Topological consequences of null-geodesic refocusing and applications to Zx manifolds

Abstract

Let (M,h) be a connected, complete Riemannian manifold, x∈ M, and l>0. Then M is called a Zx manifold if all geodesics starting at x return to x, and it is called a Yxl manifold if every unit-speed geodesic starting at x returns to x at time l. It is unknown whether there are Zx manifolds that are not Yxl manifolds for any l>0. By the Bérard-Bergery theorem, any Yxl manifold of dimension at least 2 is compact with finite fundamental group. We prove the same result for Zx manifolds M for which all unit-speed geodesics starting at x return to x in uniformly bounded time. We also prove that any Zx manifold (M,h) with h analytic is a Yxl manifold for some l>0. We start by defining a class of globally hyperbolic spacetimes (called observer-refocusing) such that any Zx manifold is the Cauchy surface of some observer-refocusing spacetime. We then prove that under suitable conditions the Cauchy surfaces of observer-refocusing spacetimes are compact with finite fundamental group, and we show that analytic observer-refocusing spacetimes of dimension at least 3 are strongly refocusing. We end by stating a contact-theoretic conjecture analogous to our results in Riemannian and Lorentzian geometry.

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