A construction of pseudo-Anosov braids with small normalized entropies

Abstract

Let b be a pseudo-Anosov braid whose permutation has a fixed point and let Mb be the mapping torus by the pseudo-Anosov homeomorphism defined on the genus 0 fiber Fb associated with b. This paper describes a structure of the fibered cone C of F for Mb. We prove that there is a 2-dimensional subcone C0 contained in the fibered cone C of Fb such that the fiber Fa for each primitive integral class a ∈ C0 has genus 0. We also give a constructive description of the monodromy φa: Fa → Fa of the fibration on Mb over the circle, and consequently provide a construction of many sequences of pseudo-Anosov braids with small normalized entropies. As an application we prove that the smallest entropy among skew-palindromic braids with n strands is comparable to 1/n, and the smallest entropy among elements of the odd/even spin mapping class groups of genus g is comparable to 1/g.