Moduli space of logarithmic connections singular over a finite subset of a compact Riemann surface

Abstract

Let S be a finite subset of a compact connected Riemann surface X of genus g ≥ 2. Let Mlc(n,d) denote the moduli space of pairs (E,D), where E is a holomorphic vector bundle over X and D is a logarithmic connection on E singular over S, with fixed residues in the centre of gl(n,), where n and d are mutually corpime. Let L denote a fixed line bundle with a logarithmic connection DL singular over S. Let M'lc(n,d) and Mlc(n,L) be the moduli spaces parametrising all pairs (E,D) such that underlying vector bundle E is stable and (nE, D) (L,DL) respectively. Let M'lc(n,L) ⊂ Mlc(n,L) be the Zariski open dense subset such that the underlying vector bundle is stable. We show that there is a natural compactification of M'lc(n,d) and M'lc(n,L) and compute their Picard groups. We also show that M'lc(n,L) and hence Mlc(n,L) do not have any non-constant algebraic functions but they admit non-constant holomorhic functions. We also study the Picard group and algebraic functions on the moduli space of logarithmic connections singular over S, with arbitrary residues.