Branched projective structures on a Riemann surface and logarithmic connections

TL;DR

This paper explores the relationship between branched projective structures on a Riemann surface and logarithmic connections on a jet bundle, revealing a geometric correspondence under specific conditions.

Contribution

It establishes a connection between branched projective structures with simple branching and certain logarithmic connections on a jet bundle, expanding understanding of their geometric interplay.

Findings

${ m extbf{P}}_S$ coincides with a subset of logarithmic connections.

The space of logarithmic connections forms an affine space of dimension $3g-3+d$.

${ m extbf{P}}_S$ has codimension $d$ in this affine space at a generic point.

Abstract

We study the set ${\mathcal P}_S$ consisting of all branched holomorphic projective structures on a compact Riemann surface $X$ of genus $g \geq 1$ and with a fixed branching divisor $S:= \sum_{i=1}^d n_i\cdot x_i$, where $x_i \in X$. Under the hypothesis that $n_i=1$, for all $i$, with $d$ a positive even integer such that $d \neq 2g-2$, we show that ${\mathcal P}_S$ coincides with a subset of the set of all logarithmic connections with singular locus $S$, satisfying certain geometric conditions, on the rank two holomorphic jet bundle $J^1(Q)$, where $Q$ is a fixed holomorphic line bundle on $X$ such that $Q^{\otimes 2}= TX\otimes {\mathcal O}_X(S)$. The space of all logarithmic connections of the above type is an affine space over the vector space $H^0(X, K^{\otimes 2}_X \otimes {\mathcal O}_X(S))$ of dimension $3g-3+d$. We conclude that ${\mathcal P}_S$ is a subset of this affine space that has codimenison $d$ at a generic point.