Full counting statistics for interacting trapped fermions

TL;DR

This paper analyzes quantum fluctuations of fermion counts in one-dimensional interacting fermion systems, deriving universal formulas for variance and higher cumulants, and connecting these to random matrix theory and Luttinger liquid predictions.

Contribution

It introduces a universal formula for the variance and higher cumulants of fermion number fluctuations in 1D interacting fermions, extending random matrix theory connections.

Findings

Variance of fermion number grows as A_beta log N + B_beta

Results are consistent with Luttinger liquid theory with parameter K=2/beta

Identifies models with fermion density transitions, including a form of the Gross-Witten-Wadia model

Abstract

We study $N$ spinless fermions in their ground state confined by an external potential in one dimension with long range interactions of the general Calogero-Sutherland type. For some choices of the potential this system maps to standard random matrix ensembles for general values of the Dyson index $\beta$. In the fermion model $\beta$ controls the strength of the interaction, $\beta=2$ corresponding to the noninteracting case. We study the quantum fluctuations of the number of fermions ${\cal N}_{\cal D}$ in a domain $\cal{D}$ of macroscopic size in the bulk of the Fermi gas. We predict that for general $\beta$ the variance of ${\cal N}_{\cal D}$ grows as $A_{\beta} \log N + B_{\beta}$ for $N \gg 1$ and we obtain a formula for $A_\beta$ and $B_\beta$. This is based on an explicit calculation for $\beta\in\left\{ 1,2,4\right\} $ and on a conjecture that we formulate for general $\beta$. This conjecture further allows us to obtain a universal formula for the higher cumulants of ${\cal N}_{\cal D}$. Our results for the variance in the microscopic regime are found to be consistent with the predictions of the Luttinger liquid theory with parameter $K = 2/\beta$, and allow to go beyond. In addition we present families of interacting fermion models in one dimension which, in their ground states, can be mapped onto random matrix models. We obtain the mean fermion density for these models for general interaction parameter $\beta$. In some cases the fermion density exhibits interesting transitions, for example we obtain a noninteracting fermion formulation of the Gross-Witten-Wadia model.