We present a branch-and-bound algorithm for minimizing a convex quadratic objective function over integer variables subject to convex constraints. In a given node of the enumeration tree, corresponding to the fixing of a subset of the variables, a lower bound is given by the continuous minimum of the restricted objective function. We improve this bound by exploiting the integrality of the variables using suitably-defined lattice-free ellipsoids. Experiments show that our approach is very fast on both unconstrained problems and problems with box constraints. The main reason is that all expensive calculations can be done in a preprocessing phase, while a single node in the enumeration tree can be processed in linear time in the problem dimens...
AbstractThis paper presents a Branch and Bound method for a nonconvex integer quadratic programming ...
Let (MQP) be a MIQP that consists in minimizing a quadratic function subject to linear constraints. ...
We consider a general integer program (QQP) where both the objective function and the constraints ar...
We present a branch-and-bound algorithm for minimizing a convex quadratic objective function over in...
We propose a branch-and-bound algorithm for minimizing a not necessarily convex quadratic function ...
We present a branch-and-bound algorithm for minimizing multiple convex quadratic objective function...
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 propose two exact approaches for non-convex quadratic integer minimization subject to linear cons...
In this paper we propose convex and LP bounds for standard quadratic programming (StQP) problems and...
Let (MQP) be a general mixed-integer quadratic program that consists of minimizing a quadratic funct...
The branch and bound principle has long been established as an effective computational tool for solv...
We consider problem (QP) of minimizing a quadratic function subject to linear or quadratic constrain...
We propose a branch-and-bound method for minimizing an indefinite quadratic function over a convex s...
AbstractThis paper presents a Branch and Bound method for a nonconvex integer quadratic programming ...
Let (MQP) be a MIQP that consists in minimizing a quadratic function subject to linear constraints. ...
We consider a general integer program (QQP) where both the objective function and the constraints ar...
We present a branch-and-bound algorithm for minimizing a convex quadratic objective function over in...
We propose a branch-and-bound algorithm for minimizing a not necessarily convex quadratic function ...
We present a branch-and-bound algorithm for minimizing multiple convex quadratic objective function...
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 propose two exact approaches for non-convex quadratic integer minimization subject to linear cons...
In this paper we propose convex and LP bounds for standard quadratic programming (StQP) problems and...
Let (MQP) be a general mixed-integer quadratic program that consists of minimizing a quadratic funct...
The branch and bound principle has long been established as an effective computational tool for solv...
We consider problem (QP) of minimizing a quadratic function subject to linear or quadratic constrain...
We propose a branch-and-bound method for minimizing an indefinite quadratic function over a convex s...
AbstractThis paper presents a Branch and Bound method for a nonconvex integer quadratic programming ...
Let (MQP) be a MIQP that consists in minimizing a quadratic function subject to linear constraints. ...
We consider a general integer program (QQP) where both the objective function and the constraints ar...