Fractional Fields And Applications
Serge Cohen
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at 250 WPM4h 44m
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Fractional Fields And Applications
by Serge Cohen
Published
Jun 30, 2013
Publisher
Springer
Pages
284
ISBN-13
9783642367403
ISBN-10
3642367402
Description
This book focuses mainly on fractional Brownian fields and their extensions. It has been used to teach graduate students at Grenoble and Toulouse's Universities. It is as self-contained as possible and contains numerous exercises, with solutions in an appendix. After a foreword by Stéphane Jaffard, a long first chapter is devoted to classical results from stochastic fields and fractal analysis. A central notion throughout this book is self-similarity, which is dealt with in a second chapter with a particular emphasis on the celebrated Gaussian self-similar fields, called fractional Brownian fields after Mandelbrot and Van Ness's seminal paper. Fundamental properties of fractional Brownian fields are then stated and proved. The second central notion of this book is the so-called local asymptotic self-similarity (in short lass), which is a local version of self-similarity, defined in the third chapter. A lengthy study is devoted to lass fields with finite variance. Among these lass fields, we find both Gaussian fields and non-Gaussian fields, called Lévy fields. The Lévy fields can be viewed as bridges between fractional Brownian fields and stable self-similar fields. A further key issue concerns the identification of fractional parameters. This is the raison d'être of the statistics chapter, where generalized quadratic variations methods are mainly used for estimating fractional parameters. Last but not least, the simulation is addressed in the last chapter. Unlike the previous issues, the simulation of fractional fields is still an area of ongoing research. The algorithms presented in this chapter are efficient but do not claim to close the debate.
Subjects
Extremes in Random Fields
Random fields and spin glasses
Weakly Stationary Random Fields, Invariant Subspaces and Applications
Markov random fields and their applications
Random fields on a network
Random Fields
Frequently Asked Questions
How many pages are in Fractional Fields And Applications?
This edition of Fractional Fields And Applications has approximately 284 pages. Please note, this is an estimate and the exact page count can vary between hardcover, paperback, and e-book versions.
How long does it take to read Fractional Fields And Applications?
For most readers, Fractional Fields And Applications typically takes between 5h 55m and 3h 57m to complete. This is based on the book's length of approximately 71,000 words and common reading speeds.
Here's a detailed breakdown: • Continuous reading at 250 WPM: approximately 4h 44m of focused reading • Casual reading (30 minutes/day): you could finish in roughly 10 days • Estimated word count: 71,000 words
Your individual reading time will vary based on your personal reading pace, the amount of daily reading time, and your familiarity with the subject matter.
What is the word count of Fractional Fields And Applications?
The estimated word count for Fractional Fields And Applications is approximately 71,000 words. This figure is calculated using industry-standard methods that consider genre-specific word density patterns, typical formatting and layout characteristics, and standard words-per-page ratios for published books.
This is an approximation — actual word count may vary based on font size, formatting, edition, and the presence of illustrations or charts.
Who is the author of Fractional Fields And Applications?
Fractional Fields And Applications was written by Serge Cohen.
When was Fractional Fields And Applications published?
The publication date for this specific edition is Jun 30, 2013. The original work may have been published on a different date.