Schubert decompositions for ind-varieties of generalized flags

Abstract

Let G be one of the ind-groups GL(∞), O(∞), Sp(∞) and P⊂ G be a splitting parabolic ind-subgroup. The ind-variety G/P has been identified with an ind-variety of generalized flags in the paper "Ind-varieties of generalized flags as homogeneous spaces for classical ind-groups" (Int. Math. Res. Not. 2004, no. 55, 2935--2953) by I. Dimitrov and I. Penkov. In the present paper we define a Schubert cell on G/P as a B-orbit on G/P, where B is any Borel ind-subgroup of G which intersects P in a maximal ind-torus. A significant difference with the finite-dimensional case is that in general B is not conjugate to an ind-subgroup of P, whence G/P admits many non-conjugate Schubert decompositions. We study the basic properties of the Schubert cells, proving in particular that they are usual finite-dimensional cells or are isomorphic to affine ind-spaces. We then define Schubert ind-varieties as closures of Schubert cells and study the smoothness of Schubert ind-varieties. Our approach to Schubert ind-varieties differs from an earlier approach by H. Salmasian in "Direct limits of Schubert varieties and global sections of line bundles" (J. Algebra 320 (2008), 3187--3198).