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KONECT > Networks > Stanford

Stanford

About this network

This is the directed network of hyperlinks between the web pages from the website of the Stanford University.

Network info

CodeSF
Category Hyperlink
Date of origin2002
Data source http://snap.stanford.edu/data/web-Stanford.html
Vertex type Webpage
Edge type Hyperlink
FormatDirected: Edges are directed Directed
Edge weightsUnweighted: Simple edges Unweighted
Size281,903 vertices (webpages)
Volume2,312,497 edges (hyperlinks)
Average degree (overall)16.406 edges / vertex
Fill2.9099 10–5 edges / vertex2
Maximum degree38,626 edges
Reciprocity27.7%
Size of LCC255,265 vertices
Size of LSCC150,532 vertices
Wedge count3,944,069,093
Claw count25,253,733,860,230
Triangle count11,329,473
Square count13,316,840,570
4-tour count122,314,986,204
Power law exponent (estimated) with dmin2.1310 (dmin = 5)
Gini coefficient60.9%
Relative edge distribution entropy89.4%
Assortativity–0.11244
Clustering coefficient0.862%
Diameter164 edges
90-percentile effective diameter8.79 edges
Mean shortest path length6.36 edges
Spectral norm449.57
Algebraic connectivity0.00017169
Degree distribution of the Stanford network
Degree distribution
Outdegree distribution of the Stanford network
Outdegree distribution
Indegree distribution of the Stanford network
Indegree distribution
Degree distribution of the Stanford network
Degree distribution
Outdegree distribution of the Stanford network
Outdegree distribution
Indegree distribution of the Stanford network
Indegree distribution
Degree distribution of the Stanford network
Degree distribution
Outdegree distribution of the Stanford network
Outdegree distribution
Indegree distribution of the Stanford network
Indegree distribution
Clustering coefficient distribution of the Stanford network
Clustering coefficient distribution
Distance distribution of the Stanford network
Distance distribution
Distance distribution on a logistic scale of the Stanford network
Distance distribution on a logistic scale
Top-k eigenvalues of A of the Stanford network
Top-k eigenvalues of A
Top-k eigenvalues of L of the Stanford network
Top-k eigenvalues of L
Spectral distribution of the eigenvalues of A of the Stanford network
Spectral distribution of the eigenvalues of A
Spectral distribution of the eigenvalues of N of the Stanford network
Spectral distribution of the eigenvalues of N
Spectral distribution of the eigenvalues of L of the Stanford network
Spectral distribution of the eigenvalues of L
Cumulative spectral distribution of A of the Stanford network
Cumulative spectral distribution of A
Cumulative spectral distribution of N of the Stanford network
Cumulative spectral distribution of N
Cumulative spectral distribution of L of the Stanford network
Cumulative spectral distribution of L
Complex eigenvalues of the asymmetric adjacency matrix of the Stanford network
Complex eigenvalues of the asymmetric adjacency matrix

Downloads

TSV file:downloadweb-Stanford.tar.bz2 (7.05 MiB)
Extraction code:downloadsnap.tar.bz2 (20.04 KiB)

References

[1] Stanford network dataset -- KONECT, April 2017. [ http ]
[2] Jure Leskovec, Kevin Lang, Anirban Dasgupta, and Michael W. Mahoney. Community structure in large networks: Natural cluster sizes and the absence of large well-defined clusters. Internet Mathematics, 6(1):29--123, 2009.

BibTeX