Semi-infinite orbits in affine flag varieties and homology of affine Springer fibers

Abstract

Let G be a connected reductive group over an algebraically closed field k, and let Fl be the affine flag variety of G. For every regular semisimple element γ of G(k((t))), the affine Springer fiber Flγ can be presented as a union of closed subvarieties Fl≤ wγ, defined as the intersection of Flγ with an affine Schubert variety Fl≤ w. The main result of this paper asserts that if elements w1,…,wn are sufficiently regular, then the natural map Hi(j=1n Fl≤ wjγ) Hi(Flγ) is injective for every i∈ Z. It plays an important role in our work [BV]. One can view this statement as providing a categorification of the notion of a weighted orbital integral. Along the way we also show that every affine Schubert variety can be written as an intersection of closures of semi-infinite orbits.