Eigenstate thermalization and ensemble equivalence in few-body fermionic systems

TL;DR

This paper explores how few-fermion systems exhibit thermalization and ensemble equivalence, demonstrating that individual eigenstates can define thermodynamic ensembles under certain interaction conditions.

Contribution

It shows that in strongly interacting few-fermion systems, eigenstates correspond to thermal ensembles, extending the eigenstate thermalization hypothesis with ensemble equivalence.

Findings

Eigenstate temperature varies smoothly with energy.

Orbital occupancies approach Fermi-Dirac distribution at strong interactions.

Ensemble equivalence holds for sufficiently interacting few-fermion systems.

Abstract

We investigate eigenstate thermalization from the point of view of vanishing particle and heat currents between a few-body fermionic Hamiltonian prepared in one of its eigenstates and an external, weakly coupled Fermi-Dirac gas. The latter acts as a thermometric probe, with its temperature and chemical potential set so that there is neither particle nor heat current between the two subsystems. We argue that the probe temperature can be attributed to the few-fermion eigenstate in the sense that (i) it varies smoothly with energy from eigenstate to eigenstate, (ii) it is equal to the temperature obtained from a thermodynamic relation in a wide energy range, (iii) it is independent of details of the coupling between the two systems in a finite parameter range, (iv) it satisfies the transitivity condition underlying the zeroth law of thermodynamics and (v) it is consistent with Carnot's theorem. These conditions are essentially independent of the interaction between the few fermions. When the interaction strength is weak, however, orbital occupancies in the few fermion system differ from the Fermi-Dirac distribution so that partial currents from or to the probe will eventually change its state. We find that (vi) above a certain critical interaction strength, orbital occupancies become close to the Fermi-Dirac distribution, leading to a true equilibrium between the few-fermion system and the probe. We conclude that for few-body systems with sufficiently strong interaction, the eigenstate thermalization hypothesis of Deutsch and Srednicki is complemented by ensemble equivalence: individual many-body eigenstates define a microcanonical ensemble that is equivalent to a canonical ensemble.