V. V. Uchaikin, “Self-similar anomalous diffusion and Levy-stable laws”, UFN, 173:8 (2003), 847–876; Phys. Usp., 46:8 (2003), 821

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Uspekhi Fizicheskikh Nauk, 2003, Volume 173, Number 8, Pages 847–876
DOI: https://doi.org/10.3367/UFNr.0173.200308c.0847 (Mi ufn2164)

This article is cited in 190 scientific papers (total in 190 papers)

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Self-similar anomalous diffusion and Levy-stable laws

V. V. Uchaikin

Ulyanovsk State University

Full-text PDF (4254 kB) Citations (190)

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DOI: https://doi.org/10.3367/UFNr.0173.200308c.0847

URL: https://www.ufn.ru/ru/articles/2003/8/c

Abstract: Stochastic principles for constructing the process of anomalous diffusion are considered, and corresponding models of random processes are reviewed. The self-similarity and the independent-increments principles are used to extend the notion of diffusion process to the class of Levy-stable processes. Replacing the independent-increments principle with the renewal principle allows us to take the next step in generalizing the notion of diffusion, which results in fractional-order partial space–time differential equations of diffusion. Fundamental solutions to these equations are represented in terms of stable laws, and their relationship to the fractality and memory of the medium is discussed. A new class of distributions, called fractional stable distributions, is introduced.

Received: October 1, 2002
Revised: April 9, 2003

English version:
Physics–Uspekhi, 2003, Volume 46, Issue 8, Pages 821–849
DOI: https://doi.org/10.1070/PU2003v046n08ABEH001324

Bibliographic databases:

Document Type: Article

PACS: 02.50.-r, 05.40.Fb, 05.40.Jc

Language: Russian

Citation: V. V. Uchaikin, “Self-similar anomalous diffusion and Levy-stable laws”, UFN, 173:8 (2003), 847–876; Phys. Usp., 46:8 (2003), 821–849

Citation in format AMSBIB

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https://www.mathnet.ru/eng/ufn/v173/i8/p847

This publication is cited in the following 190 articles:

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