Rough ends of infinite primitive groups
Abstract
If is a group of permutations of a set , then the suborbits of are the orbits of point-stabilisers acting on . The cardinalities of these suborbits are the subdegrees of . Every infinite primitive permutation group with finite subdegrees acts faithfully as a group of automorphisms of a locally-finite connected vertex-primitive directed graph with vertex set , and there is consequently a natural action of on the ends of . We show that if is closed in the permutation topology of pointwise convergence, then the structure of is determined by the length of any orbit of acting on the ends of . 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 are the rough ends of , and so our result is equivalent to saying that the structure of a closed primitive group whose subdegrees are all finite is determined by the length of any orbit of on its rough ends.
Cite
@article{arxiv.1012.0537,
title = {Rough ends of infinite primitive groups},
author = {Simon M Smith},
journal= {arXiv preprint arXiv:1012.0537},
year = {2013}
}