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SRS Standard Certified pair #487547874
details
property
value
status
complete
benchmark
z097.xml
ran by
Akihisa Yamada
cpu timeout
1200 seconds
wallclock timeout
300 seconds
memory limit
137438953472 bytes
execution host
n034.star.cs.uiowa.edu
space
Zantema_04
run statistics
property
value
solver
ttt2-1.20
configuration
ttt2_cert
runtime (wallclock)
7.44229412079 seconds
cpu usage
28.571000009
max memory
1.631039488E9
stage attributes
key
value
certification-result
CERTIFIED
output-size
41078
starexec-result
YES
certification-time
2.4
output
/export/starexec/sandbox2/solver/bin/starexec_run_ttt2_cert /export/starexec/sandbox2/benchmark/theBenchmark.xml /export/starexec/sandbox2/output/output_files -------------------------------------------------------------------------------- YES <?xml version="1.0"?> <?xml-stylesheet type="text/xsl" href="cpfHTML.xsl"?><certificationProblem xmlns:xsi="http://www.w3.org/2001/XMLSchema-instance" xsi:noNamespaceSchemaLocation="cpf.xsd"><input><trsInput><trs><rules><rule><lhs><funapp><name>a</name><arg><funapp><name>a</name><arg><funapp><name>a</name><arg><funapp><name>b</name><arg><funapp><name>b</name><arg><var>x1</var></arg></funapp></arg></funapp></arg></funapp></arg></funapp></arg></funapp></lhs><rhs><funapp><name>b</name><arg><funapp><name>b</name><arg><funapp><name>b</name><arg><funapp><name>b</name><arg><funapp><name>b</name><arg><funapp><name>a</name><arg><funapp><name>a</name><arg><funapp><name>a</name><arg><funapp><name>a</name><arg><funapp><name>a</name><arg><var>x1</var></arg></funapp></arg></funapp></arg></funapp></arg></funapp></arg></funapp></arg></funapp></arg></funapp></arg></funapp></arg></funapp></arg></funapp></rhs></rule></rules></trs></trsInput></input><cpfVersion>2.1</cpfVersion><proof><trsTerminationProof><bounds><type><match/></type><bound>5</bound><finalStates><state>2</state><state>1</state></finalStates><treeAutomaton><finalStates><state>2</state><state>1</state></finalStates><transitions><transition><lhs><state>272</state></lhs><rhs><state>149</state></rhs></transition><transition><lhs><state>239</state></lhs><rhs><state>138</state></rhs></transition><transition><lhs><state>364</state></lhs><rhs><state>307</state></rhs></transition><transition><lhs><state>111</state></lhs><rhs><state>273</state></rhs></transition><transition><lhs><state>61</state></lhs><rhs><state>168</state></rhs></transition><transition><lhs><state>102</state></lhs><rhs><state>87</state></rhs></transition><transition><lhs><state>102</state></lhs><rhs><state>58</state></rhs></transition><transition><lhs><state>87</state></lhs><rhs><state>57</state></rhs></transition><transition><lhs><state>98</state></lhs><rhs><state>229</state></rhs></transition><transition><lhs><state>10</state></lhs><rhs><state>69</state></rhs></transition><transition><lhs><state>145</state></lhs><rhs><state>61</state></rhs></transition><transition><lhs><state>145</state></lhs><rhs><state>60</state></rhs></transition><transition><lhs><state>213</state></lhs><rhs><state>387</state></rhs></transition><transition><lhs><state>9</state></lhs><rhs><state>86</state></rhs></transition><transition><lhs><state>443</state></lhs><rhs><state>479</state></rhs></transition><transition><lhs><state>65</state></lhs><rhs><state>90</state></rhs></transition><transition><lhs><state>130</state></lhs><rhs><state>106</state></rhs></transition><transition><lhs><state>193</state></lhs><rhs><state>169</state></rhs></transition><transition><lhs><state>193</state></lhs><rhs><state>148</state></rhs></transition><transition><lhs><state>397</state></lhs><rhs><state>309</state></rhs></transition><transition><lhs><state>445</state></lhs><rhs><state>425</state></rhs></transition><transition><lhs><state>62</state></lhs><rhs><state>146</state></rhs></transition><transition><lhs><state>1</state></lhs><rhs><state>37</state></rhs></transition><transition><lhs><state>305</state></lhs><rhs><state>243</state></rhs></transition><transition><lhs><state>316</state></lhs><rhs><state>151</state></rhs></transition><transition><lhs><state>316</state></lhs><rhs><state>150</state></rhs></transition><transition><lhs><state>13</state></lhs><rhs><state>41</state></rhs></transition><transition><lhs><state>44</state></lhs><rhs><state>5</state></rhs></transition><transition><lhs><state>38</state></lhs><rhs><state>5</state></rhs></transition><transition><lhs><state>235</state></lhs><rhs><state>468</state></rhs></transition><transition><lhs><state>91</state></lhs><rhs><state>57</state></rhs></transition><transition><lhs><state>141</state></lhs><rhs><state>365</state></rhs></transition><transition><lhs><state>441</state></lhs><rhs><state>503</state></rhs></transition><transition><lhs><state>237</state></lhs><rhs><state>435</state></rhs></transition><transition><lhs><state>283</state></lhs><rhs><state>186</state></rhs></transition><transition><lhs><state>283</state></lhs><rhs><state>309</state></rhs></transition><transition><lhs><state>143</state></lhs><rhs><state>207</state></rhs></transition><transition><lhs><state>143</state></lhs><rhs><state>262</state></rhs></transition><transition><lhs><state>2</state></lhs><rhs><state>4</state></rhs></transition><transition><lhs><state>11</state></lhs><rhs><state>67</state></rhs></transition><transition><lhs><state>478</state></lhs><rhs><state>438</state></rhs></transition><transition><lhs><state>66</state></lhs><rhs><state>7</state></rhs></transition><transition><lhs><state>66</state></lhs><rhs><state>8</state></rhs></transition><transition><lhs><state>66</state></lhs><rhs><state>9</state></rhs></transition><transition><lhs><state>66</state></lhs><rhs><state>59</state></rhs></transition><transition><lhs><state>66</state></lhs><rhs><state>87</state></rhs></transition><transition><lhs><state>14</state></lhs><rhs><state>1</state></rhs></transition><transition><lhs><state>14</state></lhs><rhs><state>6</state></rhs></transition><transition><lhs><state>14</state></lhs><rhs><state>5</state></rhs></transition><transition><lhs><state>14</state></lhs><rhs><state>38</state></rhs></transition><transition><lhs><state>14</state></lhs><rhs><state>7</state></rhs></transition><transition><lhs><state>421</state></lhs><rhs><state>274</state></rhs></transition><transition><lhs><state>63</state></lhs><rhs><state>105</state></rhs></transition><transition><lhs><state>12</state></lhs><rhs><state>43</state></rhs></transition><transition><lhs><state>12</state></lhs><rhs><state>56</state></rhs></transition><transition><lhs><state>169</state></lhs><rhs><state>147</state></rhs></transition><transition><lhs><state>140</state></lhs><rhs><state>424</state></rhs></transition><transition><lhs><state>100</state></lhs><rhs><state>135</state></rhs></transition><transition><lhs><state>217</state></lhs><rhs><state>148</state></rhs></transition><transition><lhs><state>113</state></lhs><rhs><state>183</state></rhs></transition><transition><lhs><state>113</state></lhs><rhs><state>363</state></rhs></transition><transition><lhs><state>42</state></lhs><rhs><state>5</state></rhs></transition><transition><lhs><state>64</state></lhs><rhs><state>92</state></rhs></transition><transition><lhs><state>64</state></lhs><rhs><state>129</state></rhs></transition><transition><lhs><state>189</state></lhs><rhs><state>420</state></rhs></transition><transition><lhs><state>434</state></lhs><rhs><state>298</state></rhs></transition><transition><lhs><state>115</state></lhs><rhs><state>59</state></rhs></transition><transition><lhs><state>115</state></lhs><rhs><state>60</state></rhs></transition><transition><lhs><state>115</state></lhs><rhs><state>169</state></rhs></transition><transition><lhs><state>250</state></lhs><rhs><state>149</state></rhs></transition><transition><lhs><state>68</state></lhs><rhs><state>57</state></rhs></transition><transition><lhs><state>215</state></lhs><rhs><state>306</state></rhs></transition><transition><lhs><state>340</state></lhs><rhs><state>307</state></rhs></transition><transition><lhs><state>142</state></lhs><rhs><state>295</state></rhs></transition><transition><lhs><state>489</state></lhs><rhs><state>428</state></rhs></transition><transition><lhs><state>375</state></lhs><rhs><state>210</state></rhs></transition><transition><lhs><state>375</state></lhs><rhs><state>265</state></rhs></transition><transition><lhs><state>144</state></lhs><rhs><state>240</state></rhs></transition><transition><lhs><state>70</state></lhs><rhs><state>57</state></rhs></transition><transition><lhs><state>191</state></lhs><rhs><state>339</state></rhs></transition><transition><lhs><state>156</state></lhs><rhs><state>95</state></rhs></transition><transition><lhs><state>156</state></lhs><rhs><state>108</state></rhs></transition><transition><lhs><state>513</state></lhs><rhs><state>482</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>279</state></lhs><rhs><state>280</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>394</state></lhs><rhs><state>395</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>440</state></lhs><rhs><state>441</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>371</state></lhs><rhs><state>372</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>429</state></lhs><rhs><state>430</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>392</state></lhs><rhs><state>393</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>372</state></lhs><rhs><state>373</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>301</state></lhs><rhs><state>302</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>300</state></lhs><rhs><state>301</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>270</state></lhs><rhs><state>271</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>374</state></lhs><rhs><state>375</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>430</state></lhs><rhs><state>431</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>271</state></lhs><rhs><state>272</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>303</state></lhs><rhs><state>304</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>280</state></lhs><rhs><state>281</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>477</state></lhs><rhs><state>478</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>373</state></lhs><rhs><state>374</state></rhs></transition><transition><lhs><name>b</name><height>4</height><state>267</state></lhs><rhs><st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e><height>3</height><state>155</state></lhs><rhs><state>156</state></rhs></transition><transition><lhs><name>b</name><height>3</height><state>151</state></lhs><rhs><state>152</state></rhs></transition><transition><lhs><name>b</name><height>3</height><state>248</state></lhs><rhs><state>249</state></rhs></transition><transition><lhs><name>b</name><height>3</height><state>214</state></lhs><rhs><state>215</state></rhs></transition><transition><lhs><name>b</name><height>3</height><state>249</state></lhs><rhs><state>250</state></rhs></transition><transition><lhs><name>b</name><height>3</height><state>192</state></lhs><rhs><state>193</state></rhs></transition><transition><lhs><name>b</name><height>3</height><state>245</state></lhs><rhs><state>246</state></rhs></transition><transition><lhs><name>b</name><height>3</height><state>141</state></lhs><rhs><state>142</state></rhs></transition><transition><lhs><name>b</name><height>3</height><state>238</state></lhs><rhs><state>239</state></rhs></transition><transition><lhs><name>b</name><height>3</height><state>140</state></lhs><rhs><state>141</state></rhs></transition><transition><lhs><name>b</name><height>3</height><state>216</state></lhs><rhs><state>217</state></rhs></transition><transition><lhs><name>b</name><height>3</height><state>111</state></lhs><rhs><state>112</state></rhs></transition><transition><lhs><name>b</name><height>3</height><state>112</state></lhs><rhs><state>113</state></rhs></transition><transition><lhs><name>b</name><height>3</height><state>143</state></lhs><rhs><state>144</state></rhs></transition><transition><lhs><name>b</name><height>3</height><state>154</state></lhs><rhs><state>155</state></rhs></transition><transition><lhs><name>b</name><height>3</height><state>142</state></lhs><rhs><state>143</state></rhs></transition><transition><lhs><name>b</name><height>3</height><state>212</state></lhs><rhs><state>213</state></rhs></transition><transition><lhs><name>b</name><height>3</height><state>188</state></lhs><rhs><state>189</state></rhs></transition><transition><lhs><name>b</name><height>3</height><state>190</state></lhs><rhs><state>191</state></rhs></transition><transition><lhs><name>b</name><height>3</height><state>144</state></lhs><rhs><state>145</state></rhs></transition><transition><lhs><name>b</name><height>3</height><state>153</state></lhs><rhs><state>154</state></rhs></transition><transition><lhs><name>a</name><height>0</height><state>1</state></lhs><rhs><state>1</state></rhs></transition><transition><lhs><name>a</name><height>0</height><state>2</state></lhs><rhs><state>1</state></rhs></transition><transition><lhs><name>b</name><height>2</height><state>64</state></lhs><rhs><state>65</state></rhs></transition><transition><lhs><name>b</name><height>2</height><state>97</state></lhs><rhs><state>98</state></rhs></transition><transition><lhs><name>b</name><height>2</height><state>101</state></lhs><rhs><state>102</state></rhs></transition><transition><lhs><name>b</name><height>2</height><state>100</state></lhs><rhs><state>101</state></rhs></transition><transition><lhs><name>b</name><height>2</height><state>99</state></lhs><rhs><state>100</state></rhs></transition><transition><lhs><name>b</name><height>2</height><state>63</state></lhs><rhs><state>64</state></rhs></transition><transition><lhs><name>b</name><height>2</height><state>98</state></lhs><rhs><state>99</state></rhs></transition><transition><lhs><name>b</name><height>2</height><state>61</state></lhs><rhs><state>62</state></rhs></transition><transition><lhs><name>b</name><height>2</height><state>65</state></lhs><rhs><state>66</state></rhs></transition><transition><lhs><name>b</name><height>2</height><state>62</state></lhs><rhs><state>63</state></rhs></transition></transitions></treeAutomaton><criterion><compatibility/></criterion></bounds></trsTerminationProof></proof><origin><proofOrigin><tool><name>ttt2</name><version>ttt2 1.20 [hg: unknown]</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 || wpo -msum -ib 3 -ob 4 -cpf || fail)[5]*);((dp;(edg -gtcap -nl[1.0]?;(sccs | ((sc || sc -rec -defs || sc -mulex -defs) || sct || {ur?;( (wpo -cpf -dp -ur -sum -ib 3 -ob 3 [3] | wpo -cpf -dp -ur -pol -ib 3 -ob 3 [3] | wpo -cpf -dp -ur -max -ib 3 -ob 3 [3] | wpo -cpf -dp -ur -msum -ib 3 -ob 3 [4] | wpo -cpf -dp -ur -mat -dim 2 -ib 3 -ob 3 [5] | wpo -cpf -dp -ur -mat -dim 3 -ib 3 -ob 3 [5] | wpo -cpf -dp -ur -ib 3 -ob 3 [9] | fail ) || 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 || wpo -msum -ib 3 -ob 4 -cpf || fail)[5]*);((dp;(edg -gtcap -nl[1.0]?;(sccs | ((sc || sc -rec -defs || sc -mulex -defs) || sct || {ur?;( (wpo -cpf -dp -ur -sum -ib 3 -ob 3 [3] | wpo -cpf -dp -ur -pol -ib 3 -ob 3 [3] | wpo -cpf -dp -ur -max -ib 3 -ob 3 [3] | wpo -cpf -dp -ur -msum -ib 3 -ob 3 [4] | wpo -cpf -dp -ur -mat -dim 2 -ib 3 -ob 3 [5] | wpo -cpf -dp -ur -mat -dim 3 -ib 3 -ob 3 [5] | wpo -cpf -dp -ur -ib 3 -ob 3 [9] | fail ) || 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 || wpo -msum -ib 3 -ob 4 -cpf || fail)[5]*);((dp;(edg -gtcap -nl[1.0]?;(sccs | ((sc || sc -rec -defs || sc -mulex -defs) || sct || {ur?;( (wpo -cpf -dp -ur -sum -ib 3 -ob 3 [3] | wpo -cpf -dp -ur -pol -ib 3 -ob 3 [3] | wpo -cpf -dp -ur -max -ib 3 -ob 3 [3] | wpo -cpf -dp -ur -msum -ib 3 -ob 3 [4] | wpo -cpf -dp -ur -mat -dim 2 -ib 3 -ob 3 [5] | wpo -cpf -dp -ur -mat -dim 3 -ib 3 -ob 3 [5] | wpo -cpf -dp -ur -ib 3 -ob 3 [9] | fail ) || 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 || wpo -msum -ib 3 -ob 4 -cpf || fail)[5]*);((dp;(edg -gtcap -nl[1.0]?;(sccs | ((sc || sc -rec -defs || sc -mulex -defs) || sct || {ur?;( (wpo -cpf -dp -ur -sum -ib 3 -ob 3 [3] | wpo -cpf -dp -ur -pol -ib 3 -ob 3 [3] | wpo -cpf -dp -ur -max -ib 3 -ob 3 [3] | wpo -cpf -dp -ur -msum -ib 3 -ob 3 [4] | wpo -cpf -dp -ur -mat -dim 2 -ib 3 -ob 3 [5] | wpo -cpf -dp -ur -mat -dim 3 -ib 3 -ob 3 [5] | wpo -cpf -dp -ur -ib 3 -ob 3 [9] | fail ) || 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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