Fermionic optimal transport
Mathematical Physics
2025-10-06 v1 math.MP
Operator Algebras
Quantum Physics
Abstract
Quadratic Wasserstein distances are obtained between dynamical systems (with states as special case), on -graded von Neumann algebras. This is achieved through a systematic translation from non-graded to -graded transport plans, on usual and fermionic (or -graded) tensor products respectively. The metric properties of these fermionic Wasserstein distances are shown, and their symmetries relevant to deviation of a system from quantum detailed balance are investigated. The latter is done in conjunction with the development of a complete mathematical framework for detailed balance in systems involving indistinguishable fermions.
Cite
@article{arxiv.2510.02888,
title = {Fermionic optimal transport},
author = {Rocco Duvenhage and Dylan van Zyl and Paola Zurlo},
journal= {arXiv preprint arXiv:2510.02888},
year = {2025}
}
Comments
55 pages