Wiktionary edits (ky)

This is the bipartite edit network of the Kyrgyz Wiktionary. It contains users and pages from the Kyrgyz Wiktionary, connected by edit events. Each edge represents an edit. The dataset includes the timestamp of each edit.


Internal nameedit-kywiktionary
NameWiktionary edits (ky)
Data sourcehttp://dumps.wikimedia.org/
AvailabilityDataset is available for download
Consistency checkDataset passed all tests
Authorship network
Dataset timestamp 2017-10-20
Node meaningUser, article
Edge meaningEdit
Network formatBipartite, undirected
Edge typeUnweighted, multiple edges
Temporal data Edges are annotated with timestamps


Size n =54,082
Left size n1 =269
Right size n2 =53,813
Volume m =106,433
Unique edge count m̿ =76,455
Wedge count s =458,195,200
Claw count z =2,765,377,373,963
Cross count x =14,142,643,929,493,838
Square count q =73,258,795
4-Tour count T4 =2,419,004,378
Maximum degree dmax =26,107
Maximum left degree d1max =26,107
Maximum right degree d2max =112
Average degree d =3.935 99
Average left degree d1 =395.662
Average right degree d2 =1.977 83
Fill p =0.005 281 61
Average edge multiplicity m̃ =1.392 10
Size of LCC N =39,856
Diameter δ =14
50-Percentile effective diameter δ0.5 =3.098 89
90-Percentile effective diameter δ0.9 =3.862 58
Median distance δM =4
Mean distance δm =3.163 07
Gini coefficient G =0.750 594
Balanced inequality ratio P =0.200 821
Left balanced inequality ratio P1 =0.053 282 3
Right balanced inequality ratio P2 =0.298 131
Relative edge distribution entropy Her =0.666 904
Power law exponent γ =3.341 57
Tail power law exponent γt =3.431 00
Tail power law exponent with p γ3 =3.431 00
p-value p =0.000 00
Left tail power law exponent with p γ3,1 =1.421 00
Left p-value p1 =0.041 000 0
Right tail power law exponent with p γ3,2 =3.701 00
Right p-value p2 =0.000 00
Degree assortativity ρ =−0.611 963
Degree assortativity p-value pρ =0.000 00
Spectral norm α =340.557
Algebraic connectivity a =0.017 029 4
Spectral separation 1[A] / λ2[A]| =1.804 18
Controllability C =39,631
Relative controllability Cr =0.987 098


Fruchterman–Reingold graph drawing

Degree distribution

Cumulative degree distribution

Lorenz curve

Spectral distribution of the adjacency matrix

Spectral distribution of the normalized adjacency matrix

Spectral distribution of the Laplacian

Spectral graph drawing based on the adjacency matrix

Spectral graph drawing based on the Laplacian

Spectral graph drawing based on the normalized adjacency matrix

Degree assortativity

Zipf plot

Hop distribution

Double Laplacian graph drawing

Delaunay graph drawing

Edge weight/multiplicity distribution

Temporal distribution

Temporal hop distribution

Diameter/density evolution

Matrix decompositions plots



[1] Jérôme Kunegis. KONECT – The Koblenz Network Collection. In Proc. Int. Conf. on World Wide Web Companion, pages 1343–1350, 2013. [ http ]
[2] Wikimedia Foundation. Wikimedia downloads. http://dumps.wikimedia.org/, January 2010.