Riemann surfaces of second kind and effective finiteness theorems

TL;DR

This paper establishes effective upper bounds on the number of irreducible holomorphic objects on finite open Riemann surfaces, extending classical finiteness theorems to surfaces of second kind and relating to Gromov's Oka principle.

Contribution

It provides the first explicit bounds for holomorphic mappings and torus bundles on Riemann surfaces of second kind, linking these bounds to conformal invariants.

Findings

Bound depends on a conformal invariant of the surface.

Number of mappings grows exponentially with inverse of the neighborhood parameter.

Extends finiteness theorems to Riemann surfaces of second kind.

Abstract

The Geometric Shafarevich Conjecture and the Theorem of de Franchis state the finiteness of the number of certain holomorphic objects on closed or punctured Riemann surfaces. The analog of these kind of theorems for Riemann surfaces of second kind is an estimate of the number of irreducible holomorphic objects up to homotopy (or isotopy, respectively). This analog can be interpreted as a quantitatve statement on the limitation for Gromov's Oka principle. For any finite open Riemann surface $X$ (maybe, of second kind) we give an effective upper bound for the number of irreducible holomorphic mappings up to homotopy from $X$ to the twice punctured complex plane, and an effective upper bound for the number of irreducible holomorphic torus bundles up to isotopy on such a Riemann surface. The bound depends on a conformal invariant of the Riemann surface. If $X_{\sigma}$ is the $\sigma$-neighbourhood of a skeleton of an open Riemann surface with finitely generated fundamental group, then the number of irreducible holomorphic mappings up to homotopy from $X_{\sigma}$ to the twice punctured complex plane grows exponentially in $\frac{1}{\sigma}$.