Higher-order local and non-local correlations for 1D strongly interacting Bose gas

TL;DR

This paper analytically studies higher-order local and non-local correlation functions in a 1D strongly interacting Bose gas, revealing how generalized exclusion statistics govern these correlations across various temperatures.

Contribution

It introduces a rigorous analytical framework linking correlation functions to generalized exclusion statistics in the Lieb-Liniger model at strong interactions.

Findings

Correlation functions expressed in terms of interaction strength and GES parameter

Reproduction of known results for two- and three-body correlations

Explicit formulas for non-local correlations at zero energy and momentum

Abstract

The correlation function is an important quantity in the physics of ultracold quantum gases because it provides information about the quantum many-body wave function beyond the simple density profile. In this paper we first study the $M$-body local correlation functions, $g_M$, of the one-dimensional (1D) strongly repulsive Bose gas within the Lieb-Liniger model using the analytical method proposed by Gangardt and Shlyapnikov [1,2]. In the strong repulsion regime the 1D Bose gas at low temperatures is equivalent to a gas of ideal particles obeying the non-mutual generalized exclusion statistics (GES) with a statistical parameter $\alpha =1-2/\gamma$, i.e. the quasimomenta of $N$ strongly interacting bosons map to the momenta of $N$ free fermions via $k_i\approx \alpha k_i^F $ with $i=1,\ldots, N$. Here $\gamma$ is the dimensionless interaction strength within the Lieb-Liniger model. We rigorously prove that such a statistical parameter $\alpha$ solely determines the sub-leading order contribution to the $M$-body local correlation function of the gas at strong but finite interaction strengths. We explicitly calculate the correlation functions $g_M$ in terms of $\gamma$ and $\alpha$ at zero, low, and intermediate temperatures. For $M=2$ and $3$ our results reproduce the known expressions for $g_{2}$ and $g_{3}$ with sub-leading terms (see for instance [3-5]). We also express the leading order of the short distance \emph{non-local} correlation functions $\langle\Psi^\dagger(x_1)\cdots\Psi^\dagger(x_M)\Psi(y_M)\cdots\Psi(y_1)\rangle$ of the strongly repulsive Bose gas in terms of the wave function of $M$ bosons at zero collision energy and zero total momentum. Here $\Psi(x)$ is the boson annihilation operator. These general formulas of the higher-order local and non-local correlation functions of the 1D Bose gas provide new insights into the many-body physics.