Entropy, Critical Exponent and Immersed Surfaces in Hyperbolic 3-Manifolds

Abstract

We consider a π1--injective immersion f: M from a compact surface to a hyperbolic 3--manifold M. Let denote the copy of π1 in Isom(H3) induced by the immersion and δ() be the critical exponent. Suppose is convex cocompact and is negatively curved, we prove that there are two geometric constants C1(,M) and C2(,M) not bigger than 1 such that C1(,M)·δ≤ h()≤ C2(,M)·δ, where h() is the topological entropy of the geodesic flow on. When f is an embedding, we show that C1(,M) and C2(,M) are exactly the geodesic stretches (a.k.a. Thurston's intersection number) with respect to certain Gibbs measures. Moreover, we prove the rigidity phenomenon arising from this inequality. Lastly, as an application, we discuss immersed minimal surfaces in hyperbolic 3--manifolds and these discussions lead us to results similar to A. Sanders' work on the moduli space of introduced by C. Taubes.