This paper is devoted to the search for Choquet-optimal solutions in multicriteria combinatorial optimization with application to spanning tree problems and knapsack problems. After recalling basic notions concerning the use of Choquet integrals for preference aggregation, we present a condition (named preference for interior points) that characterizes preferences favoring well-balanced solutions, a natural attitude in multicriteria optimization. When using a Choquet integral as preference model, this condition amounts to choosing a submodular (resp. supermodular) capacity when criteria have to be minimized (resp. maximized). Under this assumption, we investigate the determination of Choquet-optimal solutions in the multicriteria spanning t...
An algorithm for solving the knapsack problem based on the proposed multi-criteria model is consider...
International audienceThe problem investigated in this paper concerns the integration of a decision ...
After the seminal books by Martello and Toth (1990) and Kellerer, Pferschy, and Pisinger (2004), kna...
International audienceThis paper is devoted to the search for Choquet-optimal solutions in multicrit...
This paper is devoted to the search of Choquet-optimal solutions in finite graph problems with multi...
Abstract We study in this paper the generation of the Choquet optimal solutions of biobjective combi...
The problem investigated in this work concerns the integration of a decision-maker preference model ...
The Multi-Criteria Decision Aid (MCDA) research field focuses on building a preference model that he...
International audienceIn this paper we propose a general integration scheme for a Multi-Criteria Dec...
International audienceIn this paper we propose a general integration scheme for a Multi-Criteria Dec...
International audienceIn this paper we address the multiperson decision making problem when the pref...
The search for well-balanced solutions in multiobjective problems is a major issue in decision-makin...
This paper focuses on a multi-objective derivation of branch-and-bound procedures. Such a procedure ...
AbstractWe address here the problem of minimizing Choquet Integrals (also known as “Lovász Extension...
The current approaches to construct a multi-criteria model based on a Choquet integral are split int...
An algorithm for solving the knapsack problem based on the proposed multi-criteria model is consider...
International audienceThe problem investigated in this paper concerns the integration of a decision ...
After the seminal books by Martello and Toth (1990) and Kellerer, Pferschy, and Pisinger (2004), kna...
International audienceThis paper is devoted to the search for Choquet-optimal solutions in multicrit...
This paper is devoted to the search of Choquet-optimal solutions in finite graph problems with multi...
Abstract We study in this paper the generation of the Choquet optimal solutions of biobjective combi...
The problem investigated in this work concerns the integration of a decision-maker preference model ...
The Multi-Criteria Decision Aid (MCDA) research field focuses on building a preference model that he...
International audienceIn this paper we propose a general integration scheme for a Multi-Criteria Dec...
International audienceIn this paper we propose a general integration scheme for a Multi-Criteria Dec...
International audienceIn this paper we address the multiperson decision making problem when the pref...
The search for well-balanced solutions in multiobjective problems is a major issue in decision-makin...
This paper focuses on a multi-objective derivation of branch-and-bound procedures. Such a procedure ...
AbstractWe address here the problem of minimizing Choquet Integrals (also known as “Lovász Extension...
The current approaches to construct a multi-criteria model based on a Choquet integral are split int...
An algorithm for solving the knapsack problem based on the proposed multi-criteria model is consider...
International audienceThe problem investigated in this paper concerns the integration of a decision ...
After the seminal books by Martello and Toth (1990) and Kellerer, Pferschy, and Pisinger (2004), kna...