English

Free groups and quasidiagonality

Operator Algebras 2016-07-11 v1

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 Ω\Omega, denoted by qd(Ω)(\Omega). Along the way we deduce information about the operator space structure of finite dimensional subspaces of C[Fd]Cp(Fd)\mathbb{C}[\mathbb{F}_d]\subseteq C^*_{\ell^p}(\mathbb{F}_d) where Cp(Fd)C^*_{\ell^p}(\mathbb{F}_d) is the so-called p\ell^p-completion of C[Fd].\mathbb{C}[\mathbb{F}_d]. Roughly speaking, we use free groups and qd(Ω)(\Omega) 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({λa,λb})[1/2,3/2](\{\lambda_a,\lambda_b\})\in [1/2,\sqrt{3}/2] where aa and bb are free group generators and λ\lambda is the left regular representation. In another direction, we use certain p\ell^p representations of free groups constructed by Pytlik and Szwarc and a recent result of Ruan and Wiersma to show that qd(Ω)(\Omega) may be positive, yet arbitrarily close to zero when Ω\Omega 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

R2 v1 2026-06-22T14:48:41.721Z