/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:
<l0, l32, true>
<l1, l2, (undef6 = undef6) /\ (undef7 = undef7) /\ (undef8 = undef8) /\ (undef9 = undef9) /\ (undef10 = undef10), par{oldX0^0 -> (0 + x0^0), oldX1^0 -> (0 + x1^0), oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef6, oldX6^0 -> undef7, oldX7^0 -> undef8, oldX8^0 -> undef9, oldX9^0 -> undef10, x0^0 -> (0 + undef6), x1^0 -> (0 + undef7), x2^0 -> (0 + undef8), x3^0 -> (0 + undef9), x4^0 -> (0 + undef10)}>
<l3, l2, (undef21 = undef21) /\ (undef22 = undef22) /\ (undef23 = undef23) /\ (undef24 = undef24) /\ (undef25 = undef25), par{oldX0^0 -> (0 + x0^0), oldX1^0 -> (0 + x1^0), oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef21, oldX6^0 -> undef22, oldX7^0 -> undef23, oldX8^0 -> undef24, oldX9^0 -> undef25, x0^0 -> (0 + undef21), x1^0 -> (0 + undef22), x2^0 -> (0 + undef23), x3^0 -> (0 + undef24), x4^0 -> (0 + undef25)}>
<l3, l4, (undef31 = (0 + x0^0)) /\ (undef32 = (0 + x1^0)) /\ (undef33 = (0 + x2^0)) /\ (undef34 = (0 + x3^0)) /\ (undef35 = (0 + x4^0)), par{oldX0^0 -> undef31, oldX1^0 -> undef32, oldX2^0 -> undef33, oldX3^0 -> undef34, oldX4^0 -> undef35, x0^0 -> (1 + undef31), x1^0 -> (0 + undef32), x2^0 -> (0 + undef33), x3^0 -> (0 + undef34), x4^0 -> (0 + undef35)}>
<l5, l1, (undef46 = (0 + x0^0)) /\ (undef47 = (0 + x1^0)) /\ (undef48 = (0 + x2^0)) /\ (undef49 = (0 + x3^0)) /\ (undef50 = (0 + x4^0)) /\ ((1 + undef47) <= (0 + undef46)), par{oldX0^0 -> undef46, oldX1^0 -> undef47, oldX2^0 -> undef48, oldX3^0 -> undef49, oldX4^0 -> undef50, x0^0 -> (0 + undef46), x1^0 -> (0 + undef47), x2^0 -> (0 + undef48), x3^0 -> (0 + undef49), x4^0 -> (0 + undef50)}>
<l5, l3, (undef61 = (0 + x0^0)) /\ (undef62 = (0 + x1^0)) /\ (undef63 = (0 + x2^0)) /\ (undef64 = (0 + x3^0)) /\ (undef65 = (0 + x4^0)) /\ ((0 + undef61) <= (0 + undef62)), par{oldX0^0 -> undef61, oldX1^0 -> undef62, oldX2^0 -> undef63, oldX3^0 -> undef64, oldX4^0 -> undef65, x0^0 -> (0 + undef61), x1^0 -> (0 + undef62), x2^0 -> (0 + undef63), x3^0 -> (0 + undef64), x4^0 -> (0 + undef65)}>
<l4, l5, (undef76 = (0 + x0^0)) /\ (undef77 = (0 + x1^0)) /\ (undef78 = (0 + x2^0)) /\ (undef79 = (0 + x3^0)) /\ (undef80 = (0 + x4^0)), par{oldX0^0 -> undef76, oldX1^0 -> undef77, oldX2^0 -> undef78, oldX3^0 -> undef79, oldX4^0 -> undef80, x0^0 -> (0 + undef76), x1^0 -> (0 + undef77), x2^0 -> (0 + undef78), x3^0 -> (0 + undef79), x4^0 -> (0 + undef80)}>
<l6, l7, (undef96 = undef96) /\ (undef97 = undef97) /\ (undef98 = undef98) /\ (undef99 = undef99) /\ (undef100 = undef100), par{oldX0^0 -> (0 + x0^0), oldX1^0 -> (0 + x1^0), oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef96, oldX6^0 -> undef97, oldX7^0 -> undef98, oldX8^0 -> undef99, oldX9^0 -> undef100, x0^0 -> (0 + undef96), x1^0 -> (0 + undef97), x2^0 -> (0 + undef98), x3^0 -> (0 + undef99), x4^0 -> (0 + undef100)}>
<l8, l9, (undef111 = undef111) /\ (undef112 = undef112) /\ (undef113 = undef113) /\ (undef114 = undef114) /\ (undef115 = undef115), par{oldX0^0 -> (0 + x0^0), oldX1^0 -> (0 + x1^0), oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef111, oldX6^0 -> undef112, oldX7^0 -> undef113, oldX8^0 -> undef114, oldX9^0 -> undef115, x0^0 -> (0 + undef111), x1^0 -> (0 + undef112), x2^0 -> (0 + undef113), x3^0 -> (0 + undef114), x4^0 -> (0 + undef115)}>
<l10, l7, (undef126 = undef126) /\ (undef127 = undef127) /\ (undef128 = undef128) /\ (undef129 = undef129) /\ (undef130 = undef130), par{oldX0^0 -> (0 + x0^0), oldX1^0 -> (0 + x1^0), oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef126, oldX6^0 -> undef127, oldX7^0 -> undef128, oldX8^0 -> undef129, oldX9^0 -> undef130, x0^0 -> (0 + undef126), x1^0 -> (0 + undef127), x2^0 -> (0 + undef128), x3^0 -> (0 + undef129), x4^0 -> (0 + undef130)}>
<l10, l11, (undef136 = (0 + x0^0)) /\ (undef137 = (0 + x1^0)) /\ (undef141 = undef141) /\ (undef142 = undef142) /\ (undef143 = undef143), par{oldX0^0 -> undef136, oldX1^0 -> undef137, oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef141, oldX6^0 -> undef142, oldX7^0 -> undef143, x0^0 -> (~(1) + undef136), x1^0 -> (0 + undef137), x2^0 -> (0 + undef141), x3^0 -> (0 + undef142), x4^0 -> (0 + undef143)}>
<l12, l13, (undef151 = (0 + x0^0)) /\ (undef152 = (0 + x1^0)) /\ (undef156 = undef156) /\ (undef157 = undef157) /\ (undef158 = undef158), par{oldX0^0 -> undef151, oldX1^0 -> undef152, oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef156, oldX6^0 -> undef157, oldX7^0 -> undef158, x0^0 -> (0 + undef151), x1^0 -> (1 + undef152), x2^0 -> (0 + undef156), x3^0 -> (0 + undef157), x4^0 -> (0 + undef158)}>
<l13, l8, (undef166 = (0 + x0^0)) /\ (undef167 = (0 + x1^0)) /\ (undef171 = undef171) /\ (undef172 = undef172) /\ (undef173 = undef173) /\ ((0 + undef166) <= (0 + undef167)), par{oldX0^0 -> undef166, oldX1^0 -> undef167, oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef171, oldX6^0 -> undef172, oldX7^0 -> undef173, x0^0 -> (0 + undef166), x1^0 -> (0 + undef167), x2^0 -> (0 + undef171), x3^0 -> (0 + undef172), x4^0 -> (0 + undef173)}>
<l13, l12, (undef181 = (0 + x0^0)) /\ (undef182 = (0 + x1^0)) /\ (undef186 = undef186) /\ (undef187 = undef187) /\ (undef188 = undef188) /\ ((1 + undef182) <= (0 + undef181)), par{oldX0^0 -> undef181, oldX1^0 -> undef182, oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef186, oldX6^0 -> undef187, oldX7^0 -> undef188, x0^0 -> (0 + undef181), x1^0 -> (0 + undef182), x2^0 -> (0 + undef186), x3^0 -> (0 + undef187), x4^0 -> (0 + undef188)}>
<l14, l13, (undef196 = (0 + x0^0)) /\ (undef201 = undef201) /\ (undef202 = undef202) /\ (undef203 = undef203), par{oldX0^0 -> undef196, oldX1^0 -> (0 + x1^0), oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef201, oldX6^0 -> undef202, oldX7^0 -> undef203, x0^0 -> (0 + undef196), x1^0 -> 0, x2^0 -> (0 + undef201), x3^0 -> (0 + undef202), x4^0 -> (0 + undef203)}>
<l15, l16, (undef216 = undef216) /\ (undef217 = undef217) /\ (undef218 = undef218) /\ (undef219 = undef219) /\ (undef220 = undef220), par{oldX0^0 -> (0 + x0^0), oldX1^0 -> (0 + x1^0), oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef216, oldX6^0 -> undef217, oldX7^0 -> undef218, oldX8^0 -> undef219, oldX9^0 -> undef220, x0^0 -> (0 + undef216), x1^0 -> (0 + undef217), x2^0 -> (0 + undef218), x3^0 -> (0 + undef219), x4^0 -> (0 + undef220)}>
<l17, l16, (undef231 = undef231) /\ (undef232 = undef232) /\ (undef233 = undef233) /\ (undef234 = undef234) /\ (undef235 = undef235), par{oldX0^0 -> (0 + x0^0), oldX1^0 -> (0 + x1^0), oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef231, oldX6^0 -> undef232, oldX7^0 -> undef233, oldX8^0 -> undef234, oldX9^0 -> undef235, x0^0 -> (0 + undef231), x1^0 -> (0 + undef232), x2^0 -> (0 + undef233), x3^0 -> (0 + undef234), x4^0 -> (0 + undef235)}>
<l17, l18, (undef241 = (0 + x0^0)) /\ (undef242 = (0 + x1^0)) /\ (undef246 = undef246) /\ (undef247 = undef247) /\ (undef248 = undef248), par{oldX0^0 -> undef241, oldX1^0 -> undef242, oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef246, oldX6^0 -> undef247, oldX7^0 -> undef248, x0^0 -> (1 + undef241), x1^0 -> (0 + undef242), x2^0 -> (0 + undef246), x3^0 -> (0 + undef247), x4^0 -> (0 + undef248)}>
<l19, l15, (undef256 = (0 + x0^0)) /\ (undef257 = (0 + x1^0)) /\ (undef261 = undef261) /\ (undef262 = undef262) /\ (undef263 = undef263) /\ ((1 + undef257) <= (0 + undef256)), par{oldX0^0 -> undef256, oldX1^0 -> undef257, oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef261, oldX6^0 -> undef262, oldX7^0 -> undef263, x0^0 -> (0 + undef256), x1^0 -> (0 + undef257), x2^0 -> (0 + undef261), x3^0 -> (0 + undef262), x4^0 -> (0 + undef263)}>
<l19, l17, (undef271 = (0 + x0^0)) /\ (undef272 = (0 + x1^0)) /\ (undef276 = undef276) /\ (undef277 = undef277) /\ (undef278 = undef278) /\ ((0 + undef271) <= (0 + undef272)), par{oldX0^0 -> undef271, oldX1^0 -> undef272, oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef276, oldX6^0 -> undef277, oldX7^0 -> undef278, x0^0 -> (0 + undef271), x1^0 -> (0 + undef272), x2^0 -> (0 + undef276), x3^0 -> (0 + undef277), x4^0 -> (0 + undef278)}>
<l18, l19, (undef286 = (0 + x0^0)) /\ (undef287 = (0 + x1^0)) /\ (undef291 = undef291) /\ (undef292 = undef292) /\ (undef293 = undef293), par{oldX0^0 -> undef286, oldX1^0 -> undef287, oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef291, oldX6^0 -> undef292, oldX7^0 -> undef293, x0^0 -> (0 + undef286), x1^0 -> (0 + undef287), x2^0 -> (0 + undef291), x3^0 -> (0 + undef292), x4^0 -> (0 + undef293)}>
<l20, l6, (undef301 = (0 + x0^0)) /\ (undef302 = (0 + x1^0)) /\ (undef306 = undef306) /\ (undef307 = undef307) /\ (undef308 = undef308) /\ ((1 + undef301) <= (0 + undef302)), par{oldX0^0 -> undef301, oldX1^0 -> undef302, oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef306, oldX6^0 -> undef307, oldX7^0 -> undef308, x0^0 -> (0 + undef301), x1^0 -> (0 + undef302), x2^0 -> (0 + undef306), x3^0 -> (0 + undef307), x4^0 -> (0 + undef308)}>
<l20, l10, (undef316 = (0 + x0^0)) /\ (undef317 = (0 + x1^0)) /\ (undef321 = undef321) /\ (undef322 = undef322) /\ (undef323 = undef323) /\ ((0 + undef317) <= (0 + undef316)), par{oldX0^0 -> undef316, oldX1^0 -> undef317, oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef321, oldX6^0 -> undef322, oldX7^0 -> undef323, x0^0 -> (0 + undef316), x1^0 -> (0 + undef317), x2^0 -> (0 + undef321), x3^0 -> (0 + undef322), x4^0 -> (0 + undef323)}>
<l21, l22, (undef336 = undef336) /\ (undef337 = undef337) /\ (undef338 = undef338) /\ (undef339 = undef339) /\ (undef340 = undef340), par{oldX0^0 -> (0 + x0^0), oldX1^0 -> (0 + x1^0), oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef336, oldX6^0 -> undef337, oldX7^0 -> undef338, oldX8^0 -> undef339, oldX9^0 -> undef340, x0^0 -> (0 + undef336), x1^0 -> (0 + undef337), x2^0 -> (0 + undef338), x3^0 -> (0 + undef339), x4^0 -> (0 + undef340)}>
<l23, l22, (undef351 = undef351) /\ (undef352 = undef352) /\ (undef353 = undef353) /\ (undef354 = undef354) /\ (undef355 = undef355), par{oldX0^0 -> (0 + x0^0), oldX1^0 -> (0 + x1^0), oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef351, oldX6^0 -> undef352, oldX7^0 -> undef353, oldX8^0 -> undef354, oldX9^0 -> undef355, x0^0 -> (0 + undef351), x1^0 -> (0 + undef352), x2^0 -> (0 + undef353), x3^0 -> (0 + undef354), x4^0 -> (0 + undef355)}>
<l23, l24, (undef361 = (0 + x0^0)) /\ (undef362 = (0 + x1^0)) /\ (undef363 = (0 + x2^0)) /\ (undef366 = undef366) /\ (undef367 = undef367), par{oldX0^0 -> undef361, oldX1^0 -> undef362, oldX2^0 -> undef363, oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef366, oldX6^0 -> undef367, x0^0 -> (1 + undef361), x1^0 -> (0 + undef362), x2^0 -> (0 + undef363), x3^0 -> (0 + undef366), x4^0 -> (0 + undef367)}>
<l25, l21, (undef376 = (0 + x0^0)) /\ (undef377 = (0 + x1^0)) /\ (undef378 = (0 + x2^0)) /\ (undef381 = undef381) /\ (undef382 = undef382) /\ ((1 + undef377) <= (0 + undef376)), par{oldX0^0 -> undef376, oldX1^0 -> undef377, oldX2^0 -> undef378, oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef381, oldX6^0 -> undef382, x0^0 -> (0 + undef376), x1^0 -> (0 + undef377), x2^0 -> (0 + undef378), x3^0 -> (0 + undef381), x4^0 -> (0 + undef382)}>
<l25, l23, (undef391 = (0 + x0^0)) /\ (undef392 = (0 + x1^0)) /\ (undef393 = (0 + x2^0)) /\ (undef396 = undef396) /\ (undef397 = undef397) /\ ((0 + undef391) <= (0 + undef392)), par{oldX0^0 -> undef391, oldX1^0 -> undef392, oldX2^0 -> undef393, oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef396, oldX6^0 -> undef397, x0^0 -> (0 + undef391), x1^0 -> (0 + undef392), x2^0 -> (0 + undef393), x3^0 -> (0 + undef396), x4^0 -> (0 + undef397)}>
<l24, l25, (undef406 = (0 + x0^0)) /\ (undef407 = (0 + x1^0)) /\ (undef408 = (0 + x2^0)) /\ (undef411 = undef411) /\ (undef412 = undef412), par{oldX0^0 -> undef406, oldX1^0 -> undef407, oldX2^0 -> undef408, oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef411, oldX6^0 -> undef412, x0^0 -> (0 + undef406), x1^0 -> (0 + undef407), x2^0 -> (0 + undef408), x3^0 -> (0 + undef411), x4^0 -> (0 + undef412)}>
<l26, l27, (undef426 = undef426) /\ (undef427 = undef427) /\ (undef428 = undef428) /\ (undef429 = undef429) /\ (undef430 = undef430), par{oldX0^0 -> (0 + x0^0), oldX1^0 -> (0 + x1^0), oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef426, oldX6^0 -> undef427, oldX7^0 -> undef428, oldX8^0 -> undef429, oldX9^0 -> undef430, x0^0 -> (0 + undef426), x1^0 -> (0 + undef427), x2^0 -> (0 + undef428), x3^0 -> (0 + undef429), x4^0 -> (0 + undef430)}>
<l28, l27, (undef441 = undef441) /\ (undef442 = undef442) /\ (undef443 = undef443) /\ (undef444 = undef444) /\ (undef445 = undef445), par{oldX0^0 -> (0 + x0^0), oldX1^0 -> (0 + x1^0), oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef441, oldX6^0 -> undef442, oldX7^0 -> undef443, oldX8^0 -> undef444, oldX9^0 -> undef445, x0^0 -> (0 + undef441), x1^0 -> (0 + undef442), x2^0 -> (0 + undef443), x3^0 -> (0 + undef444), x4^0 -> (0 + undef445)}>
<l28, l29, (undef451 = (0 + x0^0)) /\ (undef452 = (0 + x1^0)) /\ (undef453 = (0 + x2^0)) /\ (undef454 = (0 + x3^0)) /\ (undef456 = undef456), par{oldX0^0 -> undef451, oldX1^0 -> undef452, oldX2^0 -> undef453, oldX3^0 -> undef454, oldX4^0 -> (0 + x4^0), oldX5^0 -> undef456, x0^0 -> (~(1) + undef451), x1^0 -> (0 + undef452), x2^0 -> (0 + undef453), x3^0 -> (0 + undef454), x4^0 -> (0 + undef456)}>
<l30, l26, (undef466 = (0 + x0^0)) /\ (undef467 = (0 + x1^0)) /\ (undef468 = (0 + x2^0)) /\ (undef469 = (0 + x3^0)) /\ (undef471 = undef471) /\ ((1 + undef466) <= (0 + undef467)), par{oldX0^0 -> undef466, oldX1^0 -> undef467, oldX2^0 -> undef468, oldX3^0 -> undef469, oldX4^0 -> (0 + x4^0), oldX5^0 -> undef471, x0^0 -> (0 + undef466), x1^0 -> (0 + undef467), x2^0 -> (0 + undef468), x3^0 -> (0 + undef469), x4^0 -> (0 + undef471)}>
<l30, l28, (undef481 = (0 + x0^0)) /\ (undef482 = (0 + x1^0)) /\ (undef483 = (0 + x2^0)) /\ (undef484 = (0 + x3^0)) /\ (undef486 = undef486) /\ ((0 + undef482) <= (0 + undef481)), par{oldX0^0 -> undef481, oldX1^0 -> undef482, oldX2^0 -> undef483, oldX3^0 -> undef484, oldX4^0 -> (0 + x4^0), oldX5^0 -> undef486, x0^0 -> (0 + undef481), x1^0 -> (0 + undef482), x2^0 -> (0 + undef483), x3^0 -> (0 + undef484), x4^0 -> (0 + undef486)}>
<l29, l30, (undef496 = (0 + x0^0)) /\ (undef497 = (0 + x1^0)) /\ (undef498 = (0 + x2^0)) /\ (undef499 = (0 + x3^0)) /\ (undef501 = undef501), par{oldX0^0 -> undef496, oldX1^0 -> undef497, oldX2^0 -> undef498, oldX3^0 -> undef499, oldX4^0 -> (0 + x4^0), oldX5^0 -> undef501, x0^0 -> (0 + undef496), x1^0 -> (0 + undef497), x2^0 -> (0 + undef498), x3^0 -> (0 + undef499), x4^0 -> (0 + undef501)}>
<l11, l20, (undef511 = (0 + x0^0)) /\ (undef512 = (0 + x1^0)) /\ (undef516 = undef516) /\ (undef517 = undef517) /\ (undef518 = undef518), par{oldX0^0 -> undef511, oldX1^0 -> undef512, oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef516, oldX6^0 -> undef517, oldX7^0 -> undef518, x0^0 -> (0 + undef511), x1^0 -> (0 + undef512), x2^0 -> (0 + undef516), x3^0 -> (0 + undef517), x4^0 -> (0 + undef518)}>
<l31, l14, (undef526 = (0 + x0^0)) /\ (undef531 = undef531) /\ (undef532 = undef532) /\ (undef533 = undef533) /\ (undef534 = undef534), par{oldX0^0 -> undef526, oldX1^0 -> (0 + x1^0), oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> (0 + x4^0), oldX5^0 -> undef531, oldX6^0 -> undef532, oldX7^0 -> undef533, oldX8^0 -> undef534, x0^0 -> (0 + undef526), x1^0 -> (0 + undef531), x2^0 -> (0 + undef532), x3^0 -> (0 + undef533), x4^0 -> (0 + undef534)}>
<l31, l1, true>
<l31, l3, true>
<l31, l5, true>
<l31, l4, true>
<l31, l7, true>
<l31, l6, true>
<l31, l9, true>
<l31, l8, true>
<l31, l10, true>
<l31, l12, true>
<l31, l13, true>
<l31, l14, true>
<l31, l16, true>
<l31, l15, true>
<l31, l17, true>
<l31, l19, true>
<l31, l18, true>
<l31, l22, true>
<l31, l20, true>
<l31, l21, true>
<l31, l23, true>
<l31, l25, true>
<l31, l24, true>
<l31, l27, true>
<l31, l26, true>
<l31, l28, true>
<l31, l30, true>
<l31, l29, true>
<l31, l2, true>
<l31, l11, true>
<l32, l31, true>

Fresh variables:
undef6, undef7, undef8, undef9, undef10, undef21, undef22, undef23, undef24, undef25, undef31, undef32, undef33, undef34, undef35, undef46, undef47, undef48, undef49, undef50, undef61, undef62, undef63, undef64, undef65, undef76, undef77, undef78, undef79, undef80, undef96, undef97, undef98, undef99, undef100, undef111, undef112, undef113, undef114, undef115, undef126, undef127, undef128, undef129, undef130, undef136, undef137, undef141, undef142, undef143, undef151, undef152, undef156, undef157, undef158, undef166, undef167, undef171, undef172, undef173, undef181, undef182, undef186, undef187, undef188, undef196, undef201, undef202, undef203, undef216, undef217, undef218, undef219, undef220, undef231, undef232, undef233, undef234, undef235, undef241, undef242, undef246, undef247, undef248, undef256, undef257, undef261, undef262, undef263, undef271, undef272, undef276, undef277, undef278, undef286, undef287, undef291, undef292, undef293, undef301, undef302, undef306, undef307, undef308, undef316, undef317, undef321, undef322, undef323, undef336, undef337, undef338, undef339, undef340, undef351, undef352, undef353, undef354, undef355, undef361, undef362, undef363, undef366, undef367, undef376, undef377, undef378, undef381, undef382, undef391, undef392, undef393, undef396, undef397, undef406, undef407, undef408, undef411, undef412, undef426, undef427, undef428, undef429, undef430, undef441, undef442, undef443, undef444, undef445, undef451, undef452, undef453, undef454, undef456, undef466, undef467, undef468, undef469, undef471, undef481, undef482, undef483, undef484, undef486, undef496, undef497, undef498, undef499, undef501, undef511, undef512, undef516, undef517, undef518, undef526, undef531, undef532, undef533, undef534, 

Undef variables:
undef6, undef7, undef8, undef9, undef10, undef21, undef22, undef23, undef24, undef25, undef31, undef32, undef33, undef34, undef35, undef46, undef47, undef48, undef49, undef50, undef61, undef62, undef63, undef64, undef65, undef76, undef77, undef78, undef79, undef80, undef96, undef97, undef98, undef99, undef100, undef111, undef112, undef113, undef114, undef115, undef126, undef127, undef128, undef129, undef130, undef136, undef137, undef141, undef142, undef143, undef151, undef152, undef156, undef157, undef158, undef166, undef167, undef171, undef172, undef173, undef181, undef182, undef186, undef187, undef188, undef196, undef201, undef202, undef203, undef216, undef217, undef218, undef219, undef220, undef231, undef232, undef233, undef234, undef235, undef241, undef242, undef246, undef247, undef248, undef256, undef257, undef261, undef262, undef263, undef271, undef272, undef276, undef277, undef278, undef286, undef287, undef291, undef292, undef293, undef301, undef302, undef306, undef307, undef308, undef316, undef317, undef321, undef322, undef323, undef336, undef337, undef338, undef339, undef340, undef351, undef352, undef353, undef354, undef355, undef361, undef362, undef363, undef366, undef367, undef376, undef377, undef378, undef381, undef382, undef391, undef392, undef393, undef396, undef397, undef406, undef407, undef408, undef411, undef412, undef426, undef427, undef428, undef429, undef430, undef441, undef442, undef443, undef444, undef445, undef451, undef452, undef453, undef454, undef456, undef466, undef467, undef468, undef469, undef471, undef481, undef482, undef483, undef484, undef486, undef496, undef497, undef498, undef499, undef501, undef511, undef512, undef516, undef517, undef518, undef526, undef531, undef532, undef533, undef534, 

Abstraction variables:

Exit nodes:

Accepting locations:

Asserts:

Preprocessed LLVMGraph
Init Location: 0
Transitions:
<l0, l13, (undef526 = (0 + x0^0)) /\ (undef531 = undef531) /\ (undef532 = undef532) /\ (undef533 = undef533) /\ (undef534 = undef534) /\ (undef196 = (0 + (0 + undef526))) /\ (undef201 = undef201) /\ (undef202 = undef202) /\ (undef203 = undef203), par{x0^0 -> (0 + undef196), x1^0 -> 0, x2^0 -> (0 + undef201), x3^0 -> (0 + undef202), x4^0 -> (0 + undef203)}>
<l0, l2, (undef6 = undef6) /\ (undef7 = undef7) /\ (undef8 = undef8) /\ (undef9 = undef9) /\ (undef10 = undef10), par{x0^0 -> (0 + undef6), x1^0 -> (0 + undef7), x2^0 -> (0 + undef8), x3^0 -> (0 + undef9), x4^0 -> (0 + undef10)}>
<l0, l3, true>
<l0, l5, true>
<l0, l5, (undef76 = (0 + x0^0)) /\ (undef77 = (0 + x1^0)) /\ (undef78 = (0 + x2^0)) /\ (undef79 = (0 + x3^0)) /\ (undef80 = (0 + x4^0)), par{x0^0 -> (0 + undef76), x1^0 -> (0 + undef77), x2^0 -> (0 + undef78), x3^0 -> (0 + undef79), x4^0 -> (0 + undef80)}>
<l0, l7, true>
<l0, l7, (undef96 = undef96) /\ (undef97 = undef97) /\ (undef98 = undef98) /\ (undef99 = undef99) /\ (undef100 = undef100), par{x0^0 -> (0 + undef96), x1^0 -> (0 + undef97), x2^0 -> (0 + undef98), x3^0 -> (0 + undef99), x4^0 -> (0 + undef100)}>
<l0, l9, true>
<l0, l9, (undef111 = undef111) /\ (undef112 = undef112) /\ (undef113 = undef113) /\ (undef114 = undef114) /\ (undef115 = undef115), par{x0^0 -> (0 + undef111), x1^0 -> (0 + undef112), x2^0 -> (0 + undef113), x3^0 -> (0 + undef114), x4^0 -> (0 + undef115)}>
<l0, l10, true>
<l0, l12, true>
<l0, l13, true>
<l0, l13, (undef196 = (0 + x0^0)) /\ (undef201 = undef201) /\ (undef202 = undef202) /\ (undef203 = undef203), par{x0^0 -> (0 + undef196), x1^0 -> 0, x2^0 -> (0 + undef201), x3^0 -> (0 + undef202), x4^0 -> (0 + undef203)}>
<l0, l16, true>
<l0, l16, (undef216 = undef216) /\ (undef217 = undef217) /\ (undef218 = undef218) /\ (undef219 = undef219) /\ (undef220 = undef220), par{x0^0 -> (0 + undef216), x1^0 -> (0 + undef217), x2^0 -> (0 + undef218), x3^0 -> (0 + undef219), x4^0 -> (0 + undef220)}>
<l0, l17, true>
<l0, l19, true>
<l0, l19, (undef286 = (0 + x0^0)) /\ (undef287 = (0 + x1^0)) /\ (undef291 = undef291) /\ (undef292 = undef292) /\ (undef293 = undef293), par{x0^0 -> (0 + undef286), x1^0 -> (0 + undef287), x2^0 -> (0 + undef291), x3^0 -> (0 + undef292), x4^0 -> (0 + undef293)}>
<l0, l22, true>
<l0, l20, true>
<l0, l22, (undef336 = undef336) /\ (undef337 = undef337) /\ (undef338 = undef338) /\ (undef339 = undef339) /\ (undef340 = undef340), par{x0^0 -> (0 + undef336), x1^0 -> (0 + undef337), x2^0 -> (0 + undef338), x3^0 -> (0 + undef339), x4^0 -> (0 + undef340)}>
<l0, l23, true>
<l0, l25, true>
<l0, l25, (undef406 = (0 + x0^0)) /\ (undef407 = (0 + x1^0)) /\ (undef408 = (0 + x2^0)) /\ (undef411 = undef411) /\ (undef412 = undef412), par{x0^0 -> (0 + undef406), x1^0 -> (0 + undef407), x2^0 -> (0 + undef408), x3^0 -> (0 + undef411), x4^0 -> (0 + undef412)}>
<l0, l27, true>
<l0, l27, (undef426 = undef426) /\ (undef427 = undef427) /\ (undef428 = undef428) /\ (undef429 = undef429) /\ (undef430 = undef430), par{x0^0 -> (0 + undef426), x1^0 -> (0 + undef427), x2^0 -> (0 + undef428), x3^0 -> (0 + undef429), x4^0 -> (0 + undef430)}>
<l0, l28, true>
<l0, l30, true>
<l0, l30, (undef496 = (0 + x0^0)) /\ (undef497 = (0 + x1^0)) /\ (undef498 = (0 + x2^0)) /\ (undef499 = (0 + x3^0)) /\ (undef501 = undef501), par{x0^0 -> (0 + undef496), x1^0 -> (0 + undef497), x2^0 -> (0 + undef498), x3^0 -> (0 + undef499), x4^0 -> (0 + undef501)}>
<l0, l2, true>
<l0, l20, (undef511 = (0 + x0^0)) /\ (undef512 = (0 + x1^0)) /\ (undef516 = undef516) /\ (undef517 = undef517) /\ (undef518 = undef518), par{x0^0 -> (0 + undef511), x1^0 -> (0 + undef512), x2^0 -> (0 + undef516), x3^0 -> (0 + undef517), x4^0 -> (0 + undef518)}>
<l3, l2, (undef21 = undef21) /\ (undef22 = undef22) /\ (undef23 = undef23) /\ (undef24 = undef24) /\ (undef25 = undef25), par{x0^0 -> (0 + undef21), x1^0 -> (0 + undef22), x2^0 -> (0 + undef23), x3^0 -> (0 + undef24), x4^0 -> (0 + undef25)}>
<l3, l5, (undef31 = (0 + x0^0)) /\ (undef32 = (0 + x1^0)) /\ (undef33 = (0 + x2^0)) /\ (undef34 = (0 + x3^0)) /\ (undef35 = (0 + x4^0)) /\ (undef76 = (0 + (1 + undef31))) /\ (undef77 = (0 + (0 + undef32))) /\ (undef78 = (0 + (0 + undef33))) /\ (undef79 = (0 + (0 + undef34))) /\ (undef80 = (0 + (0 + undef35))), par{x0^0 -> (0 + undef76), x1^0 -> (0 + undef77), x2^0 -> (0 + undef78), x3^0 -> (0 + undef79), x4^0 -> (0 + undef80)}>
<l5, l2, (undef46 = (0 + x0^0)) /\ (undef47 = (0 + x1^0)) /\ (undef48 = (0 + x2^0)) /\ (undef49 = (0 + x3^0)) /\ (undef50 = (0 + x4^0)) /\ ((1 + undef47) <= (0 + undef46)) /\ (undef6 = undef6) /\ (undef7 = undef7) /\ (undef8 = undef8) /\ (undef9 = undef9) /\ (undef10 = undef10), par{x0^0 -> (0 + undef6), x1^0 -> (0 + undef7), x2^0 -> (0 + undef8), x3^0 -> (0 + undef9), x4^0 -> (0 + undef10)}>
<l5, l3, (undef61 = (0 + x0^0)) /\ (undef62 = (0 + x1^0)) /\ (undef63 = (0 + x2^0)) /\ (undef64 = (0 + x3^0)) /\ (undef65 = (0 + x4^0)) /\ ((0 + undef61) <= (0 + undef62)), par{x0^0 -> (0 + undef61), x1^0 -> (0 + undef62), x2^0 -> (0 + undef63), x3^0 -> (0 + undef64), x4^0 -> (0 + undef65)}>
<l10, l7, (undef126 = undef126) /\ (undef127 = undef127) /\ (undef128 = undef128) /\ (undef129 = undef129) /\ (undef130 = undef130), par{x0^0 -> (0 + undef126), x1^0 -> (0 + undef127), x2^0 -> (0 + undef128), x3^0 -> (0 + undef129), x4^0 -> (0 + undef130)}>
<l10, l20, (undef136 = (0 + x0^0)) /\ (undef137 = (0 + x1^0)) /\ (undef141 = undef141) /\ (undef142 = undef142) /\ (undef143 = undef143) /\ (undef511 = (0 + (~(1) + undef136))) /\ (undef512 = (0 + (0 + undef137))) /\ (undef516 = undef516) /\ (undef517 = undef517) /\ (undef518 = undef518), par{x0^0 -> (0 + undef511), x1^0 -> (0 + undef512), x2^0 -> (0 + undef516), x3^0 -> (0 + undef517), x4^0 -> (0 + undef518)}>
<l12, l13, (undef151 = (0 + x0^0)) /\ (undef152 = (0 + x1^0)) /\ (undef156 = undef156) /\ (undef157 = undef157) /\ (undef158 = undef158), par{x0^0 -> (0 + undef151), x1^0 -> (1 + undef152), x2^0 -> (0 + undef156), x3^0 -> (0 + undef157), x4^0 -> (0 + undef158)}>
<l13, l9, (undef166 = (0 + x0^0)) /\ (undef167 = (0 + x1^0)) /\ (undef171 = undef171) /\ (undef172 = undef172) /\ (undef173 = undef173) /\ ((0 + undef166) <= (0 + undef167)) /\ (undef111 = undef111) /\ (undef112 = undef112) /\ (undef113 = undef113) /\ (undef114 = undef114) /\ (undef115 = undef115), par{x0^0 -> (0 + undef111), x1^0 -> (0 + undef112), x2^0 -> (0 + undef113), x3^0 -> (0 + undef114), x4^0 -> (0 + undef115)}>
<l13, l12, (undef181 = (0 + x0^0)) /\ (undef182 = (0 + x1^0)) /\ (undef186 = undef186) /\ (undef187 = undef187) /\ (undef188 = undef188) /\ ((1 + undef182) <= (0 + undef181)), par{x0^0 -> (0 + undef181), x1^0 -> (0 + undef182), x2^0 -> (0 + undef186), x3^0 -> (0 + undef187), x4^0 -> (0 + undef188)}>
<l17, l16, (undef231 = undef231) /\ (undef232 = undef232) /\ (undef233 = undef233) /\ (undef234 = undef234) /\ (undef235 = undef235), par{x0^0 -> (0 + undef231), x1^0 -> (0 + undef232), x2^0 -> (0 + undef233), x3^0 -> (0 + undef234), x4^0 -> (0 + undef235)}>
<l17, l19, (undef241 = (0 + x0^0)) /\ (undef242 = (0 + x1^0)) /\ (undef246 = undef246) /\ (undef247 = undef247) /\ (undef248 = undef248) /\ (undef286 = (0 + (1 + undef241))) /\ (undef287 = (0 + (0 + undef242))) /\ (undef291 = undef291) /\ (undef292 = undef292) /\ (undef293 = undef293), par{x0^0 -> (0 + undef286), x1^0 -> (0 + undef287), x2^0 -> (0 + undef291), x3^0 -> (0 + undef292), x4^0 -> (0 + undef293)}>
<l19, l16, (undef256 = (0 + x0^0)) /\ (undef257 = (0 + x1^0)) /\ (undef261 = undef261) /\ (undef262 = undef262) /\ (undef263 = undef263) /\ ((1 + undef257) <= (0 + undef256)) /\ (undef216 = undef216) /\ (undef217 = undef217) /\ (undef218 = undef218) /\ (undef219 = undef219) /\ (undef220 = undef220), par{x0^0 -> (0 + undef216), x1^0 -> (0 + undef217), x2^0 -> (0 + undef218), x3^0 -> (0 + undef219), x4^0 -> (0 + undef220)}>
<l19, l17, (undef271 = (0 + x0^0)) /\ (undef272 = (0 + x1^0)) /\ (undef276 = undef276) /\ (undef277 = undef277) /\ (undef278 = undef278) /\ ((0 + undef271) <= (0 + undef272)), par{x0^0 -> (0 + undef271), x1^0 -> (0 + undef272), x2^0 -> (0 + undef276), x3^0 -> (0 + undef277), x4^0 -> (0 + undef278)}>
<l20, l7, (undef301 = (0 + x0^0)) /\ (undef302 = (0 + x1^0)) /\ (undef306 = undef306) /\ (undef307 = undef307) /\ (undef308 = undef308) /\ ((1 + undef301) <= (0 + undef302)) /\ (undef96 = undef96) /\ (undef97 = undef97) /\ (undef98 = undef98) /\ (undef99 = undef99) /\ (undef100 = undef100), par{x0^0 -> (0 + undef96), x1^0 -> (0 + undef97), x2^0 -> (0 + undef98), x3^0 -> (0 + undef99), x4^0 -> (0 + undef100)}>
<l20, l10, (undef316 = (0 + x0^0)) /\ (undef317 = (0 + x1^0)) /\ (undef321 = undef321) /\ (undef322 = undef322) /\ (undef323 = undef323) /\ ((0 + undef317) <= (0 + undef316)), par{x0^0 -> (0 + undef316), x1^0 -> (0 + undef317), x2^0 -> (0 + undef321), x3^0 -> (0 + undef322), x4^0 -> (0 + undef323)}>
<l23, l22, (undef351 = undef351) /\ (undef352 = undef352) /\ (undef353 = undef353) /\ (undef354 = undef354) /\ (undef355 = undef355), par{x0^0 -> (0 + undef351), x1^0 -> (0 + undef352), x2^0 -> (0 + undef353), x3^0 -> (0 + undef354), x4^0 -> (0 + undef355)}>
<l23, l25, (undef361 = (0 + x0^0)) /\ (undef362 = (0 + x1^0)) /\ (undef363 = (0 + x2^0)) /\ (undef366 = undef366) /\ (undef367 = undef367) /\ (undef406 = (0 + (1 + undef361))) /\ (undef407 = (0 + (0 + undef362))) /\ (undef408 = (0 + (0 + undef363))) /\ (undef411 = undef411) /\ (undef412 = undef412), par{x0^0 -> (0 + undef406), x1^0 -> (0 + undef407), x2^0 -> (0 + undef408), x3^0 -> (0 + undef411), x4^0 -> (0 + undef412)}>
<l25, l22, (undef376 = (0 + x0^0)) /\ (undef377 = (0 + x1^0)) /\ (undef378 = (0 + x2^0)) /\ (undef381 = undef381) /\ (undef382 = undef382) /\ ((1 + undef377) <= (0 + undef376)) /\ (undef336 = undef336) /\ (undef337 = undef337) /\ (undef338 = undef338) /\ (undef339 = undef339) /\ (undef340 = undef340), par{x0^0 -> (0 + undef336), x1^0 -> (0 + undef337), x2^0 -> (0 + undef338), x3^0 -> (0 + undef339), x4^0 -> (0 + undef340)}>
<l25, l23, (undef391 = (0 + x0^0)) /\ (undef392 = (0 + x1^0)) /\ (undef393 = (0 + x2^0)) /\ (undef396 = undef396) /\ (undef397 = undef397) /\ ((0 + undef391) <= (0 + undef392)), par{x0^0 -> (0 + undef391), x1^0 -> (0 + undef392), x2^0 -> (0 + undef393), x3^0 -> (0 + undef396), x4^0 -> (0 + undef397)}>
<l28, l27, (undef441 = undef441) /\ (undef442 = undef442) /\ (undef443 = undef443) /\ (undef444 = undef444) /\ (undef445 = undef445), par{x0^0 -> (0 + undef441), x1^0 -> (0 + undef442), x2^0 -> (0 + undef443), x3^0 -> (0 + undef444), x4^0 -> (0 + undef445)}>
<l28, l30, (undef451 = (0 + x0^0)) /\ (undef452 = (0 + x1^0)) /\ (undef453 = (0 + x2^0)) /\ (undef454 = (0 + x3^0)) /\ (undef456 = undef456) /\ (undef496 = (0 + (~(1) + undef451))) /\ (undef497 = (0 + (0 + undef452))) /\ (undef498 = (0 + (0 + undef453))) /\ (undef499 = (0 + (0 + undef454))) /\ (undef501 = undef501), par{x0^0 -> (0 + undef496), x1^0 -> (0 + undef497), x2^0 -> (0 + undef498), x3^0 -> (0 + undef499), x4^0 -> (0 + undef501)}>
<l30, l27, (undef466 = (0 + x0^0)) /\ (undef467 = (0 + x1^0)) /\ (undef468 = (0 + x2^0)) /\ (undef469 = (0 + x3^0)) /\ (undef471 = undef471) /\ ((1 + undef466) <= (0 + undef467)) /\ (undef426 = undef426) /\ (undef427 = undef427) /\ (undef428 = undef428) /\ (undef429 = undef429) /\ (undef430 = undef430), par{x0^0 -> (0 + undef426), x1^0 -> (0 + undef427), x2^0 -> (0 + undef428), x3^0 -> (0 + undef429), x4^0 -> (0 + undef430)}>
<l30, l28, (undef481 = (0 + x0^0)) /\ (undef482 = (0 + x1^0)) /\ (undef483 = (0 + x2^0)) /\ (undef484 = (0 + x3^0)) /\ (undef486 = undef486) /\ ((0 + undef482) <= (0 + undef481)), par{x0^0 -> (0 + undef481), x1^0 -> (0 + undef482), x2^0 -> (0 + undef483), x3^0 -> (0 + undef484), x4^0 -> (0 + undef486)}>

Fresh variables:
undef6, undef7, undef8, undef9, undef10, undef21, undef22, undef23, undef24, undef25, undef31, undef32, undef33, undef34, undef35, undef46, undef47, undef48, undef49, undef50, undef61, undef62, undef63, undef64, undef65, undef76, undef77, undef78, undef79, undef80, undef96, undef97, undef98, undef99, undef100, undef111, undef112, undef113, undef114, undef115, undef126, undef127, undef128, undef129, undef130, undef136, undef137, undef141, undef142, undef143, undef151, undef152, undef156, undef157, undef158, undef166, undef167, undef171, undef172, undef173, undef181, undef182, undef186, undef187, undef188, undef196, undef201, undef202, undef203, undef216, undef217, undef218, undef219, undef220, undef231, undef232, undef233, undef234, undef235, undef241, undef242, undef246, undef247, undef248, undef256, undef257, undef261, undef262, undef263, undef271, undef272, undef276, undef277, undef278, undef286, undef287, undef291, undef292, undef293, undef301, undef302, undef306, undef307, undef308, undef316, undef317, undef321, undef322, undef323, undef336, undef337, undef338, undef339, undef340, undef351, undef352, undef353, undef354, undef355, undef361, undef362, undef363, undef366, undef367, undef376, undef377, undef378, undef381, undef382, undef391, undef392, undef393, undef396, undef397, undef406, undef407, undef408, undef411, undef412, undef426, undef427, undef428, undef429, undef430, undef441, undef442, undef443, undef444, undef445, undef451, undef452, undef453, undef454, undef456, undef466, undef467, undef468, undef469, undef471, undef481, undef482, undef483, undef484, undef486, undef496, undef497, undef498, undef499, undef501, undef511, undef512, undef516, undef517, undef518, undef526, undef531, undef532, undef533, undef534, 

Undef variables:
undef6, undef7, undef8, undef9, undef10, undef21, undef22, undef23, undef24, undef25, undef31, undef32, undef33, undef34, undef35, undef46, undef47, undef48, undef49, undef50, undef61, undef62, undef63, undef64, undef65, undef76, undef77, undef78, undef79, undef80, undef96, undef97, undef98, undef99, undef100, undef111, undef112, undef113, undef114, undef115, undef126, undef127, undef128, undef129, undef130, undef136, undef137, undef141, undef142, undef143, undef151, undef152, undef156, undef157, undef158, undef166, undef167, undef171, undef172, undef173, undef181, undef182, undef186, undef187, undef188, undef196, undef201, undef202, undef203, undef216, undef217, undef218, undef219, undef220, undef231, undef232, undef233, undef234, undef235, undef241, undef242, undef246, undef247, undef248, undef256, undef257, undef261, undef262, undef263, undef271, undef272, undef276, undef277, undef278, undef286, undef287, undef291, undef292, undef293, undef301, undef302, undef306, undef307, undef308, undef316, undef317, undef321, undef322, undef323, undef336, undef337, undef338, undef339, undef340, undef351, undef352, undef353, undef354, undef355, undef361, undef362, undef363, undef366, undef367, undef376, undef377, undef378, undef381, undef382, undef391, undef392, undef393, undef396, undef397, undef406, undef407, undef408, undef411, undef412, undef426, undef427, undef428, undef429, undef430, undef441, undef442, undef443, undef444, undef445, undef451, undef452, undef453, undef454, undef456, undef466, undef467, undef468, undef469, undef471, undef481, undef482, undef483, undef484, undef486, undef496, undef497, undef498, undef499, undef501, undef511, undef512, undef516, undef517, undef518, undef526, undef531, undef532, undef533, undef534, 

Abstraction variables:

Exit nodes:

Accepting locations:

Asserts:

*************************************************************
*******************************************************************************************
***********************       WORKING TRANSITION SYSTEM (DAG)       ***********************
*******************************************************************************************

Init Location: 0
Graph 0:
Transitions:
Variables:

Graph 1:
Transitions:
<l28, l30, x0^0 = undef451 /\ x1^0 = undef452 /\ x2^0 = undef453 /\ x3^0 = undef454 /\ undef452 = undef497 /\ undef453 = undef498 /\ undef454 = undef499 /\ undef451 = 1 + undef496, {x0^0 -> undef496, x1^0 -> undef497, x2^0 -> undef498, x3^0 -> undef499, x4^0 -> undef501, rest remain the same}>
<l30, l28, undef482 <= undef481 /\ x0^0 = undef481 /\ x1^0 = undef482 /\ x2^0 = undef483 /\ x3^0 = undef484, {x0^0 -> undef481, x1^0 -> undef482, x2^0 -> undef483, x3^0 -> undef484, x4^0 -> undef486, rest remain the same}>
Variables:
x0^0, x1^0, x2^0, x3^0, x4^0

Graph 2:
Transitions:
Variables:

Graph 3:
Transitions:
<l23, l25, x0^0 = undef361 /\ x1^0 = undef362 /\ x2^0 = undef363 /\ undef362 = undef407 /\ undef363 = undef408 /\ 1 + undef361 = undef406, {x0^0 -> undef406, x1^0 -> undef407, x2^0 -> undef408, x3^0 -> undef411, x4^0 -> undef412, rest remain the same}>
<l25, l23, undef391 <= undef392 /\ x0^0 = undef391 /\ x1^0 = undef392 /\ x2^0 = undef393, {x0^0 -> undef391, x1^0 -> undef392, x2^0 -> undef393, x3^0 -> undef396, x4^0 -> undef397, rest remain the same}>
Variables:
x0^0, x1^0, x2^0, x3^0, x4^0

Graph 4:
Transitions:
Variables:

Graph 5:
Transitions:
<l17, l19, x0^0 = undef241 /\ x1^0 = undef242 /\ undef242 = undef287 /\ 1 + undef241 = undef286, {x0^0 -> undef286, x1^0 -> undef287, x2^0 -> undef291, x3^0 -> undef292, x4^0 -> undef293, rest remain the same}>
<l19, l17, undef271 <= undef272 /\ x0^0 = undef271 /\ x1^0 = undef272, {x0^0 -> undef271, x1^0 -> undef272, x2^0 -> undef276, x3^0 -> undef277, x4^0 -> undef278, rest remain the same}>
Variables:
x0^0, x1^0, x2^0, x3^0, x4^0

Graph 6:
Transitions:
Variables:

Graph 7:
Transitions:
<l10, l20, x0^0 = undef136 /\ x1^0 = undef137 /\ undef137 = undef512 /\ undef136 = 1 + undef511, {x0^0 -> undef511, x1^0 -> undef512, x2^0 -> undef516, x3^0 -> undef517, x4^0 -> undef518, rest remain the same}>
<l20, l10, undef317 <= undef316 /\ x0^0 = undef316 /\ x1^0 = undef317, {x0^0 -> undef316, x1^0 -> undef317, x2^0 -> undef321, x3^0 -> undef322, x4^0 -> undef323, rest remain the same}>
Variables:
x0^0, x1^0, x2^0, x3^0, x4^0

Graph 8:
Transitions:
Variables:

Graph 9:
Transitions:
<l3, l5, x0^0 = undef31 /\ x1^0 = undef32 /\ x2^0 = undef33 /\ x3^0 = undef34 /\ x4^0 = undef35 /\ undef32 = undef77 /\ undef33 = undef78 /\ undef34 = undef79 /\ undef35 = undef80 /\ 1 + undef31 = undef76, {x0^0 -> undef76, x1^0 -> undef77, x2^0 -> undef78, x3^0 -> undef79, x4^0 -> undef80, rest remain the same}>
<l5, l3, undef61 <= undef62 /\ x0^0 = undef61 /\ x1^0 = undef62 /\ x2^0 = undef63 /\ x3^0 = undef64 /\ x4^0 = undef65, {x0^0 -> undef61, x1^0 -> undef62, x2^0 -> undef63, x3^0 -> undef64, x4^0 -> undef65, rest remain the same}>
Variables:
x0^0, x1^0, x2^0, x3^0, x4^0

Graph 10:
Transitions:
Variables:

Graph 11:
Transitions:
<l12, l13, x0^0 = undef151 /\ x1^0 = undef152, {x0^0 -> undef151, x1^0 -> 1 + undef152, x2^0 -> undef156, x3^0 -> undef157, x4^0 -> undef158, rest remain the same}>
<l13, l12, 1 + undef182 <= undef181 /\ x0^0 = undef181 /\ x1^0 = undef182, {x0^0 -> undef181, x1^0 -> undef182, x2^0 -> undef186, x3^0 -> undef187, x4^0 -> undef188, rest remain the same}>
Variables:
x0^0, x1^0, x2^0, x3^0, x4^0

Graph 12:
Transitions:
Variables:

Precedence: 
Graph 0

Graph 1
<l0, l28, true, {all remain the same}>
<l0, l30, true, {all remain the same}>
<l0, l30, x0^0 = undef496 /\ x1^0 = undef497 /\ x2^0 = undef498 /\ x3^0 = undef499, {x0^0 -> undef496, x1^0 -> undef497, x2^0 -> undef498, x3^0 -> undef499, x4^0 -> undef501, rest remain the same}>

Graph 2
<l0, l27, true, {all remain the same}>
<l0, l27, true, {x0^0 -> undef426, x1^0 -> undef427, x2^0 -> undef428, x3^0 -> undef429, x4^0 -> undef430, rest remain the same}>
<l28, l27, true, {x0^0 -> undef441, x1^0 -> undef442, x2^0 -> undef443, x3^0 -> undef444, x4^0 -> undef445, rest remain the same}>
<l30, l27, 1 + undef466 <= undef467 /\ x0^0 = undef466 /\ x1^0 = undef467 /\ x2^0 = undef468 /\ x3^0 = undef469, {x0^0 -> undef426, x1^0 -> undef427, x2^0 -> undef428, x3^0 -> undef429, x4^0 -> undef430, rest remain the same}>

Graph 3
<l0, l23, true, {all remain the same}>
<l0, l25, true, {all remain the same}>
<l0, l25, x0^0 = undef406 /\ x1^0 = undef407 /\ x2^0 = undef408, {x0^0 -> undef406, x1^0 -> undef407, x2^0 -> undef408, x3^0 -> undef411, x4^0 -> undef412, rest remain the same}>

Graph 4
<l0, l22, true, {all remain the same}>
<l0, l22, true, {x0^0 -> undef336, x1^0 -> undef337, x2^0 -> undef338, x3^0 -> undef339, x4^0 -> undef340, rest remain the same}>
<l23, l22, true, {x0^0 -> undef351, x1^0 -> undef352, x2^0 -> undef353, x3^0 -> undef354, x4^0 -> undef355, rest remain the same}>
<l25, l22, 1 + undef377 <= undef376 /\ x0^0 = undef376 /\ x1^0 = undef377 /\ x2^0 = undef378, {x0^0 -> undef336, x1^0 -> undef337, x2^0 -> undef338, x3^0 -> undef339, x4^0 -> undef340, rest remain the same}>

Graph 5
<l0, l17, true, {all remain the same}>
<l0, l19, true, {all remain the same}>
<l0, l19, x0^0 = undef286 /\ x1^0 = undef287, {x0^0 -> undef286, x1^0 -> undef287, x2^0 -> undef291, x3^0 -> undef292, x4^0 -> undef293, rest remain the same}>

Graph 6
<l0, l16, true, {all remain the same}>
<l0, l16, true, {x0^0 -> undef216, x1^0 -> undef217, x2^0 -> undef218, x3^0 -> undef219, x4^0 -> undef220, rest remain the same}>
<l17, l16, true, {x0^0 -> undef231, x1^0 -> undef232, x2^0 -> undef233, x3^0 -> undef234, x4^0 -> undef235, rest remain the same}>
<l19, l16, 1 + undef257 <= undef256 /\ x0^0 = undef256 /\ x1^0 = undef257, {x0^0 -> undef216, x1^0 -> undef217, x2^0 -> undef218, x3^0 -> undef219, x4^0 -> undef220, rest remain the same}>

Graph 7
<l0, l10, true, {all remain the same}>
<l0, l20, true, {all remain the same}>
<l0, l20, x0^0 = undef511 /\ x1^0 = undef512, {x0^0 -> undef511, x1^0 -> undef512, x2^0 -> undef516, x3^0 -> undef517, x4^0 -> undef518, rest remain the same}>

Graph 8
<l0, l7, true, {all remain the same}>
<l0, l7, true, {x0^0 -> undef96, x1^0 -> undef97, x2^0 -> undef98, x3^0 -> undef99, x4^0 -> undef100, rest remain the same}>
<l10, l7, true, {x0^0 -> undef126, x1^0 -> undef127, x2^0 -> undef128, x3^0 -> undef129, x4^0 -> undef130, rest remain the same}>
<l20, l7, 1 + undef301 <= undef302 /\ x0^0 = undef301 /\ x1^0 = undef302, {x0^0 -> undef96, x1^0 -> undef97, x2^0 -> undef98, x3^0 -> undef99, x4^0 -> undef100, rest remain the same}>

Graph 9
<l0, l3, true, {all remain the same}>
<l0, l5, true, {all remain the same}>
<l0, l5, x0^0 = undef76 /\ x1^0 = undef77 /\ x2^0 = undef78 /\ x3^0 = undef79 /\ x4^0 = undef80, {x0^0 -> undef76, x1^0 -> undef77, x2^0 -> undef78, x3^0 -> undef79, x4^0 -> undef80, rest remain the same}>

Graph 10
<l0, l2, true, {x0^0 -> undef6, x1^0 -> undef7, x2^0 -> undef8, x3^0 -> undef9, x4^0 -> undef10, rest remain the same}>
<l0, l2, true, {all remain the same}>
<l3, l2, true, {x0^0 -> undef21, x1^0 -> undef22, x2^0 -> undef23, x3^0 -> undef24, x4^0 -> undef25, rest remain the same}>
<l5, l2, 1 + undef47 <= undef46 /\ x0^0 = undef46 /\ x1^0 = undef47 /\ x2^0 = undef48 /\ x3^0 = undef49 /\ x4^0 = undef50, {x0^0 -> undef6, x1^0 -> undef7, x2^0 -> undef8, x3^0 -> undef9, x4^0 -> undef10, rest remain the same}>

Graph 11
<l0, l13, x0^0 = undef526 /\ undef196 = undef526, {x0^0 -> undef196, x1^0 -> 0, x2^0 -> undef201, x3^0 -> undef202, x4^0 -> undef203, rest remain the same}>
<l0, l12, true, {all remain the same}>
<l0, l13, true, {all remain the same}>
<l0, l13, x0^0 = undef196, {x0^0 -> undef196, x1^0 -> 0, x2^0 -> undef201, x3^0 -> undef202, x4^0 -> undef203, rest remain the same}>

Graph 12
<l0, l9, true, {all remain the same}>
<l0, l9, true, {x0^0 -> undef111, x1^0 -> undef112, x2^0 -> undef113, x3^0 -> undef114, x4^0 -> undef115, rest remain the same}>
<l13, l9, undef166 <= undef167 /\ x0^0 = undef166 /\ x1^0 = undef167, {x0^0 -> undef111, x1^0 -> undef112, x2^0 -> undef113, x3^0 -> undef114, x4^0 -> undef115, rest remain the same}>

Map Locations to Subgraph:
( 0 , 0 )
( 2 , 10 )
( 3 , 9 )
( 5 , 9 )
( 7 , 8 )
( 9 , 12 )
( 10 , 7 )
( 12 , 11 )
( 13 , 11 )
( 16 , 6 )
( 17 , 5 )
( 19 , 5 )
( 20 , 7 )
( 22 , 4 )
( 23 , 3 )
( 25 , 3 )
( 27 , 2 )
( 28 , 1 )
( 30 , 1 )

*******************************************************************************************
********************************    CHECKING ASSERTIONS    ********************************
*******************************************************************************************

Proving termination of subgraph 0
Proving termination of subgraph 1
Checking unfeasibility...
Time used: 0.008572

Checking conditional termination of SCC {l28, l30}...

LOG: CALL solveLinear

LOG: RETURN solveLinear - Elapsed time: 0.002197s

LOG: CALL solveLinear

LOG: RETURN solveLinear - Elapsed time: 0.011677s
[35735 : 35736]
[35735 : 35737]
Successful child: 35736
[ Invariant Graph ]
Strengthening and disabling transitions...

LOG: CALL solverLinear in Graph for feasibility

LOG: RETURN solveLinear in Graph for feasibility
Strengthening transition (result): 
<l28, l30, x1^0 <= 126 + x0^0 /\ x0^0 = undef451 /\ x1^0 = undef452 /\ x2^0 = undef453 /\ x3^0 = undef454 /\ undef452 = undef497 /\ undef453 = undef498 /\ undef454 = undef499 /\ undef451 = 1 + undef496, {x0^0 -> undef496, x1^0 -> undef497, x2^0 -> undef498, x3^0 -> undef499, x4^0 -> undef501, 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): 
<l28, l30, x1^0 <= 126 + x0^0 /\ x0^0 = undef451 /\ x1^0 = undef452 /\ x2^0 = undef453 /\ x3^0 = undef454 /\ undef452 = undef497 /\ undef453 = undef498 /\ undef454 = undef499 /\ undef451 = 1 + undef496, {x0^0 -> undef496, x1^0 -> undef497, x2^0 -> undef498, x3^0 -> undef499, x4^0 -> undef501, rest remain the same}>

LOG: CALL solverLinear in Graph for feasibility

LOG: RETURN solveLinear in Graph for feasibility
Ranking function: 126 + x0^0 - x1^0
New Graphs: 

LOG: CALL check - Post:x1^0 <= 126 + x0^0 - Process 1
* Exit transition: <l0, l28, true, {all remain the same}>
* Postcondition  : x1^0 <= 126 + x0^0

LOG: CALL solveLinear

LOG: RETURN solveLinear - Elapsed time: 0.000753s
> Postcondition is not implied!

LOG: RETURN check - Elapsed time: 0.000826s
INVARIANTS: 
28: 
Quasi-INVARIANTS to narrow Graph: 
28: x1^0 <= 126 + x0^0 , 
Narrowing transition: 
<l28, l30, x0^0 = undef451 /\ x1^0 = undef452 /\ x2^0 = undef453 /\ x3^0 = undef454 /\ undef452 = undef497 /\ undef453 = undef498 /\ undef454 = undef499 /\ undef451 = 1 + undef496, {x0^0 -> undef496, x1^0 -> undef497, x2^0 -> undef498, x3^0 -> undef499, x4^0 -> undef501, rest remain the same}>

LOG: Narrow transition size 1
It's unfeasible. Removing transition: 
<l30, l28, undef482 <= undef481 /\ x0^0 = undef481 /\ x1^0 = undef482 /\ x2^0 = undef483 /\ x3^0 = undef484, {x0^0 -> undef481, x1^0 -> undef482, x2^0 -> undef483, x3^0 -> undef484, x4^0 -> undef486, rest remain the same}>
invGraph after Narrowing: 
Transitions:
<l28, l30, 127 + x0^0 <= x1^0 /\ x0^0 = undef451 /\ x1^0 = undef452 /\ x2^0 = undef453 /\ x3^0 = undef454 /\ undef452 = undef497 /\ undef453 = undef498 /\ undef454 = undef499 /\ undef451 = 1 + undef496, {x0^0 -> undef496, x1^0 -> undef497, x2^0 -> undef498, x3^0 -> undef499, x4^0 -> undef501, rest remain the same}>
Variables:
x0^0, x1^0, x2^0, x3^0, x4^0
Proving termination of subgraph 2
Analyzing SCC {l27}...
No cycles found.

Proving termination of subgraph 3
Checking unfeasibility...
Time used: 0.007408

Checking conditional termination of SCC {l23, l25}...

LOG: CALL solveLinear

LOG: RETURN solveLinear - Elapsed time: 0.001950s

LOG: CALL solveLinear

LOG: RETURN solveLinear - Elapsed time: 0.007924s
[35735 : 35741]
[35735 : 35742]
Successful child: 35741
[ Invariant Graph ]
Strengthening and disabling transitions...

LOG: CALL solverLinear in Graph for feasibility

LOG: RETURN solveLinear in Graph for feasibility
Strengthening transition (result): 
<l23, l25, x0^0 <= 192 + x1^0 /\ x0^0 = undef361 /\ x1^0 = undef362 /\ x2^0 = undef363 /\ undef362 = undef407 /\ undef363 = undef408 /\ 1 + undef361 = undef406, {x0^0 -> undef406, x1^0 -> undef407, x2^0 -> undef408, x3^0 -> undef411, x4^0 -> undef412, 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): 
<l23, l25, x0^0 <= 192 + x1^0 /\ x0^0 = undef361 /\ x1^0 = undef362 /\ x2^0 = undef363 /\ undef362 = undef407 /\ undef363 = undef408 /\ 1 + undef361 = undef406, {x0^0 -> undef406, x1^0 -> undef407, x2^0 -> undef408, x3^0 -> undef411, x4^0 -> undef412, rest remain the same}>

LOG: CALL solverLinear in Graph for feasibility

LOG: RETURN solveLinear in Graph for feasibility
Ranking function: 192 - x0^0 + x1^0
New Graphs: 

LOG: CALL check - Post:x0^0 <= 192 + x1^0 - Process 2
* Exit transition: <l0, l23, true, {all remain the same}>
* Postcondition  : x0^0 <= 192 + x1^0

LOG: CALL solveLinear

LOG: RETURN solveLinear - Elapsed time: 0.000814s
> Postcondition is not implied!

LOG: RETURN check - Elapsed time: 0.000885s
INVARIANTS: 
23: 
Quasi-INVARIANTS to narrow Graph: 
23: x0^0 <= 192 + x1^0 , 
Narrowing transition: 
<l23, l25, x0^0 = undef361 /\ x1^0 = undef362 /\ x2^0 = undef363 /\ undef362 = undef407 /\ undef363 = undef408 /\ 1 + undef361 = undef406, {x0^0 -> undef406, x1^0 -> undef407, x2^0 -> undef408, x3^0 -> undef411, x4^0 -> undef412, rest remain the same}>

LOG: Narrow transition size 1
It's unfeasible. Removing transition: 
<l25, l23, undef391 <= undef392 /\ x0^0 = undef391 /\ x1^0 = undef392 /\ x2^0 = undef393, {x0^0 -> undef391, x1^0 -> undef392, x2^0 -> undef393, x3^0 -> undef396, x4^0 -> undef397, rest remain the same}>
invGraph after Narrowing: 
Transitions:
<l23, l25, 193 + x1^0 <= x0^0 /\ x0^0 = undef361 /\ x1^0 = undef362 /\ x2^0 = undef363 /\ undef362 = undef407 /\ undef363 = undef408 /\ 1 + undef361 = undef406, {x0^0 -> undef406, x1^0 -> undef407, x2^0 -> undef408, x3^0 -> undef411, x4^0 -> undef412, rest remain the same}>
Variables:
x0^0, x1^0, x2^0, x3^0, x4^0
Proving termination of subgraph 4
Analyzing SCC {l22}...
No cycles found.

Proving termination of subgraph 5
Checking unfeasibility...
Time used: 0.007189

Checking conditional termination of SCC {l17, l19}...

LOG: CALL solveLinear

LOG: RETURN solveLinear - Elapsed time: 0.001723s

LOG: CALL solveLinear

LOG: RETURN solveLinear - Elapsed time: 0.006230s
[35735 : 35746]
[35735 : 35747]
Successful child: 35746
[ Invariant Graph ]
Strengthening and disabling transitions...

LOG: CALL solverLinear in Graph for feasibility

LOG: RETURN solveLinear in Graph for feasibility
Strengthening transition (result): 
<l17, l19, x0^0 <= 221 + x1^0 /\ x0^0 = undef241 /\ x1^0 = undef242 /\ undef242 = undef287 /\ 1 + undef241 = undef286, {x0^0 -> undef286, x1^0 -> undef287, x2^0 -> undef291, x3^0 -> undef292, x4^0 -> undef293, 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): 
<l17, l19, x0^0 <= 221 + x1^0 /\ x0^0 = undef241 /\ x1^0 = undef242 /\ undef242 = undef287 /\ 1 + undef241 = undef286, {x0^0 -> undef286, x1^0 -> undef287, x2^0 -> undef291, x3^0 -> undef292, x4^0 -> undef293, rest remain the same}>

LOG: CALL solverLinear in Graph for feasibility

LOG: RETURN solveLinear in Graph for feasibility
Ranking function: 221 - x0^0 + x1^0
New Graphs: 

LOG: CALL check - Post:x0^0 <= 221 + x1^0 - Process 3
* Exit transition: <l0, l17, true, {all remain the same}>
* Postcondition  : x0^0 <= 221 + x1^0

LOG: CALL solveLinear

LOG: RETURN solveLinear - Elapsed time: 0.000883s
> Postcondition is not implied!

LOG: RETURN check - Elapsed time: 0.000955s
INVARIANTS: 
17: 
Quasi-INVARIANTS to narrow Graph: 
17: x0^0 <= 221 + x1^0 , 
Narrowing transition: 
<l17, l19, x0^0 = undef241 /\ x1^0 = undef242 /\ undef242 = undef287 /\ 1 + undef241 = undef286, {x0^0 -> undef286, x1^0 -> undef287, x2^0 -> undef291, x3^0 -> undef292, x4^0 -> undef293, rest remain the same}>

LOG: Narrow transition size 1
It's unfeasible. Removing transition: 
<l19, l17, undef271 <= undef272 /\ x0^0 = undef271 /\ x1^0 = undef272, {x0^0 -> undef271, x1^0 -> undef272, x2^0 -> undef276, x3^0 -> undef277, x4^0 -> undef278, rest remain the same}>
invGraph after Narrowing: 
Transitions:
<l17, l19, 222 + x1^0 <= x0^0 /\ x0^0 = undef241 /\ x1^0 = undef242 /\ undef242 = undef287 /\ 1 + undef241 = undef286, {x0^0 -> undef286, x1^0 -> undef287, x2^0 -> undef291, x3^0 -> undef292, x4^0 -> undef293, rest remain the same}>
Variables:
x0^0, x1^0, x2^0, x3^0, x4^0
Proving termination of subgraph 6
Analyzing SCC {l16}...
No cycles found.

Proving termination of subgraph 7
Checking unfeasibility...
Time used: 0.007111

Checking conditional termination of SCC {l10, l20}...

LOG: CALL solveLinear

LOG: RETURN solveLinear - Elapsed time: 0.001734s

LOG: CALL solveLinear

LOG: RETURN solveLinear - Elapsed time: 0.006158s
[35735 : 35751]
[35735 : 35752]
Successful child: 35751
[ Invariant Graph ]
Strengthening and disabling transitions...

LOG: CALL solverLinear in Graph for feasibility

LOG: RETURN solveLinear in Graph for feasibility
Strengthening transition (result): 
<l10, l20, x1^0 <= 180 + x0^0 /\ x0^0 = undef136 /\ x1^0 = undef137 /\ undef137 = undef512 /\ undef136 = 1 + undef511, {x0^0 -> undef511, x1^0 -> undef512, x2^0 -> undef516, x3^0 -> undef517, x4^0 -> undef518, 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): 
<l10, l20, x1^0 <= 180 + x0^0 /\ x0^0 = undef136 /\ x1^0 = undef137 /\ undef137 = undef512 /\ undef136 = 1 + undef511, {x0^0 -> undef511, x1^0 -> undef512, x2^0 -> undef516, x3^0 -> undef517, x4^0 -> undef518, rest remain the same}>

LOG: CALL solverLinear in Graph for feasibility

LOG: RETURN solveLinear in Graph for feasibility
Ranking function: 180 + x0^0 - x1^0
New Graphs: 

LOG: CALL check - Post:x1^0 <= 180 + x0^0 - Process 4
* Exit transition: <l0, l10, true, {all remain the same}>
* Postcondition  : x1^0 <= 180 + x0^0

LOG: CALL solveLinear

LOG: RETURN solveLinear - Elapsed time: 0.000979s
> Postcondition is not implied!

LOG: RETURN check - Elapsed time: 0.001049s
INVARIANTS: 
10: 
Quasi-INVARIANTS to narrow Graph: 
10: x1^0 <= 180 + x0^0 , 
Narrowing transition: 
<l10, l20, x0^0 = undef136 /\ x1^0 = undef137 /\ undef137 = undef512 /\ undef136 = 1 + undef511, {x0^0 -> undef511, x1^0 -> undef512, x2^0 -> undef516, x3^0 -> undef517, x4^0 -> undef518, rest remain the same}>

LOG: Narrow transition size 1
It's unfeasible. Removing transition: 
<l20, l10, undef317 <= undef316 /\ x0^0 = undef316 /\ x1^0 = undef317, {x0^0 -> undef316, x1^0 -> undef317, x2^0 -> undef321, x3^0 -> undef322, x4^0 -> undef323, rest remain the same}>
invGraph after Narrowing: 
Transitions:
<l10, l20, 181 + x0^0 <= x1^0 /\ x0^0 = undef136 /\ x1^0 = undef137 /\ undef137 = undef512 /\ undef136 = 1 + undef511, {x0^0 -> undef511, x1^0 -> undef512, x2^0 -> undef516, x3^0 -> undef517, x4^0 -> undef518, rest remain the same}>
Variables:
x0^0, x1^0, x2^0, x3^0, x4^0
Proving termination of subgraph 8
Analyzing SCC {l7}...
No cycles found.

Proving termination of subgraph 9
Checking unfeasibility...
Time used: 0.008308

Checking conditional termination of SCC {l3, l5}...

LOG: CALL solveLinear

LOG: RETURN solveLinear - Elapsed time: 0.002846s

LOG: CALL solveLinear

LOG: RETURN solveLinear - Elapsed time: 0.014790s
[35735 : 35820]
[35735 : 35821]
Successful child: 35820
[ Invariant Graph ]
Strengthening and disabling transitions...

LOG: CALL solverLinear in Graph for feasibility

LOG: RETURN solveLinear in Graph for feasibility
Strengthening transition (result): 
<l3, l5, x0^0 <= 99 + x1^0 /\ x0^0 = undef31 /\ x1^0 = undef32 /\ x2^0 = undef33 /\ x3^0 = undef34 /\ x4^0 = undef35 /\ undef32 = undef77 /\ undef33 = undef78 /\ undef34 = undef79 /\ undef35 = undef80 /\ 1 + undef31 = undef76, {x0^0 -> undef76, x1^0 -> undef77, x2^0 -> undef78, x3^0 -> undef79, x4^0 -> undef80, 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): 
<l3, l5, x0^0 <= 99 + x1^0 /\ x0^0 = undef31 /\ x1^0 = undef32 /\ x2^0 = undef33 /\ x3^0 = undef34 /\ x4^0 = undef35 /\ undef32 = undef77 /\ undef33 = undef78 /\ undef34 = undef79 /\ undef35 = undef80 /\ 1 + undef31 = undef76, {x0^0 -> undef76, x1^0 -> undef77, x2^0 -> undef78, x3^0 -> undef79, x4^0 -> undef80, rest remain the same}>

LOG: CALL solverLinear in Graph for feasibility

LOG: RETURN solveLinear in Graph for feasibility
Ranking function: 99 - x0^0 + x1^0
New Graphs: 

LOG: CALL check - Post:x0^0 <= 99 + x1^0 - Process 5
* Exit transition: <l0, l3, true, {all remain the same}>
* Postcondition  : x0^0 <= 99 + x1^0

LOG: CALL solveLinear

LOG: RETURN solveLinear - Elapsed time: 0.001060s
> Postcondition is not implied!

LOG: RETURN check - Elapsed time: 0.001130s
INVARIANTS: 
3: 
Quasi-INVARIANTS to narrow Graph: 
3: x0^0 <= 99 + x1^0 , 
Narrowing transition: 
<l3, l5, x0^0 = undef31 /\ x1^0 = undef32 /\ x2^0 = undef33 /\ x3^0 = undef34 /\ x4^0 = undef35 /\ undef32 = undef77 /\ undef33 = undef78 /\ undef34 = undef79 /\ undef35 = undef80 /\ 1 + undef31 = undef76, {x0^0 -> undef76, x1^0 -> undef77, x2^0 -> undef78, x3^0 -> undef79, x4^0 -> undef80, rest remain the same}>

LOG: Narrow transition size 1
It's unfeasible. Removing transition: 
<l5, l3, undef61 <= undef62 /\ x0^0 = undef61 /\ x1^0 = undef62 /\ x2^0 = undef63 /\ x3^0 = undef64 /\ x4^0 = undef65, {x0^0 -> undef61, x1^0 -> undef62, x2^0 -> undef63, x3^0 -> undef64, x4^0 -> undef65, rest remain the same}>
invGraph after Narrowing: 
Transitions:
<l3, l5, 100 + x1^0 <= x0^0 /\ x0^0 = undef31 /\ x1^0 = undef32 /\ x2^0 = undef33 /\ x3^0 = undef34 /\ x4^0 = undef35 /\ undef32 = undef77 /\ undef33 = undef78 /\ undef34 = undef79 /\ undef35 = undef80 /\ 1 + undef31 = undef76, {x0^0 -> undef76, x1^0 -> undef77, x2^0 -> undef78, x3^0 -> undef79, x4^0 -> undef80, rest remain the same}>
Variables:
x0^0, x1^0, x2^0, x3^0, x4^0
Proving termination of subgraph 10
Analyzing SCC {l2}...
No cycles found.

Proving termination of subgraph 11
Checking unfeasibility...
Time used: 0.00674

Checking conditional termination of SCC {l12, l13}...

LOG: CALL solveLinear

LOG: RETURN solveLinear - Elapsed time: 0.001632s

LOG: CALL solveLinear

LOG: RETURN solveLinear - Elapsed time: 0.004983s
[35735 : 35869]
[35735 : 35870]
Successful child: 35869
[ Invariant Graph ]
Strengthening and disabling transitions...

LOG: CALL solverLinear in Graph for feasibility

LOG: RETURN solveLinear in Graph for feasibility
Strengthening transition (result): 
<l12, l13, x1^0 <= 196 + x0^0 /\ x0^0 = undef151 /\ x1^0 = undef152, {x0^0 -> undef151, x1^0 -> 1 + undef152, x2^0 -> undef156, x3^0 -> undef157, x4^0 -> undef158, 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): 
<l12, l13, x1^0 <= 196 + x0^0 /\ x0^0 = undef151 /\ x1^0 = undef152, {x0^0 -> undef151, x1^0 -> 1 + undef152, x2^0 -> undef156, x3^0 -> undef157, x4^0 -> undef158, rest remain the same}>

LOG: CALL solverLinear in Graph for feasibility

LOG: RETURN solveLinear in Graph for feasibility
Ranking function: 196 + x0^0 - x1^0
New Graphs: 

LOG: CALL check - Post:x1^0 <= 196 + x0^0 - Process 6
* Exit transition: <l0, l12, true, {all remain the same}>
* Postcondition  : x1^0 <= 196 + x0^0

LOG: CALL solveLinear

LOG: RETURN solveLinear - Elapsed time: 0.001127s
> Postcondition is not implied!

LOG: RETURN check - Elapsed time: 0.001204s
INVARIANTS: 
12: 
Quasi-INVARIANTS to narrow Graph: 
12: x1^0 <= 196 + x0^0 , 
Narrowing transition: 
<l12, l13, x0^0 = undef151 /\ x1^0 = undef152, {x0^0 -> undef151, x1^0 -> 1 + undef152, x2^0 -> undef156, x3^0 -> undef157, x4^0 -> undef158, rest remain the same}>

LOG: Narrow transition size 1
It's unfeasible. Removing transition: 
<l13, l12, 1 + undef182 <= undef181 /\ x0^0 = undef181 /\ x1^0 = undef182, {x0^0 -> undef181, x1^0 -> undef182, x2^0 -> undef186, x3^0 -> undef187, x4^0 -> undef188, rest remain the same}>
invGraph after Narrowing: 
Transitions:
<l12, l13, 197 + x0^0 <= x1^0 /\ x0^0 = undef151 /\ x1^0 = undef152, {x0^0 -> undef151, x1^0 -> 1 + undef152, x2^0 -> undef156, x3^0 -> undef157, x4^0 -> undef158, rest remain the same}>
Variables:
x0^0, x1^0, x2^0, x3^0, x4^0
Proving termination of subgraph 12
Analyzing SCC {l9}...
No cycles found.

Program Terminates