Optimal Estimates on the Propagation of Reactions with Fractional Diffusion
Abstract
We study the reaction-fractional-diffusion equation ut+(-)s u=f(u) with ignition and monostable reactions f, and s∈(0,1). We obtain the first optimal bounds on the propagation of front-like solutions in the cases where no traveling fronts exist. Our results cover most of these cases, and also apply to propagation from localized initial data.
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