Table for CAN(3,k,22) for k up to 10000

Locate the k in the first column that is at least as large as the number of factors in which you are interested. Then let N be the number of rows (tests) given in the second column. A CA(N;3,k,22) exists according to a construction in the reference (cryptically) given in the third column. The accompanying graph plots N vertically against log k (base 10).

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kNSource
410648orthogonal array
510890Li-Ji-Yin
611132Ji-Yin
2412165fuse symbols
2615619fuse symbols
2819673fuse symbols
4823211Chateauneuf-Kreher doubling
5026707Chateauneuf-Kreher doubling
5228597Chateauneuf-Kreher doubling
5432693Chateauneuf-Kreher doubling
5632714Chateauneuf-Kreher doubling
9233924Colbourn-Martirosyan-Trung-Walker
11534166Colbourn-Martirosyan-Trung-Walker
13834408Colbourn-Martirosyan-Trung-Walker
14434935Cohen-Colbourn-Ling
55235441fuse symbols
59840897fuse symbols
60042165fuse symbols
62144995fuse symbols
64445017fuse symbols
65045619fuse symbols
69050755Colbourn-Martirosyan-Trung-Walker
71350777Colbourn-Martirosyan-Trung-Walker
73650799Colbourn-Martirosyan-Trung-Walker
78253175Colbourn-Martirosyan-Trung-Walker
80553197Colbourn-Martirosyan-Trung-Walker
82853219Colbourn-Martirosyan-Trung-Walker
87455771Colbourn-Martirosyan-Trung-Walker
89755793Colbourn-Martirosyan-Trung-Walker
92055815Colbourn-Martirosyan-Trung-Walker
110457071Chateauneuf-Kreher doubling
115258652Cohen-Colbourn-Ling
120062148Cohen-Colbourn-Ling
124864038Cohen-Colbourn-Ling
125066731Chateauneuf-Kreher doubling
128867122Colbourn-Martirosyan-Trung-Walker
129668134Cohen-Colbourn-Ling
134468155Cohen-Colbourn-Ling
211668332Colbourn-Martirosyan-Trung-Walker
264568574Colbourn-Martirosyan-Trung-Walker
317468816Colbourn-Martirosyan-Trung-Walker
331269343Colbourn-Martirosyan-Trung-Walker
1000069849fuse symbols
 Graph: