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Spin spaces, Lipschitz groups, and spinor bundles

微分几何 2007-05-23 v1

摘要

It is shown that every bundle ΣM\varSigma\to M of complex spinor modules over the Clifford bundle \Cl(g)\Cl(g) of a Riemannian space (M,g)(M,g) with local model (V,h)(V,h) is associated with an lpin ("Lipschitz") structure on MM, this being a reduction of the \Ort(h){\Ort}(h)-bundle of all orthonormal frames on M to the Lipschitz group \Lpin(h)\Lpin(h) of all automorphisms of a suitably defined spin space. An explicit construction is given of the total space of the \Lpin(h)\Lpin(h)-bundle defining such a structure. If the dimension m of M is even, then the Lipschitz group coincides with the complex Clifford group and the lpin structure can be reduced to a pinc^{c} structure. If m=2n-1, then a spinor module Σ\varSigma on M is of the Cartan type: its fibres are 2^n-dimensional and decomposable at every point of M, but the homomorphism of bundles of algebras \Cl(g)\EndΣ\Cl(g)\to\End\varSigma globally decomposes if, and only if, M is orientable. Examples of such bundles are given. The topological condition for the existence of an lpin structure on an odd-dimensional Riemannian manifold is derived and illustrated by the example of a manifold admitting such a structure, but no pin^c structure.

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引用

@article{arxiv.math/9901137,
  title  = {Spin spaces, Lipschitz groups, and spinor bundles},
  author = {Thomas Friedrich and Andrzej Trautman},
  journal= {arXiv preprint arXiv:math/9901137},
  year   = {2007}
}

备注

Latex2.09, 23 pages