Torus actions, localization and induced representations on cohomology

Abstract

This note is motivated by the problem of understanding Springer's remarkable action of the Weyl group W=NG(T)/T of a semi-simple complex linear algebraic group G, with maximal torus T, on the cohomology algebra of an arbitrary Springer variety in the flag variety of G from the viewpoint of torus actions. Continuing the work [CK] which gave a sufficient condition for a group W acting on the fixed point set of an algebraic torus action (S,X) on a complex projective variety X to lift to a representation of W on the cohomology algebra H*(X) (over C), we describe when the representation on H*(X) is equivalent to the representation of W on the cohomology H*(XS) of the fixed point set. As a consequence of this theorem, we give a simple proof in type A of the Alvis-Lusztig-Treumann Theorem, which describes Springer's representation of W for Springer varieties corresponding to nilpotents in a Levi subalgebra of Lie(G). In the final two sections, we describe the local structure of the moment graph M(X) of a special torus action (S,X), and we also show that if a finite group W acts on the moment graph of X, then W induces pair of actions on H*(X), namely the left and right or dot and star actions of Knutson [Knu] and Tymoczko [Tym] respectively. In particular, W acts on the moment (or Bruhat) graph M(G/P) of (T,G/P) for any parabolic P in G containing T, and the right action of W on H*(G/P) is an induced representation. Furthermore, we show the left action of W on H*(G/P) is trivial.