Consider a continuous random pair (X, Y ) whose dependence is characterized by an extreme-value copula with Pickands dependence function A. When the marginal distributions of X and Y are known, several consistent estimators of A are available. Most of them are variants of the estimators due to Pickands [Bull. Inst. Internat. Statist. 49 (1981) 859–878] and Cap´era`a, Foug`eres and Genest [Biometrika 84 (1997) 567–577]. In this paper, rank-based versions of these estimators are proposed for the more common case where the margins of X and Y are unknown. Results on the limit behavior of a class of weighted bivariate empirical processes are used to show the consistency and asymptotic normality of these rank-based estimators. Their finite- and l...
We propose a new class of estimators for Pickands dependence function which is based on the best L2...
A new class of bivariate distributions is introduced and studied, which encompasses Archimedean copu...
For multivariate distributions in the domain of attraction of a max-stable distribution, the tail co...
Consider a continuous random pair (X, Y) whose dependence is characterized by an extreme-value copul...
Consider a continuous random pair (X,Y) whose dependence is char-acterized by an extreme-value copul...
Extreme-value copulas arise in the asymptotic theory for componentwise maxima of independent random ...
Extreme value copulas are the limiting copulas of component-wise maxima. A bivariate extreme value c...
AbstractA new class of tests of extreme-value dependence for bivariate copulas is proposed. It is ba...
Inference on an extreme-value copula usually proceeds via its Pickands dependence function, which is...
AbstractInference on an extreme-value copula usually proceeds via its Pickands dependence function, ...
Consider n i.i.d. random vectors on R2, with unknown, common distri-bution function F. Under a sharp...
This M.Sc. thesis contributes to the use of Archimax copulas to model bivariate extremes. After a re...
Consider semiparametric bivariate copula models in which the family of copula functions is parametri...
We derive the joint distribution of the ranks associated with a given bivariate random sample. Usin...
The core of the classical block maxima method consists of tting an extreme value distribution to a s...
We propose a new class of estimators for Pickands dependence function which is based on the best L2...
A new class of bivariate distributions is introduced and studied, which encompasses Archimedean copu...
For multivariate distributions in the domain of attraction of a max-stable distribution, the tail co...
Consider a continuous random pair (X, Y) whose dependence is characterized by an extreme-value copul...
Consider a continuous random pair (X,Y) whose dependence is char-acterized by an extreme-value copul...
Extreme-value copulas arise in the asymptotic theory for componentwise maxima of independent random ...
Extreme value copulas are the limiting copulas of component-wise maxima. A bivariate extreme value c...
AbstractA new class of tests of extreme-value dependence for bivariate copulas is proposed. It is ba...
Inference on an extreme-value copula usually proceeds via its Pickands dependence function, which is...
AbstractInference on an extreme-value copula usually proceeds via its Pickands dependence function, ...
Consider n i.i.d. random vectors on R2, with unknown, common distri-bution function F. Under a sharp...
This M.Sc. thesis contributes to the use of Archimax copulas to model bivariate extremes. After a re...
Consider semiparametric bivariate copula models in which the family of copula functions is parametri...
We derive the joint distribution of the ranks associated with a given bivariate random sample. Usin...
The core of the classical block maxima method consists of tting an extreme value distribution to a s...
We propose a new class of estimators for Pickands dependence function which is based on the best L2...
A new class of bivariate distributions is introduced and studied, which encompasses Archimedean copu...
For multivariate distributions in the domain of attraction of a max-stable distribution, the tail co...