English

PRSim: Sublinear Time SimRank Computation on Large Power-Law Graphs

Data Structures and Algorithms 2019-05-08 v1

Abstract

{\it SimRank} is a classic measure of the similarities of nodes in a graph. Given a node uu in graph G=(V,E)G =(V, E), a {\em single-source SimRank query} returns the SimRank similarities s(u,v)s(u, v) between node uu and each node vVv \in V. This type of queries has numerous applications in web search and social networks analysis, such as link prediction, web mining, and spam detection. Existing methods for single-source SimRank queries, however, incur query cost at least linear to the number of nodes nn, which renders them inapplicable for real-time and interactive analysis. { This paper proposes \prsim, an algorithm that exploits the structure of graphs to efficiently answer single-source SimRank queries. \prsim uses an index of size O(m)O(m), where mm is the number of edges in the graph, and guarantees a query time that depends on the {\em reverse PageRank} distribution of the input graph. In particular, we prove that \prsim runs in sub-linear time if the degree distribution of the input graph follows the power-law distribution, a property possessed by many real-world graphs. Based on the theoretical analysis, we show that the empirical query time of all existing SimRank algorithms also depends on the reverse PageRank distribution of the graph.} Finally, we present the first experimental study that evaluates the absolute errors of various SimRank algorithms on large graphs, and we show that \prsim outperforms the state of the art in terms of query time, accuracy, index size, and scalability.

Keywords

Cite

@article{arxiv.1905.02354,
  title  = {PRSim: Sublinear Time SimRank Computation on Large Power-Law Graphs},
  author = {Zhewei Wei and Xiaodong He and Xiaokui Xiao and Sibo Wang and Yu Liu and Xiaoyong Du and Ji-Rong Wen},
  journal= {arXiv preprint arXiv:1905.02354},
  year   = {2019}
}

Comments

ACM SIGMOD 2019

R2 v1 2026-06-23T08:58:48.554Z