Singular limits of reaction diffusion equations of KPP type in an infinite cylinder
In this thesis, we establish the asymptotic analysis of the singularly perturbed reaction diffusion equation [cataloger unable to transcribe mathematical equations].... Our results establish the specific dependency on the coefficients of this equation and the size of the parameter [delta] with respe...
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2008
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ndltd-UTEXAS-oai-repositories.lib.utexas.edu-2152-32042015-09-20T16:51:47ZSingular limits of reaction diffusion equations of KPP type in an infinite cylinderCarreón, FernandoReaction-diffusion equationsViscosity solutionsIn this thesis, we establish the asymptotic analysis of the singularly perturbed reaction diffusion equation [cataloger unable to transcribe mathematical equations].... Our results establish the specific dependency on the coefficients of this equation and the size of the parameter [delta] with respect to [epsilon]. The analyses include equation subject to Dirichlet and Neumann boundary conditions. In both cases, the solutions u[superscript epsilon] converge locally uniformally to the equilibria of the reaction term f. We characterize the limiting behavior of the solutions through the viscosity solution of a variational inequality. To construct the coefficients defining the variational inequality, we apply concepts developed for the homogenization of elliptic operators. In chapter two, we derive the convergence results in the Neumann case. The third chapter is dedicated to the analysis of the Dirichlet case.text2008-08-28T23:33:35Z2008-08-28T23:33:35Z20072008-08-28T23:33:35ZThesiselectronicb68792852http://hdl.handle.net/2152/3204173650370engCopyright is held by the author. Presentation of this material on the Libraries' web site by University Libraries, The University of Texas at Austin was made possible under a limited license grant from the author who has retained all copyrights in the works. |
| collection |
NDLTD |
| language |
English |
| format |
Others
|
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NDLTD |
| topic |
Reaction-diffusion equations Viscosity solutions |
| spellingShingle |
Reaction-diffusion equations Viscosity solutions Carreón, Fernando Singular limits of reaction diffusion equations of KPP type in an infinite cylinder |
| description |
In this thesis, we establish the asymptotic analysis of the singularly perturbed reaction diffusion equation [cataloger unable to transcribe mathematical equations].... Our results establish the specific dependency on the coefficients of this equation and the size of the parameter [delta] with respect to [epsilon]. The analyses include equation subject to Dirichlet and Neumann boundary conditions. In both cases, the solutions u[superscript epsilon] converge locally uniformally to the equilibria of the reaction term f. We characterize the limiting behavior of the solutions through the viscosity solution of a variational inequality. To construct the coefficients defining the variational inequality, we apply concepts developed for the homogenization of elliptic operators. In chapter two, we derive the convergence results in the Neumann case. The third chapter is dedicated to the analysis of the Dirichlet case. === text |
| author |
Carreón, Fernando |
| author_facet |
Carreón, Fernando |
| author_sort |
Carreón, Fernando |
| title |
Singular limits of reaction diffusion equations of KPP type in an infinite cylinder |
| title_short |
Singular limits of reaction diffusion equations of KPP type in an infinite cylinder |
| title_full |
Singular limits of reaction diffusion equations of KPP type in an infinite cylinder |
| title_fullStr |
Singular limits of reaction diffusion equations of KPP type in an infinite cylinder |
| title_full_unstemmed |
Singular limits of reaction diffusion equations of KPP type in an infinite cylinder |
| title_sort |
singular limits of reaction diffusion equations of kpp type in an infinite cylinder |
| publishDate |
2008 |
| url |
http://hdl.handle.net/2152/3204 |
| work_keys_str_mv |
AT carreonfernando singularlimitsofreactiondiffusionequationsofkpptypeinaninfinitecylinder |
| _version_ |
1716820439238443008 |