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Mielke, Alexander [Author]; Reichelt, Sina [Author]; Thomas, Marita [Author]

Two-scale homogenization of nonlinear reaction-diffusion systems with slow diffusion

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  • Media type: Text; Report; E-Book
  • Title: Two-scale homogenization of nonlinear reaction-diffusion systems with slow diffusion
  • Contributor: Mielke, Alexander [Author]; Reichelt, Sina [Author]; Thomas, Marita [Author]
  • Published: Weierstrass Institute for Applied Analysis and Stochastics publication server, 2013
  • Language: English
  • DOI: https://doi.org/10.20347/WIAS.PREPRINT.1834
  • Keywords: 35M10 ; 35K65 ; 35K57 ; 35B25 ; 35A01 ; Two-scale convergence -- folding and unfolding -- coupled reaction-diffusion equations -- nonlinear reaction -- degenerating diffusion -- Gronwall estimate ; article
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  • Description: We derive a two-scale homogenization limit for reaction-diffusion systems where for some species the diffusion length is of order 1 whereas for the other species the diffusion length is of the order of the periodic microstructure. Thus, in the limit the latter species will display diffusion only on the microscale but not on the macroscale. Because of this missing compactness, the nonlinear coupling through the reaction terms cannot be homogenized but needs to be treated on the two-scale level. In particular, we have to develop new error estimates to derive strong convergence results for passing to the limit.
  • Access State: Open Access