On homogeneous spaces for diagonal ind-groups
Abstract
We study the homogeneous ind-spaces GL(s)/P where GL(s) is a strict diagonal ind-group defined by a supernatural number s and P is a parabolic ind-subgroup of GL(s). We construct an explicit exhaustion of GL(s)/P by finite-dimensional partial flag varieties. As an application, we characterize all locally projective GL(∞)-homogeneous spaces, and some direct products of such spaces, which are GL(s)-homogeneous for a fixed s. The very possibility for a GL(∞)-homogeneous space to be GL(s)-homogeneous for a strict diagonal ind-group GL(s) arises from the fact that the automorphism group of a GL(∞)-homogeneous space is much larger than GL(∞).
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