Thermodynamic limit and $L^\infty$-convergence rate for the cubic-quintic Schr\"{o}dinger model

TL;DR

This paper establishes the thermodynamic limit and convergence rates for the cubic-quintic Schr"odinger model, providing explicit formulas for the limit and demonstrating strong convergence to Thomas-Fermi states in specific regimes.

Contribution

It proves the existence of the thermodynamic limit for the model, characterizes it explicitly, and introduces a novel method for obtaining $L^ Infty$-convergence rates of ground states.

Findings

Thermodynamic limit is $-rac{3}{32}$ for $0< ho extless{} rac{3}{4}$.

Ground states converge strongly to Thomas-Fermi states in $L^2igcap L^6$ for spherical domains.

Established $L^ Infty$-convergence rate for $0< ho<3/4$ using new iterative and energy estimates.

Abstract

We investigate the thermodynamic limit for the cubic-quintic Schr\"{o}dinger model as the size of the domain tends to infinity with fixed density $\rho= N/|\mathcal{D}|$, where $N$ denotes particle number and $|\mathcal{D}|$ denotes the volume of the bounded domain $\mathcal{D}\subset\mathbb{R}^d$ ($d=1,2,3$). We firstly prove the existence of thermodynamic limit, which is equal to $-\frac{3}{32}$ for \(0<\rho\leq \frac{3}{4}\), while $-\left(\frac{1}{2}-\frac{\rho}{3}\right)\frac{\rho}{2}$ for $\frac{3}{4}< \rho\leq 1$. When \(0<\rho<1\) and \(\mathcal{D}\) is a spherical domain, we further show that, up to a scaling, the ground state of the cubic-quintic Schr\"{o}dinger energy will converge strongly to a Thomas-Fermi ground state in $L^2\cap L^6$. Finally, we obtain the $L^\infty$-convergence rate of ground states for \(0<\rho<3/4\) by developing a novel method, including some iterative techniques, uniform energy estimates and gradient estimates. We believe this method is applicable to other general nonlinearities.