Continuous Parameter Markov Processes and Stochastic Differential Equations
Bhattacharya, Rabi, Waymire, Edward C.
- 出版商: Springer
- 出版日期: 2023-11-17
- 售價: $3,790
- 貴賓價: 9.5 折 $3,601
- 語言: 英文
- 頁數: 506
- 裝訂: Hardcover - also called cloth, retail trade, or trade
- ISBN: 3031332946
- ISBN-13: 9783031332944
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商品描述
This graduate text presents the elegant and profound theory of continuous parameter Markov processes and many of its applications. The authors focus on developing context and intuition before formalizing the theory of each topic, illustrated with examples.
After a review of some background material, the reader is introduced to semigroup theory, including the Hille-Yosida Theorem, used to construct continuous parameter Markov processes. Illustrated with examples, it is a cornerstone of Feller's seminal theory of the most general one-dimensional diffusions studied in a later chapter. This is followed by two chapters with probabilistic constructions of jump Markov processes, and processes with independent increments, or Lévy processes. The greater part of the book is devoted to Itô's fascinating theory of stochastic differential equations, and to the study of asymptotic properties of diffusions in all dimensions, such as explosion, transience, recurrence, existence of steady states, and the speed of convergence to equilibrium. A broadly applicable functional central limit theorem for ergodic Markov processes is presented with important examples. Intimate connections between diffusions and linear second order elliptic and parabolic partial differential equations are laid out in two chapters, and are used for computational purposes. Among Special Topics chapters, two study anomalous diffusions: one on skew Brownian motion, and the other on an intriguing multi-phase homogenization of solute transport in porous media.
商品描述(中文翻譯)
這本研究生教材介紹了連續參數馬可夫過程的優雅而深奧的理論以及其許多應用。作者們著重於在正式化每個主題的理論之前,發展相關背景和直覺,並以實例加以說明。
在回顧一些背景材料之後,讀者將被介紹到半群理論,包括用於構建連續參數馬可夫過程的Hille-Yosida定理。這是Feller在後面一章中研究的最一般的一維擴散的基石,並以實例加以說明。接下來的兩章介紹了跳躍馬可夫過程的概率構造,以及具有獨立增量或Lévy過程的概率構造。本書的大部分內容都專注於伊藤的隨機微分方程理論,以及在所有維度中對擴散的漸近性質的研究,例如爆炸、短暫性、循環性、穩態存在性和收斂速度。書中還介紹了適用於遞歸馬可夫過程的廣泛應用的功能中心極限定理,並提供了重要的實例。書中還有兩章詳細介紹了擴散和線性二階橢圓和抛物型偏微分方程之間的密切關係,並用於計算目的。在特殊主題章節中,有兩個章節研究了異常擴散:一個是關於斜布朗運動,另一個是關於多相多孔介質中溶質運輸的引人入勝的均質化過程。
作者簡介
Edward C. Waymire is Emeritus Professor of Mathematics at Oregon State University. He received a PhD in mathematics from the University of Arizona in the theory of interacting particle systems. His primary research concerns applications of probability and stochastic processes to problems of contemporary applied mathematics pertaining to various types of flows, dispersion, and random disorder. He is a formerchief editor of the Annals of Applied Probability, and past president of the Bernoulli Society for Mathematical Statistics and Probability.
作者簡介(中文翻譯)
Rabi Bhattacharya是亞利桑那大學的數學教授。他是數理統計學會的會士,曾獲得美國資深科學家洪堡獎和古根漢獎學金。他在馬可夫過程的理論和應用方面做出了重要貢獻,最近還在流形上進行了非參數統計推斷的研究。他曾在許多國際期刊的編輯委員會任職,並出版了幾本關於概率和統計的研究專著和研究生教材。
Edward C. Waymire是俄勒岡州立大學的名譽數學教授。他在亞利桑那大學獲得了數學博士學位,專攻交互作用粒子系統的理論。他的主要研究領域涉及概率和隨機過程在當代應用數學中對各種類型的流動、分散和隨機擾動問題的應用。他曾擔任《應用概率學年刊》的主編,並擔任伯努利數理統計學會的前任主席。