Successful estimation of the Pareto tail index from extreme order statistics relies heavily on the procedure used to determine the number of extreme order statistics that are used for the estimation. Most of the known procedures are based on the minimization of (an estimate of) the asymptotic mean square error of the Hill estimator for the Pareto tail index. The principal drawback of these approaches is that they involve the estimation of nuisance parameters, and therefore lead to complicated selection procedures. Instead, we propose to use Pareto quantile plots and build a prediction error estimator. The latter depends on the quantile at which the data are truncated, and it is minimized to find the optimal number of extreme order statistic...
Tail estimators are proposed which make minimal assumptions and let the data dictate the form of the...
In extreme value statistics, the extreme value index is a well-known parameter to measure the tail h...
If one applies the Hill, Pickands or Dekkers-Einmahl-de Haan estimators of the tail index of a distr...
Estimation of the Pareto tail index from extreme order statistics is an important problem in many se...
textabstractThe selection of upper order statistics in tail estimation is notoriously difficult. Mos...
We introduce a robust and asymptotically unbiased estimator for the tail index of Pareto-type distri...
The selection of upper order statistics in tail estimation is notoriously difficult. Most methods ar...
We consider the estimation of return values in the presence of uncertain extreme value model paramet...
Extreme quantile regression provides estimates of conditional quantiles outside the range of the dat...
In this paper we consider an autoregressive Pareto process which can be used as an alternative to h...
Prediction of quantiles at extreme tails is of interest in numerous applications. Extreme value mode...
In extreme value statistics, the extreme value index is a well-known parameter to measure the tail h...
The most popular approach in extreme value statistics is the modelling of threshold exceedances usin...
The most popular approach in extreme value statistics is the modelling of threshold exceedances usin...
Since the extreme value index (EVI) controls the tail behaviour of the distribution function, the es...
Tail estimators are proposed which make minimal assumptions and let the data dictate the form of the...
In extreme value statistics, the extreme value index is a well-known parameter to measure the tail h...
If one applies the Hill, Pickands or Dekkers-Einmahl-de Haan estimators of the tail index of a distr...
Estimation of the Pareto tail index from extreme order statistics is an important problem in many se...
textabstractThe selection of upper order statistics in tail estimation is notoriously difficult. Mos...
We introduce a robust and asymptotically unbiased estimator for the tail index of Pareto-type distri...
The selection of upper order statistics in tail estimation is notoriously difficult. Most methods ar...
We consider the estimation of return values in the presence of uncertain extreme value model paramet...
Extreme quantile regression provides estimates of conditional quantiles outside the range of the dat...
In this paper we consider an autoregressive Pareto process which can be used as an alternative to h...
Prediction of quantiles at extreme tails is of interest in numerous applications. Extreme value mode...
In extreme value statistics, the extreme value index is a well-known parameter to measure the tail h...
The most popular approach in extreme value statistics is the modelling of threshold exceedances usin...
The most popular approach in extreme value statistics is the modelling of threshold exceedances usin...
Since the extreme value index (EVI) controls the tail behaviour of the distribution function, the es...
Tail estimators are proposed which make minimal assumptions and let the data dictate the form of the...
In extreme value statistics, the extreme value index is a well-known parameter to measure the tail h...
If one applies the Hill, Pickands or Dekkers-Einmahl-de Haan estimators of the tail index of a distr...