Maximizing Network Degree Correlation through Degree-Preserving Rewiring

The core message of this article is to propose efficient methods to maximize the degree correlation of a network through a limited number of degree-preserving rewirings.

The article focuses on the problem of maximizing the degree correlation of a network through a finite number of rewirings, using the assortativity coefficient as the measure. The authors analyze the changes in the assortativity coefficient under degree-preserving rewiring and establish its relationship with the s-metric. They prove that under their assumptions, the problem is monotonic and submodular, leading to the proposal of the GA (Greedy Assortative) method to enhance network degree correlation. The authors also introduce three heuristic rewiring strategies, EDA (Edge Difference Assortative), TA (Targeted Assortative), and PEA (Probability Edge Assortative), and demonstrate their applicability to different types of networks. Furthermore, the authors extend the application of their proposed rewiring strategies to investigate their impact on several spectral robustness metrics based on the adjacency matrix, revealing that GA effectively improves network robustness, while TA and PEA perform well in enhancing the robustness of power and routing networks, respectively. Finally, the authors explore the robustness of several centrality metrics in the network while enhancing network degree correlation using the GA method, finding that in disassortative real networks, closeness centrality and eigenvector centrality are typically robust, and all centrality metrics remain robust when focusing on the top-ranked nodes.

The degree sequence of a network is a significant characteristic, and altering network degree correlation through degree-preserving rewiring poses an interesting problem. The assortativity coefficient, denoted as r, is the Pearson correlation coefficient between the degrees of connected nodes in the network. The s-metric, proposed by Li et al., is obtained by calculating the product of the degrees of connected nodes.

"Degree correlation is a crucial measure in networks, significantly impacting network topology and dynamical behavior." "The degree sequence of a network is a significant characteristic, and altering network degree correlation through degree-preserving rewiring poses an interesting problem." "Degree correlation is an important concept in network analysis. For example, degree correlation in social networks may reflect the idea that popular individuals tend to know other popular individuals."