论文信息 - On Compatibility of Two Approaches to Generalization of the Lovász Extension Formula

On Compatibility of Two Approaches to Generalization of the Lovász Extension Formula

We present a method of generalization of the Lovász extension formula combining two known approaches - the first of them based on the replacement of the product operator by some suitable binary function F and the second one based on the replacement of the minimum operator by a suitable aggregation function A. We propose generalization by simultaneous replacement of both product and minimum operators and investigate pairs (F, A) yielding an aggregation function for all capacities.

Ľubomíra Horanská | L. Horanská

[1] G. Owen. Multilinear Extensions of Games , 1972 .

[2] J. Aczél,et al. Lectures on Functional Equations and Their Applications , 1968 .

[3] Humberto Bustince,et al. A Generalization of the Choquet Integral Defined in Terms of the Möbius Transform , 2020, IEEE Transactions on Fuzzy Systems.

[4] László Lovász,et al. Submodular functions and convexity , 1982, ISMP.

[5] Anna Kolesárová,et al. Aggregation-based extensions of fuzzy measures , 2012, Fuzzy Sets Syst..

[6] G. Choquet. Theory of capacities , 1954 .

[7] M. Sugeno,et al. Non-monotonic fuzzy measures and the Choquet integral , 1994 .

[8] Martin Grötschel,et al. Mathematical Programming The State of the Art, XIth International Symposium on Mathematical Programming, Bonn, Germany, August 23-27, 1982 , 1983, ISMP.

[9] Humberto Bustince,et al. The state-of-art of the generalizations of the Choquet integral: From aggregation and pre-aggregation to ordered directionally monotone functions , 2020, Inf. Fusion.

[10] R. Mesiar,et al. ”Aggregation Functions”, Cambridge University Press , 2008, 2008 6th International Symposium on Intelligent Systems and Informatics.

[11] Michel Grabisch,et al. Exact bounds of the Möbius inverse of monotone set functions , 2015, Discret. Appl. Math..