Wikipedia links (tg)
This network consists of the wikilinks of the Wikipedia in the Tajik language
(tg). 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
Statistics
Size  n =  110,972

Volume  m =  5,611,005

Loop count  l =  15

Wedge count  s =  4,321,710,024

Claw count  z =  26,990,031,449,250

Cross count  x =  168,647,078,354,068,864

Triangle count  t =  250,221,870

Square count  q =  82,996,488,729

4Tour count  T_{4} =  681,265,173,254

Maximum degree  d_{max} =  32,942

Maximum outdegree  d^{+}_{max} =  709

Maximum indegree  d^{−}_{max} =  32,824

Average degree  d =  101.125

Fill  p =  0.000 455 632

Size of LCC  N =  110,883

Size of LSCC  N_{s} =  22,029

Relative size of LSCC  N^{r}_{s} =  0.198 510

Diameter  δ =  11

50Percentile effective diameter  δ_{0.5} =  2.829 58

90Percentile effective diameter  δ_{0.9} =  3.956 37

Median distance  δ_{M} =  3

Mean distance  δ_{m} =  3.373 09

Gini coefficient  G =  0.805 331

Balanced inequality ratio  P =  0.168 065

Outdegree balanced inequality ratio  P_{+} =  0.178 641

Indegree balanced inequality ratio  P_{−} =  0.240 784

Relative edge distribution entropy  H_{er} =  0.877 176

Power law exponent  γ =  1.403 65

Degree assortativity  ρ =  −0.063 609 6

Degree assortativity pvalue  p_{ρ} =  0.000 00

In/outdegree correlation  ρ^{±} =  +0.870 739

Clustering coefficient  c =  0.173 696

Directed clustering coefficient  c^{±} =  0.986 384

Operator 2norm  ν =  705.891

Cyclic eigenvalue  π =  699.000

Algebraic connectivity  a =  0.043 452 3

Spectral separation  λ_{1}[A] / λ_{2}[A] =  1.571 11

Reciprocity  y =  0.855 225

Nonbipartivity  b_{A} =  0.744 885

Normalized nonbipartivity  b_{N} =  0.024 265 5

Algebraic nonbipartivity  χ =  0.043 453 4

Spectral bipartite frustration  b_{K} =  0.000 187 531

Plots
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 ]
