QPLIB_0031 QGL minimize 60 # number of variables 32 # number of constraints 464 # number of quadratic terms in objective 1 1 52.8828 2 1 63.7552 3 1 68.4668 4 1 64.522 5 1 69.0464 6 1 74.2636 7 1 55.0652 8 1 65.8356 9 1 59.8916 10 1 70.5296 11 1 59.6856 12 1 28.94904 13 1 63.7376 14 1 51.1716 15 1 59.4304 16 1 83.4704 17 1 69.6832 18 1 16641.4 19 1 10776.84 20 1 10167.0 21 1 16765.0 22 1 16234.28 23 1 16619.2 24 1 16819.96 25 1 15743.72 26 1 13633.72 27 1 16340.72 28 1 16181.88 29 1 16260.52 30 1 16260.72 2 2 44.0482 3 2 59.8004 4 2 78.7888 5 2 53.9012 6 2 58.462 7 2 46.8228 8 2 45.9592 9 2 59.0396 10 2 63.5056 11 2 61.0716 12 2 64.5344 13 2 58.3964 14 2 64.6076 15 2 60.0148 16 2 54.834 17 2 58.666 18 2 16645.72 19 2 10793.6 20 2 10184.04 21 2 16778.08 22 2 16234.28 23 2 16618.4 24 2 16795.72 25 2 15747.2 26 2 13634.6 27 2 16346.32 28 2 16191.88 29 2 16263.52 30 2 16253.92 3 3 32.6236 4 3 62.4868 5 3 60.2416 6 3 55.988 7 3 61.474 8 3 60.1784 9 3 61.1292 10 3 61.018 11 3 58.7572 12 3 54.3136 13 3 63.3436 14 3 61.956 15 3 60.4564 16 3 67.1356 17 3 66.0784 18 3 16642.36 19 3 10793.44 20 3 10171.52 21 3 16763.88 22 3 16234.28 23 3 16617.88 24 3 16821.68 25 3 15749.08 26 3 13641.76 27 3 16344.92 28 3 16187.44 29 3 16261.12 30 3 16253.68 4 4 51.0618 5 4 51.9796 6 4 54.7816 7 4 67.1336 8 4 59.284 9 4 63.97 10 4 64.3764 11 4 51.6136 12 4 63.7068 13 4 60.9404 14 4 66.2164 15 4 52.192 16 4 51.154 17 4 62.6448 18 4 16648.24 19 4 10795.52 20 4 10169.12 21 4 16770.8 22 4 16234.28 23 4 16620.6 24 4 16774.0 25 4 15745.0 26 4 13632.24 27 4 16343.48 28 4 16184.44 29 4 16261.32 30 4 16269.4 5 5 46.9926 6 5 69.084 7 5 89.6276 8 5 53.2292 9 5 48.4944 10 5 64.8176 11 5 66.7108 12 5 47.1684 13 5 59.9348 14 5 50.378 15 5 59.1984 16 5 81.6828 17 5 59.3636 18 5 16640.04 19 5 10772.72 20 5 10157.52 21 5 16751.36 22 5 16234.28 23 5 16615.52 24 5 16825.12 25 5 15745.52 26 5 13629.72 27 5 16337.12 28 5 16186.92 29 5 16263.16 30 5 16249.2 6 6 60.2472 7 6 50.246 8 6 70.7192 9 6 71.2524 10 6 60.7068 11 6 69.1804 12 6 44.878 13 6 55.3832 14 6 50.8208 15 6 36.66412 16 6 68.4116 17 6 67.1044 18 6 16642.12 19 6 10785.28 20 6 10155.36 21 6 16764.2 22 6 16234.32 23 6 16610.04 24 6 16802.32 25 6 15739.92 26 6 13611.08 27 6 16326.6 28 6 16182.32 29 6 16257.44 30 6 16225.16 7 7 71.3066 8 7 80.976 9 7 49.8792 10 7 58.5832 11 7 54.2232 12 7 74.4556 13 7 44.9604 14 7 64.4764 15 7 41.1508 16 7 62.5612 17 7 58.99 18 7 16642.52 19 7 10782.52 20 7 10146.36 21 7 16736.68 22 7 16234.28 23 7 16614.48 24 7 16807.2 25 7 15747.96 26 7 13636.28 27 7 16335.4 28 7 16179.96 29 7 16266.0 30 7 16269.4 8 8 70.1554 9 8 81.8428 10 8 57.3812 11 8 57.3016 12 8 58.7188 13 8 51.4052 14 8 52.5324 15 8 30.41936 16 8 47.8836 17 8 65.482 18 8 16645.32 19 8 10810.8 20 8 10123.08 21 8 16739.68 22 8 16234.28 23 8 16613.0 24 8 16834.0 25 8 15755.36 26 8 13634.16 27 8 16337.88 28 8 16186.84 29 8 16259.56 30 8 16254.24 9 9 63.9214 10 9 39.84756 11 9 67.0672 12 9 66.93 13 9 70.1604 14 9 70.1224 16 9 59.4052 17 9 53.7528 18 9 16643.44 19 9 10843.32 20 9 10160.64 21 9 16762.84 22 9 16234.24 23 9 16617.0 24 9 16835.76 25 9 15743.4 26 9 13629.04 27 9 16337.48 28 9 16200.76 29 9 16260.44 30 9 16244.68 10 10 40.2514 11 10 61.722 12 10 48.4088 13 10 60.6724 14 10 50.348 15 10 72.2908 16 10 71.3304 17 10 60.4648 18 10 16641.04 19 10 10771.4 20 10 10164.24 21 10 16765.0 22 10 16234.28 23 10 16616.8 24 10 16807.48 25 10 15752.8 26 10 13640.68 27 10 16346.6 28 10 16180.44 29 10 16259.08 30 10 16249.96 11 11 36.729 12 11 61.6824 13 11 66.8532 14 11 46.1952 15 11 42.436 16 11 70.9788 17 11 59.2388 18 11 16638.68 19 11 10792.48 20 11 10162.72 21 11 16768.24 22 11 16234.28 23 11 16614.44 24 11 16822.36 25 11 15750.52 26 11 13644.64 27 11 16343.76 28 11 16191.72 29 11 16262.08 30 11 16239.88 12 12 57.514 13 12 46.806 14 12 73.8584 15 12 37.48284 16 12 29.8288 17 12 52.7564 18 12 16637.96 19 12 10822.64 20 12 10176.44 21 12 16763.72 22 12 16234.32 23 12 16614.76 24 12 16814.96 25 12 15749.24 26 12 13642.08 27 12 16352.08 28 12 16190.96 29 12 16268.36 30 12 16248.08 13 13 49.437 14 13 32.88192 15 13 49.6516 16 13 75.9848 17 13 76.2848 18 13 16638.84 19 13 10795.08 20 13 10164.72 21 13 16763.28 22 13 16234.24 23 13 16623.28 24 13 16809.72 25 13 15754.72 26 13 13650.84 27 13 16348.56 28 13 16187.76 29 13 16261.44 30 13 16245.44 14 14 56.9672 15 14 70.0788 16 14 45.4924 17 14 42.896 18 14 16647.16 19 14 10822.24 20 14 10193.16 21 14 16765.36 22 14 16234.28 23 14 16615.64 24 14 16836.84 25 14 15739.56 26 14 13609.32 27 14 16339.64 28 14 16190.92 29 14 16261.92 30 14 16245.92 15 15 102.9644 16 15 42.2812 17 15 47.1464 18 15 16647.64 19 15 10791.52 20 15 10202.0 21 15 16739.6 22 15 16234.28 23 15 16622.56 24 15 16863.72 25 15 15752.12 26 15 13638.56 27 15 16344.84 28 15 16175.96 29 15 16265.8 30 15 16265.24 16 16 53.619 17 16 63.0728 18 16 16637.64 19 16 10767.44 20 16 10159.84 21 16 16769.76 22 16 16234.28 23 16 16614.84 24 16 16815.4 25 16 15747.68 26 16 13645.76 27 16 16340.0 28 16 16186.64 29 16 16259.12 30 16 16237.4 17 17 51.2256 18 17 16640.28 19 17 10767.24 20 17 10165.16 21 17 16770.52 22 17 16234.28 23 17 16619.64 24 17 16797.8 25 17 15752.96 26 17 13636.76 27 17 16348.96 28 17 16185.04 29 17 16255.8 30 17 16251.36 18 18 7767.68 19 18 16430.76 20 18 16352.8 21 18 15436.76 22 18 16236.6 23 18 16193.04 24 18 16166.44 25 18 16373.28 26 18 16539.12 27 18 16522.8 28 18 16196.28 29 18 16354.68 30 18 16250.32 19 19 6564.22 20 19 14428.28 21 19 16733.88 22 19 16234.92 23 19 16511.36 24 19 16252.84 25 19 16230.2 26 19 15488.04 27 19 16228.52 28 19 16072.0 29 19 16057.84 30 19 15651.84 20 20 6035.28 21 20 16411.76 22 20 16237.24 23 20 16296.96 24 20 16616.08 25 20 15788.72 26 20 14997.8 27 20 16446.32 28 20 16192.08 29 20 16242.88 30 20 16161.2 21 21 7380.44 22 21 16237.64 23 21 16494.6 24 21 15899.28 25 21 16206.8 26 21 16580.28 27 21 16698.4 28 21 16304.08 29 21 16305.64 30 21 16407.36 22 22 8117.92 23 22 16235.32 24 22 16238.56 25 22 16236.24 26 22 16234.76 27 22 16234.56 28 22 16235.64 29 22 16235.84 30 22 16235.84 23 23 7991.36 24 23 16505.24 25 23 16350.44 26 23 16216.56 27 23 16186.56 28 23 16223.6 29 23 16322.68 30 23 16317.8 24 24 7482.1 25 24 16173.0 26 24 16609.12 27 24 16411.64 28 24 16279.04 29 24 16155.28 30 24 16080.6 25 25 8031.34 26 25 16195.44 27 25 16175.84 28 25 16237.56 29 25 16194.96 30 25 16194.72 26 26 7308.96 27 26 16110.24 28 26 16340.84 29 26 16113.68 30 26 16731.16 27 27 7889.92 28 27 16161.12 29 27 16139.36 30 27 16094.64 28 28 8086.2 29 28 16217.44 30 28 16070.48 29 29 8071.48 30 29 16172.96 30 30 7860.06 0.0 # default value for linear coefficients in objective 0 # number of non-default linear coefficients in objective 0.0 # objective constant 120 # number of linear terms in all constraints 1 1 1.0 1 2 1.0 1 3 1.0 1 4 1.0 1 5 1.0 1 6 1.0 1 7 1.0 1 8 1.0 1 9 1.0 1 10 1.0 1 11 1.0 1 12 1.0 1 13 1.0 1 14 1.0 1 15 1.0 1 16 1.0 1 17 1.0 1 18 1.0 1 19 1.0 1 20 1.0 1 21 1.0 1 22 1.0 1 23 1.0 1 24 1.0 1 25 1.0 1 26 1.0 1 27 1.0 1 28 1.0 1 29 1.0 1 30 1.0 2 31 1.0 2 32 1.0 2 33 1.0 2 34 1.0 2 35 1.0 2 36 1.0 2 37 1.0 2 38 1.0 2 39 1.0 2 40 1.0 2 41 1.0 2 42 1.0 2 43 1.0 2 44 1.0 2 45 1.0 2 46 1.0 2 47 1.0 2 48 1.0 2 49 1.0 2 50 1.0 2 51 1.0 2 52 1.0 2 53 1.0 2 54 1.0 2 55 1.0 2 56 1.0 2 57 1.0 2 58 1.0 2 59 1.0 2 60 1.0 3 1 1.0 3 31 -1.0 4 2 1.0 4 32 -1.0 5 3 1.0 5 33 -1.0 6 4 1.0 6 34 -1.0 7 5 1.0 7 35 -1.0 8 6 1.0 8 36 -1.0 9 7 1.0 9 37 -1.0 10 8 1.0 10 38 -1.0 11 9 1.0 11 39 -1.0 12 10 1.0 12 40 -1.0 13 11 1.0 13 41 -1.0 14 12 1.0 14 42 -1.0 15 13 1.0 15 43 -1.0 16 14 1.0 16 44 -1.0 17 15 1.0 17 45 -1.0 18 16 1.0 18 46 -1.0 19 17 1.0 19 47 -1.0 20 18 1.0 20 48 -1.0 21 19 1.0 21 49 -1.0 22 20 1.0 22 50 -1.0 23 21 1.0 23 51 -1.0 24 22 1.0 24 52 -1.0 25 23 1.0 25 53 -1.0 26 24 1.0 26 54 -1.0 27 25 1.0 27 55 -1.0 28 26 1.0 28 56 -1.0 29 27 1.0 29 57 -1.0 30 28 1.0 30 58 -1.0 31 29 1.0 31 59 -1.0 32 30 1.0 32 60 -1.0 1.79769313486232E+308 # value for infinity -1.79769313486232E+308 # default left-hand-side value 1 # number of non-default left-hand-sides 1 1.0 0.0 # default right-hand-side value 2 # number of non-default right-hand-sides 1 1.0 2 5.0 0.0 # default variable lower bound value 0 # number of non-default variable lower bounds 1.0 # default variable upper bound value 30 # number of non-default variable upper bounds 1 1.79769313486232E+308 2 1.79769313486232E+308 3 1.79769313486232E+308 4 1.79769313486232E+308 5 1.79769313486232E+308 6 1.79769313486232E+308 7 1.79769313486232E+308 8 1.79769313486232E+308 9 1.79769313486232E+308 10 1.79769313486232E+308 11 1.79769313486232E+308 12 1.79769313486232E+308 13 1.79769313486232E+308 14 1.79769313486232E+308 15 1.79769313486232E+308 16 1.79769313486232E+308 17 1.79769313486232E+308 18 1.79769313486232E+308 19 1.79769313486232E+308 20 1.79769313486232E+308 21 1.79769313486232E+308 22 1.79769313486232E+308 23 1.79769313486232E+308 24 1.79769313486232E+308 25 1.79769313486232E+308 26 1.79769313486232E+308 27 1.79769313486232E+308 28 1.79769313486232E+308 29 1.79769313486232E+308 30 1.79769313486232E+308 0 # default variable type 30 # number of non-default variable types 31 1 32 1 33 1 34 1 35 1 36 1 37 1 38 1 39 1 40 1 41 1 42 1 43 1 44 1 45 1 46 1 47 1 48 1 49 1 50 1 51 1 52 1 53 1 54 1 55 1 56 1 57 1 58 1 59 1 60 1 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