Eternal solutions for a reaction-diffusion equation with weighted reaction
Abstract
We prove existence and uniqueness of eternal solutions in self-similar form growing up in time with exponential rate for the weighted reaction-diffusion equation ∂tu= um+|x|σup, posed in N, with m>1, 0<p<1 and the critical value for the weight σ=2(1-p)m-1. Existence and uniqueness of some specific solution holds true when m+p≥2. On the contrary, no eternal solution exists if m+p<2. We also classify exponential self-similar solutions with a different interface behavior when m+p>2. Some transformations to reaction-convection-diffusion equations and traveling wave solutions are also introduced.
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