AbstractThis paper suggests Lévy copulas in order to characterize the dependence among components of multidimensional Lévy processes. This concept parallels the notion of a copula on the level of Lévy measures. As for random vectors, a version of Sklar's theorem states that the law of a general multivariate Lévy process is obtained by combining arbitrary univariate Lévy processes with an arbitrary Lévy copula. We construct parametric families of Lévy copulas and prove a limit theorem, which indicates how to obtain the Lévy copula of a multivariate Lévy process X from the ordinary copula of the random vector Xt for small t
This note contributes to the development of the theory of stochastic dependence by employing the gen...
AbstractWe study dependence between components of multivariate (nice Feller) Markov processes: what ...
AbstractA parametric family of n-dimensional extreme-value copulas of Marshall–Olkin type is introdu...
AbstractThis paper suggests Lévy copulas in order to characterize the dependence among components of...
This paper suggests Lévy copulas in order to characterize the dependence among components of multidi...
In this paper we investigate dependence properties and comparison results for multidimensional Lévy ...
The modelling of dependence relations between random variables is one of the most widely studied sub...
Lévy processes and infinitely divisible distributions are increasingly defined in terms of their Lév...
AbstractFor the study of dynamic dependence structures, the authors introduce the concept of a pseud...
This paper develops a new unified approach to copula-based modeling and characterizations for time s...
In this paper nonparametric methods to assess the multivariate Levy measure are introduced. Startin...
In this paper, we introduce DSPMD, discretely sampled process with pre-specified marginals and pre-s...
This paper studies the general multivariate dependence and tail dependence of a random vector. We an...
In this paper we investigate dependence properties and comparison results for mul-tidimensional Lév...
In this thesis, we are concerned with strong approximations of the empirical copula process, possibl...
This note contributes to the development of the theory of stochastic dependence by employing the gen...
AbstractWe study dependence between components of multivariate (nice Feller) Markov processes: what ...
AbstractA parametric family of n-dimensional extreme-value copulas of Marshall–Olkin type is introdu...
AbstractThis paper suggests Lévy copulas in order to characterize the dependence among components of...
This paper suggests Lévy copulas in order to characterize the dependence among components of multidi...
In this paper we investigate dependence properties and comparison results for multidimensional Lévy ...
The modelling of dependence relations between random variables is one of the most widely studied sub...
Lévy processes and infinitely divisible distributions are increasingly defined in terms of their Lév...
AbstractFor the study of dynamic dependence structures, the authors introduce the concept of a pseud...
This paper develops a new unified approach to copula-based modeling and characterizations for time s...
In this paper nonparametric methods to assess the multivariate Levy measure are introduced. Startin...
In this paper, we introduce DSPMD, discretely sampled process with pre-specified marginals and pre-s...
This paper studies the general multivariate dependence and tail dependence of a random vector. We an...
In this paper we investigate dependence properties and comparison results for mul-tidimensional Lév...
In this thesis, we are concerned with strong approximations of the empirical copula process, possibl...
This note contributes to the development of the theory of stochastic dependence by employing the gen...
AbstractWe study dependence between components of multivariate (nice Feller) Markov processes: what ...
AbstractA parametric family of n-dimensional extreme-value copulas of Marshall–Olkin type is introdu...