Numerical Solution to Anomalous Diffusion Equations for Levy Walks

Numerical Solution to Anomalous Diffusion Equations for Levy Walks

The process of Levy random walks is considered in view of the constant velocity of a particle. A kinetic equation is obtained that describes the process of walks, and fractional differential equations are obtained that describe the asymptotic behavior of the process. It is shown that, in the case of...

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Veröffentlicht in:Mathematics (Basel) 2021-12, Vol.9 (24), p.3219
Hauptverfasser: Saenko, Viacheslav V., Kovalnogov, Vladislav N., Fedorov, Ruslan V., Chamchiyan, Yuri E.
Format: Artikel
Sprache:eng
Schlagworte:
Algorithms
anomalous diffusion
Asymptotic properties
combustion process
Differential equations
fractional material derivative
Kinetic equations
Levy walks
local estimate
Mathematical analysis
Mathematics
Monte Carlo method
Monte Carlo simulation
Normal distribution
Probability
Random walk
Velocity
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Beschreibung
Zusammenfassung:The process of Levy random walks is considered in view of the constant velocity of a particle. A kinetic equation is obtained that describes the process of walks, and fractional differential equations are obtained that describe the asymptotic behavior of the process. It is shown that, in the case of finite and infinite mathematical expectation of paths, these equations have a completely different form. To solve the obtained equations, the method of local estimation of the Monte Carlo method is described. The solution algorithm is described and the advantages and disadvantages of the considered method are indicated.
ISSN:2227-7390
2227-7390
DOI:10.3390/math9243219