Schubert calculus and the Hopf algebra structures of exceptional Lie groups

Abstract

Let G be an exceptional Lie group with a maximal torus T. Based on common properties in the Schubert presentation of the cohomology ring H*(G/T;Fp) DZ1, and concrete expressions of generalized Weyl invariants for G over Fp, we obtain a unified approach to the structure of H*(G;Fp) as a Hopf algebra over the Steenrod algebra Ap. The results has been applied in Du2 to determine the near--Hopf ring structure on the integral cohomology of all exceptional Lie groups.