Extreme value methods for estimating rare events in Utopia: EVA (2023) conference data challenge: team Lancopula Utopiversity.

IF 1.1 3区数学 Q3 MATHEMATICS, INTERDISCIPLINARY APPLICATIONS

Extremes Pub Date : 2025-01-01 Epub Date: 2024-11-22 DOI:10.1007/s10687-024-00498-w

Lídia Maria André, Ryan Campbell, Eleanor D'Arcy, Aiden Farrell, Dáire Healy, Lydia Kakampakou, Conor Murphy, Callum John Rowlandson Murphy-Barltrop, Matthew Speers

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引用次数: 0

Abstract

To capture the extremal behaviour of complex environmental phenomena in practice, flexible techniques for modelling tail behaviour are required. In this paper, we introduce a variety of such methods, which were used by the Lancopula Utopiversity team to tackle the EVA (2023) Conference Data Challenge. This data challenge was split into four challenges, labelled C1-C4. Challenges C1 and C2 comprise univariate problems, where the goal is to estimate extreme quantiles for a non-stationary time series exhibiting several complex features. For these, we propose a flexible modelling technique, based on generalised additive models, with diagnostics indicating generally good performance for the observed data. Challenges C3 and C4 concern multivariate problems where the focus is on estimating joint probabilities. For challenge C3, we propose an extension of available models in the multivariate literature and use this framework to estimate joint probabilities in the presence of non-stationary dependence. Finally, for challenge C4, which concerns a 50-dimensional random vector, we employ a clustering technique to achieve dimension reduction and use a conditional modelling approach to estimate extremal probabilities across independent groups of variables.

Supplementary information: The online version contains supplementary material available at 10.1007/s10687-024-00498-w.

查看原文本刊更多论文

乌托邦中罕见事件的极值估计方法：EVA（2023）会议数据挑战：Lancopula乌托邦团队。

为了在实践中捕捉复杂环境现象的极端行为，需要灵活的尾巴行为建模技术。在本文中，我们介绍了各种这样的方法，这些方法被Lancopula乌托邦大学团队用来解决EVA（2023）会议数据挑战。该数据挑战分为四个挑战，标记为C1-C4。挑战C1和C2包含单变量问题，其目标是估计具有多个复杂特征的非平稳时间序列的极端分位数。对于这些，我们提出了一种灵活的建模技术，基于广义加性模型，诊断表明观察到的数据通常具有良好的性能。挑战C3和C4涉及多变量问题，重点是估计联合概率。对于挑战C3，我们提出了多元文献中可用模型的扩展，并使用该框架来估计存在非平稳依赖的联合概率。最后，对于涉及50维随机向量的挑战C4，我们采用聚类技术来实现降维，并使用条件建模方法来估计独立变量组的极值概率。补充信息：在线版本包含补充资料，提供地址：10.1007/s10687-024-00498-w。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Extremes MATHEMATICS, INTERDISCIPLINARY APPLICATIONS-STATISTICS & PROBABILITY

CiteScore

2.20

自引率

7.70%

发文量

审稿时长

>12 weeks

期刊介绍： Extremes publishes original research on all aspects of statistical extreme value theory and its applications in science, engineering, economics and other fields. Authoritative and timely reviews of theoretical advances and of extreme value methods and problems in important applied areas, including detailed case studies, are welcome and will be a regular feature. All papers are refereed. Publication will be swift: in particular electronic submission and correspondence is encouraged. Statistical extreme value methods encompass a very wide range of problems: Extreme waves, rainfall, and floods are of basic importance in oceanography and hydrology, as are high windspeeds and extreme temperatures in meteorology and catastrophic claims in insurance. The waveforms and extremes of random loads determine lifelengths in structural safety, corrosion and metal fatigue.