New approaches for Schr\"odinger equations with prescribed mass: The Sobolev subcritical case and The Sobolev critical case with mixed dispersion

Abstract

In this paper, we prove the existence of normalized solutions for the following Schr\"odinger equation equation* \ arrayll - u-λ u=f(u), & x∈ N, ∫Nu2dx=c array . equation* with N3, c>0, λ∈ and f∈ C(,) in the Sobolev subcritical case with weaker L2-supercritical conditions and in the Sobolev critical case when f(u)=μ |u|q-2u+|u|2*-2u with μ>0 and 2<q<2*=2NN-2 allowing to be L2-subcritical, critical or supercritical. Our approach is based on several new critical point theorems on a manifold, which not only help to weaken the previous L2-supercritical conditions in the Sobolev subcritical case, but present an alternative scheme to construct bounded (PS) sequences on a manifold when f(u)=μ |u|q-2u+|u|2*-2u technically simpler than the Ghoussoub minimax principle involving topological arguments, as well as working for all 2<q<2*. In particular, we propose new strategies to control the energy level in the Sobolev critical case which allow to treat, in a unified way, the dimensions N=3 and N 4, and fulfill what were expected by Soave and by Jeanjean-Le . We believe that our approaches and strategies may be adapted and modified to attack more variational problems in the constraint contexts.