Tracially sequentially-split ${}^*$-homomorphisms between $C^*$-algebras
Abstract
We define a tracial analogue of the sequentially split -homomorphism between -algebras of Barlak and Szab\'{o} and show that several important approximation properties related to the classification theory of -algebras pass from the target algebra to the domain algebra. Then we show that the tracial Rokhlin property of the finite group action on a -algebra gives rise to a tracial version of sequentially split -homomorphism from to and the tracial Rokhlin property of an inclusion -algebras with a conditional expectation of a finite Watatani index generates a tracial version of sequentially split map. By doing so, we provide a unified approach to permanence properties related to tracial Rokhlin property of operator algebras.
Keywords
Cite
@article{arxiv.1707.07377,
title = {Tracially sequentially-split ${}^*$-homomorphisms between $C^*$-algebras},
author = {Hyun Ho Lee and Hiroyuki Osaka},
journal= {arXiv preprint arXiv:1707.07377},
year = {2020}
}
Comments
A serious flaw in Definition 2.6 has been notified to the authors. We fix our definition and accordingly change statements in subsequent propositions and theorems. Moreover, a gap in the proof of Theorem 2.25 is fixed. We note our appreciation for such helpful comments in Acknowledgements section. Some typos are also caught. We hope that it is final