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Multifractional stochastic fieldswav...

Ayache, Antoine.

Multifractional stochastic fieldswavelet strategies in multifractional frameworks /

Record Type:	Electronic resources : Monograph/item
Title/Author:	Multifractional stochastic fieldsAntoine Ayache.
Reminder of title:	wavelet strategies in multifractional frameworks /
Author:	Ayache, Antoine.
Published:	Singapore :World Scientific,c2019.
Description:	1 online resource (235 p.) :ill. (some col.)
Subject:	Brownian motion processes.
Online resource:	https://www.worldscientific.com/worldscibooks/10.1142/8917#t=toc
ISBN:	9789814525664$q(electronic bk.)

Multifractional stochastic fieldswavelet strategies in multifractional frameworks /
Ayache, Antoine.

Multifractional stochastic fieldswavelet strategies in multifractional frameworks /[electronic resource] :Antoine Ayache. - 1st ed. - Singapore :World Scientific,c2019. - 1 online resource (235 p.) :ill. (some col.)

Includes bibliographical references.

"Fractional Brownian Motion (FBM) is a very classical continuous self-similar Gaussian field with stationary increments. In 1940, some works of Kolmogorov on turbulence led him to introduce this quite natural extension of Brownian Motion, which, in contrast with the latter, has correlated increments. However, the denomination FBM is due to a very famous article by Mandelbrot and Van Ness, published in 1968. Not only in it, but also in several of his following works, Mandelbrot emphasized the importance of FBM as a model in several applied areas, and thus he made it to be known by a wide community. Therefore, FBM has been studied by many authors, and used in a lot of applications. In spite of the fact that FBM is a very useful model, it does not always fit to real data. This is the reason why, for at least two decades, there has been an increasing interest in the construction of new classes of random models extending it, which offer more flexibility. A paradigmatic example of them is the class of Multifractional Fields. Multifractional means that fractal properties of models, typically, roughness of paths and self-similarity of probability distributions, are locally allowed to change from place to place. In order to sharply determine path behavior of Multifractional Fields, a wavelet strategy, which can be considered to be new in the probabilistic framework, has been developed since the end of the 90's. It is somehow inspired by some rather non-standard methods, related to the fine study of Brownian Motion roughness, through its representation in the Faber–Schauder system. The main goal of the book is to present the motivations behind this wavelet strategy, and to explain how it can be applied to some classical examples of Multifractional Fields. The book also discusses some topics concerning them which are not directly related to the wavelet strategy."--

Electronic reproduction.
Singapore :
World Scientific,
[2018]

Mode of access: World Wide Web.

ISBN: 9789814525664$q(electronic bk.)Subjects--Topical Terms:

183837
Brownian motion processes.

LC Class. No.: QA274.75 / .A93 2019

Dewey Class. No.: 519.2/3

Multifractional stochastic fieldswavelet strategies in multifractional frameworks /
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250 $a 1st ed.
260 $a Singapore : $b World Scientific, $c c2019.
300 $a 1 online resource (235 p.) : $b ill. (some col.)
504 $a Includes bibliographical references.
520 $a "Fractional Brownian Motion (FBM) is a very classical continuous self-similar Gaussian field with stationary increments. In 1940, some works of Kolmogorov on turbulence led him to introduce this quite natural extension of Brownian Motion, which, in contrast with the latter, has correlated increments. However, the denomination FBM is due to a very famous article by Mandelbrot and Van Ness, published in 1968. Not only in it, but also in several of his following works, Mandelbrot emphasized the importance of FBM as a model in several applied areas, and thus he made it to be known by a wide community. Therefore, FBM has been studied by many authors, and used in a lot of applications. In spite of the fact that FBM is a very useful model, it does not always fit to real data. This is the reason why, for at least two decades, there has been an increasing interest in the construction of new classes of random models extending it, which offer more flexibility. A paradigmatic example of them is the class of Multifractional Fields. Multifractional means that fractal properties of models, typically, roughness of paths and self-similarity of probability distributions, are locally allowed to change from place to place. In order to sharply determine path behavior of Multifractional Fields, a wavelet strategy, which can be considered to be new in the probabilistic framework, has been developed since the end of the 90's. It is somehow inspired by some rather non-standard methods, related to the fine study of Brownian Motion roughness, through its representation in the Faber–Schauder system. The main goal of the book is to present the motivations behind this wavelet strategy, and to explain how it can be applied to some classical examples of Multifractional Fields. The book also discusses some topics concerning them which are not directly related to the wavelet strategy."-- $c Publisher's website.
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538 $a Mode of access: World Wide Web.
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