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Corrector results
for space-time homogenization of nonlinear diffusion
Tomoyuki Oka
Vol. 10 (2022), No. 2, 171–190
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Abstract |
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The present paper concerns a space-time homogenization problem for nonlinear diffusion equations with periodically oscillating (in space and time) coefficients. The main results consist of corrector results (i.e., strong convergence with corrector terms) for gradients, diffusion fluxes and time-derivatives of solutions without assumptions for smoothness of coefficients. Proofs of the main results are based on the space-time version of the unfolding method, which is deeply concerned with the strong two-scale convergence theory. |
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Keywords
space-time homogenization, corrector result, two-scale
convergence, unfolding method, fast diffusion equation,
porous medium equation, nonlinear diffusion equation
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Mathematical Subject Classification
Primary: 35B27
Secondary: 80M40, 47J35
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Milestones
Received: 20 January 2022
Revised: 10 July 2022
Accepted: 6 September 2022
Published: 25 October 2022
Communicated by Micol Amar
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Authors |
| Tomoyuki Oka | |
| Graduate School of Science Tohoku University Sendai Japan |
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