Deformed phase space for 3d loop gravity and hyperbolic discrete geometries

Abstract

We revisit the loop gravity space phase for 3D Riemannian gravity by algebraically constructing the phase space T*SU(2)(3) as the Heisenberg double of the Lie group SO(3) provided with the trivial cocyle. Tackling the issue of accounting for a non-vanishing cosmological constraint 0 in the canonical framework of 3D loop quantum gravity, SL(2,C) viewed as the Heisenberg double of SU(2) provided with a non-trivial cocyle is introduced as a phase space. It is a deformation of the flat phase space ISO(3) and reproduces the latter in a suitable limit. The SL(2,C) phase space is then used to build a new, deformed LQG phase space associated to graphs. It can be equipped with a set of Gauss constraints and flatness constraints, which form a first class system and Poisson-generate local 3D rotations and deformed translations. We provide a geometrical interpretation for this lattice phase space with constraints in terms of consistently glued hyperbolic triangles, i.e. hyperbolic discrete geometries, thus validating our construction as accounting for a constant curvature <0. Finally, using ribbon diagrams, we show that our new model is topological.