Fractional semilinear Neumann problems arising from a fractional Keller--Segel model

Abstract

We consider the following fractional semilinear Neumann problem on a smooth bounded domain ⊂Rn, n≥2, cases (-)1/2u+u=up,&in~,\\ ∂ u=0,&on~∂,\\ u>0,&in~, cases where >0 and 1<p<(n+1)/(n-1). This is the fractional version of the semilinear Neumann problem studied by Lin--Ni--Takagi in the late 80's. The problem arises by considering steady states of the Keller--Segel model with nonlocal chemical concentration diffusion. Using the semigroup language for the extension method and variational techniques, we prove existence of nonconstant smooth solutions for small , which are obtained by minimizing a suitable energy functional. In the case of large we obtain nonexistence of nonconstant solutions. It is also shown that as 0 the solutions u tend to zero in measure on , while they form spikes in . The regularity estimates of the fractional Neumann Laplacian that we develop here are essential for the analysis. The latter results are of independent interest.