The action of component groups on irreducible components of Springer fibers

Abstract

Let G be a simple Lie group. Consider a nilpotent element e∈ g. Let ZG(e) be the centralizer of e in G, and let Ae:= ZG(e)/ZG(e)o be its component group. Write Irr(Be) for the set of irreducible components of the Springer fiber Be. We have an action of Ae on Irr(Be). When g is exceptional, we give an explicit description of Irr(Be) as an Ae-set. For g of classical type, we describe the stabilizers for the Ae-action. With this description, we prove a conjecture of Lusztig and Sommers. These results suggest relations (first proposed by Lusztig) between Springer fibers and cells in Weyl groups.