Normalized Solutions for nonlinear Schr\"odinger-Poisson equations involving nearly mass-critical exponents

Abstract

We study the Schr\"odinger-Poisson-Slater equation equation*\arraylll - u + λ u + (|x|-1 |u|2)u = V(x) u p-1 , \, in R3,\\[2mm] ∫R3u2 \,dx= a,\,\, u > 0,\,\, u ∈ H1(R3), array . equation* where λ is a Lagrange multiplier, V(x) is a real-valued potential, a∈ R+ is a constant, p = 103 and >0 is a small parameter. In this paper, we prove that it is the positive critical value of the potential V that affects the existence of single-peak solutions for this problem. Furthermore, we prove the local uniqueness of the solutions we construct.