Partition C*-algebras
Abstract
We give a definition of partition C*-algebras: To any partition of a finite set, we assign algebraic relations for a matrix of generators of a universal C*-algebra. We then prove how certain relations may be deduced from others and we explain a partition calculus for simplifying such computations. This article is a small note for C*-algebraists having no background in compact quantum groups, although our partition C*-algebras are motivated from those underlying Banica-Speicher quantum groups (also called easy quantum groups). We list many open questions about partition C*-algebras that may be tackled by purely C*-algebraic means, ranging from ideal structures and representations on Hilbert spaces to K-theory and isomorphism questions. In a follow up article, we deal with the quantum algebraic structure associated to partition C*-algebras.
Keywords
Cite
@article{arxiv.1710.06199,
title = {Partition C*-algebras},
author = {Moritz Weber},
journal= {arXiv preprint arXiv:1710.06199},
year = {2017}
}
Comments
19 pages + 11 pages of appendix and references