高效Top-k边结构多样性搜索

Qi Zhang, Ronghua Li, Qixuan Yang, Guoren Wang, Lu Qin
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引用次数: 7

摘要

边缘的结构多样性是通过边缘自我网络的连接组成部分的数量来衡量的,最近被认为是分析社会网络中社会影响和信息扩散的关键指标。鉴于此,社会网络分析中的一个重要问题是识别具有最高结构多样性的top-k边。在这项工作中,我们首次对大图上的top-k边结构多样性搜索问题进行了系统的研究。具体来说,我们首先开发了一个带有两个基本上限规则的新的在线搜索框架来有效地解决这个问题。然后,我们提出了一种新的索引结构,利用近线性空间在近最优时间内处理top-k边结构多样性搜索。为了创建这样一个索引结构,我们基于我们的问题和4团枚举问题之间的有趣联系设计了一个有效的算法。此外,我们还提出了有效的索引维护技术来处理动态图。在五个大型真实数据集上进行的大量实验结果证明了我们的算法的效率、可扩展性和有效性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Efficient Top-k Edge Structural Diversity Search
The structural diversity of an edge, which is measured by the number of connected components of the edge’s ego-network, has recently been recognized as a key metric for analyzing social influence and information diffusion in social networks. Given this, an important problem in social network analysis is to identify top-k edges that have the highest structural diversities. In this work, we for the first time perform a systematical study for the top-k edge structural diversity search problem on large graphs. Specifically, we first develop a new online search framework with two basic upper-bounding rules to efficiently solve this problem. Then, we propose a new index structure using near-linear space to process the top-k edge structural diversity search in near-optimal time. To create such an index structure, we devise an efficient algorithm based on an interesting connection between our problem and the 4-clique enumeration problem. In addition, we also propose efficient index maintenance techniques to handle dynamic graphs. The results of extensive experiments on five large real-life datasets demonstrate the efficiency, scalability, and effectiveness of our algorithms.
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