论文信息 - Sklar's Theorem in Finite Settings

Sklar's Theorem in Finite Settings

This paper deals with the well-known Sklar's theorem, which shows how joint distribution functions are related to their marginals by means of copulas. The main goal is to prove a discrete version of this theorem involving copula-like operators defined on a finite chain, that will be called discrete copulas. First, the idea of subcopulas in this finite setting is introduced and the problem of extending a subcopula to a copula is solved. This is precisely the key point which allows to state and prove the discrete version of Sklar's theorem.

[1] M. Sklar. Fonctions de repartition a n dimensions et leurs marges , 1959 .

[2] R. Nelsen. An Introduction to Copulas , 1998 .

[3] R. Mesiar,et al. On a family of copulas constructed from the diagonal section , 2006, Soft Comput..

[4] Joan Torrens,et al. Copula-like operations on finite settings , 2005, IEEE Transactions on Fuzzy Systems.

[5] Anna Kolesárová,et al. Extension to copulas and quasi-copulas as special 1-Lipschitz aggregation operators , 2005, Kybernetika.

[6] Radko Mesiar,et al. Invariant copulas , 2002, Kybernetika.

[7] G. Mayor,et al. Triangular norms on discrete settings , 2005 .