C-pairs and their morphisms

Stefan Kebekus, Erwan Rousseau
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Abstract

This paper surveys Campana's theory of C-pairs (or "geometric orbifolds") in the complex-analytic setting, to serve as a reference for future work. Written with a view towards applications in hyperbolicity, rational points, and entire curves, it introduces the fundamental definitions of C-pair-theory systematically. In particular, it establishes an appropriate notion of "morphism", which agrees with notions from the literature in the smooth case, but is better behaved in the singular setting and has functorial properties that relate it to minimal model theory.
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C 对及其态式
本文概述了坎帕纳在复解析背景下的 C 对(或 "几何球面")理论,为今后的工作提供参考。本文着眼于双曲、有理点和全曲线的应用,系统地介绍了 C 对理论的基本定义。特别是,它建立了一个适当的 "态 "概念,这个概念与光滑情况下的文献中的概念一致,但在奇异情况下表现得更好,并且具有与最小模型理论相关的函数特性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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