On the Inductive Alperin-McKay Conditions in the Maximally Split Case

Abstract

The Alperin-McKay conjecture relates height zero characters of an -block with the ones of its Brauer correspondent. This conjecture has been reduced to the so-called inductive Alperin-McKay conditions about quasi-simple groups by the third author. Those conditions are still open for groups of Lie type. The present paper describes characters of height zero in -blocks of groups of Lie type over a field with q elements when divides q-1. We also give information about -blocks and Brauer correspondents. As an application we show that quasi-simple groups of type C over Fq satisfy the inductive Alperin-McKay conditions for primes ≥ 5 and dividing q-1. Some methods to that end are adapted from the work of Malle--Sp\"ath.