Convex Polyhedra in the 3-Sphere and Tilings of the 2-Sphere
Abstract
We show that for every convex polyhedral sphere P in S3, there exist two canonical, non-edge-to-edge tilings of S2 whose tiles are given by all the faces of P and the dual convex polyhedral sphere P* to P. Under the identifications of S3 with the Lie group SU(2), and of S2 with the unit sphere in the Lie algebra su(2) of SU(2), our result is obtained by considering the set P of outward unit normal vectors to P and the maps from P to S2 defined by using the left and right Maurer-Cartan forms on SU(2).
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