Motivic homotopy theory of the classifying stack of finite groups of Lie type

Abstract

Let G be a reductive group over Fp with associated finite group of Lie type GF. Let T be a maximal torus contained inside a Borel B of G. We relate the (rational) Tate motives of BGF with the T-equivariant Tate motives of the flag variety G/B. On the way, we show that for a reductive group G over a field k, with maximal Torus T and absolute Weyl group W, acting on a smooth finite type k-scheme X, we have an isomorphism AnG(X,m)Q AnT(X,m)QW extending the classical result of Edidin-Graham to higher equivariant Chow groups in the non-split case. We also extend our main result to reductive group schemes over a regular base that admit maximal tori. Further, we apply our methods to more general quotient stacks. In this way, we are able to compute the motive of the stack of G-zips introduced by Pink-Wedhorn-Ziegler for reductive groups over fields of positive characteristic.