Rigid structures in the universal enveloping traffic space
Abstract
For any tracial non-commutative probability space , C\'{e}bron, Dahlqvist, and Male showed that one can always construct an enveloping traffic space that extends the trace. This construction provides a universal object that allows one to appeal to the traffic probability framework in generic situations, prioritizing an understanding of its structure. In this article, we prove that admits a canonical free product decomposition . In particular, is an anti-isomorphic copy of , and is, up to degeneracy, a commutative algebra generated by Gaussian random variables with a covariance structure diagonalized by the graph operations. If itself is a free product, then we describe how this additional structure lifts into . Here, we find a connection between free independence and classical independence opposite the usual direction. Up to degeneracy, we further show that is spanned by tree-like graph operations. Finally, we apply our results to the study of large (possibly dependent) random matrices. Our analysis relies on the combinatorics of cactus graphs and the resulting cactus-cumulant correspondence.
Keywords
Cite
@article{arxiv.2011.05472,
title = {Rigid structures in the universal enveloping traffic space},
author = {Benson Au and Camille Male},
journal= {arXiv preprint arXiv:2011.05472},
year = {2020}
}
Comments
54 pages, 16 figures