We study the parameterized complexity of Integer Quadratic Programming under two kinds of restrictions: explicit restrictions on the domain or coefficients, and structural restrictions on variable interactions. We argue that both kinds of restrictions are necessary to achieve tractability for Integer Quadratic Programming, and obtain four new algorithms for the problem that are tuned to possible explicit restrictions of instances that we may wish to solve. The presented algorithms are exact, deterministic, and complemented by appropriate lower bounds
One common approach to solve optimization problems is the primal method. One starts with a feasible ...
The problem of integer programming in bounded variables, over constraints with no more than twovari...
Integer Linear Programming (ILP) is among the most successful and general paradigms for solving comp...
We study the parameterized complexity of Integer Quadratic Programming under two kinds of restrictio...
Recently a number of algorithmic results have appeared which show the tractability of Integer Linear...
Research efforts of the past fifty years have led to a development of linear integer progra...
We consider a general integer program (QQP) where both the objective function and the constraints ar...
Summary form only given. Integer programming is the problem of maximizing a linear function over the...
AbstractThe complexity of linearly constrained (nonconvex) quadratic programming is analyzed within ...
The thesis argues the case for exploiting certain structures in integer linear programs. Integer ...
Many problems in economics, statistics and numerical analysis can be formulated as the optimization ...
We consider an integer program (QQP) where both the objective function and the constraints contain q...
- Let (QP) be an integer quadratic program that consists in minimizing a quadratic function subject ...
International audienceWe consider quadratic programs with pure general integer variables. The object...
Mixed-integer quadratic programming (MIQP) is the problem of optimizing a quadratic function over po...
One common approach to solve optimization problems is the primal method. One starts with a feasible ...
The problem of integer programming in bounded variables, over constraints with no more than twovari...
Integer Linear Programming (ILP) is among the most successful and general paradigms for solving comp...
We study the parameterized complexity of Integer Quadratic Programming under two kinds of restrictio...
Recently a number of algorithmic results have appeared which show the tractability of Integer Linear...
Research efforts of the past fifty years have led to a development of linear integer progra...
We consider a general integer program (QQP) where both the objective function and the constraints ar...
Summary form only given. Integer programming is the problem of maximizing a linear function over the...
AbstractThe complexity of linearly constrained (nonconvex) quadratic programming is analyzed within ...
The thesis argues the case for exploiting certain structures in integer linear programs. Integer ...
Many problems in economics, statistics and numerical analysis can be formulated as the optimization ...
We consider an integer program (QQP) where both the objective function and the constraints contain q...
- Let (QP) be an integer quadratic program that consists in minimizing a quadratic function subject ...
International audienceWe consider quadratic programs with pure general integer variables. The object...
Mixed-integer quadratic programming (MIQP) is the problem of optimizing a quadratic function over po...
One common approach to solve optimization problems is the primal method. One starts with a feasible ...
The problem of integer programming in bounded variables, over constraints with no more than twovari...
Integer Linear Programming (ILP) is among the most successful and general paradigms for solving comp...