Stability analysis and Hopf bifurcation at high Lewis number in a combustion model with free interface

Abstract

In this paper we analyze the stability of the traveling wave solution for an ignition-temperature, first-order reaction model of thermo-diffusive combustion, in the case of high Lewis numbers ( Le >1). The system of two parabolic PDEs is characterized by a free interface at which ignition temperature i is reached. We turn the model to a fully nonlinear problem in a fixed domain. When the Lewis number is large, we define a bifurcation parameter m=i/(1-i) and a perturbation parameter = 1/ Le. The main result is the existence of a critical value mc() close to mc=6 at which Hopf bifurcation holds for small enough. Proofs combine spectral analysis and non-standard application of Hurwitz Theorem with asymptotics as 0.