On the Number of Normalized Ground State Solutions for a class of Elliptic Equations with general nonlinearities and potentials

Abstract

We provide a precise description of the set of normalized ground state solutions (NGSS) for the class of elliptic equations: - u - λ u + V (| x |) u - f (| x |, u) = 0, Rn,\ n≥ 1. In particular, we show that under suitable assumptions on V and f, the NGSS is unique for all the masses except for at most a finite number. Moreover, we prove that when unique, the NGSS uc is a smooth function of the mass c. Our method is as follow: using the NGSS for a given mass c, we construct an exhaustive list of potential candidates to the minimization problem for masses close to c, and we develop a strategy how to pick the right one. In particular, if there is a unique NGSS for a given mass c0, then this uniqueness property is inherited for all the masses c close to c0. Our method is general and applies to other equations provided that some key properties hold true.