Geodesic planes in the convex core of an acylindrical 3-manifold

Let $M$ be a convex cocompact acylindrical hyperbolic 3-manifold of infinite volume, and let $M^*$ denote the interior of the convex core of $M$. In this paper we show that any geodesic plane in $M^*$ is either closed or dense. We also show that only countably many planes are closed. There are the first rigidity theorems for planes in convex cocompact 3-manifolds of infinite volume that depend only on the topology of M.