Wasserstein distance between noncommutative dynamical systems
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Date
Authors
Duvenhage, Rocco de Villiers
Journal Title
Journal ISSN
Volume Title
Publisher
Elsevier
Abstract
We introduce and study a class of quadratic Wasserstein distances on spaces consisting of generalized dynamical systems on a von Neumann algebra. We emphasize how symmetry of such a Wasserstein distance arises, but also study the asymmetric case. This setup is illustrated in the context of reduced dynamics, and a number of simple examples are also presented.
Description
Keywords
Optimal transport, Wasserstein distance von, Wasserstein distance, Von Neumann algebras, States, Dynamical systems, Open systems
Sustainable Development Goals
None
Citation
Duvenhage, R. 2023, 'Wasserstein distance between noncommutative dynamical systems', Journal of Mathematical Analysis and Applications, vol. 527, art. 127353, pp. 1-26. https://DOI.org/10.1016/j.jmaa.2023.127353.