Many combinatorial optimization problems can be formulated as the minimization of a 0?1 quadratic function subject to linear constraints. In this paper, we are interested in the exact solution of this problem through a two-phase general scheme. The first phase consists in reformulating the initial problem either into a compact mixed integer linear program or into a 0?1 quadratic convex program. The second phase simply consists in submitting the reformulated problem to a standard solver. The efficiency of this scheme strongly depends on the quality of the reformulation obtained in phase 1. We show that a good compact linear reformulation can be obtained by solving a continuous linear relaxation of the initial problem. We also show that a goo...
Quadratic Convex Reformulation (QCR) is a technique that was originally proposed for quadratic 0-1 p...
We address the exact solution of general integer quadratic programs with linear constraints. These p...
In order to solve more easily combinatorial optimization problems, one way is to find theoretically ...
Abstract. Many combinatorial optimization problems can be formulated as the minimization of a 0-1 qu...
AbstractLet (QP) be a 0-1 quadratic program which consists in minimizing a quadratic function subjec...
Let View the MathML source be a 0-1 quadratic program which consists in minimizing a quadratic funct...
We consider problem (QP) of minimizing a quadratic function subject to linear or quadratic constrain...
We consider binary quadratic programs (QP) having a quadratic objectivefunction, linear constraints...
We describe the simplest technique to tackle 0-1 Quadratic Programs with linear constraints among th...
-Let (QP) be a binary quadratic program that consists in minimizing a quadratic function subject to ...
-Let (QP) be an integer quadratic program that consists in minimizing a quadratic functionsubject to...
At the intersection of combinatorial and nonlinear optimization, quadratic programming (QP) plays an...
We consider an integer program (QQP) where both the objective function and the constraints contain q...
We consider a general integer program (QQP) where both the objective function and the constraints ar...
Let (MQP) be a general mixed-integer quadratic program that consists of minimizing a quadratic funct...
Quadratic Convex Reformulation (QCR) is a technique that was originally proposed for quadratic 0-1 p...
We address the exact solution of general integer quadratic programs with linear constraints. These p...
In order to solve more easily combinatorial optimization problems, one way is to find theoretically ...
Abstract. Many combinatorial optimization problems can be formulated as the minimization of a 0-1 qu...
AbstractLet (QP) be a 0-1 quadratic program which consists in minimizing a quadratic function subjec...
Let View the MathML source be a 0-1 quadratic program which consists in minimizing a quadratic funct...
We consider problem (QP) of minimizing a quadratic function subject to linear or quadratic constrain...
We consider binary quadratic programs (QP) having a quadratic objectivefunction, linear constraints...
We describe the simplest technique to tackle 0-1 Quadratic Programs with linear constraints among th...
-Let (QP) be a binary quadratic program that consists in minimizing a quadratic function subject to ...
-Let (QP) be an integer quadratic program that consists in minimizing a quadratic functionsubject to...
At the intersection of combinatorial and nonlinear optimization, quadratic programming (QP) plays an...
We consider an integer program (QQP) where both the objective function and the constraints contain q...
We consider a general integer program (QQP) where both the objective function and the constraints ar...
Let (MQP) be a general mixed-integer quadratic program that consists of minimizing a quadratic funct...
Quadratic Convex Reformulation (QCR) is a technique that was originally proposed for quadratic 0-1 p...
We address the exact solution of general integer quadratic programs with linear constraints. These p...
In order to solve more easily combinatorial optimization problems, one way is to find theoretically ...