We propose a branch-and-bound algorithm for minimizing a not necessarily convex quadratic function over integer variables. The algorithm is based on lower bounds computed as continuous minima of the objective function over appropriate ellipsoids. In the nonconvex case, we use ellipsoids enclosing the feasible region of the problem. In spite of the nonconvexity, these minima can be computed quickly. We present several ideas that allow to accelerate the solution of the continuous relaxation within a branch-and-bound scheme and examine the performance of the overall algorithm by computational experiments
Many combinatorial optimization problems can be formulated as the minimization of a 0?1 quadratic fu...
We consider an integer program (QQP) where both the objective function and the constraints contain q...
Abstract To globally solve a nonconvex quadratic programming problem, this paper presents an acceler...
Abstract We propose a branch-and-bound algorithm for minimizing a not necessarily convex quadratic f...
We propose a branch-and-bound algorithm for minimizing a not necessarily convex quadratic function o...
We propose a branch-and-bound algorithm for minimizing a not necessarily convex quadratic function o...
We present a branch-and-bound algorithm for minimizing a convex quadratic objective function over in...
We propose two exact approaches for non-convex quadratic integer minimization subject to linear cons...
Let (MQP) be a general mixed-integer quadratic program that consists of minimizing a quadratic funct...
Interval branch-and-bound solvers provide reliable algorithms for handling non-convex optimization p...
We present a branch-and-bound algorithm for minimizing multiple convex quadratic objective function...
Abstract. We propose a branch-and-bound algorithm for solving nonconvex quadratically-constrained qu...
At the intersection of combinatorial and nonlinear optimization, quadratic programming (QP) plays an...
This paper introduces constructing convex-relaxed programs for nonconvex optimization problems. Bran...
We consider problem (QP) of minimizing a quadratic function subject to linear or quadratic constrain...
Many combinatorial optimization problems can be formulated as the minimization of a 0?1 quadratic fu...
We consider an integer program (QQP) where both the objective function and the constraints contain q...
Abstract To globally solve a nonconvex quadratic programming problem, this paper presents an acceler...
Abstract We propose a branch-and-bound algorithm for minimizing a not necessarily convex quadratic f...
We propose a branch-and-bound algorithm for minimizing a not necessarily convex quadratic function o...
We propose a branch-and-bound algorithm for minimizing a not necessarily convex quadratic function o...
We present a branch-and-bound algorithm for minimizing a convex quadratic objective function over in...
We propose two exact approaches for non-convex quadratic integer minimization subject to linear cons...
Let (MQP) be a general mixed-integer quadratic program that consists of minimizing a quadratic funct...
Interval branch-and-bound solvers provide reliable algorithms for handling non-convex optimization p...
We present a branch-and-bound algorithm for minimizing multiple convex quadratic objective function...
Abstract. We propose a branch-and-bound algorithm for solving nonconvex quadratically-constrained qu...
At the intersection of combinatorial and nonlinear optimization, quadratic programming (QP) plays an...
This paper introduces constructing convex-relaxed programs for nonconvex optimization problems. Bran...
We consider problem (QP) of minimizing a quadratic function subject to linear or quadratic constrain...
Many combinatorial optimization problems can be formulated as the minimization of a 0?1 quadratic fu...
We consider an integer program (QQP) where both the objective function and the constraints contain q...
Abstract To globally solve a nonconvex quadratic programming problem, this paper presents an acceler...