Existence and concentration of nontrivial solutions for a fractional magnetic Schr\"odinger-Poisson type equation

Abstract

We consider the following fractional Schr\"odinger-Poisson type equation with magnetic fields equation* 2s(-)A/su+V(x)u+-2t(|x|2t-3*|u|2)u=f(|u|2)u in R3, equation* where >0 is a parameter, s∈ (34, 1), t∈ (0,1), (-)sA is the fractional magnetic Laplacian, A:R3→ R3 is a smooth magnetic potential, V:R3→ R is a positive continuous electric potential and f:R3→ R is a continuous function with subcritical growth. By using suitable variational methods, we show the existence of families of nontrivial solutions concentrating around local minima of the potential V(x) as → 0.