Normalized solutions to Schr\"odinger equations in the strongly sublinear regime

Abstract

We look for solutions to the Schr\"odinger equation \[ - u + λ u = g(u) in RN \] coupled with the mass constraint ∫RN|u|2\,dx = 2, with N2. The behaviour of g at the origin is allowed to be strongly sublinear, i.e., s0g(s)/s = -∞, which includes the case \[ g(s) = α s s2 + μ |s|p-2 s \] with α > 0 and μ ∈ R, 2 < p 2* properly chosen. We consider a family of approximating problems that can be set in H1(RN) and the corresponding least-energy solutions, then we prove that such a family of solutions converges to a least-energy one to the original problem. Additionally, under certain assumptions about g that allow us to work in a suitable subspace of H1(RN), we prove the existence of infinitely many solutions.