AbstractA new class of tests of extreme-value dependence for bivariate copulas is proposed. It is based on the process comparing the empirical copula with a natural nonparametric rank-based estimator of the unknown copula under extreme-value dependence. A multiplier technique is used to compute approximate p-values for several candidate test statistics. Extensive Monte Carlo experiments were carried out to compare the resulting procedures with the tests of extreme-value dependence recently studied in Ben Ghorbal et al. (2009) [1] and Kojadinovic and Yan (2010) [19]. The finite-sample performance study of the tests is complemented by local power calculations
Consider a continuous random pair (X,Y) whose dependence is char-acterized by an extreme-value copul...
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...
AbstractA new class of tests of extreme-value dependence for bivariate copulas is proposed. It is ba...
Starting from the characterization of extreme-value copulas based on max-stability, large-sample tes...
Extreme-value copulas arise in the asymptotic theory for componentwise maxima of independent random ...
Consider a continuous random pair (X, Y) whose dependence is characterized by an extreme-value copul...
Statistical models with parsimonious dependence are useful for high-dimensional modelling as they of...
Consider a continuous random pair (X, Y ) whose dependence is characterized by an extreme-value copu...
Extreme value copulas are the limiting copulas of component-wise maxima. A bivariate extreme value c...
AbstractUnderstanding and modeling dependence structures for multivariate extreme values are of inte...
A number of existing results in the field of multivariate extreme value theory are presented, such a...
Being the limits of copulas of componentwise maxima in independent random samples, extreme-value cop...
Multivariate extreme values require the use of extreme-value copulas, as they appear in the limit of...
A new class of bivariate distributions is introduced and studied, which encompasses Archimedean copu...
Consider a continuous random pair (X,Y) whose dependence is char-acterized by an extreme-value copul...
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...
AbstractA new class of tests of extreme-value dependence for bivariate copulas is proposed. It is ba...
Starting from the characterization of extreme-value copulas based on max-stability, large-sample tes...
Extreme-value copulas arise in the asymptotic theory for componentwise maxima of independent random ...
Consider a continuous random pair (X, Y) whose dependence is characterized by an extreme-value copul...
Statistical models with parsimonious dependence are useful for high-dimensional modelling as they of...
Consider a continuous random pair (X, Y ) whose dependence is characterized by an extreme-value copu...
Extreme value copulas are the limiting copulas of component-wise maxima. A bivariate extreme value c...
AbstractUnderstanding and modeling dependence structures for multivariate extreme values are of inte...
A number of existing results in the field of multivariate extreme value theory are presented, such a...
Being the limits of copulas of componentwise maxima in independent random samples, extreme-value cop...
Multivariate extreme values require the use of extreme-value copulas, as they appear in the limit of...
A new class of bivariate distributions is introduced and studied, which encompasses Archimedean copu...
Consider a continuous random pair (X,Y) whose dependence is char-acterized by an extreme-value copul...
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...