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Relation between generalized diffusion equations and subordination schemes

Aleksei V. Chechkin, Igor M. Sokolov

2021Physical review. E45 citationsDOIOpen Access PDF

Abstract

Generalized (non-Markovian) diffusion equations with different memory kernels and subordination schemes based on random time change in the Brownian diffusion process are popular mathematical tools for description of a variety of non-Fickian diffusion processes in physics, biology, and earth sciences. Some of such processes (notably, the fluid limits of continuous time random walks) allow for either kind of description, but other ones do not. In the present work we discuss the conditions under which a generalized diffusion equation does correspond to a subordination scheme, and the conditions under which a subordination scheme does possess the corresponding generalized diffusion equation. Moreover, we discuss examples of random processes for which only one, or both kinds of description are applicable.

Topics & Concepts

Subordination (linguistics)MathematicsDiffusionBrownian motionDiffusion processVariety (cybernetics)Random walkContinuous-time random walkStatistical physicsMarkov processAnomalous diffusionApplied mathematicsDiffusion equationFick's laws of diffusionMathematical analysisComputer sciencePhysicsInnovation diffusionStatisticsQuantum mechanicsService (business)LinguisticsEconomyPhilosophyKnowledge managementEconomicsFractional Differential Equations SolutionsDifferential Equations and Numerical MethodsThermoelastic and Magnetoelastic Phenomena
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