Abstract:
Classical differential geometry can be encoded in spectral data, such as Connes' spectral triples, involving supersymmetry algebras. In this paper, we formulate non-commutative geometry in terms of supersymmetric spectral data. This leads to generalizations of Connes' non-commutative spin geometry encompassing non-commutative Riemannian, symplectic, complex-Hermitian and (Hyper-) Kähler geometry. A general framework for non-commutative geometry is developed from the point of view of supersymmetry and illustrated in terms of examples. In particular, the non-commutative torus and the non-commutative 3-sphere are studied in some detail.
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Received: 1 April 1997 / Accepted: 24 November 1998
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Fröhlich, J., Grandjean, O. & Recknagel, A. Supersymmetric Quantum Theory and Non-Commutative Geometry. Comm Math Phys 203, 119–184 (1999). https://doi.org/10.1007/s002200050608
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DOI: https://doi.org/10.1007/s002200050608