On pseudo-Anosov maps with small dilatations on punctured Riemann spheres

Abstract

Let Sn be a punctured Riemann spheres S2 \x1,..., xn\. In this paper, we investigate pseudo-Anosov maps on Sn that are isotopic to the identity on Sn \xn\ and have the smallest possible dilatations. We show that those maps cannot be obtained from Thurston's construction (that is the products of two Dehn twists). We also prove that those pseudo-Anosov maps f on Sn with the minimum dilatations can never define a trivial mapping class as any puncture xi of Sn is filled in. The main tool is to give both lower and upper bounds estimations for dilatations λ(f) of those pseudo-Anosov maps f on Sn isotopic to the identity as a puncture xi of Sn is filled in.