Existence of normalized solutions of a Hartree-Fock system with mass subcritical growth

TL;DR

This paper proves the existence of normalized solutions for a Hartree-Fock system with mass subcritical growth, identifying conditions on parameters and growth rates, and also discusses nonexistence and stability of solutions.

Contribution

It establishes the existence of normalized solutions for the Hartree-Fock system under specific growth conditions and parameter regimes, extending prior results.

Findings

Existence of solutions for 1<q<4/3 with any positive masses.

Existence of solutions for small masses when 4/3≤q<3/2.

Nonexistence of solutions for 3/2≤q<5/3.

Abstract

In this paper, we are concerned with normalized solutions in $H_{r}^{1}(\mathbb{R}^{3}) \times H_{r}^{1}(\mathbb{R}^{3})$ for Hartree-Fock type systems with the form \be\lab{ Hartree-Fock} \left\{ \begin{array}{ll} -\Delta u +\alpha \phi _{u,v} u=\lambda _{1} u+\left | u \right | ^{2q-2} u+\beta \left | v \right | ^{q} \left | u \right | ^{q-2} u , \\ -\Delta v +\alpha \phi _{u,v} v=\lambda _{2} v+\left | v\right | ^{2q-2} v+\beta \left | u \right | ^{q} \left | v \right | ^{q-2} v , \\ \int_{\mathbb{R}^{3}}\left | u \right | ^{2} {\rm d}x=a_{1} , \quad \int_{\mathbb{R}^{3}}\left | v \right | ^{2} {\rm d}x=a_{2} , \nonumber\\ \end{array} where $$ \phi_{u, v}\left(x\right):=\int_{\mathbb{R}^{3}} \frac{u^{2}(y)+v^{2}(y)}{|x-y|} {\rm d}y \in D^{1,2}\left(\mathbb{R}^{3}\right). $$ Here $\alpha,\beta>0, a_1,a_2>0$ and $1<q<\frac{5}{3}$. By seeking the constrained global minimizers of the corresponding functional, we prove that the existence of normalized solutions to the system above for any $a_1,a_2>0$ when $1<q<\frac{4}{3}$ and for $a_1,a_2>0$ small when $\frac{4}{3}\le q < \frac{3}{2}$. The nonexistence of normalized solutions is also considered for $\frac{3}{2}\le q < \frac{5}{3}$. Also, the orbital stability of standing waves is obtained under local well-posedness assumptions of the evolution problem.