Information on Result #523238
There is no (6, 115, 59)-net in base 8, because extracting embedded OOA would yield OOA(8115, 59, S8, 2, 109), but
- the (dual) Plotkin bound for OOAs shows that M ≥ 5447 059212 976419 840075 699626 342456 484391 841849 274667 668876 773493 543941 830710 151419 166294 063636 548505 567232 / 55 > 8115 [i]
Mode: Bound.
Optimality
Show details for fixed k and m, k and s, k and t, m and s, m and t, t and s.
Other Results with Identical Parameters
None.
Depending Results
The following results depend on this result:
Result | This result only | Method | ||
---|---|---|---|---|
1 | No (6, 116, 59)-net in base 8 | [i] | m-Reduction | |
2 | No (6, 117, 59)-net in base 8 | [i] | ||
3 | No (6, 118, 59)-net in base 8 | [i] | ||
4 | No (6, 119, 59)-net in base 8 | [i] | ||
5 | No (6, 120, 59)-net in base 8 | [i] | ||
6 | No (6, 121, 59)-net in base 8 | [i] | ||
7 | No (6, 122, 59)-net in base 8 | [i] | ||
8 | No (6, 123, 59)-net in base 8 | [i] | ||
9 | No (6, 124, 59)-net in base 8 | [i] | ||
10 | No (6, 125, 59)-net in base 8 | [i] | ||
11 | No (6, 126, 59)-net in base 8 | [i] | ||
12 | No (6, 127, 59)-net in base 8 | [i] | ||
13 | No (6, 128, 59)-net in base 8 | [i] | ||
14 | No (6, 129, 59)-net in base 8 | [i] | ||
15 | No (6, 130, 59)-net in base 8 | [i] | ||
16 | No (6, 131, 59)-net in base 8 | [i] | ||
17 | No (6, 132, 59)-net in base 8 | [i] | ||
18 | No (6, 133, 59)-net in base 8 | [i] | ||
19 | No (6, 134, 59)-net in base 8 | [i] | ||
20 | No (6, 135, 59)-net in base 8 | [i] | ||
21 | No (6, 136, 59)-net in base 8 | [i] | ||
22 | No (6, 137, 59)-net in base 8 | [i] | ||
23 | No (6, 138, 59)-net in base 8 | [i] | ||
24 | No (6, 139, 59)-net in base 8 | [i] | ||
25 | No (6, 140, 59)-net in base 8 | [i] | ||
26 | No (6, 141, 59)-net in base 8 | [i] | ||
27 | No (6, 142, 59)-net in base 8 | [i] | ||
28 | No (6, 143, 59)-net in base 8 | [i] | ||
29 | No (6, 144, 59)-net in base 8 | [i] | ||
30 | No (6, 145, 59)-net in base 8 | [i] | ||
31 | No (6, 146, 59)-net in base 8 | [i] | ||
32 | No (6, 147, 59)-net in base 8 | [i] | ||
33 | No (6, 148, 59)-net in base 8 | [i] | ||
34 | No (6, 149, 59)-net in base 8 | [i] | ||
35 | No (6, 150, 59)-net in base 8 | [i] | ||
36 | No (6, 151, 59)-net in base 8 | [i] | ||
37 | No (6, 152, 59)-net in base 8 | [i] | ||
38 | No (6, 153, 59)-net in base 8 | [i] | ||
39 | No (6, 154, 59)-net in base 8 | [i] | ||
40 | No (6, 155, 59)-net in base 8 | [i] | ||
41 | No (6, 156, 59)-net in base 8 | [i] | ||
42 | No (6, 157, 59)-net in base 8 | [i] | ||
43 | No (6, 158, 59)-net in base 8 | [i] | ||
44 | No (6, 159, 59)-net in base 8 | [i] | ||
45 | No (6, 160, 59)-net in base 8 | [i] | ||
46 | No (6, 161, 59)-net in base 8 | [i] | ||
47 | No (6, 162, 59)-net in base 8 | [i] | ||
48 | No (6, 163, 59)-net in base 8 | [i] | ||
49 | No (6, 164, 59)-net in base 8 | [i] | ||
50 | No (6, 165, 59)-net in base 8 | [i] | ||
51 | No (6, 166, 59)-net in base 8 | [i] | ||
52 | No (6, 167, 59)-net in base 8 | [i] | ||
53 | No (6, 168, 59)-net in base 8 | [i] | ||
54 | No (6, 169, 59)-net in base 8 | [i] | ||
55 | No (6, 170, 59)-net in base 8 | [i] | ||
56 | No (6, 171, 59)-net in base 8 | [i] | ||
57 | No (6, 172, 59)-net in base 8 | [i] | ||
58 | No (6, 173, 59)-net in base 8 | [i] | ||
59 | No (6, m, 59)-net in base 8 for arbitrarily large m | [i] | m-Reduction from Arbitrarily Large Net |