3-manifolds represented by 4-regular graphs with three Eulerian cycles
Abstract
We construct and study a new class M=\Mn\n 4 of compact hyperbolic 3-manifolds with totally geodesic boundary. The members of Mn are defined via triples of pairwise compatible Eulerian cycles in 4-regular n-vertex graphs. We show that each M in Mn is of Matveev complexity n and has a unique minimal ideal triangulation, which consists of n tetrahedra. We exploit these properties to show that n!\,4n > |Mn| > n! for each sufficiently large n∈N.
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