Geometric realizations of cyclic actions on surfaces -- II

Abstract

Let Mod(Sg) denote 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) denote the set of fixed points induced by the action of H on the Teichm\"uller space Teich(Sg). When H is cyclic with |H| ≥ 3, we show that Fix(H) admits a decomposition as a product of two-dimensional strips at least one of which is of bounded width. For an arbitrary H with at least one generator of order ≥ 3, we derive a computable optimal upper bound for the restriction sys : Fix(H) R+ of the systole function. Furthermore, we show that in such a case, Fix(H) is not symplectomorphic to the Euclidean space of the same dimension. Finally, we apply our theory to recover three well-known results, namely: (a) Harvey's result giving the dimension of Fix(H), (b) Gilman's result that H is irreducible if and only if the corresponding orbifold is a sphere with three cone points, and (c) the Nielsen realization theorem for cyclic groups.