About the Execution of 2018-Gold for QuasiCertifProtocol-COL-32
Execution Summary | |||||
Max Memory Used (MB) |
Time wait (ms) | CPU Usage (ms) | I/O Wait (ms) | Computed Result | Execution Status |
15919.130 | 3089074.00 | 3192933.00 | 4056.20 | FFTFFFFTFFFTT?FF | normal |
Execution Chart
We display below the execution chart for this examination (boot time has been removed).
Trace from the execution
Formatting '/data/fko/mcc2019-input.r132-oct2-155403939200083.qcow2', fmt=qcow2 size=4294967296 backing_file=/data/fko/mcc2019-input.qcow2 cluster_size=65536 lazy_refcounts=off refcount_bits=16
Waiting for the VM to be ready (probing ssh)
...................
=====================================================================
Generated by BenchKit 2-3954
Executing tool win2018
Input is QuasiCertifProtocol-COL-32, examination is LTLCardinality
Time confinement is 3600 seconds
Memory confinement is 16384 MBytes
Number of cores is 4
Run identifier is r132-oct2-155403939200083
=====================================================================
--------------------
preparation of the directory to be used:
/home/mcc/execution
total 280K
-rw-r--r-- 1 mcc users 3.2K Feb 12 10:40 CTLCardinality.txt
-rw-r--r-- 1 mcc users 17K Feb 12 10:39 CTLCardinality.xml
-rw-r--r-- 1 mcc users 2.2K Feb 8 12:43 CTLFireability.txt
-rw-r--r-- 1 mcc users 12K Feb 8 12:43 CTLFireability.xml
-rw-r--r-- 1 mcc users 4.0K Mar 10 17:31 GenericPropertiesDefinition.xml
-rw-r--r-- 1 mcc users 6.4K Mar 10 17:31 GenericPropertiesVerdict.xml
-rw-r--r-- 1 mcc users 113 Feb 24 15:05 GlobalProperties.txt
-rw-r--r-- 1 mcc users 351 Feb 24 15:05 GlobalProperties.xml
-rw-r--r-- 1 mcc users 2.4K Feb 5 00:45 LTLCardinality.txt
-rw-r--r-- 1 mcc users 9.4K Feb 5 00:45 LTLCardinality.xml
-rw-r--r-- 1 mcc users 2.0K Feb 4 22:41 LTLFireability.txt
-rw-r--r-- 1 mcc users 7.9K Feb 4 22:41 LTLFireability.xml
-rw-r--r-- 1 mcc users 3.4K Feb 4 14:00 ReachabilityCardinality.txt
-rw-r--r-- 1 mcc users 16K Feb 4 14:00 ReachabilityCardinality.xml
-rw-r--r-- 1 mcc users 2.8K Feb 1 10:21 ReachabilityFireability.txt
-rw-r--r-- 1 mcc users 15K Feb 1 10:20 ReachabilityFireability.xml
-rw-r--r-- 1 mcc users 1.8K Feb 4 22:26 UpperBounds.txt
-rw-r--r-- 1 mcc users 3.8K Feb 4 22:26 UpperBounds.xml
-rw-r--r-- 1 mcc users 5 Jan 29 09:34 equiv_pt
-rw-r--r-- 1 mcc users 3 Jan 29 09:34 instance
-rw-r--r-- 1 mcc users 5 Jan 29 09:34 iscolored
-rw-r--r-- 1 mcc users 131K Mar 10 17:31 model.pnml
--------------------
content from stdout:
=== Data for post analysis generated by BenchKit (invocation template)
The expected result is a vector of booleans
BOOL_VECTOR
here is the order used to build the result vector(from text file)
FORMULA_NAME QuasiCertifProtocol-COL-32-LTLCardinality-00
FORMULA_NAME QuasiCertifProtocol-COL-32-LTLCardinality-01
FORMULA_NAME QuasiCertifProtocol-COL-32-LTLCardinality-02
FORMULA_NAME QuasiCertifProtocol-COL-32-LTLCardinality-03
FORMULA_NAME QuasiCertifProtocol-COL-32-LTLCardinality-04
FORMULA_NAME QuasiCertifProtocol-COL-32-LTLCardinality-05
FORMULA_NAME QuasiCertifProtocol-COL-32-LTLCardinality-06
FORMULA_NAME QuasiCertifProtocol-COL-32-LTLCardinality-07
FORMULA_NAME QuasiCertifProtocol-COL-32-LTLCardinality-08
FORMULA_NAME QuasiCertifProtocol-COL-32-LTLCardinality-09
FORMULA_NAME QuasiCertifProtocol-COL-32-LTLCardinality-10
FORMULA_NAME QuasiCertifProtocol-COL-32-LTLCardinality-11
FORMULA_NAME QuasiCertifProtocol-COL-32-LTLCardinality-12
FORMULA_NAME QuasiCertifProtocol-COL-32-LTLCardinality-13
FORMULA_NAME QuasiCertifProtocol-COL-32-LTLCardinality-14
FORMULA_NAME QuasiCertifProtocol-COL-32-LTLCardinality-15
=== Now, execution of the tool begins
BK_START 1554073734003
info: Time: 3600 - MCC
===========================================================================================
prep: translating QuasiCertifProtocol-COL-32 Petri net model.pnml into LoLA format
===========================================================================================
prep: translating COL Petri net complete
prep: check for too many tokens
===========================================================================================
prep: translating QuasiCertifProtocol-COL-32 formula LTLCardinality into LoLA format
===========================================================================================
prep: translating COL formula complete
vrfy: Checking LTLCardinality @ QuasiCertifProtocol-COL-32 @ 3570 seconds
lola: LoLA will run for 3570 seconds at most (--timelimit)
lola: NET
lola: reading net from model.pnml.lola
lola: finished parsing
lola: closed net file model.pnml.lola
lola: 4312/65536 symbol table entries, 765 collisions
lola: preprocessing...
lola: Size of bit vector: 121792
lola: finding significant places
lola: 3806 places, 506 transitions, 505 significant places
lola: computing forward-conflicting sets
lola: computing back-conflicting sets
lola: 671 transition conflict sets
lola: TASK
lola: reading formula from QuasiCertifProtocol-COL-32-LTLCardinality.task
lola: LP says that atomic proposition is always false: (3 <= p1522)
lola: A ((1 <= p2621 + p2620 + p2619 + p2618 + p2617 + p2616 + p2615 + p2614 + p2613 + p2612 + p2622 + p2623 + p2624 + p2625 + p2626 + p2627 + p2628 + p2629 + p2630 + p2631 + p2632 + p2633 + p2634 + p2635 + p2636 + p2637 + p2638 + p2639 + p2640 + p2641 + p2642 + p2643 + p2644)) : A (G (F ((2 <= p1355 + p1356 + p1357 + p1358 + p1359 + p1360 + p1361 + p1362 + p1363 + p1364 + p1365 + p1366 + p1367 + p1368 + p1369 + p1370 + p1371 + p1372 + p1373 + p1374 + p1375 + p1376 + p1377 + p1378 + p1379 + p1380 + p1381 + p1382 + p1383 + p1384 + p1385 + p1386 + p1387)))) : A ((p1420 + p1419 + p1418 + p1417 + p1416 + p1415 + p1414 + p1413 + p1412 + p1411 + p1410 + p1409 + p1408 + p1407 + p1406 + p1405 + p1404 + p1403 + p1402 + p1401 + p1400 + p1399 + p1398 + p1397 + p1396 + p1395 + p1394 + p1393 + p1392 + p1391 + p1390 + p1389 + p1388 <= p1488)) : A ((F (X ((p1900 + p1901 + p1902 + p1903 + p1904 + p1905 + p1906 + p1907 + p1908 + p1909 + p1910 + p1911 + p1912 + p1913 + p1914 + p1915 + p1916 + p1917 + p1918 + p1919 + p1920 + p1921 + p1922 + p1923 + p1924 + p1925 + p1926 + p1927 + p1928 + p1929 + p1930 + p1931 + p1932 + p1933 + p1853 + p1820 + p1787 + p1754 + p1721 + p1688 + p1655 + p1622 + p1952 + p1985 + p1589 + p1556 + p1523 + p2579 + p2546 + p2513 + p2480 + p2447 + p2414 + p2381 + p2348 + p2315 + p2018 + p2282 + p2249 + p2216 + p2183 + p2150 + p2117 + p2084 + p2051 + p2032 + p2033 + p2034 + p2035 + p2036 + p2037 + p2038 + p2039 + p2040 + p2041 + p2042 + p2043 + p2044 + p2031 + p2045 + p2046 + p2047 + p2048 + p2049 + p2050 + p2052 + p2053 + p2054 + p2055 + p2056 + p2057 + p2058 + p2059 + p2060 + p2061 + p2062 + p2063 + p2064 + p2065 + p2066 + p2067 + p2068 + p2069 + p2070 + p2071 + p2072 + p2073 + p2074 + p2075 + p2076 + p2077 + p2078 + p2079 + p2080 + p2081 + p2082 + p2083 + p2030 + p2085 + p2086 + p2087 + p2088 + p2089 + p2090 + p2091 + p2092 + p2093 + p2094 + p2095 + p2096 + p2097 + p2098 + p2099 + p2029 + p2028 + p2100 + p2101 + p2102 + p2103 + p2104 + p2105 + p2106 + p2107 + p2108 + p2109 + p2110 + p2027 + p2111 + p2112 + p2113 + p2114 + p2115 + p2116 + p2118 + p2119 + p2120 + p2121 + p2122 + p2123 + p2124 + p2125 + p2126 + p2127 + p2128 + p2129 + p2130 + p2131 + p2132 + p2133 + p2134 + p2135 + p2136 + p2137 + p2138 + p2139 + p2140 + p2141 + p2142 + p2143 + p2026 + p2144 + p2145 + p2146 + p2147 + p2148 + p2149 + p2151 + p2152 + p2153 + p2154 + p2155 + p2156 + p2157 + p2158 + p2159 + p2160 + p2161 + p2162 + p2163 + p2164 + p2165 + p2166 + p2167 + p2168 + p2169 + p2170 + p2171 + p2172 + p2173 + p2174 + p2175 + p2176 + p2177 + p2178 + p2179 + p2180 + p2181 + p2182 + p2025 + p2184 + p2185 + p2186 + p2187 + p2188 + p2189 + p2190 + p2191 + p2192 + p2193 + p2194 + p2195 + p2196 + p2197 + p2198 + p2199 + p2024 + p2200 + p2201 + p2202 + p2203 + p2204 + p2205 + p2206 + p2207 + p2208 + p2209 + p2023 + p2210 + p2211 + p2212 + p2213 + p2214 + p2215 + p2022 + p2217 + p2218 + p2219 + p2220 + p2221 + p2222 + p2223 + p2224 + p2225 + p2226 + p2227 + p2228 + p2229 + p2230 + p2231 + p2232 + p2233 + p2234 + p2235 + p2236 + p2237 + p2238 + p2239 + p2240 + p2241 + p2242 + p2243 + p2244 + p2245 + p2246 + p2247 + p2248 + p2021 + p2250 + p2251 + p2252 + p2253 + p2254 + p2255 + p2256 + p2257 + p2258 + p2259 + p2260 + p2261 + p2262 + p2263 + p2264 + p2265 + p2266 + p2267 + p2268 + p2269 + p2270 + p2271 + p2272 + p2273 + p2274 + p2275 + p2276 + p2277 + p2278 + p2279 + p2280 + p2281 + p2283 + p2284 + p2285 + p2286 + p2287 + p2288 + p2289 + p2290 + p2291 + p2292 + p2293 + p2294 + p2295 + p2296 + p2297 + p2298 + p2299 + p2020 + p2300 + p2301 + p2302 + p2303 + p2304 + p2305 + p2306 + p2307 + p2308 + p2309 + p2019 + p2310 + p2311 + p2312 + p2313 + p2314 + p2017 + p2316 + p2317 + p2318 + p2319 + p2320 + p2321 + p2322 + p2323 + p2324 + p2325 + p2326 + p2327 + p2328 + p2329 + p2330 + p2331 + p2332 + p2333 + p2334 + p2335 + p2336 + p2337 + p2338 + p2339 + p2340 + p2341 + p2016 + p2342 + p2343 + p2344 + p2345 + p2346 + p2347 + p2349 + p2350 + p2351 + p2352 + p2353 + p2354 + p2015 + p2355 + p2356 + p2357 + p2358 + p2359 + p2360 + p2361 + p2362 + p2363 + p2364 + p2365 + p2366 + p2367 + p2368 + p2369 + p2370 + p2371 + p2372 + p2373 + p2374 + p2375 + p2376 + p2377 + p2378 + p2379 + p2380 + p2382 + p2383 + p2384 + p2385 + p2386 + p2387 + p2014 + p2388 + p2389 + p2390 + p2391 + p2392 + p2393 + p2394 + p2395 + p2396 + p2397 + p2398 + p2399 + p2013 + p2012 + p2400 + p2401 + p2402 + p2403 + p2404 + p2405 + p2406 + p2407 + p2011 + p2408 + p2409 + p2410 + p2411 + p2412 + p2413 + p2010 + p2415 + p2416 + p2417 + p2418 + p2419 + p2420 + p2421 + p2422 + p2423 + p2424 + p2425 + p2426 + p2427 + p2428 + p2429 + p2430 + p2431 + p2432 + p2433 + p2434 + p2435 + p2436 + p2437 + p2438 + p2439 + p2440 + p2441 + p2442 + p2009 + p2443 + p2008 + p2444 + p2445 + p2007 + p2446 + p2006 + p2448 + p2449 + p2005 + p2450 + p2004 + p2451 + p2452 + p2003 + p2453 + p2002 + p2454 + p2455 + p2001 + p2456 + p2457 + p2000 + p2458 + p2459 + p2460 + p2461 + p2462 + p2463 + p2464 + p2465 + p2466 + p2467 + p2468 + p2469 + p2470 + p2471 + p2472 + p2473 + p2474 + p2475 + p2476 + p2477 + p2478 + p2479 + p2481 + p2482 + p2483 + p2484 + p2485 + p2486 + p2487 + p2488 + p2489 + p2490 + p2491 + p2492 + p2493 + p2494 + p2495 + p2496 + p2497 + p2498 + p2499 + p2500 + p2501 + p2502 + p2503 + p2504 + p2505 + p2506 + p2507 + p2508 + p2509 + p2510 + p2511 + p2512 + p2514 + p2515 + p2516 + p2517 + p2518 + p2519 + p2520 + p2521 + p2522 + p2523 + p2524 + p2525 + p2526 + p2527 + p2528 + p2529 + p2530 + p2531 + p2532 + p2533 + p2534 + p2535 + p2536 + p2537 + p2538 + p2539 + p2540 + p2541 + p2542 + p2543 + p2544 + p2545 + p2547 + p2548 + p2549 + p2550 + p2551 + p2552 + p2553 + p2554 + p2555 + p2556 + p2557 + p2558 + p2559 + p2560 + p2561 + p2562 + p2563 + p2564 + p2565 + p2566 + p2567 + p2568 + p2569 + p2570 + p2571 + p2572 + p2573 + p2574 + p2575 + p2576 + p2577 + p2578 + p2580 + p2581 + p2582 + p2583 + p2584 + p2585 + p2586 + p2587 + p2588 + p2589 + p2590 + p2591 + p2592 + p2593 + p2594 + p2595 + p2596 + p2597 + p2598 + p2599 + p2600 + p2601 + p2602 + p2603 + p2604 + p2605 + p2606 + p2607 + p2608 + p2609 + p2610 + p2611 + p1524 + p1525 + p1526 + p1527 + p1528 + p1529 + p1530 + p1531 + p1532 + p1533 + p1534 + p1535 + p1536 + p1537 + p1538 + p1539 + p1540 + p1541 + p1542 + p1543 + p1544 + p1545 + p1546 + p1547 + p1548 + p1549 + p1550 + p1551 + p1552 + p1553 + p1554 + p1555 + p1557 + p1558 + p1559 + p1560 + p1561 + p1562 + p1563 + p1564 + p1565 + p1566 + p1567 + p1568 + p1569 + p1570 + p1571 + p1572 + p1573 + p1574 + p1575 + p1576 + p1577 + p1578 + p1579 + p1580 + p1581 + p1582 + p1583 + p1584 + p1585 + p1586 + p1587 + p1588 + p1590 + p1591 + p1592 + p1593 + p1594 + p1595 + p1596 + p1597 + p1598 + p1599 + p1999 + p1998 + p1997 + p1996 + p1995 + p1994 + p1993 + p1992 + p1991 + p1990 + p1989 + p1988 + p1987 + p1986 + p1984 + p1983 + p1982 + p1981 + p1980 + p1979 + p1978 + p1977 + p1976 + p1975 + p1974 + p1973 + p1972 + p1971 + p1970 + p1969 + p1968 + p1967 + p1966 + p1965 + p1964 + p1963 + p1962 + p1961 + p1960 + p1959 + p1958 + p1957 + p1956 + p1955 + p1954 + p1953 + p1951 + p1950 + p1949 + p1948 + p1947 + p1946 + p1945 + p1944 + p1943 + p1942 + p1600 + p1601 + p1602 + p1603 + p1604 + p1605 + p1606 + p1607 + p1608 + p1609 + p1610 + p1611 + p1612 + p1613 + p1614 + p1615 + p1616 + p1617 + p1618 + p1619 + p1620 + p1621 + p1941 + p1623 + p1624 + p1625 + p1626 + p1627 + p1628 + p1629 + p1630 + p1631 + p1632 + p1633 + p1634 + p1635 + p1636 + p1637 + p1638 + p1639 + p1640 + p1641 + p1642 + p1643 + p1644 + p1645 + p1646 + p1647 + p1648 + p1649 + p1650 + p1651 + p1652 + p1653 + p1654 + p1940 + p1656 + p1657 + p1658 + p1659 + p1660 + p1661 + p1662 + p1663 + p1664 + p1665 + p1666 + p1667 + p1668 + p1669 + p1670 + p1671 + p1672 + p1673 + p1674 + p1675 + p1676 + p1677 + p1678 + p1679 + p1680 + p1681 + p1682 + p1683 + p1684 + p1685 + p1686 + p1687 + p1939 + p1689 + p1690 + p1691 + p1692 + p1693 + p1694 + p1695 + p1696 + p1697 + p1698 + p1699 + p1700 + p1701 + p1702 + p1703 + p1704 + p1705 + p1706 + p1707 + p1708 + p1709 + p1710 + p1711 + p1712 + p1713 + p1714 + p1715 + p1716 + p1717 + p1718 + p1719 + p1720 + p1938 + p1722 + p1723 + p1724 + p1725 + p1726 + p1727 + p1728 + p1729 + p1730 + p1731 + p1732 + p1733 + p1734 + p1735 + p1736 + p1737 + p1738 + p1739 + p1740 + p1741 + p1742 + p1743 + p1744 + p1745 + p1746 + p1747 + p1748 + p1749 + p1750 + p1751 + p1752 + p1753 + p1937 + p1755 + p1756 + p1757 + p1758 + p1759 + p1760 + p1761 + p1762 + p1763 + p1764 + p1765 + p1766 + p1767 + p1768 + p1769 + p1770 + p1771 + p1772 + p1773 + p1774 + p1775 + p1776 + p1777 + p1778 + p1779 + p1780 + p1781 + p1782 + p1783 + p1784 + p1785 + p1786 + p1936 + p1788 + p1789 + p1790 + p1791 + p1792 + p1793 + p1794 + p1795 + p1796 + p1797 + p1798 + p1799 + p1800 + p1801 + p1802 + p1803 + p1804 + p1805 + p1806 + p1807 + p1808 + p1809 + p1810 + p1811 + p1812 + p1813 + p1814 + p1815 + p1816 + p1817 + p1818 + p1819 + p1935 + p1821 + p1822 + p1823 + p1824 + p1825 + p1826 + p1827 + p1828 + p1829 + p1830 + p1831 + p1832 + p1833 + p1834 + p1835 + p1836 + p1837 + p1838 + p1839 + p1840 + p1841 + p1842 + p1843 + p1844 + p1845 + p1846 + p1847 + p1848 + p1849 + p1850 + p1851 + p1852 + p1934 + p1854 + p1855 + p1856 + p1857 + p1858 + p1859 + p1860 + p1861 + p1862 + p1863 + p1864 + p1865 + p1866 + p1867 + p1868 + p1869 + p1870 + p1871 + p1872 + p1873 + p1874 + p1875 + p1876 + p1877 + p1878 + p1879 + p1880 + p1881 + p1882 + p1883 + p1884 + p1885 + p1886 + p1887 + p1888 + p1889 + p1890 + p1891 + p1892 + p1893 + p1894 + p1895 + p1896 + p1897 + p1898 + p1899 <= p66 + p957 + p924 + p891 + p858 + p825 + p792 + p759 + p726 + p693 + p660 + p627 + p594 + p561 + p528 + p1122 + p495 + p462 + p429 + p1089 + p1056 + p1023 + p1000 + p396 + p363 + p330 + p297 + p264 + p231 + p198 + p165 + p132 + p100 + p101 + p102 + p103 + p104 + p105 + p106 + p107 + p108 + p109 + p110 + p111 + p112 + p113 + p114 + p115 + p116 + p117 + p118 + p119 + p120 + p121 + p122 + p123 + p124 + p125 + p126 + p127 + p128 + p129 + p130 + p131 + p133 + p134 + p135 + p136 + p137 + p138 + p139 + p140 + p141 + p142 + p143 + p144 + p145 + p146 + p147 + p148 + p149 + p150 + p151 + p152 + p153 + p154 + p155 + p156 + p157 + p158 + p159 + p160 + p161 + p162 + p163 + p164 + p166 + p167 + p168 + p169 + p170 + p171 + p172 + p173 + p174 + p175 + p176 + p177 + p178 + p179 + p180 + p181 + p182 + p183 + p184 + p185 + p186 + p187 + p188 + p189 + p190 + p191 + p192 + p193 + p194 + p195 + p196 + p197 + p199 + p200 + p201 + p202 + p203 + p204 + p205 + p206 + p207 + p208 + p209 + p210 + p211 + p212 + p213 + p214 + p215 + p216 + p217 + p218 + p219 + p220 + p221 + p222 + p223 + p224 + p225 + p226 + p227 + p228 + p229 + p230 + p232 + p233 + p234 + p235 + p236 + p237 + p238 + p239 + p240 + p241 + p242 + p243 + p244 + p245 + p246 + p247 + p248 + p249 + p250 + p251 + p252 + p253 + p254 + p255 + p256 + p257 + p258 + p259 + p260 + p261 + p262 + p263 + p265 + p266 + p267 + p268 + p269 + p270 + p271 + p272 + p273 + p274 + p275 + p276 + p277 + p278 + p279 + p280 + p281 + p282 + p283 + p284 + p285 + p286 + p287 + p288 + p289 + p290 + p291 + p292 + p293 + p294 + p295 + p296 + p298 + p299 + p300 + p301 + p302 + p303 + p304 + p305 + p306 + p307 + p308 + p309 + p310 + p311 + p312 + p313 + p314 + p315 + p316 + p317 + p318 + p319 + p320 + p321 + p322 + p323 + p324 + p325 + p326 + p327 + p328 + p329 + p331 + p332 + p333 + p334 + p335 + p336 + p337 + p338 + p339 + p340 + p341 + p342 + p343 + p344 + p345 + p346 + p347 + p348 + p349 + p350 + p351 + p352 + p353 + p354 + p355 + p356 + p357 + p358 + p359 + p360 + p361 + p362 + p364 + p365 + p366 + p367 + p368 + p369 + p370 + p371 + p372 + p373 + p374 + p375 + p376 + p377 + p378 + p379 + p380 + p381 + p382 + p383 + p384 + p385 + p386 + p387 + p388 + p389 + p390 + p391 + p392 + p393 + p394 + p395 + p397 + p398 + p399 + p1001 + p1002 + p1003 + p1004 + p1005 + p1006 + p1007 + p1008 + p1009 + p1010 + p1011 + p1012 + p1013 + p1014 + p1015 + p1016 + p1017 + p1018 + p1019 + p1020 + p1021 + p1022 + p1024 + p1025 + p1026 + p1027 + p1028 + p1029 + p1030 + p1031 + p1032 + p1033 + p1034 + p1035 + p1036 + p1037 + p1038 + p1039 + p1040 + p1041 + p1042 + p1043 + p1044 + p1045 + p1046 + p1047 + p1048 + p1049 + p1050 + p1051 + p1052 + p1053 + p1054 + p1055 + p1057 + p1058 + p1059 + p1060 + p1061 + p1062 + p1063 + p1064 + p1065 + p1066 + p1067 + p1068 + p1069 + p1070 + p1071 + p1072 + p1073 + p1074 + p1075 + p1076 + p1077 + p1078 + p1079 + p1080 + p1081 + p1082 + p1083 + p1084 + p1085 + p1086 + p1087 + p1088 + p1090 + p1091 + p1092 + p1093 + p1094 + p1095 + p1096 + p1097 + p1098 + p1099 + p400 + p401 + p402 + p403 + p404 + p405 + p406 + p407 + p408 + p409 + p410 + p411 + p412 + p413 + p414 + p415 + p416 + p417 + p418 + p419 + p420 + p421 + p422 + p423 + p424 + p425 + p426 + p427 + p428 + p430 + p431 + p432 + p433 + p434 + p435 + p436 + p437 + p438 + p439 + p440 + p441 + p442 + p443 + p444 + p445 + p446 + p447 + p448 + p449 + p450 + p451 + p452 + p453 + p454 + p455 + p456 + p457 + p458 + p459 + p460 + p461 + p463 + p464 + p465 + p466 + p467 + p468 + p469 + p470 + p471 + p472 + p473 + p474 + p475 + p476 + p477 + p478 + p479 + p480 + p481 + p482 + p483 + p484 + p485 + p486 + p487 + p488 + p489 + p490 + p491 + p492 + p493 + p494 + p496 + p497 + p498 + p499 + p1100 + p1101 + p1102 + p1103 + p1104 + p1105 + p1106 + p1107 + p1108 + p1109 + p1110 + p1111 + p1112 + p1113 + p1114 + p1115 + p1116 + p1117 + p1118 + p1119 + p1120 + p1121 + p1123 + p1124 + p1125 + p1126 + p1127 + p1128 + p1129 + p1130 + p1131 + p1132 + p1133 + p1134 + p1135 + p1136 + p1137 + p1138 + p1139 + p1140 + p1141 + p1142 + p1143 + p1144 + p1145 + p1146 + p1147 + p1148 + p1149 + p1150 + p1151 + p1152 + p1153 + p1154 + p500 + p501 + p502 + p503 + p504 + p505 + p506 + p507 + p508 + p509 + p510 + p511 + p512 + p513 + p514 + p515 + p516 + p517 + p518 + p519 + p520 + p521 + p522 + p523 + p524 + p525 + p526 + p527 + p529 + p530 + p531 + p532 + p533 + p534 + p535 + p536 + p537 + p538 + p539 + p540 + p541 + p542 + p543 + p544 + p545 + p546 + p547 + p548 + p549 + p550 + p551 + p552 + p553 + p554 + p555 + p556 + p557 + p558 + p559 + p560 + p562 + p563 + p564 + p565 + p566 + p567 + p568 + p569 + p570 + p571 + p572 + p573 + p574 + p575 + p576 + p577 + p578 + p579 + p580 + p581 + p582 + p583 + p584 + p585 + p586 + p587 + p588 + p589 + p590 + p591 + p592 + p593 + p595 + p596 + p597 + p598 + p599 + p600 + p601 + p602 + p603 + p604 + p605 + p606 + p607 + p608 + p609 + p610 + p611 + p612 + p613 + p614 + p615 + p616 + p617 + p618 + p619 + p620 + p621 + p622 + p623 + p624 + p625 + p626 + p628 + p629 + p630 + p631 + p632 + p633 + p634 + p635 + p636 + p637 + p638 + p639 + p640 + p641 + p642 + p643 + p644 + p645 + p646 + p647 + p648 + p649 + p650 + p651 + p652 + p653 + p654 + p655 + p656 + p657 + p658 + p659 + p661 + p662 + p663 + p664 + p665 + p666 + p667 + p668 + p669 + p670 + p671 + p672 + p673 + p674 + p675 + p676 + p677 + p678 + p679 + p680 + p681 + p682 + p683 + p684 + p685 + p686 + p687 + p688 + p689 + p690 + p691 + p692 + p694 + p695 + p696 + p697 + p698 + p699 + p700 + p701 + p702 + p703 + p704 + p705 + p706 + p707 + p708 + p709 + p710 + p711 + p712 + p713 + p714 + p715 + p716 + p717 + p718 + p719 + p720 + p721 + p722 + p723 + p724 + p725 + p727 + p728 + p729 + p730 + p731 + p732 + p733 + p734 + p735 + p736 + p737 + p738 + p739 + p740 + p741 + p742 + p743 + p744 + p745 + p746 + p747 + p748 + p749 + p750 + p751 + p752 + p753 + p754 + p755 + p756 + p757 + p758 + p760 + p761 + p762 + p763 + p764 + p765 + p766 + p767 + p768 + p769 + p770 + p771 + p772 + p773 + p774 + p775 + p776 + p777 + p778 + p779 + p780 + p781 + p782 + p783 + p784 + p785 + p786 + p787 + p788 + p789 + p790 + p791 + p793 + p794 + p795 + p796 + p797 + p798 + p799 + p800 + p801 + p802 + p803 + p804 + p805 + p806 + p807 + p808 + p809 + p810 + p811 + p812 + p813 + p814 + p815 + p816 + p817 + p818 + p819 + p820 + p821 + p822 + p823 + p824 + p826 + p827 + p828 + p829 + p830 + p831 + p832 + p833 + p834 + p835 + p836 + p837 + p838 + p839 + p840 + p841 + p842 + p843 + p844 + p845 + p846 + p847 + p848 + p849 + p850 + p851 + p852 + p853 + p854 + p855 + p856 + p857 + p859 + p860 + p861 + p862 + p863 + p864 + p865 + p866 + p867 + p868 + p869 + p870 + p871 + p872 + p873 + p874 + p875 + p876 + p877 + p878 + p879 + p880 + p881 + p882 + p883 + p884 + p885 + p886 + p887 + p888 + p889 + p890 + p892 + p893 + p894 + p895 + p896 + p897 + p898 + p899 + p900 + p901 + p902 + p903 + p904 + p905 + p906 + p907 + p908 + p909 + p910 + p911 + p912 + p913 + p914 + p915 + p916 + p917 + p918 + p919 + p920 + p921 + p922 + p923 + p925 + p926 + p927 + p928 + p929 + p930 + p931 + p932 + p933 + p934 + p935 + p936 + p937 + p938 + p939 + p940 + p941 + p942 + p943 + p944 + p945 + p946 + p947 + p948 + p949 + p950 + p951 + p952 + p953 + p954 + p955 + p956 + p958 + p959 + p960 + p961 + p962 + p963 + p964 + p965 + p966 + p967 + p968 + p969 + p970 + p971 + p972 + p973 + p974 + p975 + p976 + p977 + p978 + p979 + p980 + p981 + p982 + p983 + p984 + p985 + p986 + p987 + p988 + p989 + p990 + p991 + p992 + p993 + p994 + p995 + p996 + p997 + p998 + p999 + p67 + p68 + p69 + p70 + p71 + p72 + p73 + p74 + p75 + p76 + p77 + p78 + p79 + p80 + p81 + p82 + p83 + p84 + p85 + p86 + p87 + p88 + p89 + p90 + p91 + p92 + p93 + p94 + p95 + p96 + p97 + p98 + p99))) U F (F ((2 <= p1187 + p1186 + p1185 + p1184 + p1183 + p1182 + p1181 + p1180 + p1179 + p1178 + p1177 + p1176 + p1175 + p1174 + p1173 + p1172 + p1171 + p1170 + p1169 + p1168 + p1167 + p1166 + p1165 + p1164 + p1163 + p1162 + p1161 + p1160 + p1159 + p1158 + p1157 + p1156 + p1155))))) : A (F (F (G (F ((3 <= p1320 + p1319 + p1318 + p1317 + p1316 + p1315 + p1314 + p1313 + p1312 + p1311 + p1310 + p1309 + p1308 + p1307 + p1306 + p1305 + p1304 + p1303 + p1302 + p1301 + p1300 + p1299 + p1298 + p1297 + p1296 + p1295 + p1294 + p1293 + p1292 + p1291 + p1290 + p1289 + p1288)))))) : A ((3 <= p1255 + p1256 + p1257 + p1258 + p1259 + p1260 + p1261 + p1262 + p1263 + p1264 + p1265 + p1266 + p1267 + p1268 + p1269 + p1270 + p1271 + p1272 + p1273 + p1274 + p1275 + p1276 + p1277 + p1278 + p1279 + p1280 + p1281 + p1282 + p1283 + p1284 + p1285 + p1286 + p1287)) : A (G ((X ((p1255 + p1256 + p1257 + p1258 + p1259 + p1260 + p1261 + p1262 + p1263 + p1264 + p1265 + p1266 + p1267 + p1268 + p1269 + p1270 + p1271 + p1272 + p1273 + p1274 + p1275 + p1276 + p1277 + p1278 + p1279 + p1280 + p1281 + p1282 + p1283 + p1284 + p1285 + p1286 + p1287 <= p2621 + p2620 + p2619 + p2618 + p2617 + p2616 + p2615 + p2614 + p2613 + p2612 + p2622 + p2623 + p2624 + p2625 + p2626 + p2627 + p2628 + p2629 + p2630 + p2631 + p2632 + p2633 + p2634 + p2635 + p2636 + p2637 + p2638 + p2639 + p2640 + p2641 + p2642 + p2643 + p2644)) U (3 <= p1220 + p1219 + p1218 + p1217 + p1216 + p1215 + p1214 + p1213 + p1212 + p1211 + p1210 + p1209 + p1208 + p1207 + p1206 + p1205 + p1204 + p1203 + p1202 + p1201 + p1200 + p1199 + p1198 + p1197 + p1196 + p1195 + p1194 + p1193 + p1192 + p1191 + p1190 + p1189 + p1188)))) : A (X (((3 <= p1355 + p1356 + p1357 + p1358 + p1359 + p1360 + p1361 + p1362 + p1363 + p1364 + p1365 + p1366 + p1367 + p1368 + p1369 + p1370 + p1371 + p1372 + p1373 + p1374 + p1375 + p1376 + p1377 + p1378 + p1379 + p1380 + p1381 + p1382 + p1383 + p1384 + p1385 + p1386 + p1387) U (p1221 <= p1488)))) : A ((1 <= p2679)) : A (X (G (G (G ((3 <= p1320 + p1319 + p1318 + p1317 + p1316 + p1315 + p1314 + p1313 + p1312 + p1311 + p1310 + p1309 + p1308 + p1307 + p1306 + p1305 + p1304 + p1303 + p1302 + p1301 + p1300 + p1299 + p1298 + p1297 + p1296 + p1295 + p1294 + p1293 + p1292 + p1291 + p1290 + p1289 + p1288)))))) : A ((1 <= p2645)) : A ((1 <= p1454 + p1455 + p1456 + p1457 + p1458 + p1459 + p1460 + p1461 + p1462 + p1463 + p1464 + p1465 + p1466 + p1467 + p1468 + p1469 + p1470 + p1471 + p1472 + p1473 + p1474 + p1475 + p1476 + p1477 + p1478 + p1479 + p1480 + p1481 + p1482 + p1483 + p1484 + p1485 + p1486)) : A (X ((F ((2 <= p2681)) U (p1220 + p1219 + p1218 + p1217 + p1216 + p1215 + p1214 + p1213 + p1212 + p1211 + p1210 + p1209 + p1208 + p1207 + p1206 + p1205 + p1204 + p1203 + p1202 + p1201 + p1200 + p1199 + p1198 + p1197 + p1196 + p1195 + p1194 + p1193 + p1192 + p1191 + p1190 + p1189 + p1188 <= p1421 + p1422 + p1423 + p1424 + p1425 + p1426 + p1427 + p1428 + p1429 + p1430 + p1431 + p1432 + p1433 + p1434 + p1435 + p1436 + p1437 + p1438 + p1439 + p1440 + p1441 + p1442 + p1443 + p1444 + p1445 + p1446 + p1447 + p1448 + p1449 + p1450 + p1451 + p1452 + p1453)))) : A (X (X (G ((p1354 <= p2646 + p2647 + p2648 + p2649 + p2650 + p2651 + p2652 + p2653 + p2654 + p2655 + p2656 + p2657 + p2658 + p2659 + p2660 + p2661 + p2662 + p2663 + p2664 + p2665 + p2666 + p2667 + p2668 + p2669 + p2670 + p2671 + p2672 + p2673 + p2674 + p2675 + p2676 + p2677 + p2678))))) : A (X ((F ((3 <= p1488)) U X ((3 <= p1187 + p1186 + p1185 + p1184 + p1183 + p1182 + p1181 + p1180 + p1179 + p1178 + p1177 + p1176 + p1175 + p1174 + p1173 + p1172 + p1171 + p1170 + p1169 + p1168 + p1167 + p1166 + p1165 + p1164 + p1163 + p1162 + p1161 + p1160 + p1159 + p1158 + p1157 + p1156 + p1155))))) : A (FALSE)
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:356
lola: rewrite Frontend/Parser/formula_rewrite.k:347
lola: rewrite Frontend/Parser/formula_rewrite.k:422
lola: rewrite Frontend/Parser/formula_rewrite.k:371
lola: rewrite Frontend/Parser/formula_rewrite.k:371
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:437
lola: rewrite Frontend/Parser/formula_rewrite.k:522
lola: rewrite Frontend/Parser/formula_rewrite.k:545
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:350
lola: rewrite Frontend/Parser/formula_rewrite.k:350
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: computing a collection of formulas
lola: RUNNING
lola: subprocess 0 will run for 221 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: (1 <= p2621 + p2620 + p2619 + p2618 + p2617 + p2616 + p2615 + p2614 + p2613 + p2612 + p2622 + p2623 + p2624 + p2625 + p2626 + p2627 + p2628 + p2629 + p2630 + p2631 + p2632 + p2633 + p2634 + p2635 + p2636 + p2637 + p2638 + p2639 + p2640 + p2641 + p2642 + p2643 + p2644)
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: (1 <= p2621 + p2620 + p2619 + p2618 + p2617 + p2616 + p2615 + p2614 + p2613 + p2612 + p2622 + p2623 + p2624 + p2625 + p2626 + p2627 + p2628 + p2629 + p2630 + p2631 + p2632 + p2633 + p2634 + p2635 + p2636 + p2637 + p2638 + p2639 + p2640 + p2641 + p2642 + p2643 + p2644)
lola: processed formula length: 268
lola: 18 rewrites
lola: closed formula file QuasiCertifProtocol-COL-32-LTLCardinality.task
lola: processed formula with 1 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
FORMULA QuasiCertifProtocol-COL-32-LTLCardinality-0 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: ========================================
lola: subprocess 1 will run for 235 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: (p1420 + p1419 + p1418 + p1417 + p1416 + p1415 + p1414 + p1413 + p1412 + p1411 + p1410 + p1409 + p1408 + p1407 + p1406 + p1405 + p1404 + p1403 + p1402 + p1401 + p1400 + p1399 + p1398 + p1397 + p1396 + p1395 + p1394 + p1393 + p1392 + p1391 + p1390 + p1389 + p1388 <= p1488)
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: (p1420 + p1419 + p1418 + p1417 + p1416 + p1415 + p1414 + p1413 + p1412 + p1411 + p1410 + p1409 + p1408 + p1407 + p1406 + p1405 + p1404 + p1403 + p1402 + p1401 + p1400 + p1399 + p1398 + p1397 + p1396 + p1395 + p1394 + p1393 + p1392 + p1391 + p1390 + p1389 + p1388 <= p1488)
lola: processed formula length: 272
lola: 18 rewrites
lola: closed formula file QuasiCertifProtocol-COL-32-LTLCardinality.task
lola: processed formula with 1 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: preprocessing
lola: The net satisfies the property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================
FORMULA QuasiCertifProtocol-COL-32-LTLCardinality-2 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 2 will run for 252 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: (3 <= p1255 + p1256 + p1257 + p1258 + p1259 + p1260 + p1261 + p1262 + p1263 + p1264 + p1265 + p1266 + p1267 + p1268 + p1269 + p1270 + p1271 + p1272 + p1273 + p1274 + p1275 + p1276 + p1277 + p1278 + p1279 + p1280 + p1281 + p1282 + p1283 + p1284 + p1285 + p1286 + p1287)
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: (3 <= p1255 + p1256 + p1257 + p1258 + p1259 + p1260 + p1261 + p1262 + p1263 + p1264 + p1265 + p1266 + p1267 + p1268 + p1269 + p1270 + p1271 + p1272 + p1273 + p1274 + p1275 + p1276 + p1277 + p1278 + p1279 + p1280 + p1281 + p1282 + p1283 + p1284 + p1285 + p1286 + p1287)
lola: processed formula length: 268
lola: 18 rewrites
lola: closed formula file QuasiCertifProtocol-COL-32-LTLCardinality.task
lola: processed formula with 1 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================
FORMULA QuasiCertifProtocol-COL-32-LTLCardinality-5 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 3 will run for 272 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: (1 <= p2679)
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: (1 <= p2679)
lola: processed formula length: 12
lola: 18 rewrites
lola: closed formula file QuasiCertifProtocol-COL-32-LTLCardinality.task
lola: processed formula with 1 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================
FORMULA QuasiCertifProtocol-COL-32-LTLCardinality-8 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 4 will run for 294 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: (1 <= p2645)
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: (1 <= p2645)
lola: processed formula length: 12
lola: 18 rewrites
lola: closed formula file QuasiCertifProtocol-COL-32-LTLCardinality.task
lola: processed formula with 1 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================
FORMULA QuasiCertifProtocol-COL-32-LTLCardinality-10 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 5 will run for 321 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: (1 <= p1454 + p1455 + p1456 + p1457 + p1458 + p1459 + p1460 + p1461 + p1462 + p1463 + p1464 + p1465 + p1466 + p1467 + p1468 + p1469 + p1470 + p1471 + p1472 + p1473 + p1474 + p1475 + p1476 + p1477 + p1478 + p1479 + p1480 + p1481 + p1482 + p1483 + p1484 + p1485 + p1486)
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: (1 <= p1454 + p1455 + p1456 + p1457 + p1458 + p1459 + p1460 + p1461 + p1462 + p1463 + p1464 + p1465 + p1466 + p1467 + p1468 + p1469 + p1470 + p1471 + p1472 + p1473 + p1474 + p1475 + p1476 + p1477 + p1478 + p1479 + p1480 + p1481 + p1482 + p1483 + p1484 + p1485 + p1486)
lola: processed formula length: 268
lola: 18 rewrites
lola: closed formula file QuasiCertifProtocol-COL-32-LTLCardinality.task
lola: processed formula with 1 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: preprocessing
lola: The net satisfies the property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================
FORMULA QuasiCertifProtocol-COL-32-LTLCardinality-11 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 6 will run for 353 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 18 rewrites
lola: closed formula file QuasiCertifProtocol-COL-32-LTLCardinality.task
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================
FORMULA QuasiCertifProtocol-COL-32-LTLCardinality-15 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 7 will run for 393 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X (((3 <= p1355 + p1356 + p1357 + p1358 + p1359 + p1360 + p1361 + p1362 + p1363 + p1364 + p1365 + p1366 + p1367 + p1368 + p1369 + p1370 + p1371 + p1372 + p1373 + p1374 + p1375 + p1376 + p1377 + p1378 + p1379 + p1380 + p1381 + p1382 + p1383 + p1384 + p1385 + p1386 + p1387) U (p1221 <= p1488))))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (((3 <= p1355 + p1356 + p1357 + p1358 + p1359 + p1360 + p1361 + p1362 + p1363 + p1364 + p1365 + p1366 + p1367 + p1368 + p1369 + p1370 + p1371 + p1372 + p1373 + p1374 + p1375 + p1376 + p1377 + p1378 + p1379 + p1380 + p1381 + p1382 + p1383 + p1384 + p1385 + p1386 + p1387) U (p1221 <= p1488))))
lola: processed formula length: 297
lola: 18 rewrites
lola: closed formula file QuasiCertifProtocol-COL-32-LTLCardinality.task
lola: the resulting Büchi automaton has 3 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: LTL model checker
lola: The net satisfies the given formula (language of the product automaton is empty).
lola: 35 markings, 34 edges
lola:
FORMULA QuasiCertifProtocol-COL-32-LTLCardinality-7 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 8 will run for 442 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: (A (G (F ((3 <= p1220 + p1219 + p1218 + p1217 + p1216 + p1215 + p1214 + p1213 + p1212 + p1211 + p1210 + p1209 + p1208 + p1207 + p1206 + p1205 + p1204 + p1203 + p1202 + p1201 + p1200 + p1199 + p1198 + p1197 + p1196 + p1195 + p1194 + p1193 + p1192 + p1191 + p1190 + p1189 + p1188)))) AND A (G ((X ((p1255 + p1256 + p1257 + p1258 + p1259 + p1260 + p1261 + p1262 + p1263 + p1264 + p1265 + p1266 + p1267 +... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking a Boolean combination of formulas
lola: RUNNING
========================================
lola: subprocess 8 will run for 442 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (G (F ((3 <= p1220 + p1219 + p1218 + p1217 + p1216 + p1215 + p1214 + p1213 + p1212 + p1211 + p1210 + p1209 + p1208 + p1207 + p1206 + p1205 + p1204 + p1203 + p1202 + p1201 + p1200 + p1199 + p1198 + p1197 + p1196 + p1195 + p1194 + p1193 + p1192 + p1191 + p1190 + p1189 + p1188))))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (G (F ((3 <= p1220 + p1219 + p1218 + p1217 + p1216 + p1215 + p1214 + p1213 + p1212 + p1211 + p1210 + p1209 + p1208 + p1207 + p1206 + p1205 + p1204 + p1203 + p1202 + p1201 + p1200 + p1199 + p1198 + p1197 + p1196 + p1195 + p1194 + p1193 + p1192 + p1191 + p1190 + p1189 + p1188))))
lola: processed formula length: 280
lola: 18 rewrites
lola: closed formula file QuasiCertifProtocol-COL-32-LTLCardinality.task
lola: the resulting Büchi automaton has 2 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: using ltl preserving stubborn set method (--stubborn)
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: LTL model checker
lola: The net does not satisfy the given formula (language of the product automaton is nonempty).
lola: 71 markings, 71 edges
lola: ========================================
lola: SUBRESULT
lola: result: no
lola: The Boolean predicate is false.
FORMULA QuasiCertifProtocol-COL-32-LTLCardinality-6 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: ========================================
lola: subprocess 9 will run for 505 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X ((F ((2 <= p2681)) U (p1220 + p1219 + p1218 + p1217 + p1216 + p1215 + p1214 + p1213 + p1212 + p1211 + p1210 + p1209 + p1208 + p1207 + p1206 + p1205 + p1204 + p1203 + p1202 + p1201 + p1200 + p1199 + p1198 + p1197 + p1196 + p1195 + p1194 + p1193 + p1192 + p1191 + p1190 + p1189 + p1188 <= p1421 + p1422 + p1423 + p1424 + p1425 + p1426 + p1427 + p1428 + p1429 + p1430 + p1431 + p1432 + p1433 + p143... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X ((F ((2 <= p2681)) U (p1220 + p1219 + p1218 + p1217 + p1216 + p1215 + p1214 + p1213 + p1212 + p1211 + p1210 + p1209 + p1208 + p1207 + p1206 + p1205 + p1204 + p1203 + p1202 + p1201 + p1200 + p1199 + p1198 + p1197 + p1196 + p1195 + p1194 + p1193 + p1192 + p1191 + p1190 + p1189 + p1188 <= p1421 + p1422 + p1423 + p1424 + p1425 + p1426 + p1427 + p1428 + p1429 + p1430 + p1431 + p1432 + p1433 + p143... (shortened)
lola: processed formula length: 557
lola: 18 rewrites
lola: closed formula file QuasiCertifProtocol-COL-32-LTLCardinality.task
lola: the resulting Büchi automaton has 3 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: LTL model checker
lola: The net satisfies the given formula (language of the product automaton is empty).
lola: 35 markings, 34 edges
lola: ========================================
FORMULA QuasiCertifProtocol-COL-32-LTLCardinality-12 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 10 will run for 589 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X (X (G ((p1354 <= p2646 + p2647 + p2648 + p2649 + p2650 + p2651 + p2652 + p2653 + p2654 + p2655 + p2656 + p2657 + p2658 + p2659 + p2660 + p2661 + p2662 + p2663 + p2664 + p2665 + p2666 + p2667 + p2668 + p2669 + p2670 + p2671 + p2672 + p2673 + p2674 + p2675 + p2676 + p2677 + p2678)))))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (X (G ((p1354 <= p2646 + p2647 + p2648 + p2649 + p2650 + p2651 + p2652 + p2653 + p2654 + p2655 + p2656 + p2657 + p2658 + p2659 + p2660 + p2661 + p2662 + p2663 + p2664 + p2665 + p2666 + p2667 + p2668 + p2669 + p2670 + p2671 + p2672 + p2673 + p2674 + p2675 + p2676 + p2677 + p2678)))))
lola: processed formula length: 288
lola: 18 rewrites
lola: closed formula file QuasiCertifProtocol-COL-32-LTLCardinality.task
lola: the resulting Büchi automaton has 4 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: 245874 markings, 1835377 edges, 49175 markings/sec, 0 secs
lola: 475771 markings, 3558633 edges, 45979 markings/sec, 5 secs
lola: 690304 markings, 5322260 edges, 42907 markings/sec, 10 secs
lola: 879432 markings, 7096066 edges, 37826 markings/sec, 15 secs
lola: 1047581 markings, 8864452 edges, 33630 markings/sec, 20 secs
lola: 1278617 markings, 10603295 edges, 46207 markings/sec, 25 secs
lola: 1497126 markings, 12233707 edges, 43702 markings/sec, 30 secs
lola: 1709876 markings, 13988856 edges, 42550 markings/sec, 35 secs
lola: 1897394 markings, 15749221 edges, 37504 markings/sec, 40 secs
lola: 2062311 markings, 17483781 edges, 32983 markings/sec, 45 secs
lola: 2285505 markings, 19164056 edges, 44639 markings/sec, 50 secs
lola: 2493630 markings, 20725687 edges, 41625 markings/sec, 55 secs
lola: 2704654 markings, 22487504 edges, 42205 markings/sec, 60 secs
lola: 2889822 markings, 24231602 edges, 37034 markings/sec, 65 secs
lola: 3051936 markings, 25929617 edges, 32423 markings/sec, 70 secs
lola: 3271644 markings, 27576504 edges, 43942 markings/sec, 75 secs
lola: 3482057 markings, 29143982 edges, 42083 markings/sec, 80 secs
lola: 3683403 markings, 30897660 edges, 40269 markings/sec, 85 secs
lola: 3864038 markings, 32620041 edges, 36127 markings/sec, 90 secs
lola: 4030095 markings, 34287165 edges, 33211 markings/sec, 95 secs
lola: 4244109 markings, 35884303 edges, 42803 markings/sec, 100 secs
lola: 4454290 markings, 37482520 edges, 42036 markings/sec, 105 secs
lola: 4641534 markings, 39202560 edges, 37449 markings/sec, 110 secs
lola: 4820199 markings, 40896887 edges, 35733 markings/sec, 115 secs
lola: 4994023 markings, 42522933 edges, 34765 markings/sec, 120 secs
lola: 5199820 markings, 44066721 edges, 41159 markings/sec, 125 secs
lola: 5406219 markings, 45733940 edges, 41280 markings/sec, 130 secs
lola: 5590769 markings, 47430375 edges, 36910 markings/sec, 135 secs
lola: 5756320 markings, 49083923 edges, 33110 markings/sec, 140 secs
lola: 5944428 markings, 50666877 edges, 37622 markings/sec, 145 secs
lola: 6151522 markings, 52212563 edges, 41419 markings/sec, 150 secs
lola: 6343988 markings, 53913175 edges, 38493 markings/sec, 155 secs
lola: 6517948 markings, 55570670 edges, 34792 markings/sec, 160 secs
lola: 6676690 markings, 57176972 edges, 31748 markings/sec, 165 secs
lola: 6880261 markings, 58709240 edges, 40714 markings/sec, 170 secs
lola: 7086169 markings, 60369279 edges, 41182 markings/sec, 175 secs
lola: 7265438 markings, 62030165 edges, 35854 markings/sec, 180 secs
lola: 7427267 markings, 63646866 edges, 32366 markings/sec, 185 secs
lola: 7610445 markings, 65196000 edges, 36636 markings/sec, 190 secs
lola: 7817107 markings, 66789659 edges, 41332 markings/sec, 195 secs
lola: 7992334 markings, 68428614 edges, 35045 markings/sec, 200 secs
lola: 8164873 markings, 70050736 edges, 34508 markings/sec, 205 secs
lola: 8329318 markings, 71603427 edges, 32889 markings/sec, 210 secs
lola: 8534170 markings, 73157649 edges, 40970 markings/sec, 215 secs
lola: 8716967 markings, 74792422 edges, 36559 markings/sec, 220 secs
lola: 8883982 markings, 76387934 edges, 33403 markings/sec, 225 secs
lola: 9038097 markings, 77935003 edges, 30823 markings/sec, 230 secs
lola: 9242819 markings, 79469291 edges, 40944 markings/sec, 235 secs
lola: 9424935 markings, 81084220 edges, 36423 markings/sec, 240 secs
lola: 9590858 markings, 82657263 edges, 33185 markings/sec, 245 secs
lola: 9733920 markings, 84173922 edges, 28612 markings/sec, 250 secs
lola: 9937594 markings, 85704348 edges, 40735 markings/sec, 255 secs
lola: 10116242 markings, 87290779 edges, 35730 markings/sec, 260 secs
lola: 10279678 markings, 88841933 edges, 32687 markings/sec, 265 secs
lola: 10420252 markings, 90339874 edges, 28115 markings/sec, 270 secs
lola: 10622525 markings, 91878477 edges, 40455 markings/sec, 275 secs
lola: 10792753 markings, 93434560 edges, 34046 markings/sec, 280 secs
lola: 10951364 markings, 94954481 edges, 31722 markings/sec, 285 secs
lola: 11098521 markings, 96433581 edges, 29431 markings/sec, 290 secs
lola: 11290191 markings, 97972671 edges, 38334 markings/sec, 295 secs
lola: 11454957 markings, 99494946 edges, 32953 markings/sec, 300 secs
lola: 11611183 markings, 100995342 edges, 31245 markings/sec, 305 secs
lola: 11768404 markings, 102461111 edges, 31444 markings/sec, 310 secs
lola: 11947272 markings, 103999268 edges, 35774 markings/sec, 315 secs
lola: 12105391 markings, 105487688 edges, 31624 markings/sec, 320 secs
lola: 12249481 markings, 106941325 edges, 28818 markings/sec, 325 secs
lola: 12418428 markings, 108429042 edges, 33789 markings/sec, 330 secs
lola: 12575630 markings, 109896933 edges, 31440 markings/sec, 335 secs
lola: 12729299 markings, 111347825 edges, 30734 markings/sec, 340 secs
lola: 12876325 markings, 112784590 edges, 29405 markings/sec, 345 secs
lola: 13081288 markings, 114497979 edges, 40993 markings/sec, 350 secs
lola: 13266565 markings, 116207981 edges, 37055 markings/sec, 355 secs
lola: 13447437 markings, 117917548 edges, 36174 markings/sec, 360 secs
lola: 13614896 markings, 119626067 edges, 33492 markings/sec, 365 secs
lola: 13783746 markings, 121331961 edges, 33770 markings/sec, 370 secs
lola: 13954841 markings, 123031153 edges, 34219 markings/sec, 375 secs
lola: 14109982 markings, 124728920 edges, 31028 markings/sec, 380 secs
lola: 14265441 markings, 126425208 edges, 31092 markings/sec, 385 secs
lola: 14406109 markings, 128124230 edges, 28134 markings/sec, 390 secs
lola: 14589463 markings, 129828762 edges, 36671 markings/sec, 395 secs
lola: 14751963 markings, 131529327 edges, 32500 markings/sec, 400 secs
lola: 14909275 markings, 133224102 edges, 31462 markings/sec, 405 secs
lola: 15054409 markings, 134913212 edges, 29027 markings/sec, 410 secs
lola: 15204089 markings, 136588791 edges, 29936 markings/sec, 415 secs
lola: 15352342 markings, 138278725 edges, 29651 markings/sec, 420 secs
lola: 15491877 markings, 139966575 edges, 27907 markings/sec, 425 secs
lola: 15624465 markings, 141659833 edges, 26518 markings/sec, 430 secs
lola: 15783294 markings, 143357575 edges, 31766 markings/sec, 435 secs
lola: 15952701 markings, 145057319 edges, 33881 markings/sec, 440 secs
lola: 16109428 markings, 146753490 edges, 31345 markings/sec, 445 secs
lola: 16262182 markings, 148448633 edges, 30551 markings/sec, 450 secs
lola: 16404864 markings, 150143524 edges, 28536 markings/sec, 455 secs
lola: 16558028 markings, 151835575 edges, 30633 markings/sec, 460 secs
lola: 16697946 markings, 153526234 edges, 27984 markings/sec, 465 secs
lola: 16837617 markings, 155215851 edges, 27934 markings/sec, 470 secs
lola: 16970080 markings, 156909749 edges, 26493 markings/sec, 475 secs
lola: 17123405 markings, 158603843 edges, 30665 markings/sec, 480 secs
lola: 17262945 markings, 160289037 edges, 27908 markings/sec, 485 secs
lola: 17402912 markings, 161983332 edges, 27993 markings/sec, 490 secs
lola: 17532665 markings, 163677505 edges, 25951 markings/sec, 495 secs
lola: 17670120 markings, 165369047 edges, 27491 markings/sec, 500 secs
lola: 17796201 markings, 167061494 edges, 25216 markings/sec, 505 secs
lola: 17916435 markings, 168756405 edges, 24047 markings/sec, 510 secs
lola: 18101905 markings, 170487252 edges, 37094 markings/sec, 515 secs
lola: 18321561 markings, 172139239 edges, 43931 markings/sec, 520 secs
lola: 18537637 markings, 173811846 edges, 43215 markings/sec, 525 secs
lola: 18729279 markings, 175580808 edges, 38328 markings/sec, 530 secs
lola: 18898901 markings, 177213766 edges, 33924 markings/sec, 535 secs
lola: 19084848 markings, 178874998 edges, 37189 markings/sec, 540 secs
lola: 19298141 markings, 180480606 edges, 42659 markings/sec, 545 secs
lola: 19512200 markings, 182120963 edges, 42812 markings/sec, 550 secs
lola: 19700134 markings, 183871727 edges, 37587 markings/sec, 555 secs
lola: 19871925 markings, 185500357 edges, 34358 markings/sec, 560 secs
lola: 20048766 markings, 187122872 edges, 35368 markings/sec, 565 secs
lola: 20260551 markings, 188709146 edges, 42357 markings/sec, 570 secs
lola: 20470512 markings, 190340224 edges, 41992 markings/sec, 575 secs
lola: 20657834 markings, 192071847 edges, 37464 markings/sec, 580 secs
lola: local time limit reached - aborting
lola:
preliminary result: no unknown yes unknown unknown no no yes no unknown no yes yes unknown unknown no
lola: memory consumption: 4232844 KB
lola: time consumption: 621 seconds
lola: Child process aborted or communication problem between parent and child process
lola: subprocess 11 will run for 589 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X ((F ((3 <= p1488)) U X ((3 <= p1187 + p1186 + p1185 + p1184 + p1183 + p1182 + p1181 + p1180 + p1179 + p1178 + p1177 + p1176 + p1175 + p1174 + p1173 + p1172 + p1171 + p1170 + p1169 + p1168 + p1167 + p1166 + p1165 + p1164 + p1163 + p1162 + p1161 + p1160 + p1159 + p1158 + p1157 + p1156 + p1155)))))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X ((F ((3 <= p1488)) U X ((3 <= p1187 + p1186 + p1185 + p1184 + p1183 + p1182 + p1181 + p1180 + p1179 + p1178 + p1177 + p1176 + p1175 + p1174 + p1173 + p1172 + p1171 + p1170 + p1169 + p1168 + p1167 + p1166 + p1165 + p1164 + p1163 + p1162 + p1161 + p1160 + p1159 + p1158 + p1157 + p1156 + p1155)))))
lola: processed formula length: 301
lola: 18 rewrites
lola: closed formula file QuasiCertifProtocol-COL-32-LTLCardinality.task
lola: the resulting Büchi automaton has 5 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: LTL model checker
lola: The net does not satisfy the given formula (language of the product automaton is nonempty).
lola: 36 markings, 36 edges
FORMULA QuasiCertifProtocol-COL-32-LTLCardinality-14 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: ========================================
lola: subprocess 12 will run for 737 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X (G ((3 <= p1320 + p1319 + p1318 + p1317 + p1316 + p1315 + p1314 + p1313 + p1312 + p1311 + p1310 + p1309 + p1308 + p1307 + p1306 + p1305 + p1304 + p1303 + p1302 + p1301 + p1300 + p1299 + p1298 + p1297 + p1296 + p1295 + p1294 + p1293 + p1292 + p1291 + p1290 + p1289 + p1288))))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (G ((3 <= p1320 + p1319 + p1318 + p1317 + p1316 + p1315 + p1314 + p1313 + p1312 + p1311 + p1310 + p1309 + p1308 + p1307 + p1306 + p1305 + p1304 + p1303 + p1302 + p1301 + p1300 + p1299 + p1298 + p1297 + p1296 + p1295 + p1294 + p1293 + p1292 + p1291 + p1290 + p1289 + p1288))))
lola: processed formula length: 280
lola: 18 rewrites
lola: closed formula file QuasiCertifProtocol-COL-32-LTLCardinality.task
lola: the resulting Büchi automaton has 3 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: LTL model checker
lola: The net does not satisfy the given formula (language of the product automaton is nonempty).
lola: 36 markings, 36 edges
lola: ========================================
FORMULA QuasiCertifProtocol-COL-32-LTLCardinality-9 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 13 will run for 983 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (F ((2 <= p1187 + p1186 + p1185 + p1184 + p1183 + p1182 + p1181 + p1180 + p1179 + p1178 + p1177 + p1176 + p1175 + p1174 + p1173 + p1172 + p1171 + p1170 + p1169 + p1168 + p1167 + p1166 + p1165 + p1164 + p1163 + p1162 + p1161 + p1160 + p1159 + p1158 + p1157 + p1156 + p1155)))
lola: ========================================
lola: SUBTASK
lola: checking eventual occurrence
lola: rewrite Frontend/Parser/formula_rewrite.k:659
lola: rewrite Frontend/Parser/formula_rewrite.k:694
lola: processed formula: (p1187 + p1186 + p1185 + p1184 + p1183 + p1182 + p1181 + p1180 + p1179 + p1178 + p1177 + p1176 + p1175 + p1174 + p1173 + p1172 + p1171 + p1170 + p1169 + p1168 + p1167 + p1166 + p1165 + p1164 + p1163 + p1162 + p1161 + p1160 + p1159 + p1158 + p1157 + p1156 + p1155 <= 1)
lola: processed formula length: 268
lola: 20 rewrites
lola: closed formula file QuasiCertifProtocol-COL-32-LTLCardinality.task
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: SEARCH (state space / EG)
lola: state space: using search routine for EG formula (--search=depth)
lola: state space: using EG preserving stubborn set method (--stubborn=tarjan)
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: state space / EG
lola: The predicate does not eventually occur.
lola: 71 markings, 70 edges
lola: ========================================
FORMULA QuasiCertifProtocol-COL-32-LTLCardinality-3 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 14 will run for 1474 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (G (F ((3 <= p1320 + p1319 + p1318 + p1317 + p1316 + p1315 + p1314 + p1313 + p1312 + p1311 + p1310 + p1309 + p1308 + p1307 + p1306 + p1305 + p1304 + p1303 + p1302 + p1301 + p1300 + p1299 + p1298 + p1297 + p1296 + p1295 + p1294 + p1293 + p1292 + p1291 + p1290 + p1289 + p1288))))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (G (F ((3 <= p1320 + p1319 + p1318 + p1317 + p1316 + p1315 + p1314 + p1313 + p1312 + p1311 + p1310 + p1309 + p1308 + p1307 + p1306 + p1305 + p1304 + p1303 + p1302 + p1301 + p1300 + p1299 + p1298 + p1297 + p1296 + p1295 + p1294 + p1293 + p1292 + p1291 + p1290 + p1289 + p1288))))
lola: processed formula length: 280
lola: 18 rewrites
lola: closed formula file QuasiCertifProtocol-COL-32-LTLCardinality.task
lola: the resulting Büchi automaton has 2 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: using ltl preserving stubborn set method (--stubborn)
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: LTL model checker
lola: The net does not satisfy the given formula (language of the product automaton is nonempty).
lola: 91 markings, 91 edges
lola: ========================================
FORMULA QuasiCertifProtocol-COL-32-LTLCardinality-4 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 15 will run for 2949 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (G (F ((2 <= p1355 + p1356 + p1357 + p1358 + p1359 + p1360 + p1361 + p1362 + p1363 + p1364 + p1365 + p1366 + p1367 + p1368 + p1369 + p1370 + p1371 + p1372 + p1373 + p1374 + p1375 + p1376 + p1377 + p1378 + p1379 + p1380 + p1381 + p1382 + p1383 + p1384 + p1385 + p1386 + p1387))))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (G (F ((2 <= p1355 + p1356 + p1357 + p1358 + p1359 + p1360 + p1361 + p1362 + p1363 + p1364 + p1365 + p1366 + p1367 + p1368 + p1369 + p1370 + p1371 + p1372 + p1373 + p1374 + p1375 + p1376 + p1377 + p1378 + p1379 + p1380 + p1381 + p1382 + p1383 + p1384 + p1385 + p1386 + p1387))))
lola: processed formula length: 280
lola: 18 rewrites
lola: closed formula file QuasiCertifProtocol-COL-32-LTLCardinality.task
lola: the resulting Büchi automaton has 2 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: using ltl preserving stubborn set method (--stubborn)
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: LTL model checker
lola: The net does not satisfy the given formula (language of the product automaton is nonempty).
lola: 71 markings, 71 edges
lola: ========================================
FORMULA QuasiCertifProtocol-COL-32-LTLCardinality-1 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: ========================================
lola: ...considering subproblem: A (X (X (G ((p1354 <= p2646 + p2647 + p2648 + p2649 + p2650 + p2651 + p2652 + p2653 + p2654 + p2655 + p2656 + p2657 + p2658 + p2659 + p2660 + p2661 + p2662 + p2663 + p2664 + p2665 + p2666 + p2667 + p2668 + p2669 + p2670 + p2671 + p2672 + p2673 + p2674 + p2675 + p2676 + p2677 + p2678)))))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (X (G ((p1354 <= p2646 + p2647 + p2648 + p2649 + p2650 + p2651 + p2652 + p2653 + p2654 + p2655 + p2656 + p2657 + p2658 + p2659 + p2660 + p2661 + p2662 + p2663 + p2664 + p2665 + p2666 + p2667 + p2668 + p2669 + p2670 + p2671 + p2672 + p2673 + p2674 + p2675 + p2676 + p2677 + p2678)))))
lola: processed formula length: 288
lola: 18 rewrites
lola: closed formula file QuasiCertifProtocol-COL-32-LTLCardinality.task
lola: the resulting Büchi automaton has 4 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
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lola: 44422092 markings, 413519509 edges, 28895 markings/sec, 1285 secs
lola: 44571850 markings, 414909707 edges, 29952 markings/sec, 1290 secs
lola: 44746165 markings, 416408750 edges, 34863 markings/sec, 1295 secs
lola: 44894683 markings, 417804737 edges, 29704 markings/sec, 1300 secs
lola: 45031203 markings, 419174173 edges, 27304 markings/sec, 1305 secs
lola: 45190484 markings, 420604483 edges, 31856 markings/sec, 1310 secs
lola: 45348196 markings, 422029798 edges, 31542 markings/sec, 1315 secs
lola: 45494059 markings, 423405874 edges, 29173 markings/sec, 1320 secs
lola: 45623573 markings, 424743279 edges, 25903 markings/sec, 1325 secs
lola: 45819357 markings, 426357358 edges, 39157 markings/sec, 1330 secs
lola: 46008417 markings, 428062807 edges, 37812 markings/sec, 1335 secs
lola: 46187538 markings, 429766148 edges, 35824 markings/sec, 1340 secs
lola: 46359477 markings, 431469980 edges, 34388 markings/sec, 1345 secs
lola: 46516347 markings, 433171501 edges, 31374 markings/sec, 1350 secs
lola: 46697291 markings, 434868972 edges, 36189 markings/sec, 1355 secs
lola: 46857824 markings, 436561459 edges, 32107 markings/sec, 1360 secs
lola: 47015817 markings, 438254448 edges, 31599 markings/sec, 1365 secs
lola: 47160869 markings, 439945837 edges, 29010 markings/sec, 1370 secs
lola: 47324484 markings, 441616733 edges, 32723 markings/sec, 1375 secs
lola: 47489793 markings, 443269622 edges, 33062 markings/sec, 1380 secs
lola: 47641829 markings, 444920165 edges, 30407 markings/sec, 1385 secs
lola: 47790138 markings, 446567622 edges, 29662 markings/sec, 1390 secs
lola: 47926771 markings, 448211605 edges, 27327 markings/sec, 1395 secs
lola: 48079120 markings, 449853512 edges, 30470 markings/sec, 1400 secs
lola: 48215988 markings, 451491214 edges, 27374 markings/sec, 1405 secs
lola: 48351815 markings, 453130219 edges, 27165 markings/sec, 1410 secs
lola: 48473636 markings, 454770500 edges, 24364 markings/sec, 1415 secs
lola: 48649662 markings, 456428762 edges, 35205 markings/sec, 1420 secs
lola: 48808834 markings, 458078658 edges, 31834 markings/sec, 1425 secs
lola: 48961260 markings, 459726690 edges, 30485 markings/sec, 1430 secs
lola: 49106062 markings, 461372496 edges, 28960 markings/sec, 1435 secs
lola: 49250205 markings, 463019274 edges, 28829 markings/sec, 1440 secs
lola: 49395921 markings, 464657986 edges, 29143 markings/sec, 1445 secs
lola: 49530830 markings, 466294278 edges, 26982 markings/sec, 1450 secs
lola: 49662373 markings, 467929155 edges, 26309 markings/sec, 1455 secs
lola: 49793260 markings, 469558395 edges, 26177 markings/sec, 1460 secs
lola: 49937405 markings, 471162213 edges, 28829 markings/sec, 1465 secs
lola: 50066656 markings, 472754419 edges, 25850 markings/sec, 1470 secs
lola: 50198499 markings, 474330879 edges, 26369 markings/sec, 1475 secs
lola: 50314529 markings, 475907429 edges, 23206 markings/sec, 1480 secs
lola: 50448567 markings, 477514271 edges, 26808 markings/sec, 1485 secs
lola: 50567255 markings, 479125519 edges, 23738 markings/sec, 1490 secs
lola: 50685244 markings, 480716551 edges, 23598 markings/sec, 1495 secs
lola: 50821414 markings, 482310582 edges, 27234 markings/sec, 1500 secs
lola: 51031525 markings, 483879897 edges, 42022 markings/sec, 1505 secs
lola: 51238464 markings, 485454025 edges, 41388 markings/sec, 1510 secs
lola: 51418922 markings, 487080348 edges, 36092 markings/sec, 1515 secs
lola: 51585227 markings, 488680935 edges, 33261 markings/sec, 1520 secs
lola: 51744339 markings, 490246689 edges, 31822 markings/sec, 1525 secs
lola: 51952964 markings, 491807415 edges, 41725 markings/sec, 1530 secs
lola: 52159149 markings, 493374607 edges, 41237 markings/sec, 1535 secs
lola: 52337609 markings, 494989347 edges, 35692 markings/sec, 1540 secs
lola: 52502188 markings, 496570414 edges, 32916 markings/sec, 1545 secs
lola: 52657426 markings, 498113648 edges, 31048 markings/sec, 1550 secs
lola: 52863230 markings, 499651597 edges, 41161 markings/sec, 1555 secs
lola: 53068456 markings, 501231301 edges, 41045 markings/sec, 1560 secs
lola: 53239357 markings, 502817460 edges, 34180 markings/sec, 1565 secs
lola: 53405770 markings, 504392020 edges, 33283 markings/sec, 1570 secs
lola: 53564292 markings, 505923097 edges, 31704 markings/sec, 1575 secs
lola: 53764128 markings, 507423518 edges, 39967 markings/sec, 1580 secs
lola: 53961786 markings, 509027961 edges, 39532 markings/sec, 1585 secs
lola: 54133484 markings, 510595338 edges, 34340 markings/sec, 1590 secs
lola: 54291986 markings, 512141699 edges, 31700 markings/sec, 1595 secs
lola: 54458907 markings, 513655160 edges, 33384 markings/sec, 1600 secs
lola: 54661903 markings, 515158857 edges, 40599 markings/sec, 1605 secs
lola: 54848398 markings, 516772564 edges, 37299 markings/sec, 1610 secs
lola: 55012901 markings, 518315057 edges, 32901 markings/sec, 1615 secs
lola: 55158687 markings, 519814950 edges, 29157 markings/sec, 1620 secs
lola: 55343808 markings, 521307857 edges, 37024 markings/sec, 1625 secs
lola: 55544559 markings, 522875099 edges, 40150 markings/sec, 1630 secs
lola: 55705326 markings, 524395119 edges, 32153 markings/sec, 1635 secs
lola: 55868515 markings, 525918306 edges, 32638 markings/sec, 1640 secs
lola: 56019844 markings, 527387108 edges, 30266 markings/sec, 1645 secs
lola: 56220977 markings, 528887872 edges, 40227 markings/sec, 1650 secs
lola: 56397547 markings, 530442866 edges, 35314 markings/sec, 1655 secs
lola: 56558303 markings, 531946827 edges, 32151 markings/sec, 1660 secs
lola: 56699060 markings, 533400401 edges, 28151 markings/sec, 1665 secs
lola: 56879095 markings, 534849319 edges, 36007 markings/sec, 1670 secs
lola: 57070924 markings, 536422632 edges, 38366 markings/sec, 1675 secs
lola: 57230347 markings, 537908240 edges, 31885 markings/sec, 1680 secs
lola: 57377675 markings, 539364875 edges, 29466 markings/sec, 1685 secs
lola: 57536132 markings, 540793990 edges, 31691 markings/sec, 1690 secs
lola: 57725966 markings, 542326280 edges, 37967 markings/sec, 1695 secs
lola: 57885470 markings, 543796818 edges, 31901 markings/sec, 1700 secs
lola: 58037706 markings, 545250517 edges, 30447 markings/sec, 1705 secs
lola: 58183411 markings, 546661147 edges, 29141 markings/sec, 1710 secs
lola: 58373331 markings, 548175824 edges, 37984 markings/sec, 1715 secs
lola: 58525648 markings, 549612765 edges, 30463 markings/sec, 1720 secs
lola: 58679743 markings, 551052176 edges, 30819 markings/sec, 1725 secs
lola: 58817320 markings, 552438287 edges, 27515 markings/sec, 1730 secs
lola: 59003838 markings, 553941747 edges, 37304 markings/sec, 1735 secs
lola: 59157818 markings, 555368982 edges, 30796 markings/sec, 1740 secs
lola: 59307431 markings, 556785294 edges, 29923 markings/sec, 1745 secs
lola: 59441959 markings, 558141346 edges, 26906 markings/sec, 1750 secs
lola: 59625222 markings, 559640475 edges, 36653 markings/sec, 1755 secs
lola: 59774532 markings, 561041001 edges, 29862 markings/sec, 1760 secs
lola: 59917648 markings, 562428488 edges, 28623 markings/sec, 1765 secs
lola: 60065967 markings, 563828916 edges, 29664 markings/sec, 1770 secs
lola: 60227202 markings, 565256398 edges, 32247 markings/sec, 1775 secs
lola: 60375692 markings, 566641293 edges, 29698 markings/sec, 1780 secs
lola: 60509604 markings, 567991184 edges, 26782 markings/sec, 1785 secs
lola: 60688366 markings, 569533209 edges, 35752 markings/sec, 1790 secs
lola: 60883438 markings, 571243133 edges, 39014 markings/sec, 1795 secs
lola: 61059973 markings, 572946596 edges, 35307 markings/sec, 1800 secs
lola: 61234852 markings, 574649176 edges, 34976 markings/sec, 1805 secs
lola: 61395724 markings, 576349412 edges, 32174 markings/sec, 1810 secs
lola: 61572335 markings, 578017998 edges, 35322 markings/sec, 1815 secs
lola: 61731605 markings, 579676650 edges, 31854 markings/sec, 1820 secs
lola: 61886367 markings, 581334944 edges, 30952 markings/sec, 1825 secs
lola: 62032430 markings, 582990344 edges, 29213 markings/sec, 1830 secs
lola: 62183639 markings, 584647934 edges, 30242 markings/sec, 1835 secs
lola: 62352303 markings, 586306189 edges, 33733 markings/sec, 1840 secs
lola: 62503664 markings, 587959824 edges, 30272 markings/sec, 1845 secs
lola: 62659943 markings, 589613621 edges, 31256 markings/sec, 1850 secs
lola: 62798073 markings, 591260404 edges, 27626 markings/sec, 1855 secs
lola: 62946980 markings, 592874361 edges, 29781 markings/sec, 1860 secs
lola: 63084192 markings, 594477612 edges, 27442 markings/sec, 1865 secs
lola: 63216327 markings, 596080744 edges, 26427 markings/sec, 1870 secs
lola: 63340665 markings, 597680353 edges, 24868 markings/sec, 1875 secs
lola: 63495978 markings, 599317023 edges, 31063 markings/sec, 1880 secs
lola: 63661010 markings, 600972394 edges, 33006 markings/sec, 1885 secs
lola: 63813730 markings, 602627012 edges, 30544 markings/sec, 1890 secs
lola: 63962408 markings, 604277665 edges, 29736 markings/sec, 1895 secs
lola: 64098387 markings, 605929763 edges, 27196 markings/sec, 1900 secs
lola: 64250431 markings, 607537833 edges, 30409 markings/sec, 1905 secs
lola: 64385228 markings, 609143182 edges, 26959 markings/sec, 1910 secs
lola: 64518285 markings, 610745740 edges, 26611 markings/sec, 1915 secs
lola: 64639047 markings, 612350557 edges, 24152 markings/sec, 1920 secs
lola: 64787131 markings, 613970804 edges, 29617 markings/sec, 1925 secs
lola: 64924872 markings, 615584409 edges, 27548 markings/sec, 1930 secs
lola: 65057762 markings, 617197776 edges, 26578 markings/sec, 1935 secs
lola: 65182543 markings, 618811590 edges, 24956 markings/sec, 1940 secs
lola: 65309359 markings, 620398338 edges, 25363 markings/sec, 1945 secs
lola: 65430241 markings, 621965118 edges, 24176 markings/sec, 1950 secs
lola: 65546538 markings, 623533005 edges, 23259 markings/sec, 1955 secs
lola: 65653514 markings, 625106003 edges, 21395 markings/sec, 1960 secs
lola: 65848565 markings, 626695613 edges, 39010 markings/sec, 1965 secs
lola: 66049996 markings, 628195347 edges, 40286 markings/sec, 1970 secs
lola: 66243410 markings, 629839640 edges, 38683 markings/sec, 1975 secs
lola: 66411996 markings, 631422202 edges, 33717 markings/sec, 1980 secs
lola: 66562419 markings, 632968273 edges, 30085 markings/sec, 1985 secs
lola: 66755588 markings, 634514949 edges, 38634 markings/sec, 1990 secs
lola: 66957315 markings, 636019374 edges, 40345 markings/sec, 1995 secs
lola: 67141091 markings, 637622496 edges, 36755 markings/sec, 2000 secs
lola: 67307911 markings, 639181475 edges, 33364 markings/sec, 2005 secs
lola: 67455586 markings, 640715626 edges, 29535 markings/sec, 2010 secs
lola: 67651875 markings, 642251229 edges, 39258 markings/sec, 2015 secs
lola: 67854698 markings, 643793478 edges, 40565 markings/sec, 2020 secs
lola: 68029461 markings, 645373813 edges, 34953 markings/sec, 2025 secs
lola: 68192273 markings, 646923896 edges, 32562 markings/sec, 2030 secs
lola: 68340962 markings, 648434685 edges, 29738 markings/sec, 2035 secs
lola: 68540843 markings, 649934224 edges, 39976 markings/sec, 2040 secs
lola: 68736214 markings, 651511044 edges, 39074 markings/sec, 2045 secs
lola: 68905303 markings, 653061465 edges, 33818 markings/sec, 2050 secs
lola: 69063074 markings, 654587534 edges, 31554 markings/sec, 2055 secs
lola: 69224671 markings, 656078781 edges, 32319 markings/sec, 2060 secs
lola: 69426206 markings, 657582002 edges, 40307 markings/sec, 2065 secs
lola: 69602877 markings, 659137754 edges, 35334 markings/sec, 2070 secs
lola: 69765363 markings, 660659175 edges, 32497 markings/sec, 2075 secs
lola: 69908146 markings, 662136815 edges, 28557 markings/sec, 2080 secs
lola: 70091270 markings, 663604418 edges, 36625 markings/sec, 2085 secs
lola: 70283866 markings, 665158361 edges, 38519 markings/sec, 2090 secs
lola: 70447762 markings, 666664564 edges, 32779 markings/sec, 2095 secs
lola: 70601186 markings, 668150221 edges, 30685 markings/sec, 2100 secs
lola: 70757241 markings, 669604306 edges, 31211 markings/sec, 2105 secs
lola: 70955061 markings, 671123858 edges, 39564 markings/sec, 2110 secs
lola: 71118025 markings, 672618910 edges, 32593 markings/sec, 2115 secs
lola: 71273130 markings, 674094872 edges, 31021 markings/sec, 2120 secs
lola: 71411508 markings, 675527713 edges, 27676 markings/sec, 2125 secs
lola: 71609086 markings, 677020968 edges, 39516 markings/sec, 2130 secs
lola: 71777739 markings, 678513503 edges, 33731 markings/sec, 2135 secs
lola: 71931449 markings, 679960734 edges, 30742 markings/sec, 2140 secs
lola: 72068288 markings, 681374969 edges, 27368 markings/sec, 2145 secs
lola: 72250284 markings, 682831140 edges, 36399 markings/sec, 2150 secs
lola: 72416943 markings, 684302710 edges, 33332 markings/sec, 2155 secs
lola: 72569127 markings, 685720899 edges, 30437 markings/sec, 2160 secs
lola: 72705552 markings, 687105037 edges, 27285 markings/sec, 2165 secs
lola: 72874215 markings, 688529324 edges, 33733 markings/sec, 2170 secs
lola: 73038483 markings, 689975803 edges, 32854 markings/sec, 2175 secs
lola: 73187547 markings, 691368723 edges, 29813 markings/sec, 2180 secs
lola: 73322850 markings, 692732449 edges, 27061 markings/sec, 2185 secs
lola: 73481560 markings, 694122298 edges, 31742 markings/sec, 2190 secs
lola: 73639146 markings, 695511235 edges, 31517 markings/sec, 2195 secs
lola: 73784490 markings, 696873260 edges, 29069 markings/sec, 2200 secs
lola: 73916538 markings, 698215270 edges, 26410 markings/sec, 2205 secs
lola: 74074596 markings, 699610312 edges, 31612 markings/sec, 2210 secs
lola: 74224473 markings, 700980825 edges, 29975 markings/sec, 2215 secs
lola: 74368838 markings, 702336386 edges, 28873 markings/sec, 2220 secs
lola: 74495442 markings, 703650906 edges, 25321 markings/sec, 2225 secs
lola: 74693040 markings, 705269858 edges, 39520 markings/sec, 2230 secs
lola: 74880175 markings, 706966884 edges, 37427 markings/sec, 2235 secs
lola: 75057250 markings, 708647676 edges, 35415 markings/sec, 2240 secs
lola: 75223130 markings, 710291498 edges, 33176 markings/sec, 2245 secs
lola: 75372073 markings, 711932993 edges, 29789 markings/sec, 2250 secs
lola: 75550771 markings, 713583011 edges, 35740 markings/sec, 2255 secs
lola: 75709616 markings, 715242307 edges, 31769 markings/sec, 2260 secs
lola: 75860451 markings, 716877978 edges, 30167 markings/sec, 2265 secs
lola: 76002481 markings, 718489543 edges, 28406 markings/sec, 2270 secs
lola: 76155843 markings, 720120739 edges, 30672 markings/sec, 2275 secs
lola: 76322360 markings, 721778837 edges, 33303 markings/sec, 2280 secs
lola: 76473233 markings, 723440630 edges, 30175 markings/sec, 2285 secs
lola: 76624620 markings, 725043821 edges, 30277 markings/sec, 2290 secs
lola: 76759020 markings, 726644162 edges, 26880 markings/sec, 2295 secs
lola: 76907066 markings, 728248021 edges, 29609 markings/sec, 2300 secs
lola: 77044020 markings, 729848974 edges, 27391 markings/sec, 2305 secs
lola: 77174257 markings, 731427693 edges, 26047 markings/sec, 2310 secs
lola: 77295895 markings, 732985306 edges, 24328 markings/sec, 2315 secs
lola: 77446497 markings, 734594539 edges, 30120 markings/sec, 2320 secs
lola: 77611956 markings, 736251829 edges, 33092 markings/sec, 2325 secs
lola: 77763466 markings, 737900342 edges, 30302 markings/sec, 2330 secs
lola: 77909616 markings, 739511069 edges, 29230 markings/sec, 2335 secs
lola: 78043774 markings, 741117273 edges, 26832 markings/sec, 2340 secs
lola: 78194082 markings, 742727561 edges, 30062 markings/sec, 2345 secs
lola: 78331310 markings, 744335289 edges, 27446 markings/sec, 2350 secs
lola: 78461982 markings, 745914482 edges, 26134 markings/sec, 2355 secs
lola: 78581653 markings, 747476279 edges, 23934 markings/sec, 2360 secs
lola: 78722082 markings, 749076073 edges, 28086 markings/sec, 2365 secs
lola: 78862658 markings, 750686702 edges, 28115 markings/sec, 2370 secs
lola: 78993759 markings, 752272449 edges, 26220 markings/sec, 2375 secs
lola: 79116496 markings, 753828465 edges, 24547 markings/sec, 2380 secs
lola: 79238196 markings, 755387924 edges, 24340 markings/sec, 2385 secs
lola: 79361537 markings, 756948918 edges, 24668 markings/sec, 2390 secs
lola: 79476307 markings, 758495782 edges, 22954 markings/sec, 2395 secs
lola: 79583560 markings, 760017671 edges, 21451 markings/sec, 2400 secs
lola: 79742309 markings, 761569546 edges, 31750 markings/sec, 2405 secs
lola: 79938434 markings, 763041129 edges, 39225 markings/sec, 2410 secs
lola: 80134913 markings, 764643501 edges, 39296 markings/sec, 2415 secs
lola: 80302610 markings, 766203670 edges, 33539 markings/sec, 2420 secs
lola: 80455200 markings, 767728731 edges, 30518 markings/sec, 2425 secs
lola: 80609300 markings, 769095799 edges, 30820 markings/sec, 2430 secs
lola: 80630011 markings, 769242076 edges, 4142 markings/sec, 2435 secs
lola: 80641359 markings, 769334725 edges, 2270 markings/sec, 2440 secs
lola: 80653853 markings, 769420782 edges, 2499 markings/sec, 2445 secs
lola: 80661181 markings, 769476052 edges, 1466 markings/sec, 2450 secs
lola: 80668763 markings, 769534694 edges, 1516 markings/sec, 2455 secs
lola: 80686852 markings, 769668172 edges, 3618 markings/sec, 2460 secs
lola: Child process aborted or communication problem between parent and child process
FORMULA QuasiCertifProtocol-COL-32-LTLCardinality-13 CANNOT_COMPUTE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: RESULT
lola:
SUMMARY: no no yes no no no no yes no no no yes yes unknown no no
lola:
preliminary result: no no yes no no no no yes no no no yes yes unknown no no
lola: memory consumption: 22312 KB
lola: time consumption: 3089 seconds
BK_STOP 1554076823077
--------------------
content from stderr:
Sequence of Actions to be Executed by the VM
This is useful if one wants to reexecute the tool in the VM from the submitted image disk.
set -x
# this is for BenchKit: configuration of major elements for the test
export BK_INPUT="QuasiCertifProtocol-COL-32"
export BK_EXAMINATION="LTLCardinality"
export BK_TOOL="win2018"
export BK_RESULT_DIR="/tmp/BK_RESULTS/OUTPUTS"
export BK_TIME_CONFINEMENT="3600"
export BK_MEMORY_CONFINEMENT="16384"
# this is specific to your benchmark or test
export BIN_DIR="$HOME/BenchKit/bin"
# remove the execution directoty if it exists (to avoid increse of .vmdk images)
if [ -d execution ] ; then
rm -rf execution
fi
# this is for BenchKit: explicit launching of the test
echo "====================================================================="
echo " Generated by BenchKit 2-3954"
echo " Executing tool win2018"
echo " Input is QuasiCertifProtocol-COL-32, examination is LTLCardinality"
echo " Time confinement is $BK_TIME_CONFINEMENT seconds"
echo " Memory confinement is 16384 MBytes"
echo " Number of cores is 4"
echo " Run identifier is r132-oct2-155403939200083"
echo "====================================================================="
echo
echo "--------------------"
echo "preparation of the directory to be used:"
tar xzf /home/mcc/BenchKit/INPUTS/QuasiCertifProtocol-COL-32.tgz
mv QuasiCertifProtocol-COL-32 execution
cd execution
if [ "LTLCardinality" = "GlobalProperties" ] ; then
rm -f GenericPropertiesVerdict.xml
fi
if [ "LTLCardinality" = "UpperBounds" ] ; then
rm -f GenericPropertiesVerdict.xml
fi
pwd
ls -lh
echo
echo "--------------------"
echo "content from stdout:"
echo
echo "=== Data for post analysis generated by BenchKit (invocation template)"
echo
if [ "LTLCardinality" = "UpperBounds" ] ; then
echo "The expected result is a vector of positive values"
echo NUM_VECTOR
elif [ "LTLCardinality" != "StateSpace" ] ; then
echo "The expected result is a vector of booleans"
echo BOOL_VECTOR
else
echo "no data necessary for post analysis"
fi
echo
if [ -f "LTLCardinality.txt" ] ; then
echo "here is the order used to build the result vector(from text file)"
for x in $(grep Property LTLCardinality.txt | cut -d ' ' -f 2 | sort -u) ; do
echo "FORMULA_NAME $x"
done
elif [ -f "LTLCardinality.xml" ] ; then # for cunf (txt files deleted;-)
echo echo "here is the order used to build the result vector(from xml file)"
for x in $(grep '
echo "FORMULA_NAME $x"
done
fi
echo
echo "=== Now, execution of the tool begins"
echo
echo -n "BK_START "
date -u +%s%3N
echo
timeout -s 9 $BK_TIME_CONFINEMENT bash -c "/home/mcc/BenchKit/BenchKit_head.sh 2> STDERR ; echo ; echo -n \"BK_STOP \" ; date -u +%s%3N"
if [ $? -eq 137 ] ; then
echo
echo "BK_TIME_CONFINEMENT_REACHED"
fi
echo
echo "--------------------"
echo "content from stderr:"
echo
cat STDERR ;