On the infinitesimal automorphisms of principal bundles

Abstract

We review some basic facts on vector fields, in the complex-analytic setting, thus, obtaining a rationality result and an extension of the Birkhoff-Grothendieck theorem, as follows: (1) Let Z be a compact complex manifold endowed with a very ample line bundle L. Denote by gL the extended Lie algebra of infinitesimal automorphisms of L. If the representation of gL on the space of holomorphic sections of L is irreducible then Z is rational; (2) Let P be a holomorphic principal bundle over the Riemann sphere, with structural group G whose Lie algebra is not equal to its nilpotent radical. Then there exists a Lie subgroup H of G which is a quotient of a Borel subgroup of SL(2) and such that P admits a reduction to H.