On Margulis cusps of hyperbolic 4-manifolds

Abstract

We study the geometry of the Margulis region associated with an irrational screw translation g acting on the 4-dimensional real hyperbolic space. This is an invariant domain with the parabolic fixed point of g on its boundary which plays the role of an invariant horoball for a translation in dimensions ≤ 3. The boundary of the Margulis region is described in terms of a function Bα : [0,∞) R which solely depends on the rotation angle α ∈ R/ Z of g. We obtain an asymptotically universal upper bound for Bα(r) as r ∞ for arbitrary irrational α, as well as lower bounds when α is Diophatine and the optimal bound when α is of bounded type. We investigate the implications of these results for the geometry of Margulis cusps of hyperbolic 4-manifolds that correspond to irrational screw translations acting on the universal cover. Among other things, we prove bi-Lipschitz rigidity of these cusps.