Levi-flat world: a survey of local theory

IF 0.5 Q3 MATHEMATICS Ufa Mathematical Journal Pub Date : 2017-01-01 DOI:10.13108/2017-9-3-172
Sukhov Alexandre
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引用次数: 1

Abstract

This expository paper concerns local properties of Levi-flat real analytic manifolds with singularities. Levi-flat manifolds arise naturally in Complex Geometry and Foliation Theory. In many cases (global) compact Levi-flat manifolds without singularities do not exist. These global obstructions make natural the study of Levi-flat objects with singularities because they always exist. The present expository paper deals with some recent results on local geometry of Levi-flat singularities. One of the main questions concerns an extension of the Levi foliation as a holomorphic foliation to a full neighborhood of singularity. It turns out that in general such extension does not exist. Nevertheless, the Levi foliation always extends as a holomorphic web (a foliation with branching) near a non-dicritical singularity. We also present an efficient criterion characterizing these singularities.
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列维平坦世界:局部理论综述
本文讨论了具有奇异点的列维平面实解析流形的局部性质。李维平面流形在复杂几何和叶理理论中自然出现。在许多情况下,没有奇点的(全局)紧致列维平坦流形不存在。这些全局障碍使得研究具有奇点的列维平面物体变得很自然,因为它们总是存在的。本文讨论了最近关于李维平坦奇点局部几何的一些结果。其中一个主要问题是将李维叶作为全纯叶扩展到奇点的满邻域。一般来说,这样的延伸是不存在的。然而,李维叶在非临界奇点附近总是以全纯网(有分枝的叶)的形式展开。我们还提出了表征这些奇异点的有效判据。
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