Fixed values versus empirical quantiles as thresholds in excess distribution modelling

IF 0.8 4区数学 Q3 STATISTICS & PROBABILITY

Journal of Statistical Planning and Inference Pub Date : 2025-02-08 DOI:10.1016/j.jspi.2025.106276

Daniel Gaigall , Julian Gerstenberg

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引用次数: 0

Abstract

Conditional excess distribution modelling is a widely used technique, in financial and insurance mathematics or survival analysis, for instance. Classical theory considers the thresholds as fixed values. In contrast, the use of empirical quantiles as thresholds offers advantages with respect to the design of the statistical experiment. Either way, the modeller is in a non-standard situation and runs in the risk of improper usage of statistical procedures. From both points of view, statistical planning and inference, a detailed discussion is requested. For this purpose, we treat both methods and demonstrate the necessity taking into account the characteristics of the approaches in practice. In detail, we derive general statements for empirical processes related to the conditional excess distribution in both situations. As examples, estimating the mean excess and the conditional Value-at-Risk are given. We apply our findings for the testing problems of goodness-of-fit and homogeneity for the conditional excess distribution and obtain new results of outstanding interest.

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固定值与经验分位数作为过量分布模型的阈值

条件超额分布模型是一种广泛使用的技术，例如在金融和保险数学或生存分析中。经典理论认为阈值是固定值。相比之下，使用经验分位数作为阈值在统计实验的设计方面提供了优势。无论哪种方式，建模者都处于非标准的情况下，并且存在统计程序使用不当的风险。从统计规划和推断两方面来看，都需要进行详细的讨论。为此，我们对这两种方法进行了分析，并论证了在实践中考虑到这两种方法的特点的必要性。详细地，我们推导了与两种情况下的条件过剩分布相关的经验过程的一般陈述。作为例子，给出了均值超额和条件风险值的估计。我们将我们的发现应用于检验条件过剩分布的拟合优度和均匀性问题，并获得了令人感兴趣的新结果。

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来源期刊

Journal of Statistical Planning and Inference 数学-统计学与概率论

CiteScore

2.10

自引率

11.10%

发文量

审稿时长

3-6 weeks

期刊介绍： The Journal of Statistical Planning and Inference offers itself as a multifaceted and all-inclusive bridge between classical aspects of statistics and probability, and the emerging interdisciplinary aspects that have a potential of revolutionizing the subject. While we maintain our traditional strength in statistical inference, design, classical probability, and large sample methods, we also have a far more inclusive and broadened scope to keep up with the new problems that confront us as statisticians, mathematicians, and scientists. We publish high quality articles in all branches of statistics, probability, discrete mathematics, machine learning, and bioinformatics. We also especially welcome well written and up to date review articles on fundamental themes of statistics, probability, machine learning, and general biostatistics. Thoughtful letters to the editors, interesting problems in need of a solution, and short notes carrying an element of elegance or beauty are equally welcome.