Strong competition versus fractional diffusion: the case of Lotka-Volterra interaction

Abstract

We consider a system of differential equations with nonlinear Steklov boundary conditions, related to the fractional problem (-)s ui = fi(x,ui) - β uip Σj≠ i aij ujp, where i = i,…, k, s∈(0,1), p>0, aij>0 and β>0. When k=2 we develop a quasi-optimal regularity theory in C0,α, uniformly w.r.t. β, for every α < α opt=min(1,2s); moreover we show that the traces of the limiting profiles as β+∞ are Lipschitz continuous and segregated. Such results are extended to the case of k≥3 densities, with some restrictions on s, p and aij.