Crossed product Leavitt path algebras
Abstract
If is a directed graph and is a field, the Leavitt path algebra of over is naturally graded by the group of integers We formulate properties of the graph which are equivalent with being a crossed product, a skew group ring, or a group ring with respect to this natural grading. We state this main result so that the algebra properties of are also characterized in terms of the pre-ordered group properties of the Grothendieck -group of . If has finitely many vertices, we characterize when is strongly graded in terms of the properties of Our proof also provides an alternative to the known proof of the equivalence is strongly graded if and only if has no sinks for a finite graph We also show that, if unital, the algebra is strongly graded and graded unit-regular if and only if is a crossed product. In the process of showing the main result, we obtain conditions on a group and a -graded division ring equivalent with the requirements that a -graded matrix ring over is strongly graded, a crossed product, a skew group ring, or a group ring. We characterize these properties also in terms of the action of the group on the Grothendieck -group
Cite
@article{arxiv.2002.11230,
title = {Crossed product Leavitt path algebras},
author = {Roozbeh Hazrat and Lia Vas},
journal= {arXiv preprint arXiv:2002.11230},
year = {2022}
}