Table for CAN(3,k,18) 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,18) 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).

Go to Global Menu.

Change t: - +

Change v: - +

k N Source 4 5832 orthogonal array 5 5994 Li-Ji-Yin 6 6156 Ji-Yin 20 6857 fuse symbols 24 12157 fuse symbols 40 12943 Chateauneuf-Kreher doubling 42 18277 Chateauneuf-Kreher doubling 76 18828 Colbourn-Martirosyan-Trung-Walker 95 18990 Colbourn-Martirosyan-Trung-Walker 114 19152 Colbourn-Martirosyan-Trung-Walker 120 19511 Cohen-Colbourn-Ling 380 19853 fuse symbols 400 26710 Cohen-Colbourn-Ling 456 28015 fuse symbols 475 28837 Colbourn-Martirosyan-Trung-Walker 494 28855 Colbourn-Martirosyan-Trung-Walker 513 28873 Colbourn-Martirosyan-Trung-Walker 532 28891 Colbourn-Martirosyan-Trung-Walker 551 30529 Colbourn-Martirosyan-Trung-Walker 570 30547 Colbourn-Martirosyan-Trung-Walker 589 30565 Colbourn-Martirosyan-Trung-Walker 608 30583 Colbourn-Martirosyan-Trung-Walker 684 31123 Colbourn-Martirosyan-Trung-Walker 703 31447 Colbourn-Martirosyan-Trung-Walker 760 31719 Chateauneuf-Kreher doubling 800 32796 Cohen-Colbourn-Ling 1444 37980 Colbourn-Martirosyan-Trung-Walker 1805 38142 Colbourn-Martirosyan-Trung-Walker 2166 38304 Colbourn-Martirosyan-Trung-Walker 2280 38663 Colbourn-Martirosyan-Trung-Walker 7220 39005 fuse symbols 7581 45862 Colbourn-Martirosyan-Trung-Walker 7600 46186 Colbourn-Martirosyan-Trung-Walker 8664 50029 fuse symbols 9025 50851 Colbourn-Martirosyan-Trung-Walker 9101 50869 Colbourn-Martirosyan-Trung-Walker 9386 50905 Colbourn-Martirosyan-Trung-Walker 9500 50923 Colbourn-Martirosyan-Trung-Walker 9747 50941 Colbourn-Martirosyan-Trung-Walker 9880 50959 Colbourn-Martirosyan-Trung-Walker 10000 50977 Colbourn-Martirosyan-Trung-Walker

Graph: