Normalized solutions for a fractional Schr\"odinger-Poisson system with critical growth

Abstract

In this paper, we study the fractional critical Schr\"odinger-Poisson system \[cases (-)su +λφ u= α u+μ|u|q-2u+|u|2*s-2u,&~~ in~ R3,\\ (-)tφ=u2,&~~ in~ R3,cases \] having prescribed mass \[∫ R3 |u|2dx=a2,\] where s, t ∈ (0, 1) satisfies 2s+2t > 3, q∈(2,2*s), a>0 and λ,μ>0 parameters and α∈ R is an undetermined parameter. Under the L2-subcritical perturbation q∈ (2, 2+4s3), we derive the existence of multiple normalized solutions by means of the truncation technique, concentration-compactness principle and the genus theory. For the L2-supercritical perturbation q∈ (2+4s3, 2*s), by applying the constrain variational methods and the mountain pass theorem, we show the existence of positive normalized ground state solutions.