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 |
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
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 |
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 |
Fluctuations of Lévy Processes with Applications
Title | Fluctuations of Lévy Processes with Applications PDF eBook |
Author | Andreas E. Kyprianou |
Publisher | Springer Science & Business Media |
Pages | 461 |
Release | 2014-01-09 |
Genre | Mathematics |
ISBN | 3642376320 |
Lévy processes are the natural continuous-time analogue of random walks and form a rich class of stochastic processes around which a robust mathematical theory exists. Their application appears in the theory of many areas of classical and modern stochastic processes including storage models, renewal processes, insurance risk models, optimal stopping problems, mathematical finance, continuous-state branching processes and positive self-similar Markov processes. This textbook is based on a series of graduate courses concerning the theory and application of Lévy processes from the perspective of their path fluctuations. Central to the presentation is the decomposition of paths in terms of excursions from the running maximum as well as an understanding of short- and long-term behaviour. The book aims to be mathematically rigorous while still providing an intuitive feel for underlying principles. The results and applications often focus on the case of Lévy processes with jumps in only one direction, for which recent theoretical advances have yielded a higher degree of mathematical tractability. The second edition additionally addresses recent developments in the potential analysis of subordinators, Wiener-Hopf theory, the theory of scale functions and their application to ruin theory, as well as including an extensive overview of the classical and modern theory of positive self-similar Markov processes. Each chapter has a comprehensive set of exercises.
Lévy Processes and Stochastic Calculus
Title | Lévy Processes and Stochastic Calculus PDF eBook |
Author | David Applebaum |
Publisher | Cambridge University Press |
Pages | 461 |
Release | 2009-04-30 |
Genre | Mathematics |
ISBN | 1139477986 |
Lévy processes form a wide and rich class of random process, and have many applications ranging from physics to finance. Stochastic calculus is the mathematics of systems interacting with random noise. Here, the author ties these two subjects together, beginning with an introduction to the general theory of Lévy processes, then leading on to develop the stochastic calculus for Lévy processes in a direct and accessible way. This fully revised edition now features a number of new topics. These include: regular variation and subexponential distributions; necessary and sufficient conditions for Lévy processes to have finite moments; characterisation of Lévy processes with finite variation; Kunita's estimates for moments of Lévy type stochastic integrals; new proofs of Ito representation and martingale representation theorems for general Lévy processes; multiple Wiener-Lévy integrals and chaos decomposition; an introduction to Malliavin calculus; an introduction to stability theory for Lévy-driven SDEs.
Lévy Processes
Title | Lévy Processes PDF eBook |
Author | Ole E Barndorff-Nielsen |
Publisher | Springer Science & Business Media |
Pages | 414 |
Release | 2012-12-06 |
Genre | Mathematics |
ISBN | 1461201977 |
A Lévy process is a continuous-time analogue of a random walk, and as such, is at the cradle of modern theories of stochastic processes. Martingales, Markov processes, and diffusions are extensions and generalizations of these processes. In the past, representatives of the Lévy class were considered most useful for applications to either Brownian motion or the Poisson process. Nowadays the need for modeling jumps, bursts, extremes and other irregular behavior of phenomena in nature and society has led to a renaissance of the theory of general Lévy processes. Researchers and practitioners in fields as diverse as physics, meteorology, statistics, insurance, and finance have rediscovered the simplicity of Lévy processes and their enormous flexibility in modeling tails, dependence and path behavior. This volume, with an excellent introductory preface, describes the state-of-the-art of this rapidly evolving subject with special emphasis on the non-Brownian world. Leading experts present surveys of recent developments, or focus on some most promising applications. Despite its special character, every topic is aimed at the non- specialist, keen on learning about the new exciting face of a rather aged class of processes. An extensive bibliography at the end of each article makes this an invaluable comprehensive reference text. For the researcher and graduate student, every article contains open problems and points out directions for futurearch. The accessible nature of the work makes this an ideal introductory text for graduate seminars in applied probability, stochastic processes, physics, finance, and telecommunications, and a unique guide to the world of Lévy processes.
Stochastic Processes
Title | Stochastic Processes PDF eBook |
Author | Kiyosi Ito |
Publisher | Springer Science & Business Media |
Pages | 246 |
Release | 2013-06-29 |
Genre | Mathematics |
ISBN | 3662100657 |
This accessible introduction to the theory of stochastic processes emphasizes Levy processes and Markov processes. It gives a thorough treatment of the decomposition of paths of processes with independent increments (the Lévy-Itô decomposition). It also contains a detailed treatment of time-homogeneous Markov processes from the viewpoint of probability measures on path space. In addition, 70 exercises and their complete solutions are included.