English

Block extensions, local categories, and basic Morita equivalences

Representation Theory 2019-09-09 v3

Abstract

Let (K,O,k)(\mathcal{K},\mathcal{O},k) be a pp-modular system with kk algebraically closed, let bb be a block of the normal subgroup HH of GG having defect pointed group QδQ_\delta in HH and PγP_\gamma in GG, and consider the block extension bOGb\mathcal{O}G. One may attach to bb an extended local category E(b,H,G)\mathcal{E}_{(b,H,G)}, a group extension LL of Z(Q)Z(Q) by NG(Qδ)/CH(Q)N_G(Q_\delta)/C_H(Q) having PP as a Sylow pp-subgroup, and a cohomology class [α]H2(NG(Qδ)/QCH(Q),k×)[\alpha]\in H^2(N_G(Q_\delta)/QC_H(Q),k^\times). We prove that these objects are invariant under the G/HG/H-graded basic Morita equivalences. Along the way, we give alternative proofs of the results of K\"ulshammer and Puig (1990), Puig and Zhou (2012) on extensions of nilpotent blocks. We also deduce by our methods a result of Zhou (2016) on pp'-extensions of inertial blocks.

Keywords

Cite

@article{arxiv.1809.09323,
  title  = {Block extensions, local categories, and basic Morita equivalences},
  author = {Tiberiu Coconet and Andrei Marcus and Constantin-Cosmin Todea},
  journal= {arXiv preprint arXiv:1809.09323},
  year   = {2019}
}
R2 v1 2026-06-23T04:17:24.181Z