The fundamental Gray 3-groupoid of a smooth manifold and local 3-dimensional holonomy based on a 2-crossed module

Joao Faria Martins; Roger Picken

arxiv: 0907.2566 · v3 · pith:5QMXJDEBnew · submitted 2009-07-15 · 🧮 math.CT · hep-th· math.DG

The fundamental Gray 3-groupoid of a smooth manifold and local 3-dimensional holonomy based on a 2-crossed module

Joao Faria Martins , Roger Picken This is my paper

classification 🧮 math.CT hep-thmath.DG

keywords graygroupoiddefinesmoothcrosseddimensionalfundamentalmanifold

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We define the thin fundamental Gray 3-groupoid $S_3(M)$ of a smooth manifold $M$ and define (by using differential geometric data) 3-dimensional holonomies, to be smooth strict Gray 3-groupoid maps $S_3(M) \to C(H)$, where $H$ is a 2-crossed module of Lie groups and $C(H)$ is the Gray 3-groupoid naturally constructed from $H$. As an application, we define Wilson 3-sphere observables.

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