Table for CAN(2,k,23) for k up to 20000

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;2,k,23) 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

24 529 orthogonal array

26 620 orthogonal array

27 622 fuse symbols

28 623 projection (Colbourn)

30 723 fuse symbols

31 724 fuse symbols

32 725 projection (Colbourn)

34 833 fuse symbols

35 834 fuse symbols

36 835 projection (Colbourn)

38 951 fuse symbols

39 952 fuse symbols

40 953 projection (Colbourn)

41 1014 fuse symbols

42 1015 projection (Colbourn)

575 1035 CMMSSY 2.3

576 1057 CMMSSY 2.3

623 1126 CMMSSY 2.3

648 1128 CMMSSY 2.3

672 1129 CMMSSY 2.2

675 1217 CMMSSY 2.2

702 1219 CMMSSY 2.2

728 1220 CMMSSY 2.2

729 1221 CMMSSY 2.2

756 1222 CMMSSY 2.2

784 1223 CMMSSY 2.2

806 1321 CMMSSY 2.2

832 1322 CMMSSY 2.2

840 1323 CMMSSY 2.2

868 1324 CMMSSY 2.2

896 1325 CMMSSY 2.2

900 1423 CMMSSY 2.2

930 1424 CMMSSY 2.2

961 1425 CMMSSY 2.2

992 1426 CMMSSY 2.2

1024 1427 CMMSSY 2.2

1054 1534 CMMSSY 2.2

1088 1535 CMMSSY 2.2

1120 1536 CMMSSY 2.2

1152 1537 CMMSSY 2.2

13777 1541 CMMSSY 2.3

13800 1563 CMMSSY 2.3

14927 1632 CMMSSY 2.3

15525 1634 CMMSSY 2.3

16128 1635 CMMSSY 2.3

16173 1723 CMMSSY 2.2

16821 1725 CMMSSY 2.3

17472 1726 CMMSSY 2.2

17496 1727 CMMSSY 2.3

18144 1728 CMMSSY 2.2

18816 1729 CMMSSY 2.2

18928 1817 CMMSSY 2.2

18954 1818 CMMSSY 2.2

19656 1819 CMMSSY 2.2

20000 1820 CMMSSY 2.2

Graph: