Traveling waves in reaction-diffusion-convection equations with combustion nonlinearity
Abstract
This paper concerns the existence and properties of traveling wave solutions to reaction-diffusion-convection equations on the real line. We consider a general diffusion term involving the p-Laplacian and combustion-type reaction term. We extend and generalize the results established for p=2 to the case of singular and degenerate diffusion. Our approach allows for non-Lipschitz reaction as well. We also discuss the shape of the traveling wave profile near equilibria, assuming power-type behavior of the reaction and diffusion terms.
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