Global existence, asymptotic behavior, and pattern formation driven by the parametrization of a nonlocal Fisher-KPP problem

Abstract

The global boundedness and the hair trigger effect of solutions for the nonlinear nonlocal reaction-diffusion equation align* ut= u+μ uα(1- J*uβ),in \; RN×(0,∞),\; N≥ 1 align* with α≥1, β,μ,>0 and u(x,0)=u0(x) are investigated. Under appropriate assumptions on J, it is proved that for any nonnegative and bounded initial condition, if α∈[1,α*) with α*=1+β for N=1,2 and α*=1+2βN for N>2, then the problem has a global bounded classical solution. Under further assumptions on the initial datum, the solutions satisfying 0≤ u(x,t)≤-1β for any (x,t)∈ RN×[0,+∞) are shown to converge to -1β uniformly on any compact subset of RN, which is known as the hair trigger effect. 1D numerical simulations of the above nonlocal reaction-diffusion equation are performed and the effect of several combinations of parameters and convolution kernels on the solution behavior is investigated. The results motivate a discussion about some conjectures arising from this model and further issues to be studied in this context. A formal deduction of the model from a mesoscopic formulation is provided as well.