English

Rough ends of infinite primitive groups

Group Theory 2013-02-19 v1 Combinatorics

Abstract

If GG is a group of permutations of a set Ω\Omega, then the suborbits of GG are the orbits of point-stabilisers GαG_\alpha acting on Ω\Omega. The cardinalities of these suborbits are the subdegrees of GG. Every infinite primitive permutation group GG with finite subdegrees acts faithfully as a group of automorphisms of a locally-finite connected vertex-primitive directed graph Γ\Gamma with vertex set Ω\Omega, and there is consequently a natural action of GG on the ends of Γ\Gamma. We show that if GG is closed in the permutation topology of pointwise convergence, then the structure of GG is determined by the length of any orbit of GG acting on the ends of Γ\Gamma. Examining the ends of a Cayley graph of a finitely generated group to determine the structure of the group is often fruitful. B. Kr{\"o}n and R. G. M{\"o}ller have recently generalised the Cayley graph to what they call a {\it rough Cayley graph}, and they call the ends of this graph the {\it rough ends} of the group. It transpires that the ends of Γ\Gamma are the rough ends of GG, and so our result is equivalent to saying that the structure of a closed primitive group GG whose subdegrees are all finite is determined by the length of any orbit of GG on its rough ends.

Keywords

Cite

@article{arxiv.1012.0537,
  title  = {Rough ends of infinite primitive groups},
  author = {Simon M Smith},
  journal= {arXiv preprint arXiv:1012.0537},
  year   = {2013}
}
R2 v1 2026-06-21T16:52:39.289Z