Multiplicity and concentration results for fractional Schr\"odinger-Poisson equations with magnetic fields and critical growth

Abstract

We deal with the following fractional Schr\"odinger-Poisson equation with magnetic field equation 2s(-)A/su+V(x)u+-2t(|x|2t-3*|u|2)u=f(|u|2)u+|u|2*s-2u in R3, equation where >0 is a small parameter, s∈ (34, 1), t∈ (0,1), 2*s=63-2s is the fractional critical exponent, (-)sA is the fractional magnetic Laplacian, V:R3→ R is a positive continuous potential, A:R3→ R3 is a smooth magnetic potential and f:R→ R is a subcritical nonlinearity. Under a local condition on the potential V, we study multiplicity and concentration of nontrivial solutions as → 0. In particular, we relate the number of nontrivial solutions with the topology of the set where the potential V attains its minimum.