Elliptic actions on Teichmuller space

Abstract

Let S be an oriented surface of finite type, MCG(S) its mapping class group, and T(S) its Teichm\"uller space with the Teichm\"uller metric. Let H ≤ MCG(S) be a finite subgroup and consider the subset of T(S) fixed by H, Fix(H) ⊂ T(S). For any R>0, we prove that the set of points whose H-orbits have diameter bounded by R, FixRT(H), lives in a bounded neighborhood of Fix(H). As an application, we show that the orbit of any point X ∈ T(S) under the action of a finite order mapping class has a fixed coarse barycenter. By contrast, we show that FixTR(H) need not be quasiconvex with an explicit family of examples.