Boundedness and large-time behavior results for a diffusive epidemic model.

Melkemi, Lamine; Mokrane, Ahmed Zerrouk; Youkana, Amar

Displaying similar documents to “Boundedness and large-time behavior results for a diffusive epidemic model.”

On the uniform boundedness of the solutions of systems of reaction-diffusion equations.

Melkemi, Lamine, Mokrane, Ahmed Zerrouk, Youkana, Amar (2005)

Electronic Journal of Qualitative Theory of Differential Equations [electronic only]

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Existence of global solutions for a system of reaction-diffusion equations with exponential nonlinearity.

Daddiouaissa, El Hachemi (2009)

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Uniform boundedness and global existence of solutions for reaction-diffusion systems with a balance law and a full matrix of diffusion coefficients.

Kouachi, Said (2001)

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Global existence of solutions in invariant regions for reaction-diffusion systems with a balance law and a full matrix of diffusion coefficients.

Kouachi, Said (2003)

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Global behavior for a diffusive predator-prey model with stage structure and nonlinear density restriction. I: The case in $ℝ^{n}$ .

Zhang, Rui, Guo, Ling, Fu, Shengmao (2009)

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Global existence and asymptotic behaviour for a degenerate diffusive SEIR model.

Aliziane, Tarik, Langlais, Michel (2005)

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Global existence of solutions for reaction-diffusion systems with a full matrix of diffusion coefficients and nonhomogeneous boundary conditions.

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Extinction and non-extinction of solutions for a nonlocal reaction-diffusion problem.

Liu, Wenjun (2010)

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Asymptotic behavior of solutions for a semibounded nonmonotone evolution equation.

Karachalios, Nikos, Stavrakakis, Nikos, Xanthopoulos, Pavlos (2003)

Abstract and Applied Analysis

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Existence of global solution and nontrivial steady states for a system modeling chemotaxis.

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Convergence to the travelling wave solution for a nonlinear reaction-diffusion equation

Shoshana Kamin, Philip Rosenau (2004)

Atti della Accademia Nazionale dei Lincei. Classe di Scienze Fisiche, Matematiche e Naturali. Rendiconti Lincei. Matematica e Applicazioni

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We study the behaviour of the solutions of the Cauchy problem $u_{t} = {(u^{m})}_{x x} + u (1 - u^{m - 1}), x \in R, t > 0 u (0, x) = u_{0} (x), u_{0} (x) \geq 0,$ and prove that if initial data $u_{0} (x)$ decay fast enough at infinity then the solution of the Cauchy problem approaches the travelling wave solution spreading either to the right or to the left, or two travelling waves moving in opposite directions. Certain generalizations are also mentioned.