Centrality measures for graphons: Accounting for uncertainty in networks
July 28, 2017 Β· Declared Dead Β· π IEEE Transactions on Network Science and Engineering
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Authors
Marco Avella-Medina, Francesca Parise, Michael T. Schaub, Santiago Segarra
arXiv ID
1707.09350
Category
cs.SI: Social & Info Networks
Cross-listed
eess.SY,
math.ST,
physics.soc-ph,
stat.ML
Citations
91
Venue
IEEE Transactions on Network Science and Engineering
Last Checked
4 months ago
Abstract
As relational datasets modeled as graphs keep increasing in size and their data-acquisition is permeated by uncertainty, graph-based analysis techniques can become computationally and conceptually challenging. In particular, node centrality measures rely on the assumption that the graph is perfectly known -- a premise not necessarily fulfilled for large, uncertain networks. Accordingly, centrality measures may fail to faithfully extract the importance of nodes in the presence of uncertainty. To mitigate these problems, we suggest a statistical approach based on graphon theory: we introduce formal definitions of centrality measures for graphons and establish their connections to classical graph centrality measures. A key advantage of this approach is that centrality measures defined at the modeling level of graphons are inherently robust to stochastic variations of specific graph realizations. Using the theory of linear integral operators, we define degree, eigenvector, Katz and PageRank centrality functions for graphons and establish concentration inequalities demonstrating that graphon centrality functions arise naturally as limits of their counterparts defined on sequences of graphs of increasing size. The same concentration inequalities also provide high-probability bounds between the graphon centrality functions and the centrality measures on any sampled graph, thereby establishing a measure of uncertainty of the measured centrality score. The same concentration inequalities also provide high-probability bounds between the graphon centrality functions and the centrality measures on any sampled graph, thereby establishing a measure of uncertainty of the measured centrality score.
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