We propose two exact approaches for non-convex quadratic integer minimization subject to linear constraints where lower bounds are computed by considering ellipsoidal relaxations of the feasible set. In the first approach, we intersect the ellipsoids with the feasible linear subspace. In the second approach we penalize exactly the linear constraints. We investigate the connection between both approaches theoretically. Experimental results show that the penalty approach significantly outperforms CPLEX on problems with small or medium size variable domains. © 2015 Elsevier B.V. All rights reserved
In this work, we propose a strategy for computing valid lower bounds for a specific class of integer...
International audienceThe class of mixed-integer quadratically constrained quadratic programs (QCQP)...
In many practical applications, the task is to optimize a non-linear objective function over the ver...
We propose a branch-and-bound algorithm for minimizing a not necessarily convex quadratic function o...
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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 ...
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Non-convex quadratic programming with box constraints is a fundamental problem in the global optimiz...
Let (MQP) be a general mixed-integer quadratic program that consists of minimizing a quadratic funct...
Non-convex quadratic programming with box constraints is a fundamental problem in the global optimi...
We propose a branch-and-bound method for minimizing an indefinite quadratic function over a convex s...
In this work, we propose a strategy for computing valid lower bounds for a specific class of integer...
International audienceThe class of mixed-integer quadratically constrained quadratic programs (QCQP)...
In many practical applications, the task is to optimize a non-linear objective function over the ver...
We propose a branch-and-bound algorithm for minimizing a not necessarily convex quadratic function o...
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 ...
none3siWe present a branch-and-bound algorithm for minimizing a convex quadratic objective function ...
At the intersection of combinatorial and nonlinear optimization, quadratic programming (QP) plays an...
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...
Non-convex quadratic programming with box constraints is a fundamental problem in the global optimiz...
Let (MQP) be a general mixed-integer quadratic program that consists of minimizing a quadratic funct...
Non-convex quadratic programming with box constraints is a fundamental problem in the global optimi...
We propose a branch-and-bound method for minimizing an indefinite quadratic function over a convex s...
In this work, we propose a strategy for computing valid lower bounds for a specific class of integer...
International audienceThe class of mixed-integer quadratically constrained quadratic programs (QCQP)...
In many practical applications, the task is to optimize a non-linear objective function over the ver...