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

Last Updated Wed Oct 21 20:46:11 MST 2009

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).

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kNSource
24529orthogonal array
26618orthogonal array fuse fuse postop NCK
27621projection (Colbourn) fuse postop NCK
28623projection (Colbourn)
29709projection (Colbourn) fuse fuse fuse postop NCK
30711projection (Colbourn) fuse fuse postop NCK
31716projection (Colbourn) fuse postop NCK
32718projection (Colbourn) postop NCK
33800projection (Colbourn) fuse fuse fuse postop NCK
34801projection (Colbourn) fuse fuse postop NCK
35804projection (Colbourn) fuse postop NCK
36805projection (Colbourn) postop NCK
37891projection (Colbourn) fuse fuse fuse postop NCK
38900projection (Colbourn) fuse fuse postop NCK
39902projection (Colbourn) fuse postop NCK
40905projection (Colbourn) postop NCK
41936projection (Colbourn) fuse postop NCK
42939projection (Colbourn) postop NCK
5751035CMMSSY 2.3
5761057CMMSSY 2.3
6001124CMMSSY 2.3
6231126CMMSSY 2.2
6721129CMMSSY 2.2
6921217CMMSSY 2.3
7281218CMMSSY 2.2
7561221CMMSSY 2.2
7841223CMMSSY 2.2
8121309CMMSSY 2.2
8401311CMMSSY 2.2
8681316CMMSSY 2.2
8961318CMMSSY 2.2
9241400CMMSSY 2.2
9521401CMMSSY 2.2
9801404CMMSSY 2.2
10081405CMMSSY 2.2
10241420CMMSSY 2.2
10361491CMMSSY 2.2
10641500CMMSSY 2.2
10921502CMMSSY 2.2
11201505CMMSSY 2.2
11521507CMMSSY 2.2
11761539CMMSSY 2.2
137771541CMMSSY 2.3
138001563CMMSSY 2.3
138241585CMMSSY 2.2
143981630CMMSSY 2.3
149271632CMMSSY 2.2
149501633CMMSSY 2.3
161281635CMMSSY 2.3
161501722CMMSSY 2.2
166061723CMMSSY 2.3
174721724CMMSSY 2.3
181441727CMMSSY 2.3
188161729CMMSSY 2.2
189281813CMMSSY 2.2
194881815CMMSSY 2.3
196561816CMMSSY 2.2
200001817CMMSSY 2.2
 Graph: