Logarithmic connections on principal bundles over a Riemann surface

Abstract

Let EG be a holomorphic principal G-bundle on a compact connected Riemann surface X, where G is a connected reductive complex affine algebraic group. Fix a finite subset D ⊂ X, and for each x∈ D fix wx ∈ ad(EG)x. Let T be a maximal torus in the group of all holomorphic automorphisms of EG. We give a necessary and sufficient condition for the existence of a T-invariant logarithmic connection on EG singular over D such that the residue over each x ∈ D is wx. We also give a necessary and sufficient condition for the existence of a logarithmic connection on EG singular over D such that the residue over each x ∈ D is wx, under the assumption that each wx is T-rigid.