A resolution of singularities for the orbit spaces Gn,2/Tn

Abstract

The problem of the description of the orbit space Xn = Gn,2/Tn for the standard action of the torus Tn on a complex Grassmann manifold Gn,2 is widely known and it appears in diversity of mathematical questions. A point x∈ Xn is said to be a critical point if the stabilizer of its corresponding orbit is nontrivial. In this paper, the notion of singular points of Xn is introduced which opened the new approach to this problem. It is showed that for n>4 the set of critical points CritXn belongs to our set of singular points SingXn, while the case n=4 is somewhat special for which SingX4⊂ CritX4, but there are critical points which are not singular. The central result of this paper is the construction of the smooth manifold Un with corners, Un = Xn and an explicit description of the projection pn : Un Xn which in the defined sense resolve all singular points of the space Xn. Thus, we obtain the description of the orbit space Gn,2/Tn combinatorial structure. Moreover, the Tn-action on Gn,2 is a seminal example of complexity (n-3) - action. Our results demonstrate the method for general description of orbit spaces for torus actions of positive complexity.