AbstractWe address here the problem of minimizing Choquet Integrals (also known as “Lovász Extensions”) over solution sets which can be either polyhedra or (mixed) integer sets. Typical applications of such problems concern the search of compromise solutions in multicriteria optimization. We focus here on the case where the Choquet Integrals to be minimized are convex, implying that the set functions (or “capacities”) underlying the Choquet Integrals considered are submodular. We first describe an approach based on a large scale LP formulation, and show how it can be handled via the so-called column-generation technique. We next investigate alternatives based on compact LP formulations, i.e. featuring a polynomial number of variables and co...
This survey is concerned with the size of perfect formulations for combinatorial optimization proble...
The problem investigated in this work concerns the integration of a decision-maker preference model ...
The best formulations for some combinatorial optimization problems are integer linear programming ...
AbstractWe address here the problem of minimizing Choquet Integrals (also known as “Lovász Extension...
This paper is devoted to the search for Choquet-optimal solutions in multicriteria combinatorial opt...
International audienceThis paper is devoted to the search for Choquet-optimal solutions in multicrit...
We explore one method for finding the convex hull of certain mixed integer sets. The approach is to ...
We explore one method for finding the convex hull of certain mixed integer sets. The approach is to ...
We study the problem of maximizing constrained non-monotone submodular functions and provide approxi...
Abstract We study in this paper the generation of the Choquet optimal solutions of biobjective combi...
International audienceThe Choquet integral w.r.t. a capacity is a versatile tool commonly used in de...
This paper is devoted to the search of Choquet-optimal solutions in finite graph problems with multi...
International audienceSubmodular set-functions have many applications in combinatorial optimization,...
The best formulations for some combinatorial optimization problems are integer linear programming mo...
There are many combinatorial problems which can be effectively dealt with via Integer Linear Program...
This survey is concerned with the size of perfect formulations for combinatorial optimization proble...
The problem investigated in this work concerns the integration of a decision-maker preference model ...
The best formulations for some combinatorial optimization problems are integer linear programming ...
AbstractWe address here the problem of minimizing Choquet Integrals (also known as “Lovász Extension...
This paper is devoted to the search for Choquet-optimal solutions in multicriteria combinatorial opt...
International audienceThis paper is devoted to the search for Choquet-optimal solutions in multicrit...
We explore one method for finding the convex hull of certain mixed integer sets. The approach is to ...
We explore one method for finding the convex hull of certain mixed integer sets. The approach is to ...
We study the problem of maximizing constrained non-monotone submodular functions and provide approxi...
Abstract We study in this paper the generation of the Choquet optimal solutions of biobjective combi...
International audienceThe Choquet integral w.r.t. a capacity is a versatile tool commonly used in de...
This paper is devoted to the search of Choquet-optimal solutions in finite graph problems with multi...
International audienceSubmodular set-functions have many applications in combinatorial optimization,...
The best formulations for some combinatorial optimization problems are integer linear programming mo...
There are many combinatorial problems which can be effectively dealt with via Integer Linear Program...
This survey is concerned with the size of perfect formulations for combinatorial optimization proble...
The problem investigated in this work concerns the integration of a decision-maker preference model ...
The best formulations for some combinatorial optimization problems are integer linear programming ...