Free groups and quasidiagonality
Abstract
We use free groups to settle a couple questions about the values of the Pimsner-Popa-Voiculescu modulus of quasidiagonality for a set of operators , denoted by qd. Along the way we deduce information about the operator space structure of finite dimensional subspaces of where is the so-called -completion of Roughly speaking, we use free groups and qd to put a quantitative face on the two known qualitative obstructions to quasidiagonality; absence of an amenable trace or the presence of a proper isometry. The modulus of quasidiagonality for a proper isometry is equal to 1. We show that qd where and are free group generators and is the left regular representation. In another direction, we use certain representations of free groups constructed by Pytlik and Szwarc and a recent result of Ruan and Wiersma to show that qd may be positive, yet arbitrarily close to zero when is a set of unitaries.
Keywords
Cite
@article{arxiv.1607.02170,
title = {Free groups and quasidiagonality},
author = {Caleb Eckhardt},
journal= {arXiv preprint arXiv:1607.02170},
year = {2016}
}
Comments
23 pages