基于矩阵函数的中心性度量

Lembris L Njotto
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引用次数: 2

摘要

网络自然被认为是一个广泛的不同背景,如生物系统、社会关系以及各种技术场景。研究网络中发生的动态现象,确定网络和社区的结构,以及描述网络中各种元素之间的相互作用,是网络分析的关键问题。巨大的网络结构挑战之一是识别在网络中具有突出结构位置的节点。实现这一点的常用方法是计算一个中心性度量。我们研究了无向网络的节点中心性度量,如度、贴近度、特征向量、Katz和子图中心性。我们展示了如何通过考虑极限情况将Katz中心性转化为度和特征向量中心性。一些现有的中心性度量与矩阵函数有关。我们扩展了这一思想,并研究了基于一般矩阵函数的中心性度量,特别是对数、余弦、正弦和双曲函数。我们还探讨了广义卡茨中心性的概念。针对使用随机图模型生成的不同网络进行了各种实验。结果表明,对数函数尤其具有作为中心性度量的潜力。对于真实世界的网络也获得了类似的结果。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Centrality Measures Based on Matrix Functions
Network is considered naturally as a wide range of different contexts, such as biological systems, social relationships as well as various technological scenarios. Investigation of the dynamic phenomena taking place in the network, determination of the structure of the network and community and description of the interactions between various elements of the network are the key issues in network analysis. One of the huge network structure challenges is the identification of the node(s) with an outstanding structural position within the network. The popular method for doing this is to calculate a measure of centrality. We examine node centrality measures such as degree, closeness, eigenvector, Katz and subgraph centrality for undirected networks. We show how the Katz centrality can be turned into degree and eigenvector centrality by considering limiting cases. Some existing centrality measures are linked to matrix functions. We extend this idea and examine the centrality measures based on general matrix functions and in particular, the logarithmic, cosine, sine, and hyperbolic functions. We also explore the concept of generalised Katz centrality. Various experiments are conducted for different networks generated by using random graph models. The results show that the logarithmic function in particular has potential as a centrality measure. Similar results were obtained for real-world networks.
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