Table for CAN(2,k,8) 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,8) 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
964orthogonal array
1072Lobb
1178group 1-rotational (Meagher-Stevens, Colbourn)
1285group 1-rotational (Meagher-Stevens, Colbourn)
1392group 1-rotational (Meagher-Stevens, Colbourn)
1499group 1-rotational (Meagher-Stevens, Colbourn)
15106group 1-rotational (Meagher-Stevens, Colbourn)
16110tabu search (Zekaoui)
17111simulated annealing (Cohen)
18115simulated annealing (Cohen)
19117simulated annealing (Cohen)
80120CMMSSY 2.3
81127CMMSSY 2.3
90134CMMSSY 2.3
99136CMMSSY 2.2
107141CMMSSY 2.3
110144CMMSSY 2.2
116148CMMSSY 2.3
121150CMMSSY 2.2
125155CMMSSY 2.3
132157CMMSSY 2.2
143162CMMSSY 2.2
151167CMMSSY 2.3
155169CMMSSY 2.2
160171CMMSSY 2.3
170173CMMSSY 2.3
712176CMMSSY 2.3
720183CMMSSY 2.3
728184CMMSSY 2.3
808190CMMSSY 2.3
891192CMMSSY 2.3
952197CMMSSY 2.3
990200CMMSSY 2.3
1032204CMMSSY 2.3
1089206CMMSSY 2.3
1100208CMMSSY 2.2
1112211CMMSSY 2.3
1188213CMMSSY 2.2
1210214CMMSSY 2.2
1273218CMMSSY 2.2
1331220CMMSSY 2.2
1344223CMMSSY 2.3
1380225CMMSSY 2.2
1452227CMMSSY 2.2
1512229CMMSSY 2.3
6336232CMMSSY 2.3
6408239CMMSSY 2.3
6472240CMMSSY 2.3
7184246CMMSSY 2.3
7920248CMMSSY 2.3
8472253CMMSSY 2.3
8800256CMMSSY 2.3
9184260CMMSSY 2.3
9680262CMMSSY 2.3
9801264CMMSSY 2.2
9896267CMMSSY 2.3
10593269CMMSSY 2.3
10890272CMMSSY 2.2
11328274CMMSSY 2.2
11484276CMMSSY 2.3
11770277CMMSSY 2.2
11979278CMMSSY 2.2
12280281CMMSSY 2.2
12947283CMMSSY 2.3
13456285CMMSSY 2.3
20000288CMMSSY 2.3
 Graph: