Ground state energy of dilute Bose gases in 1D

Abstract

We study the ground state energy of a gas of 1D bosons with density , interacting through a general, repulsive 2-body potential with scattering length a, in the dilute limit |a|1. The first terms in the expansion of the thermodynamic energy density are π23/3(1+2 a), where the leading order is the 1D free Fermi gas. This result covers the Tonks-Girardeau limit of the Lieb-Liniger model as a special case, but given the possibility that a>0, it also applies to potentials that differ significantly from a delta function. We include extensions to spinless fermions and 1D anyonic symmetries, and discuss an application to confined 3D gases.