The lifts of surfaces in neutral 4-manifolds into the 2-Grassmann bundles

IF 0.6 4区 数学 Q3 MATHEMATICS Differential Geometry and its Applications Pub Date : 2023-11-13 DOI:10.1016/j.difgeo.2023.102073
Naoya Ando
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引用次数: 4

Abstract

A twistor lift of a space-like or time-like surface in a neutral hyperKähler 4-manifold with zero mean curvature vector is given by a (para)holomorphic function, which yields (para)holomorphicity of the Gauss maps of space-like or time-like surfaces in E24 with zero mean curvature vector. For a space-like or time-like surface in an oriented neutral 4-manifold with zero mean curvature vector such that both twistor lifts belong to the kernel of the curvature tensor, its (para)complex quartic differential is holomorphic. If both twistor lifts of a time-like surface with zero mean curvature vector have light-like or zero covariant derivatives, then either the shape operator with respect to a light-like normal vector field vanishes or all the shape operators of the surface are light-like or zero. Examples with the former (resp. latter) property are given by the conformal Gauss maps of time-like surfaces of Willmore type with zero paraholomorphic quartic differential (resp. time-like surfaces in 4-dimensional neutral space forms based on the Gauss-Codazzi-Ricci equations).

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中性4-流形表面升力成2-Grassmann束
用一个(准)全纯函数给出了中性hyperKähler 4流形中平均曲率为零的类空曲面或类时曲面的一个扭转或升力,得到了E24中平均曲率为零的类空曲面或类时曲面的高斯映射的(准)全纯性。对于具有零平均曲率矢量的有向中性4流形中的类空曲面或类时曲面,使得两个扭转或提升都属于曲率张量的核,其复四次微分是全纯的。如果一个平均曲率矢量为零的类时曲面的两个扭曲或提升都有类光或零的协变导数,那么要么是关于类光法向量场的形状算子消失,要么是曲面的所有形状算子都是类光或零。前者的例子(如:后一种性质由具有零拟自纯四次微分的Willmore型时型曲面的共形高斯映射给出。基于gauss - codizzi - ricci方程的四维中性空间形式的类时曲面)。
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来源期刊
CiteScore
1.00
自引率
20.00%
发文量
81
审稿时长
6-12 weeks
期刊介绍: Differential Geometry and its Applications publishes original research papers and survey papers in differential geometry and in all interdisciplinary areas in mathematics which use differential geometric methods and investigate geometrical structures. The following main areas are covered: differential equations on manifolds, global analysis, Lie groups, local and global differential geometry, the calculus of variations on manifolds, topology of manifolds, and mathematical physics.
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