Energy local minimizers for the nonlinear Schr\"odinger equation on product spaces

Abstract

We investigate the existence of local minimizers with prescribed L2-norm for the energy functional associated to the mass-supercritical nonlinear Schr\"odinger equation on the product space RN × Mk, where (Mk,g) is a compact Riemannian manifold, thus complementing the study of the mass-subcritical case performed by Terracini, Tzvetkov and Visciglia in [Anal. PDE 2014, arXiv:1205.0342]. First we prove that, for small L2-mass, the problem admits local minimizers. Next, we show that when the L2-norm is sufficiently small, the local minimizers are constants along Mk, and they coincide with those of the corresponding problem on RN. Finally, under certain conditions, we show that the local minimizers obtained above are nontrivial along Mk. The latter situation occurs, for instance, for every Mk of dimension k 2, with the choice of an appropriate metric g, and in R×Sk, k 3, where Sk is endowed with the standard round metric.