The Algebra of Conformal Blocks

Abstract

For each simply connected, simple complex group G we show that the direct sum of all vector bundles of conformal blocks on the moduli stack Mg, n of stable marked curves carries the structure of a flat sheaf of commutative algebras. The fiber of this sheaf over a smooth marked curve (C, p) agrees with the Cox ring of the moduli of quasi-parabolic principal G-bundles on (C, p). We use the factorization rules on conformal blocks to produce flat degenerations of these algebras. These degenerations are toric in the case G = SL2(C), and the resulting toric varieties are shown to be isomorphic to phylogenetic algebraic varieties from mathematical biology. We conclude with a proof that the Cox ring of the moduli stack of qausi-parabolic SL2(C) principal bundles over a generic curve is generated by conformal blocks of levels 1 and 2 with relations generated in degrees 2, 3, and 4.