English

Crossed product Leavitt path algebras

Rings and Algebras 2022-05-24 v2

Abstract

If EE is a directed graph and KK is a field, the Leavitt path algebra LK(E)L_K(E) of EE over KK is naturally graded by the group of integers Z.\mathbb Z. We formulate properties of the graph EE which are equivalent with LK(E)L_K(E) 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 LK(E)L_K(E) are also characterized in terms of the pre-ordered group properties of the Grothendieck Z\mathbb Z-group of LK(E)L_K(E). If EE has finitely many vertices, we characterize when LK(E)L_K(E) is strongly graded in terms of the properties of K0Γ(LK(E)).K_0^\Gamma(L_K(E)). Our proof also provides an alternative to the known proof of the equivalence LK(E)L_K(E) is strongly graded if and only if EE has no sinks for a finite graph E.E. We also show that, if unital, the algebra LK(E)L_K(E) is strongly graded and graded unit-regular if and only if LK(E)L_K(E) is a crossed product. In the process of showing the main result, we obtain conditions on a group Γ\Gamma and a Γ\Gamma-graded division ring KK equivalent with the requirements that a Γ\Gamma-graded matrix ring RR over KK 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 Γ\Gamma on the Grothendieck Γ\Gamma-group K0Γ(R).K_0^\Gamma(R).

Keywords

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}
}
R2 v1 2026-06-23T13:53:57.423Z