Algebraic approximations of holomorphic maps from Stein domains to projective manifolds

Abstract

It is shown that every holomorphic map f from a Runge domain of an affine algebraic variety S into a projective algebraic manifold X is a uniform limit of Nash algebraic maps f defined over an exhausting sequence of relatively compact open sets in . A relative version is also given: If there is an algebraic subvariety A (not necessarily reduced) in S such that the restriction of f to A is algebraic, then f can be taken to coincide with f on A. The main application of these results, when is the unit disk, is to show that the Kobayashi pseudodistance and the Kobayashi-Royden infinitesimal metric of a quasi-projective algebraic manifold Z are computable solely in terms of the closed algebraic curves in Z. Similarly, the p-dimensional Eisenman metric of a quasi-projective algebraic manifold can be computed in terms of the Eisenman volumes of its p-dimensional algebraic subvarieties. Another question addressed in the paper is whether the approximations f can be taken to have their images contained in affine Zariski open subsets of X. By using complex analytic methods (pluricomplex potential theory and H\"ormander's L2 estimates), we show that this is the case if f is an embedding (with S< X) and if there is an ample line bundle L on X such that

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