Bases of T-equivariant cohomology of Bott-Samelson varieties

Abstract

We construct combinatorial bases of the T-equivariant (T is the maximal torus) cohomology HT(,k) of the Bott-Samelson variety under some mild restrictions on the field of coefficients k. This bases allow us to prove the surjectivity of the restrictions HT(,k) HT(π-1(x),k) and HT(,k) HT(π-1(x),k), where π: G/B is the canonical resolution. In fact, we also construct bases of the targets of these restrictions by picking up certain subsets of certain bases of HT(,k) and restricting them to π-1(x) or π-1(x) respectively. As an application, we calculate the cohomology of the costalk-to-stalk embedding for the direct image π* k. This algorithm avoids division by 2, which allows us to reestablish 2-torsion for parity sheaves in Braden's example.