The relative Hochschild-Serre spectral sequence and the Belkale-Kumar product

Abstract

We consider the Belkale-Kumar cup product t on H*(G/P) for a generalized flag variety G/P with parameter t ∈ m, where m=(H2(G/P)). For each t∈ m, we define an associated parabolic subgroup PK ⊃ P. We show that the ring (H*(G/P), t) contains a graded subalgebra A isomorphic to H*(PK/P) with the usual cup product, where PK is a parabolic subgroup associated to the parameter t. Further, we prove that (H*(G/PK), 0) is the quotient of the ring (H*(G/P), t) with respect to the ideal generated by elements of positive degree of A. We prove the above results by using basic facts about the Hochschild-Serre spectral sequence for relative Lie algebra cohomology, and most of the paper consists of proving these facts using the original approach of Hochschild and Serre.