Rationality of blocks of quasi-simple finite groups

Abstract

Let be a prime number. We show that the Morita Frobenius number of an -block of a quasi-simple finite group is at most 4 and that the strong Frobenius number is at most 4|D|2!, where D denotes a defect group of the block. We deduce that a basic algebra of any block of the group algebra of a quasi-simple finite group over an algebraically closed field of characteristic is defined over a field with a elements for some a ≤ 4. We derive consequences for Donovan's conjecture. In particular, we show that Donovan's conjecture holds for -blocks of special linear groups.