Homogeneous principal bundles over manifolds with trivial logarithmic tangent bundle

Abstract

Winkelmann considered compact complex manifolds X equipped with a reduced effective normal crossing divisor D\, ⊂\, X such that the logarithmic tangent bundle TX(- D) is holomorphically trivial. He characterized them as pairs (X,\, D) admitting a holomorphic action of a complex Lie group G satisfying certain conditions Wi1, Wi2; this G is the connected component, containing the identity element, of the group of holomorphic automorphisms of X that preserve D. We characterize the homogeneous holomorphic principal H--bundles over X, where H is a connected complex Lie group. Our characterization says that the following three are equivalent: (1)~ EH is homogeneous. (2)~ EH admits a logarithmic connection singular over D. (3)~ The family of principal H--bundles \g*EH\g∈ G is infinitesimally rigid at the identity element of the group G.