Virial coefficients of trapped and un-trapped three-component fermions with three-body forces in arbitrary spatial dimensions

Abstract

Using a coarse temporal lattice approximation, we calculate the first few terms of the virial expansion of a three-species fermion system with a three-body contact interaction in d spatial dimensions, both in homogeneous space as well as in a harmonic trapping potential of frequency ω. Using the three-body problem to renormalize, we report analytic results for the change in the fourth- and fifth-order virial coefficients b4 and b5 as functions of b3. Additionally, we argue that in the ω 0 limit the relationship bnT = n-d/2 bn holds between the trapped (T) and homogeneous coefficients for arbitrary temperature and coupling strength (not merely in scale-invariant regimes). Finally, we point out an exact, universal (coupling- and frequency-independent) relationship between b3T in 1D with three-body forces and b2T in 2D with two-body forces.