Multiple flag ind-varieties with finitely many orbits

Abstract

Let G be one of the ind-groups GL(∞), O(∞), Sp(∞), and P1,…, Pl be an arbitrary set of l splitting parabolic subgroups of G. We determine all such sets with the property that G acts with finitely many orbits on the ind-variety X1×…× Xl where Xi=G/Pi. In the case of a finite-dimensional classical linear algebraic group G, the analogous problem has been solved in a sequence of papers of Littelmann, Magyar-Weyman-Zelevinsky and Matsuki. An essential difference from the finite-dimensional case is that already for l=2, the condition that G acts on X1× X2 with finitely many orbits is a rather restrictive condition on the pair P1,P2. We describe this condition explicitly. Using this result, we tackle the most interesting case where l=3, and present the answer in the form of a table. For l≥ 4, there always are infinitely many G-orbits on X1× …× Xl.