Reeb graphs of circle-valued functions: A survey and basic facts

IF 0.7 4区 数学 Q2 MATHEMATICS
Irina Gelbukh
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引用次数: 0

Abstract

The Reeb graph of a circle-valued function is a topological space obtained by contracting connected components of level sets (preimages of points) to points. For some smooth functions, the Reeb graph has the structure of a finite graph. This notion finds numerous applications in the theory of dynamical systems, as well as in the topological classification of circle-valued functions and the study of their homotopy properties. However, important theoretical facts on the topological properties of the Reeb graphs of circle-valued functions are scattered across numerous papers on different topics, according to the specific needs of the corresponding application. In this paper, we systematize the existing results on the Reeb graphs of circle-valued functions and generalize some of them to wider classes of functions or spaces. We also show how some results can be carried out from real-valued functions. Finally, we adapt some facts from the theory of foliations to the Reeb graphs of circle-valued functions. In particular, we analyze the cycle rank of the Reeb graph and address the problem of realization of a finite graph as a Reeb graph.
圆值函数的Reeb图:综述与基本事实
圆值函数的Reeb图是通过将水平集(点的前像)的连通分量收缩到点而获得的拓扑空间。对于一些光滑函数,Reeb图具有有限图的结构。这一概念在动力系统理论中,以及在圆值函数的拓扑分类和对其同伦性的研究中有许多应用。然而,根据相应应用的具体需要,关于圆值函数的Reeb图的拓扑性质的重要理论事实分散在不同主题的众多论文中。本文系统化了关于圆值函数的Reeb图的现有结果,并将其中的一些结果推广到更广泛的函数或空间类。我们还展示了如何从实值函数中得到一些结果。最后,我们将叶理理论中的一些事实应用于圆值函数的Reeb图。特别地,我们分析了Reeb图的循环秩,并解决了有限图作为Reeb图实现的问题。
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
CiteScore
1.00
自引率
0.00%
发文量
57
审稿时长
>12 weeks
期刊介绍: Topological Methods in Nonlinear Analysis (TMNA) publishes research and survey papers on a wide range of nonlinear analysis, giving preference to those that employ topological methods. Papers in topology that are of interest in the treatment of nonlinear problems may also be included.
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