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Higher gauge theory I: 2-Bundles

范畴论 2007-05-23 v3

摘要

I categorify the definition of fibre bundle, replacing smooth manifolds with differentiable categories, Lie groups with coherent Lie 2-groups, and bundles with a suitable notion of 2-bundle. To link this with previous work, I show that certain 2-categories of principal 2-bundles are equivalent to certain 2-categories of (nonabelian) gerbes. This relationship can be (and has been) extended to connections on 2-bundles and gerbes. The main theorem, from a perspective internal to this paper, is that the 2-category of 2-bundles over a given 2-space under a given 2-group is (up to equivalence) independent of the fibre and can be expressed in terms of cohomological data (called 2-transitions). From the perspective of linking to previous work on gerbes, the main theorem is that when the 2-space is the 2-space corresponding to a given space and the 2-group is the automorphism 2-group of a given group, then this 2-category is equivalent to the 2-category of gerbes over that space under that group (being described by the same cohomological data).

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引用

@article{arxiv.math/0410328,
  title  = {Higher gauge theory I: 2-Bundles},
  author = {Toby Bartels},
  journal= {arXiv preprint arXiv:math/0410328},
  year   = {2007}
}

备注

82 pages (LaTeX), 216 diagrams (Xy-pic). Version 3: Major update, new sections, new theorems