The Oka principle in higher twisted K-theory

Abstract

The Oka principle is a heuristic in complex geometry which states that, for a wide class of complex-analytic problems concerning Stein spaces, any obstruction to finding a holomorphic solution is purely topological. A classical theorem of H.~Grauert implies that for a reduced Stein space X, the natural map K0, O(X) K0, C(X) from ordinary holomorphic K-theory K0, O(X) to ordinary topological K-theory K0, C(X) is an isomorphism: this is the basic manifestation of the Oka principle in K-theory. In this paper, we generalise this theorem to higher twisted K-theory. For a reduced Stein space X and a torsion class α ∈ H3(X,Z), we prove that the natural map K-n,Oα(X) K-n,Cα(X) is an isomorphism for all n ≥ 0. We introduce the first definition of higher twisted holomorphic K-theory in the literature, defined through a simplicially enriched version of Quillen's S-1S construction. Our parallel construction for topological higher twisted K-theory is a new formulation which is compatible with existing theory. The proof of the main theorem employs Cartan-Grauert cohomological methods and an equivalence, which we prove, between the simplicial symmetric monoidal categories of holomorphic and topological α-twisted vector bundles.