Open AccessHeterogeneous discrete kinetic model and its diffusion limit
Author(s) -
Ho-Youn Kim,
Yong-Jung Kim,
Hyunji Lim
Publication year - 2021
Publication title -
kinetic and related models
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.987
H-Index - 28
eISSN - 1937-5093
pISSN - 1937-5077
DOI - 10.3934/krm.2021023
Subject(s) - monotonic function , kinetic energy , thermal diffusivity , limit (mathematics) , mathematics , lemma (botany) , convergence (economics) , diffusion , mathematical analysis , statistical physics , physics , classical mechanics , thermodynamics , ecology , poaceae , biology , economics , economic growth
A revertible discrete velocity kinetic model is introduced when the environment is spatially heterogeneous. It is proved that the parabolic scale singular limit of the model exists and satisfies a new heterogeneous diffusion equation that depends on the diffusivity and the turning frequency together. An energy functional is introduced which takes into account spatial heterogeneity in the velocity field. The monotonicity of the energy functional is the key to obtain uniform estimates needed for the weak convergence proof. The Div-Curl lemma completes the strong convergence proof.