The Oka principle for tame families of Stein manifolds

Abstract

Let X be a smooth open manifold of even dimension, T be a topological space, and J=\Jt\t∈ T be a continuous family of smooth integrable Stein structures on X. Under suitable additional assumptions on T and J, we prove an Oka principle for continuous families of maps from the family of Stein manifolds (X,Jt), t∈ T, to any Oka manifold, showing that every family of continuous maps is homotopic to a family of Jt-holomorphic maps depending continuously on t. We also prove the Oka-Weil theorem for sections of J-holomorphic vector bundles on Z=T× X and the Oka principle for isomorphism classes of such bundles. The assumption on the family J is that the Jt-convex hulls of any compact set in X are upper semicontinuous with respect to t∈ T; such a family is said to be tame. For suitable parameter spaces T, we characterise tameness by the existence of a continuous family t:X R+=[0,+∞), t∈ T, of strongly Jt-plurisubharmonic exhaustion functions on X. Every family of complex structures on an open orientable surface is tame.We give an example of a nontame smooth family of Stein structures Jt on 2n (t∈ R,\ n>1) such that (R2n,Jt) is biholomorphic to Cn for every t∈R. We show that the Oka principle fails on any nontame family.

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