A Variational Principle for the Asymptotic Speed of Fronts of the Density Dependent Diffusion--Reaction Equation
Abstract
We show that the minimal speed for the existence of monotonic fronts of the equation ut = (um)xx + f(u) with f(0) = f(1) = 0, m >1 and f>0 in (0,1) derives from a variational principle. The variational principle allows to calculate, in principle, the exact speed for arbitrary f. The case m=1 when f'(0)=0 is included as an extension of the results.
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