Article ID Journal Published Year Pages File Type
1897094 Physica D: Nonlinear Phenomena 2016 11 Pages PDF
Abstract

•We study the stability of fronts in a model of combustion in porous media.•We assume that the Lewis number is chosen in a specific way.•We use a combination of energy estimates and Evans function computations.•We prove nonlinear stability under the condition that there is no unstable spectrum.

In this paper we study the stability of fronts in a reduction of a well-known PDE system that is used to model the combustion in hydraulically resistant porous media. More precisely, we consider the original PDE system under the assumption that one of the parameters of the model, the Lewis number, is chosen in a specific way and with initial conditions of a specific form. For a class of initial conditions, then the number of unknown functions is reduced from three to two. For the reduced system, the existence of combustion fronts follows from the existence results for the original system. The stability of these fronts is studied here by a combination of energy estimates and numerical Evans function computations and nonlinear analysis when applicable. We then lift the restriction on the initial conditions and show that the stability results obtained for the reduced system extend to the fronts in the full system considered for that specific value of the Lewis number. The fronts that we investigate are proved to be either absolutely unstable or convectively unstable on the nonlinear level.

Related Topics
Physical Sciences and Engineering Mathematics Applied Mathematics
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