The second fundamental form of the real Kaehler submanifolds

IF 0.6 3区数学 Q3 MATHEMATICS

Canadian Journal of Mathematics-Journal Canadien De Mathematiques Pub Date : 2023-10-18 DOI:10.4153/s0008414x23000615

Sergio Chion, Marcos Dajczer

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引用次数: 0

Abstract

Abstract Let $f\colon M^{2n}\to \mathbb {R}^{2n+p}$ , $2\leq p\leq n-1$ , be an isometric immersion of a Kaehler manifold into Euclidean space. Yan and Zheng (2013, Michigan Mathematical Journal 62, 421–441) conjectured that if the codimension is $p\leq 11$ , then, along any connected component of an open dense subset of $M^{2n}$ , the submanifold is as follows: it is either foliated by holomorphic submanifolds of dimension at least $2n-2p$ with tangent spaces in the kernel of the second fundamental form whose images are open subsets of affine vector subspaces, or it is embedded holomorphically in a Kaehler submanifold of $\mathbb {R}^{2n+p}$ of larger dimension than $2n$ . This bold conjecture was proved by Dajczer and Gromoll just for codimension 3 and then by Yan and Zheng for codimension 4. In this paper, we prove that the second fundamental form of the submanifold behaves pointwise as expected in case that the conjecture is true. This result is a first fundamental step for a possible classification of the nonholomorphic Kaehler submanifolds lying with low codimension in Euclidean space. A counterexample shows that our proof does not work for higher codimension, indicating that proposing $p=11$ in the conjecture as the largest codimension is appropriate.

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实际Kaehler子流形的第二种基本形式

摘要设$f\colon M^{2n}\to \mathbb {R}^{2n+p}$, $2\leq p\leq n-1$是一个Kaehler流形在欧几里得空间中的等距浸没。Yan和Zheng (2013, Michigan Mathematical Journal 62, 421-441)推测，如果余维数为$p\leq 11$，则沿$M^{2n}$的开密集子集的任何连通分量，子流形如下:它要么被维数至少为$2n-2p$的全纯子流形片化，其切线空间在第二基本形式的核中，其像是仿射向量子空间的开子集，要么被全纯嵌入到维数大于$2n$的$\mathbb {R}^{2n+p}$的Kaehler子流形中。这个大胆的猜想由Dajczer和Gromoll为余维3证明，然后由Yan和Zheng为余维4证明。本文证明了在该猜想成立的情况下，子流形的第二基本形式表现为点态。这一结果为欧几里德空间中低余维非全纯Kaehler子流形的分类奠定了基础。一个反例表明，我们的证明并不适用于更高的余维，这表明在猜想中提出$p=11$作为最大的余维是合适的。

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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来源期刊

Canadian Journal of Mathematics-Journal Canadien De Mathematiques 数学-数学

CiteScore

1.80

自引率

0.00%

发文量

审稿时长

4.5 months

期刊介绍： The Canadian Journal of Mathematics (CJM) publishes original, high-quality research papers in all branches of mathematics. The Journal is a flagship publication of the Canadian Mathematical Society and has been published continuously since 1949. New research papers are published continuously online and collated into print issues six times each year. To be submitted to the Journal, papers should be at least 18 pages long and may be written in English or in French. Shorter papers should be submitted to the Canadian Mathematical Bulletin. Le Journal canadien de mathématiques (JCM) publie des articles de recherche innovants de grande qualité dans toutes les branches des mathématiques. Publication phare de la Société mathématique du Canada, il est publié en continu depuis 1949. En ligne, la revue propose constamment de nouveaux articles de recherche, puis les réunit dans des numéros imprimés six fois par année. Les textes présentés au JCM doivent compter au moins 18 pages et être rédigés en anglais ou en français. C’est le Bulletin canadien de mathématiques qui reçoit les articles plus courts.