A Simple Computation of Teichm\"uller Polynomials from Integer Permutations

Abstract

We present a simple method to compute the Teichm\"uller polynomial of the fibered face of a hyperbolic 3-manifold Mφ obtained as the mapping torus of a pseudo-Anosov homeomorphism φ of a closed surface. We assume φ has orientable invariant foliations and fixes each singular trajectory. We use a characterisation of such homeomorphisms in terms of a permutation of a finite set of integers to give a direct implementation of McMullens algorithm using train tracks. Train tracks with a single vertex suffice in this case. As an application, for each p∈Z≥0, we find an infinite sequence of Teichm\"uller polynomials g,p associated to pseudo-Anosov maps on surfaces of genus g≥2, such that the hyperbolic 3-manifold obtained as the mapping torus has first Betti number g. These polynomials realize a positive proportion of bi-Perron units of each degree as pseudo-Anosov stretch-factors.