Groups generated by Dehn Twists along fillings of surfaces

Abstract

Let Sg denote a closed oriented surface of genus g ≥ 2. A set = \ c1, …, cd\ of pairwise non-homotopic simple closed curves on Sg is called a filling system or simply a filling of Sg, if Sg is a union of topological discs for some ≥ 1. For 1≤ i≤ d, let Tci denotes the Dehn twist along ci. In this article, we show that for each d≥ 2, there exists a filling =\c1,c2,…, cd\ of Sg such that the group Tc1, Tc2,…,Tcd is isomorphic to the free group of rank d.