, undef709, undef710, undef711, undef712, undef716, undef717, undef726, undef734, undef735, undef736, undef737, undef741, undef742, undef751, undef759, undef760, undef761, undef762, undef766, undef776, undef777, undef784, undef785, undef786, undef788, undef789, undef791, undef792, undef802, undef803, undef804, undef805, undef806, undef807, undef813, undef816, undef817, undef827, undef828, undef829, undef830, undef831, undef832, undef838, undef841, undef842, undef851, undef852, undef853, undef854, undef855, undef859, undef866, undef867, Abstraction variables: Exit nodes: Accepting locations: Asserts: Preprocessed LLVMGraph Init Location: 0 Transitions: (0 + undef851), x1^0 -> (0 + undef859), x2^0 -> (0 + undef866), x3^0 -> (0 + undef867), x4^0 -> (0 + undef852), x5^0 -> (0 + undef853), x6^0 -> (0 + undef854), x7^0 -> (0 + undef855)}> (0 + undef166), x1^0 -> (0 + undef167), x2^0 -> (0 + undef152), x3^0 -> (0 + undef153), x4^0 -> (0 + undef154), x5^0 -> (0 + undef155), x6^0 -> (0 + undef156), x7^0 -> (0 + undef157)}> (0 + undef326), x1^0 -> (0 + undef334), x2^0 -> (0 + undef335), x3^0 -> (0 + undef336), x4^0 -> (0 + undef337), x5^0 -> (0 + undef338), x6^0 -> (0 + undef340), x7^0 -> (0 + undef341)}> (0 + undef541), x1^0 -> (0 + undef542), x2^0 -> (0 + undef527), x3^0 -> (0 + undef528), x4^0 -> (0 + undef529), x5^0 -> (0 + undef530), x6^0 -> (0 + undef531), x7^0 -> (0 + undef532)}> (0 + undef501), x1^0 -> (0 + undef509), x2^0 -> (0 + undef510), x3^0 -> (0 + undef511), x4^0 -> (0 + undef512), x5^0 -> (~(16) + undef513), x6^0 -> (0 + undef516), x7^0 -> (0 + undef517)}> (0 + undef541), x1^0 -> (0 + undef542), x2^0 -> (0 + undef527), x3^0 -> (0 + undef528), x4^0 -> (0 + undef529), x5^0 -> (0 + undef530), x6^0 -> (0 + undef531), x7^0 -> (0 + undef532)}> (0 + undef601), x1^0 -> (0 + undef609), x2^0 -> (0 + undef610), x3^0 -> (0 + undef611), x4^0 -> (0 + undef613), x5^0 -> (0 + undef616), x6^0 -> (0 + undef617), x7^0 -> (0 + undef602)}> (0 + undef751), x1^0 -> (0 + undef759), x2^0 -> (0 + undef760), x3^0 -> (0 + undef761), x4^0 -> (0 + undef762), x5^0 -> (~(5552) + undef762), x6^0 -> 347, x7^0 -> (0 + undef766)}> (0 + undef776), x1^0 -> (0 + undef784), x2^0 -> (0 + undef785), x3^0 -> (0 + undef786), x4^0 -> (0 + undef789), x5^0 -> ((0 + undef788) + undef791), x6^0 -> (0 + undef792), x7^0 -> (0 + undef777)}> (0 + undef1), x1^0 -> (0 + undef9), x2^0 -> (0 + undef10), x3^0 -> (0 + undef11), x4^0 -> (0 + undef12), x5^0 -> (0 + undef16), x6^0 -> (0 + undef17), x7^0 -> (0 + undef2)}> (0 + undef751), x1^0 -> (0 + undef759), x2^0 -> (0 + undef760), x3^0 -> (0 + undef761), x4^0 -> (0 + undef762), x5^0 -> (~(5552) + undef762), x6^0 -> 347, x7^0 -> (0 + undef766)}> (0 + undef541), x1^0 -> (0 + undef542), x2^0 -> (0 + undef527), x3^0 -> (0 + undef528), x4^0 -> (0 + undef529), x5^0 -> (0 + undef530), x6^0 -> (0 + undef531), x7^0 -> (0 + undef532)}> (0 + undef726), x1^0 -> (0 + undef734), x2^0 -> (0 + undef735), x3^0 -> (0 + undef736), x4^0 -> (0 + undef737), x5^0 -> (0 + undef737), x6^0 -> (0 + undef741), x7^0 -> (0 + undef742)}> (0 + undef776), x1^0 -> (0 + undef784), x2^0 -> (0 + undef785), x3^0 -> (0 + undef786), x4^0 -> (0 + undef789), x5^0 -> ((0 + undef788) + undef791), x6^0 -> (0 + undef792), x7^0 -> (0 + undef777)}> (0 + undef76), x1^0 -> (0 + undef84), x2^0 -> (0 + undef85), x3^0 -> (0 + undef86), x4^0 -> (0 + undef87), x5^0 -> (0 + undef88), x6^0 -> (~(1) + undef87), x7^0 -> (0 + undef91)}> (0 + undef816), x1^0 -> (0 + undef817), x2^0 -> (0 + undef802), x3^0 -> (0 + undef803), x4^0 -> (0 + undef804), x5^0 -> (0 + undef805), x6^0 -> (0 + undef806), x7^0 -> (0 + undef807)}> (0 + undef841), x1^0 -> (0 + undef842), x2^0 -> (0 + undef827), x3^0 -> (0 + undef828), x4^0 -> (0 + undef829), x5^0 -> (0 + undef830), x6^0 -> (0 + undef831), x7^0 -> (0 + undef832)}> (0 + undef101), x1^0 -> (0 + undef109), x2^0 -> (0 + undef110), x3^0 -> (0 + undef111), x4^0 -> (0 + undef109), x5^0 -> (0 + undef116), x6^0 -> (0 + undef117), x7^0 -> (0 + undef102)}> (0 + undef126), x1^0 -> (0 + undef134), x2^0 -> (0 + undef135), x3^0 -> (0 + undef136), x4^0 -> (0 + undef134), x5^0 -> (0 + undef136), x6^0 -> (0 + undef141), x7^0 -> (0 + undef142)}> (0 + undef176), x1^0 -> (0 + undef184), x2^0 -> (0 + undef185), x3^0 -> (0 + undef186), x4^0 -> (0 + undef191), x5^0 -> (0 + undef192), x6^0 -> (0 + undef177), x7^0 -> (0 + undef178)}> (0 + undef166), x1^0 -> (0 + undef167), x2^0 -> (0 + undef152), x3^0 -> (0 + undef153), x4^0 -> (0 + undef154), x5^0 -> (0 + undef155), x6^0 -> (0 + undef156), x7^0 -> (0 + undef157)}> (0 + undef241), x1^0 -> (0 + undef242), x2^0 -> (0 + undef227), x3^0 -> (0 + undef228), x4^0 -> (0 + undef229), x5^0 -> (0 + undef230), x6^0 -> (0 + undef231), x7^0 -> (0 + undef232)}> (0 + undef266), x1^0 -> (0 + undef267), x2^0 -> (0 + undef252), x3^0 -> (0 + undef253), x4^0 -> (0 + undef254), x5^0 -> (0 + undef255), x6^0 -> (0 + undef256), x7^0 -> (0 + undef257)}> (0 + undef291), x1^0 -> (0 + undef292), x2^0 -> (0 + undef277), x3^0 -> (0 + undef278), x4^0 -> (0 + undef279), x5^0 -> (0 + undef280), x6^0 -> (0 + undef281), x7^0 -> (0 + undef282)}> (0 + undef316), x1^0 -> (0 + undef317), x2^0 -> (0 + undef302), x3^0 -> (0 + undef303), x4^0 -> (0 + undef304), x5^0 -> (0 + undef305), x6^0 -> (0 + undef306), x7^0 -> (0 + undef307)}> (0 + undef326), x1^0 -> (0 + undef334), x2^0 -> (0 + undef335), x3^0 -> (0 + undef336), x4^0 -> (0 + undef337), x5^0 -> (0 + undef338), x6^0 -> (0 + undef340), x7^0 -> (0 + undef341)}> (0 + undef541), x1^0 -> (0 + undef542), x2^0 -> (0 + undef527), x3^0 -> (0 + undef528), x4^0 -> (0 + undef529), x5^0 -> (0 + undef530), x6^0 -> (0 + undef531), x7^0 -> (0 + undef532)}> (0 + undef376), x1^0 -> (0 + undef384), x2^0 -> (0 + undef391), x3^0 -> (0 + undef392), x4^0 -> (0 + undef377), x5^0 -> (0 + undef378), x6^0 -> (0 + undef379), x7^0 -> (0 + undef380)}> (0 + undef401), x1^0 -> (0 + undef409), x2^0 -> (0 + undef416), x3^0 -> (0 + undef417), x4^0 -> (0 + undef402), x5^0 -> (0 + undef403), x6^0 -> (0 + undef404), x7^0 -> (0 + undef405)}> (0 + undef426), x1^0 -> (0 + undef434), x2^0 -> (0 + undef441), x3^0 -> (0 + undef442), x4^0 -> (0 + undef427), x5^0 -> (0 + undef428), x6^0 -> (0 + undef429), x7^0 -> (0 + undef430)}> (0 + undef551), x1^0 -> (0 + undef559), x2^0 -> (0 + undef560), x3^0 -> (0 + undef561), x4^0 -> (0 + undef562), x5^0 -> (0 + undef563), x6^0 -> (0 + undef563), x7^0 -> (0 + undef566)}> (0 + undef501), x1^0 -> (0 + undef509), x2^0 -> (0 + undef510), x3^0 -> (0 + undef511), x4^0 -> (0 + undef512), x5^0 -> (~(16) + undef513), x6^0 -> (0 + undef516), x7^0 -> (0 + undef517)}> (0 + undef601), x1^0 -> (0 + undef609), x2^0 -> (0 + undef610), x3^0 -> (0 + undef611), x4^0 -> (0 + undef613), x5^0 -> (0 + undef616), x6^0 -> (0 + undef617), x7^0 -> (0 + undef602)}> (0 + undef651), x1^0 -> (0 + undef659), x2^0 -> (0 + undef660), x3^0 -> (0 + undef661), x4^0 -> (0 + undef662), x5^0 -> (0 + undef663), x6^0 -> (~(1) + undef664), x7^0 -> (0 + undef666)}> Fresh variables: undef1, undef2, undef9, undef10, undef11, undef12, undef16, undef17, undef26, undef27, undef34, undef35, undef36, undef37, undef41, undef42, undef51, undef59, undef60, undef61, undef62, undef63, undef66, undef76, undef84, undef85, undef86, undef87, undef88, undef91, undef101, undef102, undef109, undef110, undef111, undef116, undef117, undef126, undef134, undef135, undef136, undef141, undef142, undef152, undef153, undef154, undef155, undef156, undef157, undef166, undef167, undef176, undef177, undef178, undef184, undef185, undef186, undef191, undef192, undef201, undef202, undef203, undef209, undef210, undef211, undef216, undef217, undef227, undef228, undef229, undef230, undef231, undef232, undef233, undef235, undef236, undef241, undef242, undef252, undef253, undef254, undef255, undef256, undef257, undef258, undef260, undef261, undef266, undef267, undef277, undef278, undef279, undef280, undef281, undef282, undef283, undef285, undef286, undef291, undef292, undef302, undef303, undef304, undef305, undef306, undef307, undef308, undef310, undef311, undef316, undef317, undef326, undef334, undef335, undef336, undef337, undef338, undef340, undef341, undef351, undef352, undef359, undef360, undef361, undef362, undef366, undef367, undef376, undef377, undef378, undef379, undef380, undef384, undef391, undef392, undef401, undef402, undef403, undef404, undef405, undef409, undef416, undef417, undef426, undef427, undef428, undef429, undef430, undef434, undef441, undef442, undef451, undef459, undef460, undef461, undef462, undef463, undef464, undef476, undef484, undef485, undef486, undef487, undef488, undef489, undef501, undef509, undef510, undef511, undef512, undef513, undef516, undef517, undef527, undef528, undef529, undef530, undef531, undef532, undef541, undef542, undef551, undef559, undef560, undef561, undef562, undef563, undef566, undef576, undef584, undef585, undef586, undef587, undef588, undef591, undef592, undef601, undef602, undef609, undef610, undef611, undef613, undef616, undef617, undef626, undef634, undef635, undef636, undef637, undef638, undef639, undef641, undef651, undef659, undef660, undef661, undef662, undef663, undef664, undef666, undef701, undef702, undef709, undef710, undef711, undef712, undef716, undef717, undef726, undef734, undef735, undef736, undef737, undef741, undef742, undef751, undef759, undef760, undef761, undef762, undef766, undef776, undef777, undef784, undef785, undef786, undef788, undef789, undef791, undef792, undef802, undef803, undef804, undef805, undef806, undef807, undef813, undef816, undef817, undef827, undef828, undef829, undef830, undef831, undef832, undef838, undef841, undef842, undef851, undef852, undef853, undef854, undef855, undef859, undef866, undef867, Undef variables: undef1, undef2, undef9, undef10, undef11, undef12, undef16, undef17, undef26, undef27, undef34, undef35, undef36, undef37, undef41, undef42, undef51, undef59, undef60, undef61, undef62, undef63, undef66, undef76, undef84, undef85, undef86, undef87, undef88, undef91, undef101, undef102, undef109, undef110, undef111, undef116, undef117, undef126, undef134, undef135, undef136, undef141, undef142, undef152, undef153, undef154, undef155, undef156, undef157, undef166, undef167, undef176, undef177, undef178, undef184, undef185, undef186, undef191, undef192, undef201, undef202, undef203, undef209, undef210, undef211, undef216, undef217, undef227, undef228, undef229, undef230, undef231, undef232, undef233, undef235, undef236, undef241, undef242, undef252, undef253, undef254, undef255, undef256, undef257, undef258, undef260, undef261, undef266, undef267, undef277, undef278, undef279, undef280, undef281, undef282, undef283, undef285, undef286, undef291, undef292, undef302, undef303, undef304, undef305, undef306, undef307, undef308, undef310, undef311, undef316, undef317, undef326, undef334, undef335, undef336, undef337, undef338, undef340, undef341, undef351, undef352, undef359, undef360, undef361, undef362, undef366, undef367, undef376, undef377, undef378, undef379, undef380, undef384, undef391, undef392, undef401, undef402, undef403, undef404, undef405, undef409, undef416, undef417, undef426, undef427, undef428, undef429, undef430, undef434, undef441, undef442, undef451, undef459, undef460, undef461, undef462, undef463, undef464, undef476, undef484, undef485, undef486, undef487, undef488, undef489, undef501, undef509, undef510, undef511, undef512, undef513, undef516, undef517, undef527, undef528, undef529, undef530, undef531, undef532, undef541, undef542, undef551, undef559, undef560, undef561, undef562, undef563, undef566, undef576, undef584, undef585, undef586, undef587, undef588, undef591, undef592, undef601, undef602, undef609, undef610, undef611, undef613, undef616, undef617, undef626, undef634, undef635, undef636, undef637, undef638, undef639, undef641, undef651, undef659, undef660, undef661, undef662, undef663, undef664, undef666, undef701, undef702, undef709, undef710, undef711, undef712, undef716, undef717, undef726, undef734, undef735, undef736, undef737, undef741, undef742, undef751, undef759, undef760, undef761, undef762, undef766, undef776, undef777, undef784, undef785, undef786, undef788, undef789, undef791, undef792, undef802, undef803, undef804, undef805, undef806, undef807, undef813, undef816, undef817, undef827, undef828, undef829, undef830, undef831, undef832, undef838, undef841, undef842, undef851, undef852, undef853, undef854, undef855, undef859, undef866, undef867, Abstraction variables: Exit nodes: Accepting locations: Asserts: ************************************************************* ******************************************************************************************* *********************** WORKING TRANSITION SYSTEM (DAG) *********************** ******************************************************************************************* Init Location: 0 Graph 0: Transitions: Variables: Graph 1: Transitions: Variables: Graph 2: Transitions: Variables: Graph 3: Transitions: Variables: Graph 4: Transitions: Variables: Graph 5: Transitions: undef776, x1^0 -> undef784, x2^0 -> undef785, x3^0 -> undef786, x4^0 -> undef789, x5^0 -> undef788 + undef791, x6^0 -> undef792, x7^0 -> undef777, rest remain the same}> Variables: x0^0, x1^0, x2^0, x3^0, x4^0, x5^0, x6^0, x7^0 Graph 6: Transitions: Variables: Graph 7: Transitions: undef751, x1^0 -> undef759, x2^0 -> undef760, x3^0 -> undef761, x4^0 -> undef762, x5^0 -> -5552 + undef762, x6^0 -> 347, x7^0 -> undef766, rest remain the same}> undef601, x1^0 -> undef609, x2^0 -> undef610, x3^0 -> undef611, x4^0 -> undef613, x5^0 -> undef616, x6^0 -> undef617, x7^0 -> undef602, rest remain the same}> undef651, x1^0 -> undef659, x2^0 -> undef660, x3^0 -> undef661, x4^0 -> undef662, x5^0 -> undef663, x6^0 -> -1 + undef664, x7^0 -> undef666, rest remain the same}> Variables: x0^0, x1^0, x2^0, x3^0, x4^0, x5^0, x7^0, x6^0 Graph 8: Transitions: Variables: Graph 9: Transitions: undef501, x1^0 -> undef509, x2^0 -> undef510, x3^0 -> undef511, x4^0 -> undef512, x5^0 -> -16 + undef513, x6^0 -> undef516, x7^0 -> undef517, rest remain the same}> Variables: x0^0, x1^0, x2^0, x3^0, x4^0, x5^0, x6^0, x7^0 Graph 10: Transitions: undef326, x1^0 -> undef334, x2^0 -> undef335, x3^0 -> undef336, x4^0 -> undef337, x5^0 -> undef338, x6^0 -> undef340, x7^0 -> undef341, rest remain the same}> Variables: x0^0, x1^0, x2^0, x3^0, x4^0, x5^0, x6^0, x7^0 Graph 11: Transitions: Variables: Precedence: Graph 0 Graph 1 undef851, x1^0 -> undef859, x2^0 -> undef866, x3^0 -> undef867, x4^0 -> undef852, x5^0 -> undef853, x6^0 -> undef854, x7^0 -> undef855, rest remain the same}> Graph 2 undef426, x1^0 -> undef434, x2^0 -> undef441, x3^0 -> undef442, x4^0 -> undef427, x5^0 -> undef428, x6^0 -> undef429, x7^0 -> undef430, rest remain the same}> Graph 3 undef376, x1^0 -> undef384, x2^0 -> undef391, x3^0 -> undef392, x4^0 -> undef377, x5^0 -> undef378, x6^0 -> undef379, x7^0 -> undef380, rest remain the same}> undef401, x1^0 -> undef409, x2^0 -> undef416, x3^0 -> undef417, x4^0 -> undef402, x5^0 -> undef403, x6^0 -> undef404, x7^0 -> undef405, rest remain the same}> Graph 4 undef176, x1^0 -> undef184, x2^0 -> undef185, x3^0 -> undef186, x4^0 -> undef191, x5^0 -> undef192, x6^0 -> undef177, x7^0 -> undef178, rest remain the same}> Graph 5 undef776, x1^0 -> undef784, x2^0 -> undef785, x3^0 -> undef786, x4^0 -> undef789, x5^0 -> undef788 + undef791, x6^0 -> undef792, x7^0 -> undef777, rest remain the same}> undef126, x1^0 -> undef134, x2^0 -> undef135, x3^0 -> undef136, x4^0 -> undef134, x5^0 -> undef136, x6^0 -> undef141, x7^0 -> undef142, rest remain the same}> Graph 6 undef76, x1^0 -> undef84, x2^0 -> undef85, x3^0 -> undef86, x4^0 -> undef87, x5^0 -> undef88, x6^0 -> -1 + undef87, x7^0 -> undef91, rest remain the same}> Graph 7 undef601, x1^0 -> undef609, x2^0 -> undef610, x3^0 -> undef611, x4^0 -> undef613, x5^0 -> undef616, x6^0 -> undef617, x7^0 -> undef602, rest remain the same}> undef751, x1^0 -> undef759, x2^0 -> undef760, x3^0 -> undef761, x4^0 -> undef762, x5^0 -> -5552 + undef762, x6^0 -> 347, x7^0 -> undef766, rest remain the same}> undef101, x1^0 -> undef109, x2^0 -> undef110, x3^0 -> undef111, x4^0 -> undef109, x5^0 -> undef116, x6^0 -> undef117, x7^0 -> undef102, rest remain the same}> Graph 8 undef1, x1^0 -> undef9, x2^0 -> undef10, x3^0 -> undef11, x4^0 -> undef12, x5^0 -> undef16, x6^0 -> undef17, x7^0 -> undef2, rest remain the same}> Graph 9 undef501, x1^0 -> undef509, x2^0 -> undef510, x3^0 -> undef511, x4^0 -> undef512, x5^0 -> -16 + undef513, x6^0 -> undef516, x7^0 -> undef517, rest remain the same}> undef726, x1^0 -> undef734, x2^0 -> undef735, x3^0 -> undef736, x4^0 -> undef737, x5^0 -> undef737, x6^0 -> undef741, x7^0 -> undef742, rest remain the same}> Graph 10 undef326, x1^0 -> undef334, x2^0 -> undef335, x3^0 -> undef336, x4^0 -> undef337, x5^0 -> undef338, x6^0 -> undef340, x7^0 -> undef341, rest remain the same}> undef551, x1^0 -> undef559, x2^0 -> undef560, x3^0 -> undef561, x4^0 -> undef562, x5^0 -> undef563, x6^0 -> undef563, x7^0 -> undef566, rest remain the same}> Graph 11 undef166, x1^0 -> undef167, x2^0 -> undef152, x3^0 -> undef153, x4^0 -> undef154, x5^0 -> undef155, x6^0 -> undef156, x7^0 -> undef157, rest remain the same}> undef541, x1^0 -> undef542, x2^0 -> undef527, x3^0 -> undef528, x4^0 -> undef529, x5^0 -> undef530, x6^0 -> undef531, x7^0 -> undef532, rest remain the same}> undef541, x1^0 -> undef542, x2^0 -> undef527, x3^0 -> undef528, x4^0 -> undef529, x5^0 -> undef530, x6^0 -> undef531, x7^0 -> undef532, rest remain the same}> undef541, x1^0 -> undef542, x2^0 -> undef527, x3^0 -> undef528, x4^0 -> undef529, x5^0 -> undef530, x6^0 -> undef531, x7^0 -> undef532, rest remain the same}> undef816, x1^0 -> undef817, x2^0 -> undef802, x3^0 -> undef803, x4^0 -> undef804, x5^0 -> undef805, x6^0 -> undef806, x7^0 -> undef807, rest remain the same}> undef841, x1^0 -> undef842, x2^0 -> undef827, x3^0 -> undef828, x4^0 -> undef829, x5^0 -> undef830, x6^0 -> undef831, x7^0 -> undef832, rest remain the same}> undef166, x1^0 -> undef167, x2^0 -> undef152, x3^0 -> undef153, x4^0 -> undef154, x5^0 -> undef155, x6^0 -> undef156, x7^0 -> undef157, rest remain the same}> undef241, x1^0 -> undef242, x2^0 -> undef227, x3^0 -> undef228, x4^0 -> undef229, x5^0 -> undef230, x6^0 -> undef231, x7^0 -> undef232, rest remain the same}> undef266, x1^0 -> undef267, x2^0 -> undef252, x3^0 -> undef253, x4^0 -> undef254, x5^0 -> undef255, x6^0 -> undef256, x7^0 -> undef257, rest remain the same}> undef291, x1^0 -> undef292, x2^0 -> undef277, x3^0 -> undef278, x4^0 -> undef279, x5^0 -> undef280, x6^0 -> undef281, x7^0 -> undef282, rest remain the same}> undef316, x1^0 -> undef317, x2^0 -> undef302, x3^0 -> undef303, x4^0 -> undef304, x5^0 -> undef305, x6^0 -> undef306, x7^0 -> undef307, rest remain the same}> undef541, x1^0 -> undef542, x2^0 -> undef527, x3^0 -> undef528, x4^0 -> undef529, x5^0 -> undef530, x6^0 -> undef531, x7^0 -> undef532, rest remain the same}> Map Locations to Subgraph: ( 0 , 0 ) ( 1 , 7 ) ( 2 , 8 ) ( 4 , 5 ) ( 6 , 6 ) ( 7 , 4 ) ( 9 , 11 ) ( 10 , 3 ) ( 11 , 2 ) ( 13 , 10 ) ( 16 , 1 ) ( 18 , 9 ) ( 20 , 7 ) ******************************************************************************************* ******************************** CHECKING ASSERTIONS ******************************** ******************************************************************************************* Proving termination of subgraph 0 Proving termination of subgraph 1 Analyzing SCC {l16}... No cycles found. Proving termination of subgraph 2 Analyzing SCC {l11}... No cycles found. Proving termination of subgraph 3 Analyzing SCC {l10}... No cycles found. Proving termination of subgraph 4 Analyzing SCC {l7}... No cycles found. Proving termination of subgraph 5 Checking unfeasibility... Time used: 0.00742 Checking conditional termination of SCC {l4}... LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.002924s Ranking function: -1 + x4^0 New Graphs: Proving termination of subgraph 6 Analyzing SCC {l6}... No cycles found. Proving termination of subgraph 7 Checking unfeasibility... Time used: 0.027752 Checking conditional termination of SCC {l1, l20}... LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.007747s LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.031447s [53150 : 53151] [53150 : 53152] Successful child: 53151 [ Invariant Graph ] Strengthening and disabling transitions... LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility It's unfeasible. Removing transition: undef751, x1^0 -> undef759, x2^0 -> undef760, x3^0 -> undef761, x4^0 -> undef762, x5^0 -> -5552 + undef762, x6^0 -> 347, x7^0 -> undef766, rest remain the same}> LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility It's unfeasible. Removing transition: undef601, x1^0 -> undef609, x2^0 -> undef610, x3^0 -> undef611, x4^0 -> undef613, x5^0 -> undef616, x6^0 -> undef617, x7^0 -> undef602, rest remain the same}> LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility It's unfeasible. Removing transition: undef651, x1^0 -> undef659, x2^0 -> undef660, x3^0 -> undef661, x4^0 -> undef662, x5^0 -> undef663, x6^0 -> -1 + undef664, x7^0 -> undef666, rest remain the same}> [ Termination Graph ] Strengthening and disabling transitions... LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility It's unfeasible. Removing transition: undef751, x1^0 -> undef759, x2^0 -> undef760, x3^0 -> undef761, x4^0 -> undef762, x5^0 -> -5552 + undef762, x6^0 -> 347, x7^0 -> undef766, rest remain the same}> LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility It's unfeasible. Removing transition: undef601, x1^0 -> undef609, x2^0 -> undef610, x3^0 -> undef611, x4^0 -> undef613, x5^0 -> undef616, x6^0 -> undef617, x7^0 -> undef602, rest remain the same}> LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility It's unfeasible. Removing transition: undef651, x1^0 -> undef659, x2^0 -> undef660, x3^0 -> undef661, x4^0 -> undef662, x5^0 -> undef663, x6^0 -> -1 + undef664, x7^0 -> undef666, rest remain the same}> New Graphs: [53150 : 53156] [53150 : 53157] [53150 : 53158] [53150 : 53159] [53150 : 53160] INVARIANTS: 1: 20: Quasi-INVARIANTS to narrow Graph: 1: x4^0 <= 76 , 20: 1 <= 0 , Narrowing transition: undef751, x1^0 -> undef759, x2^0 -> undef760, x3^0 -> undef761, x4^0 -> undef762, x5^0 -> -5552 + undef762, x6^0 -> 347, x7^0 -> undef766, rest remain the same}> LOG: Narrow transition size 1 Narrowing transition: undef601, x1^0 -> undef609, x2^0 -> undef610, x3^0 -> undef611, x4^0 -> undef613, x5^0 -> undef616, x6^0 -> undef617, x7^0 -> undef602, rest remain the same}> LOG: Narrow transition size 1 Narrowing transition: undef651, x1^0 -> undef659, x2^0 -> undef660, x3^0 -> undef661, x4^0 -> undef662, x5^0 -> undef663, x6^0 -> -1 + undef664, x7^0 -> undef666, rest remain the same}> LOG: Narrow transition size 1 invGraph after Narrowing: Transitions: undef751, x1^0 -> undef759, x2^0 -> undef760, x3^0 -> undef761, x4^0 -> undef762, x5^0 -> -5552 + undef762, x6^0 -> 347, x7^0 -> undef766, rest remain the same}> undef601, x1^0 -> undef609, x2^0 -> undef610, x3^0 -> undef611, x4^0 -> undef613, x5^0 -> undef616, x6^0 -> undef617, x7^0 -> undef602, rest remain the same}> undef651, x1^0 -> undef659, x2^0 -> undef660, x3^0 -> undef661, x4^0 -> undef662, x5^0 -> undef663, x6^0 -> -1 + undef664, x7^0 -> undef666, rest remain the same}> Variables: x0^0, x1^0, x2^0, x3^0, x4^0, x5^0, x7^0, x6^0 Checking conditional termination of SCC {l1, l20}... LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.005538s LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.031566s [53150 : 53198] [53150 : 53199] Successful child: 53198 [ Invariant Graph ] Strengthening and disabling transitions... LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility It's unfeasible. Removing transition: undef751, x1^0 -> undef759, x2^0 -> undef760, x3^0 -> undef761, x4^0 -> undef762, x5^0 -> -5552 + undef762, x6^0 -> 347, x7^0 -> undef766, rest remain the same}> LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Strengthening transition (result): undef601, x1^0 -> undef609, x2^0 -> undef610, x3^0 -> undef611, x4^0 -> undef613, x5^0 -> undef616, x6^0 -> undef617, x7^0 -> undef602, rest remain the same}> LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Strengthening transition (result): undef651, x1^0 -> undef659, x2^0 -> undef660, x3^0 -> undef661, x4^0 -> undef662, x5^0 -> undef663, x6^0 -> -1 + undef664, x7^0 -> undef666, rest remain the same}> [ Termination Graph ] Strengthening and disabling transitions... LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility It's unfeasible. Removing transition: undef751, x1^0 -> undef759, x2^0 -> undef760, x3^0 -> undef761, x4^0 -> undef762, x5^0 -> -5552 + undef762, x6^0 -> 347, x7^0 -> undef766, rest remain the same}> LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Strengthening transition (result): undef601, x1^0 -> undef609, x2^0 -> undef610, x3^0 -> undef611, x4^0 -> undef613, x5^0 -> undef616, x6^0 -> undef617, x7^0 -> undef602, rest remain the same}> LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Strengthening transition (result): undef651, x1^0 -> undef659, x2^0 -> undef660, x3^0 -> undef661, x4^0 -> undef662, x5^0 -> undef663, x6^0 -> -1 + undef664, x7^0 -> undef666, rest remain the same}> New Graphs: Transitions: undef651, x1^0 -> undef659, x2^0 -> undef660, x3^0 -> undef661, x4^0 -> undef662, x5^0 -> undef663, x6^0 -> -1 + undef664, x7^0 -> undef666, rest remain the same}> Variables: x0^0, x1^0, x2^0, x3^0, x4^0, x5^0, x6^0, x7^0 Checking conditional termination of SCC {l20}... LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.003499s Ranking function: -2 + x6^0 New Graphs: [53150 : 53203] [53150 : 53204] [53150 : 53205] [53150 : 53206] [53150 : 53207] INVARIANTS: 1: 20: Quasi-INVARIANTS to narrow Graph: 1: x4^0 <= 134 , 20: 1 + x5^0 <= 0 , Narrowing transition: undef751, x1^0 -> undef759, x2^0 -> undef760, x3^0 -> undef761, x4^0 -> undef762, x5^0 -> -5552 + undef762, x6^0 -> 347, x7^0 -> undef766, rest remain the same}> LOG: Narrow transition size 1 Narrowing transition: undef601, x1^0 -> undef609, x2^0 -> undef610, x3^0 -> undef611, x4^0 -> undef613, x5^0 -> undef616, x6^0 -> undef617, x7^0 -> undef602, rest remain the same}> LOG: Narrow transition size 1 Narrowing transition: undef651, x1^0 -> undef659, x2^0 -> undef660, x3^0 -> undef661, x4^0 -> undef662, x5^0 -> undef663, x6^0 -> -1 + undef664, x7^0 -> undef666, rest remain the same}> LOG: Narrow transition size 1 invGraph after Narrowing: Transitions: undef751, x1^0 -> undef759, x2^0 -> undef760, x3^0 -> undef761, x4^0 -> undef762, x5^0 -> -5552 + undef762, x6^0 -> 347, x7^0 -> undef766, rest remain the same}> undef601, x1^0 -> undef609, x2^0 -> undef610, x3^0 -> undef611, x4^0 -> undef613, x5^0 -> undef616, x6^0 -> undef617, x7^0 -> undef602, rest remain the same}> undef651, x1^0 -> undef659, x2^0 -> undef660, x3^0 -> undef661, x4^0 -> undef662, x5^0 -> undef663, x6^0 -> -1 + undef664, x7^0 -> undef666, rest remain the same}> Variables: x0^0, x1^0, x2^0, x3^0, x4^0, x5^0, x7^0, x6^0 Checking conditional termination of SCC {l1, l20}... LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.005913s LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.031760s [53150 : 53245] [53150 : 53246] Successful child: 53245 [ Invariant Graph ] Strengthening and disabling transitions... 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): undef601, x1^0 -> undef609, x2^0 -> undef610, x3^0 -> undef611, x4^0 -> undef613, x5^0 -> undef616, x6^0 -> undef617, x7^0 -> undef602, rest remain the same}> LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Strengthening transition (result): undef651, x1^0 -> undef659, x2^0 -> undef660, x3^0 -> undef661, x4^0 -> undef662, x5^0 -> undef663, x6^0 -> -1 + undef664, x7^0 -> undef666, rest remain the same}> [ Termination Graph ] Strengthening and disabling transitions... 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): undef601, x1^0 -> undef609, x2^0 -> undef610, x3^0 -> undef611, x4^0 -> undef613, x5^0 -> undef616, x6^0 -> undef617, x7^0 -> undef602, rest remain the same}> LOG: CALL solverLinear in Graph for feasibility LOG: RETURN solveLinear in Graph for feasibility Strengthening transition (result): undef651, x1^0 -> undef659, x2^0 -> undef660, x3^0 -> undef661, x4^0 -> undef662, x5^0 -> undef663, x6^0 -> -1 + undef664, x7^0 -> undef666, rest remain the same}> Ranking function: x4^0 New Graphs: Transitions: undef651, x1^0 -> undef659, x2^0 -> undef660, x3^0 -> undef661, x4^0 -> undef662, x5^0 -> undef663, x6^0 -> -1 + undef664, x7^0 -> undef666, rest remain the same}> Variables: x0^0, x1^0, x2^0, x3^0, x4^0, x5^0, x6^0, x7^0 Checking conditional termination of SCC {l20}... LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.003837s Ranking function: -2 + x6^0 New Graphs: LOG: CALL check - Post:1 + x5^0 <= x4^0 - Process 1 * Exit transition: * Postcondition : 1 + x5^0 <= x4^0 LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.001558s > Postcondition is not implied! LOG: RETURN check - Elapsed time: 0.001651s INVARIANTS: 20: Quasi-INVARIANTS to narrow Graph: 20: 1 + x5^0 <= x4^0 , It's unfeasible. Removing transition: undef751, x1^0 -> undef759, x2^0 -> undef760, x3^0 -> undef761, x4^0 -> undef762, x5^0 -> -5552 + undef762, x6^0 -> 347, x7^0 -> undef766, rest remain the same}> Narrowing transition: undef601, x1^0 -> undef609, x2^0 -> undef610, x3^0 -> undef611, x4^0 -> undef613, x5^0 -> undef616, x6^0 -> undef617, x7^0 -> undef602, rest remain the same}> LOG: Narrow transition size 1 Narrowing transition: undef651, x1^0 -> undef659, x2^0 -> undef660, x3^0 -> undef661, x4^0 -> undef662, x5^0 -> undef663, x6^0 -> -1 + undef664, x7^0 -> undef666, rest remain the same}> LOG: Narrow transition size 1 invGraph after Narrowing: Transitions: undef601, x1^0 -> undef609, x2^0 -> undef610, x3^0 -> undef611, x4^0 -> undef613, x5^0 -> undef616, x6^0 -> undef617, x7^0 -> undef602, rest remain the same}> undef651, x1^0 -> undef659, x2^0 -> undef660, x3^0 -> undef661, x4^0 -> undef662, x5^0 -> undef663, x6^0 -> -1 + undef664, x7^0 -> undef666, rest remain the same}> Variables: x0^0, x1^0, x2^0, x3^0, x4^0, x5^0, x7^0, x6^0 Checking conditional termination of SCC {l20}... LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.003803s Ranking function: -2 + x6^0 New Graphs: Proving termination of subgraph 8 Analyzing SCC {l2}... No cycles found. Proving termination of subgraph 9 Checking unfeasibility... Time used: 0.007509 Checking conditional termination of SCC {l18}... LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.004509s Ranking function: -1 + (1 / 16)*x5^0 New Graphs: Proving termination of subgraph 10 Checking unfeasibility... Time used: 0.006791 Checking conditional termination of SCC {l13}... LOG: CALL solveLinear LOG: RETURN solveLinear - Elapsed time: 0.004508s Ranking function: -1 + x6^0 New Graphs: Proving termination of subgraph 11 Analyzing SCC {l9}... No cycles found. Program Terminates