Add to ORKGThere is an infinite number of parameters in the definition of multivariate maxima of moving maxima (M4) processes, which poses challenges in statistical applications where workable models are preferred. This paper establishes sufficient conditions under which an M4 process with infinite number of parameters may be approximated by an M4 process with finite number of parameters. In statistical inferences, the paper focuses on a family of sectional multivariate extreme value copula (SMEVC) functions which is derived from the joint distribution functions of M4 processes. A new non-standard parameter estimation procedure is introduced, which is based on order statistics of ratios of (transformed) marginal unit Fréchet random variables, and is ...
The theory of max-stable processes generalizes traditional univariate and multivariate extreme value...
Abstract: During the last decades, copulas have been increasingly used to model the dependence acros...
The extremal dependence behavior of t copulas is examined and their extreme value limiting copulas, ...
The core of the classical block maxima method consists of tting an extreme value distribution to a s...
In this article, we defined and studied a new distribution for modeling extreme value. Some of its m...
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 distribution function F.Under a sharpen...
Abstract. Consider n i.i.d. random vectors on R2, with unknown, common distribution function F. Unde...
Extreme-value copulas arise in the asymptotic theory for componentwise maxima of independent random ...
For multivariate distributions in the domain of attraction of a max-stable distribution, the tail co...
The choice for parametric techniques in the discussion article is motivated by the claim that for mu...
Extreme value theory for random vectors and stochastic processes with continuous trajectories is usu...
Extreme-value theory for random vectors and stochastic processes with continuous trajectories is usu...
Extreme value copulas are the limiting copulas of component-wise maxima. A bivariate extreme value c...
The theory of max-stable processes generalizes traditional univariate and multivariate extreme value...
Abstract: During the last decades, copulas have been increasingly used to model the dependence acros...
The extremal dependence behavior of t copulas is examined and their extreme value limiting copulas, ...
The core of the classical block maxima method consists of tting an extreme value distribution to a s...
In this article, we defined and studied a new distribution for modeling extreme value. Some of its m...
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 distribution function F.Under a sharpen...
Abstract. Consider n i.i.d. random vectors on R2, with unknown, common distribution function F. Unde...
Extreme-value copulas arise in the asymptotic theory for componentwise maxima of independent random ...
For multivariate distributions in the domain of attraction of a max-stable distribution, the tail co...
The choice for parametric techniques in the discussion article is motivated by the claim that for mu...
Extreme value theory for random vectors and stochastic processes with continuous trajectories is usu...
Extreme-value theory for random vectors and stochastic processes with continuous trajectories is usu...
Extreme value copulas are the limiting copulas of component-wise maxima. A bivariate extreme value c...
The theory of max-stable processes generalizes traditional univariate and multivariate extreme value...
Abstract: During the last decades, copulas have been increasingly used to model the dependence acros...
The extremal dependence behavior of t copulas is examined and their extreme value limiting copulas, ...