Electronic Journal of Qualitative Theory of Differential Equations (Sep 2017)
Existence of radially symmetric patterns for a diffusion problem with variable diffusivity
Abstract
We give a sufficient condition for the existence of radially symmetric stable stationary solution of the problem $u_t=\operatorname{div}(a^2\nabla u)+f(u)$ on the unit ball whose border is supplied with zero Neumann boundary condition. Such a condition involves the diffusivity function $a$ and the technique used here is inspired by the work of E. Yanagida.
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