Nevanlinna Pair and Algebraic Hyperbolicity
Abstract
We introduce the notion of the Nevanlinna pair for a pair (X, D), where X is a projective variety and D is an effective Cartier divisor on X. This notion links and unifies the Nevanlinna theory, the complex hyperbolicity (Brody and Kobayashi hyperbolicity), the big Picard type extension theorem (more generally the Borel hyperbolicity), as well as the algebraic hyperbolicity. The key is to use the Nevanlinna theory on parabolic Riemann surfaces recently developed by Paun and Sibony.
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