The orbit spaces Gn,2/Tn and the Chow quotients Gn,2\!/\!/(C )n of the Grassmann manifolds Gn,2

Abstract

The focus of our paper is on the complex Grassmann manifolds Gn,2 which appear as one of the fundamental objects in developing the interaction between algebraic geometry and algebraic topology. In his well-known paper Kapranov has proved that the Deligne-Mumford compactification M(0,n) of n-pointed curves of genus zero can be realized as the Chow quotient Gn,2\!/\!/(C )n. In our recent papers, the constructive description of the orbit space Gn,2/Tn has been obtained. In getting this result our notions of the CW-complex of the admissible polytopes and the universal space of parameters Fn for Tn-action on Gn,2 were of essential use. Using technique of the wonderful compactification, in this paper it is given an explicit construction of the space Fn. Together with Keel's description of M(0,n), this construction enabled us to obtain an explicit diffeomorphism between Fn and M(0,n). Thus, we showed that the space Gn,2\!/\!/(C )n can be realized as our universal space of parameters Fn. In this way, we give description of the structure in Gn,2\!/\!/(C )n, that is M(0,n) in terms of the CW-complex of the admissible polytopes for Gn,2 and their spaces of parameters.