Limit points of the branch locus of Mg

Abstract

Let Mg be the moduli space of compact connected hyperbolic surfaces of genus g≥2, and Bg ⊂ Mg its branch locus. Let Mg be the Deligne-Mumford compactification of the moduli space of smooth, complete, connected surfaces of genus g≥ 2 over C. The branch locus Bg is stratified by smooth locally closed equisymmetric strata, where a stratum consists of hyperbolic surfaces with equivalent action of their preserving orientation isometry group. Any stratum can be determined by a certain epimorphism . In this paper, for any of these strata, we describe the topological type of its limits points in Mg in terms of . We apply our method to the 2-complex dimensional stratum corresponding to the pyramidal hyperbolic surfaces.