Algebraic zip data

Abstract

An algebraic zip datum is a tuple := (G,P,Q,φ) consisting of a reductive group G together with parabolic subgroups P and Q and an isogeny φ P/RuP Q/RuQ. We study the action of the group E := \(p,q)∈ P×Q | φ(πP(p)) =πQ(q)\ on G given by ((p,q),g) pgq-1. We define certain smooth E-invariant subvarieties of G, show that they define a stratification of G. We determine their dimensions and their closures and give a description of the stabilizers of the E-action on G. We also generalize all results to non-connected groups. We show that for special choices of the algebraic quotient stack [E G] is isomorphic to [G Z] or to [G Z'], where Z is a G-variety studied by Lusztig and He in the theory of character sheaves on spherical compactifications of G and where Z' has been defined by Moonen and the second author in their classification of F-zips. In these cases the E-invariant subvarieties correspond to the so-called "G-stable pieces" of Z defined by Lusztig (resp. the G-orbits of Z').