Potential Functions of Random Walks in ℤ With Infinite Variance: Estimates and Applications
Uchiyama, Kôhei
- 出版商: Springer
- 出版日期: 2023-09-29
- 售價: $2,750
- 貴賓價: 9.5 折 $2,613
- 語言: 英文
- 頁數: 276
- 裝訂: Quality Paper - also called trade paper
- ISBN: 303141019X
- ISBN-13: 9783031410192
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商品描述
This book studies the potential functions of one-dimensional recurrent random walks on the lattice of integers with step distribution of infinite variance. The central focus is on obtaining reasonably nice estimates of the potential function. These estimates are then applied to various situations, yielding precise asymptotic results on, among other things, hitting probabilities of finite sets, overshoot distributions, Green functions on long finite intervals and the half-line, and absorption probabilities of two-sided exit problems.
The potential function of a random walk is a central object in fluctuation theory. If the variance of the step distribution is finite, the potential function has a simple asymptotic form, which enables the theory of recurrent random walks to be described in a unified way with rather explicit formulae. On the other hand, if the variance is infinite, the potential function behaves in a wide range of ways depending on the step distribution, which the asymptotic behaviour of many functionals of the random walk closely reflects.
In the case when the step distribution is attracted to a strictly stable law, aspects of the random walk have been intensively studied and remarkable results have been established by many authors. However, these results generally do not involve the potential function, and important questions still need to be answered. In the case where the random walk is relatively stable, or if one tail of the step distribution is negligible in comparison to the other on average, there has been much less work. Some of these unsettled problems have scarcely been addressed in the last half-century. As revealed in this treatise, the potential function often turns out to play a significant role in their resolution.
Aimed at advanced graduate students specialising in probability theory, this book will also be of interest to researchers and engineers working with random walks and stochastic systems.
商品描述(中文翻譯)
本書研究了具有無窮變異步驟分佈的整數格點上一維循環隨機行走的潛在函數。中心關注點在於獲得對潛在函數的合理估計。然後,這些估計被應用於各種情況,從而得出關於有限集合的命中概率、超過分佈、長有限區間和半線上的格林函數,以及雙邊退出問題的吸收概率等精確的漸近結果。
隨機行走的潛在函數是波動理論中的一個核心對象。如果步驟分佈的變異數有限,潛在函數具有簡單的漸近形式,這使得循環隨機行走的理論可以用相當明確的公式來描述。另一方面,如果變異數無窮,潛在函數的行為會根據步驟分佈而有很大的變化,而隨機行走的許多函數性質的漸近行為也密切反映了這一點。
在步驟分佈趨於嚴格穩定分佈的情況下,隨機行走的某些方面已經得到了深入研究,並且許多作者已經建立了顯著的結果。然而,這些結果通常不涉及潛在函數,仍然有重要問題需要回答。在步驟分佈相對穩定,或者如果步驟分佈的一個尾部在平均情況下可以忽略不計的情況下,已經進行的工作要少得多。這些未解決的問題在過去的半個世紀中幾乎沒有得到解決。正如本論文所揭示的,潛在函數在解決這些問題中通常起著重要作用。
本書針對專攻概率論的高級研究生,也對於從事隨機行走和隨機系統研究的研究人員和工程師具有興趣。
作者簡介
作者簡介(中文翻譯)
內山浩平是東京工業大學的數學名譽教授,他於1978年在該校獲得科學博士學位。在先後在琉球大學、奈良女子大學和廣島大學工作後,他於1998年轉到東京工業大學。在他的學術生涯中,他一直對統計力學的各種問題感興趣,並對布朗運動和隨機行走保持著持續的興趣。