Wavefronts for a nonlinear nonlocal bistable reaction-diffusion equation in population dynamics

Abstract

The wavefronts of a nonlinear nonlocal bistable reaction-diffusion equation, align* ∂ u∂ t=∂2u∂ x2+u2(1-Jσ*u)-du,(t,x)∈(0,∞)× R, align* with Jσ(x)=(1/σ)= J(x/σ) and ∫ R J(x)dx=1 are investigated in this article. It is proven that there exists a c*(σ) such that for all c≥ c*(σ), a monotone wavefront (c,ω) can be connected by the two positive equilibrium points. On the other hand, there exists a c*(σ) such that the model admits a semi-wavefront (c*(σ),ω) with ω(-∞)=0. Furthermore, it is shown that for sufficiently small σ, the semi-wavefronts are in fact wavefronts connecting 0 to the largest equilibrium. In addition, the wavefronts converge to those of the local problem as σ0.