Abstract
We study the behavior of oscillatory solutions to convection-diffusion problems, subject to initial and forcing data with modulated multi-scale oscillations. We determine the weak W-l,OO-limit of the solutions when the small scales of the modulations tend to zero and quantify the weak convergence rate. Moreover, in case the solution operator of the equation is compact, this weak convergence is translated into a strong one. Examples include nonlinear conservation laws and equations with nonlinear degenerate diffusion.
Original language | English |
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Title of host publication | NONLINEAR WAVES |
Subtitle of host publication | Proceedings of the Fourth MSJ International Research Institute Vol II |
Editors | R. Agemi, Y. Giga, T. Ozawa |
Publisher | Hokkaido University |
Pages | 478-486 |
Volume | 44 |
State | Published - 1996 |
Event | NONLINEAR WAVES: Proceedings of the Fourth MSJ International Research Institute Vol II - Sapporo, Japan Duration: 10 Jul 1995 → 21 Jul 1995 https://eprints.lib.hokudai.ac.jp/dspace/bitstream/2115/5484/1/44.pdf#page=236 |
Publication series
Name | Hokkaido University technical report series in mathematics |
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Publisher | Hokkaido University |
Number | 1 |
Volume | 44 |
Conference
Conference | NONLINEAR WAVES |
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Country/Territory | Japan |
City | Sapporo |
Period | 10/07/95 → 21/07/95 |
Internet address |