Cusp transitivity in hyperbolic 3-manifolds
Abstract
Let M be a cusped finite-volume hyperbolic three-manifold with isometry group G. Then G induces a k-transitive action by permutation on the cusps of M for some integer k 0. Generically G is trivial and k=0, but k>0 does occur in special cases. We show examples with k=1,2,4. An interesting question concerns the possible number of cusps for a fixed k. Our main result provides an answer for k=2 by constructing a family of manifolds having no upper bound on the number of cusps.
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