Study of parity sheaves arising from graded Lie algebra

Abstract

Let G be a complex, connected, reductive, algebraic group, and :C× G be a fixed cocharacter that defines a grading on g, the Lie algebra of G. Let G0 be the centralizer of (C×). In this paper, we study G0-equivariant parity sheaves on gn, under some assumptions on the field and the group G. The assumption on G holds for GLn and for any G, it recovers results of Lusztig in characteristic 0. The main result is that every parity sheaf occurs as a direct summand of the parabolic induction of some cuspidal pair.