Veronese quotient models of M0,n and conformal blocks
Abstract
The moduli space M0,n of Deligne-Mumford stable n-pointed rational curves admits morphisms to spaces recently constructed by Giansiracusa, Jensen, and Moon that we call Veronese quotients. We study divisors on M0,n associated to these maps and show that these divisors arise as first Chern classes of vector bundles of conformal blocks.
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