Decomposing Centrally Symmetric Convex Polyhedral Surfaces into Parallelograms
Abstract
Let M2N(δ1, δ2,…, δN) be the moduli space of centrally symmetric convex polyhedral surfaces with 2N labeled vertices and prescribed cone-deficits δ1, δ2, …, δN. We show that M2N(δ1, δ2,…, δN) has the structure of a real hyperbolic manifold of dimension 2N-3. When N=4 and 5, we show that every surface in M2N(δ1, δ2,…, δN) can be decomposed into at most 22N-22 parallelograms, and the decomposition is invariant under the antipodal map. Using the edge-lengths of these parallelograms as coordinates, we show that the moduli space of centrally symmetric polyhedral surfaces with 8 unlabeled vertices and cone-deficits π2 is isometric to the quotient of a real hyperbolic regular ideal 5-simplex by the dihedral group D6.
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