Table for CAN(3,k,21) 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,21) 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).

Change t: - +

Change v: - +

k N Source

6 9261 orthogonal array (Ji-Yin)

24 12163 fuse symbols

26 15617 fuse symbols

28 19671 fuse symbols

48 22643 Chateauneuf-Kreher doubling

50 26137 Chateauneuf-Kreher doubling

52 26157 Chateauneuf-Kreher doubling

54 32031 Chateauneuf-Kreher doubling

56 32051 Chateauneuf-Kreher doubling

138 32537 Colbourn-Martirosyan-Trung-Walker

144 33062 Cohen-Colbourn-Ling

552 35439 fuse symbols

598 40895 fuse symbols

600 42163 fuse symbols

621 44993 fuse symbols

644 45015 fuse symbols

650 45617 fuse symbols

690 50187 Colbourn-Martirosyan-Trung-Walker

713 50209 Colbourn-Martirosyan-Trung-Walker

736 50231 Colbourn-Martirosyan-Trung-Walker

782 52607 Colbourn-Martirosyan-Trung-Walker

805 52629 Colbourn-Martirosyan-Trung-Walker

828 52651 Colbourn-Martirosyan-Trung-Walker

874 55203 Colbourn-Martirosyan-Trung-Walker

897 55225 Colbourn-Martirosyan-Trung-Walker

920 55247 Colbourn-Martirosyan-Trung-Walker

1104 55979 Chateauneuf-Kreher doubling

1152 58082 Cohen-Colbourn-Ling

1196 60565 Colbourn-Martirosyan-Trung-Walker

1200 61576 Cohen-Colbourn-Ling

1248 61596 Cohen-Colbourn-Ling

1250 65635 Chateauneuf-Kreher doubling

1288 65655 Chateauneuf-Kreher doubling

1300 66257 Chateauneuf-Kreher doubling

3174 66945 Colbourn-Martirosyan-Trung-Walker

3312 67470 Colbourn-Martirosyan-Trung-Walker

3456 68501 Cohen-Colbourn-Ling

10000 69847 fuse symbols

Graph: