Ind--varieties of generalized flags as homogeneous spaces for classical ind--groups
Abstract
The purpose of the present paper is twofold: to introduce the notion of a generalized flag in an infinite dimensional vector space V (extending the notion of a flag of subspaces in a vector space), and to give a geometric realization of homogeneous spaces of the ind--groups SL(∞), SO(∞) and Sp(∞) in terms of generalized flags. Generalized flags in V are chains of subspaces which in general cannot be enumerated by integers. Given a basis E of V, we define a notion of E--commensurability for generalized flags, and prove that the set (, E) of generalized flags E--commensurable with a fixed generalized flag in V has a natural structure of an ind--variety. In the case when V is the standard representation of G = SL(∞), all homogeneous ind--spaces G/P for parabolic subgroups P containing a fixed splitting Cartan subgroup of G, are of the form (, E). We also consider isotropic generalized flags. The corresponding ind--spaces are homogeneous spaces for SO(∞) and Sp(∞). As an application of the construction, we compute the Picard group of (, E) (and of its isotropic analogs) and show that (, E) is a projective ind--variety if and only if is a usual, possibly infinite, flag of subspaces in V$.
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