曲线的非可代数邻域

arXiv - MATH - Complex Variables Pub Date : 2024-07-29 DOI:arxiv-2407.20206

Maycol Falla Luza, Frank Loray, Paulo Sad

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引用次数: 0

摘要

我们提供了几组嵌入光滑复曲面的紧凑复曲线，这些曲线的任何邻域都不能嵌入代数曲面。我们提出了不同的构造，包括在投影面中修补曲线邻域，以及炸毁异常曲线。我们的一个非代数论证是基于伊瓦什科维奇（S. Ivashkovich）的扩展定理。

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Non-algebraizable neighborhoods of curves

We provide several families of compact complex curves embedded in smooth complex surfaces such that no neighborhood of the curve can be embedded in an algebraic surface. Different constructions are proposed, by patching neighborhoods of curves in projective surfaces, and blowing down exceptional curves. These constructions generalize examples recently given by S. Lvovski. One of our non algebraic argument is based on an extension theorem of S. Ivashkovich.

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arXiv - MATH - Complex Variables

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