The existence and concentration of positive ground state solutions for a class of fractional Schr\"odinger-Poisson systems with steep potential wells

Abstract

The present study is concerned with the following fractional Schr\"odinger-Poisson system with steep potential well: \% arrayll (-)s u+ V(x)u+K(x)φ u= f(u), & x∈3, (-)t φ=K(x)u2, & x∈3, array% . where s,t∈(0,1) with 4s+2t>3, and >0 is a parameter. Under certain assumptions on V(x), K(x) and f(u) behaving like |u|q-2u with 2<q<2s*=63-2s, the existence of positive ground state solutions and concentration results are obtained via some new analytical skills and Nehair-Pohozaev identity. In particular, the monotonicity assumption on the nonlinearity is not necessary.