Wave propagation for reaction-diffusion equations on infinite random trees

Abstract: The asymptotic wave speed for FKPP type reaction-diffusion equations on a class of infinite random metric trees are considered. We show that a travelling wavefront emerges, provided that the reaction rate is large enough. The wavefront travels at a speed that can be quantified via a variational formula involving the random branching degrees d and the random branch lengths ℓ of the tree T d, ℓ . This speed is slower than that of the same equation on the real line R, and we estimate this slow down in terms of d … Show more