QPLIB_3697 LGQ minimize 200 # number of variables 82 # number of constraints 0.0 # default value for linear coefficients in objective 176 # number of non-default linear coefficients in objective 1 552.2811455 2 426.2362093 3 411.0274241 4 466.6886906 5 288.3172509 6 590.1824682 7 381.0178593 8 572.544284 9 433.1074247 10 429.2894698 11 722.101049 12 30.09526491 13 408.6637347 14 327.1449611 15 408.8725835 16 371.2296068 17 743.2318303 18 424.1233883 19 1012.594837 20 325.0680164 21 489.8292006 22 616.3923676 23 717.3761212 24 671.4970742 25 333.2430334 26 469.2124526 27 55.31015213 28 439.0785496 29 397.9546285 30 404.7544767 31 260.5831141 32 374.6617287 33 705.8651143 34 409.2607964 35 941.1215122 36 352.661317 37 478.410844 38 592.8643758 39 688.8045878 40 642.1370511 41 675.3749422 42 537.3279768 43 326.2703847 44 667.5877919 45 430.8792461 46 741.3173441 47 525.3778822 48 713.7345016 49 449.4782077 50 590.6560363 51 825.3576066 52 234.5461683 53 591.4620844 54 311.1093677 55 500.9341503 56 370.7914855 57 344.0583718 58 204.3797318 59 212.615335 60 304.0781437 61 160.0847371 62 363.6794674 63 273.136823 64 355.5638063 65 194.046191 66 99.00107151 67 250.5987256 68 67.66696052 69 88.24211481 70 169.700774 71 163.6184136 72 179.6224431 73 503.0683277 74 179.2012972 75 414.2853199 76 359.1348438 77 90.97384165 78 505.3344302 79 394.341605 80 504.1826737 81 232.7423651 82 707.6964709 83 710.4487763 84 250.5625148 85 650.2384406 86 77.11705727 87 312.63367 88 142.2694507 89 153.0227761 90 551.1479199 91 287.8310021 92 336.7829376 93 463.7015482 94 241.6111966 95 24.16392139 96 200.6438303 97 376.0979903 98 154.6005941 99 278.6459933 100 295.429713 101 113.9459558 102 383.9623469 103 302.6510554 104 380.8139141 105 773.1982882 106 265.0474768 107 632.4653177 108 586.7911119 109 260.0826388 110 769.3546888 111 657.0065663 112 771.8614278 113 540.8851727 114 560.5944908 115 890.4888803 116 259.9424827 117 580.7563363 118 404.5167397 119 574.7396785 120 463.5358981 121 245.7857487 122 872.2505064 123 704.3778041 124 481.5415764 125 814.5631958 126 217.6456326 127 397.5235277 128 215.2788784 129 660.6893222 130 766.3895262 131 160.2479652 132 779.8374333 133 633.9583052 134 773.2285754 135 502.3417725 136 725.8633867 137 443.2640317 138 135.166266 139 513.7706623 140 239.3913203 141 194.3361515 142 395.0433866 143 407.6389108 144 416.1705409 145 268.2271523 146 101.8417454 147 66.5583916 148 327.416664 149 113.0930596 150 70.4966308 151 318.9103177 152 106.0164406 153 64.83210384 154 354.2097127 155 116.7872248 156 71.12582097 157 409.67052 158 127.1891459 159 75.1660703 160 440.1576845 161 133.5881802 162 78.05700518 163 422.3633372 164 136.7724179 165 82.55038075 166 437.4792468 167 131.97451 168 76.88122564 169 101259.4837 170 101259.4837 171 101259.4837 172 101259.4837 173 101259.4837 174 101259.4837 175 101259.4837 176 101259.4837 0.0 # objective constant 72 # number of quadratic terms in all constraints 59 169 145 -2.0 59 177 145 2.0 59 177 169 2.0 60 169 146 -2.0 60 178 146 2.0 60 178 169 2.0 61 169 147 -2.0 61 179 147 2.0 61 179 169 2.0 62 170 148 -2.0 62 180 148 2.0 62 180 170 2.0 63 170 149 -2.0 63 181 149 2.0 63 181 170 2.0 64 170 150 -2.0 64 182 150 2.0 64 182 170 2.0 65 171 151 -2.0 65 183 151 2.0 65 183 171 2.0 66 171 152 -2.0 66 184 152 2.0 66 184 171 2.0 67 171 153 -2.0 67 185 153 2.0 67 185 171 2.0 68 172 154 -2.0 68 186 154 2.0 68 186 172 2.0 69 172 155 -2.0 69 187 155 2.0 69 187 172 2.0 70 172 156 -2.0 70 188 156 2.0 70 188 172 2.0 71 173 157 -2.0 71 189 157 2.0 71 189 173 2.0 72 173 158 -2.0 72 190 158 2.0 72 190 173 2.0 73 173 159 -2.0 73 191 159 2.0 73 191 173 2.0 74 174 160 -2.0 74 192 160 2.0 74 192 174 2.0 75 174 161 -2.0 75 193 161 2.0 75 193 174 2.0 76 174 162 -2.0 76 194 162 2.0 76 194 174 2.0 77 175 163 -2.0 77 195 163 2.0 77 195 175 2.0 78 175 164 -2.0 78 196 164 2.0 78 196 175 2.0 79 175 165 -2.0 79 197 165 2.0 79 197 175 2.0 80 176 166 -2.0 80 198 166 2.0 80 198 176 2.0 81 176 167 -2.0 81 199 167 2.0 81 199 176 2.0 82 176 168 -2.0 82 200 168 2.0 82 200 176 2.0 384 # number of linear terms in all constraints 1 1 1.465020132 1 9 1.359734944 1 17 1.421554108 1 25 0.749119501 1 33 1.211666119 1 41 1.222030951 1 49 1.224720338 1 57 0.583392775 1 65 0.507387528 1 73 1.007181208 1 81 1.448218778 1 89 1.128698856 1 97 0.64088422 1 105 1.073533103 1 113 1.242005841 1 121 1.242671696 1 129 1.400550697 1 137 0.704652931 1 177 -1.835102762 1 178 -3.670205525 1 179 -5.505308287 2 2 1.465020132 2 10 1.359734944 2 18 1.421554108 2 26 0.749119501 2 34 1.211666119 2 42 1.222030951 2 50 1.224720338 2 58 0.583392775 2 66 0.507387528 2 74 1.007181208 2 82 1.448218778 2 90 1.128698856 2 98 0.64088422 2 106 1.073533103 2 114 1.242005841 2 122 1.242671696 2 130 1.400550697 2 138 0.704652931 2 180 -1.686527529 2 181 -3.373055057 2 182 -5.059582586 3 3 1.465020132 3 11 1.359734944 3 19 1.421554108 3 27 0.749119501 3 35 1.211666119 3 43 1.222030951 3 51 1.224720338 3 59 0.583392775 3 67 0.507387528 3 75 1.007181208 3 83 1.448218778 3 91 1.128698856 3 99 0.64088422 3 107 1.073533103 3 115 1.242005841 3 123 1.242671696 3 131 1.400550697 3 139 0.704652931 3 183 -1.464431797 3 184 -2.928863594 3 185 -4.393295391 4 4 1.465020132 4 12 1.359734944 4 20 1.421554108 4 28 0.749119501 4 36 1.211666119 4 44 1.222030951 4 52 1.224720338 4 60 0.583392775 4 68 0.507387528 4 76 1.007181208 4 84 1.448218778 4 92 1.128698856 4 100 0.64088422 4 108 1.073533103 4 116 1.242005841 4 124 1.242671696 4 132 1.400550697 4 140 0.704652931 4 186 -1.586907488 4 187 -3.173814975 4 188 -4.760722463 5 5 1.465020132 5 13 1.359734944 5 21 1.421554108 5 29 0.749119501 5 37 1.211666119 5 45 1.222030951 5 53 1.224720338 5 61 0.583392775 5 69 0.507387528 5 77 1.007181208 5 85 1.448218778 5 93 1.128698856 5 101 0.64088422 5 109 1.073533103 5 117 1.242005841 5 125 1.242671696 5 133 1.400550697 5 141 0.704652931 5 189 -1.532379979 5 190 -3.064759957 5 191 -4.597139936 6 6 1.465020132 6 14 1.359734944 6 22 1.421554108 6 30 0.749119501 6 38 1.211666119 6 46 1.222030951 6 54 1.224720338 6 62 0.583392775 6 70 0.507387528 6 78 1.007181208 6 86 1.448218778 6 94 1.128698856 6 102 0.64088422 6 110 1.073533103 6 118 1.242005841 6 126 1.242671696 6 134 1.400550697 6 142 0.704652931 6 192 -1.538058916 6 193 -3.076117831 6 194 -4.614176747 7 7 1.465020132 7 15 1.359734944 7 23 1.421554108 7 31 0.749119501 7 39 1.211666119 7 47 1.222030951 7 55 1.224720338 7 63 0.583392775 7 71 0.507387528 7 79 1.007181208 7 87 1.448218778 7 95 1.128698856 7 103 0.64088422 7 111 1.073533103 7 119 1.242005841 7 127 1.242671696 7 135 1.400550697 7 143 0.704652931 7 195 -1.792707516 7 196 -3.585415032 7 197 -5.378122548 8 8 1.465020132 8 16 1.359734944 8 24 1.421554108 8 32 0.749119501 8 40 1.211666119 8 48 1.222030951 8 56 1.224720338 8 64 0.583392775 8 72 0.507387528 8 80 1.007181208 8 88 1.448218778 8 96 1.128698856 8 104 0.64088422 8 112 1.073533103 8 120 1.242005841 8 128 1.242671696 8 136 1.400550697 8 144 0.704652931 8 198 -1.501207175 8 199 -3.002414349 8 200 -4.503621524 9 1 1.0 9 2 1.0 9 3 1.0 9 4 1.0 9 5 1.0 9 6 1.0 9 7 1.0 9 8 1.0 10 9 1.0 10 10 1.0 10 11 1.0 10 12 1.0 10 13 1.0 10 14 1.0 10 15 1.0 10 16 1.0 11 17 1.0 11 18 1.0 11 19 1.0 11 20 1.0 11 21 1.0 11 22 1.0 11 23 1.0 11 24 1.0 12 25 1.0 12 26 1.0 12 27 1.0 12 28 1.0 12 29 1.0 12 30 1.0 12 31 1.0 12 32 1.0 13 33 1.0 13 34 1.0 13 35 1.0 13 36 1.0 13 37 1.0 13 38 1.0 13 39 1.0 13 40 1.0 14 41 1.0 14 42 1.0 14 43 1.0 14 44 1.0 14 45 1.0 14 46 1.0 14 47 1.0 14 48 1.0 15 49 1.0 15 50 1.0 15 51 1.0 15 52 1.0 15 53 1.0 15 54 1.0 15 55 1.0 15 56 1.0 16 57 1.0 16 58 1.0 16 59 1.0 16 60 1.0 16 61 1.0 16 62 1.0 16 63 1.0 16 64 1.0 17 65 1.0 17 66 1.0 17 67 1.0 17 68 1.0 17 69 1.0 17 70 1.0 17 71 1.0 17 72 1.0 18 73 1.0 18 74 1.0 18 75 1.0 18 76 1.0 18 77 1.0 18 78 1.0 18 79 1.0 18 80 1.0 19 81 1.0 19 82 1.0 19 83 1.0 19 84 1.0 19 85 1.0 19 86 1.0 19 87 1.0 19 88 1.0 20 89 1.0 20 90 1.0 20 91 1.0 20 92 1.0 20 93 1.0 20 94 1.0 20 95 1.0 20 96 1.0 21 97 1.0 21 98 1.0 21 99 1.0 21 100 1.0 21 101 1.0 21 102 1.0 21 103 1.0 21 104 1.0 22 105 1.0 22 106 1.0 22 107 1.0 22 108 1.0 22 109 1.0 22 110 1.0 22 111 1.0 22 112 1.0 23 113 1.0 23 114 1.0 23 115 1.0 23 116 1.0 23 117 1.0 23 118 1.0 23 119 1.0 23 120 1.0 24 121 1.0 24 122 1.0 24 123 1.0 24 124 1.0 24 125 1.0 24 126 1.0 24 127 1.0 24 128 1.0 25 129 1.0 25 130 1.0 25 131 1.0 25 132 1.0 25 133 1.0 25 134 1.0 25 135 1.0 25 136 1.0 26 137 1.0 26 138 1.0 26 139 1.0 26 140 1.0 26 141 1.0 26 142 1.0 26 143 1.0 26 144 1.0 27 145 1.0 27 146 1.0 27 147 1.0 28 148 1.0 28 149 1.0 28 150 1.0 29 151 1.0 29 152 1.0 29 153 1.0 30 154 1.0 30 155 1.0 30 156 1.0 31 157 1.0 31 158 1.0 31 159 1.0 32 160 1.0 32 161 1.0 32 162 1.0 33 163 1.0 33 164 1.0 33 165 1.0 34 166 1.0 34 167 1.0 34 168 1.0 35 145 -1.0 35 177 1.0 36 146 -1.0 36 178 1.0 37 147 -1.0 37 179 1.0 38 148 -1.0 38 180 1.0 39 149 -1.0 39 181 1.0 40 150 -1.0 40 182 1.0 41 151 -1.0 41 183 1.0 42 152 -1.0 42 184 1.0 43 153 -1.0 43 185 1.0 44 154 -1.0 44 186 1.0 45 155 -1.0 45 187 1.0 46 156 -1.0 46 188 1.0 47 157 -1.0 47 189 1.0 48 158 -1.0 48 190 1.0 49 159 -1.0 49 191 1.0 50 160 -1.0 50 192 1.0 51 161 -1.0 51 193 1.0 52 162 -1.0 52 194 1.0 53 163 -1.0 53 195 1.0 54 164 -1.0 54 196 1.0 55 165 -1.0 55 197 1.0 56 166 -1.0 56 198 1.0 57 167 -1.0 57 199 1.0 58 168 -1.0 58 200 1.0 1.79769313486232E+308 # value for infinity -1.79769313486232E+308 # default left-hand-side value 26 # number of non-default left-hand-sides 1 0.0 2 0.0 3 0.0 4 0.0 5 0.0 6 0.0 7 0.0 8 0.0 9 1.0 10 1.0 11 1.0 12 1.0 13 1.0 14 1.0 15 1.0 16 1.0 17 1.0 18 1.0 19 1.0 20 1.0 21 1.0 22 1.0 23 1.0 24 1.0 25 1.0 26 1.0 0.0 # default right-hand-side value 26 # number of non-default right-hand-sides 9 1.0 10 1.0 11 1.0 12 1.0 13 1.0 14 1.0 15 1.0 16 1.0 17 1.0 18 1.0 19 1.0 20 1.0 21 1.0 22 1.0 23 1.0 24 1.0 25 1.0 26 1.0 27 1.0 28 1.0 29 1.0 30 1.0 31 1.0 32 1.0 33 1.0 34 1.0 0.0 # default variable lower bound value 0 # number of non-default variable lower bounds 1.0 # default variable upper bound value 32 # number of non-default variable upper bounds 169 1.79769313486232E+308 170 1.79769313486232E+308 171 1.79769313486232E+308 172 1.79769313486232E+308 173 1.79769313486232E+308 174 1.79769313486232E+308 175 1.79769313486232E+308 176 1.79769313486232E+308 177 1.79769313486232E+308 178 1.79769313486232E+308 179 1.79769313486232E+308 180 1.79769313486232E+308 181 1.79769313486232E+308 182 1.79769313486232E+308 183 1.79769313486232E+308 184 1.79769313486232E+308 185 1.79769313486232E+308 186 1.79769313486232E+308 187 1.79769313486232E+308 188 1.79769313486232E+308 189 1.79769313486232E+308 190 1.79769313486232E+308 191 1.79769313486232E+308 192 1.79769313486232E+308 193 1.79769313486232E+308 194 1.79769313486232E+308 195 1.79769313486232E+308 196 1.79769313486232E+308 197 1.79769313486232E+308 198 1.79769313486232E+308 199 1.79769313486232E+308 200 1.79769313486232E+308 1 # default variable type 32 # number of non-default variable types 169 0 170 0 171 0 172 0 173 0 174 0 175 0 176 0 177 0 178 0 179 0 180 0 181 0 182 0 183 0 184 0 185 0 186 0 187 0 188 0 189 0 190 0 191 0 192 0 193 0 194 0 195 0 196 0 197 0 198 0 199 0 200 0 0.0 # default variable primal value in starting point 0 # number of non-default variable primal values in starting point 0.0 # default constraint dual value in starting point 0 # number of non-default constraint dual values in starting point 0.0 # default variable bound dual value in starting point 0 # number of non-default variable bound dual values in starting point 0 # number of non-default variable names 0 # number of non-default constraint names