Weyl group actions on the Springer sheaf
arXiv:1304.2642 · doi:10.1112/plms/pdt055
Abstract
We show that two Weyl group actions on the Springer sheaf with arbitrary coefficients, one defined by Fourier transform and one by restriction, agree up to a twist by the sign character. This generalizes a familiar result from the setting of l-adic cohomology, making it applicable to modular representation theory. We use the Weyl group actions to define a Springer correspondence in this generality, and identify the zero weight spaces of small representations in terms of this Springer correspondence.
27 pages; version 2: accepted version, with minor changes recommended by referee