g3 0 1 0 # problem kall_circlesrectangles_c1r13 49 52 1 0 40 # vars, constraints, objectives, ranges, eqns 23 0 # nonlinear constraints, objectives 0 0 # network constraints: nonlinear, linear 19 0 0 # nonlinear vars in constraints, objectives, both 0 0 0 1 # linear network variables; functions; arith, flags 0 0 0 0 0 # discrete variables: binary, integer, nonlinear (b,c,o) 153 1 # nonzeros in Jacobian, gradients 3 6 # max name lengths: constraints, variables 0 0 0 0 0 # common exprs: b,c,o,c1,o1 b 0 0 3.90512483795333 0 0 3.90512483795333 0 0 3.90512483795333 0 0 3.90512483795333 0 -3.90512483795333 3.90512483795333 0 -3.90512483795333 3.90512483795333 0 -3.90512483795333 3.90512483795333 0 -3.90512483795333 3.90512483795333 0 -3.90512483795333 3.90512483795333 0 -1 1 0 -1 1 0 -1 1 0 -1 1 0 -1 1 0 -1.5 1.5 0 -1 1 0 -1.5 1.5 0 0 3 0 0 2.5 0 .25 7.5 0 0 3 0 0 2.5 0 -3.90512483795333 3.90512483795333 0 -3.90512483795333 3.90512483795333 0 -3.90512483795333 3.90512483795333 0 -3.90512483795333 3.90512483795333 0 -3.90512483795333 3.90512483795333 0 -3.90512483795333 3.90512483795333 0 -3.90512483795333 3.90512483795333 0 -3.90512483795333 3.90512483795333 0 -3.90512483795333 3.90512483795333 0 -3.90512483795333 3.90512483795333 0 -1 1 0 -1.5 1.5 0 -1 1 0 -1.5 1.5 0 .5 2.5 0 .5 2 0 0 3 0 0 2.5 0 0 3 0 0 2.5 0 0 3 0 0 2.5 0 0 3 0 0 2.5 0 0 3 0 0 2.5 0 0 7.5 x3 19 .25 36 .5 37 .5 r 4 0 4 0 4 2.25 4 1 4 1 4 0 4 0 4 0 4 0 4 0 4 0 4 0 4 0 4 0 4 0 4 0 4 0 4 0 4 0 4 0 4 0 4 0 4 0 4 -2.28539816339745 1 -.5 1 -.5 1 0 1 0 1 0 1 0 1 0 1 0 1 0 1 0 4 0 4 0 4 0 4 0 4 0 4 0 4 0 4 0 4 0 4 0 4 0 4 0 4 0 4 0 4 0 4 0 1 1.5 1 1.25 C0 o16 o2 v17 v18 C1 o0 o2 v13 v15 o2 v14 v16 C2 o0 o2 v13 v13 o2 v14 v14 C3 o0 o2 v15 v15 o2 v16 v16 C4 o0 o2 v9 v9 o2 v10 v10 C5 o2 v9 v4 C6 o2 v10 v4 C7 o2 v9 v5 C8 o2 v10 v5 C9 o2 v9 v6 C10 o2 v10 v6 C11 o2 v9 v7 C12 o2 v10 v7 C13 o2 v9 v8 C14 o2 v10 v8 C15 o16 o2 v0 v11 C16 o16 o2 v0 v12 C17 o16 o2 v1 v11 C18 o16 o2 v1 v12 C19 o16 o2 v2 v11 C20 o16 o2 v2 v12 C21 o16 o2 v3 v11 C22 o16 o2 v3 v12 C23 n0 C24 n0 C25 n0 C26 n0 C27 n0 C28 n0 C29 n0 C30 n0 C31 n0 C32 n0 C33 n0 C34 n0 C35 n0 C36 n0 C37 n0 C38 n0 C39 n0 C40 n0 C41 n0 C42 n0 C43 n0 C44 n0 C45 n0 C46 n0 C47 n0 C48 n0 C49 n0 C50 n0 C51 n0 O0 0 n0 k48 2 4 6 8 10 12 14 16 18 25 32 38 44 48 52 56 60 66 72 74 79 84 86 88 90 92 94 96 98 100 102 104 106 108 110 112 115 118 122 126 130 134 138 142 146 150 151 152 J0 3 17 0 18 0 19 1 J1 4 13 0 14 0 15 0 16 0 J2 2 13 0 14 0 J3 2 15 0 16 0 J4 2 9 0 10 0 J5 5 4 0 9 0 20 1 22 1 38 -1 J6 5 4 0 10 0 21 1 23 1 39 -1 J7 5 5 0 9 0 20 1 24 1 40 -1 J8 5 5 0 10 0 21 1 25 1 41 -1 J9 5 6 0 9 0 20 1 26 1 42 -1 J10 5 6 0 10 0 21 1 27 1 43 -1 J11 5 7 0 9 0 20 1 28 1 44 -1 J12 5 7 0 10 0 21 1 29 1 45 -1 J13 5 8 0 9 0 20 1 30 1 36 -1 J14 5 8 0 10 0 21 1 31 1 37 -1 J15 3 0 0 11 0 22 1 J16 3 0 0 12 0 23 1 J17 3 1 0 11 0 24 1 J18 3 1 0 12 0 25 1 J19 3 2 0 11 0 26 1 J20 3 2 0 12 0 27 1 J21 3 3 0 11 0 28 1 J22 3 3 0 12 0 29 1 J23 2 19 -1 48 1 J24 2 17 -1 36 1 J25 2 18 -1 37 1 J26 2 17 -1 38 1 J27 2 18 -1 39 1 J28 2 17 -1 40 1 J29 2 18 -1 41 1 J30 2 17 -1 42 1 J31 2 18 -1 43 1 J32 2 17 -1 44 1 J33 2 18 -1 45 1 J34 3 13 1 38 1 40 -1 J35 3 14 1 39 1 41 -1 J36 3 15 1 40 1 42 -1 J37 3 16 1 41 1 43 -1 J38 3 32 1 42 1 44 -1 J39 3 33 1 43 1 45 -1 J40 4 34 1 38 -1 44 2 46 -1 J41 4 35 1 39 -1 45 2 47 -1 J42 2 13 1 32 1 J43 2 14 1 33 1 J44 2 15 1 34 1 J45 2 16 1 35 1 J46 2 10 -1 11 1 J47 2 9 1 12 1 J48 2 11 .5 30 1 J49 2 12 .5 31 1 J50 1 36 1 J51 1 37 1 G0 1 48 1