Wikipedia links (lmo)

This network consists of the wikilinks of the Wikipedia in the Lombard language (lmo). Nodes are Wikipedia articles, and directed edges are wikilinks, i.e., hyperlinks within one wiki. In the wiki source, these are indicated with [[double brackets]]. Only pages in the article namespace are included.

Metadata

CodeWlmo
Internal namewikipedia_link_lmo
NameWikipedia links (lmo)
Data sourcehttp://dumps.wikimedia.org/
AvailabilityDataset is available for download
Consistency checkDataset passed all tests
Category
Hyperlink network
Node meaningArticle
Edge meaningWikilink
Network formatUnipartite, directed
Edge typeUnweighted, no multiple edges
ReciprocalContains reciprocal edges
Directed cyclesContains directed cycles
LoopsContains loops

Statistics

Size n =52,214
Volume m =3,623,678
Loop count l =68
Wedge count s =1,244,592,477
Claw count z =2,176,335,844,036
Cross count x =5,074,808,504,337,287
Triangle count t =167,733,441
Square count q =54,418,968,818
Maximum degree dmax =14,746
Maximum outdegree d+max =557
Maximum indegree dmax =14,733
Average degree d =138.801
Size of LCC N =52,206
Diameter δ =9
50-Percentile effective diameter δ0.5 =2.735 74
90-Percentile effective diameter δ0.9 =3.817 61
Median distance δM =3
Mean distance δm =3.278 26
Balanced inequality ratio P =0.217 754
Outdegree balanced inequality ratio P+ =0.229 360
Indegree balanced inequality ratio P =0.211 821
Degree assortativity ρ =−0.058 519 8
Degree assortativity p-value pρ =0.000 00
In/outdegree correlation ρ± =+0.795 806
Clustering coefficient c =0.404 309
Directed clustering coefficient c± =0.972 543
Operator 2-norm ν =518.905
Cyclic eigenvalue π =497.034
Reciprocity y =0.761 063
Non-bipartivity bA =0.642 381
Normalized non-bipartivity bN =0.110 041
Algebraic non-bipartivity χ =0.170 778
Spectral bipartite frustration bK =0.000 495 641

Plots

Degree distribution

Cumulative degree distribution

Hop distribution

In/outdegree scatter plot

SynGraphy

Matrix decompositions plots

Downloads

References

[1] Jérôme Kunegis. KONECT – The Koblenz Network Collection. In Proc. Int. Conf. on World Wide Web Companion, pages 1343–1350, 2013. [ http ]