Markov processes, Gaussian processes, and local times / Michael B. Marcus, Jay Rosen.

Call Number	519.2/33
Author	Marcus, Michael B., author.
Title	Markov processes, Gaussian processes, and local times / Michael B. Marcus, Jay Rosen. Markov Processes, Gaussian Processes, & Local Times
Physical Description	1 online resource (x, 620 pages) : digital, PDF file(s).
Series	Cambridge studies in advanced mathematics ; 100
Notes	Title from publisher's bibliographic system (viewed on 05 Oct 2015).
Contents	Brownian motion and Ray-Knight theorems -- Markov processes and local times -- Constructing Markov processes -- Basic properties of Gaussian processes -- Continuity and boundedness of Gaussian processes -- Moduli of continuity for Gaussian processes -- Isomorphism theorems -- Sample path properties of local times -- [Rho]-variation -- Most visited sites of symmetric stable processes -- Local times of diffusions -- Associated Gaussian processes.
Summary	This book was first published in 2006. Written by two of the foremost researchers in the field, this book studies the local times of Markov processes by employing isomorphism theorems that relate them to certain associated Gaussian processes. It builds to this material through self-contained but harmonized 'mini-courses' on the relevant ingredients, which assume only knowledge of measure-theoretic probability. The streamlined selection of topics creates an easy entrance for students and experts in related fields. The book starts by developing the fundamentals of Markov process theory and then of Gaussian process theory, including sample path properties. It then proceeds to more advanced results, bringing the reader to the heart of contemporary research. It presents the remarkable isomorphism theorems of Dynkin and Eisenbaum and then shows how they can be applied to obtain new properties of Markov processes by using well-established techniques in Gaussian process theory. This original, readable book will appeal to both researchers and advanced graduate students.
Added Author	Rosen, Jay, 1948- author.
Subject	MARKOV PROCESSES. GAUSSIAN PROCESSES. Local times (Stochastic Processes)
Multimedia	https://doi.org/10.1017/CBO9780511617997

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$a Brownian motion and Ray-Knight theorems -- Markov processes and local times -- Constructing Markov processes -- Basic properties of Gaussian processes -- Continuity and boundedness of Gaussian processes -- Moduli of continuity for Gaussian processes -- Isomorphism theorems -- Sample path properties of local times -- [Rho]-variation -- Most visited sites of symmetric stable processes -- Local times of diffusions -- Associated Gaussian processes.

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$a This book was first published in 2006. Written by two of the foremost researchers in the field, this book studies the local times of Markov processes by employing isomorphism theorems that relate them to certain associated Gaussian processes. It builds to this material through self-contained but harmonized 'mini-courses' on the relevant ingredients, which assume only knowledge of measure-theoretic probability. The streamlined selection of topics creates an easy entrance for students and experts in related fields. The book starts by developing the fundamentals of Markov process theory and then of Gaussian process theory, including sample path properties. It then proceeds to more advanced results, bringing the reader to the heart of contemporary research. It presents the remarkable isomorphism theorems of Dynkin and Eisenbaum and then shows how they can be applied to obtain new properties of Markov processes by using well-established techniques in Gaussian process theory. This original, readable book will appeal to both researchers and advanced graduate students.

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$a GAUSSIAN PROCESSES.

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$a Local times (Stochastic Processes)

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No Reviews to Display

Summary	This book was first published in 2006. Written by two of the foremost researchers in the field, this book studies the local times of Markov processes by employing isomorphism theorems that relate them to certain associated Gaussian processes. It builds to this material through self-contained but harmonized 'mini-courses' on the relevant ingredients, which assume only knowledge of measure-theoretic probability. The streamlined selection of topics creates an easy entrance for students and experts in related fields. The book starts by developing the fundamentals of Markov process theory and then of Gaussian process theory, including sample path properties. It then proceeds to more advanced results, bringing the reader to the heart of contemporary research. It presents the remarkable isomorphism theorems of Dynkin and Eisenbaum and then shows how they can be applied to obtain new properties of Markov processes by using well-established techniques in Gaussian process theory. This original, readable book will appeal to both researchers and advanced graduate students.
Notes	Title from publisher's bibliographic system (viewed on 05 Oct 2015).
Contents	Brownian motion and Ray-Knight theorems -- Markov processes and local times -- Constructing Markov processes -- Basic properties of Gaussian processes -- Continuity and boundedness of Gaussian processes -- Moduli of continuity for Gaussian processes -- Isomorphism theorems -- Sample path properties of local times -- [Rho]-variation -- Most visited sites of symmetric stable processes -- Local times of diffusions -- Associated Gaussian processes.
Subject	MARKOV PROCESSES. GAUSSIAN PROCESSES. Local times (Stochastic Processes)
Multimedia	https://doi.org/10.1017/CBO9780511617997