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Higher Gauge Theory: 2-Connections on 2-Bundles | John Baez
; Urs Schreiber
; | Date: |
30 Dec 2004 | Subject: | hep-th | Abstract: | Connections and curvings on gerbes are beginning to play a vital role in differential geometry and mathematical physics -- first abelian gerbes, and more recently nonabelian gerbes. These concepts can be elegantly understood using the concept of `2-bundle’ recently introduced by Bartels. A 2-bundle is a generalization of a bundle in which the fibers are categories rather than sets. Here we introduce the concept of a `2-connection’ on a principal 2-bundle. We describe principal 2-bundles with connection in terms of local data, and show that under certain conditions this reduces to the cocycle data for nonabelian gerbes with connection and curving subject to a certain constraint -- namely, the vanishing of the `fake curvature’, as defined by Breen and Messing. This constraint also turns out to guarantee the existence of `2-holonomies’: that is, parallel transport over both curves and surfaces, fitting together to define a 2-functor from the `path 2-groupoid’ of the base space to the structure 2-group. We give a general theory of 2-holonomies and show how they are related to ordinary parallel transport on the path space of the base manifold. | Source: | arXiv, hep-th/0412325 | Services: | Forum | Review | PDF | Favorites |
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