Let F and G be multivariate probability distribution functions, each with equal one dimensional marginals, such that there exists a sequence of constants an > 0, n ¿ , with [formula] for all continuity points (x1, ..., xd) of G. The distribution function G is characterized by the extreme-value index (determining the marginals) and the so-called angular measure (determining the dependence structure). In this paper, a non-parametric estimator of G, based on a random sample from F, is proposed. Consistency as well as asymptotic normality are proved under certain regularity conditions
Two new methods are suggested for estimating the dependence function of a bivariate extreme-value di...
In Chapter 1, we give a brief introduction to univariate extreme value theory. We also discuss the k...
This article reviews various characterizations of a multivariate extreme dependence function A(·). T...
Let F and G be multivariate probability distribution functions, each with equal one dimensional marg...
AbstractLet F and G be multivariate probability distribution functions, each with equal one dimensio...
Let 11 nn be a random sample from a bivariate distri-bution functionF in the domain of max...
The traditional approach to multivariate extreme values has been through the multivariate extreme va...
AbstractUnderstanding and modeling dependence structures for multivariate extreme values are of inte...
Let H be the limiting distribution of a vector of maxima from a d-dimensional stationary sequence wi...
The paper considers the problem of estimating the dependence function of a bivariate extreme surviva...
Let (X1, Y1), (X2, Y2),…, (Xn, Yn) be a random sample from a bivariate distribution function F which...
Consider a random sample from a bivariate distribution function F in the max-domain of attraction of...
AbstractLet (X1, Y1), (X2, Y2),…, (Xn, Yn) be a random sample from a bivariate distribution function...
Consider a random sample from a bivariate distribution function F in the max-domain of attraction of...
AbstractThe paper considers the problem of estimating the dependence function of a bivariate extreme...
Two new methods are suggested for estimating the dependence function of a bivariate extreme-value di...
In Chapter 1, we give a brief introduction to univariate extreme value theory. We also discuss the k...
This article reviews various characterizations of a multivariate extreme dependence function A(·). T...
Let F and G be multivariate probability distribution functions, each with equal one dimensional marg...
AbstractLet F and G be multivariate probability distribution functions, each with equal one dimensio...
Let 11 nn be a random sample from a bivariate distri-bution functionF in the domain of max...
The traditional approach to multivariate extreme values has been through the multivariate extreme va...
AbstractUnderstanding and modeling dependence structures for multivariate extreme values are of inte...
Let H be the limiting distribution of a vector of maxima from a d-dimensional stationary sequence wi...
The paper considers the problem of estimating the dependence function of a bivariate extreme surviva...
Let (X1, Y1), (X2, Y2),…, (Xn, Yn) be a random sample from a bivariate distribution function F which...
Consider a random sample from a bivariate distribution function F in the max-domain of attraction of...
AbstractLet (X1, Y1), (X2, Y2),…, (Xn, Yn) be a random sample from a bivariate distribution function...
Consider a random sample from a bivariate distribution function F in the max-domain of attraction of...
AbstractThe paper considers the problem of estimating the dependence function of a bivariate extreme...
Two new methods are suggested for estimating the dependence function of a bivariate extreme-value di...
In Chapter 1, we give a brief introduction to univariate extreme value theory. We also discuss the k...
This article reviews various characterizations of a multivariate extreme dependence function A(·). T...