Maximum Principles for Discrete and Semidiscrete Reaction-Diffusion Equation
We study reaction-diffusion equations with a general reaction function f on one-dimensional lattices with continuous or discrete time ux′ (or Δtux)=k(ux-1-2ux+ux+1)+f(ux), x∈Z. We prove weak and strong maximum and minimum principles for corresponding initial-boundary value problems. Whereas the ma...
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Hindawi Limited
2015-01-01
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| Series: | Discrete Dynamics in Nature and Society |
| Online Access: | http://dx.doi.org/10.1155/2015/791304 |
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doaj-2915215585b34257b309e782878bc11d2020-11-24T22:01:48ZengHindawi LimitedDiscrete Dynamics in Nature and Society1026-02261607-887X2015-01-01201510.1155/2015/791304791304Maximum Principles for Discrete and Semidiscrete Reaction-Diffusion EquationPetr Stehlík0Jonáš Volek1Department of Mathematics and NTIS, Faculty of Applied Sciences, University of West Bohemia, Univerzitni 8, 30614 Pilsen, Czech RepublicDepartment of Mathematics and NTIS, Faculty of Applied Sciences, University of West Bohemia, Univerzitni 8, 30614 Pilsen, Czech RepublicWe study reaction-diffusion equations with a general reaction function f on one-dimensional lattices with continuous or discrete time ux′ (or Δtux)=k(ux-1-2ux+ux+1)+f(ux), x∈Z. We prove weak and strong maximum and minimum principles for corresponding initial-boundary value problems. Whereas the maximum principles in the semidiscrete case (continuous time) exhibit similar features to those of fully continuous reaction-diffusion model, in the discrete case the weak maximum principle holds for a smaller class of functions and the strong maximum principle is valid in a weaker sense. We describe in detail how the validity of maximum principles depends on the nonlinearity and the time step. We illustrate our results on the Nagumo equation with the bistable nonlinearity.http://dx.doi.org/10.1155/2015/791304 |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Petr Stehlík Jonáš Volek |
| spellingShingle |
Petr Stehlík Jonáš Volek Maximum Principles for Discrete and Semidiscrete Reaction-Diffusion Equation Discrete Dynamics in Nature and Society |
| author_facet |
Petr Stehlík Jonáš Volek |
| author_sort |
Petr Stehlík |
| title |
Maximum Principles for Discrete and Semidiscrete Reaction-Diffusion Equation |
| title_short |
Maximum Principles for Discrete and Semidiscrete Reaction-Diffusion Equation |
| title_full |
Maximum Principles for Discrete and Semidiscrete Reaction-Diffusion Equation |
| title_fullStr |
Maximum Principles for Discrete and Semidiscrete Reaction-Diffusion Equation |
| title_full_unstemmed |
Maximum Principles for Discrete and Semidiscrete Reaction-Diffusion Equation |
| title_sort |
maximum principles for discrete and semidiscrete reaction-diffusion equation |
| publisher |
Hindawi Limited |
| series |
Discrete Dynamics in Nature and Society |
| issn |
1026-0226 1607-887X |
| publishDate |
2015-01-01 |
| description |
We study reaction-diffusion equations with a general reaction function f on one-dimensional lattices with continuous or discrete time ux′ (or Δtux)=k(ux-1-2ux+ux+1)+f(ux), x∈Z. We prove weak and strong maximum and minimum principles for corresponding initial-boundary value problems. Whereas the maximum principles in the semidiscrete case (continuous time) exhibit similar features to those of fully continuous reaction-diffusion model, in the discrete case the weak maximum principle holds for a smaller class of functions and the strong maximum principle is valid in a weaker sense. We describe in detail how the validity of maximum principles depends on the nonlinearity and the time step. We illustrate our results on the Nagumo equation with the bistable nonlinearity. |
| url |
http://dx.doi.org/10.1155/2015/791304 |
| work_keys_str_mv |
AT petrstehlik maximumprinciplesfordiscreteandsemidiscretereactiondiffusionequation AT jonasvolek maximumprinciplesfordiscreteandsemidiscretereactiondiffusionequation |
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