Sylvester rank functions for amenable normal extensions
Abstract
We introduce a notion of amenable normal extension S of a unital ring R with a finite approximation system F, encompassing the amenable algebras over a field of Gromov and Elek, the twisted crossed product by an amenable group, and the tensor product with a field extension. It is shown that every Sylvester matrix rank function rk of R preserved by S has a canonical extension to a Sylvester matrix rank function rk_F for S. In the case of twisted crossed product by an amenable group, and the tensor product with a field extension, it is also shown that rk_F depends on rk continuously. When an amenable group has a twisted action on a unital C*-algebra preserving a tracial state, we also show that two natural Sylvester matrix rank functions on the algebraic twisted crossed product constructed out of the tracial state coincide.
Keywords
Cite
@article{arxiv.2002.12522,
title = {Sylvester rank functions for amenable normal extensions},
author = {Baojie Jiang and Hanfeng Li},
journal= {arXiv preprint arXiv:2002.12522},
year = {2021}
}
Comments
Proposition 9.6 is added. 45 pages. To appear in J. Funct. Anal