Existence and concentration of positive ground state solutions for nonlinear fractional Schr\"odinger-Poisson system with critical growth

Abstract

In this paper, we study the following fractional Schr\"odinger-Poisson system involving competing potential functions equation* \ arrayll 2s(-)su+V(x)u+φ u=K(x)f(u)+Q(x)|u|2s-2u, & in R3, 2t(-)tφ=u2,& in R3, array . equation* where >0 is a small parameter, f is a function of C1 class, superlinear and subcritical nonlinearity, 2s=63-2s, s>34, t∈(0,1), V(x) K(x) and Q(x) are positive continuous function. Under some suitable assumptions on V, K and Q, we prove that there is a family of positive ground state solutions with polynomial growth for sufficiently small >0, of which it is concentrating on the set of minimal points of V(x) and the sets of maximal points of K(x) and Q(x). The methods are based on the Nehari manifold, arguments of Brezis-Nirenberg and concentration compactness of P. L. Lions.