Orbit Duality in Ind-Varieties of Maximal Generalized Flags

Abstract

We extend Matsuki duality to arbitrary ind-varieties of maximal generalized flags, in other words, to any homogeneous ind-variety G/B for a classical ind-group G and a splitting Borel ind-subgroup B⊂G. As a first step, we present an explicit combinatorial version of Matsuki duality in the finite-dimensional case, involving an explicit parametrization of K- and G0-orbits on G/B. After proving Matsuki duality in the infinite-dimensional case, we give necessary and sufficient conditions on a Borel ind-subgroup B⊂G for the existence of open and closed K- and G0-orbits on G/B, where (K,G0) is an aligned pair of a symmetric ind-subgroup K and a real form G0 of G.