(2+1) gravity for higher genus in the polygon model
Publication date
2004-05-10
Authors
Kádár, Zoltán
Loll, R.
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Article
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Abstract
We construct explicitly a (12g − 12)-dimensional space P of unconstrained and
independent initial data for ’t Hooft’s polygon model of (2+1) gravity for vacuum
spacetimes with compact genus-g spacelike slices, for any g ≥ 2. Our method relies
on interpreting the boost parameters of the gluing data between flat Minkowskian
patches as the lengths of certain geodesic curves of an associated smooth Riemann
surface of the same genus. The appearance of an initial big-bang or a final big-crunch
singularity (but never both) is verified for all configurations. Points in P correspond
to spacetimes which admit a one-polygon tessellation, and we conjecture that P is
already the complete physical phase space of the polygon model. Our results open
the way for numerical investigations of pure (2+1) gravity.