论文信息 - On the Existence of Patterns for a Diffusion equation on a Convex Domain with Nonlinear Boundary Reaction

On the Existence of Patterns for a Diffusion equation on a Convex Domain with Nonlinear Boundary Reaction

We consider a diffusion equation on a domain Ω with a cubic reaction at the boundary. It is known that there are no patterns when the domain Ω is a ball, but the existence of such patterns is still unkown in the more general case in which Ω is convex. The goal of this paper is to present numerical evidence of the existence of nonconstant stable equilibria when Ω is the unit square. These patterns are found by continuation of families of unstable equilibria that bifurcate from constant solutions.

Angel Jorba | Neus Cónsul | À. Jorba | N. Cónsul

[1] Hiroshi Matano,et al. Asymptotic Behavior and Stability of Solutions of Semilinear Diffusion Equations , 1979 .

[2] N. Cónsul. On equilibrium solutions of diffusion equations with nonlinear boundary conditions , 1996 .

[3] S. Oliva,et al. Attractors for Parabolic Problems with Nonlinear Boundary Conditions , 1997 .

[4] H. Amann. Parabolic evolution equations and nonlinear boundary conditions , 1988 .

[5] R. G. Casten,et al. Instability results for reaction diffusion equations with Neumann boundary conditions , 1978 .

[6] A. Carvalho,et al. Attractors of parabolic problems with nonlinear boundary conditions. uniform bounds , 2000 .

[7] G F Oster,et al. Generation of biological pattern and form. , 1984, IMA journal of mathematics applied in medicine and biology.

[8] J. Solà-Morales,et al. Stability of local minima and stable nonconstant equilibria , 1999 .