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arxiv: 2002.06625 · v2 · pith:NWB64JI2 · submitted 2020-02-16 · math-ph · hep-th· math.AG· math.MP· math.QA

The Super Mumford Form and Sato Grassmannian

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classification math-ph hep-thmath.AGmath.MPmath.QA
keywords supergrassmannianlambdamoduliriemannsatospacearbarello
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We describe a supersymmetric generalization of the construction of Kontsevich and Arbarello, De Concini, Kac, and Procesi, which utilizes a relation between the moduli space of curves with the infinite-dimensional Sato Grassmannian. Our main result is the existence of a flat holomorphic connection on the line bundle $\lambda_{3/2}\otimes\lambda_{1/2}^{-5}$ on the moduli space of triples: a super Riemann surface, a Neveu-Schwarz puncture, and a formal coordinate system. We also prove a superconformal Noether normalization lemma for families of super Riemann surfaces.

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