The universal connection for principal bundles over homogeneous spaces and twistor space of coadjoint orbits

Abstract

Given a holomorphic principal bundle Q\, \, X, the universal space of holomorphic connections is a torsor C1(Q) for ad Q T*X such that the pullback of Q to C1(Q) has a tautological holomorphic connection. When X\,=\, G/P, where P is a parabolic subgroup of a complex simple group G, and Q is the frame bundle of an ample line bundle, we show that C1(Q) may be identified with G/L, where L\, ⊂\, P is a Levi factor. We use this identification to construct the twistor space associated to a natural hyper-K\"ahler metric on T*(G/P), recovering Biquard's description of this twistor space, but employing only finite-dimensional, Lie-theoretic means.