Name | Mario/ Mario-t-hard-1_c18.xml |
MD5SUM | d0ad504447153d615b89b5c6990e2d3b |
Bench Category | COP (optimization problem) |
Best result obtained on this benchmark | OPT |
Best value of the objective obtained on this benchmark | 4783 |
Best CPU time to get the best result obtained on this benchmark | 4.54918 |
Satisfiable | |
(Un)Satisfiability was proved | |
Number of variables | 300 |
Number of constraints | 201 |
Number of domains | 164 |
Minimum domain size | 1 |
Maximum domain size | 100 |
Distribution of domain sizes | [{"size":1,"count":5},{"size":2,"count":95},{"size":85,"count":4},{"size":86,"count":2},{"size":87,"count":2},{"size":88,"count":6},{"size":89,"count":17},{"size":90,"count":16},{"size":91,"count":14},{"size":92,"count":12},{"size":93,"count":12},{"size":94,"count":9},{"size":95,"count":5},{"size":97,"count":1},{"size":100,"count":100}] |
Minimum variable degree | 1 |
Maximum variable degree | 3 |
Distribution of variable degrees | [{"degree":1,"count":2},{"degree":2,"count":199},{"degree":3,"count":99}] |
Minimum constraint arity | 1 |
Maximum constraint arity | 100 |
Distribution of constraint arities | [{"arity":1,"count":1},{"arity":2,"count":198},{"arity":100,"count":2}] |
Number of extensional constraints | 100 |
Number of intensional constraints | 99 |
Distribution of constraint types | [{"type":"extension","count":100},{"type":"intension","count":99},{"type":"sum","count":1},{"type":"circuit","count":1}] |
Optimization problem | YES |
Type of objective | max SUM |
This section presents information obtained from the best job displayed in the list (i.e. solvers whose names are not hidden).
objective function: 4783<instantiation> <list> s[0] s[1] s[2] s[3] s[4] s[5] s[6] s[7] s[8] s[9] s[10] s[11] s[12] s[13] s[14] s[15] s[16] s[17] s[18] s[19] s[20] s[21] s[22] s[23] s[24] s[25] s[26] s[27] s[28] s[29] s[30] s[31] s[32] s[33] s[34] s[35] s[36] s[37] s[38] s[39] s[40] s[41] s[42] s[43] s[44] s[45] s[46] s[47] s[48] s[49] s[50] s[51] s[52] s[53] s[54] s[55] s[56] s[57] s[58] s[59] s[60] s[61] s[62] s[63] s[64] s[65] s[66] s[67] s[68] s[69] s[70] s[71] s[72] s[73] s[74] s[75] s[76] s[77] s[78] s[79] s[80] s[81] s[82] s[83] s[84] s[85] s[86] s[87] s[88] s[89] s[90] s[91] s[92] s[93] s[94] s[95] s[96] s[97] s[98] s[99] f[0] f[1] f[2] f[3] f[4] f[5] f[6] f[7] f[8] f[9] f[10] f[11] f[12] f[13] f[14] f[15] f[16] f[17] f[18] f[19] f[20] f[21] f[22] f[23] f[24] f[25] f[26] f[27] f[28] f[29] f[30] f[31] f[32] f[33] f[34] f[35] f[36] f[37] f[38] f[39] f[40] f[41] f[42] f[43] f[44] f[45] f[46] f[47] f[48] f[49] f[50] f[51] f[52] f[53] f[54] f[55] f[56] f[57] f[58] f[59] f[60] f[61] f[62] f[63] f[64] f[65] f[66] f[67] f[68] f[69] f[70] f[71] f[72] f[73] f[74] f[75] f[76] f[77] f[78] f[79] f[80] f[81] f[82] f[83] f[84] f[85] f[86] f[87] f[88] f[89] f[90] f[91] f[92] f[93] f[94] f[95] f[96] f[97] f[98] f[99] g[0] g[1] g[2] g[3] g[4] g[5] g[6] g[7] g[8] g[9] g[10] g[11] g[12] g[13] g[14] g[15] g[16] g[17] g[18] g[19] g[20] g[21] g[22] g[23] g[24] g[25] g[26] g[27] g[28] g[29] g[30] g[31] g[32] g[33] g[34] g[35] g[36] g[37] g[38] g[39] g[40] g[41] g[42] g[43] g[44] g[45] g[46] g[47] g[48] g[49] g[50] g[51] g[52] g[53] g[54] g[55] g[56] g[57] g[58] g[59] g[60] g[61] g[62] g[63] g[64] g[65] g[66] g[67] g[68] g[69] g[70] g[71] g[72] g[73] g[74] g[75] g[76] g[77] g[78] g[79] g[80] g[81] g[82] g[83] g[84] g[85] g[86] g[87] g[88] g[89] g[90] g[91] g[92] g[93] g[94] g[95] g[96] g[97] g[98] g[99] </list> <values> 2 0 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 33 34 32 35 36 37 38 39 40 41 42 43 44 45 46 47 49 85 48 50 51 52 53 54 55 56 57 58 59 61 60 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 92 89 84 87 88 97 90 94 96 98 99 3 1 86 95 93 91 88 0 209 371 113 194 295 1 449 482 422 492 248 233 147 341 417 489 203 44 182 48 489 273 457 147 80 465 122 112 16 334 0 154 250 106 243 22 407 193 299 182 286 172 142 496 194 24 0 414 19 216 471 147 305 145 494 486 290 282 0 388 208 345 26 81 41 301 17 45 35 491 87 448 377 19 332 401 217 357 17 289 81 15 71 14 103 178 98 26 6 182 20 31 79 38 78 8 7 31 0 0 47 13 54 4 34 6 78 48 69 73 17 63 62 34 92 62 96 89 76 32 10 99 74 59 98 53 37 2 5 54 0 6 63 55 89 20 75 34 15 60 77 37 77 92 20 88 0 57 52 33 76 55 36 45 58 29 4 84 0 51 86 83 98 96 8 14 65 28 59 16 15 58 22 87 92 31 1 97 88 62 41 8 85 69 79 95 59 10 17 26 74 20 53 25 1 1 36 50 </values> </instantiation>