Some non-homogeneous Gagliardo-Nirenberg inequalities and application to a biharmonic non-linear Schr\"odinger equation

Abstract

We study the standing waves for a fourth-order Schr\"odinger equation with mixed dispersion that minimize the associated energy when the L2-norm (the mass) is kept fixed. We need some non-homogeneous Gagliardo-Nirenberg-type inequalities and we develop a method to prove such estimates that should be useful elsewhere. We prove optimal results on the existence of minimizers in the mass-subcritical and mass-critical cases. In the mass supercritical case we show that global minimizers do not exist, and we investigate the existence of local minimizers. If the mass does not exceed some threshold μ0 ∈ (0,+∞), our results on "best" local minimizers are also optimal.