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1 CES - Centre d-économie de la Sorbonne 2 Thales Research and Technology Palaiseau

Abstract : The Choquet integral w.r.t. a capacity can be seen in the finite case as a parsimonious linear interpolator between vertices of $0,1^n$. We take this basic fact as a starting point to define the Choquet integral in a very general way, using the geometric realization of lattices and their natural triangulation, as in the work of Koshevoy. A second aim of the paper is to define a general mechanism for the bipolarization of ordered structures. Bisets or signed sets, as well as bisubmodular functions, bicapacities, bicooperative games, as well as the Choquet integral defined for them can be seen as particular instances of this scheme. Lastly, an application to multicriteria aggregation with multiple reference levels illustrates all the results presented in the paper.

keyword : Interpolation Choquet integral Lattice Bipolar structure

Author: Michel Grabisch - Christophe Labreuche -



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