级数格式中的极值索引及其应用

A. Lebedev
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引用次数: 8

摘要

我们将平稳随机序列的极值索引的概念推广到随机序列大小趋于无穷大的同分布随机变量的序列格式。通过两个定义引入了新的极值指标,推广了经典极值指标的基本性质。证明了新极值指标的一些有用性质。我们展示了随机图(在信息网络模型中)上的聚合活动最大值的行为和分支过程(在生物种群模型中)中随机粒子分数最大值的行为如何用新的极值指数来描述。我们还在带有copuls模型和阈值模型的模型上得到了新的结果。我们证明,对于同一个系统,新的指标可以取不同的值,也可以取大于1的值。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Extremal Indices in the Series Scheme and their Applications
We generalize the concept of extremal index of a stationary random sequence to the series scheme of identically distributed random variables with random series sizes tending to infinity in probability. We introduce new extremal indices through two definitions generalizing the basic properties of the classical extremal index. We prove some useful properties of the new extremal indices. We show how the behavior of aggregate activity maxima on random graphs (in information network models) and the behavior of maxima of random particle scores in branching processes (in biological population models) can be described in terms of the new extremal indices. We also obtain new results on models with copulas and threshold models. We show that the new indices can take different values for the same system, as well as values greater than one.
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