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Instance kall_circlesrectangles_c1r13

A set of circles and rectangles are to be cut from rectangular design plates to be produced, or from a set of stocked rectangles of known geometric dimensions.
The objective is to minimize the area of the design rectangles.
The design plates are subject to lower and upper bounds of their widths and lengths.
The objects are free of any orientation restrictions.
Formats ams gms lp mod nl osil pip py
Primal Bounds (infeas ≤ 1e-08)
0.71460184 p1 ( gdx sol )
(infeas: 9e-11)
0.21460184 p2 ( gdx sol )
(infeas: 3e-14)
Other points (infeas > 1e-08)  
Dual Bounds
0.21460152 (ANTIGONE)
0.21459343 (BARON)
0.21460184 (COUENNE)
0.21460007 (GUROBI)
0.21460180 (LINDO)
0.21459985 (SCIP)
References Kallrath, Josef, Cutting circles and polygons from area-minimizing rectangles, Journal of Global Optimization, 43:2-3, 2009, 299-328.
Source ANTIGONE test library model Other_MIQCQP/kall_circlesrectangles_c1r13
Application Geometry
Added to library 15 Aug 2014
Problem type QCP
#Variables 49
#Binary Variables 0
#Integer Variables 0
#Nonlinear Variables 19
#Nonlinear Binary Variables 0
#Nonlinear Integer Variables 0
Objective Sense min
Objective type linear
Objective curvature linear
#Nonzeros in Objective 1
#Nonlinear Nonzeros in Objective 0
#Constraints 52
#Linear Constraints 29
#Quadratic Constraints 23
#Polynomial Constraints 0
#Signomial Constraints 0
#General Nonlinear Constraints 0
Operands in Gen. Nonlin. Functions  
Constraints curvature indefinite
#Nonzeros in Jacobian 153
#Nonlinear Nonzeros in Jacobian 48
#Nonzeros in (Upper-Left) Hessian of Lagrangian 48
#Nonzeros in Diagonal of Hessian of Lagrangian 6
#Blocks in Hessian of Lagrangian 5
Minimal blocksize in Hessian of Lagrangian 2
Maximal blocksize in Hessian of Lagrangian 7
Average blocksize in Hessian of Lagrangian 3.8
#Semicontinuities 0
#Nonlinear Semicontinuities 0
#SOS type 1 0
#SOS type 2 0
Minimal coefficient 5.0000e-01
Maximal coefficient 2.0000e+00
Infeasibility of initial point 2.25
Sparsity Jacobian Sparsity of Objective Gradient and Jacobian
Sparsity Hessian of Lagrangian Sparsity of Hessian of Lagrangian

$offlisting
*  
*  Equation counts
*      Total        E        G        L        N        X        C        B
*         52       40        0       12        0        0        0        0
*  
*  Variable counts
*                   x        b        i      s1s      s2s       sc       si
*      Total     cont   binary  integer     sos1     sos2    scont     sint
*         49       49        0        0        0        0        0        0
*  FX      0
*  
*  Nonzero counts
*      Total    const       NL      DLL
*        153      105       48        0
*
*  Solve m using NLP minimizing objvar;


Variables  x1,x2,x3,x4,x5,x6,x7,x8,x9,x10,x11,x12,x13,x14,x15,x16,x17,x18,x19
          ,x20,x21,x22,x23,x24,x25,x26,x27,x28,x29,x30,x31,x32,x33,x34,x35,x36
          ,x37,x38,x39,x40,x41,x42,x43,x44,x45,x46,x47,x48,objvar;

Positive Variables  x2,x3,x4,x5,x6,x7,x37,x38,x39,x40,x41,x42,x43,x44,x45,x46
          ,x47,x48;

Equations  e1,e2,e3,e4,e5,e6,e7,e8,e9,e10,e11,e12,e13,e14,e15,e16,e17,e18,e19
          ,e20,e21,e22,e23,e24,e25,e26,e27,e28,e29,e30,e31,e32,e33,e34,e35,e36
          ,e37,e38,e39,e40,e41,e42,e43,e44,e45,e46,e47,e48,e49,e50,e51,e52;


e1..  - x1 + objvar =E= -2.28539816339745;

e2.. -x37*x38 + x1 =E= 0;

e3..    x35 - x37 =L= -0.5;

e4..    x36 - x38 =L= -0.5;

e5..  - x37 + x39 =L= 0;

e6..  - x38 + x40 =L= 0;

e7..  - x37 + x41 =L= 0;

e8..  - x38 + x42 =L= 0;

e9..  - x37 + x43 =L= 0;

e10..  - x38 + x44 =L= 0;

e11..  - x37 + x45 =L= 0;

e12..  - x38 + x46 =L= 0;

e13..    x27 + x39 - x41 =E= 0;

e14..    x28 + x40 - x42 =E= 0;

e15..    x29 + x41 - x43 =E= 0;

e16..    x30 + x42 - x44 =E= 0;

e17..    x31 + x43 - x45 =E= 0;

e18..    x32 + x44 - x46 =E= 0;

e19..    x33 - x39 + 2*x45 - x47 =E= 0;

e20..    x34 - x40 + 2*x46 - x48 =E= 0;

e21.. x27*x29 + x28*x30 =E= 0;

e22..    x27 + x31 =E= 0;

e23..    x28 + x32 =E= 0;

e24..    x29 + x33 =E= 0;

e25..    x30 + x34 =E= 0;

e26.. x27*x27 + x28*x28 =E= 2.25;

e27.. x29*x29 + x30*x30 =E= 1;

e28.. x13*x13 + x14*x14 =E= 1;

e29..  - x14 + x15 =E= 0;

e30..    x13 + x16 =E= 0;

e31.. x13*x8 + x2 + x17 - x39 =E= 0;

e32.. x14*x8 + x3 + x18 - x40 =E= 0;

e33.. x13*x9 + x2 + x19 - x41 =E= 0;

e34.. x14*x9 + x3 + x20 - x42 =E= 0;

e35.. x13*x10 + x2 + x21 - x43 =E= 0;

e36.. x14*x10 + x3 + x22 - x44 =E= 0;

e37.. x13*x11 + x2 + x23 - x45 =E= 0;

e38.. x14*x11 + x3 + x24 - x46 =E= 0;

e39.. x13*x12 + x2 + x25 - x35 =E= 0;

e40.. x14*x12 + x3 + x26 - x36 =E= 0;

e41.. -x4*x15 + x17 =E= 0;

e42.. -x4*x16 + x18 =E= 0;

e43.. -x5*x15 + x19 =E= 0;

e44.. -x5*x16 + x20 =E= 0;

e45.. -x6*x15 + x21 =E= 0;

e46.. -x6*x16 + x22 =E= 0;

e47.. -x7*x15 + x23 =E= 0;

e48.. -x7*x16 + x24 =E= 0;

e49..    0.5*x15 + x25 =E= 0;

e50..    0.5*x16 + x26 =E= 0;

e51..    x35 =L= 1.5;

e52..    x36 =L= 1.25;

* set non-default bounds
x1.lo = 0.25; x1.up = 7.5;
x2.up = 3;
x3.up = 2.5;
x4.up = 3.90512483795333;
x5.up = 3.90512483795333;
x6.up = 3.90512483795333;
x7.up = 3.90512483795333;
x8.lo = -3.90512483795333; x8.up = 3.90512483795333;
x9.lo = -3.90512483795333; x9.up = 3.90512483795333;
x10.lo = -3.90512483795333; x10.up = 3.90512483795333;
x11.lo = -3.90512483795333; x11.up = 3.90512483795333;
x12.lo = -3.90512483795333; x12.up = 3.90512483795333;
x13.lo = -1; x13.up = 1;
x14.lo = -1; x14.up = 1;
x15.lo = -1; x15.up = 1;
x16.lo = -1; x16.up = 1;
x17.lo = -3.90512483795333; x17.up = 3.90512483795333;
x18.lo = -3.90512483795333; x18.up = 3.90512483795333;
x19.lo = -3.90512483795333; x19.up = 3.90512483795333;
x20.lo = -3.90512483795333; x20.up = 3.90512483795333;
x21.lo = -3.90512483795333; x21.up = 3.90512483795333;
x22.lo = -3.90512483795333; x22.up = 3.90512483795333;
x23.lo = -3.90512483795333; x23.up = 3.90512483795333;
x24.lo = -3.90512483795333; x24.up = 3.90512483795333;
x25.lo = -3.90512483795333; x25.up = 3.90512483795333;
x26.lo = -3.90512483795333; x26.up = 3.90512483795333;
x27.lo = -1; x27.up = 1;
x28.lo = -1.5; x28.up = 1.5;
x29.lo = -1; x29.up = 1;
x30.lo = -1.5; x30.up = 1.5;
x31.lo = -1; x31.up = 1;
x32.lo = -1.5; x32.up = 1.5;
x33.lo = -1; x33.up = 1;
x34.lo = -1.5; x34.up = 1.5;
x35.lo = 0.5; x35.up = 2.5;
x36.lo = 0.5; x36.up = 2;
x37.up = 3;
x38.up = 2.5;
x39.up = 3;
x40.up = 2.5;
x41.up = 3;
x42.up = 2.5;
x43.up = 3;
x44.up = 2.5;
x45.up = 3;
x46.up = 2.5;
x47.up = 3;
x48.up = 2.5;
objvar.lo = 0; objvar.up = 7.5;

Model m / all /;

m.limrow=0; m.limcol=0;
m.tolproj=0.0;

$if NOT '%gams.u1%' == '' $include '%gams.u1%'

$if not set NLP $set NLP NLP
Solve m using %NLP% minimizing objvar;


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