Geometrization of almost extremal representations in PSL2 R

Abstract

Let S be a closed surface of genus g. In this paper, we investigate the relationship between hyperbolic cone-structure on S and representations of the fundamental group into PSL2 R. We consider surfaces of genus greater than g and we show that, under suitable conditions, every representation :π1 S PSL2 R with Euler number E()=((S)+1) arises as holonomy of a hyperbolic cone-structure σ on S with a single cone point of angle 4π. From this result, we derive that for surfaces of genus 2 every representation with E()=1 arises as the holonomy of some hyperbolic cone-structure.