The double torus as a 2D cosmos: groups, geometry and closed geodesics
Abstract
The double torus provides a relativistic model for a closed 2D cosmos with topology of genus 2 and constant negative curvature. Its unfolding into an octagon extends to an octagonal tessellation of its universal covering, the hyperbolic space H2. The tessellation is analysed with tools from hyperbolic crystallography. Actions on H2 of groups/subgroups are identified for SU(1, 1), for a hyperbolic Coxeter group acting also on SU(1, 1), and for the homotopy group 2 whose extension is normal in the Coxeter group. Closed geodesics arise from links on H2 between octagon centres. The direction and length of the shortest closed geodesics is computed.
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