SRS_Standard 2019-03-22 06.20 pair #430094368

details
property	value
status	complete
benchmark	z036.xml
ran by	Akihisa Yamada
cpu timeout	1200 seconds
wallclock timeout	300 seconds
memory limit	137438953472 bytes
execution host	n141.star.cs.uiowa.edu
space	Zantema_04
run statistics
property	value
solver	ttt2-1.19
configuration	ttt2_cert
runtime (wallclock)	7.29496 seconds
cpu usage	27.5133
user time	24.7398
system time	2.77352
max virtual memory	3775272.0
max residence set size	81720.0
stage attributes
key	value
certification-result	CERTIFIED
output-size	33787
starexec-result	YES
certification-time	1.4
output
YES
<?xml version="1.0"?>
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</state></rhs></transition><transition><lhs><name>a</name><height>4</height><state>326</state></lhs><rhs><state>327</state></rhs></transition><transition><lhs><name>a</name><height>4</height><state>331</state></lhs><rhs><state>332</state></rhs></transition><transition><lhs><name>a</name><height>4</height><state>199</state></lhs><rhs><state>200</state></rhs></transition><transition><lhs><name>a</name><height>4</height><state>204</state></lhs><rhs><state>205</state></rhs></transition><transition><lhs><name>a</name><height>4</height><state>274</state></lhs><rhs><state>275</state></rhs></transition><transition><lhs><name>a</name><height>4</height><state>279</state></lhs><rhs><state>280</state></rhs></transition><transition><lhs><name>a</name><height>4</height><state>284</state></lhs><rhs><state>285</state></rhs></transition><transition><lhs><name>a</name><height>4</height><state>289</state></lhs><rhs><state>290</state></rhs></transition><transition><lhs><name>a</name><height>4</height><state>314</state></lhs><rhs><state>315</state></rhs></transition><transition><lhs><name>a</name><height>4</height><state>319</state></lhs><rhs><state>320</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>282</state></lhs><rhs><state>283</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>287</state></lhs><rhs><state>288</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>292</state></lhs><rhs><state>293</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>317</state></lhs><rhs><state>318</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>322</state></lhs><rhs><state>323</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>330</state></lhs><rhs><state>331</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>278</state></lhs><rhs><state>279</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>288</state></lhs><rhs><state>289</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>318</state></lhs><rhs><state>319</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>201</state></lhs><rhs><state>202</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>206</state></lhs><rhs><state>207</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>329</state></lhs><rhs><state>330</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>334</state></lhs><rhs><state>335</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>202</state></lhs><rhs><state>203</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>277</state></lhs><rhs><state>278</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>125</state></lhs><rhs><state>126</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>130</state></lhs><rhs><state>131</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>170</state></lhs><rhs><state>171</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>175</state></lhs><rhs><state>176</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>190</state></lhs><rhs><state>191</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>195</state></lhs><rhs><state>196</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>210</state></lhs><rhs><state>211</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>215</state></lhs><rhs><state>216</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>245</state></lhs><rhs><state>246</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>250</state></lhs><rhs><state>251</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>265</state></lhs><rhs><state>266</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>270</state></lhs><rhs><state>271</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>148</state></lhs><rhs><state>149</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>153</state></lhs><rhs><state>154</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>168</state></lhs><rhs><state>169</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>173</state></lhs><rhs><state>174</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>188</state></lhs><rhs><state>189</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>193</state></lhs><rhs><state>194</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>126</state></lhs><rhs><state>127</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>131</state></lhs><rhs><state>132</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>146</state></lhs><rhs><state>147</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>151</state></lhs><rhs><state>152</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>211</state></lhs><rhs><state>212</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>216</state></lhs><rhs><state>217</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>246</state></lhs><rhs><state>247</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>251</state></lhs><rhs><state>252</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>266</state></lhs><rhs><state>267</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>271</state></lhs><rhs><state>272</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>124</state></lhs><rhs><state>125</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>129</state></lhs><rhs><state>130</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>169</state></lhs><rhs><state>170</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>174</state></lhs><rhs><state>175</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>189</state></lhs><rhs><state>190</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>194</state></lhs><rhs><state>195</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>244</state></lhs><rhs><state>245</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>249</state></lhs><rhs><state>250</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>264</state></lhs><rhs><state>265</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>269</state></lhs><rhs><state>270</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>147</state></lhs><rhs><state>148</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>152</state></lhs><rhs><state>153</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>212</state></lhs><rhs><state>213</state></rhs></transition><transition><lhs><name>a</name><height>3</height><state>217</state></lhs><rhs><state>218</state></rhs></transition></transitions></treeAutomaton><criterion><compatibility/></criterion></bounds></trsTerminationProof></stringReversal></trsTerminationProof></proof><origin><proofOrigin><tool><name>ttt2</name><version>ttt2 1.18 [hg: 65024290f751]</version><strategy>((if standard then var else fail) | con | (if srs then ((sleep -t 25?;rlab;(((( (if srs then arctic -dim 1 -ib 4 -ob 5 else fail) || (if srs then arctic -dim 2 -ib 2 -ob 3 else fail) || (if srs then arctic -dim 3 -ib 1 -ob 2 else fail) || (if srs then arctic -dim 3 -ib 2 -ob 2 else fail) || matrix -dim 1 -ib 5 -ob 8 || matrix -dim 2 -ib 3 -ob 4 || matrix -dim 3 -ib 2 -ob 3 || matrix -dim 3 -ib 1 -ob 2 || matrix -dim 4 -ib 1 -ob 2 || matrix -dim 5 -ib 1 -ob 1 || kbo -ib 3 -ob 4 || fail)[5]*);((dp;(edg -gtcap -nl[1.0]?;(sccs | ((sc || sc -rec -defs || sc -mulex -defs) || sct || {ur?;( matrix -dp -ur -dim 1 -ib 3 -ob 5 || matrix -dp -ur -dim 1 -ib 3 -ob 8 -rat 2 -db 1 || matrix -dp -ur -dim 1 -ib 4 -ob 10 -rat 4 -db 1 || matrix -dp -ur -dim 2 -ib 2 -ob 3 || matrix -dp -ur -dim 2 -ib 3 -ob 4 -rat 2 -db 0 || matrix -dp -ur -dim 3 -ib 1 -ob 3 || matrix -dp -ur -dim 3 -ib 2 -ob 3 || matrix -dp -ur -dim 3 -ib 2 -ob 3 -rat 2 -db 0 || matrix -dp -ur -dim 4 -ib 1 -ob 2 || lpo -ur -af || (arctic -dp -ur -dim 1 -ib 4 -ob 3[25] | arctic -dp -ur -dim 2 -ib 2 -ob 2[28] | arctic -dp -ur -dim 3 -ib 1 -ob 1[28] | arctic -dp -ur -dim 4 -ib 1 -ob 1[28] | fail) || (arctic -bz -dp -ur -dim 1 -ib 4 -ob 3[25] | arctic -bz -dp -ur -dim 2 -ib 2 -ob 2[28] | arctic -bz -dp -ur -dim 3 -ib 1 -ob 1[28] | arctic -bz -dp -ur -dim 4 -ib 1 -ob 1[28] | fail) || fail) } restore) )*[29])) || (bounds -cert || fail;(bounds -rfc -qc))))! || (( unfold || fail)*[7])!)[299])! || ((((( (if srs then arctic -dim 1 -ib 4 -ob 5 else fail) || (if srs then arctic -dim 2 -ib 2 -ob 3 else fail) || (if srs then arctic -dim 3 -ib 1 -ob 2 else fail) || (if srs then arctic -dim 3 -ib 2 -ob 2 else fail) || matrix -dim 1 -ib 5 -ob 8 || matrix -dim 2 -ib 3 -ob 4 || matrix -dim 3 -ib 2 -ob 3 || matrix -dim 3 -ib 1 -ob 2 || matrix -dim 4 -ib 1 -ob 2 || matrix -dim 5 -ib 1 -ob 1 || kbo -ib 3 -ob 4 || fail)[5]*);((dp;(edg -gtcap -nl[1.0]?;(sccs | ((sc || sc -rec -defs || sc -mulex -defs) || sct || {ur?;( matrix -dp -ur -dim 1 -ib 3 -ob 5 || matrix -dp -ur -dim 1 -ib 3 -ob 8 -rat 2 -db 1 || matrix -dp -ur -dim 1 -ib 4 -ob 10 -rat 4 -db 1 || matrix -dp -ur -dim 2 -ib 2 -ob 3 || matrix -dp -ur -dim 2 -ib 3 -ob 4 -rat 2 -db 0 || matrix -dp -ur -dim 3 -ib 1 -ob 3 || matrix -dp -ur -dim 3 -ib 2 -ob 3 || matrix -dp -ur -dim 3 -ib 2 -ob 3 -rat 2 -db 0 || matrix -dp -ur -dim 4 -ib 1 -ob 2 || lpo -ur -af || (arctic -dp -ur -dim 1 -ib 4 -ob 3[25] | arctic -dp -ur -dim 2 -ib 2 -ob 2[28] | arctic -dp -ur -dim 3 -ib 1 -ob 1[28] | arctic -dp -ur -dim 4 -ib 1 -ob 1[28] | fail) || (arctic -bz -dp -ur -dim 1 -ib 4 -ob 3[25] | arctic -bz -dp -ur -dim 2 -ib 2 -ob 2[28] | arctic -bz -dp -ur -dim 3 -ib 1 -ob 1[28] | arctic -bz -dp -ur -dim 4 -ib 1 -ob 1[28] | fail) || fail) } restore) )*[29])) || (bounds -cert || fail;(bounds -rfc -qc))))! || (( unfold || fail)*[7])!)[299])! || (rev?;((( (if srs then arctic -dim 1 -ib 4 -ob 5 else fail) || (if srs then arctic -dim 2 -ib 2 -ob 3 else fail) || (if srs then arctic -dim 3 -ib 1 -ob 2 else fail) || (if srs then arctic -dim 3 -ib 2 -ob 2 else fail) || matrix -dim 1 -ib 5 -ob 8 || matrix -dim 2 -ib 3 -ob 4 || matrix -dim 3 -ib 2 -ob 3 || matrix -dim 3 -ib 1 -ob 2 || matrix -dim 4 -ib 1 -ob 2 || matrix -dim 5 -ib 1 -ob 1 || kbo -ib 3 -ob 4 || fail)[5]*);((dp;(edg -gtcap -nl[1.0]?;(sccs | ((sc || sc -rec -defs || sc -mulex -defs) || sct || {ur?;( matrix -dp -ur -dim 1 -ib 3 -ob 5 || matrix -dp -ur -dim 1 -ib 3 -ob 8 -rat 2 -db 1 || matrix -dp -ur -dim 1 -ib 4 -ob 10 -rat 4 -db 1 || matrix -dp -ur -dim 2 -ib 2 -ob 3 || matrix -dp -ur -dim 2 -ib 3 -ob 4 -rat 2 -db 0 || matrix -dp -ur -dim 3 -ib 1 -ob 3 || matrix -dp -ur -dim 3 -ib 2 -ob 3 || matrix -dp -ur -dim 3 -ib 2 -ob 3 -rat 2 -db 0 || matrix -dp -ur -dim 4 -ib 1 -ob 2 || lpo -ur -af || (arctic -dp -ur -dim 1 -ib 4 -ob 3[25] | arctic -dp -ur -dim 2 -ib 2 -ob 2[28] | arctic -dp -ur -dim 3 -ib 1 -ob 1[28] | arctic -dp -ur -dim 4 -ib 1 -ob 1[28] | fail) || (arctic -bz -dp -ur -dim 1 -ib 4 -ob 3[25] | arctic -bz -dp -ur -dim 2 -ib 2 -ob 2[28] | arctic -bz -dp -ur -dim 3 -ib 1 -ob 1[28] | arctic -bz -dp -ur -dim 4 -ib 1 -ob 1[28] | fail) || fail) } restore) )*[29])) || (bounds -cert || fail;(bounds -rfc -qc))))![299])! ) else ((((( (if srs then arctic -dim 1 -ib 4 -ob 5 else fail) || (if srs then arctic -dim 2 -ib 2 -ob 3 else fail) || (if srs then arctic -dim 3 -ib 1 -ob 2 else fail) || (if srs then arctic -dim 3 -ib 2 -ob 2 else fail) || matrix -dim 1 -ib 5 -ob 8 || matrix -dim 2 -ib 3 -ob 4 || matrix -dim 3 -ib 2 -ob 3 || matrix -dim 3 -ib 1 -ob 2 || matrix -dim 4 -ib 1 -ob 2 || matrix -dim 5 -ib 1 -ob 1 || kbo -ib 3 -ob 4 || fail)[5]*);((dp;(edg -gtcap -nl[1.0]?;(sccs | ((sc || sc -rec -defs || sc -mulex -defs) || sct || {ur?;( matrix -dp -ur -dim 1 -ib 3 -ob 5 || matrix -dp -ur -dim 1 -ib 3 -ob 8 -rat 2 -db 1 || matrix -dp -ur -dim 1 -ib 4 -ob 10 -rat 4 -db 1 || matrix -dp -ur -dim 2 -ib 2 -ob 3 || matrix -dp -ur -dim 2 -ib 3 -ob 4 -rat 2 -db 0 || matrix -dp -ur -dim 3 -ib 1 -ob 3 || matrix -dp -ur -dim 3 -ib 2 -ob 3 || matrix -dp -ur -dim 3 -ib 2 -ob 3 -rat 2 -db 0 || matrix -dp -ur -dim 4 -ib 1 -ob 2 || lpo -ur -af || (arctic -dp -ur -dim 1 -ib 4 -ob 3[25] | arctic -dp -ur -dim 2 -ib 2 -ob 2[28] | arctic -dp -ur -dim 3 -ib 1 -ob 1[28] | arctic -dp -ur -dim 4 -ib 1 -ob 1[28] | fail) || (arctic -bz -dp -ur -dim 1 -ib 4 -ob 3[25] | arctic -bz -dp -ur -dim 2 -ib 2 -ob 2[28] | arctic -bz -dp -ur -dim 3 -ib 1 -ob 1[28] | arctic -bz -dp -ur -dim 4 -ib 1 -ob 1[28] | fail) || fail) } restore) )*[29])) || (bounds -cert || fail;(bounds -rfc -qc))))! || (( unfold || fail)*[7])!)[299])))</strategy></tool></proofOrigin></origin></certificationProblem>
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actions all output return to SRS_Standard 2019-03-22 06.20