Vertex centrality of complex networks based on joint nonnegative matrix factorization and graph embedding

doi:10.1088/1674-1056/ac6867

中国物理B ›› 2023, Vol. 32 ›› Issue (1): 18903-018903.doi: 10.1088/1674-1056/ac6867

Vertex centrality of complex networks based on joint nonnegative matrix factorization and graph embedding

Pengli Lu(卢鹏丽)^† and Wei Chen(陈玮)^‡

School of Computer and Communication, Lanzhou University of Technology, Lanzhou 730050, China

收稿日期:2022-03-03 修回日期:2022-04-01 接受日期:2022-04-20 出版日期:2022-12-08 发布日期:2022-12-27
通讯作者: Pengli Lu, Wei Chen E-mail:lupengli88@163.com;chenwei_9711@163.com
基金资助:
Project supported by the National Natural Science Foundation of China (Grant Nos. 62162040 and 11861045).

Vertex centrality of complex networks based on joint nonnegative matrix factorization and graph embedding

Pengli Lu(卢鹏丽)^† and Wei Chen(陈玮)^‡

School of Computer and Communication, Lanzhou University of Technology, Lanzhou 730050, China

Received:2022-03-03 Revised:2022-04-01 Accepted:2022-04-20 Online:2022-12-08 Published:2022-12-27
Contact: Pengli Lu, Wei Chen E-mail:lupengli88@163.com;chenwei_9711@163.com
Supported by:
Project supported by the National Natural Science Foundation of China (Grant Nos. 62162040 and 11861045).

摘要/Abstract

摘要： Finding crucial vertices is a key problem for improving the reliability and ensuring the effective operation of networks, solved by approaches based on multiple attribute decision that suffer from ignoring the correlation among each attribute or the heterogeneity between attribute and structure. To overcome these problems, a novel vertex centrality approach, called VCJG, is proposed based on joint nonnegative matrix factorization and graph embedding. The potential attributes with linearly independent and the structure information are captured automatically in light of nonnegative matrix factorization for factorizing the weighted adjacent matrix and the structure matrix, which is generated by graph embedding. And the smoothness strategy is applied to eliminate the heterogeneity between attributes and structure by joint nonnegative matrix factorization. Then VCJG integrates the above steps to formulate an overall objective function, and obtain the ultimately potential attributes fused the structure information of network through optimizing the objective function. Finally, the attributes are combined with neighborhood rules to evaluate vertex's importance. Through comparative analyses with experiments on nine real-world networks, we demonstrate that the proposed approach outperforms nine state-of-the-art algorithms for identification of vital vertices with respect to correlation, monotonicity and accuracy of top-10 vertices ranking.

关键词: complex networks, centrality, joint nonnegative matrix factorization, graph embedding, smoothness strategy

Abstract: Finding crucial vertices is a key problem for improving the reliability and ensuring the effective operation of networks, solved by approaches based on multiple attribute decision that suffer from ignoring the correlation among each attribute or the heterogeneity between attribute and structure. To overcome these problems, a novel vertex centrality approach, called VCJG, is proposed based on joint nonnegative matrix factorization and graph embedding. The potential attributes with linearly independent and the structure information are captured automatically in light of nonnegative matrix factorization for factorizing the weighted adjacent matrix and the structure matrix, which is generated by graph embedding. And the smoothness strategy is applied to eliminate the heterogeneity between attributes and structure by joint nonnegative matrix factorization. Then VCJG integrates the above steps to formulate an overall objective function, and obtain the ultimately potential attributes fused the structure information of network through optimizing the objective function. Finally, the attributes are combined with neighborhood rules to evaluate vertex's importance. Through comparative analyses with experiments on nine real-world networks, we demonstrate that the proposed approach outperforms nine state-of-the-art algorithms for identification of vital vertices with respect to correlation, monotonicity and accuracy of top-10 vertices ranking.

Key words: complex networks, centrality, joint nonnegative matrix factorization, graph embedding, smoothness strategy

中图分类号: (Complex systems)

89.75.-k

Pengli Lu(卢鹏丽) and Wei Chen(陈玮). Vertex centrality of complex networks based on joint nonnegative matrix factorization and graph embedding[J]. 中国物理B, 2023, 32(1): 18903-018903.

Pengli Lu(卢鹏丽) and Wei Chen(陈玮). Vertex centrality of complex networks based on joint nonnegative matrix factorization and graph embedding[J]. Chin. Phys. B, 2023, 32(1): 18903-018903.

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Vertex centrality of complex networks based on joint nonnegative matrix factorization and graph embedding

Vertex centrality of complex networks based on joint nonnegative matrix factorization and graph embedding

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