On Sn-invariant conformal blocks vector bundles of rank one on M0,n
Abstract
For any simple Lie algebra, a positive integer, and tuple of compatible weights, the conformal blocks bundle is a globally generated vector bundle on the moduli space of pointed rational curves. We classify all Sn-invariant vector bundles of conformal blocks for sln which have rank one. We show that the cone generated by their base point free first Chern classes is polyhedral, generated by level one divisors.
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