Fenchel-Nielsen coordinates of the branch loci of cyclic actions

Abstract

Let Sg be a closed, connected, and oriented smooth surface of genus g≥ 2. Let the mapping class group of Sg be denoted by Mod(Sg) and the Teichm\"uller space of Sg by Teich(Sg). It is known that Mod(Sg) acts by isometries on Teich(Sg) with respect to the Weil-Petersson metric. In this paper, we develop algorithms to describe the Fenchel-Nielsen coordinates of fixed points of the actions of certain finite cyclic subgroups of Mod(Sg) on Teich(Sg). As applications of these algorithms, we compute the Fenchel-Nielsen coordinates of the fixed points of three cyclic subgroups of orders 10, 8, and 4, in Mod(S2).

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