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Model Checking Contest 2019
9th edition, Prague, Czech Republic, April 7, 2019 (TOOLympics)
Execution of r110-oct2-155272242200053
Last Updated
Apr 15, 2019

About the Execution of 2018-Gold for NeoElection-COL-6

Execution Summary
Max Memory
Used (MB)		 Time wait (ms) CPU Usage (ms) I/O Wait (ms) Computed Result Execution
Status
6175.000 3570013.00 3667906.00 498.70 TFFFFTTTFTFTTFF? 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.r110-oct2-155272242200053.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 NeoElection-COL-6, examination is LTLCardinality
Time confinement is 3600 seconds
Memory confinement is 16384 MBytes
Number of cores is 4
Run identifier is r110-oct2-155272242200053
=====================================================================

--------------------
preparation of the directory to be used:
/home/mcc/execution
total 268K
-rw-r--r-- 1 mcc users 3.9K Feb 12 02:53 CTLCardinality.txt
-rw-r--r-- 1 mcc users 19K Feb 12 02:53 CTLCardinality.xml
-rw-r--r-- 1 mcc users 3.5K Feb 8 01:35 CTLFireability.txt
-rw-r--r-- 1 mcc users 20K Feb 8 01:34 CTLFireability.xml
-rw-r--r-- 1 mcc users 4.0K Mar 10 17:31 GenericPropertiesDefinition.xml
-rw-r--r-- 1 mcc users 6.1K Mar 10 17:31 GenericPropertiesVerdict.xml
-rw-r--r-- 1 mcc users 104 Feb 24 15:05 GlobalProperties.txt
-rw-r--r-- 1 mcc users 342 Feb 24 15:05 GlobalProperties.xml
-rw-r--r-- 1 mcc users 2.6K Feb 5 00:18 LTLCardinality.txt
-rw-r--r-- 1 mcc users 10K Feb 5 00:18 LTLCardinality.xml
-rw-r--r-- 1 mcc users 2.0K Feb 4 22:37 LTLFireability.txt
-rw-r--r-- 1 mcc users 8.1K Feb 4 22:37 LTLFireability.xml
-rw-r--r-- 1 mcc users 4.2K Feb 4 07:00 ReachabilityCardinality.txt
-rw-r--r-- 1 mcc users 20K Feb 4 07:00 ReachabilityCardinality.xml
-rw-r--r-- 1 mcc users 3.0K Feb 1 00:41 ReachabilityFireability.txt
-rw-r--r-- 1 mcc users 14K Feb 1 00:41 ReachabilityFireability.xml
-rw-r--r-- 1 mcc users 1.7K Feb 4 22:21 UpperBounds.txt
-rw-r--r-- 1 mcc users 3.8K Feb 4 22:21 UpperBounds.xml
-rw-r--r-- 1 mcc users 5 Jan 29 09:34 equiv_pt
-rw-r--r-- 1 mcc users 2 Jan 29 09:34 instance
-rw-r--r-- 1 mcc users 5 Jan 29 09:34 iscolored
-rw-r--r-- 1 mcc users 98K 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 NeoElection-COL-6-LTLCardinality-00
FORMULA_NAME NeoElection-COL-6-LTLCardinality-01
FORMULA_NAME NeoElection-COL-6-LTLCardinality-02
FORMULA_NAME NeoElection-COL-6-LTLCardinality-03
FORMULA_NAME NeoElection-COL-6-LTLCardinality-04
FORMULA_NAME NeoElection-COL-6-LTLCardinality-05
FORMULA_NAME NeoElection-COL-6-LTLCardinality-06
FORMULA_NAME NeoElection-COL-6-LTLCardinality-07
FORMULA_NAME NeoElection-COL-6-LTLCardinality-08
FORMULA_NAME NeoElection-COL-6-LTLCardinality-09
FORMULA_NAME NeoElection-COL-6-LTLCardinality-10
FORMULA_NAME NeoElection-COL-6-LTLCardinality-11
FORMULA_NAME NeoElection-COL-6-LTLCardinality-12
FORMULA_NAME NeoElection-COL-6-LTLCardinality-13
FORMULA_NAME NeoElection-COL-6-LTLCardinality-14
FORMULA_NAME NeoElection-COL-6-LTLCardinality-15

=== Now, execution of the tool begins

BK_START 1553031719874

info: Time: 3600 - MCC
===========================================================================================
prep: translating NeoElection-COL-6 Petri net model.pnml into LoLA format
===========================================================================================
prep: translating COL Petri net complete
prep: added safe information to the net based on GenericPropertiesVerdict
prep: check for too many tokens
===========================================================================================
prep: translating NeoElection-COL-6 formula LTLCardinality into LoLA format
===========================================================================================
prep: translating COL formula complete
vrfy: Checking LTLCardinality @ NeoElection-COL-6 @ 3567 seconds
lola: LoLA will run for 3567 seconds at most (--timelimit)
lola: NET
lola: reading net from model.pnml.lola
lola: finished parsing
lola: closed net file model.pnml.lola
lola: 13363/65536 symbol table entries, 4016 collisions
lola: preprocessing...
lola: Size of bit vector: 4830
lola: finding significant places
lola: 4830 places, 8533 transitions, 1204 significant places
lola: computing forward-conflicting sets
lola: computing back-conflicting sets
lola: 2597 transition conflict sets
lola: TASK
lola: reading formula from NeoElection-COL-6-LTLCardinality.task
lola: LP says that atomic proposition is always true: (p4627 + p4628 + p4629 + p4630 + p4631 + p4632 + p4633 <= p4801 + p4800 + p4799 + p4798 + p4797 + p4796 + p4795)
lola: place invariant simplifies atomic proposition
lola: before: (p4640 + p4639 + p4638 + p4637 + p4636 + p4635 + p4634 <= p2100 + p2101 + p2102 + p2103 + p2104 + p2105 + p2106 + p2107 + p2108 + p2109 + p2110 + p2111 + p2099 + p2112 + p2098 + p2097 + p2113 + p2096 + p2114 + p2095 + p2115 + p2094 + p2116 + p2093 + p2117 + p2118 + p2119 + p2092 + p2091 + p2090 + p2089 + p2120 + p2088 + p2087 + p2121 + p2086 + p2085 + p2122 + p2084 + p2083 + p2123 + p2082 + p2081 + p2124 + p2080 + p2079 + p2125 + p2078 + p2077 + p2126 + p2076 + p2075 + p2127 + p2128 + p2129 + p2074 + p2073 + p2072 + p2130 + p2071 + p2131 + p2070 + p2132 + p2069 + p2133 + p2068 + p2134 + p2067 + p2135 + p2136 + p2066 + p2137 + p2138 + p2139 + p2140 + p2141 + p2142 + p2143 + p2144 + p2145 + p2146 + p2147 + p2065 + p2148 + p2149 + p2150 + p2151 + p2152 + p2153 + p2154 + p2155 + p2156 + p2157 + p2158 + p2159 + p2160 + p2161 + p2064 + p2162 + p2063 + p2163 + p2164 + p2062 + p2165 + p2166 + p2061 + p2167 + p2168 + p2169 + p2170 + p2171 + p2172 + p2173 + p2174 + p2175 + p2176 + p2177 + p2178 + p2179 + p2180 + p2181 + p2182 + p2183 + p2184 + p2185 + p2186 + p2187 + p2188 + p2189 + p2190 + p2191 + p2192 + p2193 + p2194 + p2195 + p2196 + p2197 + p2198 + p2199 + p2060 + p2059 + p2058 + p2200 + p2201 + p2202 + p2203 + p2204 + p2205 + p2206 + p2207 + p2208 + p2209 + p2210 + p2211 + p2212 + p2213 + p2214 + p2215 + p2216 + 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 + p2249 + 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 + p2282 + p2283 + p2284 + p2285 + p2286 + p2287 + p2288 + p2289 + p2290 + p2291 + p2292 + p2293 + p2294 + p2295 + p2296 + p2297 + p2298 + p2299 + p2300 + p2301 + p2302 + p2303 + p2304 + p2305 + p2306 + p2307 + p2308 + p2309 + p2310 + p2311 + p2312 + p2313 + p2314 + p2315 + 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 + p2342 + p2343 + p2344 + p2345 + p2346 + p2347 + p2348 + p2349 + p2350 + p2351)
lola: after: (0 <= 30)
lola: always true
lola: place invariant simplifies atomic proposition
lola: before: (1 <= p4619 + p4618 + p4617 + p4616 + p4615 + p4614 + p4613)
lola: after: (1 <= 0)
lola: always false
lola: place invariant simplifies atomic proposition
lola: before: (3 <= p4619 + p4618 + p4617 + p4616 + p4615 + p4614 + p4613)
lola: after: (3 <= 0)
lola: always false
lola: place invariant simplifies atomic proposition
lola: before: (p4648 + p4649 + p4650 + p4651 + p4652 + p4653 + p4654 + p4655 + p4656 + p4657 + p4658 + p4659 + p4660 + p4662 + p4663 + p4664 + p4665 + p4666 + p4667 + p4668 + p4669 + p4670 + p4671 + p4672 + p4673 + p4674 + p4676 + p4677 + p4678 + p4679 + p4680 + p4681 + p4682 + p4683 + p4684 + p4685 + p4686 + p4687 + p4688 + p4690 + p4691 + p4692 + p4693 + p4694 + p4695 + p4696 + p4697 + p4698 + p4699 + p4700 + p4701 + p4702 + p4704 + p4705 + p4706 + p4707 + p4708 + p4709 + p4710 + p4711 + p4712 + p4713 + p4714 + p4715 + p4716 + p4718 + p4719 + p4744 + p4743 + p4742 + p4720 + p4721 + p4722 + p4723 + p4724 + p4725 + p4726 + p4727 + p4728 + p4729 + p4741 + p4740 + p4739 + p4738 + p4737 + p4736 + p4735 + p4734 + p4730 + p4733 + p4732 + p4731 + p4745 + p4717 + p4703 + p4689 + p4675 + p4661 <= p4626 + p4625 + p4624 + p4623 + p4622 + p4621 + p4620)
lola: after: (6 <= 0)
lola: always false
lola: place invariant simplifies atomic proposition
lola: before: (p4606 + p4607 + p4608 + p4609 + p4610 + p4611 + p4612 <= p4828 + p4825 + p4822 + p4819 + p4816 + p4813 + p4810 + p4809 + p4811 + p4812 + p4814 + p4815 + p4817 + p4818 + p4820 + p4821 + p4823 + p4824 + p4826 + p4827 + p4829)
lola: after: (p4606 + p4607 + p4608 + p4609 + p4610 + p4611 + p4612 <= 6)
lola: LP says that atomic proposition is always true: (p4606 + p4607 + p4608 + p4609 + p4610 + p4611 + p4612 <= 6)
lola: place invariant simplifies atomic proposition
lola: before: (3 <= p2100 + p2101 + p2102 + p2103 + p2104 + p2105 + p2106 + p2107 + p2108 + p2109 + p2110 + p2111 + p2099 + p2112 + p2098 + p2097 + p2113 + p2096 + p2114 + p2095 + p2115 + p2094 + p2116 + p2093 + p2117 + p2118 + p2119 + p2092 + p2091 + p2090 + p2089 + p2120 + p2088 + p2087 + p2121 + p2086 + p2085 + p2122 + p2084 + p2083 + p2123 + p2082 + p2081 + p2124 + p2080 + p2079 + p2125 + p2078 + p2077 + p2126 + p2076 + p2075 + p2127 + p2128 + p2129 + p2074 + p2073 + p2072 + p2130 + p2071 + p2131 + p2070 + p2132 + p2069 + p2133 + p2068 + p2134 + p2067 + p2135 + p2136 + p2066 + p2137 + p2138 + p2139 + p2140 + p2141 + p2142 + p2143 + p2144 + p2145 + p2146 + p2147 + p2065 + p2148 + p2149 + p2150 + p2151 + p2152 + p2153 + p2154 + p2155 + p2156 + p2157 + p2158 + p2159 + p2160 + p2161 + p2064 + p2162 + p2063 + p2163 + p2164 + p2062 + p2165 + p2166 + p2061 + p2167 + p2168 + p2169 + p2170 + p2171 + p2172 + p2173 + p2174 + p2175 + p2176 + p2177 + p2178 + p2179 + p2180 + p2181 + p2182 + p2183 + p2184 + p2185 + p2186 + p2187 + p2188 + p2189 + p2190 + p2191 + p2192 + p2193 + p2194 + p2195 + p2196 + p2197 + p2198 + p2199 + p2060 + p2059 + p2058 + p2200 + p2201 + p2202 + p2203 + p2204 + p2205 + p2206 + p2207 + p2208 + p2209 + p2210 + p2211 + p2212 + p2213 + p2214 + p2215 + p2216 + 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 + p2249 + 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 + p2282 + p2283 + p2284 + p2285 + p2286 + p2287 + p2288 + p2289 + p2290 + p2291 + p2292 + p2293 + p2294 + p2295 + p2296 + p2297 + p2298 + p2299 + p2300 + p2301 + p2302 + p2303 + p2304 + p2305 + p2306 + p2307 + p2308 + p2309 + p2310 + p2311 + p2312 + p2313 + p2314 + p2315 + 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 + p2342 + p2343 + p2344 + p2345 + p2346 + p2347 + p2348 + p2349 + p2350 + p2351)
lola: after: (0 <= 27)
lola: always true
lola: place invariant simplifies atomic proposition
lola: before: (p4640 + p4639 + p4638 + p4637 + p4636 + p4635 + p4634 <= p4828 + p4825 + p4822 + p4819 + p4816 + p4813 + p4810 + p4809 + p4811 + p4812 + p4814 + p4815 + p4817 + p4818 + p4820 + p4821 + p4823 + p4824 + p4826 + p4827 + p4829)
lola: after: (0 <= 6)
lola: always true
lola: place invariant simplifies atomic proposition
lola: before: (p4606 + p4607 + p4608 + p4609 + p4610 + p4611 + p4612 <= p4459 + p4460 + p4462 + p4463 + p4465 + p4466 + p4468 + p4469 + p4471 + p4472 + p4474 + p4475 + p4477 + p4478 + p4480 + p4481 + p4483 + p4484 + p4486 + p4487 + p4489 + p4490 + p4492 + p4493 + p4495 + p4496 + p4498 + p4499 + p4501 + p4502 + p4504 + p4505 + p4507 + p4508 + p4510 + p4511 + p4513 + p4514 + p4516 + p4517 + p4519 + p4520 + p4522 + p4523 + p4525 + p4526 + p4528 + p4529 + p4531 + p4532 + p4534 + p4535 + p4537 + p4538 + p4540 + p4541 + p4543 + p4544 + p4546 + p4547 + p4549 + p4550 + p4552 + p4553 + p4555 + p4556 + p4558 + p4559 + p4561 + p4562 + p4564 + p4565 + p4567 + p4568 + p4570 + p4571 + p4573 + p4574 + p4576 + p4577 + p4579 + p4580 + p4582 + p4583 + p4585 + p4586 + p4588 + p4589 + p4591 + p4592 + p4594 + p4595 + p4597 + p4598 + p4600 + p4601 + p4603 + p4604 + p4605 + p4602 + p4599 + p4596 + p4593 + p4590 + p4587 + p4584 + p4581 + p4578 + p4575 + p4572 + p4569 + p4566 + p4563 + p4560 + p4557 + p4554 + p4551 + p4548 + p4545 + p4542 + p4539 + p4536 + p4533 + p4530 + p4527 + p4524 + p4521 + p4518 + p4515 + p4512 + p4509 + p4506 + p4503 + p4500 + p4497 + p4494 + p4491 + p4488 + p4485 + p4482 + p4479 + p4476 + p4473 + p4470 + p4467 + p4464 + p4461)
lola: after: (p4606 + p4607 + p4608 + p4609 + p4610 + p4611 + p4612 <= 36)
lola: LP says that atomic proposition is always true: (p4606 + p4607 + p4608 + p4609 + p4610 + p4611 + p4612 <= 36)
lola: LP says that atomic proposition is always true: (p4417 + p4418 + p4419 + p4420 + p4421 + p4422 + p4423 + p4424 + p4425 + p4426 + p4427 + p4428 + p4429 + p4430 + p4431 + p4432 + p4433 + p4434 + p4435 + p4436 + p4437 + p4438 + p4439 + p4440 + p4441 + p4442 + p4443 + p4444 + p4445 + p4446 + p4447 + p4448 + p4449 + p4450 + p4451 + p4452 + p4453 + p4454 + p4455 + p4456 + p4457 + p4458 <= p4410 + p4411 + p4412 + p4413 + p4414 + p4415 + p4416)
lola: place invariant simplifies atomic proposition
lola: before: (2 <= p4193 + p4186 + p4179 + p4172 + p4171 + p4170 + p4169 + p4168 + p4167 + p4166 + p4165 + p4158 + p4151 + p4144 + p4137 + p4130 + p4129 + p4128 + p4127 + p4126 + p4125 + p4124 + p4123 + p4116 + p4109 + p4102 + p4095 + p4088 + p4087 + p4086 + p4085 + p4084 + p4083 + p4082 + p4081 + p4074 + p4067 + p4060 + p4053 + p4046 + p4045 + p4044 + p4043 + p4042 + p4041 + p4040 + p4039 + p4032 + p4025 + p4018 + p4011 + p4004 + p4003 + p4002 + p4001 + p4000 + p4200 + p2996 + p2995 + p4207 + p4208 + p4209 + p4210 + p4211 + p4212 + p4213 + p4214 + p2994 + p2993 + p2992 + p2991 + p2990 + p2989 + p4221 + p2982 + p4228 + p2975 + p2968 + p2961 + p2954 + p2953 + p4235 + p2952 + p2951 + p2950 + p4242 + p2949 + p2948 + p2947 + p4249 + p4250 + p4251 + p4252 + p4253 + p4254 + p4255 + p4256 + p2940 + p4263 + p2933 + p2926 + p2919 + p2912 + p2911 + p4270 + p2910 + p4277 + p2909 + p2908 + p2907 + p2906 + p2905 + p4284 + p4291 + p4292 + p4293 + p4294 + p4295 + p4296 + p4297 + p4298 + p4305 + p2898 + p4312 + p2891 + p4319 + p2884 + p2877 + p2870 + p2869 + p2868 + p2867 + p4326 + p2866 + p2865 + p2864 + p2863 + p2856 + p4333 + p4334 + p3003 + p4335 + p4336 + p4337 + p2849 + p4338 + p2842 + p4339 + p2835 + p2828 + p4340 + p2827 + p3010 + p2826 + p2825 + p2824 + p2823 + p2822 + p2821 + p2814 + p4347 + p3017 + p2807 + p2800 + p4354 + p3024 + p2793 + p4361 + p2786 + p2785 + p3031 + p2784 + p3032 + p2783 + p3033 + p2782 + p3034 + p2781 + p3035 + p2780 + p3036 + p4368 + p3037 + p2779 + p3038 + p2772 + p2765 + p2758 + p2751 + p4375 + p2744 + p4376 + p3045 + p4377 + p2743 + p4378 + p2742 + p4379 + p2741 + p2740 + p2739 + p2738 + p2737 + p2730 + p2723 + p2716 + p2709 + p2702 + p4380 + p4381 + p2701 + p4382 + p2700 + p3052 + p4389 + p3059 + p2699 + p2698 + p2697 + p2696 + p2695 + p4396 + p2688 + p3066 + p2681 + p2674 + p3999 + p3073 + p3074 + p3075 + p3076 + p3077 + p3078 + p3079 + p3080 + p2667 + p3998 + p3997 + p2660 + p3990 + p2659 + p3087 + p2658 + p2657 + p2656 + p2655 + p2654 + 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lola: after: (2 <= p4193 + p4186 + p4179 + p4172 + p4171 + p4170 + p4169 + p4168 + p4167 + p4166 + p4165 + p4158 + p4151 + p4144 + p4137 + p4130 + p4129 + p4128 + p4127 + p4126 + p4125 + p4124 + p4123 + p4116 + p4109 + p4102 + p4095 + p4088 + p4087 + p4086 + p4085 + p4084 + p4083 + p4082 + p4081 + p4074 + p4067 + p4060 + p4053 + p4046 + p4045 + p4044 + p4043 + p4042 + p4041 + p4040 + p4039 + p4032 + p4025 + p4018 + p4011 + p4004 + p4003 + p4002 + p4001 + p4000 + p4200 + p2996 + p2995 + p4207 + p4208 + p4209 + p4210 + p4211 + p4212 + p4213 + p4214 + p2994 + p2993 + p2992 + p2991 + p2990 + p2989 + p4221 + p2982 + p4228 + p2975 + p2968 + p2961 + p2954 + p2953 + p4235 + p2952 + p2951 + p2950 + p4242 + p2949 + p2948 + p2947 + p4249 + p4250 + p4251 + p4252 + p4253 + p4254 + p4255 + p4256 + p2940 + p4263 + p2933 + p2926 + p2919 + p2912 + p2911 + p4270 + p2910 + p4277 + p2909 + p2908 + p2907 + p2906 + p2905 + p4284 + p4291 + p4292 + p4293 + p4294 + p4295 + p4296 + p4297 + p4298 + p4305 + p2898 + p4312 + p2891 + p4319 + p2884 + p2877 + p2870 + p2869 + p2868 + p2867 + p4326 + p2866 + p2865 + p2864 + p2863 + p2856 + p4333 + p4334 + p3003 + p4335 + p4336 + p4337 + p2849 + p4338 + p2842 + p4339 + p2835 + p2828 + p4340 + p2827 + p3010 + p2826 + p2825 + p2824 + p2823 + p2822 + p2821 + p2814 + p4347 + p3017 + p2807 + p2800 + p4354 + p3024 + p2793 + p4361 + p2786 + p2785 + p3031 + p2784 + p3032 + p2783 + p3033 + p2782 + p3034 + p2781 + p3035 + p2780 + p3036 + p4368 + p3037 + p2779 + p3038 + p2772 + p2765 + p2758 + p2751 + p4375 + p2744 + p4376 + p3045 + p4377 + p2743 + p4378 + p2742 + p4379 + p2741 + p2740 + p2739 + p2738 + p2737 + p2730 + p2723 + p2716 + p2709 + p2702 + p4380 + p4381 + p2701 + p4382 + p2700 + p3052 + p4389 + p3059 + p2699 + p2698 + p2697 + p2696 + p2695 + p4396 + p2688 + p3066 + p2681 + p2674 + p3999 + p3073 + p3074 + p3075 + p3076 + p3077 + p3078 + p3079 + p3080 + p2667 + p3998 + p3997 + p2660 + p3990 + p2659 + p3087 + p2658 + p2657 + p2656 + p2655 + p2654 + p2653 + p3094 + p3983 + p2646 + p3976 + p4403 + p2639 + p3969 + p2632 + p3962 + p3961 + p3960 + p3101 + p3959 + p3958 + p3957 + p2625 + p3956 + p3955 + p3108 + p2618 + p2617 + p3948 + p2616 + p2615 + p2614 + p3115 + p3116 + p3117 + p3118 + p3119 + p3120 + p3121 + p3122 + p2613 + p2612 + p2611 + p3941 + p2604 + p3934 + p3129 + p3927 + p3920 + p3919 + p3136 + p3918 + p3917 + p3916 + p3915 + p3914 + p3913 + p3906 + p3143 + p3150 + p2597 + p2590 + p2583 + p2576 + p3157 + p3158 + p3159 + p2575 + p3160 + p3161 + p3162 + p2574 + p3163 + p3164 + p2573 + p2572 + p2571 + p2570 + p2569 + p3899 + p3171 + p2562 + p3892 + p3178 + p2555 + p3885 + p2548 + p3878 + p3877 + p3185 + p3876 + p3875 + p3874 + p3873 + p2541 + p3872 + p3192 + p3871 + p2534 + p2533 + p3864 + p2532 + p2531 + p3199 + p2530 + p2529 + p2528 + p2527 + p3857 + p2520 + p3850 + p2513 + p3843 + p3200 + p3201 + p3202 + p3203 + p3204 + p3205 + p3206 + p2506 + p3836 + p3835 + p3834 + p3833 + p3832 + p3831 + p3830 + p3213 + p3829 + p3822 + p3815 + p3808 + p3801 + p3220 + p3227 + p2499 + p2492 + p3234 + p2491 + p2490 + p2489 + p2488 + p2487 + p2486 + p2485 + p2478 + p3241 + p3242 + p3243 + p3244 + p3245 + p3246 + p3247 + p3248 + p2471 + p2464 + p3794 + p3793 + p3792 + p3255 + p3791 + p3790 + p3789 + p2457 + p3788 + p3787 + p2450 + p3780 + p2449 + p3262 + p2448 + p2447 + p2446 + p2445 + p2444 + p2443 + p3773 + p3269 + p2436 + p3766 + p3276 + p2429 + p3759 + p2422 + p3752 + p3751 + p3283 + p3284 + p3285 + p3286 + p3287 + p3288 + p3289 + p3290 + p3750 + p3749 + p3748 + p3747 + p2415 + p3746 + p3297 + p3745 + p2408 + p2407 + p3738 + p2406 + p2405 + p2404 + p2403 + p2402 + p2401 + p3731 + p3724 + p3717 + p3710 + p3709 + p3708 + p3707 + p3706 + p3304 + p3705 + p3704 + p3703 + p2394 + p3311 + p2387 + p3318 + p2380 + p2373 + p2366 + p2365 + p3696 + p2364 + p3325 + p3326 + p3327 + p3328 + p3329 + p2363 + p3330 + p3331 + p2362 + p3332 + p2361 + p2360 + p2359 + p3689 + p2352 + p3682 + p3675 + p3339 + p3668 + p3667 + p3666 + p3665 + p3664 + p3663 + p3662 + p3661 + p3654 + p3647 + p3640 + p3633 + p3346 + p3626 + p3625 + p3624 + p3623 + p3622 + p3621 + p3620 + p3619 + p3612 + p3353 + p3605 + p3360 + p3598 + p3591 + p3584 + p3583 + p3582 + p3581 + p3580 + p3579 + p3367 + p3578 + p3368 + p3577 + p3369 + p3570 + p3563 + p3370 + p3371 + p3556 + p3372 + p3549 + p3373 + p3542 + p3374 + p3541 + p3540 + p3539 + p3538 + p3537 + p3536 + p3535 + p3528 + p3521 + p3514 + p3381 + p3507 + p3500 + p3388 + p3499 + p3498 + p3497 + p3496 + p3495 + p3494 + p3395 + p3493 + p3486 + p3479 + p3472 + p3465 + p3458 + p3457 + p3456 + p3455 + p3454 + p3453 + p3452 + p3451 + p3444 + p3437 + p3430 + p3423 + p3416 + p3415 + p3414 + p3413 + p3412 + p3411 + p3410 + p3409 + p3402)
lola: place invariant simplifies atomic proposition
lola: before: (3 <= p1900 + p1901 + p1902 + p1903 + p1899 + p1898 + p1861 + p1860 + p1859 + p1858 + p1857 + p1856 + p1819 + p1818 + p1940 + p1941 + p1942 + p1943 + p1944 + p1945 + p1817 + p1816 + p1815 + p1814 + p1777 + p1776 + p1982 + p1983 + p1984 + p1985 + p1986 + p1987 + p1775 + p1774 + p1773 + p1772 + p1735 + p1734 + p1733 + p1732 + p1731 + p1730 + p1693 + p1692 + p1691 + p1690 + p1689 + p1688 + p1651 + p1650 + p1649 + p1648 + p1647 + p1646 + p97 + p96 + p95 + p94 + p93 + p92 + p1609 + p1608 + p1607 + p1606 + p1605 + p1604 + p55 + p54 + p53 + p52 + p51 + p50 + p979 + p978 + p977 + p976 + p975 + p974 + p13 + p12 + p11 + p10 + p937 + p936 + p935 + p934 + p933 + p932 + p1567 + p1566 + p1565 + p1564 + p1563 + p1562 + p1525 + p1524 + p1523 + p1522 + p1521 + p1520 + p895 + p894 + p893 + p892 + p891 + p890 + p853 + p852 + p851 + p850 + p849 + p848 + p811 + p810 + p809 + p808 + p807 + p806 + p1483 + p1482 + p1481 + p1480 + p1479 + p1478 + p1441 + p1440 + p1439 + p1438 + p1437 + p1436 + p8 + p9 + p769 + p768 + p767 + p766 + p765 + p764 + p727 + p726 + p725 + p724 + p723 + p722 + p1399 + p1398 + p1397 + p1396 + p1395 + p1394 + p1357 + p1356 + p1355 + p1354 + p1353 + p1352 + p1315 + p1314 + p1313 + p1312 + p1311 + p1310 + p685 + p684 + p683 + p682 + p681 + p680 + p643 + p642 + p641 + p640 + p639 + p638 + p601 + p600 + p1273 + p1272 + p1271 + p1270 + p1269 + p1268 + p1231 + p1230 + p1229 + p1228 + p1227 + p1226 + p599 + p598 + p597 + p596 + p559 + p558 + p557 + p556 + p555 + p554 + p517 + p516 + p515 + p514 + p513 + p512 + p1189 + p1188 + p1187 + p1186 + p1185 + p1184 + p1147 + p1146 + p1145 + p1144 + p1143 + p1142 + p1105 + p1104 + p1103 + p1102 + p1101 + p1100 + p475 + p474 + p473 + p472 + p471 + p470 + p433 + p432 + p431 + p430 + p429 + p428 + p1063 + p1062 + p1061 + p1060 + p1059 + p1058 + p1021 + p1020 + p1019 + p1018 + p1017 + p1016 + p391 + p390 + p389 + p388 + p387 + p386 + p349 + p348 + p347 + p2024 + p346 + p2025 + p345 + p2026 + p344 + p307 + p2027 + p306 + p2028 + p2029 + p305 + p304 + p303 + p302 + p265 + p264 + p263 + p262 + p261 + p260 + p223 + p222 + p221 + p220 + p219 + p218 + p181 + p180 + p179 + p178 + p177 + p176 + p134 + p135 + p136 + p137 + p138 + p139 + p159 + p158 + p157 + p156 + p155 + p154 + p153 + p160 + p161 + p162 + p163 + p164 + p165 + p166 + p167 + p168 + p169 + p152 + p151 + p150 + p149 + p148 + p147 + p146 + p145 + p144 + p143 + p142 + p141 + p140 + p133 + p132 + p170 + p171 + p172 + p173 + p174 + p175 + p131 + p130 + p129 + p128 + p127 + p126 + p125 + p124 + p123 + p122 + p121 + p120 + p119 + p118 + p117 + p116 + p182 + p183 + p184 + p185 + p186 + p187 + p188 + p189 + p115 + p114 + p113 + p112 + p111 + p110 + p109 + p108 + p107 + p106 + p105 + p104 + p190 + p191 + p192 + p193 + p194 + p195 + p196 + p197 + p198 + p199 + p103 + p102 + p101 + p100 + p200 + p201 + p202 + p203 + p204 + p205 + p206 + p207 + p208 + p209 + p210 + p211 + p212 + p213 + p214 + p215 + p216 + p217 + p224 + p225 + p226 + p227 + p228 + p229 + p2057 + p2056 + p230 + p231 + p232 + p233 + p234 + p235 + p236 + p237 + p238 + p239 + p2055 + p2054 + p240 + p241 + p242 + p243 + p244 + p245 + p246 + p247 + p248 + p249 + p2053 + p250 + p251 + p252 + p253 + p254 + p255 + p256 + p257 + p258 + p259 + p2052 + p2051 + p2050 + p2049 + p2048 + p266 + p267 + p268 + p269 + p270 + p271 + p272 + p273 + p274 + p275 + p276 + p277 + p278 + p279 + p2047 + p280 + p281 + p282 + p283 + p284 + p285 + p286 + p287 + p288 + p289 + p2046 + p2045 + p2044 + p290 + p291 + p292 + p293 + p294 + p295 + p296 + p297 + p298 + p299 + p2043 + p2042 + p2041 + p2040 + p2039 + p2038 + p2037 + p2036 + p2035 + p2034 + p2033 + p2032 + p300 + p301 + p2031 + p2030 + p308 + p309 + p310 + p311 + p312 + p313 + p314 + p315 + p316 + p317 + p318 + p319 + p320 + p321 + p322 + p323 + p324 + p325 + p326 + p327 + p328 + p329 + p330 + p331 + p332 + p333 + p334 + p335 + p336 + p337 + p338 + p339 + p340 + p341 + p342 + p343 + p2023 + p350 + p351 + p352 + p353 + p354 + p355 + p356 + p357 + p358 + p359 + p2022 + p360 + p361 + p362 + p363 + p364 + p365 + p366 + p367 + p368 + p369 + p2021 + p370 + p371 + p372 + p373 + p374 + p375 + p376 + p377 + p378 + p379 + p2020 + p2019 + p2018 + p2017 + p380 + p381 + p382 + p383 + p384 + p385 + p2016 + p2015 + p2014 + p2013 + p392 + p393 + p394 + p395 + p396 + p397 + p398 + p399 + p2012 + p2011 + p1000 + p1001 + p2010 + p1002 + p1003 + p1004 + p2009 + p1005 + p2008 + p1006 + p1007 + p1008 + p1009 + p1010 + p1011 + p1012 + p2007 + p1013 + p1014 + p1015 + p2006 + p2005 + p2004 + p2003 + p1022 + p1023 + p1024 + p1025 + p1026 + p1027 + p2002 + p1028 + p1029 + p2001 + p1030 + p2000 + 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 + p1056 + p1057 + 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 + p1089 + 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 + 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 + p462 + p463 + p464 + p465 + p466 + p467 + p468 + p469 + p476 + p477 + p478 + p479 + p480 + p481 + p482 + p483 + p484 + p485 + p486 + p487 + p488 + p489 + p490 + p491 + p492 + p493 + p494 + p495 + p496 + p497 + p498 + p499 + p1106 + p1107 + p1108 + p1109 + p1110 + p1111 + p1112 + p1113 + p1114 + p1115 + p1116 + p1117 + p1118 + p1119 + p1120 + p1121 + p1122 + p1123 + p1124 + p1125 + p1126 + p1127 + p1128 + p1129 + p1130 + p1131 + p1132 + p1133 + p1134 + p1135 + p1136 + p1137 + p1138 + p1139 + p1140 + p1141 + p1148 + p1149 + p1150 + p1151 + p1152 + p1153 + p1154 + p1155 + p1156 + p1157 + p1158 + p1159 + p1160 + p1161 + p1162 + p1163 + p1164 + p1165 + p1166 + p1167 + p1168 + p1169 + p1170 + p1171 + p1172 + p1173 + p1174 + p1175 + p1176 + p1177 + p1178 + p1179 + p1180 + p1181 + p1182 + p1183 + p1190 + p1191 + p1192 + p1193 + p1194 + p1195 + p1196 + p1197 + p1198 + p1199 + p500 + p501 + p502 + p503 + p504 + p505 + p506 + p507 + p508 + p509 + p510 + p511 + p518 + p519 + p520 + p521 + p522 + p523 + p524 + p525 + p526 + p527 + p528 + 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 + p560 + p561 + 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 + p594 + p595 + p1200 + p1201 + p1202 + p1203 + p1204 + p1205 + p1206 + p1207 + p1208 + p1209 + p1210 + p1211 + p1212 + p1213 + p1214 + p1215 + p1216 + p1217 + p1218 + p1219 + p1220 + p1221 + p1222 + p1223 + p1224 + p1225 + p1232 + p1233 + p1234 + p1235 + p1236 + p1237 + p1238 + p1239 + p1240 + p1241 + p1242 + p1243 + p1244 + p1245 + p1246 + p1247 + p1248 + p1249 + p1250 + p1251 + p1252 + p1253 + p1254 + p1255 + p1256 + p1257 + p1258 + p1259 + p1260 + p1261 + p1262 + p1263 + p1264 + p1265 + p1266 + p1267 + p1274 + p1275 + p1276 + p1277 + p1278 + p1279 + p1280 + p1281 + p1282 + p1283 + p1284 + p1285 + p1286 + p1287 + p1288 + p1289 + p1290 + p1291 + p1292 + p1293 + p1294 + p1295 + p1296 + p1297 + p1298 + p1299 + 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 + p627 + p628 + p629 + p630 + p631 + p632 + p633 + p634 + p635 + p636 + p637 + p644 + p645 + p646 + p647 + p648 + p649 + p650 + p651 + p652 + p653 + p654 + p655 + p656 + p657 + p658 + p659 + p660 + p661 + p662 + p663 + p664 + p665 + p666 + p667 + p668 + p669 + p670 + p671 + p672 + p673 + p674 + p675 + p676 + p677 + p678 + p679 + p686 + p687 + p688 + p689 + p690 + p691 + p692 + p693 + p694 + p695 + p696 + p697 + p698 + p699 + p1300 + p1301 + p1302 + p1303 + p1304 + p1305 + p1306 + p1307 + p1308 + p1309 + p1316 + p1317 + p1318 + p1319 + p1320 + p1321 + p1322 + p1323 + p1324 + p1325 + p1326 + p1327 + p1328 + p1329 + p1330 + p1331 + p1332 + p1333 + p1334 + p1335 + p1336 + p1337 + p1338 + p1339 + p1340 + p1341 + p1342 + p1343 + p1344 + p1345 + p1346 + p1347 + p1348 + p1349 + p1350 + p1351 + 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 + p1388 + p1389 + p1390 + p1391 + p1392 + p1393 + p700 + p701 + p702 + p703 + p704 + p705 + p706 + p707 + p708 + p709 + p710 + p711 + p712 + p713 + p714 + p715 + p716 + p717 + p718 + p719 + p720 + p721 + 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 + p759 + p760 + p761 + p762 + p763 + p770 + p771 + p772 + p773 + p774 + p775 + p776 + p777 + p778 + p779 + p780 + p781 + p782 + p783 + p784 + p785 + p786 + p787 + p788 + p789 + p7 + p6 + p790 + p791 + p792 + p793 + p794 + p795 + p796 + p797 + p798 + p799 + p5 + p4 + p3 + p1400 + p1401 + p1402 + p1403 + p1404 + p1405 + p2 + p1406 + p1 + p1407 + p0 + p1408 + p1409 + p1410 + p1411 + p1412 + p1413 + p1414 + p1415 + p1416 + p1417 + p1418 + p1419 + p1420 + p1421 + p1422 + p1423 + p1424 + p1425 + p1426 + p1427 + p1428 + p1429 + p1430 + p1431 + p1432 + p1433 + p1434 + p1435 + p1442 + p1443 + p1444 + p1445 + p1446 + p1447 + p1448 + p1449 + p1450 + p1451 + p1452 + p1453 + p1454 + p1455 + p1456 + p1457 + p1458 + p1459 + p1460 + p1461 + p1462 + p1463 + p1464 + p1465 + p1466 + p1467 + p1468 + p1469 + p1470 + p1471 + p1472 + p1473 + p1474 + p1475 + p1476 + p1477 + p1484 + p1485 + p1486 + p1487 + p1488 + p1489 + p1490 + p1491 + p1492 + p1493 + p1494 + p1495 + p1496 + p1497 + p1498 + p1499 + p800 + p801 + p802 + p803 + p804 + p805 + p812 + p813 + p814 + p815 + p816 + p817 + p818 + p819 + p820 + p821 + p822 + p823 + p824 + p825 + p826 + p827 + p828 + p829 + p830 + p831 + p832 + p833 + p834 + p835 + p836 + p837 + p838 + p839 + p840 + p841 + p842 + p843 + p844 + p845 + p846 + p847 + p854 + p855 + p856 + p857 + p858 + 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 + p896 + p897 + p898 + p899 + p1500 + p1501 + p1502 + p1503 + p1504 + p1505 + p1506 + p1507 + p1508 + p1509 + p1510 + p1511 + p1512 + p1513 + p1514 + p1515 + p1516 + p1517 + p1518 + p1519 + 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 + p1556 + p1557 + p1558 + p1559 + p1560 + p1561 + p1568 + p1569 + p1570 + p1571 + p1572 + p1573 + p1574 + p1575 + p1576 + p1577 + p1578 + p1579 + p1580 + p1581 + p1582 + p1583 + p1584 + p1585 + p1586 + p1587 + p1588 + p1589 + p1590 + p1591 + p1592 + p1593 + p1594 + p1595 + p1596 + p1597 + p1598 + p1599 + p900 + p901 + p902 + p903 + p904 + p905 + p906 + p907 + p908 + p909 + p910 + p911 + p912 + p913 + p914 + p915 + p916 + p917 + p918 + p919 + p920 + p921 + p922 + p923 + p924 + p925 + p926 + p927 + p928 + p929 + p930 + p931 + p938 + p939 + p940 + p941 + p942 + p943 + p944 + p945 + p946 + p947 + p948 + p949 + p950 + p951 + p952 + p953 + p954 + p955 + p956 + p957 + p958 + p959 + p14 + p15 + p16 + p17 + p18 + p19 + p960 + p961 + p962 + p963 + p964 + p965 + p966 + p967 + p968 + p969 + p20 + p21 + p22 + p23 + p24 + p25 + p26 + p27 + p28 + p29 + p970 + p971 + p972 + p973 + p30 + p31 + p32 + p33 + p34 + p35 + p36 + p37 + p38 + p39 + p980 + p981 + p982 + p983 + p984 + p985 + p986 + p987 + p988 + p989 + p40 + p41 + p42 + p43 + p44 + p45 + p46 + p47 + p48 + p49 + p990 + p991 + p992 + p993 + p994 + p995 + p996 + p997 + p998 + p999 + p56 + p57 + p58 + p59 + p60 + p61 + p62 + p63 + p64 + p65 + p66 + p67 + p68 + p69 + p70 + p71 + p72 + p73 + p74 + p75 + p76 + p77 + p78 + p79 + p1600 + p1601 + p1602 + p1603 + p80 + p81 + p82 + p83 + p84 + p85 + p86 + p87 + p88 + p89 + p1610 + p1611 + p1612 + p1613 + p1614 + p1615 + p1616 + p1617 + p1618 + p1619 + p90 + p91 + p98 + p99 + p1620 + p1621 + p1622 + p1623 + p1624 + p1625 + p1626 + p1627 + p1628 + p1629 + p1630 + p1631 + p1632 + p1633 + p1634 + p1635 + p1636 + p1637 + p1638 + p1639 + p1640 + p1641 + p1642 + p1643 + p1644 + p1645 + p1652 + p1653 + p1654 + p1655 + 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 + p1999 + p1998 + 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 + p1721 + p1722 + p1723 + p1724 + p1725 + p1726 + p1727 + p1728 + p1729 + p1997 + p1996 + p1995 + p1994 + p1993 + p1992 + p1736 + p1737 + p1738 + p1739 + p1740 + p1741 + p1742 + p1743 + p1744 + p1745 + p1746 + p1747 + p1748 + p1749 + p1750 + p1751 + p1752 + p1753 + p1754 + p1755 + p1756 + p1757 + p1758 + p1759 + p1760 + p1761 + p1762 + p1763 + p1764 + p1765 + p1766 + p1767 + p1768 + p1769 + p1770 + p1771 + p1991 + p1990 + p1989 + p1988 + p1981 + p1980 + p1778 + p1779 + p1780 + p1781 + p1782 + p1783 + p1784 + p1785 + p1786 + p1787 + p1788 + p1789 + p1790 + p1791 + p1792 + p1793 + p1794 + p1795 + p1796 + p1797 + p1798 + p1799 + 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 + p1952 + p1951 + p1950 + p1800 + p1801 + p1802 + p1803 + p1804 + p1805 + p1806 + p1807 + p1808 + p1809 + p1810 + p1811 + p1812 + p1813 + p1949 + p1948 + p1947 + p1946 + p1939 + p1938 + p1820 + 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 + p1853 + p1854 + p1855 + p1937 + p1936 + p1935 + p1934 + p1933 + p1932 + 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 + p1931 + p1930 + p1929 + p1928 + p1927 + p1926 + p1925 + p1924 + p1923 + p1922 + p1921 + p1920 + p1919 + p1918 + p1917 + p1916 + p1915 + p1914 + p1913 + p1912 + p1911 + p1910 + p1909 + p1908 + p1907 + p1906 + p1905 + p1904)
lola: after: (3 <= p1900 + p1901 + p1902 + p1903 + p1899 + p1898 + p1861 + p1860 + p1859 + p1858 + p1857 + p1856 + p1819 + p1818 + p1940 + p1941 + p1942 + p1943 + p1944 + p1945 + p1817 + p1816 + p1815 + p1814 + p1777 + p1776 + p1982 + p1983 + p1984 + p1985 + p1986 + p1987 + p1775 + p1774 + p1773 + p1772 + p1735 + p1734 + p1733 + p1732 + p1731 + p1730 + p1693 + p1692 + p1691 + p1690 + p1689 + p1688 + p1651 + p1650 + p1649 + p1648 + p1647 + p1646 + p97 + p96 + p95 + p94 + p93 + p92 + p1609 + p1608 + p1607 + p1606 + p1605 + p1604 + p55 + p54 + p53 + p52 + p51 + p50 + p979 + p978 + p977 + p976 + p975 + p974 + p13 + p12 + p11 + p10 + p937 + p936 + p935 + p934 + p933 + p932 + p1567 + p1566 + p1565 + p1564 + p1563 + p1562 + p1525 + p1524 + p1523 + p1522 + p1521 + p1520 + p895 + p894 + p893 + p892 + p891 + p890 + p853 + p852 + p851 + p850 + p849 + p848 + p811 + p810 + p809 + p808 + p807 + p806 + p1483 + p1482 + p1481 + p1480 + p1479 + p1478 + p1441 + p1440 + p1439 + p1438 + p1437 + p1436 + p8 + p9 + p769 + p768 + p767 + p766 + p765 + p764 + p727 + p726 + p725 + p724 + p723 + p722 + p1399 + p1398 + p1397 + p1396 + p1395 + p1394 + p1357 + p1356 + p1355 + p1354 + p1353 + p1352 + p1315 + p1314 + p1313 + p1312 + p1311 + p1310 + p685 + p684 + p683 + p682 + p681 + p680 + p643 + p642 + p641 + p640 + p639 + p638 + p601 + p600 + p1273 + p1272 + p1271 + p1270 + p1269 + p1268 + p1231 + p1230 + p1229 + p1228 + p1227 + p1226 + p599 + p598 + p597 + p596 + p559 + p558 + p557 + p556 + p555 + p554 + p517 + p516 + p515 + p514 + p513 + p512 + p1189 + p1188 + p1187 + p1186 + p1185 + p1184 + p1147 + p1146 + p1145 + p1144 + p1143 + p1142 + p1105 + p1104 + p1103 + p1102 + p1101 + p1100 + p475 + p474 + p473 + p472 + p471 + p470 + p433 + p432 + p431 + p430 + p429 + p428 + p1063 + p1062 + p1061 + p1060 + p1059 + p1058 + p1021 + p1020 + p1019 + p1018 + p1017 + p1016 + p391 + p390 + p389 + p388 + p387 + p386 + p349 + p348 + p347 + p2024 + p346 + p2025 + p345 + p2026 + p344 + p307 + p2027 + p306 + p2028 + p2029 + p305 + p304 + p303 + p302 + p265 + p264 + p263 + p262 + p261 + p260 + p223 + p222 + p221 + p220 + p219 + p218 + p181 + p180 + p179 + p178 + p177 + p176 + p134 + p135 + p136 + p137 + p138 + p139)
lola: LP says that atomic proposition is always false: (3 <= p1900 + p1901 + p1902 + p1903 + p1899 + p1898 + p1861 + p1860 + p1859 + p1858 + p1857 + p1856 + p1819 + p1818 + p1940 + p1941 + p1942 + p1943 + p1944 + p1945 + p1817 + p1816 + p1815 + p1814 + p1777 + p1776 + p1982 + p1983 + p1984 + p1985 + p1986 + p1987 + p1775 + p1774 + p1773 + p1772 + p1735 + p1734 + p1733 + p1732 + p1731 + p1730 + p1693 + p1692 + p1691 + p1690 + p1689 + p1688 + p1651 + p1650 + p1649 + p1648 + p1647 + p1646 + p97 + p96 + p95 + p94 + p93 + p92 + p1609 + p1608 + p1607 + p1606 + p1605 + p1604 + p55 + p54 + p53 + p52 + p51 + p50 + p979 + p978 + p977 + p976 + p975 + p974 + p13 + p12 + p11 + p10 + p937 + p936 + p935 + p934 + p933 + p932 + p1567 + p1566 + p1565 + p1564 + p1563 + p1562 + p1525 + p1524 + p1523 + p1522 + p1521 + p1520 + p895 + p894 + p893 + p892 + p891 + p890 + p853 + p852 + p851 + p850 + p849 + p848 + p811 + p810 + p809 + p808 + p807 + p806 + p1483 + p1482 + p1481 + p1480 + p1479 + p1478 + p1441 + p1440 + p1439 + p1438 + p1437 + p1436 + p8 + p9 + p769 + p768 + p767 + p766 + p765 + p764 + p727 + p726 + p725 + p724 + p723 + p722 + p1399 + p1398 + p1397 + p1396 + p1395 + p1394 + p1357 + p1356 + p1355 + p1354 + p1353 + p1352 + p1315 + p1314 + p1313 + p1312 + p1311 + p1310 + p685 + p684 + p683 + p682 + p681 + p680 + p643 + p642 + p641 + p640 + p639 + p638 + p601 + p600 + p1273 + p1272 + p1271 + p1270 + p1269 + p1268 + p1231 + p1230 + p1229 + p1228 + p1227 + p1226 + p599 + p598 + p597 + p596 + p559 + p558 + p557 + p556 + p555 + p554 + p517 + p516 + p515 + p514 + p513 + p512 + p1189 + p1188 + p1187 + p1186 + p1185 + p1184 + p1147 + p1146 + p1145 + p1144 + p1143 + p1142 + p1105 + p1104 + p1103 + p1102 + p1101 + p1100 + p475 + p474 + p473 + p472 + p471 + p470 + p433 + p432 + p431 + p430 + p429 + p428 + p1063 + p1062 + p1061 + p1060 + p1059 + p1058 + p1021 + p1020 + p1019 + p1018 + p1017 + p1016 + p391 + p390 + p389 + p388 + p387 + p386 + p349 + p348 + p347 + p2024 + p346 + p2025 + p345 + p2026 + p344 + p307 + p2027 + p306 + p2028 + p2029 + p305 + p304 + p303 + p302 + p265 + p264 + p263 + p262 + p261 + p260 + p223 + p222 + p221 + p220 + p219 + p218 + p181 + p180 + p179 + p178 + p177 + p176 + p134 + p135 + p136 + p137 + p138 + p139)
lola: place invariant simplifies atomic proposition
lola: before: (p4640 + p4639 + p4638 + p4637 + p4636 + p4635 + p4634 <= p4410 + p4411 + p4412 + p4413 + p4414 + p4415 + p4416)
lola: after: (0 <= p4410 + p4411 + p4412 + p4413 + p4414 + p4415 + p4416)
lola: always true
lola: LP says that atomic proposition is always false: (1 <= p4417 + p4418 + p4419 + p4420 + p4421 + p4422 + p4423 + p4424 + p4425 + p4426 + p4427 + p4428 + p4429 + p4430 + p4431 + p4432 + p4433 + p4434 + p4435 + p4436 + p4437 + p4438 + p4439 + p4440 + p4441 + p4442 + p4443 + p4444 + p4445 + p4446 + p4447 + p4448 + p4449 + p4450 + p4451 + p4452 + p4453 + p4454 + p4455 + p4456 + p4457 + p4458)
lola: place invariant simplifies atomic proposition
lola: before: (p4606 + p4607 + p4608 + p4609 + p4610 + p4611 + p4612 <= p4193 + p4186 + p4179 + p4172 + p4171 + p4170 + p4169 + p4168 + p4167 + p4166 + p4165 + p4158 + p4151 + p4144 + p4137 + p4130 + p4129 + p4128 + p4127 + p4126 + p4125 + p4124 + p4123 + p4116 + p4109 + p4102 + p4095 + p4088 + p4087 + p4086 + p4085 + p4084 + p4083 + p4082 + p4081 + p4074 + p4067 + p4060 + p4053 + p4046 + p4045 + p4044 + p4043 + p4042 + p4041 + p4040 + p4039 + p4032 + p4025 + p4018 + p4011 + p4004 + p4003 + p4002 + p4001 + p4000 + p4200 + p2996 + p2995 + p4207 + p4208 + p4209 + p4210 + p4211 + p4212 + p4213 + p4214 + p2994 + p2993 + p2992 + p2991 + p2990 + p2989 + p4221 + p2982 + p4228 + p2975 + p2968 + p2961 + p2954 + p2953 + p4235 + p2952 + p2951 + p2950 + p4242 + p2949 + p2948 + p2947 + p4249 + p4250 + p4251 + p4252 + p4253 + p4254 + p4255 + p4256 + p2940 + p4263 + p2933 + p2926 + p2919 + p2912 + p2911 + p4270 + p2910 + p4277 + p2909 + p2908 + p2907 + p2906 + p2905 + p4284 + p4291 + p4292 + p4293 + p4294 + p4295 + p4296 + p4297 + p4298 + p4305 + p2898 + p4312 + p2891 + p4319 + p2884 + p2877 + p2870 + p2869 + p2868 + p2867 + p4326 + p2866 + p2865 + p2864 + p2863 + p2856 + p4333 + p4334 + p3003 + p4335 + p4336 + p4337 + p2849 + p4338 + p2842 + p4339 + p2835 + p2828 + p4340 + p2827 + p3010 + p2826 + p2825 + p2824 + p2823 + p2822 + p2821 + p2814 + p4347 + p3017 + p2807 + p2800 + p4354 + p3024 + p2793 + p4361 + p2786 + p2785 + p3031 + p2784 + p3032 + p2783 + p3033 + p2782 + p3034 + p2781 + p3035 + p2780 + p3036 + p4368 + p3037 + p2779 + p3038 + p2772 + p2765 + p2758 + p2751 + p4375 + p2744 + p4376 + p3045 + p4377 + p2743 + p4378 + p2742 + p4379 + p2741 + p2740 + p2739 + p2738 + p2737 + p2730 + p2723 + p2716 + p2709 + p2702 + p4380 + p4381 + p2701 + p4382 + p2700 + p3052 + p4389 + p3059 + p2699 + p2698 + p2697 + p2696 + p2695 + p4396 + p2688 + p3066 + p2681 + p2674 + p3999 + p3073 + p3074 + p3075 + p3076 + p3077 + p3078 + p3079 + p3080 + p2667 + p3998 + p3997 + p2660 + p3990 + p2659 + 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lola: after: (p4606 + p4607 + p4608 + p4609 + p4610 + p4611 + p4612 <= p4193 + p4186 + p4179 + p4172 + p4171 + p4170 + p4169 + p4168 + p4167 + p4166 + p4165 + p4158 + p4151 + p4144 + p4137 + p4130 + p4129 + p4128 + p4127 + p4126 + p4125 + p4124 + p4123 + p4116 + p4109 + p4102 + p4095 + p4088 + p4087 + p4086 + p4085 + p4084 + p4083 + p4082 + p4081 + p4074 + p4067 + p4060 + p4053 + p4046 + p4045 + p4044 + p4043 + p4042 + p4041 + p4040 + p4039 + p4032 + p4025 + p4018 + p4011 + p4004 + p4003 + p4002 + p4001 + p4000 + p4200 + p2996 + p2995 + p4207 + p4208 + p4209 + p4210 + p4211 + p4212 + p4213 + p4214 + p2994 + p2993 + p2992 + p2991 + p2990 + p2989 + p4221 + p2982 + p4228 + p2975 + p2968 + p2961 + p2954 + p2953 + p4235 + p2952 + p2951 + p2950 + p4242 + p2949 + p2948 + p2947 + p4249 + p4250 + p4251 + p4252 + p4253 + p4254 + p4255 + p4256 + p2940 + p4263 + p2933 + p2926 + p2919 + p2912 + p2911 + p4270 + p2910 + p4277 + p2909 + p2908 + p2907 + p2906 + p2905 + p4284 + p4291 + p4292 + p4293 + p4294 + p4295 + p4296 + p4297 + p4298 + p4305 + p2898 + p4312 + p2891 + p4319 + p2884 + p2877 + p2870 + p2869 + p2868 + p2867 + p4326 + p2866 + p2865 + p2864 + p2863 + p2856 + p4333 + p4334 + p3003 + p4335 + p4336 + p4337 + p2849 + p4338 + p2842 + p4339 + p2835 + p2828 + p4340 + p2827 + p3010 + p2826 + p2825 + p2824 + p2823 + p2822 + p2821 + p2814 + p4347 + p3017 + p2807 + p2800 + p4354 + p3024 + p2793 + p4361 + p2786 + p2785 + p3031 + p2784 + p3032 + p2783 + p3033 + p2782 + p3034 + p2781 + p3035 + p2780 + p3036 + p4368 + p3037 + p2779 + p3038 + p2772 + p2765 + p2758 + p2751 + p4375 + p2744 + p4376 + p3045 + p4377 + p2743 + p4378 + p2742 + p4379 + p2741 + p2740 + p2739 + p2738 + p2737 + p2730 + p2723 + p2716 + p2709 + p2702 + p4380 + p4381 + p2701 + p4382 + p2700 + p3052 + p4389 + p3059 + p2699 + p2698 + p2697 + p2696 + p2695 + p4396 + p2688 + p3066 + p2681 + p2674 + p3999 + p3073 + p3074 + p3075 + p3076 + p3077 + p3078 + p3079 + p3080 + p2667 + p3998 + p3997 + p2660 + p3990 + p2659 + p3087 + p2658 + p2657 + p2656 + p2655 + p2654 + p2653 + p3094 + p3983 + p2646 + p3976 + p4403 + p2639 + p3969 + p2632 + p3962 + p3961 + p3960 + p3101 + p3959 + p3958 + p3957 + p2625 + p3956 + p3955 + p3108 + p2618 + p2617 + p3948 + p2616 + p2615 + p2614 + p3115 + p3116 + p3117 + p3118 + p3119 + p3120 + p3121 + p3122 + p2613 + p2612 + p2611 + p3941 + p2604 + p3934 + p3129 + p3927 + p3920 + p3919 + p3136 + p3918 + p3917 + p3916 + p3915 + p3914 + p3913 + p3906 + p3143 + p3150 + p2597 + p2590 + p2583 + p2576 + p3157 + p3158 + p3159 + p2575 + p3160 + p3161 + p3162 + p2574 + p3163 + p3164 + p2573 + p2572 + p2571 + p2570 + p2569 + p3899 + p3171 + p2562 + p3892 + p3178 + p2555 + p3885 + p2548 + p3878 + p3877 + p3185 + p3876 + p3875 + p3874 + p3873 + p2541 + p3872 + p3192 + p3871 + p2534 + p2533 + p3864 + p2532 + p2531 + p3199 + p2530 + p2529 + p2528 + p2527 + p3857 + p2520 + p3850 + p2513 + p3843 + p3200 + p3201 + p3202 + p3203 + p3204 + p3205 + p3206 + p2506 + p3836 + p3835 + p3834 + p3833 + p3832 + p3831 + p3830 + p3213 + p3829 + p3822 + p3815 + p3808 + p3801 + p3220 + p3227 + p2499 + p2492 + p3234 + p2491 + p2490 + p2489 + p2488 + p2487 + p2486 + p2485 + p2478 + p3241 + p3242 + p3243 + p3244 + p3245 + p3246 + p3247 + p3248 + p2471 + p2464 + p3794 + p3793 + p3792 + p3255 + p3791 + p3790 + p3789 + p2457 + p3788 + p3787 + p2450 + p3780 + p2449 + p3262 + p2448 + p2447 + p2446 + p2445 + p2444 + p2443 + p3773 + p3269 + p2436 + p3766 + p3276 + p2429 + p3759 + p2422 + p3752 + p3751 + p3283 + p3284 + p3285 + p3286 + p3287 + p3288 + p3289 + p3290 + p3750 + p3749 + p3748 + p3747 + p2415 + p3746 + p3297 + p3745 + p2408 + p2407 + p3738 + p2406 + p2405 + p2404 + p2403 + p2402 + p2401 + p3731 + p3724 + p3717 + p3710 + p3709 + p3708 + p3707 + p3706 + p3304 + p3705 + p3704 + p3703 + p2394 + p3311 + p2387 + p3318 + p2380 + p2373 + p2366 + p2365 + p3696 + p2364 + p3325 + p3326 + p3327 + p3328 + p3329 + p2363 + p3330 + p3331 + p2362 + p3332 + p2361 + p2360 + p2359 + p3689 + p2352 + p3682 + p3675 + p3339 + p3668 + p3667 + p3666 + p3665 + p3664 + p3663 + p3662 + p3661 + p3654 + p3647 + p3640 + p3633 + p3346 + p3626 + p3625 + p3624 + p3623 + p3622 + p3621 + p3620 + p3619 + p3612 + p3353 + p3605 + p3360 + p3598 + p3591 + p3584 + p3583 + p3582 + p3581 + p3580 + p3579 + p3367 + p3578 + p3368 + p3577 + p3369 + p3570 + p3563 + p3370 + p3371 + p3556 + p3372 + p3549 + p3373 + p3542 + p3374 + p3541 + p3540 + p3539 + p3538 + p3537 + p3536 + p3535 + p3528 + p3521 + p3514 + p3381 + p3507 + p3500 + p3388 + p3499 + p3498 + p3497 + p3496 + p3495 + p3494 + p3395 + p3493 + p3486 + p3479 + p3472 + p3465 + p3458 + p3457 + p3456 + p3455 + p3454 + p3453 + p3452 + p3451 + p3444 + p3437 + p3430 + p3423 + p3416 + p3415 + p3414 + p3413 + p3412 + p3411 + p3410 + p3409 + p3402)
lola: place invariant simplifies atomic proposition
lola: before: (3 <= p4828 + p4825 + p4822 + p4819 + p4816 + p4813 + p4810 + p4809 + p4811 + p4812 + p4814 + p4815 + p4817 + p4818 + p4820 + p4821 + p4823 + p4824 + p4826 + p4827 + p4829)
lola: after: (0 <= 3)
lola: always true
lola: place invariant simplifies atomic proposition
lola: before: (2 <= p1900 + p1901 + p1902 + p1903 + p1899 + p1898 + p1861 + p1860 + p1859 + p1858 + p1857 + p1856 + p1819 + p1818 + p1940 + p1941 + p1942 + p1943 + p1944 + p1945 + p1817 + p1816 + p1815 + p1814 + p1777 + p1776 + p1982 + p1983 + p1984 + p1985 + p1986 + p1987 + p1775 + p1774 + p1773 + p1772 + p1735 + p1734 + p1733 + p1732 + p1731 + p1730 + p1693 + p1692 + p1691 + p1690 + p1689 + p1688 + p1651 + p1650 + p1649 + p1648 + p1647 + p1646 + p97 + p96 + p95 + p94 + p93 + p92 + p1609 + p1608 + p1607 + p1606 + p1605 + p1604 + p55 + p54 + p53 + p52 + p51 + p50 + p979 + p978 + p977 + p976 + p975 + p974 + p13 + p12 + p11 + p10 + p937 + p936 + p935 + p934 + p933 + p932 + p1567 + p1566 + p1565 + p1564 + p1563 + p1562 + p1525 + p1524 + p1523 + p1522 + p1521 + p1520 + p895 + p894 + p893 + p892 + p891 + p890 + p853 + p852 + p851 + p850 + p849 + p848 + p811 + p810 + p809 + p808 + p807 + p806 + p1483 + p1482 + p1481 + p1480 + p1479 + p1478 + p1441 + p1440 + p1439 + p1438 + p1437 + p1436 + p8 + p9 + p769 + p768 + p767 + p766 + p765 + p764 + p727 + p726 + p725 + p724 + p723 + p722 + p1399 + p1398 + p1397 + p1396 + p1395 + p1394 + p1357 + p1356 + p1355 + p1354 + p1353 + p1352 + p1315 + p1314 + p1313 + p1312 + p1311 + p1310 + p685 + p684 + p683 + p682 + p681 + p680 + p643 + p642 + p641 + p640 + p639 + p638 + p601 + p600 + p1273 + p1272 + p1271 + p1270 + p1269 + p1268 + p1231 + p1230 + p1229 + p1228 + p1227 + p1226 + p599 + p598 + p597 + p596 + p559 + p558 + p557 + p556 + p555 + p554 + p517 + p516 + p515 + p514 + p513 + p512 + p1189 + p1188 + p1187 + p1186 + p1185 + p1184 + p1147 + p1146 + p1145 + p1144 + p1143 + p1142 + p1105 + p1104 + p1103 + p1102 + p1101 + p1100 + p475 + p474 + p473 + p472 + p471 + p470 + p433 + p432 + p431 + p430 + p429 + p428 + p1063 + p1062 + p1061 + p1060 + p1059 + p1058 + p1021 + p1020 + p1019 + p1018 + p1017 + p1016 + p391 + p390 + p389 + p388 + p387 + p386 + p349 + p348 + p347 + p2024 + p346 + p2025 + p345 + p2026 + p344 + p307 + p2027 + p306 + p2028 + p2029 + p305 + p304 + p303 + p302 + p265 + p264 + p263 + p262 + p261 + p260 + p223 + p222 + p221 + p220 + p219 + p218 + p181 + p180 + p179 + p178 + p177 + p176 + p134 + p135 + p136 + p137 + p138 + p139 + p159 + p158 + p157 + p156 + p155 + p154 + p153 + p160 + p161 + p162 + p163 + p164 + p165 + p166 + p167 + p168 + p169 + p152 + p151 + p150 + p149 + p148 + p147 + p146 + p145 + p144 + p143 + p142 + p141 + p140 + p133 + p132 + p170 + p171 + p172 + p173 + p174 + p175 + p131 + p130 + p129 + p128 + p127 + p126 + p125 + p124 + p123 + p122 + p121 + p120 + p119 + p118 + p117 + p116 + p182 + p183 + p184 + p185 + p186 + p187 + p188 + p189 + p115 + p114 + p113 + p112 + p111 + p110 + p109 + p108 + p107 + p106 + p105 + p104 + p190 + p191 + p192 + p193 + p194 + p195 + p196 + p197 + p198 + p199 + p103 + p102 + p101 + p100 + p200 + p201 + p202 + p203 + p204 + p205 + p206 + p207 + p208 + p209 + p210 + p211 + p212 + p213 + p214 + p215 + p216 + p217 + p224 + p225 + p226 + p227 + p228 + p229 + p2057 + p2056 + p230 + p231 + p232 + p233 + p234 + p235 + p236 + p237 + p238 + p239 + p2055 + p2054 + p240 + p241 + p242 + p243 + p244 + p245 + p246 + p247 + p248 + p249 + p2053 + p250 + p251 + p252 + p253 + p254 + p255 + p256 + p257 + p258 + p259 + p2052 + p2051 + p2050 + p2049 + p2048 + p266 + p267 + p268 + p269 + p270 + p271 + p272 + p273 + p274 + p275 + p276 + p277 + p278 + p279 + p2047 + p280 + p281 + p282 + p283 + p284 + p285 + p286 + p287 + p288 + p289 + p2046 + p2045 + p2044 + p290 + p291 + p292 + p293 + p294 + p295 + p296 + p297 + p298 + p299 + p2043 + p2042 + p2041 + p2040 + p2039 + p2038 + p2037 + p2036 + p2035 + p2034 + p2033 + p2032 + p300 + p301 + p2031 + p2030 + p308 + p309 + p310 + p311 + p312 + p313 + p314 + p315 + p316 + p317 + p318 + p319 + p320 + p321 + p322 + p323 + p324 + p325 + p326 + p327 + p328 + p329 + p330 + p331 + p332 + p333 + p334 + p335 + p336 + p337 + p338 + p339 + p340 + p341 + p342 + p343 + p2023 + p350 + p351 + p352 + p353 + p354 + p355 + p356 + p357 + p358 + p359 + p2022 + p360 + p361 + p362 + p363 + p364 + p365 + p366 + p367 + p368 + p369 + p2021 + p370 + p371 + p372 + p373 + p374 + p375 + p376 + p377 + p378 + p379 + p2020 + p2019 + p2018 + p2017 + p380 + p381 + p382 + p383 + p384 + p385 + p2016 + p2015 + p2014 + p2013 + p392 + p393 + p394 + p395 + p396 + p397 + p398 + p399 + p2012 + p2011 + p1000 + p1001 + p2010 + p1002 + p1003 + p1004 + p2009 + p1005 + p2008 + p1006 + p1007 + p1008 + p1009 + p1010 + p1011 + p1012 + p2007 + p1013 + p1014 + p1015 + p2006 + p2005 + p2004 + p2003 + p1022 + p1023 + p1024 + p1025 + p1026 + p1027 + p2002 + p1028 + p1029 + p2001 + p1030 + p2000 + 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 + p1056 + p1057 + 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 + p1089 + 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 + 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 + p462 + p463 + p464 + p465 + p466 + p467 + p468 + p469 + p476 + p477 + p478 + p479 + p480 + p481 + p482 + p483 + p484 + p485 + p486 + p487 + p488 + p489 + p490 + p491 + p492 + p493 + p494 + p495 + p496 + p497 + p498 + p499 + p1106 + p1107 + p1108 + p1109 + p1110 + p1111 + p1112 + p1113 + p1114 + p1115 + p1116 + p1117 + p1118 + p1119 + p1120 + p1121 + p1122 + p1123 + p1124 + p1125 + p1126 + p1127 + p1128 + p1129 + p1130 + p1131 + p1132 + p1133 + p1134 + p1135 + p1136 + p1137 + p1138 + p1139 + p1140 + p1141 + p1148 + p1149 + p1150 + p1151 + p1152 + p1153 + p1154 + p1155 + p1156 + p1157 + p1158 + p1159 + p1160 + p1161 + p1162 + p1163 + p1164 + p1165 + p1166 + p1167 + p1168 + p1169 + p1170 + p1171 + p1172 + p1173 + p1174 + p1175 + p1176 + p1177 + p1178 + p1179 + p1180 + p1181 + p1182 + p1183 + p1190 + p1191 + p1192 + p1193 + p1194 + p1195 + p1196 + p1197 + p1198 + p1199 + p500 + p501 + p502 + p503 + p504 + p505 + p506 + p507 + p508 + p509 + p510 + p511 + p518 + p519 + p520 + p521 + p522 + p523 + p524 + p525 + p526 + p527 + p528 + 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 + p560 + p561 + 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 + p594 + p595 + p1200 + p1201 + p1202 + p1203 + p1204 + p1205 + p1206 + p1207 + p1208 + p1209 + p1210 + p1211 + p1212 + p1213 + p1214 + p1215 + p1216 + p1217 + p1218 + p1219 + p1220 + p1221 + p1222 + p1223 + p1224 + p1225 + p1232 + p1233 + p1234 + p1235 + p1236 + p1237 + p1238 + p1239 + p1240 + p1241 + p1242 + p1243 + p1244 + p1245 + p1246 + p1247 + p1248 + p1249 + p1250 + p1251 + p1252 + p1253 + p1254 + p1255 + p1256 + p1257 + p1258 + p1259 + p1260 + p1261 + p1262 + p1263 + p1264 + p1265 + p1266 + p1267 + p1274 + p1275 + p1276 + p1277 + p1278 + p1279 + p1280 + p1281 + p1282 + p1283 + p1284 + p1285 + p1286 + p1287 + p1288 + p1289 + p1290 + p1291 + p1292 + p1293 + p1294 + p1295 + p1296 + p1297 + p1298 + p1299 + 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 + p627 + p628 + p629 + p630 + p631 + p632 + p633 + p634 + p635 + p636 + p637 + p644 + p645 + p646 + p647 + p648 + p649 + p650 + p651 + p652 + p653 + p654 + p655 + p656 + p657 + p658 + p659 + p660 + p661 + p662 + p663 + p664 + p665 + p666 + p667 + p668 + p669 + p670 + p671 + p672 + p673 + p674 + p675 + p676 + p677 + p678 + p679 + p686 + p687 + p688 + p689 + p690 + p691 + p692 + p693 + p694 + p695 + p696 + p697 + p698 + p699 + p1300 + p1301 + p1302 + p1303 + p1304 + p1305 + p1306 + p1307 + p1308 + p1309 + p1316 + p1317 + p1318 + p1319 + p1320 + p1321 + p1322 + p1323 + p1324 + p1325 + p1326 + p1327 + p1328 + p1329 + p1330 + p1331 + p1332 + p1333 + p1334 + p1335 + p1336 + p1337 + p1338 + p1339 + p1340 + p1341 + p1342 + p1343 + p1344 + p1345 + p1346 + p1347 + p1348 + p1349 + p1350 + p1351 + 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 + p1388 + p1389 + p1390 + p1391 + p1392 + p1393 + p700 + p701 + p702 + p703 + p704 + p705 + p706 + p707 + p708 + p709 + p710 + p711 + p712 + p713 + p714 + p715 + p716 + p717 + p718 + p719 + p720 + p721 + 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 + p759 + p760 + p761 + p762 + p763 + p770 + p771 + p772 + p773 + p774 + p775 + p776 + p777 + p778 + p779 + p780 + p781 + p782 + p783 + p784 + p785 + p786 + p787 + p788 + p789 + p7 + p6 + p790 + p791 + p792 + p793 + p794 + p795 + p796 + p797 + p798 + p799 + p5 + p4 + p3 + p1400 + p1401 + p1402 + p1403 + p1404 + p1405 + p2 + p1406 + p1 + p1407 + p0 + p1408 + p1409 + p1410 + p1411 + p1412 + p1413 + p1414 + p1415 + p1416 + p1417 + p1418 + p1419 + p1420 + p1421 + p1422 + p1423 + p1424 + p1425 + p1426 + p1427 + p1428 + p1429 + p1430 + p1431 + p1432 + p1433 + p1434 + p1435 + p1442 + p1443 + p1444 + p1445 + p1446 + p1447 + p1448 + p1449 + p1450 + p1451 + p1452 + p1453 + p1454 + p1455 + p1456 + p1457 + p1458 + p1459 + p1460 + p1461 + p1462 + p1463 + p1464 + p1465 + p1466 + p1467 + p1468 + p1469 + p1470 + p1471 + p1472 + p1473 + p1474 + p1475 + p1476 + p1477 + p1484 + p1485 + p1486 + p1487 + p1488 + p1489 + p1490 + p1491 + p1492 + p1493 + p1494 + p1495 + p1496 + p1497 + p1498 + p1499 + p800 + p801 + p802 + p803 + p804 + p805 + p812 + p813 + p814 + p815 + p816 + p817 + p818 + p819 + p820 + p821 + p822 + p823 + p824 + p825 + p826 + p827 + p828 + p829 + p830 + p831 + p832 + p833 + p834 + p835 + p836 + p837 + p838 + p839 + p840 + p841 + p842 + p843 + p844 + p845 + p846 + p847 + p854 + p855 + p856 + p857 + p858 + 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 + p896 + p897 + p898 + p899 + p1500 + p1501 + p1502 + p1503 + p1504 + p1505 + p1506 + p1507 + p1508 + p1509 + p1510 + p1511 + p1512 + p1513 + p1514 + p1515 + p1516 + p1517 + p1518 + p1519 + 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 + p1556 + p1557 + p1558 + p1559 + p1560 + p1561 + p1568 + p1569 + p1570 + p1571 + p1572 + p1573 + p1574 + p1575 + p1576 + p1577 + p1578 + p1579 + p1580 + p1581 + p1582 + p1583 + p1584 + p1585 + p1586 + p1587 + p1588 + p1589 + p1590 + p1591 + p1592 + p1593 + p1594 + p1595 + p1596 + p1597 + p1598 + p1599 + p900 + p901 + p902 + p903 + p904 + p905 + p906 + p907 + p908 + p909 + p910 + p911 + p912 + p913 + p914 + p915 + p916 + p917 + p918 + p919 + p920 + p921 + p922 + p923 + p924 + p925 + p926 + p927 + p928 + p929 + p930 + p931 + p938 + p939 + p940 + p941 + p942 + p943 + p944 + p945 + p946 + p947 + p948 + p949 + p950 + p951 + p952 + p953 + p954 + p955 + p956 + p957 + p958 + p959 + p14 + p15 + p16 + p17 + p18 + p19 + p960 + p961 + p962 + p963 + p964 + p965 + p966 + p967 + p968 + p969 + p20 + p21 + p22 + p23 + p24 + p25 + p26 + p27 + p28 + p29 + p970 + p971 + p972 + p973 + p30 + p31 + p32 + p33 + p34 + p35 + p36 + p37 + p38 + p39 + p980 + p981 + p982 + p983 + p984 + p985 + p986 + p987 + p988 + p989 + p40 + p41 + p42 + p43 + p44 + p45 + p46 + p47 + p48 + p49 + p990 + p991 + p992 + p993 + p994 + p995 + p996 + p997 + p998 + p999 + p56 + p57 + p58 + p59 + p60 + p61 + p62 + p63 + p64 + p65 + p66 + p67 + p68 + p69 + p70 + p71 + p72 + p73 + p74 + p75 + p76 + p77 + p78 + p79 + p1600 + p1601 + p1602 + p1603 + p80 + p81 + p82 + p83 + p84 + p85 + p86 + p87 + p88 + p89 + p1610 + p1611 + p1612 + p1613 + p1614 + p1615 + p1616 + p1617 + p1618 + p1619 + p90 + p91 + p98 + p99 + p1620 + p1621 + p1622 + p1623 + p1624 + p1625 + p1626 + p1627 + p1628 + p1629 + p1630 + p1631 + p1632 + p1633 + p1634 + p1635 + p1636 + p1637 + p1638 + p1639 + p1640 + p1641 + p1642 + p1643 + p1644 + p1645 + p1652 + p1653 + p1654 + p1655 + 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 + p1999 + p1998 + 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 + p1721 + p1722 + p1723 + p1724 + p1725 + p1726 + p1727 + p1728 + p1729 + p1997 + p1996 + p1995 + p1994 + p1993 + p1992 + p1736 + p1737 + p1738 + p1739 + p1740 + p1741 + p1742 + p1743 + p1744 + p1745 + p1746 + p1747 + p1748 + p1749 + p1750 + p1751 + p1752 + p1753 + p1754 + p1755 + p1756 + p1757 + p1758 + p1759 + p1760 + p1761 + p1762 + p1763 + p1764 + p1765 + p1766 + p1767 + p1768 + p1769 + p1770 + p1771 + p1991 + p1990 + p1989 + p1988 + p1981 + p1980 + p1778 + p1779 + p1780 + p1781 + p1782 + p1783 + p1784 + p1785 + p1786 + p1787 + p1788 + p1789 + p1790 + p1791 + p1792 + p1793 + p1794 + p1795 + p1796 + p1797 + p1798 + p1799 + 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 + p1952 + p1951 + p1950 + p1800 + p1801 + p1802 + p1803 + p1804 + p1805 + p1806 + p1807 + p1808 + p1809 + p1810 + p1811 + p1812 + p1813 + p1949 + p1948 + p1947 + p1946 + p1939 + p1938 + p1820 + 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 + p1853 + p1854 + p1855 + p1937 + p1936 + p1935 + p1934 + p1933 + p1932 + 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 + p1931 + p1930 + p1929 + p1928 + p1927 + p1926 + p1925 + p1924 + p1923 + p1922 + p1921 + p1920 + p1919 + p1918 + p1917 + p1916 + p1915 + p1914 + p1913 + p1912 + p1911 + p1910 + p1909 + p1908 + p1907 + p1906 + p1905 + p1904)
lola: after: (2 <= p1900 + p1901 + p1902 + p1903 + p1899 + p1898 + p1861 + p1860 + p1859 + p1858 + p1857 + p1856 + p1819 + p1818 + p1940 + p1941 + p1942 + p1943 + p1944 + p1945 + p1817 + p1816 + p1815 + p1814 + p1777 + p1776 + p1982 + p1983 + p1984 + p1985 + p1986 + p1987 + p1775 + p1774 + p1773 + p1772 + p1735 + p1734 + p1733 + p1732 + p1731 + p1730 + p1693 + p1692 + p1691 + p1690 + p1689 + p1688 + p1651 + p1650 + p1649 + p1648 + p1647 + p1646 + p97 + p96 + p95 + p94 + p93 + p92 + p1609 + p1608 + p1607 + p1606 + p1605 + p1604 + p55 + p54 + p53 + p52 + p51 + p50 + p979 + p978 + p977 + p976 + p975 + p974 + p13 + p12 + p11 + p10 + p937 + p936 + p935 + p934 + p933 + p932 + p1567 + p1566 + p1565 + p1564 + p1563 + p1562 + p1525 + p1524 + p1523 + p1522 + p1521 + p1520 + p895 + p894 + p893 + p892 + p891 + p890 + p853 + p852 + p851 + p850 + p849 + p848 + p811 + p810 + p809 + p808 + p807 + p806 + p1483 + p1482 + p1481 + p1480 + p1479 + p1478 + p1441 + p1440 + p1439 + p1438 + p1437 + p1436 + p8 + p9 + p769 + p768 + p767 + p766 + p765 + p764 + p727 + p726 + p725 + p724 + p723 + p722 + p1399 + p1398 + p1397 + p1396 + p1395 + p1394 + p1357 + p1356 + p1355 + p1354 + p1353 + p1352 + p1315 + p1314 + p1313 + p1312 + p1311 + p1310 + p685 + p684 + p683 + p682 + p681 + p680 + p643 + p642 + p641 + p640 + p639 + p638 + p601 + p600 + p1273 + p1272 + p1271 + p1270 + p1269 + p1268 + p1231 + p1230 + p1229 + p1228 + p1227 + p1226 + p599 + p598 + p597 + p596 + p559 + p558 + p557 + p556 + p555 + p554 + p517 + p516 + p515 + p514 + p513 + p512 + p1189 + p1188 + p1187 + p1186 + p1185 + p1184 + p1147 + p1146 + p1145 + p1144 + p1143 + p1142 + p1105 + p1104 + p1103 + p1102 + p1101 + p1100 + p475 + p474 + p473 + p472 + p471 + p470 + p433 + p432 + p431 + p430 + p429 + p428 + p1063 + p1062 + p1061 + p1060 + p1059 + p1058 + p1021 + p1020 + p1019 + p1018 + p1017 + p1016 + p391 + p390 + p389 + p388 + p387 + p386 + p349 + p348 + p347 + p2024 + p346 + p2025 + p345 + p2026 + p344 + p307 + p2027 + p306 + p2028 + p2029 + p305 + p304 + p303 + p302 + p265 + p264 + p263 + p262 + p261 + p260 + p223 + p222 + p221 + p220 + p219 + p218 + p181 + p180 + p179 + p178 + p177 + p176 + p134 + p135 + p136 + p137 + p138 + p139)
lola: LP says that atomic proposition is always false: (2 <= p1900 + p1901 + p1902 + p1903 + p1899 + p1898 + p1861 + p1860 + p1859 + p1858 + p1857 + p1856 + p1819 + p1818 + p1940 + p1941 + p1942 + p1943 + p1944 + p1945 + p1817 + p1816 + p1815 + p1814 + p1777 + p1776 + p1982 + p1983 + p1984 + p1985 + p1986 + p1987 + p1775 + p1774 + p1773 + p1772 + p1735 + p1734 + p1733 + p1732 + p1731 + p1730 + p1693 + p1692 + p1691 + p1690 + p1689 + p1688 + p1651 + p1650 + p1649 + p1648 + p1647 + p1646 + p97 + p96 + p95 + p94 + p93 + p92 + p1609 + p1608 + p1607 + p1606 + p1605 + p1604 + p55 + p54 + p53 + p52 + p51 + p50 + p979 + p978 + p977 + p976 + p975 + p974 + p13 + p12 + p11 + p10 + p937 + p936 + p935 + p934 + p933 + p932 + p1567 + p1566 + p1565 + p1564 + p1563 + p1562 + p1525 + p1524 + p1523 + p1522 + p1521 + p1520 + p895 + p894 + p893 + p892 + p891 + p890 + p853 + p852 + p851 + p850 + p849 + p848 + p811 + p810 + p809 + p808 + p807 + p806 + p1483 + p1482 + p1481 + p1480 + p1479 + p1478 + p1441 + p1440 + p1439 + p1438 + p1437 + p1436 + p8 + p9 + p769 + p768 + p767 + p766 + p765 + p764 + p727 + p726 + p725 + p724 + p723 + p722 + p1399 + p1398 + p1397 + p1396 + p1395 + p1394 + p1357 + p1356 + p1355 + p1354 + p1353 + p1352 + p1315 + p1314 + p1313 + p1312 + p1311 + p1310 + p685 + p684 + p683 + p682 + p681 + p680 + p643 + p642 + p641 + p640 + p639 + p638 + p601 + p600 + p1273 + p1272 + p1271 + p1270 + p1269 + p1268 + p1231 + p1230 + p1229 + p1228 + p1227 + p1226 + p599 + p598 + p597 + p596 + p559 + p558 + p557 + p556 + p555 + p554 + p517 + p516 + p515 + p514 + p513 + p512 + p1189 + p1188 + p1187 + p1186 + p1185 + p1184 + p1147 + p1146 + p1145 + p1144 + p1143 + p1142 + p1105 + p1104 + p1103 + p1102 + p1101 + p1100 + p475 + p474 + p473 + p472 + p471 + p470 + p433 + p432 + p431 + p430 + p429 + p428 + p1063 + p1062 + p1061 + p1060 + p1059 + p1058 + p1021 + p1020 + p1019 + p1018 + p1017 + p1016 + p391 + p390 + p389 + p388 + p387 + p386 + p349 + p348 + p347 + p2024 + p346 + p2025 + p345 + p2026 + p344 + p307 + p2027 + p306 + p2028 + p2029 + p305 + p304 + p303 + p302 + p265 + p264 + p263 + p262 + p261 + p260 + p223 + p222 + p221 + p220 + p219 + p218 + p181 + p180 + p179 + p178 + p177 + p176 + p134 + p135 + p136 + p137 + p138 + p139)
lola: place invariant simplifies atomic proposition
lola: before: (3 <= p4640 + p4639 + p4638 + p4637 + p4636 + p4635 + p4634)
lola: after: (3 <= 0)
lola: always false
lola: place invariant simplifies atomic proposition
lola: before: (3 <= p4626 + p4625 + p4624 + p4623 + p4622 + p4621 + p4620)
lola: after: (3 <= 0)
lola: always false
lola: A (F (X (G (X (TRUE))))) : A (F (G ((TRUE U FALSE)))) : A ((1 <= p4801 + p4800 + p4799 + p4798 + p4797 + p4796 + p4795)) : A (X (FALSE)) : A (FALSE) : A ((TRUE U X (X (TRUE)))) : A ((((p4606 + p4607 + p4608 + p4609 + p4610 + p4611 + p4612 <= p4410 + p4411 + p4412 + p4413 + p4414 + p4415 + p4416) U TRUE) U G (F (TRUE)))) : A (TRUE) : A ((2 <= p4193 + p4186 + p4179 + p4172 + p4171 + p4170 + p4169 + p4168 + p4167 + p4166 + p4165 + p4158 + p4151 + p4144 + p4137 + p4130 + p4129 + p4128 + p4127 + p4126 + p4125 + p4124 + p4123 + p4116 + p4109 + p4102 + p4095 + p4088 + p4087 + p4086 + p4085 + p4084 + p4083 + p4082 + p4081 + p4074 + p4067 + p4060 + p4053 + p4046 + p4045 + p4044 + p4043 + p4042 + p4041 + p4040 + p4039 + p4032 + p4025 + p4018 + p4011 + p4004 + p4003 + p4002 + p4001 + p4000 + p4200 + p2996 + p2995 + p4207 + p4208 + p4209 + p4210 + p4211 + p4212 + p4213 + p4214 + p2994 + p2993 + p2992 + p2991 + p2990 + p2989 + p4221 + p2982 + p4228 + p2975 + p2968 + p2961 + p2954 + p2953 + p4235 + p2952 + p2951 + p2950 + p4242 + p2949 + p2948 + p2947 + p4249 + p4250 + p4251 + p4252 + p4253 + p4254 + p4255 + p4256 + p2940 + p4263 + p2933 + p2926 + p2919 + p2912 + p2911 + p4270 + p2910 + p4277 + p2909 + p2908 + p2907 + p2906 + p2905 + p4284 + p4291 + p4292 + p4293 + p4294 + p4295 + p4296 + p4297 + p4298 + p4305 + p2898 + p4312 + p2891 + p4319 + p2884 + p2877 + p2870 + p2869 + p2868 + p2867 + p4326 + p2866 + p2865 + p2864 + p2863 + p2856 + p4333 + p4334 + p3003 + p4335 + p4336 + p4337 + p2849 + p4338 + p2842 + p4339 + p2835 + p2828 + p4340 + p2827 + p3010 + p2826 + p2825 + p2824 + p2823 + p2822 + p2821 + p2814 + p4347 + p3017 + p2807 + p2800 + p4354 + p3024 + p2793 + p4361 + p2786 + p2785 + p3031 + p2784 + p3032 + p2783 + p3033 + p2782 + p3034 + p2781 + p3035 + p2780 + p3036 + p4368 + p3037 + p2779 + p3038 + p2772 + p2765 + p2758 + p2751 + p4375 + p2744 + p4376 + p3045 + p4377 + p2743 + p4378 + p2742 + p4379 + p2741 + p2740 + p2739 + p2738 + p2737 + p2730 + p2723 + p2716 + p2709 + p2702 + p4380 + p4381 + p2701 + p4382 + p2700 + p3052 + p4389 + p3059 + p2699 + p2698 + p2697 + p2696 + p2695 + p4396 + p2688 + p3066 + p2681 + p2674 + p3999 + p3073 + p3074 + p3075 + p3076 + p3077 + p3078 + p3079 + p3080 + p2667 + p3998 + p3997 + p2660 + p3990 + p2659 + p3087 + p2658 + p2657 + p2656 + p2655 + p2654 + p2653 + p3094 + p3983 + p2646 + p3976 + p4403 + p2639 + p3969 + p2632 + p3962 + p3961 + p3960 + p3101 + p3959 + p3958 + p3957 + p2625 + p3956 + p3955 + p3108 + p2618 + p2617 + p3948 + p2616 + p2615 + p2614 + p3115 + p3116 + p3117 + p3118 + p3119 + p3120 + p3121 + p3122 + p2613 + p2612 + p2611 + p3941 + p2604 + p3934 + p3129 + p3927 + p3920 + p3919 + p3136 + p3918 + p3917 + p3916 + p3915 + p3914 + p3913 + p3906 + p3143 + p3150 + p2597 + p2590 + p2583 + p2576 + p3157 + p3158 + p3159 + p2575 + p3160 + p3161 + p3162 + p2574 + p3163 + p3164 + p2573 + p2572 + p2571 + p2570 + p2569 + p3899 + p3171 + p2562 + p3892 + p3178 + p2555 + p3885 + p2548 + p3878 + p3877 + p3185 + p3876 + p3875 + p3874 + p3873 + p2541 + p3872 + p3192 + p3871 + p2534 + p2533 + p3864 + p2532 + p2531 + p3199 + p2530 + p2529 + p2528 + p2527 + p3857 + p2520 + p3850 + p2513 + p3843 + p3200 + p3201 + p3202 + p3203 + p3204 + p3205 + p3206 + p2506 + p3836 + p3835 + p3834 + p3833 + p3832 + p3831 + p3830 + p3213 + p3829 + p3822 + p3815 + p3808 + p3801 + p3220 + p3227 + p2499 + p2492 + p3234 + p2491 + p2490 + p2489 + p2488 + p2487 + p2486 + p2485 + p2478 + p3241 + p3242 + p3243 + p3244 + p3245 + p3246 + p3247 + p3248 + p2471 + p2464 + p3794 + p3793 + p3792 + p3255 + p3791 + p3790 + p3789 + p2457 + p3788 + p3787 + p2450 + p3780 + p2449 + p3262 + p2448 + p2447 + p2446 + p2445 + p2444 + p2443 + p3773 + p3269 + p2436 + p3766 + p3276 + p2429 + p3759 + p2422 + p3752 + p3751 + p3283 + p3284 + p3285 + p3286 + p3287 + p3288 + p3289 + p3290 + p3750 + p3749 + p3748 + p3747 + p2415 + p3746 + p3297 + p3745 + p2408 + p2407 + p3738 + p2406 + p2405 + p2404 + p2403 + p2402 + p2401 + p3731 + p3724 + p3717 + p3710 + p3709 + p3708 + p3707 + p3706 + p3304 + p3705 + p3704 + p3703 + p2394 + p3311 + p2387 + p3318 + p2380 + p2373 + p2366 + p2365 + p3696 + p2364 + p3325 + p3326 + p3327 + p3328 + p3329 + p2363 + p3330 + p3331 + p2362 + p3332 + p2361 + p2360 + p2359 + p3689 + p2352 + p3682 + p3675 + p3339 + p3668 + p3667 + p3666 + p3665 + p3664 + p3663 + p3662 + p3661 + p3654 + p3647 + p3640 + p3633 + p3346 + p3626 + p3625 + p3624 + p3623 + p3622 + p3621 + p3620 + p3619 + p3612 + p3353 + p3605 + p3360 + p3598 + p3591 + p3584 + p3583 + p3582 + p3581 + p3580 + p3579 + p3367 + p3578 + p3368 + p3577 + p3369 + p3570 + p3563 + p3370 + p3371 + p3556 + p3372 + p3549 + p3373 + p3542 + p3374 + p3541 + p3540 + p3539 + p3538 + p3537 + p3536 + p3535 + p3528 + p3521 + p3514 + p3381 + p3507 + p3500 + p3388 + p3499 + p3498 + p3497 + p3496 + p3495 + p3494 + p3395 + p3493 + p3486 + p3479 + p3472 + p3465 + p3458 + p3457 + p3456 + p3455 + p3454 + p3453 + p3452 + p3451 + p3444 + p3437 + p3430 + p3423 + p3416 + p3415 + p3414 + p3413 + p3412 + p3411 + p3410 + p3409 + p3402)) : A (G ((FALSE U X (TRUE)))) : A (G (X (G (F (FALSE))))) : A ((p4606 + p4607 + p4608 + p4609 + p4610 + p4611 + p4612 <= p4193 + p4186 + p4179 + p4172 + p4171 + p4170 + p4169 + p4168 + p4167 + p4166 + p4165 + p4158 + p4151 + p4144 + p4137 + p4130 + p4129 + p4128 + p4127 + p4126 + p4125 + p4124 + p4123 + p4116 + p4109 + p4102 + p4095 + p4088 + p4087 + p4086 + p4085 + p4084 + p4083 + p4082 + p4081 + p4074 + p4067 + p4060 + p4053 + p4046 + p4045 + p4044 + p4043 + p4042 + p4041 + p4040 + p4039 + p4032 + p4025 + p4018 + p4011 + p4004 + p4003 + p4002 + p4001 + p4000 + p4200 + p2996 + p2995 + p4207 + p4208 + p4209 + p4210 + p4211 + p4212 + p4213 + p4214 + p2994 + p2993 + p2992 + p2991 + p2990 + p2989 + p4221 + p2982 + p4228 + p2975 + p2968 + p2961 + p2954 + p2953 + p4235 + p2952 + p2951 + p2950 + p4242 + p2949 + p2948 + p2947 + p4249 + p4250 + p4251 + p4252 + p4253 + p4254 + p4255 + p4256 + p2940 + p4263 + p2933 + p2926 + p2919 + p2912 + p2911 + p4270 + p2910 + p4277 + p2909 + p2908 + p2907 + p2906 + p2905 + p4284 + p4291 + p4292 + p4293 + p4294 + p4295 + p4296 + p4297 + p4298 + p4305 + p2898 + p4312 + p2891 + p4319 + p2884 + p2877 + p2870 + p2869 + p2868 + p2867 + p4326 + p2866 + p2865 + p2864 + p2863 + p2856 + p4333 + p4334 + p3003 + p4335 + p4336 + p4337 + p2849 + p4338 + p2842 + p4339 + p2835 + p2828 + p4340 + p2827 + p3010 + p2826 + p2825 + p2824 + p2823 + p2822 + p2821 + p2814 + p4347 + p3017 + p2807 + p2800 + p4354 + p3024 + p2793 + p4361 + p2786 + p2785 + p3031 + p2784 + p3032 + p2783 + p3033 + p2782 + p3034 + p2781 + p3035 + p2780 + p3036 + p4368 + p3037 + p2779 + p3038 + p2772 + p2765 + p2758 + p2751 + p4375 + p2744 + p4376 + p3045 + p4377 + p2743 + p4378 + p2742 + p4379 + p2741 + p2740 + p2739 + p2738 + p2737 + p2730 + p2723 + p2716 + p2709 + p2702 + p4380 + p4381 + p2701 + p4382 + p2700 + p3052 + p4389 + p3059 + p2699 + p2698 + p2697 + p2696 + p2695 + p4396 + p2688 + p3066 + p2681 + p2674 + p3999 + p3073 + p3074 + p3075 + p3076 + p3077 + p3078 + p3079 + p3080 + p2667 + p3998 + p3997 + p2660 + p3990 + p2659 + p3087 + p2658 + p2657 + p2656 + p2655 + p2654 + p2653 + p3094 + p3983 + p2646 + p3976 + p4403 + p2639 + p3969 + p2632 + p3962 + p3961 + p3960 + p3101 + p3959 + p3958 + p3957 + p2625 + p3956 + p3955 + p3108 + p2618 + p2617 + p3948 + p2616 + p2615 + p2614 + p3115 + p3116 + p3117 + p3118 + p3119 + p3120 + p3121 + p3122 + p2613 + p2612 + p2611 + p3941 + p2604 + p3934 + p3129 + p3927 + p3920 + p3919 + p3136 + p3918 + p3917 + p3916 + p3915 + p3914 + p3913 + p3906 + p3143 + p3150 + p2597 + p2590 + p2583 + p2576 + p3157 + p3158 + p3159 + p2575 + p3160 + p3161 + p3162 + p2574 + p3163 + p3164 + p2573 + p2572 + p2571 + p2570 + p2569 + p3899 + p3171 + p2562 + p3892 + p3178 + p2555 + p3885 + p2548 + p3878 + p3877 + p3185 + p3876 + p3875 + p3874 + p3873 + p2541 + p3872 + p3192 + p3871 + p2534 + p2533 + p3864 + p2532 + p2531 + p3199 + p2530 + p2529 + p2528 + p2527 + p3857 + p2520 + p3850 + p2513 + p3843 + p3200 + p3201 + p3202 + p3203 + p3204 + p3205 + p3206 + p2506 + p3836 + p3835 + p3834 + p3833 + p3832 + p3831 + p3830 + p3213 + p3829 + p3822 + p3815 + p3808 + p3801 + p3220 + p3227 + p2499 + p2492 + p3234 + p2491 + p2490 + p2489 + p2488 + p2487 + p2486 + p2485 + p2478 + p3241 + p3242 + p3243 + p3244 + p3245 + p3246 + p3247 + p3248 + p2471 + p2464 + p3794 + p3793 + p3792 + p3255 + p3791 + p3790 + p3789 + p2457 + p3788 + p3787 + p2450 + p3780 + p2449 + p3262 + p2448 + p2447 + p2446 + p2445 + p2444 + p2443 + p3773 + p3269 + p2436 + p3766 + p3276 + p2429 + p3759 + p2422 + p3752 + p3751 + p3283 + p3284 + p3285 + p3286 + p3287 + p3288 + p3289 + p3290 + p3750 + p3749 + p3748 + p3747 + p2415 + p3746 + p3297 + p3745 + p2408 + p2407 + p3738 + p2406 + p2405 + p2404 + p2403 + p2402 + p2401 + p3731 + p3724 + p3717 + p3710 + p3709 + p3708 + p3707 + p3706 + p3304 + p3705 + p3704 + p3703 + p2394 + p3311 + p2387 + p3318 + p2380 + p2373 + p2366 + p2365 + p3696 + p2364 + p3325 + p3326 + p3327 + p3328 + p3329 + p2363 + p3330 + p3331 + p2362 + p3332 + p2361 + p2360 + p2359 + p3689 + p2352 + p3682 + p3675 + p3339 + p3668 + p3667 + p3666 + p3665 + p3664 + p3663 + p3662 + p3661 + p3654 + p3647 + p3640 + p3633 + p3346 + p3626 + p3625 + p3624 + p3623 + p3622 + p3621 + p3620 + p3619 + p3612 + p3353 + p3605 + p3360 + p3598 + p3591 + p3584 + p3583 + p3582 + p3581 + p3580 + p3579 + p3367 + p3578 + p3368 + p3577 + p3369 + p3570 + p3563 + p3370 + p3371 + p3556 + p3372 + p3549 + p3373 + p3542 + p3374 + p3541 + p3540 + p3539 + p3538 + p3537 + p3536 + p3535 + p3528 + p3521 + p3514 + p3381 + p3507 + p3500 + p3388 + p3499 + p3498 + p3497 + p3496 + p3495 + p3494 + p3395 + p3493 + p3486 + p3479 + p3472 + p3465 + p3458 + p3457 + p3456 + p3455 + p3454 + p3453 + p3452 + p3451 + p3444 + p3437 + p3430 + p3423 + p3416 + p3415 + p3414 + p3413 + p3412 + p3411 + p3410 + p3409 + p3402)) : A (TRUE) : A (F ((G (FALSE) U F (FALSE)))) : A (F (FALSE)) : A (F ((2 <= p4606 + p4607 + p4608 + p4609 + p4610 + p4611 + p4612)))
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:353
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:142
lola: rewrite Frontend/Parser/formula_rewrite.k:356
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:169
lola: rewrite Frontend/Parser/formula_rewrite.k:157
lola: rewrite Frontend/Parser/formula_rewrite.k:163
lola: rewrite Frontend/Parser/formula_rewrite.k:157
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:145
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: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:142
lola: rewrite Frontend/Parser/formula_rewrite.k:169
lola: rewrite Frontend/Parser/formula_rewrite.k:356
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:166
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:169
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:100
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:100
lola: rewrite Frontend/Parser/formula_rewrite.k:185
lola: rewrite Frontend/Parser/formula_rewrite.k:353
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:157
lola: rewrite Frontend/Parser/formula_rewrite.k:163
lola: rewrite Frontend/Parser/formula_rewrite.k:145
lola: rewrite Frontend/Parser/formula_rewrite.k:163
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:163
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:157
lola: rewrite Frontend/Parser/formula_rewrite.k:185
lola: rewrite Frontend/Parser/formula_rewrite.k:157
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:157
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: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 60 rewrites
lola: closed formula file NeoElection-COL-6-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

FORMULA NeoElection-COL-6-LTLCardinality-1 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: ========================================
lola: subprocess 1 will run for 236 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: (1 <= p4801 + p4800 + p4799 + p4798 + p4797 + p4796 + p4795)
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: (1 <= p4801 + p4800 + p4799 + p4798 + p4797 + p4796 + p4795)
lola: processed formula length: 60
lola: 60 rewrites
lola: closed formula file NeoElection-COL-6-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 NeoElection-COL-6-LTLCardinality-2 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 2 will run for 253 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: 60 rewrites
lola: closed formula file NeoElection-COL-6-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 NeoElection-COL-6-LTLCardinality-3 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: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 60 rewrites
lola: closed formula file NeoElection-COL-6-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 NeoElection-COL-6-LTLCardinality-4 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 4 will run for 295 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: TRUE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: TRUE
lola: processed formula length: 4
lola: 60 rewrites
lola: closed formula file NeoElection-COL-6-LTLCardinality.task
lola: processed formula with 0 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 NeoElection-COL-6-LTLCardinality-6 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 5 will run for 322 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: TRUE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: TRUE
lola: processed formula length: 4
lola: 60 rewrites
lola: closed formula file NeoElection-COL-6-LTLCardinality.task
lola: processed formula with 0 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 NeoElection-COL-6-LTLCardinality-7 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
========================================
lola: subprocess 6 will run for 354 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: (2 <= p4193 + p4186 + p4179 + p4172 + p4171 + p4170 + p4169 + p4168 + p4167 + p4166 + p4165 + p4158 + p4151 + p4144 + p4137 + p4130 + p4129 + p4128 + p4127 + p4126 + p4125 + p4124 + p4123 + p4116 + p4109 + p4102 + p4095 + p4088 + p4087 + p4086 + p4085 + p4084 + p4083 + p4082 + p4081 + p4074 + p4067 + p4060 + p4053 + p4046 + p4045 + p4044 + p4043 + p4042 + p4041 + p4040 + p4039 + p4032 + p4025 + p4... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: (2 <= p4193 + p4186 + p4179 + p4172 + p4171 + p4170 + p4169 + p4168 + p4167 + p4166 + p4165 + p4158 + p4151 + p4144 + p4137 + p4130 + p4129 + p4128 + p4127 + p4126 + p4125 + p4124 + p4123 + p4116 + p4109 + p4102 + p4095 + p4088 + p4087 + p4086 + p4085 + p4084 + p4083 + p4082 + p4081 + p4074 + p4067 + p4060 + p4053 + p4046 + p4045 + p4044 + p4043 + p4042 + p4041 + p4040 + p4039 + p4032 + p4025 + p4... (shortened)
lola: processed formula length: 4708
lola: 60 rewrites
lola: closed formula file NeoElection-COL-6-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 NeoElection-COL-6-LTLCardinality-8 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: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 60 rewrites
lola: closed formula file NeoElection-COL-6-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 NeoElection-COL-6-LTLCardinality-10 FALSE 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: (p4606 + p4607 + p4608 + p4609 + p4610 + p4611 + p4612 <= p4193 + p4186 + p4179 + p4172 + p4171 + p4170 + p4169 + p4168 + p4167 + p4166 + p4165 + p4158 + p4151 + p4144 + p4137 + p4130 + p4129 + p4128 + p4127 + p4126 + p4125 + p4124 + p4123 + p4116 + p4109 + p4102 + p4095 + p4088 + p4087 + p4086 + p4085 + p4084 + p4083 + p4082 + p4081 + p4074 + p4067 + p4060 + p4053 + p4046 + p4045 + p4044 + p4043 ... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: (p4606 + p4607 + p4608 + p4609 + p4610 + p4611 + p4612 <= p4193 + p4186 + p4179 + p4172 + p4171 + p4170 + p4169 + p4168 + p4167 + p4166 + p4165 + p4158 + p4151 + p4144 + p4137 + p4130 + p4129 + p4128 + p4127 + p4126 + p4125 + p4124 + p4123 + p4116 + p4109 + p4102 + p4095 + p4088 + p4087 + p4086 + p4085 + p4084 + p4083 + p4082 + p4081 + p4074 + p4067 + p4060 + p4053 + p4046 + p4045 + p4044 + p4043 ... (shortened)
lola: processed formula length: 4760
lola: 60 rewrites
lola: closed formula file NeoElection-COL-6-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 NeoElection-COL-6-LTLCardinality-11 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 9 will run for 506 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: TRUE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: TRUE
lola: processed formula length: 4
lola: 60 rewrites
lola: closed formula file NeoElection-COL-6-LTLCardinality.task
lola: processed formula with 0 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 NeoElection-COL-6-LTLCardinality-12 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 10 will run for 590 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: 60 rewrites
lola: closed formula file NeoElection-COL-6-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 NeoElection-COL-6-LTLCardinality-13 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 11 will run for 708 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: 60 rewrites
lola: closed formula file NeoElection-COL-6-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 NeoElection-COL-6-LTLCardinality-14 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
========================================
lola: subprocess 12 will run for 885 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X (TRUE))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (TRUE))
lola: processed formula length: 12
lola: 60 rewrites
lola: closed formula file NeoElection-COL-6-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: 7 markings, 6 edges
lola:
FORMULA NeoElection-COL-6-LTLCardinality-9 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
========================================
lola: subprocess 13 will run for 1181 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X (TRUE))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (TRUE))
lola: processed formula length: 12
lola: 60 rewrites
lola: closed formula file NeoElection-COL-6-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: 7 markings, 6 edges
lola:
FORMULA NeoElection-COL-6-LTLCardinality-5 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
========================================
lola: subprocess 14 will run for 1771 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X (TRUE))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (TRUE))
lola: processed formula length: 12
lola: 60 rewrites
lola: closed formula file NeoElection-COL-6-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: 7 markings, 6 edges
lola: ========================================

FORMULA NeoElection-COL-6-LTLCardinality-0 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 15 will run for 3543 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (F ((2 <= p4606 + p4607 + p4608 + p4609 + p4610 + p4611 + p4612)))
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: (p4606 + p4607 + p4608 + p4609 + p4610 + p4611 + p4612 <= 1)
lola: processed formula length: 60
lola: 62 rewrites
lola: closed formula file NeoElection-COL-6-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: 88541 markings, 134405 edges, 17708 markings/sec, 0 secs
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lola: 33770505 markings, 57652865 edges, 17366 markings/sec, 1900 secs
lola: 33856359 markings, 57809875 edges, 17171 markings/sec, 1905 secs
lola: 33939537 markings, 57964907 edges, 16636 markings/sec, 1910 secs
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lola: 34742150 markings, 59467213 edges, 16727 markings/sec, 1960 secs
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lola: 34901474 markings, 59768436 edges, 16036 markings/sec, 1970 secs
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lola: 35067611 markings, 60077268 edges, 16976 markings/sec, 1980 secs
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lola: 45151201 markings, 81065520 edges, 12594 markings/sec, 2685 secs
lola: 45223878 markings, 81213984 edges, 14535 markings/sec, 2690 secs
lola: 45291251 markings, 81358302 edges, 13475 markings/sec, 2695 secs
lola: 45355112 markings, 81511923 edges, 12772 markings/sec, 2700 secs
lola: 45440540 markings, 81661613 edges, 17086 markings/sec, 2705 secs
lola: 45525886 markings, 81810549 edges, 17069 markings/sec, 2710 secs
lola: 45607616 markings, 81957488 edges, 16346 markings/sec, 2715 secs
lola: 45684500 markings, 82106703 edges, 15377 markings/sec, 2720 secs
lola: 45755081 markings, 82254377 edges, 14116 markings/sec, 2725 secs
lola: 45822771 markings, 82401034 edges, 13538 markings/sec, 2730 secs
lola: 45895054 markings, 82552671 edges, 14457 markings/sec, 2735 secs
lola: 45967004 markings, 82699828 edges, 14390 markings/sec, 2740 secs
lola: 46037713 markings, 82847318 edges, 14142 markings/sec, 2745 secs
lola: 46110290 markings, 82995274 edges, 14515 markings/sec, 2750 secs
lola: 46176930 markings, 83142923 edges, 13328 markings/sec, 2755 secs
lola: 46264693 markings, 83296629 edges, 17553 markings/sec, 2760 secs
lola: 46339025 markings, 83447032 edges, 14866 markings/sec, 2765 secs
lola: 46413217 markings, 83598413 edges, 14838 markings/sec, 2770 secs
lola: 46487280 markings, 83747822 edges, 14813 markings/sec, 2775 secs
lola: 46567211 markings, 83895590 edges, 15986 markings/sec, 2780 secs
lola: 46634171 markings, 84041936 edges, 13392 markings/sec, 2785 secs
lola: 46703134 markings, 84188501 edges, 13793 markings/sec, 2790 secs
lola: 46781646 markings, 84340992 edges, 15702 markings/sec, 2795 secs
lola: 46864805 markings, 84494416 edges, 16632 markings/sec, 2800 secs
lola: 46939790 markings, 84651573 edges, 14997 markings/sec, 2805 secs
lola: 47015723 markings, 84806643 edges, 15187 markings/sec, 2810 secs
lola: 47096988 markings, 84962603 edges, 16253 markings/sec, 2815 secs
lola: 47177365 markings, 85119263 edges, 16075 markings/sec, 2820 secs
lola: 47250730 markings, 85267975 edges, 14673 markings/sec, 2825 secs
lola: 47329558 markings, 85415470 edges, 15766 markings/sec, 2830 secs
lola: 47396526 markings, 85562126 edges, 13394 markings/sec, 2835 secs
lola: 47466241 markings, 85710021 edges, 13943 markings/sec, 2840 secs
lola: 47540414 markings, 85860957 edges, 14835 markings/sec, 2845 secs
lola: 47612771 markings, 86008404 edges, 14471 markings/sec, 2850 secs
lola: 47680513 markings, 86153395 edges, 13548 markings/sec, 2855 secs
lola: 47772188 markings, 86305921 edges, 18335 markings/sec, 2860 secs
lola: 47856191 markings, 86457227 edges, 16801 markings/sec, 2865 secs
lola: 47930529 markings, 86604302 edges, 14868 markings/sec, 2870 secs
lola: 48008398 markings, 86753418 edges, 15574 markings/sec, 2875 secs
lola: 48084476 markings, 86901586 edges, 15216 markings/sec, 2880 secs
lola: 48170355 markings, 87054725 edges, 17176 markings/sec, 2885 secs
lola: 48249506 markings, 87206304 edges, 15830 markings/sec, 2890 secs
lola: 48331295 markings, 87357661 edges, 16358 markings/sec, 2895 secs
lola: 48407640 markings, 87507811 edges, 15269 markings/sec, 2900 secs
lola: 48496197 markings, 87666527 edges, 17711 markings/sec, 2905 secs
lola: 48578454 markings, 87819149 edges, 16451 markings/sec, 2910 secs
lola: 48658441 markings, 87970109 edges, 15997 markings/sec, 2915 secs
lola: 48736842 markings, 88114693 edges, 15680 markings/sec, 2920 secs
lola: 48810232 markings, 88258718 edges, 14678 markings/sec, 2925 secs
lola: 48886969 markings, 88407018 edges, 15347 markings/sec, 2930 secs
lola: 48972768 markings, 88555924 edges, 17160 markings/sec, 2935 secs
lola: 49058331 markings, 88710560 edges, 17113 markings/sec, 2940 secs
lola: 49131908 markings, 88860581 edges, 14715 markings/sec, 2945 secs
lola: 49212280 markings, 89016551 edges, 16074 markings/sec, 2950 secs
lola: 49287852 markings, 89168314 edges, 15114 markings/sec, 2955 secs
lola: 49373776 markings, 89325781 edges, 17185 markings/sec, 2960 secs
lola: 49452878 markings, 89481626 edges, 15820 markings/sec, 2965 secs
lola: 49529825 markings, 89627994 edges, 15389 markings/sec, 2970 secs
lola: 49600389 markings, 89768393 edges, 14113 markings/sec, 2975 secs
lola: 49686443 markings, 89927920 edges, 17211 markings/sec, 2980 secs
lola: 49770006 markings, 90087356 edges, 16713 markings/sec, 2985 secs
lola: 49852868 markings, 90244057 edges, 16572 markings/sec, 2990 secs
lola: 49929297 markings, 90394966 edges, 15286 markings/sec, 2995 secs
lola: 50005982 markings, 90547207 edges, 15337 markings/sec, 3000 secs
lola: 50075945 markings, 90700483 edges, 13993 markings/sec, 3005 secs
lola: 50155561 markings, 90851276 edges, 15923 markings/sec, 3010 secs
lola: 50237337 markings, 90999479 edges, 16355 markings/sec, 3015 secs
lola: 50318294 markings, 91146934 edges, 16191 markings/sec, 3020 secs
lola: 50391269 markings, 91291756 edges, 14595 markings/sec, 3025 secs
lola: 50461662 markings, 91440360 edges, 14079 markings/sec, 3030 secs
lola: 50526934 markings, 91586092 edges, 13054 markings/sec, 3035 secs
lola: 50594756 markings, 91734502 edges, 13564 markings/sec, 3040 secs
lola: 50662301 markings, 91878926 edges, 13509 markings/sec, 3045 secs
lola: 50731319 markings, 92025390 edges, 13804 markings/sec, 3050 secs
lola: 50800257 markings, 92171318 edges, 13788 markings/sec, 3055 secs
lola: 50863717 markings, 92316618 edges, 12692 markings/sec, 3060 secs
lola: 50946299 markings, 92464989 edges, 16516 markings/sec, 3065 secs
lola: 51018820 markings, 92614955 edges, 14504 markings/sec, 3070 secs
lola: 51089792 markings, 92764394 edges, 14194 markings/sec, 3075 secs
lola: 51161064 markings, 92911673 edges, 14254 markings/sec, 3080 secs
lola: 51235852 markings, 93055047 edges, 14958 markings/sec, 3085 secs
lola: 51300766 markings, 93200971 edges, 12983 markings/sec, 3090 secs
lola: 51366266 markings, 93345209 edges, 13100 markings/sec, 3095 secs
lola: 51440981 markings, 93492359 edges, 14943 markings/sec, 3100 secs
lola: 51520288 markings, 93643760 edges, 15861 markings/sec, 3105 secs
lola: 51588795 markings, 93793304 edges, 13701 markings/sec, 3110 secs
lola: 51660329 markings, 93942951 edges, 14307 markings/sec, 3115 secs
lola: 51737857 markings, 94095914 edges, 15506 markings/sec, 3120 secs
lola: 51812515 markings, 94245768 edges, 14932 markings/sec, 3125 secs
lola: 51883531 markings, 94391703 edges, 14203 markings/sec, 3130 secs
lola: 51956360 markings, 94533779 edges, 14566 markings/sec, 3135 secs
lola: 52020398 markings, 94677950 edges, 12808 markings/sec, 3140 secs
lola: 52085394 markings, 94820838 edges, 12999 markings/sec, 3145 secs
lola: 52154433 markings, 94965291 edges, 13808 markings/sec, 3150 secs
lola: 52222826 markings, 95109053 edges, 13679 markings/sec, 3155 secs
lola: 52287884 markings, 95251145 edges, 13012 markings/sec, 3160 secs
lola: 52374586 markings, 95398572 edges, 17340 markings/sec, 3165 secs
lola: 52453722 markings, 95546275 edges, 15827 markings/sec, 3170 secs
lola: 52525551 markings, 95690864 edges, 14366 markings/sec, 3175 secs
lola: 52598604 markings, 95836225 edges, 14611 markings/sec, 3180 secs
lola: 52671695 markings, 95981926 edges, 14618 markings/sec, 3185 secs
lola: 52753217 markings, 96130988 edges, 16304 markings/sec, 3190 secs
lola: 52828586 markings, 96279188 edges, 15074 markings/sec, 3195 secs
lola: 52905588 markings, 96425063 edges, 15400 markings/sec, 3200 secs
lola: 52978449 markings, 96570871 edges, 14572 markings/sec, 3205 secs
lola: 53061022 markings, 96723408 edges, 16515 markings/sec, 3210 secs
lola: 53140712 markings, 96875536 edges, 15938 markings/sec, 3215 secs
lola: 53219735 markings, 97027189 edges, 15805 markings/sec, 3220 secs
lola: 53295543 markings, 97172794 edges, 15162 markings/sec, 3225 secs
lola: 53368042 markings, 97317596 edges, 14500 markings/sec, 3230 secs
lola: 53442340 markings, 97464952 edges, 14860 markings/sec, 3235 secs
lola: 53526214 markings, 97611244 edges, 16775 markings/sec, 3240 secs
lola: 53602807 markings, 97757335 edges, 15319 markings/sec, 3245 secs
lola: 53671026 markings, 97898986 edges, 13644 markings/sec, 3250 secs
lola: 53740692 markings, 98041559 edges, 13933 markings/sec, 3255 secs
lola: 53811910 markings, 98188352 edges, 14244 markings/sec, 3260 secs
lola: 53890233 markings, 98335284 edges, 15665 markings/sec, 3265 secs
lola: 53964725 markings, 98485226 edges, 14898 markings/sec, 3270 secs
lola: 54039563 markings, 98632515 edges, 14968 markings/sec, 3275 secs
lola: 54114696 markings, 98781416 edges, 15027 markings/sec, 3280 secs
lola: 54193675 markings, 98935697 edges, 15796 markings/sec, 3285 secs
lola: 54272901 markings, 99090793 edges, 15845 markings/sec, 3290 secs
lola: 54351442 markings, 99241112 edges, 15708 markings/sec, 3295 secs
lola: 54421591 markings, 99387252 edges, 14030 markings/sec, 3300 secs
lola: 54494272 markings, 99535192 edges, 14536 markings/sec, 3305 secs
lola: 54565334 markings, 99683972 edges, 14212 markings/sec, 3310 secs
lola: 54641717 markings, 99840041 edges, 15277 markings/sec, 3315 secs
lola: 54716879 markings, 99998026 edges, 15032 markings/sec, 3320 secs
lola: 54786228 markings, 100158285 edges, 13870 markings/sec, 3325 secs
lola: 54867133 markings, 100307158 edges, 16181 markings/sec, 3330 secs
lola: 54947990 markings, 100450703 edges, 16171 markings/sec, 3335 secs
lola: 55031259 markings, 100596892 edges, 16654 markings/sec, 3340 secs
lola: 55106354 markings, 100739691 edges, 15019 markings/sec, 3345 secs
lola: 55177608 markings, 100885383 edges, 14251 markings/sec, 3350 secs
lola: 55241729 markings, 101028261 edges, 12824 markings/sec, 3355 secs
lola: 55308709 markings, 101172819 edges, 13396 markings/sec, 3360 secs
lola: 55374262 markings, 101315842 edges, 13111 markings/sec, 3365 secs
lola: 55450412 markings, 101464586 edges, 15230 markings/sec, 3370 secs
lola: 55523387 markings, 101611702 edges, 14595 markings/sec, 3375 secs
lola: 55591862 markings, 101756739 edges, 13695 markings/sec, 3380 secs
lola: 55667955 markings, 101902442 edges, 15219 markings/sec, 3385 secs
lola: 55748298 markings, 102050792 edges, 16069 markings/sec, 3390 secs
lola: 55817560 markings, 102197728 edges, 13852 markings/sec, 3395 secs
lola: 55892139 markings, 102347154 edges, 14916 markings/sec, 3400 secs
lola: 55967611 markings, 102490456 edges, 15094 markings/sec, 3405 secs
lola: 56039122 markings, 102632964 edges, 14302 markings/sec, 3410 secs
lola: 56102959 markings, 102775345 edges, 12767 markings/sec, 3415 secs
lola: 56171965 markings, 102920756 edges, 13801 markings/sec, 3420 secs
lola: 56256036 markings, 103070602 edges, 16814 markings/sec, 3425 secs
lola: 56331035 markings, 103220157 edges, 15000 markings/sec, 3430 secs
lola: 56404529 markings, 103371184 edges, 14699 markings/sec, 3435 secs
lola: 56482258 markings, 103527064 edges, 15546 markings/sec, 3440 secs
lola: 56561708 markings, 103681141 edges, 15890 markings/sec, 3445 secs
lola: 56636675 markings, 103830042 edges, 14993 markings/sec, 3450 secs
lola: 56711219 markings, 103975001 edges, 14909 markings/sec, 3455 secs
lola: 56785477 markings, 104118344 edges, 14852 markings/sec, 3460 secs
lola: 56849117 markings, 104260966 edges, 12728 markings/sec, 3465 secs
lola: 56918616 markings, 104406604 edges, 13900 markings/sec, 3470 secs
lola: 56990808 markings, 104552105 edges, 14438 markings/sec, 3475 secs
lola: 57062361 markings, 104696847 edges, 14311 markings/sec, 3480 secs
lola: 57127357 markings, 104834441 edges, 12999 markings/sec, 3485 secs
lola: 57214233 markings, 104979440 edges, 17375 markings/sec, 3490 secs
lola: 57292713 markings, 105120418 edges, 15696 markings/sec, 3495 secs
lola: 57358547 markings, 105251592 edges, 13167 markings/sec, 3500 secs
lola: 57426553 markings, 105384873 edges, 13601 markings/sec, 3505 secs
lola: 57499547 markings, 105522023 edges, 14599 markings/sec, 3510 secs
lola: 57571117 markings, 105656302 edges, 14314 markings/sec, 3515 secs
lola: 57646096 markings, 105793430 edges, 14996 markings/sec, 3520 secs
lola: 57719384 markings, 105930125 edges, 14658 markings/sec, 3525 secs
lola: 57789631 markings, 106063182 edges, 14049 markings/sec, 3530 secs
lola: 57859487 markings, 106197140 edges, 13971 markings/sec, 3535 secs
lola: local time limit reached - aborting
lola:
preliminary result: yes no no no no yes yes yes no yes no yes yes no no unknown
lola: memory consumption: 6084712 KB
lola: time consumption: 3567 seconds
lola: Child process aborted or communication problem between parent and child process
lola: ========================================
lola: ...considering subproblem: A (F ((2 <= p4606 + p4607 + p4608 + p4609 + p4610 + p4611 + p4612)))
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: (p4606 + p4607 + p4608 + p4609 + p4610 + p4611 + p4612 <= 1)
lola: processed formula length: 60
lola: 62 rewrites
lola: closed formula file NeoElection-COL-6-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: time limit reached - aborting
lola:
preliminary result: yes no no no no yes yes yes no yes no yes yes no no unknown
lola: lola:
preliminary result: yes no no no no yes yes yes no yes no yes yes no no unknown
caught signal User defined signal 1 - aborting LoLA
lola:
preliminary result: yes no no no no yes yes yes no yes no yes yes no no unknown
lola: memory consumption: 51108 KB
lola: time consumption: 3567 seconds
lola: caught signal User defined signal 1 - aborting LoLA
lola:
preliminary result: yes no no no no yes yes yes no yes no yes yes no no unknown
lola: memory consumption: 51168 KB
lola: time consumption: 3567 seconds

BK_STOP 1553035289887

--------------------
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="NeoElection-COL-6"
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 NeoElection-COL-6, 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 r110-oct2-155272242200053"
echo "====================================================================="
echo
echo "--------------------"
echo "preparation of the directory to be used:"

tar xzf /home/mcc/BenchKit/INPUTS/NeoElection-COL-6.tgz
mv NeoElection-COL-6 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 '' LTLCardinality.xml | cut -d '>' -f 2 | cut -d '<' -f 1 | sort -u) ; do
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 ;