English

Character theory and Euler characteristic for orbispaces and infinite groups

Algebraic Topology 2024-10-21 v1 Group Theory K-Theory and Homology

Abstract

Given a discrete group GG with a finite model for EG\underline{E}G, we study K(n)(BG)K(n)^*(BG) and E(BG)E^*(BG), where K(n)K(n) is the nn-th Morava KK-theory for a given prime and EE is the height nn Morava EE-theory. In particular we generalize the character theory of Hopkins, Kuhn and Ravenel who studied these objects for finite groups. We give a formula for a localization of E(BG)E^*(BG) and the K(n)K(n)-theoretic Euler characteristic of BGBG in terms of centralizers. In certain cases these calculations lead to a full computation of E(BG)E^*(BG), for example when GG is a right angled Coxeter group, and for G=SL3(Z)G=SL_3(\mathbb{Z}). We apply our results to the mapping class group Γp12\Gamma_\frac{p-1}{2} for an odd prime pp and to certain arithmetic groups, including the symplectic group Spp1(Z)Sp_{p-1}(\mathbb{Z}) for an odd prime pp and SL2(OK)SL_2(\mathcal{O}_K) for a totally real field KK.

Keywords

Cite

@article{arxiv.2410.14510,
  title  = {Character theory and Euler characteristic for orbispaces and infinite groups},
  author = {Wolfgang Lück and Irakli Patchkoria and Stefan Schwede},
  journal= {arXiv preprint arXiv:2410.14510},
  year   = {2024}
}

Comments

50 pages

R2 v1 2026-06-28T19:27:23.071Z