Normalized solutions to the mixed dispersion nonlinear Schrödinger equation in the mass critical and supercritical regime
arXiv:1802.09217
Abstract
In this paper, we study the existence of solutions to the mixed dispersion nonlinear Schrödinger equation $$ γÎ^2 u -Îu + αu=|u|^{2 Ï} u, \quad u \in H^2(\R^N), $$ under the constraint $$ \int_{\R^N}|u|^2 \, dx =c>0. $$ We assume $γ>0, N \geq 1, 4 \leq ÏN < \frac{4N}{(N-4)^+}$, whereas the parameter $α\in \R$ will appear as a Lagrange multiplier. Given $c \in \R^+$, we consider several questions including the existence of ground states, of positive solutions and the multiplicity of radial solutions. We also discuss the stability of the standing waves of the associated dispersive equation.
The present version is accepted for publication in Trans. Amer. Math. Soc