Line bundles on Contractions of M0,n via Coinvariant Divisors

Abstract

Using representations of vertex operator algebras, we describe the line bundles on a wide range of contractions of M0,n, the moduli space of stable n-pointed rational curves, by proving a stronger version of the contraction theorem for these morphisms. These include the celebrated constructions of Kapranov, Keel, and Knudsen. Our main result suggests that while many so-called F-curves are not KX-negative, they exhibit behavior similar to KX-negative curves. This reveals for instance, a distinguished property of Knudsen's construction fKnu:M0,n M0,n-1×M0,n-2M0,n-1, allowing for the classification of all possible factorizations of fKnu, as well as further applications, and generalizations.

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