Existence of an exotic plane in an acylindrical 3-manifold

Abstract

Let P be a geodesic plane in a convex cocompact, acylindrical hyperbolic 3-manifold M. Assume that P*=M* P is nonempty, where M* is the interior of the convex core of M. Does this condition imply that P is either closed or dense in M? A positive answer would furnish an analogue of Ratner's theorem in the infinite volume setting. In arXiv:1802.03853 it is shown that P* is either closed or dense in M*. Moreover, there are at most countably many planes with P* closed, and in all previously known examples, P was also closed in M. In this note we show more exotic behavior can occur: namely, we give an explicit example of a pair (M,P) such that P* is closed in M* but P is not closed in M. In particular, the answer to the question above is no. Thus Ratner's theorem fails to generalize to planes in acylindrical 3-manifolds, without additional restrictions.

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