Gahn M, Neuss-Radu M, Pop IS (2021)
Publication Type: Journal article
Publication year: 2021
Book Volume: 289
Pages Range: 95-127
DOI: 10.1016/j.jde.2021.04.013
We consider a reaction-diffusion-advection problem in a perforated medium, with nonlinear reactions in the bulk and at the microscopic boundary, and slow diffusion scaling. The microstructure changes in time; the microstructural evolution is known a priori. The aim of the paper is the rigorous derivation of a homogenized model. We use appropriately scaled function spaces, which allow us to show compactness results, especially regarding the time-derivative and we prove strong two-scale compactness results of Kolmogorov-Simon-type, which allow to pass to the limit in the nonlinear terms. The derived macroscopic model depends on the micro- and the macro-variable, and the evolution of the underlying microstructure is approximated by time- and space-dependent reference elements.
APA:
Gahn, M., Neuss-Radu, M., & Pop, I.S. (2021). Homogenization of a reaction-diffusion-advection problem in an evolving micro-domain and including nonlinear boundary conditions. Journal of Differential Equations, 289, 95-127. https://doi.org/10.1016/j.jde.2021.04.013
MLA:
Gahn, M., Maria Neuss-Radu, and I. S. Pop. "Homogenization of a reaction-diffusion-advection problem in an evolving micro-domain and including nonlinear boundary conditions." Journal of Differential Equations 289 (2021): 95-127.
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