Functional central limit theorem for a class of negatively dependent heavy-tailed stationary infinitely divisible processes generated by conservative flows

IF 2.1 1区数学 Q1 STATISTICS & PROBABILITY

Annals of Probability Pub Date : 2017-07-01 DOI:10.1214/16-AOP1107

Paul Jung, Takashi Owada, G. Samorodnitsky

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引用次数: 5

Abstract

We prove a functional central limit theorem for partial sums of symmetric stationary long-range dependent heavy tailed infinitely divisible processes. The limiting stable process is particularly interesting due to its long memory which is quantified by a Mittag–Leffler process induced by an associated Harris chain, at the discrete-time level. Previous results in Owada and Samorodnitsky [Ann. Probab. 43 (2015) 240–285] dealt with positive dependence in the increment process, whereas this paper derives the functional limit theorems under negative dependence. The negative dependence is due to cancellations arising from Gaussian-type fluctuations of functionals of the associated Harris chain. The new types of limiting processes involve stable random measures, due to heavy tails, Mittag–Leffler processes, due to long memory, and Brownian motions, due to the Gaussian second order cancellations. Along the way, we prove a function central limit theorem for fluctuations of functionals of Harris chains which is of independent interest as it extends a result of Chen [Probab. Theory Related Fields 116 (2000) 89–123].

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一类由保守流产生的负相关重尾平稳无穷可分过程的泛函中心极限定理

证明了对称平稳长程相关重尾无穷可分过程部分和的泛函中心极限定理。由于其在离散时间水平上由相关Harris链诱导的Mittag-Leffler过程量化的长记忆，极限稳定过程特别有趣。以前的研究结果在Owada和Samorodnitsky [Ann。Probab. 43(2015) 240-285]处理增量过程中的正相关，而本文导出了负相关下的泛函极限定理。负相关性是由于相关Harris链的泛函的高斯型波动引起的消去。新类型的极限过程包括稳定的随机测量(由于重尾)、Mittag-Leffler过程(由于长记忆)和布朗运动(由于高斯二阶消去)。在此过程中，我们证明了Harris链泛函涨落的一个函数中心极限定理，它推广了Chen [Probab]的结果，具有独立的意义。理论相关领域116(2000)89-123]。

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来源期刊

Annals of Probability 数学-统计学与概率论

CiteScore

4.60

自引率

8.70%

发文量

审稿时长

6-12 weeks

期刊介绍： The Annals of Probability publishes research papers in modern probability theory, its relations to other areas of mathematics, and its applications in the physical and biological sciences. Emphasis is on importance, interest, and originality – formal novelty and correctness are not sufficient for publication. The Annals will also publish authoritative review papers and surveys of areas in vigorous development.