English

Group actions on topological graphs

Operator Algebras 2011-02-15 v3

Abstract

We define the action of a locally compact group GG on a topological graph EE. This action induces a natural action of GG on the CC^*-correspondence H(E){\mathcal H}(E) and on the graph CC^*-algebra C(E)C^*(E). If the action is free and proper, we prove that C(E)rGC^*(E)\rtimes_r G is strongly Morita equivalent to C(E/G)C^*(E/G). We define the skew product of a locally compact group GG by a topological graph EE via a cocycle c:E1Gc:E^1\to G. The group acts freely and properly on this new topological graph E×cGE\times_cG. If GG is abelian, there is a dual action on C(E)C^*(E) such that C(E)G^C(E×cG)C^*(E)\rtimes \hat{G}\cong C^*(E\times_cG). We also define the fundamental group and the universal covering of a topological graph.

Keywords

Cite

@article{arxiv.1007.2616,
  title  = {Group actions on topological graphs},
  author = {Valentin Deaconu and Alex Kumjian and John Quigg},
  journal= {arXiv preprint arXiv:1007.2616},
  year   = {2011}
}

Comments

We corrected a gap in the proof of Thm 5.6

R2 v1 2026-06-21T15:48:35.814Z