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Conformal Structures in Noncommutative Geometry

Published 2007-04-17, updated 2007-06-15Version 3

It is well-known that a compact Riemannian spin manifold can be reconstructed from its canonical spectral triple which consists of the algebra of smooth functions, the Hilbert space of square integrable spinors and the Dirac operator. It seems to be a folklore fact that the metric can be reconstructed up to conformal equivalence if one replaces the Dirac operator D by sign(D). We give a precise formulation and proof of this fact.

Comments: 8 pages, published version

Journal: J. Noncomm. Geom. 1 (2007), 385-395

Categories: math.DG

Subjects: 58B34, 53C27, 53A30

Keywords: conformal structures, noncommutative geometry, compact riemannian spin manifold, dirac operator, canonical spectral triple

Tags: journal article

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arXiv:0704.2119 [math.DG]Abstract References Reviews Resources

Conformal Structures in Noncommutative Geometry

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Conformal Structures in Noncommutative Geometry

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arXiv:0704.2119 [math.DG]Abstract References Reviews Resources