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.
Metadata
Statistics
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 | |λ1[A] / λ2[A]| = | 1.804 18
|
Controllability | C = | 39,631
|
Relative controllability | Cr = | 0.987 098
|
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 ]
|
[2]
|
Wikimedia Foundation.
Wikimedia downloads.
http://dumps.wikimedia.org/, January 2010.
|