Uniformization of higher genus finite type log-Riemann surfaces

Abstract

We consider a log-Riemann surface S with a finite number of ramification points and finitely generated fundamental group. The log-Riemann surface is equipped with a local holomorphic difffeomorphism π : S . We prove that S is biholomorphic to a compact Riemann surface with finitely many punctures S, and the pull-back of the 1-form dπ under the biholomorphic map φ : S S is a 1-form ω = φ* dπ with isolated singularities at the punctures of exponential type, i.e. near each puncture p, ω = eh · ω0 where h is a function meromorphic near p and ω0 a 1-form meromorphic near p.