Estimating the distances between hyperbolic structures in the moduli space
Abstract
Let Mod(Sg) be the mapping class group of the closed orientable surface Sg of genus g≥ 2. Given a finite subgroup H of Mod(Sg), let Fix(H) be the set of all fixed points induced by the action of H on the Teichm\"uller space Teich(Sg) of Sg. This paper provides a method to estimate the distance between the unique fixed points of certain irreducible cyclic actions on Sg. We begin by deriving an explicit description of a pants decomposition of Sg, the length of whose curves are bounded above by the Bers' constant. To obtain the estimate, our method then uses the quasi-isometry between Teich(Sg) and the pants graph P(Sg).
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