Operator algebras in rigid C*-tensor categories
Abstract
In this article, we define operator algebras internal to a rigid C*-tensor category . A C*/W*-algebra object in is an algebra object in - whose category of free modules is a -module C*/W*-category respectively. When , the category of finite dimensional Hilbert spaces, we recover the usual notions of operator algebras. We generalize basic representation theoretic results, such as the Gelfand-Naimark and von Neumann bicommutant theorems, along with the GNS construction. We define the notion of completely positive maps between C*-algebra objects in and prove the analog of the Stinespring dilation theorem. As an application, we discuss approximation and rigidity properties, including amenability, the Haagerup property, and property (T) for a connected W*-algebra in . Our definitions simultaneously unify the definitions of analytic properties for discrete quantum groups and rigid C*-tensor categories.
Keywords
Cite
@article{arxiv.1611.04620,
title = {Operator algebras in rigid C*-tensor categories},
author = {Corey Jones and David Penneys},
journal= {arXiv preprint arXiv:1611.04620},
year = {2017}
}
Comments
65 pages, many figures. Comments welcome! In version 2, we restrict the discussion of analytic properties to connected W*-algebra objects