Kostant--Kumar polynomials and tangent cones to Schubert varieties for involutions in An, F4 and G2

Abstract

Let G be a reductive complex algebraic group, T a maximal torus of G, B a Borel subgroup of G containing T, the root system of G w.r.t. T, W the Weyl group of . Denote by = G/B the flag variety, by Xw the Schubert subvariety of associated with an element w∈ W, and by Cw the tangent cone to Xw at the point p = eB. Then Cw is a subscheme of the tangent space TpXw⊂eq Tp. Suppose w, w' are distinct involutions in W. Using the so-called Kostant--Kumar polynomials, we show that if every irreducible component of is of type An, F4 or G2, then Cw and Cw' do not coincide.