ID | 56993 |
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Abstract | This paper studies traveling fronts to cooperation diffusion systems in R-N for N >= 3. We consider (N - 2)-dimensional smooth surfaces as boundaries of strictly convex compact sets in RN-1, and define an equivalence relation between them. We prove that there exists a traveling front associated with a given surface and show its stability. The associated traveling fronts coincide up to phase transition if and only if the given surfaces satisfy the equivalence relation.
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Keywords | Traveling front
Cooperation diffusion system
Non-symmetric
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Published Date | 2016-03-05
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Publication Title |
Journal of Differential Equations
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Volume | volume260
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Issue | issue5
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Publisher | Academic Press
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Start Page | 4301
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End Page | 4338
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ISSN | 00220396
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NCID | AA00696680
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Content Type |
Journal Article
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language |
English
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OAI-PMH Set |
岡山大学
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File Version | author
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DOI | |
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Related Url | isVersionOf https://doi.org/10.1016/j.jde.2015.11.010
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