A stochastic approach to time-dependent BEC
Abstract
We propose a stochastic description of the dynamics of a Bose-Einstein condensate within the context of Nelson stochastic mechanics. We start from the interacting conservative diffusions, associated with the Bose particles, and take an infinite particle limit. We address several aspects of this formulation. First, we consider the problem of extending to a system with self-interaction the variational formulation of Nelson stochastic mechanics due to Guerra and Morato. In this regard we discuss two possible extensions, one based on a doubling procedure and another based on a constraint Eulerian type variational principle. Then we consider the infinite particle limit from the point of view of the -particles Madelung equations. Since conservative diffusions can be identified with proper infinitesimal characteristics pairs , a time marginal probability density and a current velocity field, respectively, we consider a finite Madelung hierarchy for the marginals pairs , obtained by properly conditioning the processes. The infinite Madelung hierarchy arises from the finite one by performing, for each fixed , a mean-field scaling limit in . Finally, we introduce a -particle conditioned diffusions which naturally parallels the quantum mechanical approach and is a new approach within the context of Nelson stochastic mechanics. We then prove the convergence, in the infinite particle limit, of the law of such a conditioned process to the law of a self-interacting diffusion which describes the condensate.
Cite
@article{arxiv.2506.20012,
title = {A stochastic approach to time-dependent BEC},
author = {Luigi Borasi and Francesco C. De Vecchi and Stefania Ugolini},
journal= {arXiv preprint arXiv:2506.20012},
year = {2025}
}