English

Regular parallelisms on PG(3,R) admitting a 2-torus action

Geometric Topology 2023-09-04 v1

Abstract

A regular parallelism of real projective 3-space PG(3,R) is an equivalence relation on the line space such that every class is equivalent to the set of 1-dimensional complex subspaces of a 2-dimensional complex vector space. We shall assume that the set of classes is compact, and characterize those regular parallelisms that admit an action of a 2-dimensional torus group. We prove that there is a one-dimensional subtorus fixing every parallel class. From this property alone we deduce that the parallelism is a 2- or 3-dimensional regular parallelism in the sense of Betten and Riesinger. If a 2-torus acts, then the parallelism can be described using a so-called generalized line star which admits a 1-torus action. We also study examples of such parallelisms by constructing generalized line stars. In particular, we prove a claim which was presented by Betten and Riesinger with an incorrect proof. The present article continues a series of papers by the first author on parallelisms with large groups.

Keywords

Cite

@article{arxiv.2101.06095,
  title  = {Regular parallelisms on PG(3,R) admitting a 2-torus action},
  author = {Rainer Löwen and Günter F. Steinke},
  journal= {arXiv preprint arXiv:2101.06095},
  year   = {2023}
}

Comments

2 figures

R2 v1 2026-06-23T22:12:06.259Z