Semidirect products and invariant connections

Abstract

Let S be a complex reductive group acting holomorphically on a complex Lie group N via holomorphic automorphisms. Let K(S)⊂ S be a maximal compact subgroup. The semidirect product G := N K(S) acts on N via biholomorphisms. We give an explicit description of the isomorphism classes of G-equivariant almost holomorphic hermitian principal bundles on N. Under the assumption that there is a central subgroup Z= U(1) of K(S) that acts on Lie(N) as multiplication through a single nontrivial character, we give an explicit description of the isomorphism classes of G-equivariant holomorphic hermitian principal bundles on N.