International audienceWe investigate conditions for the existence of the limiting conditional distribution of a bivariate random vector when one component becomes large. We revisit the existing literature on the topic, and present some new sufficient conditions. We concentrate on the case where the conditioning variable belongs to the maximum domain of attraction of the Gumbel law, and we study geometric conditions on the joint distribution of the vector. We show that these conditions are of a local nature and imply asymptotic independence when both variables belong to the domain of attraction of an extreme value distribution. The new model we introduce can also be useful for simulations
A new class of bivariate distributions is introduced and studied, which encompasses Archimedean copu...
AbstractA well-known result in extreme value theory indicates that componentwise taken sample maxima...
A number of different approaches to study multivariate extremes have been developed. Arguably the mo...
International audienceWe investigate conditions for the existence of the limiting conditional distri...
32 pages, 5 figureInternational audienceLet $(X,Y)$ be a bivariate random vector. The estimation of ...
Let (S 1,S 2) = (R cos(Θ), R sin(Θ)) be a bivariate random vector with associated random radius R wh...
Let (X, Y) = (RU 1, RU 2) be a given bivariate scale mixture random vector, with R > 0 independent o...
Abstract. Models based on assumptions of multivariate regular variation and hidden regular variation...
The project focuses on the estimation of the probability distribution of a bivariate random vector g...
We establish sharp tail asymptotics for componentwise extreme values of bivariate Gaussian random ve...
This paper exploits a stochastic representation of bivariate elliptical distributions in order to ob...
AbstractThe paper deals with random vectors X in Rd,d≥2, possessing the stochastic representation X=...
The study of multivariate extremes is dominated by multivariate regular variation, although it is we...
In the classical setting of bivariate extreme value theory, the procedures for estimating the probab...
Statistical models for extreme values are generally derived from non-degenerate probabilistic limits...
A new class of bivariate distributions is introduced and studied, which encompasses Archimedean copu...
AbstractA well-known result in extreme value theory indicates that componentwise taken sample maxima...
A number of different approaches to study multivariate extremes have been developed. Arguably the mo...
International audienceWe investigate conditions for the existence of the limiting conditional distri...
32 pages, 5 figureInternational audienceLet $(X,Y)$ be a bivariate random vector. The estimation of ...
Let (S 1,S 2) = (R cos(Θ), R sin(Θ)) be a bivariate random vector with associated random radius R wh...
Let (X, Y) = (RU 1, RU 2) be a given bivariate scale mixture random vector, with R > 0 independent o...
Abstract. Models based on assumptions of multivariate regular variation and hidden regular variation...
The project focuses on the estimation of the probability distribution of a bivariate random vector g...
We establish sharp tail asymptotics for componentwise extreme values of bivariate Gaussian random ve...
This paper exploits a stochastic representation of bivariate elliptical distributions in order to ob...
AbstractThe paper deals with random vectors X in Rd,d≥2, possessing the stochastic representation X=...
The study of multivariate extremes is dominated by multivariate regular variation, although it is we...
In the classical setting of bivariate extreme value theory, the procedures for estimating the probab...
Statistical models for extreme values are generally derived from non-degenerate probabilistic limits...
A new class of bivariate distributions is introduced and studied, which encompasses Archimedean copu...
AbstractA well-known result in extreme value theory indicates that componentwise taken sample maxima...
A number of different approaches to study multivariate extremes have been developed. Arguably the mo...