summary:We study a wide class of copulas which generalizes well-known families of copulas, such as the semilinear copulas. We also study corresponding results for the case of quasi-copulas
summary:We characterize some bivariate semicopulas and, among them, the semicopulas satisfying a Lip...
summary:Transformations of copulas by means of increasing bijections on the unit interval and attrac...
• Study of (bivariate) quasi-copulas with fractal mass distributions. • Study of the mass distributi...
summary:We study a wide class of copulas which generalizes well-known families of copulas, such as t...
We characterize the transformation, defined for every copula $C$, by $C_h(x,y):=h^{(-1)}(C(h(x),h(y)...
summary:We define the notion of semicopula, a concept that has already appeared in the statistical l...
We define the notion of semicopula, a concept that has already appeared in the statistical literatur...
A family of copulas, called semilinear, is constructed starting with some assumptions about the line...
We characterize the class of copulas that can be constructed from the diagonal section by means of ...
summary:In this paper, we provide a new family of trivariate proper quasi-copulas. As an application...
summary:Quasi-homogeneity of copulas is introduced and studied. Quasi-homogeneous copulas are charac...
summary:Based on a recent representation of copulas invariant under univariate conditioning, a new c...
summary:Smallest and greatest $1$-Lipschitz aggregation operators with given diagonal section, oppos...
The theory of copulas is by now a very well established one. Recently, larger classes of functions C...
summary:We complement the recently introduced classes of lower and upper semilinear copulas by two n...
summary:We characterize some bivariate semicopulas and, among them, the semicopulas satisfying a Lip...
summary:Transformations of copulas by means of increasing bijections on the unit interval and attrac...
• Study of (bivariate) quasi-copulas with fractal mass distributions. • Study of the mass distributi...
summary:We study a wide class of copulas which generalizes well-known families of copulas, such as t...
We characterize the transformation, defined for every copula $C$, by $C_h(x,y):=h^{(-1)}(C(h(x),h(y)...
summary:We define the notion of semicopula, a concept that has already appeared in the statistical l...
We define the notion of semicopula, a concept that has already appeared in the statistical literatur...
A family of copulas, called semilinear, is constructed starting with some assumptions about the line...
We characterize the class of copulas that can be constructed from the diagonal section by means of ...
summary:In this paper, we provide a new family of trivariate proper quasi-copulas. As an application...
summary:Quasi-homogeneity of copulas is introduced and studied. Quasi-homogeneous copulas are charac...
summary:Based on a recent representation of copulas invariant under univariate conditioning, a new c...
summary:Smallest and greatest $1$-Lipschitz aggregation operators with given diagonal section, oppos...
The theory of copulas is by now a very well established one. Recently, larger classes of functions C...
summary:We complement the recently introduced classes of lower and upper semilinear copulas by two n...
summary:We characterize some bivariate semicopulas and, among them, the semicopulas satisfying a Lip...
summary:Transformations of copulas by means of increasing bijections on the unit interval and attrac...
• Study of (bivariate) quasi-copulas with fractal mass distributions. • Study of the mass distributi...
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