English

Spaces of commuting elements in the classical groups

Algebraic Topology 2020-07-21 v2

Abstract

Let GG be the classical group, and let Hom(Zm,G)(\mathbb{Z}^m,G) denote the space of commuting mm-tuples in GG. First, we refine the formula for the Poincar\'e series of Hom(Zm,G)(\mathbb{Z}^m,G) due to Ramras and Stafa by assigning (signed) integer partitions to (signed) permutations. Using the refined formula, we determine the top term of the Poincar\'e series, and apply it to prove the dependence of the topology of Hom(Zm,G)(\mathbb{Z}^m,G) on the parity of mm and the rational hyperbolicity of Hom(Zm,G)(\mathbb{Z}^m,G) for m2m\ge 2. Next, we give a minimal generating set of the cohomology of Hom(Zm,G)(\mathbb{Z}^m,G) and determine the cohomology in low dimensions. We apply these results to prove homological stability for Hom(Zm,G)(\mathbb{Z}^m,G) with the best possible stable range. Baird proved that the cohomology of Hom(Zm,G)(\mathbb{Z}^m,G) is identified with a certain ring of invariants of the Weyl group of GG, and our approach is a direct calculation of this ring of invariants.

Keywords

Cite

@article{arxiv.2006.15761,
  title  = {Spaces of commuting elements in the classical groups},
  author = {Daisuke Kishimoto and Masahiro Takeda},
  journal= {arXiv preprint arXiv:2006.15761},
  year   = {2020}
}
R2 v1 2026-06-23T16:41:12.124Z