Holomorphic Lie algebroid connections on holomorphic principal bundles on compact Riemann surfaces
Abstract
For a --equivariant holomorphic Lie algebroid (V,\, φ), on a compact Riemann surface X equipped with an action of a finite group , we investigate the equivariant holomorphic Lie algebroid connections on holomorphic principal G--bundles over X, where G is a connected affine complex reductive group. If (V,\,φ) is nonsplit, then it is proved that every holomorphic principal G--bundle admits an equivariant holomorphic Lie algebroid connection. If (V,\,φ) is split, then it is proved that the following four statements are equivalent: An equivariant principal G--bundle EG admits an equivariant holomorphic Lie algebroid connection. The equivariant principal G--bundle EG admits an equivariant holomorphic connection. The principal G--bundle EG admits a holomorphic connection. For every triple (P,\, L(P),\, ), where L(P) is a Levi subgroup of a parabolic subgroup P\, ⊂\, G and is a holomorphic character of L(P), and every --equivariant holomorphic reduction of structure group EL(P) of EG to L(P), the degree of the line bundle over X associated to EL(P) for is zero. The correspondence between --equivariant principal G--bundles over X and parabolic G--bundles on X/ translates the above result to the context of parabolic G--bundles.
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