Yihong Du, Fang Li, Maolin Zhou
Published 2019-09-09Version 1
In Cao, Du, Li and Li [8], a nonlocal diffusion model with free boundaries extending the local diffusion model of Du and Lin [12] was introduced and studied. For Fisher-KPP type nonlinearities, its long-time dynamical behaviour is shown to follow a spreading-vanishing dichotomy. However, when spreading happens, the question of spreading speed was left open in [8]. In this paper we obtain a rather complete answer to this question. We find a condition on the kernel function such that spreading grows linearly in time exactly when this condition holds, which is achieved by completely solving the associated semi-wave problem that determines this linear speed; when the kernel function violates this condition, we show that accelerating spreading happens.
Large deviations and the emergence of a logarithmic delay in a nonlocal Fisher-KPP equation
Qualitative properties of the spreading speed of a population structured in space and in phenotype
Long-time dynamics of a competition model with nonlocal diffusion and free boundaries: Vanishing and spreading of the invader
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