Computations of the Comodule Structures of the Chow rings of Flag Varieties

Abstract

Let G be a connected reductive group, and G/B be its flag variety. Let π:G G/B be the natural projection. In this paper, we developed an algorithm to describe the map π* :CH*(G/B;Fp) CH*(G;Fp) in terms of Schubert cells. Taking advantage of the Pieri rule, we give an explicit formula for A-type, C-type, G2, F4 of the cohomology map π* :CH*(G/B;Fp) CH*(G;Fp), and some partial result of π* is given for E6 and E7. Denote the group action map μ:G× G/B G/B, we also give an explicit formula for A-type, C-type, G2, F4 of the cohomology map μ*: CH*(G/B;Fp) CH*(G× G/B;Fp).