Effective field theory for dilute Fermi systems at fourth order

Abstract

We discuss high-order calculations in perturbative effective field theory for fermions at low energy scales. The Fermi-momentum or k F as expansion for the ground-state energy of the dilute Fermi gas is calculated to fourth order, both in cutoff regularization and in dimensional regularization. For the case of spin one-half fermions we find from a Bayesian analysis that the expansion is well-converged at this order for | k F as | 0.5. Further, we show that Pad\'e-Borel resummations can improve the convergence for | k F as | 1. Our results provide important constraints for nonperturbative calculations of ultracold atoms and dilute neutron matter.