Pentagon representations and complex projective structures on closed surfaces

Abstract

We define a class of representations of the fundamental group of a closed surface of genus 2 to PSL2 ( C): the pentagon representations. We show that they are exactly the non-elementary PSL2 ( C)-representations of surface groups that do not admit a Schottky decomposition, i.e. a pants decomposition such that the restriction of the representation to each pair of pants is an isomorphism onto a Schottky group. In doing so, we exhibit a gap in the proof of Gallo, Kapovich and Marden that every non-elementary representation of a surface group to PSL2 ( C) is the holonomy of a projective structure, possibly with one branched point of order 2. We show that pentagon representations arise as such holonomies and repair their proof.