On The Mackey Formula for Connected Centre Groups

Abstract

Let G be a connected reductive algebraic group over Fp and let F : G G be a Frobenius endomorphism endowing G with an Fq-rational structure. Bonnaf\'e--Michel have shown that the Mackey formula for Deligne--Lusztig induction and restriction holds for the pair (G,F) except in the case where q = 2 and G has a quasi-simple component of type E6, E7, or E8. Using their techniques we show that if q = 2 and Z(G) is connected then the Mackey formula holds unless G has a quasi-simple component of type E8. This establishes the Mackey formula, for instance, in the case where (G,F) is of type E7(2). Using this, together with work of Bonnaf\'e--Michel, we can conclude that the Mackey formula holds on the space of unipotently supported class functions if Z(G) is connected.