The Speed of Fronts of the Reaction Diffusion Equation

Abstract

We study the speed of propagation of fronts for the scalar reaction-diffusion equation ut = uxx + f(u)\, with f(0) = f(1) = 0. We give a new integral variational principle for the speed of the fronts joining the state u=1 to u=0. No assumptions are made on the reaction term f(u) other than those needed to guarantee the existence of the front. Therefore our results apply to the classical case f > 0 in (0,1), to the bistable case and to cases in which f has more than one internal zero in (0,1).

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