We extend classical extreme value theory to non-identically distributed observations. When the tails of the distribution are proportional much of extreme value statistics remains valid. The proportionality function for the tails can be estimated non-parametrically along with the (common) extreme value index. For a positive extreme value index, joint asymptotic normality of both estimators is shown; they are asymptotically independent. We also establish asymptotic normality of a forecasted high quantile and develop tests for the proportionality function and for the validity of the model. We show through simulations the good performance of the procedures and also present an application to stock market returns. A main tool is the weak converge...
We define the extreme values of any random sample of size n from a distribution function F as the ob...
This paper develops a theory of high and low (extremal) quantile regression: the linear models, esti...
Title: Stochastical inference in the model of extreme events Author: Jan Dienstbier Department/Insti...
We extend classical extreme value theory to non-identically distributed observations. When the tails...
Abstract: We extend classical extreme value theory to non-identically distributed observations. When...
International audienceThe model of heteroscedastic extremes initially introduced by Einmahl et al. (...
Abstract: Estimation of tail dependence between financial assets plays a vital role in various aspec...
International audienceThe estimation of extreme quantiles requires adapted methods to extrapolate be...
Extreme value methods have been successfully applied in various disciplines with the purpose of est...
The aim of this paper is to give a formal definition and consistent estimates of the extremes of a p...
We propose a method for estimating VaR and related risk measures describing the tail of the conditio...
Nous présentons dans cette thèse en premier lieu la méthode de Bootstrap par permutation appliquée à...
International audienceThis paper addresses the problem of estimating, in the presence of random cens...
Consider n i.i.d. random elements on C[0; 1].We show that under an appropriate strengthening of the ...
The project focuses on the estimation of the probability distribution of a bivariate random vector g...
We define the extreme values of any random sample of size n from a distribution function F as the ob...
This paper develops a theory of high and low (extremal) quantile regression: the linear models, esti...
Title: Stochastical inference in the model of extreme events Author: Jan Dienstbier Department/Insti...
We extend classical extreme value theory to non-identically distributed observations. When the tails...
Abstract: We extend classical extreme value theory to non-identically distributed observations. When...
International audienceThe model of heteroscedastic extremes initially introduced by Einmahl et al. (...
Abstract: Estimation of tail dependence between financial assets plays a vital role in various aspec...
International audienceThe estimation of extreme quantiles requires adapted methods to extrapolate be...
Extreme value methods have been successfully applied in various disciplines with the purpose of est...
The aim of this paper is to give a formal definition and consistent estimates of the extremes of a p...
We propose a method for estimating VaR and related risk measures describing the tail of the conditio...
Nous présentons dans cette thèse en premier lieu la méthode de Bootstrap par permutation appliquée à...
International audienceThis paper addresses the problem of estimating, in the presence of random cens...
Consider n i.i.d. random elements on C[0; 1].We show that under an appropriate strengthening of the ...
The project focuses on the estimation of the probability distribution of a bivariate random vector g...
We define the extreme values of any random sample of size n from a distribution function F as the ob...
This paper develops a theory of high and low (extremal) quantile regression: the linear models, esti...
Title: Stochastical inference in the model of extreme events Author: Jan Dienstbier Department/Insti...