Monodromy groups of CP1-structures on punctured surfaces

Abstract

For a punctured surface S, we characterize the representations of its fundamental group into PSL2 (C) that arise as the monodromy of a meromorphic projective structure on S with poles of order at most two and no apparent singularities. This proves the analogue of a theorem of Gallo-Kapovich-Marden concerning CP1-structures on closed surfaces, and settles a long-standing question about characterizing monodromy groups for the Schwarzian equation on punctured spheres. The proof involves a geometric interpretation of the Fock-Goncharov coordinates of the moduli space of framed PSL2 (C)-representations, following ideas of Thurston and some recent results of Allegretti-Bridgeland.