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Exploring Curved Superspace

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arxiv 1205.1115 v2 pith:GCGWH2OX submitted 2012-05-05 hep-th math.DG

Exploring Curved Superspace

classification hep-th math.DG
keywords superchargesmanifoldsr-chargesuperchargeadditionaladmitadmitsadmitting
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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We systematically analyze Riemannian manifolds M that admit rigid supersymmetry, focusing on four-dimensional N=1 theories with a U(1)_R symmetry. We find that M admits a single supercharge, if and only if it is a Hermitian manifold. The supercharge transforms as a scalar on M. We then consider the restrictions imposed by the presence of additional supercharges. Two supercharges of opposite R-charge exist on certain fibrations of a two-torus over a Riemann surface. Upon dimensional reduction, these give rise to an interesting class of supersymmetric geometries in three dimensions. We further show that compact manifolds admitting two supercharges of equal R-charge must be hyperhermitian. Finally, four supercharges imply that M is locally isometric to M_3 x R, where M_3 is a maximally symmetric space.

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