极端事件的空间依赖性和时空趋势

IF 3.2 1区数学 Q1 STATISTICS & PROBABILITY

Annals of Statistics Pub Date : 2022-02-01 DOI:10.1214/21-aos2067

John H. J. Einmahl,Ana Ferreira,Laurens de Haan,Cláudia Neves,Chen Zhou

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引用次数: 0

摘要

极值的统计理论被扩展到非平稳和非独立的观测。随时间和空间的非平稳性是通过边际分布的尾标度来控制的。空间依赖源于多元极值理论。我们建立了加权顺序尾经验过程和加权尾分位数过程的渐近理论，基于所有的观察，采取了时间和空间。结果对尾部的均方差进行了两个统计检验，一个是空间检验，一个是时间检验。此外，我们表明，公共极值指数可以通过基于池化所有(非平稳和依赖)观测值的伪极大似然过程来估计。我们的主要例子和应用是德国北部的降雨。

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Spatial dependence and space–time trend in extreme events

The statistical theory of extremes is extended to observations that are non-stationary and not independent. The non-stationarity over time and space is controlled via the scedasis (tail scale) in the marginal distributions. Spatial dependence stems from multivariate extreme value theory. We establish asymptotic theory for both the weighted sequential tail empirical process and the weighted tail quantile process based on all observations, taken over time and space. The results yield two statistical tests for homoscedasticity in the tail, one in space and one in time. Further, we show that the common extreme value index can be estimated via a pseudo-maximum likelihood procedure based on pooling all (non-stationary and dependent) observations. Our leading example and application is rainfall in Northern Germany.

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来源期刊

Annals of Statistics 数学-统计学与概率论

CiteScore

9.30

自引率

8.90%

发文量

119

审稿时长

6-12 weeks

期刊介绍： The Annals of Statistics aim to publish research papers of highest quality reflecting the many facets of contemporary statistics. Primary emphasis is placed on importance and originality, not on formalism. The journal aims to cover all areas of statistics, especially mathematical statistics and applied & interdisciplinary statistics. Of course many of the best papers will touch on more than one of these general areas, because the discipline of statistics has deep roots in mathematics, and in substantive scientific fields.