Rohklin dimension for C*-correspondences
Operator Algebras
2016-08-12 v1
Abstract
We extend the notion of Rokhlin dimension from topological dynamical systems to -correspondences. We show that in the presence of finite Rokhlin dimension and a mild quasidiagonal-like condition (which, for example, is automatic for finitely generated projective correspondences), finite nuclear dimension passes from the scalar algebra to the associated Toeplitz--Pimsner and (hence) Cuntz--Pimsner algebras. As a consequence we provide new examples of classifiable -algebras: if is simple, unital, has finite nuclear dimension and satisfies the UCT, then for every finitely generated projective with finite Rokhlin dimension, the associated Cuntz--Pimsner algebra is classifiable in the sense of Elliott's Program.
Keywords
Cite
@article{arxiv.1608.03214,
title = {Rohklin dimension for C*-correspondences},
author = {N. P. Brown and A. Tikuisis and A. M. Zelenberg},
journal= {arXiv preprint arXiv:1608.03214},
year = {2016}
}