Functional renormalization and ultracold quantum gases

TL;DR

This paper applies functional renormalization to ultracold quantum gases, deriving flow equations to analyze their properties across different regimes, including phase diagrams, superfluidity, and three-body phenomena.

Contribution

It introduces a new exact flow equation for scale-dependent composite operators, enhancing the analysis of bound states in ultracold gases.

Findings

Determines phase diagrams and superfluid properties of Bose gases.

Explores the BCS-BEC crossover in Fermi gases, including particle-hole effects.

Identifies a new trion phase and Efimov states in three-component fermions.

Abstract

The method of functional renormalization is applied to the theoretical investigation of ultracold quantum gases. Flow equations are derived for a Bose gas with approximately pointlike interaction, for a Fermi gas with two (hyperfine) spin components in the Bardeen-Cooper-Schrieffer (BCS) to Bose-Einstein condensation (BEC) crossover and for a Fermi gas with three components. The solution of the flow equations determine the properties of these systems both in the few-body regime and in thermal equilibrium. For the Bose gas this covers the quantum phase diagram, the condensate and superfluid fraction, the critical temperature, the correlation length, the specific heat or sound propagation. The properties are discussed both for three and two spatial dimensions. The discussion of the Fermi gas in the BCS-BEC crossover concentrates on the effect of particle-hole fluctuations but addresses the complete phase diagram. For the three component fermions, the flow equations in the few-body regime show a limit-cycle scaling and the Efimov tower of three-body bound states. Applied to the case of Lithium they explain recently observed three-body loss features. Extending the calculations by continuity to nonzero density, it is found that a new trion phase separates a BCS and a BEC phase for three component fermions close to a common resonance. More formal is the derivation of a new exact flow equation for scale dependent composite operators. This equation allows for example a better treatment of bound states.