Normalized ground states for NLS equations with mass critical nonlinearities

Abstract

We study normalized solutions (μ,u)∈ R × H1(RN) to nonlinear Schr\"odinger equations - u + μ u = g(u) in\ RN, 12∫RN u2 dx = m, where N≥ 2 and the mass m>0 is given. Here g has an L2-critical growth, both at the origin and at infinity, that is g(s) |s|p-1s as s 0 and s∞, where p=1+4N. We continue the analysis started in [Cingolani-Gallo-Ikoma-Tanaka, 2024], where we found two (possibly distinct) minimax values b ≤ 0 ≤ b of the Lagrangian functional. In this paper we furnish explicit examples of g satisfying b<0<b, b=0<b and b<0=b; notice that b=0=b in the power case g(t)=|t|p-1t. Moreover, we deal with the existence and non-existence of a solution with minimal energy. Finally, we discuss the assumptions required on g to obtain the existence of a positive solution for perturbations of g.