Table for CAN(3,k,24) for k up to 10000

Last Updated Tue Nov 18 04:23:58 MST 2014

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,24) 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
613824orthogonal array (Ji-Yin)
1115180ordered design (CCL)
1315598orthogonal array fuse postop NCK
1415599orthogonal array fuse postop NCK
1515600orthogonal array fuse postop NCK
2615623orthogonal array fuse
2719631orthogonal array fuse fuse fuse postop NCK
2819633orthogonal array fuse fuse fuse postop NCK
2924122orthogonal array fuse fuse fuse fuse fuse postop NCK
3024127orthogonal array fuse fuse fuse fuse fuse postop NCK
3229209orthogonal array fuse fuse fuse fuse fuse fuse fuse postop NCK
3429883Chateauneuf-Kreher doubling
4429906Chateauneuf-Kreher doubling
5229929Chateauneuf-Kreher doubling
65131247Raaphorst-Moura-Stevens fuse
75739359Raaphorst-Moura-Stevens fuse fuse fuse
87148767Raaphorst-Moura-Stevens fuse fuse fuse fuse fuse
89458755Chateauneuf-Kreher doubling
115058778Chateauneuf-Kreher doubling
130258801Chateauneuf-Kreher doubling
135466936Chateauneuf-Kreher doubling
140666959Chateauneuf-Kreher doubling
145667488Chateauneuf-Kreher doubling
145867511Chateauneuf-Kreher doubling
151268017Chateauneuf-Kreher doubling
151468983Chateauneuf-Kreher doubling
155471981Cohen-Colbourn-Ling
201072004Cohen-Colbourn-Ling
262872027Cohen-Colbourn-Ling
338472050Cohen-Colbourn-Ling
385872073Cohen-Colbourn-Ling
390672096Cohen-Colbourn-Ling
451273406Cohen-Colbourn-Ling
514473429Cohen-Colbourn-Ling
520873452Cohen-Colbourn-Ling
585974477Cohen-Colbourn-Ling
715075227Cohen-Colbourn-Ling
845075645Cohen-Colbourn-Ling
910075646Cohen-Colbourn-Ling
1000075647Colbourn-Martirosyan-Trung-Walker
 Graph: