When the Choquet integral Cv is used as an aggregation operator, this entropy can be interpreted as the degree to which one uses all the information contained in the arguments x = (x1,...,xn) when calculating the aggregated value Cv(x).
Mar 16, 2002 · We introduce a measure of entropy for any discrete Choquet capacity and we interpret it in the setting of aggregation by the Choquet integral.
PDF | On Jan 1, 1999, Jean-Luc Marichal and others published Entropy of a choquet capacity. | Find, read and cite all the research you need on ResearchGate.
We introduce a measure of entropy for any discrete Choquet capacity and we interpret it in the setting of aggregation by the Choquet integral. Keywords : ...
Mar 16, 2002 · In this paper we present an entropy-like measure defined for all discrete Choquet capacities. This “entropy” was proposed very recently by the ...
An axiomatization of the concept of entropy of a dis- crete Choquet capacity is given. It is based on three axioms: the symmetry property, a boundary condi-.
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To extend the classical Shannon entropy to nonadditive measures, Marichal recently introduced the concept of generalized entropy for discrete Choquet ...
Weight vectors of OWA operators are special cases of Choquet capacities for which the Shannon entropy has been defined. One can also consider the quadratic ...
In these fields, Choquet capacities are generally used to model either uncertainty (in evidence and possibility theories) or the importance of coalitions (in ...
Weight vectors of OWA operators are special cases of Choquet capacities for which the. Shannon entropy has been defined. One can also consider the quadratic ...