Linear characters and block algebra

Abstract

This paper will prove that: 1. G has a block only having linear ordinary characters if and only if G is a p-nilpotent group with an abelian Sylow p-subgroup; 2. G has a block only having linear Brauer characters if and only if Op'(G)≤ Op'p(G)=HOp'(G)= Ker(B0*) ≤ Op'pp'=G, where H=G'Op'(G), Ker(B0*)=λ ∈ IBr(B0) Ker(Vλ), B0 is the principal block of G and Vλ is the F[G]-module affording the Brauer character λ; 3. if G satisfies the conditions above, then for any block algebra B of G, we have DimF(B)|D|= Σφ ∈ IBr(B)φ(1)2 where D is the defect group of B.