Moduli and Periods of Supersymmetric Curves
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Supersymmetric curves are the analogue of Riemann surfaces in super geometry. We establish some foundational results about complex Deligne-Mumford superstacks, and we then prove that the moduli superstack of supersymmetric curves is a smooth complex Deligne-Mumford superstack. We then show that the superstack of supersymmetric curves admits a coarse complex superspace, which, in this case, is just an ordinary complex space. In the second part of this paper we discuss the period map. We remark that the period domain is the moduli space of ordinary abelian varieties endowed with a symmetric theta divisor, and we then show that the differential of the period map is surjective. In other words, we prove that any first order deformation of a classical Jacobian is the Jacobian of a supersymmetric curve.
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Derived Geometric Methods in Supergeometry: Transmutations and their Cohomology
Develops derived categories on superstacks and uses transmutation stacks to prove results on D-modules and the isomorphism of de Rham and super de Rham cohomology.
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