Abstract
We establish a relation between smooth 2-functors defined on the path 2-groupoid of a smooth manifold and differential forms on this manifold. This relation can be understood as a part of a dictionary between fundamental notions from category theory and differential geometry. We show that smooth 2-functors appear in several fields, namely as connections on (non-abelian) gerbes, as curvatures of smooth functors and as critical points in BF theory. We demonstrate further that our dictionary provides a powerful tool to discuss the transgression of geometric objects to loop spaces.
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CITATION STYLE
Schreiber, U., & Waldorf, K. (2011). Smooth functors vs. differential forms. Homology, Homotopy and Applications, 13(1), 143–203. https://doi.org/10.4310/hha.2011.v13.n1.a7
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