Topics in Infinitely Divisible Distributions and Lévy Processes, Revised Edition

Topics in Infinitely Divisible Distributions and Lévy Processes, Revised Edition
Title Topics in Infinitely Divisible Distributions and Lévy Processes, Revised Edition PDF eBook
Author Alfonso Rocha-Arteaga
Publisher Springer Nature
Pages 140
Release 2019-11-02
Genre Mathematics
ISBN 3030227006

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This book deals with topics in the area of Lévy processes and infinitely divisible distributions such as Ornstein-Uhlenbeck type processes, selfsimilar additive processes and multivariate subordination. These topics are developed around a decreasing chain of classes of distributions Lm, m = 0,1,...,∞, from the class L0 of selfdecomposable distributions to the class L∞ generated by stable distributions through convolution and convergence. The book is divided into five chapters. Chapter 1 studies basic properties of Lm classes needed for the subsequent chapters. Chapter 2 introduces Ornstein-Uhlenbeck type processes generated by a Lévy process through stochastic integrals based on Lévy processes. Necessary and sufficient conditions are given for a generating Lévy process so that the OU type process has a limit distribution of Lm class. Chapter 3 establishes the correspondence between selfsimilar additive processes and selfdecomposable distributions and makes a close inspection of the Lamperti transformation, which transforms selfsimilar additive processes and stationary type OU processes to each other. Chapter 4 studies multivariate subordination of a cone-parameter Lévy process by a cone-valued Lévy process. Finally, Chapter 5 studies strictly stable and Lm properties inherited by the subordinated process in multivariate subordination. In this revised edition, new material is included on advances in these topics. It is rewritten as self-contained as possible. Theorems, lemmas, propositions, examples and remarks were reorganized; some were deleted and others were newly added. The historical notes at the end of each chapter were enlarged. This book is addressed to graduate students and researchers in probability and mathematical statistics who are interested in learning more on Lévy processes and infinitely divisible distributions.

Lévy Processes and Infinitely Divisible Distributions

Lévy Processes and Infinitely Divisible Distributions
Title Lévy Processes and Infinitely Divisible Distributions PDF eBook
Author Sato Ken-Iti
Publisher Cambridge University Press
Pages 504
Release 1999
Genre Distribution (Probability theory)
ISBN 9780521553025

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A Lifetime of Excursions Through Random Walks and Lévy Processes

A Lifetime of Excursions Through Random Walks and Lévy Processes
Title A Lifetime of Excursions Through Random Walks and Lévy Processes PDF eBook
Author Loïc Chaumont
Publisher Springer Nature
Pages 354
Release 2022-01-01
Genre Mathematics
ISBN 3030833097

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This collection honours Ron Doney’s work and includes invited articles by his collaborators and friends. After an introduction reviewing Ron Doney’s mathematical achievements and how they have influenced the field, the contributed papers cover both discrete-time processes, including random walks and variants thereof, and continuous-time processes, including Lévy processes and diffusions. A good number of the articles are focused on classical fluctuation theory and its ramifications, the area for which Ron Doney is best known.

Lévy Processes and Infinitely Divisible Distributions

Lévy Processes and Infinitely Divisible Distributions
Title Lévy Processes and Infinitely Divisible Distributions PDF eBook
Author 健一·佐藤
Publisher
Pages 486
Release 1999-11-11
Genre Mathematics
ISBN 9780521553025

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Lévy processes are rich mathematical objects and constitute perhaps the most basic class of stochastic processes with a continuous time parameter. This book is intended to provide the reader with comprehensive basic knowledge of Lévy processes, and at the same time serve as an introduction to stochastic processes in general. No specialist knowledge is assumed and proofs are given in detail. Systematic study is made of stable and semi-stable processes, and the author gives special emphasis to the correspondence between Lévy processes and infinitely divisible distributions. All serious students of random phenomena will find that this book has much to offer. Now in paperback, this corrected edition contains a brand new supplement discussing relevant developments in the area since the book's initial publication.

Lévy Matters V

Lévy Matters V
Title Lévy Matters V PDF eBook
Author Lars Nørvang Andersen
Publisher Springer
Pages 242
Release 2015-10-24
Genre Mathematics
ISBN 3319231383

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This three-chapter volume concerns the distributions of certain functionals of Lévy processes. The first chapter, by Makoto Maejima, surveys representations of the main sub-classes of infinitesimal distributions in terms of mappings of certain Lévy processes via stochastic integration. The second chapter, by Lars Nørvang Andersen, Søren Asmussen, Peter W. Glynn and Mats Pihlsgård, concerns Lévy processes reflected at two barriers, where reflection is formulated à la Skorokhod. These processes can be used to model systems with a finite capacity, which is crucial in many real life situations, a most important quantity being the overflow or the loss occurring at the upper barrier. If a process is killed when crossing the boundary, a natural question concerns its lifetime. Deep formulas from fluctuation theory are the key to many classical results, which are reviewed in the third chapter by Frank Aurzada and Thomas Simon. The main part, however, discusses recent advances and developments in the setting where the process is given either by the partial sum of a random walk or the integral of a Lévy process.

Lévy Matters I

Lévy Matters I
Title Lévy Matters I PDF eBook
Author Thomas Duquesne
Publisher Springer
Pages 216
Release 2010-09-02
Genre Mathematics
ISBN 3642140076

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Focusing on the breadth of the topic, this volume explores Lévy processes and applications, and presents the state-of-the-art in this evolving area of study. These expository articles help to disseminate important theoretical and applied research to those studying the field.

Topics in Infinitely Divisible Distributions and Lévy Processes

Topics in Infinitely Divisible Distributions and Lévy Processes
Title Topics in Infinitely Divisible Distributions and Lévy Processes PDF eBook
Author Alfonso Rocha-Arteaga
Publisher
Pages 140
Release 2003
Genre Distribution (Probability theory)
ISBN

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