On some invariants of orbits in the flag variety under a symmetric subgroup

Abstract

Let G be a connected reductive algebraic group over an algebraically closed field k of characteristic not equal to 2, let be the variety of all Borel subgroups of G, and let K be a symmetric subgroup of G. Fixing a closed K-orbit in , we associate to every K-orbit on some subsets of the Weyl group of G, and we study them as invariants of the K-orbits. When k = C, these invariants are used to determine when an orbit of a real form of G and an orbit of a Borel subgroup of G have non-empty intersection in . We also characterize the invariants in terms of admissible paths in the set of K-orbits in .