Algebraicity of analytic maps to a hyperbolic variety
Abstract
Let X be an algebraic variety over C. We say that X is Borel hyperbolic if, for every finite type reduced scheme S over C, every holomorphic map San Xan is algebraic. We use a transcendental specialization technique to prove that X is Borel hyperbolic if and only if, for every smooth affine curve C over C, every holomorphic map Can Xan is algebraic. We use the latter result to prove that Borel hyperbolicity shares many common features with other notions of hyperbolicity such as Kobayashi hyperbolicity.
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