超图的Forman-ricci曲率

IF 0.7 4区 数学 Q4 MATHEMATICS, INTERDISCIPLINARY APPLICATIONS
WILMER LEAL, GUILLERMO RESTREPO, PETER F. STADLER, JÜRGEN JOST
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引用次数: 0

摘要

超图作为复杂网络的模型,可以捕获比二元关系更一般的结构。对于图表,已经设计了大量的统计数据来衡量其结构的不同方面。超图在这方面没有落后。傅尔曼-里奇曲率是一种基于黎曼几何的图的统计量,它通过关注边缘而不是顶点来强调网络中顶点的关系特征。尽管这个测度在图上有许多成功的应用,福尔曼-里奇曲率还没有被引入到超图中。在这里,我们定义了有向和无向超图的Forman-Ricci曲率,使得图的曲率作为一种特殊情况被恢复。它量化了超边缘(弧)大小和超边缘(弧)顶点在其他超边缘(弧)中的参与程度之间的权衡。在这里,我们确定了一般超图和特殊图的福尔曼-里奇曲率的上界和下界。然后将该方法应用于两个大型网络:维基百科投票网络和大肠杆菌的代谢网络。在第一种情况下,曲率由超边的大小决定,而在第二种情况下,曲率由超边度决定。我们发现,参与维基百科选举的用户数量与经验丰富的用户的参与密切相关。代谢网络的曲率值允许检测冗余和瓶颈反应。研究发现,ADP磷酸化是代谢瓶颈反应,但其反向反应并非代谢的中心。此外,我们展示了福尔曼-里奇曲率对超图中分类性量化的效用,并通过调查三个代谢网络来说明这一想法。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
FORMAN–RICCI CURVATURE FOR HYPERGRAPHS
Hypergraphs serve as models of complex networks that capture more general structures than binary relations. For graphs, a wide array of statistics has been devised to gauge different aspects of their structures. Hypergraphs lack behind in this respect. The Forman–Ricci curvature is a statistics for graphs based on Riemannian geometry, which stresses the relational character of vertices in a network by focusing on the edges rather than on the vertices. Despite many successful applications of this measure to graphs, Forman–Ricci curvature has not been introduced for hypergraphs. Here, we define the Forman–Ricci curvature for directed and undirected hypergraphs such that the curvature for graphs is recovered as a special case. It quantifies the trade-off between hyperedge (arc) size and the degree of participation of hyperedge (arc) vertices in other hyperedges (arcs). Here, we determine upper and lower bounds for Forman–Ricci curvature both for hypergraphs in general and for graphs in particular. The measure is then applied to two large networks: the Wikipedia vote network and the metabolic network of the bacterium Escherichia coli. In the first case, the curvature is governed by the size of the hyperedges, while in the second example, it is dominated by the hyperedge degree. We found that the number of users involved in Wikipedia elections goes hand-in-hand with the participation of experienced users. The curvature values of the metabolic network allowed detecting redundant and bottle neck reactions. It is found that ADP phosphorylation is the metabolic bottle neck reaction but that the reverse reaction is not similarly central for the metabolism. Furthermore, we show the utility of the Forman–Ricci curvature for quantification of assortativity in hypergraphs and illustrate the idea by investigating three metabolic networks.
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来源期刊
Advances in Complex Systems
Advances in Complex Systems 综合性期刊-数学跨学科应用
CiteScore
1.40
自引率
0.00%
发文量
121
审稿时长
6-12 weeks
期刊介绍: Advances in Complex Systems aims to provide a unique medium of communication for multidisciplinary approaches, either empirical or theoretical, to the study of complex systems. The latter are seen as systems comprised of multiple interacting components, or agents. Nonlinear feedback processes, stochastic influences, specific conditions for the supply of energy, matter, or information may lead to the emergence of new system qualities on the macroscopic scale that cannot be reduced to the dynamics of the agents. Quantitative approaches to the dynamics of complex systems have to consider a broad range of concepts, from analytical tools, statistical methods and computer simulations to distributed problem solving, learning and adaptation. This is an interdisciplinary enterprise.
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