Proof of off-diagonal long-range order in a mean-field trapped Bose gas via the Feynman--Kac formula

Abstract

We consider the non-interacting Bose gas of N bosons in dimension d≥ 3 in a trap in a mean-field setting with a vanishing factor aN in front of the kinetic energy. The choice aN=N-2/d is the semi-classical setting and was analysed in great detail in a special, interacting case in Deuchert and Seiringer (2021). Using a version of the well-known Feynman--Kac representation and a further representation in terms of a Poisson point process, we derive precise asymptotics for the reduced one-particle density matrix, implying off-diagonal long-range order (ODLRO, a well-known criterion for Bose--Einstein condensation) for aN above a certain threshold and non-occurrence of ODLRO for aN below that threshold. In particular, we relate the condensate and its total mass to the amount of particles in long loops in the Feynman--Kac formula, the order parameter that Feynman suggested in Feynman (1953). For aN N-2/d, we prove that all loops have the minimal length one, and for aN N-2/d we prove 100 percent condensation and identify the distribution of the long-loop lengths as the Poisson--Dirichlet distribution.