Fick's las selects the Neumann boundary condition

Abstract

We study the appearance of a boundary condition along an interface between two regions, one with constant diffusivity 1 and the other with diffusivity >0, when 0. In particular, we take Fick's diffusion law in a context of reaction-diffusion equation with bistable nonlinearity and show that the limit of the reaction-diffusion equation satisfies the homogeneous Neumann boundary condition along the interface. This problem is developed as an application of heterogeneous diffusion laws to study the geometry effect of domain.