Normalized solutions for Schr\"{o}dinger system with quadratic and cubic interactions

TL;DR

This paper thoroughly investigates the existence, non-existence, and behavior of normalized solutions for Schrödinger systems with quadratic and cubic interactions across various dimensions, revealing new solution structures and stability properties.

Contribution

It provides a comprehensive analysis of normalized solutions for Schrödinger systems with quadratic and cubic interactions, including existence criteria, solution classifications, and stability insights across different dimensions.

Findings

Existence of normalized ground states in 1D as global minimizers.

Classification of existence and nonexistence of solutions in 2D.

Multiple solutions, including ground and excited states, in 3D with detailed asymptotic behaviors.

Abstract

In this paper, we give a complete study on the existence and non-existence of normalized solutions for Schr\"{o}dinger system with quadratic and cubic interactions. In the one dimension case, the energy functional is bounded from below on the product of $L^2$-spheres, normalized ground states exist and are obtained as global minimizers. When $N=2$, the energy functional is not always bounded on the product of $L^2$-spheres. We give a classification of the existence and nonexistence of global minimizers. Then under suitable conditions on $b_1$ and $b_2$, we prove the existence of normalized solutions. When $N=3$, the energy functional is always unbounded on the product of $L^2$-spheres. We show that under suitable conditions on $b_1$ and $b_2$, at least two normalized solutions exist, one is a ground state and the other is an excited state. Furthermore, by refining the upper bound of the ground state energy, we provide a precise mass collapse behavior of the ground state and a precise limit behavior of the excited state as $\beta\rightarrow 0$. Finally, we deal with the high dimensional cases $N\geq 4$. Several non-existence results are obtained if $\beta<0$. When $N=4$, $\beta>0$, the system is a mass-energy double critical problem, we obtain the existence of a normalized ground state and its synchronized mass collapse behavior. Comparing with the well studied homogeneous case $\beta=0$, our main results indicate that the quadratic interaction term not only enriches the set of solutions to the above Schr\"{o}dinger system but also leads to a stabilization of the related evolution system.