English

Two generalisations of Leighton's Theorem

Group Theory 2022-08-25 v3

Abstract

Leighton's graph covering theorem says that two finite graphs with a common cover have a common finite cover. We present a new proof of this using groupoids, and use this as a model to prove two generalisations of the theorem. The first generalisation, which we refer to as the symmetry-restricted version, restricts how balls of a given size in the universal cover can map down to the two finite graphs when factoring through the common finite cover - this answers a question of Neumann. Secondly, we consider covers of graphs of spaces (or of more general objects), which leads to an even more general version of Leighton's Theorem. We also compute upper bounds for the sizes of the finite covers obtained in Leighton's Theorem and its generalisations. An appendix by Gardam and Woodhouse provides an alternative proof of the symmetry-restricted version, that uses Haar measure instead of groupoids.

Keywords

Cite

@article{arxiv.1908.00830,
  title  = {Two generalisations of Leighton's Theorem},
  author = {Sam Shepherd and Giles Gardam and Daniel J. Woodhouse},
  journal= {arXiv preprint arXiv:1908.00830},
  year   = {2022}
}

Comments

Main article by Shepherd, appendix by Gardam and Woodhouse. 35 pages, 5 figures. v2: Addition of a symmetry-restricted version of the Graph of Objects Leighton's Theorem (Theorem 4.11) from which we can deduce the usual symmetry-restricted theorem, plus various changes to the exposition. v3: Minor changes following referee's comments. To appear in Groups, Geometry, and Dynamics

R2 v1 2026-06-23T10:38:11.663Z