Table for CAN(6,k,22) for k up to 10000

Last Updated Fri Mar 27 17:29:25 MST 2015

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;6,k,22) 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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k N Source

7 113379904 composition

24 148035887 orthogonal array fuse

26 244140619 orthogonal array fuse fuse fuse

28 387420479 orthogonal array fuse fuse fuse fuse fuse

31 592143485 perfect hash family4,31,23,c fuse

32 688248276 perfect hash family4,35,25S3

46 714434071 double OA (Colbourn-Zhou) fuse

48 720858247 double OA (Colbourn-Zhou) fuse

49 990643831 Martirosyan-TVT variant

50 1102489571 Martirosyan-TVT

51 1102737843 Martirosyan-TVT variant

52 1166266649 Martirosyan-TVT

54 1480358681 perfect hash family10,54,23,c fuse

55 1480358860 perfect hash family10,55,24

63 1628394547 perfect hash family11,63,23,c fuse

64 1628394746 perfect hash family11,64,24

67 1776430413 perfect hash family12,67,23,c fuse

68 1776430632 perfect hash family12,68,24

69 1903843237 Add 23 factors

71 1910267413 Add 23 factors

72 2072502404 perfect hash family14,72,24

115 2220538011 perfect hash family15,115,23,c fuse

161 2333918193 Power CT23^2T16

529 2368573877 perfect hash family16,529,23,c fuse

530 2368574176 Power CT23^2+1

531 2997898102 Add 1 factors

532 3245198386 Add 2 factors

533 3565308792 Add 3 factors

553 3617935692 Power CT25^2Arc(3)

576 3714040424 Power CT25^2T1T1

600 3810145156 Power CT25^2T1

625 3906249619 perfect hash family16,625,25,c fuse fuse fuse

626 3906249888 Power CT25^2+1

627 4767214146 Add 1 factors

628 5084767998 Add 2 factors

629 5442457836 Add 3 factors

630 5507017524 Add 5 factors

631 5589990261 Add 6 factors

648 5650960895 Add 23 factors

649 5766634282 Add 23 factors

651 5768888068 Power CT27^2Arc(3)

676 5912167928 Power CT27^2T1T1

702 6055447788 Power CT27^2T1

730 6198727648 Power CT27^2+1

1009 7061067952 Martirosyan-TVT variant

1058 7063792298 Martirosyan-TVT

1059 7088272977 Martirosyan-TVT variant

1060 7112753357 Martirosyan-TVT

1062 7978136645 Martirosyan-TVT

1064 8441015369 Martirosyan-TVT

1066 8917476739 Martirosyan-TVT

1068 9040424281 Martirosyan-TVT

1104 9056596717 Martirosyan-TVT

1105 9068837917 Martirosyan-TVT variant

1106 9081079117 Martirosyan-TVT

1107 9415274559 Martirosyan-TVT variant

1128 9519193084 Power N-CT47^2T23

1147 9596025288 Power N-CT47^2Arc(3)T21

1171 9602449464 Power N-CT47^2Arc(2)T21

1196 9608873640 Power N-CT47^2T21T1

1222 9615297816 Power N-CT47^2T21

1235 9739305148 Power N-CT47^2Arc(3)T19

1261 9745729324 Power N-CT47^2Arc(2)T19

1288 9752153500 Power N-CT47^2T19T1

1316 9758577676 Power N-CT47^2T19

1333 9879786394 Power N-CT43^2T12

1339 9937603978 Power N-CT47^2Arc(4)T16

1367 9944028154 Power N-CT47^2Arc(3)T16

1396 9950452330 Power N-CT47^2Arc(2)T16

1426 9956876506 Power N-CT47^2T16T1

1457 9963300682 Power N-CT47^2T16

1852 10002076980 Power N-CT43^2+3

1861 10040622036 Power N-CT47^2Arc(8)

1901 10047046212 Power N-CT47^2Arc(7)

1942 10053470388 Power N-CT47^2Arc(6)

1984 10059894564 Power N-CT47^2Arc(5)

2027 10066318740 Power N-CT47^2Arc(4)

2071 10072742916 Power N-CT47^2Arc(3)

2116 10079167092 Power N-CT47^2T1T1

2162 10085591268 Power N-CT47^2T1

2210 10092015444 Power N-CT47^2+1

2211 11417634816 Add 1 factors

2212 11934616512 Add 2 factors

2213 12458314192 Add 3 factors

2215 12595471604 Add 5 factors

2216 12718539985 Add 6 factors

2233 12801544750 Add 23 factors

2235 13561684044 Add 25 factors

2236 14887303416 Add 25 factors

2257 15040944528 Power CT49^2Arc(3)

2304 15310730112 Power CT49^2T1T1

2352 15580515696 Power CT49^2T1

2401 15850301280 Power CT49^2

4032 16989469227 Power CT31^3T24T7T7

10000 17024125210 Power CT31^3T13T7T7

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