复空间形式的拉普拉斯算子表征

Andrea Loi, Filippo Salis, Fabio Zuddas
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引用次数: 2

摘要

受Lu和Tian(Duke Math J 125(2):351-3872004)工作的启发,本文讨论了研究满足\(\Delta\)性质的Kähler流形的问题,即在其每个点的邻域上,Kächler-Laplacian的K次方是复欧几里得-拉普拉斯算子的多项式函数,对于所有正整数K(其定义见下文)。我们证明了两个结果:(1)如果Kähler流形满足\(\Delta)-性质,则其曲率张量是平行的;(2) 如果经典型Hermitian对称空间满足\(\Delta\)-性质,则它是一个复空间形式(即它具有常全纯截面曲率)。鉴于这些结果,我们认为如果Kähler流形满足\(\Delta\)-性质,那么它是一个复空间形式。
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A characterization of complex space forms via Laplace operators

Inspired by the work of Lu and Tian (Duke Math J 125(2):351–387, 2004), in this paper we address the problem of studying those Kähler manifolds satisfying the \(\Delta\)-property, i.e. such that on a neighborhood of each of its points the kth power of the Kähler Laplacian is a polynomial function of the complex Euclidean Laplacian, for all positive integer k (see below for its definition). We prove two results: (1) if a Kähler manifold satisfies the \(\Delta\)-property then its curvature tensor is parallel; (2) if an Hermitian symmetric space of classical type satisfies the \(\Delta\)-property then it is a complex space form (namely it has constant holomorphic sectional curvature). In view of these results we believe that if a Kähler manifold satisfies the \(\Delta\)-property then it is a complex space form.

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来源期刊
CiteScore
0.80
自引率
0.00%
发文量
7
审稿时长
>12 weeks
期刊介绍: The first issue of the "Abhandlungen aus dem Mathematischen Seminar der Universität Hamburg" was published in the year 1921. This international mathematical journal has since then provided a forum for significant research contributions. The journal covers all central areas of pure mathematics, such as algebra, complex analysis and geometry, differential geometry and global analysis, graph theory and discrete mathematics, Lie theory, number theory, and algebraic topology.
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