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A new approach to fractional kinetic evolutions
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Kolokoltsov, Vassili N. and Troeva, Marianna (2022) A new approach to fractional kinetic evolutions. Fractal and Fractional, 6 (2). e49. doi:10.3390/fractalfract6020049 ISSN 2504-3110.
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Official URL: https://doi.org/10.3390/fractalfract6020049
Abstract
Kinetic equations describe the limiting deterministic evolution of properly scaled systems of interacting particles. A rather universal extension of the classical evolutions, that aims to take into account the effects of memory, suggests the generalization of these evolutions obtained by changing the standard time derivative with a fractional one. In the present paper, extending some previous notes of the authors related to models with a finite state space, we develop systematically the idea of CTRW (continuous time random walk) modelling of the Markovian evolution of interacting particle systems, which leads to a more nontrivial class of fractional kinetic measure-valued evolutions, with the mixed fractional order derivatives varying with the change of the state of the particle system, and with variational derivatives with respect to the measure variable. We rigorously justify the limiting procedure, prove the well-posedness of the new equations, and present a probabilistic formula for their solutions. As the most basic examples we present the fractional versions of the Smoluchovski coagulation and Boltzmann collision models.
Item Type: | Journal Article | ||||||
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Subjects: | Q Science > QA Mathematics | ||||||
Divisions: | Faculty of Science, Engineering and Medicine > Science > Statistics | ||||||
SWORD Depositor: | Library Publications Router | ||||||
Library of Congress Subject Headings (LCSH): | Fractional calculus, Markov processes, Kinetic theory of matter, Mathematical physics, Random walks (Mathematics) | ||||||
Journal or Publication Title: | Fractal and Fractional | ||||||
Publisher: | MDPI | ||||||
ISSN: | 2504-3110 | ||||||
Official Date: | 18 January 2022 | ||||||
Dates: |
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Volume: | 6 | ||||||
Number: | 2 | ||||||
Article Number: | e49 | ||||||
DOI: | 10.3390/fractalfract6020049 | ||||||
Status: | Peer Reviewed | ||||||
Publication Status: | Published | ||||||
Access rights to Published version: | Open Access (Creative Commons) | ||||||
Date of first compliant deposit: | 22 February 2022 | ||||||
Date of first compliant Open Access: | 23 February 2022 |
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