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Wedge Sampling for Computing Clustering Coefficients and Triangle Counts on Large Graphs
Graphs are used to model interactions in a variety of contexts, and there is
a growing need to quickly assess the structure of such graphs. Some of the most
useful graph metrics are based on triangles, such as those measuring social
cohesion. Algorithms to compute them can be extremely expensive, even for
moderately-sized graphs with only millions of edges. Previous work has
considered node and edge sampling; in contrast, we consider wedge sampling,
which provides faster and more accurate approximations than competing
techniques. Additionally, wedge sampling enables estimation local clustering
coefficients, degree-wise clustering coefficients, uniform triangle sampling,
and directed triangle counts. Our methods come with provable and practical
probabilistic error estimates for all computations. We provide extensive
results that show our methods are both more accurate and faster than
state-of-the-art alternatives.Comment: Full version of SDM 2013 paper "Triadic Measures on Graphs: The Power
of Wedge Sampling" (arxiv:1202.5230
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