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arxiv: 2105.10616 · v1 · pith:AO3KQCDPnew · submitted 2021-05-22 · ✦ hep-th · gr-qc· math-ph· math.MP

Polyhedron phase space using 2-groups: kappa-Poincare as a Poisson 2-group

classification ✦ hep-th gr-qcmath-phmath.MP
keywords groupdecorationsphasepoincarespacecasecrosseddeformations
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We construct a phase space for a three dimensional cellular complex with decorations on edges and faces using crossed modules (strict 2-groups) equipped with a (non-trivial) Poisson structure. We do not use the most general crossed module, but only the ones where the target map (t-map) is trivial. As a particular case, we recover that deformations of the Poincare group can be exported to deformations of the Poincare 2-group. The kappa-deformation case provides a natural candidate for describing discrete geometries with curved edge decorations (but still flat face decorations). Our construction generalizes the classical phase space defined in [5] for a 3d triangulation in terms of an un-deformed Poincare 2-group.

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