Moduli space of weighted pointed stable curves and toric topology of Grassmann manifolds
Abstract
We relate the theory of moduli spaces M0,A of stable weighted curves of genus 0 to the equivariant topology of complex Grassmann manifolds Gn,2, with the canonical action of the compact torus Tn. We prove that all spaces M0,A can be isomorphically or up to birational morphisms embedded in Gn,2/Tn . The crucial role for proving this result play the chamber decomposition of the hypersimplex n,2 which corresponds to (C )n-stratification of Gn,2 and the spaces of parameters over the chambers, which are subspaces in Gn,2/Tn. We show that the points of these moduli spaces M0, A have the geometric realization as the points of the spaces of parameters over the chambers. We single out the characteristic categories among such moduli spaces. The morphisms in these categories correspond to the natural projections between the universal space of parameters and the spaces of parameters over the chambers. As a corollary, we obtain the realization of the orbit space Gn,2/Tn as an universal object for the introduced categories. As one of our main results we describe the structure of the canonical projection from the Deligne-Mumford compactification to the Losev-Manin compactification of M0,n, using the embedding of M0, n⊂ L0, n, 2 in (C P1)N, N=n-22, the action of the algebraic torus (C )n-3 on (C P1)N for which L0, n, 2 is invariant, and the realization of the Losev-Manin compactification as the corresponding permutohedral toric variety.
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