Pseudo-Anosov maps and pairs of filling simple closed geodesics on Riemann surfaces

Abstract

Let S be a Riemann surface with a puncture x. Let a⊂ S be a simple closed geodesic. In this paper, we show that for any pseudo-Anosov map f of S that is isotopic to the identity on S \x\, (a, fm(a)) fills S for m≥ 3. We also study the cases of 0<m≤ 2 and show that if (a,f2(a)) does not fill S, then there is only one geodesic b such that b is disjoint from both a and f2(a). In fact, b=f(a) and \a,f(a)\ forms the boundary of an x-punctured cylinder on S. As a consequence, we show that if a and f(a) are not disjoint. Then (a,fm(a)) for any m≥ 2 fills S.