ON THE MINIMUM OF ASYMPTOTIC TRANSLATION LENGTHS OF POINT-PUSHING PSEUDO-ANOSOV MAPS
Let S be a closed Riemann surface of genus with one point x removed. Let be the set of mapping classes on S isotopic to the identity on In this paper, we show that for any genus the minimum of asymptotic translation lengths of all pseudo-Anosov elements of satisfies the inequality
Riemann surfaces, pseudo-Anosov, Dehn twists, curve complex, filling curves.
