The induced metric and bending lamination on the boundary of convex hyperbolic 3-manifolds

Abstract

Let S be an oriented closed surface of genus at least two, and let M = S × (0,1). Suppose that h is a Riemannian metric on S with curvature strictly greater than -1, h* is a Riemannian metric on S with curvature strictly less than 1, and every contractible closed geodesic with respect to h* has length strictly greater than 2π. Let μ be a measured lamination on S such that every closed leaf has weight strictly less than π. Then, we prove the existence of a convex hyperbolic metric g on the interior of M that induces the Riemannian metric h (respectively h*) as the first (respectively third) fundamental form on S × \ 0\ and induces a pleated surface structure on S × \ 1\ with bending lamination μ. This statement remains valid even in limiting cases where the curvature of h is constant and equal to -1. Additionally, when considering a conformal class c on S, we show that there exists a convex hyperbolic metric g on the interior of M that induces c on S × \ 0\, which is viewed as one component of the ideal boundary at infinity of (M,g), and induces a pleated surface structure on S × \ 1\ with bending lamination μ. Our proof differs from previous work by Lecuire for these two last cases. Moreover, when we consider a lamination which is small enough, in a sense that we will define, and a hyperbolic metric, we show that the metric on the interior of M that realizes these data is unique.