Abstract

The current paper is devoted to the study of spatial spreading dynamics of a class of nonlocal diffusion equation. It is known that there exists a critical speed \(c^{*}>0\) such that this nonlocal diffusion equation has a unique regular traveling wave solution if and only if \(c>c^{*}\). In this paper we show that this \(c^{*}\) is the asymptotic speed of propagation.

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