Toric topology of the complex Grassmann manifolds

Abstract

The family of the complex Grassmann manifolds Gn,k with a canonical action of the torus Tn=Tn and the analogue of the moment map μ : Gn,k n,k for the hypersimplex n,k, is well known. In this paper we study the structure of the orbit space Gn,k/Tn by developing the methods of toric geometry and toric topology. We use a subdivision of Gn,k into the strata Wσ and determine all regular and singular points of the moment map μ, introduce the notion of the admissible polytopes Pσ such that μ (Wσ) = Pσ and the notion of the spaces of parameters Fσ, which together describe Wσ/Tn as the product Pσ × Fσ. To find the appropriate topology for the set σ Pσ × Fσ we introduce the notions of the universal space of parameters F and the virtual spaces of parameters Fσ⊂ F such that there exist the projections Fσ Fσ. Hence, we propose a method for the description of the orbit space Gn,k/Tn. Earlier we proved that the orbit space G4,2/T4, defined by the canonical T4-action of complexity 1, is homeomorphic to ∂ 4,2 C P1. We prove here that the orbit space G5,2/T5, defined by the canonical T5-action of complexity 2, is homotopy equivalent to the space obtained by attaching the disc D8 to the space 4R P2 by the generator of the group π 7( 4R P2)=Z 4. In particular, (G5,2/G4,2)/T5 is homotopy equivalent to ∂ 5,2 C P2. The methods and the results of this paper are fundaments for our theory of (2l,q)-manifolds.