Metastable dynamics of internal interfaces for a convection-reaction-diffusion equation

Abstract

We study a one dimensional metastable dynamics of internal interfaces for the initial boundary value problem for the following convection-reaction-diffusion equation equation* ∂t u = ∂x2 u -∂x f(u)+ f'(u). equation* A metastable behavior appears when the time-dependent solution develops into a layered function in a relatively short time, and subsequent approaches its steady state in a very long time interval. A rigorous analysis is used to study such behavior, by means of the construction of a one-parameter family \ U(x;)\ of approximate stationary solutions and of a linearization of the original system around an element of this family. We obtain a system consisting in an ODE for the parameter , describing the position of the interface, coupled with a PDE for the perturbation v, defined as the difference v:=u-U. The key of our analysis are the spectral properties of the linearized operator around an element of the family \ U \: the presence of a first eigenvalue, small with respect to , leads to a metastable behavior when 1.