Many applications in risk analysis, especially in environmental sciences, require the estimation of the dependence among multivariate maxima. A way to do this is by inferring the Pickands dependence function of the underlying extreme-value copula. A nonparametric estimator is constructed as the sample equivalent of a multivariate extension of the madogram. Shape constraints on the family of Pickands dependence functions are taken into account by means of a representation in terms of a specific type of Bernstein polynomials. The large-sample theory of the estimator is developed and its finite-sample performance is evaluated with a simulation study. The approach is illustrated by analyzing clusters consisting of seven weather stations that ha...
Bivariate extreme-value distributions have been used in modeling extremes in environmental sciences ...
Abstract. This paper presents a new estimation procedure for the limit distribution of the maximum o...
Inference on an extreme-value copula usually proceeds via its Pickands dependence function, which is...
Many applications in risk analysis require the estimation of the dependence among multivariate maxim...
Many applications in risk analysis, especially in environmental sciences, re-quire the estimation of...
Multivariate analysis of extreme values has an increasing range of applications in risk analysis, es...
In this study, a new nonparametric approach using Bernstein copula approximation is proposed to esti...
Extreme-value copulas arise in the asymptotic theory for componentwise maxima of independent random ...
The Pickands dependence function characterizes an extreme value copula, a useful tool in the modeli...
Multivariate extreme values require the use of extreme-value copulas, as they appear in the limit of...
AbstractUnderstanding and modeling dependence structures for multivariate extreme values are of inte...
The dependence structure of max-stable random vectors can be characterized by their Pickands depende...
Extreme value copulas are the limiting copulas of component-wise maxima. A bivariate extreme value c...
A simple approach for modeling multivariate extremes is to consider the vector of component-wise max...
This article reviews various characterizations of a multivariate extreme dependence function A(·). T...
Bivariate extreme-value distributions have been used in modeling extremes in environmental sciences ...
Abstract. This paper presents a new estimation procedure for the limit distribution of the maximum o...
Inference on an extreme-value copula usually proceeds via its Pickands dependence function, which is...
Many applications in risk analysis require the estimation of the dependence among multivariate maxim...
Many applications in risk analysis, especially in environmental sciences, re-quire the estimation of...
Multivariate analysis of extreme values has an increasing range of applications in risk analysis, es...
In this study, a new nonparametric approach using Bernstein copula approximation is proposed to esti...
Extreme-value copulas arise in the asymptotic theory for componentwise maxima of independent random ...
The Pickands dependence function characterizes an extreme value copula, a useful tool in the modeli...
Multivariate extreme values require the use of extreme-value copulas, as they appear in the limit of...
AbstractUnderstanding and modeling dependence structures for multivariate extreme values are of inte...
The dependence structure of max-stable random vectors can be characterized by their Pickands depende...
Extreme value copulas are the limiting copulas of component-wise maxima. A bivariate extreme value c...
A simple approach for modeling multivariate extremes is to consider the vector of component-wise max...
This article reviews various characterizations of a multivariate extreme dependence function A(·). T...
Bivariate extreme-value distributions have been used in modeling extremes in environmental sciences ...
Abstract. This paper presents a new estimation procedure for the limit distribution of the maximum o...
Inference on an extreme-value copula usually proceeds via its Pickands dependence function, which is...