An Oka principle for Stein G-manifolds

Abstract

Let G be a reductive complex Lie group acting holomorphically on Stein manifolds X and Y. Let pX X QX and pY Y QY be the quotient mappings. Assume that we have a biholomorphism Q:= QX QY and an open cover \Ui\ of Q and G-biholomorphisms i pX-1(Ui) pY-1(Ui) inducing the identity on Ui. There is a sheaf of groups A on Q such that the isomorphism classes of all possible Y is the cohomology set H1(Q, A). The main question we address is to what extent H1(Q, A) contains only topological information. For example, if G acts freely on X and Y, then X and Y are principal G-bundles over Q, and Grauert's Oka Principle says that the set of isomorphism classes of holomorphic principal G-bundles over Q is canonically the same as the set of isomorphism classes of topological principal G-bundles over Q. We investigate to what extent we have an Oka principle for H1(Q, A).