Z2 - homology of the orbit spaces Gn,2/ Tn

Abstract

We study the Z2-homology groups of the orbit space Xn = Gn,2/Tn for the canonical action of the compact torus Tn on a complex Grassmann manifold Gn,2. Our starting point is the model (Un, pn) for Xn constructed by Buchstaber and Terzi\'c (2020), where Un = n,2× Fn for a hypersimplex n,2 and an universal space of parameters Fn defined in Buchstaber and Terzi\'c (2019), (2020). It is proved by Buchstaber and Terzi\'c (2021) that Fn is diffeomorphic to the moduli space M0,n of stable n-pointed genus zero curves. We exploit the results from Keel (1992) and Ceyhan (2009) on homology groups of M0,n and express them in terms of the stratification of Fn which are incorporated in the model (Un, pn). In the result we provide the description of cycles in Xn, inductively on n. We obtain as well explicit formulas for Z2-homology groups for X5 and X6. The results for X5 recover by different method the results from Buchstaber and Terzi\'c (2021) and S\"uss (2020). The results for X6 we consider to be new.