Fernando Lledó
Published 2010-08-06, updated 2012-10-09Version 2
In this article we study Foelner sequences for operators and mention their relation to spectral approximation problems. We construct a canonical Foelner sequence for the crossed product of a discrete amenable group $\Gamma$ with a concrete C*-algebra A with a Foelner sequence. We also state a compatibility condition for the action of $\Gamma$ on A. We illustrate our results with two examples: the rotation algebra (which contains interesting operators like almost Mathieu operators or periodic magnetic Schr\"odinger operators on graphs) and the C*-algebra generated by bounded Jacobi operators. These examples can be interpreted in the context of crossed products. The crossed products considered can be also seen as a more general frame that included the set of generalized band-dominated operators.
Comments: 15 pages; article partly rewritten, version to appear in J. Approx. Theory; changes w.r.t. v1: new introduction, results put in the context of spcetral approximation problems, only C*-crossed products are considered (instead of von Neumann crossed products; Eq.(3.6) of v1 deleted); more examples considered
Journal: Journal of Approximation Theory 170 (2013) 155-171
On the commutant of $C(X)$ in $C^*$-crossed products by $\mathbb{Z}$ and their representations
Quasidiagonality of crossed products
Crossed product by an arbitrary endomorphism
![QR code for arXiv:1008.1151 [math.OA]](http://oss.arxitics.com/images/favicon.svg)