Hyperbolic links associated to Hamiltonian subgraphs in simple 3-polytopes
Abstract
In a series of papers A.D.Mednykn and A.Yu.Vesnin introduced a construction that for a given right-angled polytope P in geometry L3, R3, S3, L2× R, S2× R and a Hamiltonian cycle, theta-subgraph or K4-subgraph in the 1-skeleton of P builds a geometric 3-manifold N(P,) with an involution τ such that N(P,)/τ S3. The brach set of the corresponding 2-sheeted branched covering N(P,) S3 is a link C⊂ S3 consisting of trivially embedded circles. This construction reformulated in the language of toric topology works for such a subgraph in any simple 3-polytope P and gives a topological 3-manifold N(P,). We give a criterion when S3 C has a complete hyperbolic structure of finite volume and generalize this criterion to similar links in 3-manifolds different from S3. We prove that hyperbolic links C are parametrized by nonselfcrossing Eulerian cycles, Eulerian theta-subgraphs and Eulerian K4-subgraphs in hyperbolic right-angled 3-polytopes of finite volume in L3 with 0, 2 or 4 finite vertices. We give a criterion when the link C consists of mutually unlinked circles and prove that if such a link is nontrivial, then it contains the Borromean rings. The latter problem is motivated by the Efimov effect in quantum mechanics.
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