ngraph.sparse-collection
Version:
Subset of the University of Florida sparse matrix collection
1 lines • 33.9 kB
JavaScript
module.exports = {"recordsPerEdge":3,"links":[257,1,-1,258,2,-1,259,3,-1,260,4,-1,261,5,-1,262,6,-1,263,7,-1,264,8,-1,265,9,-1,266,10,-1,267,11,-1,268,12,-1,269,13,-1,270,14,-1,271,15,-1,272,16,-1,273,17,-1,274,18,-1,275,19,-1,276,20,-1,277,21,-1,278,22,-1,279,23,-1,280,24,-1,281,25,-1,282,26,-1,283,27,-1,284,28,-1,285,29,-1,286,30,-1,287,31,-1,288,32,-1,289,33,-1,290,34,-1,291,35,-1,292,36,-1,293,37,-1,294,38,-1,295,39,-1,296,40,-1,297,41,-1,298,42,-1,299,43,-1,300,44,-1,301,45,-1,302,46,-1,303,47,-1,304,48,-1,305,49,-1,306,50,-1,307,51,-1,308,52,-1,309,53,-1,310,54,-1,311,55,-1,312,56,-1,313,57,-1,314,58,-1,315,59,-1,316,60,-1,317,61,-1,318,62,-1,319,63,-1,320,64,-1,321,65,-1,322,66,-1,323,67,-1,324,68,-1,325,69,-1,326,70,-1,327,71,-1,328,72,-1,329,73,-1,330,74,-1,331,75,-1,332,76,-1,333,77,-1,334,78,-1,335,79,-1,336,80,-1,337,81,1,338,82,1,339,83,1,340,84,1,341,85,1,342,86,1,343,87,1,344,88,1,361,89,1,362,90,1,363,91,1,364,92,1,365,93,1,366,94,1,367,95,1,368,96,1,369,97,1,370,98,1,371,99,1,372,100,1,373,101,1,374,102,1,375,103,1,376,104,1,377,105,1,378,106,1,379,107,1,380,108,1,381,109,1,382,110,1,383,111,1,384,112,1,385,113,1,386,114,1,387,115,1,388,116,1,389,117,1,390,118,1,391,119,1,392,120,1,393,121,1,394,122,1,395,123,1,396,124,1,397,125,1,398,126,1,399,127,1,400,128,1,17,129,-0.81537,17,130,1,18,130,-0.81537,18,131,1,19,131,-0.81537,19,132,1,20,132,-0.81537,20,133,1,21,133,-0.81537,21,134,1,22,134,-0.81537,22,135,1,23,135,-0.81537,23,136,1,24,136,-0.81537,24,137,1,25,137,-0.81537,25,138,1,26,138,-0.81537,26,139,1,27,139,-0.81537,27,140,1,28,140,-0.81537,28,141,1,29,141,-0.81537,29,142,1,30,142,-0.81537,30,143,1,31,143,-0.81537,31,144,1,32,144,-0.06,257,145,-1,258,146,-1,259,147,-1,260,148,-1,261,149,-1,262,150,-1,263,151,-1,264,152,-1,265,153,-1,266,154,-1,267,155,-1,268,156,-1,269,157,-1,270,158,-1,271,159,-1,272,160,-1,273,161,-100,274,162,-100,275,163,-100,276,164,-100,277,165,-100,278,166,-100,279,167,-100,280,168,-100,281,169,-100,282,170,-100,283,171,-100,284,172,-100,285,173,-100,286,174,-100,287,175,-100,288,176,-100,17,177,-2,17,178,-3,18,178,-2,18,179,-3,19,179,-2,19,180,-3,20,180,-2,20,181,-3,21,181,-2,21,182,-3,22,182,-2,22,183,-3,23,183,-2,23,184,-3,24,184,-2,24,185,-3,25,185,-2,25,186,-3,26,186,-2,26,187,-3,27,187,-2,27,188,-3,28,188,-2,28,189,-3,29,189,-2,29,190,-3,30,190,-2,30,191,-3,31,191,-2,31,192,-3,32,192,1,1,193,-1000,2,194,-1000,3,195,-1000,4,196,-1000,5,197,-1000,6,198,-1000,7,199,-1000,8,200,-1000,9,201,-1000,10,202,-1000,11,203,-1000,12,204,-1000,13,205,-1000,14,206,-1000,15,207,-1000,16,208,-1000,1,209,22,33,209,1,34,209,-1,257,209,1,2,210,22,34,210,1,35,210,-1,258,210,1,3,211,22,35,211,1,36,211,-1,259,211,1,4,212,22,36,212,1,37,212,-1,260,212,1,5,213,22,37,213,1,38,213,-1,261,213,1,6,214,22,38,214,1,39,214,-1,262,214,1,7,215,22,39,215,1,40,215,-1,263,215,1,8,216,22,40,216,1,41,216,-1,264,216,1,9,217,22,41,217,1,42,217,-1,265,217,1,10,218,22,42,218,1,43,218,-1,266,218,1,11,219,22,43,219,1,44,219,-1,267,219,1,12,220,22,44,220,1,45,220,-1,268,220,1,13,221,22,45,221,1,46,221,-1,269,221,1,14,222,22,46,222,1,47,222,-1,270,222,1,15,223,22,47,223,1,48,223,-1,271,223,1,16,224,22,48,224,1,272,224,1,1,225,2,257,225,1,289,225,-4.2,305,225,-5.8,361,225,5.8,2,226,2,258,226,1,290,226,-4.2,306,226,-5.8,362,226,5.8,3,227,2,259,227,1,291,227,-4.2,307,227,-5.8,363,227,5.8,4,228,2,260,228,1,292,228,-4.2,308,228,-5.8,364,228,5.8,5,229,2,261,229,1,293,229,-4.2,309,229,-5.8,365,229,5.8,6,230,2,262,230,1,294,230,-4.2,310,230,-5.8,366,230,5.8,7,231,2,263,231,1,295,231,-4.2,311,231,-5.8,367,231,5.8,8,232,2,264,232,1,296,232,-4.2,312,232,-5.8,368,232,5.8,9,233,2,265,233,1,297,233,-4.2,313,233,-5.8,369,233,5.8,10,234,2,266,234,1,298,234,-4.2,314,234,-5.8,370,234,5.8,11,235,2,267,235,1,299,235,-4.2,315,235,-5.8,371,235,5.8,12,236,2,268,236,1,300,236,-4.2,316,236,-5.8,372,236,5.8,13,237,2,269,237,1,301,237,-4.2,317,237,-5.8,373,237,5.8,14,238,2,270,238,1,302,238,-4.2,318,238,-5.8,374,238,5.8,15,239,2,271,239,1,303,239,-4.2,319,239,-5.8,375,239,5.8,16,240,2,272,240,1,304,240,-4.2,320,240,-5.8,376,240,5.8,1,241,13.6,49,241,1,50,241,-1,257,241,1,305,241,-10,361,241,10,2,242,13.6,50,242,1,51,242,-1,258,242,1,306,242,-10,362,242,10,3,243,13.6,51,243,1,52,243,-1,259,243,1,307,243,-10,363,243,10,4,244,13.6,52,244,1,53,244,-1,260,244,1,308,244,-10,364,244,10,5,245,13.6,53,245,1,54,245,-1,261,245,1,309,245,-10,365,245,10,6,246,13.6,54,246,1,55,246,-1,262,246,1,310,246,-10,366,246,10,7,247,13.6,55,247,1,56,247,-1,263,247,1,311,247,-10,367,247,10,8,248,13.6,56,248,1,57,248,-1,264,248,1,312,248,-10,368,248,10,9,249,13.6,57,249,1,58,249,-1,265,249,1,313,249,-10,369,249,10,10,250,13.6,58,250,1,59,250,-1,266,250,1,314,250,-10,370,250,10,11,251,13.6,59,251,1,60,251,-1,267,251,1,315,251,-10,371,251,10,12,252,13.6,60,252,1,61,252,-1,268,252,1,316,252,-10,372,252,10,13,253,13.6,61,253,1,62,253,-1,269,253,1,317,253,-10,373,253,10,14,254,13.6,62,254,1,63,254,-1,270,254,1,318,254,-10,374,254,10,15,255,13.6,63,255,1,64,255,-1,271,255,1,319,255,-10,375,255,10,16,256,13.6,64,256,1,272,256,1,320,256,-10,376,256,10,1,257,17.60001,65,257,1,66,257,-1,305,257,-10,361,257,10,2,258,17.60001,66,258,1,67,258,-1,306,258,-10,362,258,10,3,259,17.60001,67,259,1,68,259,-1,307,259,-10,363,259,10,4,260,17.60001,68,260,1,69,260,-1,308,260,-10,364,260,10,5,261,17.60001,69,261,1,70,261,-1,309,261,-10,365,261,10,6,262,17.60001,70,262,1,71,262,-1,310,262,-10,366,262,10,7,263,17.60001,71,263,1,72,263,-1,311,263,-10,367,263,10,8,264,17.60001,72,264,1,73,264,-1,312,264,-10,368,264,10,9,265,17.60001,73,265,1,74,265,-1,313,265,-10,369,265,10,10,266,17.60001,74,266,1,75,266,-1,314,266,-10,370,266,10,11,267,17.60001,75,267,1,76,267,-1,315,267,-10,371,267,10,12,268,17.60001,76,268,1,77,268,-1,316,268,-10,372,268,10,13,269,17.60001,77,269,1,78,269,-1,317,269,-10,373,269,10,14,270,17.60001,78,270,1,79,270,-1,318,270,-10,374,270,10,15,271,17.60001,79,271,1,80,271,-1,319,271,-10,375,271,10,16,272,17.60001,80,272,1,320,272,-10,376,272,10,1,273,19.8,81,273,1,82,273,-1,257,273,1,321,273,-0.029,2,274,19.8,82,274,1,83,274,-1,258,274,1,322,274,-0.029,3,275,19.8,83,275,1,84,275,-1,259,275,1,323,275,-0.029,4,276,19.8,84,276,1,85,276,-1,260,276,1,324,276,-0.029,5,277,19.8,85,277,1,86,277,-1,261,277,1,325,277,-0.029,6,278,19.8,86,278,1,87,278,-1,262,278,1,326,278,-0.029,7,279,19.8,87,279,1,88,279,-1,263,279,1,327,279,-0.029,8,280,19.8,88,280,1,89,280,-1,264,280,1,328,280,-0.029,9,281,19.8,89,281,1,90,281,-1,265,281,1,329,281,-0.029,10,282,19.8,90,282,1,91,282,-1,266,282,1,330,282,-0.029,11,283,19.8,91,283,1,92,283,-1,267,283,1,331,283,-0.029,12,284,19.8,92,284,1,93,284,-1,268,284,1,332,284,-0.029,13,285,19.8,93,285,1,94,285,-1,269,285,1,333,285,-0.029,14,286,19.8,94,286,1,95,286,-1,270,286,1,334,286,-0.029,15,287,19.8,95,287,1,96,287,-1,271,287,1,335,287,-0.029,16,288,19.8,96,288,1,272,288,1,336,288,-0.029,1,289,20.10001,97,289,1,98,289,-1,257,289,1,321,289,-0.0227,346,289,-0.027,2,290,20.10001,98,290,1,99,290,-1,258,290,1,322,290,-0.0227,347,290,-0.027,3,291,20.10001,99,291,1,100,291,-1,259,291,1,323,291,-0.0227,348,291,-0.027,4,292,20.10001,100,292,1,101,292,-1,260,292,1,324,292,-0.0227,349,292,-0.027,5,293,20.10001,101,293,1,102,293,-1,261,293,1,325,293,-0.0227,350,293,-0.027,6,294,20.10001,102,294,1,103,294,-1,262,294,1,326,294,-0.0227,351,294,-0.027,7,295,20.10001,103,295,1,104,295,-1,263,295,1,327,295,-0.0227,352,295,-0.027,8,296,20.10001,104,296,1,105,296,-1,264,296,1,328,296,-0.0227,353,296,-0.027,9,297,20.10001,105,297,1,106,297,-1,265,297,1,329,297,-0.0227,354,297,-0.027,10,298,20.10001,106,298,1,107,298,-1,266,298,1,330,298,-0.0227,355,298,-0.027,11,299,20.10001,107,299,1,108,299,-1,267,299,1,331,299,-0.0227,356,299,-0.027,12,300,20.10001,108,300,1,109,300,-1,268,300,1,332,300,-0.0227,357,300,-0.027,13,301,20.10001,109,301,1,110,301,-1,269,301,1,333,301,-0.0227,358,301,-0.027,14,302,20.10001,110,302,1,111,302,-1,270,302,1,334,302,-0.0227,359,302,-0.027,15,303,20.10001,111,303,1,112,303,-1,271,303,1,335,303,-0.0227,360,303,-0.027,16,304,20.10001,112,304,1,272,304,1,336,304,-0.0227,1,305,20.3,113,305,1,114,305,-1,257,305,1,321,305,-0.019,2,306,20.3,114,306,1,115,306,-1,258,306,1,322,306,-0.019,3,307,20.3,115,307,1,116,307,-1,259,307,1,323,307,-0.019,4,308,20.3,116,308,1,117,308,-1,260,308,1,324,308,-0.019,5,309,20.3,117,309,1,118,309,-1,261,309,1,325,309,-0.019,6,310,20.3,118,310,1,119,310,-1,262,310,1,326,310,-0.019,7,311,20.3,119,311,1,120,311,-1,263,311,1,327,311,-0.019,8,312,20.3,120,312,1,121,312,-1,264,312,1,328,312,-0.019,9,313,20.3,121,313,1,122,313,-1,265,313,1,329,313,-0.019,10,314,20.3,122,314,1,123,314,-1,266,314,1,330,314,-0.019,11,315,20.3,123,315,1,124,315,-1,267,315,1,331,315,-0.019,12,316,20.3,124,316,1,125,316,-1,268,316,1,332,316,-0.019,13,317,20.3,125,317,1,126,317,-1,269,317,1,333,317,-0.019,14,318,20.3,126,318,1,127,318,-1,270,318,1,334,318,-0.019,15,319,20.3,127,319,1,128,319,-1,271,319,1,335,319,-0.019,16,320,20.3,128,320,1,272,320,1,336,320,-0.019,1,321,25.10001,129,321,1,130,321,-1,257,321,1,346,321,-0.053,2,322,25.10001,130,322,1,131,322,-1,258,322,1,347,322,-0.053,3,323,25.10001,131,323,1,132,323,-1,259,323,1,348,323,-0.053,4,324,25.10001,132,324,1,133,324,-1,260,324,1,349,324,-0.053,5,325,25.10001,133,325,1,134,325,-1,261,325,1,350,325,-0.053,6,326,25.10001,134,326,1,135,326,-1,262,326,1,351,326,-0.053,7,327,25.10001,135,327,1,136,327,-1,263,327,1,352,327,-0.053,8,328,25.10001,136,328,1,137,328,-1,264,328,1,353,328,-0.053,9,329,25.10001,137,329,1,138,329,-1,265,329,1,354,329,-0.053,10,330,25.10001,138,330,1,139,330,-1,266,330,1,355,330,-0.053,11,331,25.10001,139,331,1,140,331,-1,267,331,1,356,331,-0.053,12,332,25.10001,140,332,1,141,332,-1,268,332,1,357,332,-0.053,13,333,25.10001,141,333,1,142,333,-1,269,333,1,358,333,-0.053,14,334,25.10001,142,334,1,143,334,-1,270,334,1,359,334,-0.053,15,335,25.10001,143,335,1,144,335,-1,271,335,1,360,335,-0.053,16,336,25.10001,144,336,1,272,336,1,1,337,54.8,145,337,1,146,337,-1,257,337,1,2,338,54.8,146,338,1,147,338,-1,258,338,1,3,339,54.8,147,339,1,148,339,-1,259,339,1,4,340,54.8,148,340,1,149,340,-1,260,340,1,5,341,54.8,149,341,1,150,341,-1,261,341,1,6,342,54.8,150,342,1,151,342,-1,262,342,1,7,343,54.8,151,343,1,152,343,-1,263,343,1,8,344,54.8,152,344,1,153,344,-1,264,344,1,9,345,54.8,153,345,1,154,345,-1,265,345,1,10,346,54.8,154,346,1,155,346,-1,266,346,1,11,347,54.8,155,347,1,156,347,-1,267,347,1,12,348,54.8,156,348,1,157,348,-1,268,348,1,13,349,54.8,157,349,1,158,349,-1,269,349,1,14,350,54.8,158,350,1,159,350,-1,270,350,1,15,351,54.8,159,351,1,160,351,-1,271,351,1,16,352,54.8,160,352,1,272,352,1,161,353,0.2,273,353,1,289,353,-1,162,354,0.2,274,354,1,290,354,-1,163,355,0.2,275,355,1,291,355,-1,164,356,0.2,276,356,1,292,356,-1,165,357,0.2,277,357,1,293,357,-1,166,358,0.2,278,358,1,294,358,-1,167,359,0.2,279,359,1,295,359,-1,168,360,0.2,280,360,1,296,360,-1,169,361,0.2,281,361,1,297,361,-1,170,362,0.2,282,362,1,298,362,-1,171,363,0.2,283,363,1,299,363,-1,172,364,0.2,284,364,1,300,364,-1,173,365,0.2,285,365,1,301,365,-1,174,366,0.2,286,366,1,302,366,-1,175,367,0.2,287,367,1,303,367,-1,176,368,0.2,288,368,1,304,368,-1,1,369,2.8,177,369,1,178,369,-1,273,369,1,305,369,-1.5,361,369,1.5,2,370,2.8,178,370,1,179,370,-1,274,370,1,306,370,-1.5,362,370,1.5,3,371,2.8,179,371,1,180,371,-1,275,371,1,307,371,-1.5,363,371,1.5,4,372,2.8,180,372,1,181,372,-1,276,372,1,308,372,-1.5,364,372,1.5,5,373,2.8,181,373,1,182,373,-1,277,373,1,309,373,-1.5,365,373,1.5,6,374,2.8,182,374,1,183,374,-1,278,374,1,310,374,-1.5,366,374,1.5,7,375,2.8,183,375,1,184,375,-1,279,375,1,311,375,-1.5,367,375,1.5,8,376,2.8,184,376,1,185,376,-1,280,376,1,312,376,-1.5,368,376,1.5,9,377,2.8,185,377,1,186,377,-1,281,377,1,313,377,-1.5,369,377,1.5,10,378,2.8,186,378,1,187,378,-1,282,378,1,314,378,-1.5,370,378,1.5,11,379,2.8,187,379,1,188,379,-1,283,379,1,315,379,-1.5,371,379,1.5,12,380,2.8,188,380,1,189,380,-1,284,380,1,316,380,-1.5,372,380,1.5,13,381,2.8,189,381,1,190,381,-1,285,381,1,317,381,-1.5,373,381,1.5,14,382,2.8,190,382,1,191,382,-1,286,382,1,318,382,-1.5,374,382,1.5,15,383,2.8,191,383,1,192,383,-1,287,383,1,319,383,-1.5,375,383,1.5,16,384,2.8,192,384,1,288,384,1,320,384,-1.5,376,384,1.5,1,385,4,193,385,1,194,385,-1,273,385,1,2,386,4,194,386,1,195,386,-1,274,386,1,3,387,4,195,387,1,196,387,-1,275,387,1,4,388,4,196,388,1,197,388,-1,276,388,1,5,389,4,197,389,1,198,389,-1,277,389,1,6,390,4,198,390,1,199,390,-1,278,390,1,7,391,4,199,391,1,200,391,-1,279,391,1,8,392,4,200,392,1,201,392,-1,280,392,1,9,393,4,201,393,1,202,393,-1,281,393,1,10,394,4,202,394,1,203,394,-1,282,394,1,11,395,4,203,395,1,204,395,-1,283,395,1,12,396,4,204,396,1,205,396,-1,284,396,1,13,397,4,205,397,1,206,397,-1,285,397,1,14,398,4,206,398,1,207,398,-1,286,398,1,15,399,4,207,399,1,208,399,-1,287,399,1,16,400,4,208,400,1,288,400,1,1,401,6,209,401,1,210,401,-1,273,401,1,2,402,6,210,402,1,211,402,-1,274,402,1,3,403,6,211,403,1,212,403,-1,275,403,1,4,404,6,212,404,1,213,404,-1,276,404,1,5,405,6,213,405,1,214,405,-1,277,405,1,6,406,6,214,406,1,215,406,-1,278,406,1,7,407,6,215,407,1,216,407,-1,279,407,1,8,408,6,216,408,1,217,408,-1,280,408,1,9,409,6,217,409,1,218,409,-1,281,409,1,10,410,6,218,410,1,219,410,-1,282,410,1,11,411,6,219,411,1,220,411,-1,283,411,1,12,412,6,220,412,1,221,412,-1,284,412,1,13,413,6,221,413,1,222,413,-1,285,413,1,14,414,6,222,414,1,223,414,-1,286,414,1,15,415,6,223,415,1,224,415,-1,287,415,1,16,416,6,224,416,1,288,416,1,1,417,1,225,417,1,226,417,-1,273,417,1,305,417,-1,361,417,1,2,418,1,226,418,1,227,418,-1,274,418,1,306,418,-1,362,418,1,3,419,1,227,419,1,228,419,-1,275,419,1,307,419,-1,363,419,1,4,420,1,228,420,1,229,420,-1,276,420,1,308,420,-1,364,420,1,5,421,1,229,421,1,230,421,-1,277,421,1,309,421,-1,365,421,1,6,422,1,230,422,1,231,422,-1,278,422,1,310,422,-1,366,422,1,7,423,1,231,423,1,232,423,-1,279,423,1,311,423,-1,367,423,1,8,424,1,232,424,1,233,424,-1,280,424,1,312,424,-1,368,424,1,9,425,1,233,425,1,234,425,-1,281,425,1,313,425,-1,369,425,1,10,426,1,234,426,1,235,426,-1,282,426,1,314,426,-1,370,426,1,11,427,1,235,427,1,236,427,-1,283,427,1,315,427,-1,371,427,1,12,428,1,236,428,1,237,428,-1,284,428,1,316,428,-1,372,428,1,13,429,1,237,429,1,238,429,-1,285,429,1,317,429,-1,373,429,1,14,430,1,238,430,1,239,430,-1,286,430,1,318,430,-1,374,430,1,15,431,1,239,431,1,240,431,-1,287,431,1,319,431,-1,375,431,1,16,432,1,240,432,1,288,432,1,320,432,-1,376,432,1,1,433,2,241,433,1,242,433,-1,273,433,1,2,434,2.21,242,434,1,243,434,-1,274,434,1,3,435,2.44,243,435,1,244,435,-1,275,435,1,4,436,2.69,244,436,1,245,436,-1,276,436,1,5,437,2.97,245,437,1,246,437,-1,277,437,1,6,438,3.28,246,438,1,247,438,-1,278,438,1,7,439,3.62,247,439,1,248,439,-1,279,439,1,8,440,4,248,440,1,249,440,-1,280,440,1,9,441,4.42,249,441,1,250,441,-1,281,441,1,10,442,4.88,250,442,1,251,442,-1,282,442,1,11,443,5.38,251,443,1,252,443,-1,283,443,1,12,444,5.94,252,444,1,253,444,-1,284,444,1,13,445,6.56,253,445,1,254,445,-1,285,445,1,14,446,7.25,254,446,1,255,446,-1,286,446,1,15,447,8,255,447,1,256,447,-1,287,447,1,16,448,8.83,256,448,1,288,448,1,33,449,-5,39,449,5,377,449,-1,34,450,-5,40,450,5,378,450,-1,393,450,0.4,35,451,-5,41,451,5,379,451,-1,394,451,0.4,36,452,-5,42,452,5,380,452,-1,395,452,0.4,37,453,-5,43,453,5,381,453,-1,396,453,0.4,38,454,-5,44,454,5,382,454,-1,397,454,0.4,39,455,-5,45,455,5,383,455,-1,398,455,0.3,40,456,-5,46,456,5,384,456,-1,399,456,0.2,41,457,-5,47,457,5,385,457,-1,400,457,0.1,42,458,-5,48,458,5,386,458,-1,43,459,-5,387,459,-1,44,460,-5,388,460,-1,45,461,-5,389,461,-1,46,462,-5,390,462,-1,47,463,-5,391,463,-1,48,464,-5,392,464,-1,49,465,-5,55,465,5,377,465,1,50,466,-5,56,466,5,378,466,1,393,466,-0.6,51,467,-5,57,467,5,379,467,1,394,467,-0.6,52,468,-5,58,468,5,380,468,1,395,468,-0.6,53,469,-5,59,469,5,381,469,1,396,469,-0.6,54,470,-5,60,470,5,382,470,1,397,470,-0.6,55,471,-5,61,471,5,383,471,1,398,471,-0.7,56,472,-5,62,472,5,384,472,1,399,472,-0.8,57,473,-5,63,473,5,385,473,1,400,473,-0.9,58,474,-5,64,474,5,386,474,1,59,475,-5,387,475,1,60,476,-5,388,476,1,61,477,-5,389,477,1,62,478,-5,390,478,1,63,479,-5,391,479,1,64,480,-5,392,480,1,65,481,-5,71,481,5,377,481,-1,66,482,-5,72,482,5,378,482,-1,393,482,-0.6,67,483,-5,73,483,5,379,483,-1,394,483,-0.6,68,484,-5,74,484,5,380,484,-1,395,484,-0.6,69,485,-5,75,485,5,381,485,-1,396,485,-0.6,70,486,-5,76,486,5,382,486,-1,397,486,-0.6,71,487,-5,77,487,5,383,487,-1,398,487,-0.7,72,488,-5,78,488,5,384,488,-1,399,488,-0.8,73,489,-5,79,489,5,385,489,-1,400,489,-0.9,74,490,-5,80,490,5,386,490,-1,75,491,-5,387,491,-1,76,492,-5,388,492,-1,77,493,-5,389,493,-1,78,494,-5,390,494,-1,79,495,-5,391,495,-1,80,496,-5,392,496,-1,81,497,-5,87,497,5,327,497,0.0806,377,497,-1,82,498,-5,88,498,5,321,498,-0.0806,328,498,0.0806,378,498,-1,393,498,0.4,83,499,-5,89,499,5,322,499,-0.0806,329,499,0.0806,379,499,-1,394,499,0.4,84,500,-5,90,500,5,323,500,-0.0806,330,500,0.0806,380,500,-1,395,500,0.4,85,501,-5,91,501,5,324,501,-0.0806,331,501,0.0806,381,501,-1,396,501,0.4,86,502,-5,92,502,5,325,502,-0.0806,332,502,0.0806,382,502,-1,397,502,0.4,87,503,-5,93,503,5,326,503,-0.0806,333,503,0.0806,383,503,-1,398,503,0.3,88,504,-5,94,504,5,327,504,-0.0806,334,504,0.0806,384,504,-1,399,504,0.2,89,505,-5,95,505,5,328,505,-0.0806,335,505,0.0806,385,505,-1,400,505,0.1,90,506,-5,96,506,5,329,506,-0.0806,336,506,0.0806,386,506,-1,91,507,-5,330,507,-0.0806,387,507,-1,92,508,-5,331,508,-0.0806,388,508,-1,93,509,-5,332,509,-0.0806,389,509,-1,94,510,-5,333,510,-0.0806,390,510,-1,95,511,-5,334,511,-0.0806,391,511,-1,96,512,-5,335,512,-0.0806,392,512,-1,97,513,-5,103,513,5,327,513,0.0806,377,513,-1,98,514,-5,104,514,5,321,514,-0.0806,328,514,0.0806,378,514,-1,393,514,0.4,99,515,-5,105,515,5,322,515,-0.0806,329,515,0.0806,379,515,-1,394,515,0.4,100,516,-5,106,516,5,323,516,-0.0806,330,516,0.0806,380,516,-1,395,516,0.4,101,517,-5,107,517,5,324,517,-0.0806,331,517,0.0806,381,517,-1,396,517,0.4,102,518,-5,108,518,5,325,518,-0.0806,332,518,0.0806,382,518,-1,397,518,0.4,103,519,-5,109,519,5,326,519,-0.0806,333,519,0.0806,383,519,-1,398,519,0.3,104,520,-5,110,520,5,327,520,-0.0806,334,520,0.0806,384,520,-1,399,520,0.2,105,521,-5,111,521,5,328,521,-0.0806,335,521,0.0806,385,521,-1,400,521,0.1,106,522,-5,112,522,5,329,522,-0.0806,336,522,0.0806,386,522,-1,107,523,-5,330,523,-0.0806,387,523,-1,108,524,-5,331,524,-0.0806,388,524,-1,109,525,-5,332,525,-0.0806,389,525,-1,110,526,-5,333,526,-0.0806,390,526,-1,111,527,-5,334,527,-0.0806,391,527,-1,112,528,-5,335,528,-0.0806,392,528,-1,113,529,-5,119,529,5,327,529,0.0806,377,529,-1,114,530,-5,120,530,5,321,530,-0.0806,328,530,0.0806,378,530,-1,393,530,0.4,115,531,-5,121,531,5,322,531,-0.0806,329,531,0.0806,379,531,-1,394,531,0.4,116,532,-5,122,532,5,323,532,-0.0806,330,532,0.0806,380,532,-1,395,532,0.4,117,533,-5,123,533,5,324,533,-0.0806,331,533,0.0806,381,533,-1,396,533,0.4,118,534,-5,124,534,5,325,534,-0.0806,332,534,0.0806,382,534,-1,397,534,0.4,119,535,-5,125,535,5,326,535,-0.0806,333,535,0.0806,383,535,-1,398,535,0.3,120,536,-5,126,536,5,327,536,-0.0806,334,536,0.0806,384,536,-1,399,536,0.2,121,537,-5,127,537,5,328,537,-0.0806,335,537,0.0806,385,537,-1,400,537,0.1,122,538,-5,128,538,5,329,538,-0.0806,336,538,0.0806,386,538,-1,123,539,-5,330,539,-0.0806,387,539,-1,124,540,-5,331,540,-0.0806,388,540,-1,125,541,-5,332,541,-0.0806,389,541,-1,126,542,-5,333,542,-0.0806,390,542,-1,127,543,-5,334,543,-0.0806,391,543,-1,128,544,-5,335,544,-0.0806,392,544,-1,129,545,-5,135,545,5,345,545,1.054,351,545,-1.054,377,545,-1,130,546,-5,136,546,5,346,546,1.054,352,546,-1.054,378,546,-1,393,546,0.4,131,547,-5,137,547,5,347,547,1.054,353,547,-1.054,379,547,-1,394,547,0.4,132,548,-5,138,548,5,348,548,1.054,354,548,-1.054,380,548,-1,395,548,0.4,133,549,-5,139,549,5,349,549,1.054,355,549,-1.054,381,549,-1,396,549,0.4,134,550,-5,140,550,5,350,550,1.054,356,550,-1.054,382,550,-1,397,550,0.4,135,551,-5,141,551,5,351,551,1.054,357,551,-1.054,383,551,-1,398,551,0.3,136,552,-5,142,552,5,352,552,1.054,358,552,-1.054,384,552,-1,399,552,0.2,137,553,-5,143,553,5,353,553,1.054,359,553,-1.054,385,553,-1,400,553,0.1,138,554,-5,144,554,5,354,554,1.054,360,554,-1.054,386,554,-1,139,555,-5,355,555,1.054,387,555,-1,140,556,-5,356,556,1.054,388,556,-1,141,557,-5,357,557,1.054,389,557,-1,142,558,-5,358,558,1.054,390,558,-1,143,559,-5,359,559,1.054,391,559,-1,144,560,-5,360,560,1.054,392,560,-1,145,561,-5,151,561,5,377,561,-1,146,562,-5,152,562,5,378,562,-1,393,562,0.4,147,563,-5,153,563,5,379,563,-1,394,563,0.4,148,564,-5,154,564,5,380,564,-1,395,564,0.4,149,565,-5,155,565,5,381,565,-1,396,565,0.4,150,566,-5,156,566,5,382,566,-1,397,566,0.4,151,567,-5,157,567,5,383,567,-1,398,567,0.3,152,568,-5,158,568,5,384,568,-1,399,568,0.2,153,569,-5,159,569,5,385,569,-1,400,569,0.1,154,570,-5,160,570,5,386,570,-1,155,571,-5,387,571,-1,156,572,-5,388,572,-1,157,573,-5,389,573,-1,158,574,-5,390,574,-1,159,575,-5,391,575,-1,160,576,-5,392,576,-1,161,577,-1,162,577,-1,163,577,-0.77378,164,577,-0.59874,165,577,-0.46329,166,577,-0.35849,167,577,-0.27739,168,577,-0.21464,162,578,-1,163,578,-1,164,578,-0.77378,165,578,-0.59874,166,578,-0.46329,167,578,-0.35849,168,578,-0.27739,169,578,-0.21464,163,579,-1,164,579,-1,165,579,-0.77378,166,579,-0.59874,167,579,-0.46329,168,579,-0.35849,169,579,-0.27739,170,579,-0.21464,164,580,-1,165,580,-1,166,580,-0.77378,167,580,-0.59874,168,580,-0.46329,169,580,-0.35849,170,580,-0.27739,171,580,-0.21464,165,581,-1,166,581,-1,167,581,-0.77378,168,581,-0.59874,169,581,-0.46329,170,581,-0.35849,171,581,-0.27739,172,581,-0.21464,166,582,-1,167,582,-1,168,582,-0.77378,169,582,-0.59874,170,582,-0.46329,171,582,-0.35849,172,582,-0.27739,173,582,-0.21464,167,583,-1,168,583,-1,169,583,-0.77378,170,583,-0.59874,171,583,-0.46329,172,583,-0.35849,173,583,-0.27739,174,583,-0.21464,168,584,-1,169,584,-1,170,584,-0.77378,171,584,-0.59874,172,584,-0.46329,173,584,-0.35849,174,584,-0.27739,175,584,-0.21464,169,585,-1,170,585,-1,171,585,-0.77378,172,585,-0.59874,173,585,-0.46329,174,585,-0.35849,175,585,-0.27739,176,585,-0.21464,170,586,-1,171,586,-1,172,586,-0.77378,173,586,-0.59874,174,586,-0.46329,175,586,-0.35849,176,586,-0.27739,171,587,-1,172,587,-1,173,587,-0.77378,174,587,-0.59874,175,587,-0.46329,176,587,-0.35849,172,588,-1,173,588,-1,174,588,-0.77378,175,588,-0.59874,176,588,-0.46329,173,589,-1,174,589,-1,175,589,-0.77378,176,589,-0.59874,174,590,-1,175,590,-1,176,590,-0.77378,175,591,-1,176,591,-1,176,592,-1,177,593,-5,183,593,5,178,594,-5,184,594,5,179,595,-5,185,595,5,180,596,-5,186,596,5,181,597,-5,187,597,5,182,598,-5,188,598,5,183,599,-5,189,599,5,184,600,-5,190,600,5,185,601,-5,191,601,5,186,602,-5,192,602,5,187,603,-5,188,604,-5,189,605,-5,190,606,-5,191,607,-5,192,608,-5,193,609,-5,199,609,5,194,610,-5,200,610,5,195,611,-5,201,611,5,196,612,-5,202,612,5,197,613,-5,203,613,5,198,614,-5,204,614,5,199,615,-5,205,615,5,200,616,-5,206,616,5,201,617,-5,207,617,5,202,618,-5,208,618,5,203,619,-5,204,620,-5,205,621,-5,206,622,-5,207,623,-5,208,624,-5,209,625,-5,215,625,5,210,626,-5,216,626,5,211,627,-5,217,627,5,212,628,-5,218,628,5,213,629,-5,219,629,5,214,630,-5,220,630,5,215,631,-5,221,631,5,216,632,-5,222,632,5,217,633,-5,223,633,5,218,634,-5,224,634,5,219,635,-5,220,636,-5,221,637,-5,222,638,-5,223,639,-5,224,640,-5,225,641,-5,231,641,5,226,642,-5,232,642,5,227,643,-5,233,643,5,228,644,-5,234,644,5,229,645,-5,235,645,5,230,646,-5,236,646,5,231,647,-5,237,647,5,232,648,-5,238,648,5,233,649,-5,239,649,5,234,650,-5,240,650,5,235,651,-5,236,652,-5,237,653,-5,238,654,-5,239,655,-5,240,656,-5,241,657,-5,247,657,5,242,658,-5,248,658,5,243,659,-5,249,659,5,244,660,-5,250,660,5,245,661,-5,251,661,5,246,662,-5,252,662,5,247,663,-5,253,663,5,248,664,-5,254,664,5,249,665,-5,255,665,5,250,666,-5,256,666,5,251,667,-5,252,668,-5,253,669,-5,254,670,-5,255,671,-5,256,672,-5,1,673,2,289,673,1,337,673,5,2,674,2,290,674,1,337,674,5,3,675,2,291,675,1,337,675,5,4,676,2,292,676,1,337,676,5,5,677,2,293,677,1,337,677,5,6,678,2,294,678,1,337,678,5,7,679,2,295,679,1,337,679,5,8,680,2,296,680,1,337,680,5,9,681,2,297,681,1,337,681,5,10,682,2,298,682,1,337,682,5,11,683,2,299,683,1,337,683,5,12,684,2,300,684,1,337,684,5,13,685,2,301,685,1,337,685,5,14,686,2,302,686,1,337,686,5,15,687,2,303,687,1,337,687,5,16,688,2,304,688,1,337,688,5,1,689,2.5,289,689,1,338,689,5,2,690,2.5,290,690,1,338,690,5,3,691,2.5,291,691,1,338,691,5,4,692,2.5,292,692,1,338,692,5,5,693,2.5,293,693,1,338,693,5,6,694,2.5,294,694,1,338,694,5,7,695,2.5,295,695,1,338,695,5,8,696,2.5,296,696,1,338,696,5,9,697,2.5,297,697,1,338,697,5,10,698,2.5,298,698,1,338,698,5,11,699,2.5,299,699,1,338,699,5,12,700,2.5,300,700,1,338,700,5,13,701,2.5,301,701,1,338,701,5,14,702,2.5,302,702,1,338,702,5,15,703,2.5,303,703,1,338,703,5,16,704,2.5,304,704,1,338,704,5,1,705,3.5,289,705,1,339,705,5,2,706,3.5,290,706,1,339,706,5,3,707,3.5,291,707,1,339,707,5,4,708,3.5,292,708,1,339,708,5,5,709,3.5,293,709,1,339,709,5,6,710,3.5,294,710,1,339,710,5,7,711,3.5,295,711,1,339,711,5,8,712,3.5,296,712,1,339,712,5,9,713,3.5,297,713,1,339,713,5,10,714,3.5,298,714,1,339,714,5,11,715,3.5,299,715,1,339,715,5,12,716,3.5,300,716,1,339,716,5,13,717,3.5,301,717,1,339,717,5,14,718,3.5,302,718,1,339,718,5,15,719,3.5,303,719,1,339,719,5,16,720,3.5,304,720,1,339,720,5,1,721,5,289,721,1,340,721,5,2,722,5,290,722,1,340,722,5,3,723,5,291,723,1,340,723,5,4,724,5,292,724,1,340,724,5,5,725,5,293,725,1,340,725,5,6,726,5,294,726,1,340,726,5,7,727,5,295,727,1,340,727,5,8,728,5,296,728,1,340,728,5,9,729,5,297,729,1,340,729,5,10,730,5,298,730,1,340,730,5,11,731,5,299,731,1,340,731,5,12,732,5,300,732,1,340,732,5,13,733,5,301,733,1,340,733,5,14,734,5,302,734,1,340,734,5,15,735,5,303,735,1,340,735,5,16,736,5,304,736,1,340,736,5,1,737,0.8,305,737,1,341,737,5,2,738,0.8,306,738,1,341,738,5,3,739,0.8,307,739,1,341,739,5,4,740,0.8,308,740,1,341,740,5,5,741,0.8,309,741,1,341,741,5,6,742,0.8,310,742,1,341,742,5,7,743,0.8,311,743,1,341,743,5,8,744,0.8,312,744,1,341,744,5,9,745,0.8,313,745,1,341,745,5,10,746,0.8,314,746,1,341,746,5,11,747,0.8,315,747,1,341,747,5,12,748,0.8,316,748,1,341,748,5,13,749,0.8,317,749,1,341,749,5,14,750,0.8,318,750,1,341,750,5,15,751,0.8,319,751,1,341,751,5,16,752,0.8,320,752,1,341,752,5,1,753,60,321,753,1,342,753,5,2,754,60,322,754,1,342,754,5,3,755,60,323,755,1,342,755,5,4,756,60,324,756,1,342,756,5,5,757,60,325,757,1,342,757,5,6,758,60,326,758,1,342,758,5,7,759,60,327,759,1,342,759,5,8,760,60,328,760,1,342,760,5,9,761,60,329,761,1,342,761,5,10,762,60,330,762,1,342,762,5,11,763,60,331,763,1,342,763,5,12,764,60,332,764,1,342,764,5,13,765,60,333,765,1,342,765,5,14,766,60,334,766,1,342,766,5,15,767,60,335,767,1,342,767,5,16,768,60,336,768,1,342,768,5,1,769,300,321,769,1,343,769,5,2,770,300,322,770,1,343,770,5,3,771,300,323,771,1,343,771,5,4,772,300,324,772,1,343,772,5,5,773,300,325,773,1,343,773,5,6,774,300,326,774,1,343,774,5,7,775,300,327,775,1,343,775,5,8,776,300,328,776,1,343,776,5,9,777,300,329,777,1,343,777,5,10,778,300,330,778,1,343,778,5,11,779,300,331,779,1,343,779,5,12,780,300,332,780,1,343,780,5,13,781,300,333,781,1,343,781,5,14,782,300,334,782,1,343,782,5,15,783,300,335,783,1,343,783,5,16,784,300,336,784,1,343,784,5,1,785,2000,321,785,1,344,785,5,2,786,2000,322,786,1,344,786,5,3,787,2000,323,787,1,344,787,5,4,788,2000,324,788,1,344,788,5,5,789,2000,325,789,1,344,789,5,6,790,2000,326,790,1,344,790,5,7,791,2000,327,791,1,344,791,5,8,792,2000,328,792,1,344,792,5,9,793,2000,329,793,1,344,793,5,10,794,2000,330,794,1,344,794,5,11,795,2000,331,795,1,344,795,5,12,796,2000,332,796,1,344,796,5,13,797,2000,333,797,1,344,797,5,14,798,2000,334,798,1,344,798,5,15,799,2000,335,799,1,344,799,5,16,800,2000,336,800,1,344,800,5,345,801,0.2,346,801,-0.19,346,802,0.2,347,802,-0.19,347,803,0.2,348,803,-0.19,348,804,0.2,349,804,-0.19,349,805,0.2,350,805,-0.19,350,806,0.2,351,806,-0.19,351,807,0.2,352,807,-0.19,352,808,0.2,353,808,-0.19,353,809,0.2,354,809,-0.19,354,810,0.2,355,810,-0.19,355,811,0.2,356,811,-0.19,356,812,0.2,357,812,-0.19,357,813,0.2,358,813,-0.19,358,814,0.2,359,814,-0.19,359,815,0.2,360,815,-0.19,360,816,0.2],"description":"%MatrixMarket matrix coordinate real general\n-------------------------------------------------------------------------------\n UF Sparse Matrix Collection, Tim Davis\n http://www.cise.ufl.edu/research/sparse/matrices/LPnetlib/lp_etamacro\n name: LPnetlib/lp_etamacro\n [Netlib LP problem etamacro: minimize c'*x, where Ax=b, lo<=x<=hi]\n id: 621\n date: \n author: M. Saunders\n ed: D. Gay\n fields: title name A b id aux kind date author ed notes\n aux: c lo hi z0\n kind: linear programming problem\n-------------------------------------------------------------------------------\n notes:\n A Netlib LP problem, in lp/data. For more information \n send email to netlib@ornl.gov with the message: \n \n \t send index from lp \n \t send readme from lp/data \n \t send minos from lp/data \n \n The following are relevant excerpts from lp/data/readme (by David M. Gay): \n \n The column and nonzero counts in the PROBLEM SUMMARY TABLE below exclude \n slack and surplus columns and the right-hand side vector, but include \n the cost row. We have omitted other free rows and all but the first \n right-hand side vector, as noted below. The byte count is for the \n MPS compressed file; it includes a newline character at the end of each \n line. These files start with a blank initial line intended to prevent \n mail programs from discarding any of the data. The BR column indicates \n whether a problem has bounds or ranges: B stands for \"has bounds\", R \n for \"has ranges\". The BOUND-TYPE TABLE below shows the bound types \n present in those problems that have bounds. \n \n The optimal value is from MINOS version 5.3 (of Sept. 1988) \n running on a VAX with default options. \n \n PROBLEM SUMMARY TABLE \n \n Name Rows Cols Nonzeros Bytes BR Optimal Value \n ETAMACRO 401 688 2489 21915 B -7.5571521774E+02 \n \n BOUND-TYPE TABLE \n ETAMACRO UP LO FX \n \n From Michael Saunders, Systems Optimization Laboratory at Stanford University.\n When included in Netlib: Cost coefficients negated. \n \n Bob Bixby reports that the CPLEX solver (running on a Sparc station) \n finds slightly different optimal values for some of the problems. \n On a MIPS processor, MINOS version 5.3 (with crash and scaling of \n December 1989) also finds different optimal values for some of the \n problems. The following table shows the values that differ from those \n shown above. (Whether CPLEX finds different values on the recently \n added problems remains to be seen.) \n \n Problem CPLEX(Sparc) MINOS(MIPS) \n ETAMACRO -7.5571523337E+02 -7.5571522100E+02 \n \n The following are relevant excerts from lp/data/minos (by Michael Saunders), \n regarding experience with MINOS 5.0 on the problems he provided: \n \n (unscaled) (scaled) \n File Name Rows Cols Elems Optimal Objective Itns Time Itns Time \n ---- -------- ---- ---- ----- ----------------- ---- ---- ---- ---- \n 12. ETAMACRO 401 689 2489 7.5571521E+02 MAX 904 15.0 927 17.6 \n \n * Objective is the first row of type N. It is minimized except as shown. \n \n * Itns is the number of iterations required to solve the problem \n by the primal simplex method, as implemented in the Fortran \n code MINOS 5.0 (May 1985), using default values for all \n parameters. (The initial basis is triangular.) \n \n * Time is the processor time required on an IBM 3081K. The MINOS \n source code was compiled with the IBM Fortran 77 compiler \n VS FORTRAN, using the options NOSDUMP, NOSYM and OPT(3). \n \n-------------------------------------------------------------------------------"};