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Stable Non-Gaussian Random Processes: Stochastic Models with Infinite Variance: 1 (Stochastic Modeling Series) - Hardcover
Synopsis
This book presents similarity between Gaussian and non-Gaussian stable multivariate distributions and introduces the one-dimensional stable random variables. It discusses the most basic sample path properties of stable processes, namely sample boundedness and continuity.
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About the Author
Samoradnitsky, Gennady
From the Back Cover
The familiar Gaussian models do not allow for large deviations and are thus often inadequate for modeling high variability. Non-Gaussian stable models do not possess such limitations. They all share a familiar feature which differentiates them from the Gaussian ones. Their marginal distributions possess heavy "probability tails", always with infinite variance and in some cases with infinite first moment. The aim of this book is to make this exciting material easily accessible to graduate students and practitioners. Assuming only a first-year graduate course in probability, it includes material which has appeared only recently in journals and unpublished materials. Each chapter begins with a brief overview and concludes with a range of exercises at varying levels of difficulty. Proofs are spelled out in detail. The book includes a discussion of self-similar processes, ARMA, and fractional ARIMA time series with stable innovations.
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Stable Non-Gaussian Random Processes : Stochastic Models with Infinite Variance
Published by
Taylor & Francis, Chapman And Hall/CRC, 1994
ISBN 10: 0412051710
ISBN 13: 9780412051715
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Buch. Condition: Neu. nach der Bestellung gedruckt Neuware - Printed after ordering - This book presents similarity between Gaussian and non-Gaussian stable multivariate distributions and introduces the one-dimensional stable random variables. It discusses the most basic sample path properties of stable processes, namely sample boundedness and continuity. Seller Inventory # 9780412051715
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