YES(?,O(n^1)) 1107.48/297.09 YES(?,O(n^1)) 1107.48/297.09 1107.48/297.09 We are left with following problem, upon which TcT provides the 1107.48/297.09 certificate YES(?,O(n^1)). 1107.48/297.09 1107.48/297.09 Strict Trs: 1107.48/297.09 { 0(0(4(3(4(4(1(5(3(0(2(5(5(3(x1)))))))))))))) -> 1107.48/297.09 0(1(4(1(4(2(2(5(5(1(0(4(3(x1))))))))))))) 1107.48/297.09 , 0(1(0(4(0(x1))))) -> 0(3(5(0(0(x1))))) 1107.48/297.09 , 0(1(1(2(x1)))) -> 0(1(1(x1))) 1107.48/297.09 , 1(1(0(4(0(x1))))) -> 1(1(5(0(0(x1))))) 1107.48/297.09 , 1(2(1(4(4(3(4(5(2(0(1(0(4(3(3(5(x1)))))))))))))))) -> 1107.48/297.09 1(5(2(2(2(2(5(2(5(1(4(3(1(5(2(5(3(x1))))))))))))))))) 1107.48/297.09 , 1(4(1(4(4(1(2(4(3(5(x1)))))))))) -> 1(0(2(5(1(1(4(3(3(x1))))))))) 1107.48/297.09 , 2(0(4(2(5(1(5(0(0(1(0(5(5(3(x1)))))))))))))) -> 1107.48/297.09 2(5(4(3(5(4(3(5(1(4(1(2(3(x1))))))))))))) 1107.48/297.09 , 2(0(4(4(2(3(2(1(1(5(3(1(x1)))))))))))) -> 1107.48/297.09 2(2(0(1(0(5(5(0(2(0(3(2(2(1(x1)))))))))))))) 1107.48/297.09 , 2(3(3(0(4(2(5(0(x1)))))))) -> 2(4(4(5(4(4(0(0(x1)))))))) 1107.48/297.09 , 2(5(5(5(1(3(5(5(2(1(5(2(0(0(4(x1))))))))))))))) -> 1107.48/297.09 0(5(3(3(5(2(2(0(5(2(5(3(2(2(5(4(x1)))))))))))))))) 1107.48/297.09 , 3(0(0(3(3(5(3(0(1(1(2(5(2(3(0(5(x1)))))))))))))))) -> 1107.48/297.09 3(3(5(5(1(0(2(4(0(0(2(0(3(3(2(2(4(x1))))))))))))))))) 1107.48/297.09 , 3(0(5(3(3(1(2(5(2(4(2(0(0(2(4(5(x1)))))))))))))))) -> 1107.48/297.09 1(2(5(5(4(0(5(2(3(3(2(5(2(0(5(5(x1)))))))))))))))) 1107.48/297.09 , 3(0(5(5(1(5(5(2(2(0(1(0(0(0(3(5(4(5(x1)))))))))))))))))) -> 1107.48/297.09 1(1(5(5(2(0(0(4(2(2(2(4(1(5(0(2(4(x1))))))))))))))))) 1107.48/297.09 , 3(1(3(2(4(3(2(3(0(3(2(5(5(x1))))))))))))) -> 1107.48/297.09 3(4(0(4(4(3(5(4(0(2(2(1(5(x1))))))))))))) 1107.48/297.09 , 3(1(4(1(0(1(4(2(2(1(0(2(2(5(5(1(x1)))))))))))))))) -> 1107.48/297.09 5(3(4(5(0(1(5(0(3(3(3(5(4(1(1(x1))))))))))))))) 1107.48/297.09 , 3(4(2(2(x1)))) -> 3(3(2(x1))) 1107.48/297.09 , 4(0(2(4(5(3(x1)))))) -> 4(2(1(0(3(x1))))) 1107.48/297.09 , 4(1(2(4(0(4(3(5(4(2(3(0(3(3(3(5(1(2(x1)))))))))))))))))) -> 1107.48/297.09 4(3(4(5(3(0(0(4(5(1(3(3(2(4(2(2(1(x1))))))))))))))))) 1107.48/297.09 , 4(2(4(5(5(3(2(2(1(5(5(5(3(5(1(1(0(5(2(x1))))))))))))))))))) -> 1107.48/297.09 4(5(5(3(5(4(4(4(2(4(1(5(1(1(1(2(0(4(x1)))))))))))))))))) 1107.48/297.09 , 4(4(1(5(1(5(1(3(5(1(4(5(0(4(0(5(2(x1))))))))))))))))) -> 1107.48/297.09 3(5(1(5(5(3(4(2(4(5(3(3(0(5(3(4(0(x1))))))))))))))))) 1107.48/297.09 , 4(4(1(5(4(0(3(0(x1)))))))) -> 4(0(4(4(5(3(3(2(x1)))))))) 1107.48/297.09 , 4(4(4(4(4(1(5(2(0(1(5(3(2(1(2(x1))))))))))))))) -> 1107.48/297.09 4(3(2(2(4(1(0(1(0(0(5(3(4(0(5(x1))))))))))))))) 1107.48/297.09 , 4(5(2(3(2(3(1(0(x1)))))))) -> 4(5(1(2(3(0(5(0(x1)))))))) 1107.48/297.09 , 4(5(3(1(2(3(5(1(0(2(4(0(5(1(1(5(4(5(x1)))))))))))))))))) -> 1107.48/297.09 4(3(5(5(0(3(5(5(5(0(4(2(0(3(0(3(2(0(0(x1))))))))))))))))))) 1107.48/297.09 , 5(0(5(1(0(4(x1)))))) -> 3(5(4(2(4(0(x1)))))) 1107.48/297.09 , 5(2(0(1(2(3(1(4(3(4(5(0(x1)))))))))))) -> 1107.48/297.09 1(2(1(3(3(2(5(2(5(2(0(x1))))))))))) 1107.48/297.09 , 5(3(2(2(4(5(3(2(1(4(4(4(4(4(4(4(4(4(1(2(x1)))))))))))))))))))) -> 1107.48/297.09 3(1(2(0(3(1(5(2(4(3(0(1(1(1(3(5(2(x1))))))))))))))))) 1107.48/297.09 , 5(3(4(1(4(1(4(0(4(3(4(4(0(4(5(3(4(5(x1)))))))))))))))))) -> 1107.48/297.09 5(0(3(0(2(3(3(1(5(4(3(1(3(1(2(4(1(x1))))))))))))))))) 1107.48/297.09 , 5(4(0(1(2(1(4(1(5(5(0(4(4(5(4(5(1(3(4(5(4(x1))))))))))))))))))))) 1107.48/297.09 -> 3(0(3(2(2(5(3(1(5(2(2(2(3(1(1(3(1(0(3(4(x1)))))))))))))))))))) 1107.48/297.09 , 5(4(5(0(4(5(5(1(2(0(3(0(0(2(1(2(5(0(5(x1))))))))))))))))))) -> 1107.48/297.09 0(4(1(0(4(4(5(1(4(0(3(5(1(5(2(0(x1)))))))))))))))) } 1107.48/297.09 Obligation: 1107.48/297.09 derivational complexity 1107.48/297.09 Answer: 1107.48/297.09 YES(?,O(n^1)) 1107.48/297.09 1107.48/297.09 The problem is match-bounded by 2. The enriched problem is 1107.48/297.09 compatible with the following automaton. 1107.48/297.09 { 0_0(1) -> 1 1107.48/297.09 , 0_1(1) -> 16 1107.48/297.09 , 0_1(2) -> 1 1107.48/297.09 , 0_1(2) -> 15 1107.48/297.09 , 0_1(2) -> 16 1107.48/297.09 , 0_1(2) -> 75 1107.48/297.09 , 0_1(2) -> 76 1107.48/297.09 , 0_1(2) -> 79 1107.48/297.09 , 0_1(2) -> 106 1107.48/297.09 , 0_1(12) -> 11 1107.48/297.09 , 0_1(13) -> 153 1107.48/297.09 , 0_1(14) -> 238 1107.48/297.09 , 0_1(16) -> 15 1107.48/297.09 , 0_1(31) -> 192 1107.48/297.09 , 0_1(32) -> 17 1107.48/297.09 , 0_1(38) -> 16 1107.48/297.09 , 0_1(50) -> 49 1107.48/297.09 , 0_1(52) -> 51 1107.48/297.09 , 0_1(55) -> 54 1107.48/297.09 , 0_1(57) -> 56 1107.48/297.09 , 0_1(64) -> 16 1107.48/297.09 , 0_1(70) -> 69 1107.48/297.09 , 0_1(77) -> 180 1107.48/297.09 , 0_1(83) -> 82 1107.48/297.09 , 0_1(86) -> 85 1107.48/297.09 , 0_1(87) -> 86 1107.48/297.09 , 0_1(89) -> 88 1107.48/297.09 , 0_1(92) -> 117 1107.48/297.09 , 0_1(97) -> 96 1107.48/297.09 , 0_1(105) -> 104 1107.48/297.09 , 0_1(106) -> 235 1107.48/297.09 , 0_1(109) -> 108 1107.48/297.09 , 0_1(110) -> 109 1107.48/297.09 , 0_1(130) -> 129 1107.48/297.09 , 0_1(136) -> 135 1107.48/297.09 , 0_1(139) -> 153 1107.48/297.09 , 0_1(143) -> 142 1107.48/297.09 , 0_1(146) -> 145 1107.48/297.09 , 0_1(150) -> 38 1107.48/297.09 , 0_1(151) -> 16 1107.48/297.09 , 0_1(153) -> 15 1107.48/297.09 , 0_1(158) -> 157 1107.48/297.09 , 0_1(159) -> 158 1107.48/297.09 , 0_1(166) -> 16 1107.48/297.09 , 0_1(193) -> 192 1107.48/297.09 , 0_1(223) -> 151 1107.48/297.09 , 0_1(229) -> 228 1107.48/297.09 , 0_1(231) -> 230 1107.48/297.09 , 0_1(232) -> 231 1107.48/297.09 , 0_1(241) -> 240 1107.48/297.09 , 0_1(246) -> 245 1107.48/297.09 , 0_1(249) -> 248 1107.48/297.09 , 0_1(251) -> 250 1107.48/297.09 , 0_1(268) -> 93 1107.48/297.09 , 0_1(279) -> 278 1107.48/297.09 , 0_1(280) -> 1 1107.48/297.09 , 0_1(280) -> 16 1107.48/297.09 , 0_1(317) -> 139 1107.48/297.09 , 0_1(319) -> 318 1107.48/297.09 , 0_1(331) -> 13 1107.48/297.09 , 0_1(351) -> 350 1107.48/297.09 , 0_1(382) -> 16 1107.48/297.09 , 0_1(384) -> 383 1107.48/297.09 , 0_1(390) -> 389 1107.48/297.09 , 0_1(402) -> 1 1107.48/297.09 , 0_2(402) -> 1 1107.48/297.09 , 0_2(402) -> 15 1107.48/297.09 , 0_2(402) -> 16 1107.48/297.09 , 0_2(402) -> 75 1107.48/297.09 , 0_2(402) -> 76 1107.48/297.09 , 0_2(402) -> 79 1107.48/297.09 , 0_2(402) -> 106 1107.48/297.09 , 1_0(1) -> 1 1107.48/297.09 , 1_1(1) -> 3 1107.48/297.09 , 1_1(2) -> 281 1107.48/297.09 , 1_1(3) -> 2 1107.48/297.09 , 1_1(5) -> 4 1107.48/297.09 , 1_1(11) -> 10 1107.48/297.09 , 1_1(14) -> 17 1107.48/297.09 , 1_1(17) -> 1 1107.48/297.09 , 1_1(17) -> 2 1107.48/297.09 , 1_1(17) -> 3 1107.48/297.09 , 1_1(17) -> 13 1107.48/297.09 , 1_1(17) -> 106 1107.48/297.09 , 1_1(17) -> 191 1107.48/297.09 , 1_1(17) -> 237 1107.48/297.09 , 1_1(17) -> 265 1107.48/297.09 , 1_1(17) -> 283 1107.48/297.09 , 1_1(26) -> 25 1107.48/297.09 , 1_1(29) -> 28 1107.48/297.09 , 1_1(31) -> 281 1107.48/297.09 , 1_1(35) -> 34 1107.48/297.09 , 1_1(36) -> 35 1107.48/297.09 , 1_1(38) -> 3 1107.48/297.09 , 1_1(46) -> 45 1107.48/297.09 , 1_1(48) -> 47 1107.48/297.09 , 1_1(51) -> 50 1107.48/297.09 , 1_1(82) -> 81 1107.48/297.09 , 1_1(93) -> 3 1107.48/297.09 , 1_1(106) -> 138 1107.48/297.09 , 1_1(116) -> 115 1107.48/297.09 , 1_1(139) -> 3 1107.48/297.09 , 1_1(142) -> 3 1107.48/297.09 , 1_1(144) -> 143 1107.48/297.09 , 1_1(153) -> 152 1107.48/297.09 , 1_1(162) -> 161 1107.48/297.09 , 1_1(166) -> 3 1107.48/297.09 , 1_1(175) -> 174 1107.48/297.09 , 1_1(177) -> 176 1107.48/297.09 , 1_1(178) -> 177 1107.48/297.09 , 1_1(179) -> 178 1107.48/297.09 , 1_1(181) -> 139 1107.48/297.09 , 1_1(228) -> 227 1107.48/297.09 , 1_1(230) -> 229 1107.48/297.09 , 1_1(236) -> 166 1107.48/297.09 , 1_1(260) -> 93 1107.48/297.09 , 1_1(265) -> 392 1107.48/297.09 , 1_1(272) -> 271 1107.48/297.09 , 1_1(279) -> 2 1107.48/297.09 , 1_1(280) -> 279 1107.48/297.09 , 1_1(281) -> 280 1107.48/297.09 , 1_1(282) -> 281 1107.48/297.09 , 1_1(323) -> 322 1107.48/297.09 , 1_1(327) -> 326 1107.48/297.09 , 1_1(329) -> 328 1107.48/297.09 , 1_1(331) -> 3 1107.48/297.09 , 1_1(341) -> 340 1107.48/297.09 , 1_1(347) -> 346 1107.48/297.09 , 1_1(348) -> 347 1107.48/297.09 , 1_1(350) -> 349 1107.48/297.09 , 1_1(383) -> 382 1107.48/297.09 , 1_1(388) -> 387 1107.48/297.09 , 1_1(402) -> 3 1107.48/297.09 , 1_2(2) -> 403 1107.48/297.09 , 1_2(38) -> 403 1107.48/297.09 , 1_2(49) -> 403 1107.48/297.09 , 1_2(93) -> 403 1107.48/297.09 , 1_2(280) -> 403 1107.48/297.09 , 1_2(331) -> 403 1107.48/297.09 , 1_2(402) -> 403 1107.48/297.09 , 1_2(403) -> 402 1107.48/297.09 , 2_0(1) -> 1 1107.48/297.09 , 2_1(1) -> 79 1107.48/297.09 , 2_1(2) -> 1 1107.48/297.09 , 2_1(3) -> 59 1107.48/297.09 , 2_1(7) -> 6 1107.48/297.09 , 2_1(8) -> 7 1107.48/297.09 , 2_1(12) -> 92 1107.48/297.09 , 2_1(13) -> 48 1107.48/297.09 , 2_1(15) -> 252 1107.48/297.09 , 2_1(16) -> 266 1107.48/297.09 , 2_1(19) -> 18 1107.48/297.09 , 2_1(20) -> 19 1107.48/297.09 , 2_1(21) -> 20 1107.48/297.09 , 2_1(22) -> 21 1107.48/297.09 , 2_1(24) -> 23 1107.48/297.09 , 2_1(31) -> 30 1107.48/297.09 , 2_1(33) -> 32 1107.48/297.09 , 2_1(38) -> 1 1107.48/297.09 , 2_1(38) -> 48 1107.48/297.09 , 2_1(38) -> 75 1107.48/297.09 , 2_1(38) -> 79 1107.48/297.09 , 2_1(38) -> 92 1107.48/297.09 , 2_1(38) -> 179 1107.48/297.09 , 2_1(38) -> 266 1107.48/297.09 , 2_1(48) -> 58 1107.48/297.09 , 2_1(49) -> 38 1107.48/297.09 , 2_1(56) -> 55 1107.48/297.09 , 2_1(59) -> 58 1107.48/297.09 , 2_1(68) -> 67 1107.48/297.09 , 2_1(69) -> 68 1107.48/297.09 , 2_1(72) -> 71 1107.48/297.09 , 2_1(75) -> 74 1107.48/297.09 , 2_1(76) -> 75 1107.48/297.09 , 2_1(77) -> 92 1107.48/297.09 , 2_1(81) -> 59 1107.48/297.09 , 2_1(84) -> 83 1107.48/297.09 , 2_1(88) -> 87 1107.48/297.09 , 2_1(92) -> 91 1107.48/297.09 , 2_1(93) -> 17 1107.48/297.09 , 2_1(99) -> 98 1107.48/297.09 , 2_1(102) -> 101 1107.48/297.09 , 2_1(104) -> 103 1107.48/297.09 , 2_1(106) -> 75 1107.48/297.09 , 2_1(108) -> 107 1107.48/297.09 , 2_1(112) -> 111 1107.48/297.09 , 2_1(113) -> 112 1107.48/297.09 , 2_1(114) -> 113 1107.48/297.09 , 2_1(137) -> 136 1107.48/297.09 , 2_1(138) -> 137 1107.48/297.09 , 2_1(139) -> 48 1107.48/297.09 , 2_1(152) -> 151 1107.48/297.09 , 2_1(153) -> 266 1107.48/297.09 , 2_1(165) -> 164 1107.48/297.09 , 2_1(173) -> 172 1107.48/297.09 , 2_1(180) -> 179 1107.48/297.09 , 2_1(188) -> 187 1107.48/297.09 , 2_1(195) -> 253 1107.48/297.09 , 2_1(225) -> 154 1107.48/297.09 , 2_1(226) -> 225 1107.48/297.09 , 2_1(237) -> 236 1107.48/297.09 , 2_1(248) -> 247 1107.48/297.09 , 2_1(263) -> 262 1107.48/297.09 , 2_1(265) -> 264 1107.48/297.09 , 2_1(276) -> 275 1107.48/297.09 , 2_1(279) -> 48 1107.48/297.09 , 2_1(280) -> 1 1107.48/297.09 , 2_1(281) -> 59 1107.48/297.09 , 2_1(283) -> 264 1107.48/297.09 , 2_1(320) -> 319 1107.48/297.09 , 2_1(330) -> 329 1107.48/297.09 , 2_1(331) -> 1 1107.48/297.09 , 2_1(334) -> 333 1107.48/297.09 , 2_1(335) -> 334 1107.48/297.09 , 2_1(343) -> 342 1107.48/297.09 , 2_1(344) -> 343 1107.48/297.09 , 2_1(345) -> 344 1107.48/297.09 , 2_1(402) -> 1 1107.48/297.09 , 2_2(49) -> 553 1107.48/297.09 , 3_0(1) -> 1 1107.48/297.09 , 3_1(1) -> 13 1107.48/297.09 , 3_1(12) -> 194 1107.48/297.09 , 3_1(13) -> 1 1107.48/297.09 , 3_1(13) -> 13 1107.48/297.09 , 3_1(13) -> 14 1107.48/297.09 , 3_1(13) -> 37 1107.48/297.09 , 3_1(13) -> 76 1107.48/297.09 , 3_1(13) -> 77 1107.48/297.09 , 3_1(13) -> 106 1107.48/297.09 , 3_1(13) -> 351 1107.48/297.09 , 3_1(14) -> 2 1107.48/297.09 , 3_1(28) -> 27 1107.48/297.09 , 3_1(38) -> 13 1107.48/297.09 , 3_1(39) -> 13 1107.48/297.09 , 3_1(41) -> 40 1107.48/297.09 , 3_1(44) -> 43 1107.48/297.09 , 3_1(58) -> 57 1107.48/297.09 , 3_1(65) -> 64 1107.48/297.09 , 3_1(66) -> 65 1107.48/297.09 , 3_1(74) -> 73 1107.48/297.09 , 3_1(77) -> 351 1107.48/297.09 , 3_1(78) -> 1 1107.48/297.09 , 3_1(78) -> 13 1107.48/297.09 , 3_1(78) -> 351 1107.48/297.09 , 3_1(79) -> 78 1107.48/297.09 , 3_1(80) -> 13 1107.48/297.09 , 3_1(81) -> 13 1107.48/297.09 , 3_1(90) -> 89 1107.48/297.09 , 3_1(91) -> 90 1107.48/297.09 , 3_1(100) -> 99 1107.48/297.09 , 3_1(101) -> 100 1107.48/297.09 , 3_1(106) -> 31 1107.48/297.09 , 3_1(133) -> 132 1107.48/297.09 , 3_1(139) -> 351 1107.48/297.09 , 3_1(140) -> 139 1107.48/297.09 , 3_1(147) -> 146 1107.48/297.09 , 3_1(148) -> 147 1107.48/297.09 , 3_1(149) -> 148 1107.48/297.09 , 3_1(154) -> 151 1107.48/297.09 , 3_1(157) -> 156 1107.48/297.09 , 3_1(163) -> 162 1107.48/297.09 , 3_1(164) -> 163 1107.48/297.09 , 3_1(168) -> 167 1107.48/297.09 , 3_1(186) -> 185 1107.48/297.09 , 3_1(191) -> 190 1107.48/297.09 , 3_1(192) -> 191 1107.48/297.09 , 3_1(195) -> 194 1107.48/297.09 , 3_1(234) -> 233 1107.48/297.09 , 3_1(235) -> 237 1107.48/297.09 , 3_1(238) -> 237 1107.48/297.09 , 3_1(239) -> 13 1107.48/297.09 , 3_1(240) -> 13 1107.48/297.09 , 3_1(242) -> 241 1107.48/297.09 , 3_1(250) -> 249 1107.48/297.09 , 3_1(252) -> 251 1107.48/297.09 , 3_1(261) -> 260 1107.48/297.09 , 3_1(262) -> 261 1107.48/297.09 , 3_1(271) -> 268 1107.48/297.09 , 3_1(278) -> 277 1107.48/297.09 , 3_1(283) -> 282 1107.48/297.09 , 3_1(318) -> 317 1107.48/297.09 , 3_1(321) -> 320 1107.48/297.09 , 3_1(322) -> 321 1107.48/297.09 , 3_1(326) -> 325 1107.48/297.09 , 3_1(328) -> 327 1107.48/297.09 , 3_1(333) -> 331 1107.48/297.09 , 3_1(340) -> 339 1107.48/297.09 , 3_1(346) -> 345 1107.48/297.09 , 3_1(349) -> 348 1107.48/297.09 , 3_1(351) -> 37 1107.48/297.09 , 3_1(391) -> 390 1107.48/297.09 , 3_2(552) -> 351 1107.48/297.09 , 3_2(553) -> 552 1107.48/297.09 , 4_0(1) -> 1 1107.48/297.09 , 4_1(1) -> 77 1107.48/297.09 , 4_1(2) -> 150 1107.48/297.09 , 4_1(3) -> 330 1107.48/297.09 , 4_1(4) -> 3 1107.48/297.09 , 4_1(6) -> 5 1107.48/297.09 , 4_1(13) -> 12 1107.48/297.09 , 4_1(15) -> 63 1107.48/297.09 , 4_1(16) -> 195 1107.48/297.09 , 4_1(27) -> 26 1107.48/297.09 , 4_1(37) -> 36 1107.48/297.09 , 4_1(38) -> 77 1107.48/297.09 , 4_1(40) -> 39 1107.48/297.09 , 4_1(43) -> 42 1107.48/297.09 , 4_1(47) -> 46 1107.48/297.09 , 4_1(58) -> 165 1107.48/297.09 , 4_1(60) -> 38 1107.48/297.09 , 4_1(61) -> 60 1107.48/297.09 , 4_1(63) -> 62 1107.48/297.09 , 4_1(64) -> 77 1107.48/297.09 , 4_1(85) -> 84 1107.48/297.09 , 4_1(96) -> 95 1107.48/297.09 , 4_1(106) -> 224 1107.48/297.09 , 4_1(111) -> 110 1107.48/297.09 , 4_1(115) -> 114 1107.48/297.09 , 4_1(129) -> 78 1107.48/297.09 , 4_1(131) -> 130 1107.48/297.09 , 4_1(132) -> 131 1107.48/297.09 , 4_1(135) -> 134 1107.48/297.09 , 4_1(139) -> 12 1107.48/297.09 , 4_1(141) -> 140 1107.48/297.09 , 4_1(151) -> 1 1107.48/297.09 , 4_1(151) -> 77 1107.48/297.09 , 4_1(151) -> 195 1107.48/297.09 , 4_1(151) -> 224 1107.48/297.09 , 4_1(151) -> 330 1107.48/297.09 , 4_1(153) -> 63 1107.48/297.09 , 4_1(155) -> 154 1107.48/297.09 , 4_1(160) -> 159 1107.48/297.09 , 4_1(166) -> 12 1107.48/297.09 , 4_1(170) -> 169 1107.48/297.09 , 4_1(171) -> 170 1107.48/297.09 , 4_1(172) -> 171 1107.48/297.09 , 4_1(174) -> 173 1107.48/297.09 , 4_1(187) -> 186 1107.48/297.09 , 4_1(189) -> 188 1107.48/297.09 , 4_1(195) -> 62 1107.48/297.09 , 4_1(224) -> 223 1107.48/297.09 , 4_1(227) -> 226 1107.48/297.09 , 4_1(235) -> 234 1107.48/297.09 , 4_1(247) -> 246 1107.48/297.09 , 4_1(253) -> 139 1107.48/297.09 , 4_1(277) -> 276 1107.48/297.09 , 4_1(280) -> 77 1107.48/297.09 , 4_1(325) -> 324 1107.48/297.09 , 4_1(331) -> 77 1107.48/297.09 , 4_1(382) -> 2 1107.48/297.09 , 4_1(385) -> 384 1107.48/297.09 , 4_1(386) -> 385 1107.48/297.09 , 4_1(389) -> 388 1107.48/297.09 , 4_1(402) -> 77 1107.48/297.09 , 5_0(1) -> 1 1107.48/297.09 , 5_1(1) -> 106 1107.48/297.09 , 5_1(2) -> 106 1107.48/297.09 , 5_1(9) -> 8 1107.48/297.09 , 5_1(10) -> 9 1107.48/297.09 , 5_1(13) -> 31 1107.48/297.09 , 5_1(15) -> 14 1107.48/297.09 , 5_1(16) -> 14 1107.48/297.09 , 5_1(17) -> 14 1107.48/297.09 , 5_1(18) -> 17 1107.48/297.09 , 5_1(23) -> 22 1107.48/297.09 , 5_1(25) -> 24 1107.48/297.09 , 5_1(30) -> 29 1107.48/297.09 , 5_1(34) -> 33 1107.48/297.09 , 5_1(38) -> 106 1107.48/297.09 , 5_1(39) -> 38 1107.48/297.09 , 5_1(42) -> 41 1107.48/297.09 , 5_1(45) -> 44 1107.48/297.09 , 5_1(48) -> 265 1107.48/297.09 , 5_1(53) -> 52 1107.48/297.09 , 5_1(54) -> 53 1107.48/297.09 , 5_1(62) -> 61 1107.48/297.09 , 5_1(64) -> 2 1107.48/297.09 , 5_1(67) -> 66 1107.48/297.09 , 5_1(71) -> 70 1107.48/297.09 , 5_1(73) -> 72 1107.48/297.09 , 5_1(77) -> 76 1107.48/297.09 , 5_1(79) -> 283 1107.48/297.09 , 5_1(80) -> 79 1107.48/297.09 , 5_1(81) -> 80 1107.48/297.09 , 5_1(93) -> 106 1107.48/297.09 , 5_1(94) -> 93 1107.48/297.09 , 5_1(95) -> 94 1107.48/297.09 , 5_1(98) -> 97 1107.48/297.09 , 5_1(103) -> 102 1107.48/297.09 , 5_1(106) -> 105 1107.48/297.09 , 5_1(107) -> 15 1107.48/297.09 , 5_1(117) -> 116 1107.48/297.09 , 5_1(134) -> 133 1107.48/297.09 , 5_1(139) -> 1 1107.48/297.09 , 5_1(139) -> 13 1107.48/297.09 , 5_1(139) -> 31 1107.48/297.09 , 5_1(139) -> 106 1107.48/297.09 , 5_1(142) -> 141 1107.48/297.09 , 5_1(145) -> 144 1107.48/297.09 , 5_1(150) -> 149 1107.48/297.09 , 5_1(151) -> 105 1107.48/297.09 , 5_1(156) -> 155 1107.48/297.09 , 5_1(161) -> 160 1107.48/297.09 , 5_1(166) -> 151 1107.48/297.09 , 5_1(167) -> 166 1107.48/297.09 , 5_1(169) -> 168 1107.48/297.09 , 5_1(176) -> 175 1107.48/297.09 , 5_1(184) -> 181 1107.48/297.09 , 5_1(185) -> 184 1107.48/297.09 , 5_1(190) -> 189 1107.48/297.09 , 5_1(194) -> 193 1107.48/297.09 , 5_1(233) -> 232 1107.48/297.09 , 5_1(239) -> 154 1107.48/297.09 , 5_1(240) -> 239 1107.48/297.09 , 5_1(243) -> 242 1107.48/297.09 , 5_1(244) -> 243 1107.48/297.09 , 5_1(245) -> 244 1107.48/297.09 , 5_1(264) -> 263 1107.48/297.09 , 5_1(266) -> 265 1107.48/297.09 , 5_1(275) -> 272 1107.48/297.09 , 5_1(280) -> 106 1107.48/297.09 , 5_1(324) -> 323 1107.48/297.09 , 5_1(330) -> 149 1107.48/297.09 , 5_1(331) -> 106 1107.48/297.09 , 5_1(339) -> 335 1107.48/297.09 , 5_1(342) -> 341 1107.48/297.09 , 5_1(351) -> 31 1107.48/297.09 , 5_1(387) -> 386 1107.48/297.09 , 5_1(392) -> 391 1107.48/297.09 , 5_1(402) -> 106 } 1107.48/297.09 1107.48/297.09 Hurray, we answered YES(?,O(n^1)) 1108.30/297.63 EOF