Boundary concentration of peak solutions for fractional Schr\"odinger-Poisson system

Abstract

The goal of this paper is to study the existence of peak solutions for the following fractional Schr\"odinger-Poisson system: eqnarray* \ =1.5pt arrayll 2s(-)su+u+φ u=up,\ \ \ &\ in\ ,\\[2mm] (-)sφ=u2,\ \ \ &\ in\ ,\\[2mm] u=φ=0,\ \ \ \ &\ in\ RN , array . eqnarray* where s∈(0,1), N>2s, p∈ (1,N+2sN-2s), is a bounded domain in RN with Lipschitz boundary, and (-)s is the fractional Laplacian operator, is a small positive parameter. By using the Lyapunov-Schmidt reduction method, we construct a single peak solution (u,φ) such that the peak of u is in the domain but near the boundary. In order to characterize the boundary concentration of solutions, which concentrates at an approximate distance 2/3 away from the boundary ∂ as tends to 0, some new estimates and analytic technique are used.