English

Dade Groups for Finite Groups and Dimension Functions

Representation Theory 2020-08-04 v2 Algebraic Topology

Abstract

Let GG be a finite group and kk an algebraically closed field of characteristic p>0p>0. We define the notion of a Dade kGkG-module as a generalization of endo-permutation modules for pp-groups. We show that under a suitable equivalence relation, the set of equivalence classes of Dade kGkG-modules forms a group under tensor product, and the group obtained this way is isomorphic to the Dade group D(G)D(G) defined by Lassueur. We also consider the subgroup DΩ(G)D^{\Omega} (G) of D(G)D(G) generated by relative syzygies ΩX\Omega_X, where XX is a finite GG-set. If C(G,p)C(G,p) denotes the group of superclass functions defined on the pp-subgroups of GG, there are natural generators ωX\omega_X of C(G,p)C(G,p), and we prove the existence of a well-defined group homomorphism ΨG:C(G,p)DΩ(G)\Psi_G:C(G,p)\to D^\Omega(G) that sends ωX\omega_X to ΩX\Omega_X. The main theorem of the paper is the verification that the subgroup of C(G,p)C(G,p) consisting of the dimension functions of kk-orientable real representations of GG lies in the kernel of ΨG\Psi_G.

Keywords

Cite

@article{arxiv.2007.05322,
  title  = {Dade Groups for Finite Groups and Dimension Functions},
  author = {Matthew Gelvin and Ergun Yalcin},
  journal= {arXiv preprint arXiv:2007.05322},
  year   = {2020}
}

Comments

Minor revision, 40 pages

R2 v1 2026-06-23T17:00:58.365Z