2016
DOI: 10.1073/pnas.1611275114
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Block models and personalized PageRank

Abstract: Methods for ranking the importance of nodes in a network have a rich history in machine learning and across domains that analyze structured data. Recent work has evaluated these methods through the "seed set expansion problem": given a subset S of nodes from a community of interest in an underlying graph, can we reliably identify the rest of the community? We start from the observation that the most widely used techniques for this problem, personalized PageRank and heat kernel methods, operate in the space of … Show more

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Cited by 65 publications
(71 citation statements)
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“…Breaking the symmetry that was imposed by Kloumann et al . () reveals additional insight. In particular, given a seed node in the first block, we show that PPR is likely to contain high degree nodes outside that block.…”
Section: Introductionmentioning
confidence: 88%
See 1 more Smart Citation
“…Breaking the symmetry that was imposed by Kloumann et al . () reveals additional insight. In particular, given a seed node in the first block, we show that PPR is likely to contain high degree nodes outside that block.…”
Section: Introductionmentioning
confidence: 88%
“…Kloumann et al . () used such a scenario. As a by‐product of our analysis, we extend their results under the DCSBM with the symmetric conditions (see the on‐line supplementary materials section S3 to the paper).…”
Section: Population Analysis Of Pagerankmentioning
confidence: 99%
“…The entire personalized PageRank matrix, formed with each column starting from the corresponding vertex, has been shown asymptotically to recover the stochastic block model used here as a test case [49].…”
Section: Dynamic Algorithms For Centrality Measuresmentioning
confidence: 97%
“…Network eigenvector centrality [33,34] is often used to describe the importance of nodes in social network. In 1998, Brin and Page [35,36] simplified the eigenvector centrality for undirected network into PageRank algorithm ( ), which is widely used in searching engine Google [36] and many other directed networks [37][38][39][40][41][42]. By Choose the origin node 1: (a) the process of splitting and random walking could be repeated an infinite number of times, because origin node 1 is connected to node 2; (b) the ball can walk randomly an infinite number of times without split since the origin node is one of the directed loop; (c) the ball split and walk randomly only once; (d) the ball can only walk twice without splitting; (e) the ball can walk an infinite number of times without split.…”
Section: Introductionmentioning
confidence: 99%
“…The computation of both closeness centrality and betweenness centrality are so complicated that big networks often need fast approximate algorithm [46][47][48]. Even though the eigenvector centrality on undirected network and the PageRank on directed work can give satisfying results in nodes sorting, those two methods often involve expensive computations, such as iterations [42]. In the following paragraphs, we will define several novel centrality metrics, which are cheaper in computation compared with closeness centrality, betweenness centrality, eigenvector centrality on undirected network, and PageRank on directed network.…”
Section: Introductionmentioning
confidence: 99%