Principal bundles on compact complex manifolds with trivial tangent bundle
Abstract
Let G be a connected complex Lie group and ⊂ G a cocompact lattice. Let H be a complex Lie group. We prove that a holomorphic principal H-bundle EH over G/ admits a holomorphic connection if and only if EH is invariant. If G is simply connected, we show that a holomorphic principal H-bundle EH over G/ admits a flat holomorphic connection if and only if EH is homogeneous.
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