English

Linear characters and block algebra

Representation Theory 2011-03-02 v1

Abstract

This paper will prove that: 1. GG has a block only having linear ordinary characters if and only if GG is a pp-nilpotent group with an abelian Sylow pp-subgroup; 2. GG has a block only having linear Brauer characters if and only if Op(G)Opp(G)=HOp(G)=Ker(B0)Oppp=GO_{p'}(G)\leq O_{p'p}(G)=HO_{p'}(G)= \textrm{Ker}(B_{0}^{*}) \leq O_{p'pp'}=G, where H=GOp(G),Ker(B0)=λIBr(B0)Ker(Vλ),B0H=G^{'}O^{p'}(G), \textrm{Ker}(B_{0}^{*})=\bigcap_{\lambda \in \textrm{IBr}(B_{0})} \textrm{Ker}(V_{\lambda}), B_{0} is the principal block of GG and VλV_{\lambda} is the F[G]F[G]-module affording the Brauer character λ\lambda; 3. if GG satisfies the conditions above, then for any block algebra BB of GG, we have DimF(B)D=ϕIBr(B)ϕ(1)2 \frac{\textrm{Dim}_{F}(B)}{|D|}= \sum_{\phi \in \textrm{IBr}(B)}\phi(1)^{2} where DD is the defect group of BB.

Keywords

Cite

@article{arxiv.1103.0068,
  title  = {Linear characters and block algebra},
  author = {Jiwen Zeng},
  journal= {arXiv preprint arXiv:1103.0068},
  year   = {2011}
}

Comments

We clear describe finite groups if it has a block algebra having only linear irreducible ordinary characters or irreducible Brauer characters

R2 v1 2026-06-21T17:33:19.324Z