The Smallest Positive Eigenvalue Of Fibered Hyperbolic 3-Manifolds

Abstract

We study the smallest positive eigenvalue λ1(M) of the Laplace-Beltrami operator on a closed hyperbolic 3-manifold M which fibers over the circle, with fiber a closed surface of genus g≥ 2. We show the existence of a constant C>0 only depending on g so that λ1(M)∈ [C-1/ vol(M)2, C vol(M)/ vol(M)22g-2/(22g-2-1)] and that this estimate is essentially sharp. We show that if M is typical or random, then we have λ1(M)∈ [C-1/ vol(M)2,C/ vol(M)2]. This rests on a result of independent interest about reccurence properties of axes of random pseudo-Anosov elements.