Please use this identifier to cite or link to this item: http://hdl.handle.net/1822/9738

TitleOn a constrained reaction-diffusion system related to a multiphase problem
Author(s)Rodrigues, José Francisco
Santos, Lisa
KeywordsReaction-diffusion systems
Multiphase problems
Parabolic variational inequalities
Evolutionary game dynamics
Issue date2009
PublisherAmerican Institute of Mathematical Sciences (AIMS)
JournalDiscrete and Continuous Dynamical Systems
Citation"Discrete and Continuous Dynamical Systems". ISSN 1078-0947. 25:1 (2009) 299-319.
Abstract(s)We solve and characterize the Lagrange multipliers of a reaction- -diffusion system in the Gibbs simplex of $\R^{N+1}$ by considering strong solutions of a system of parabolic variational inequalities in $\R^N$. Exploring properties of the two obstacles evolution problem, we obtain and approximate a $N$-system involving the characteristic functions of the saturated and/or degenerated phases in the nonlinear reaction terms. We also show continuous dependence results and we establish sufficient conditions of non-degeneracy for the stability of those phase subregions.
TypeArticle
URIhttp://hdl.handle.net/1822/9738
ISSN1078-0947
Peer-Reviewedyes
AccessOpen access
Appears in Collections:CMAT - Artigos em revistas com arbitragem / Papers in peer review journals

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