English

$C^*$-algebras generated by three projections

Operator Algebras 2012-11-29 v3

Abstract

In this short note, we prove that for a CC^*-algebra a˚\aa generated by nn elements, Mk(a˚~)M_{k}(\tilde{\aa}) is generated by kk mutually unitarily equivalent and almost mutually orthogonal projections for any k\de(n)=min{kN(k1)(k2)2n}k\ge \de(n)=\min\big\{k\in\mathbb N\,|\,(k-1)(k-2)\ge 2n\big\}. Then combining this result with recent works of Nagisa, Thiel and Winter on the generators of CC^*--algebras, we show that for a CC^*-algebra a˚\aa generated by finite number of elements, there is d3d\ge 3 such that Md(A~)M_d(\tilde A) is generated by three mutually unitarily equivalent and almost mutually orthogonal projections. Furthermore, for certain separable purely infinite simple unital CC^*--algebras and AFAF--algebras, we give some conditions that make them be generated by three mutually unitarily equivalent and almost mutually orthogonal projections.

Keywords

Cite

@article{arxiv.1207.6890,
  title  = {$C^*$-algebras generated by three projections},
  author = {Shanwen Hu and Yifeng Xue},
  journal= {arXiv preprint arXiv:1207.6890},
  year   = {2012}
}

Comments

10 pages

R2 v1 2026-06-21T21:43:18.941Z