MinT - Information on Result #279132

Information on Result #279132

There is no OOA(2²³⁰, 60, S₂, 4, 182), because the LP bound with quadratic polynomials shows that MÂ â‰¥ 322656 641712 458857 062574 836561 450939 902089 344448 965571 453848 007462 617088 / 183 > 2²³⁰

Mode: Bound.

Optimality

Show details for fixed k and m, n and k, k and s, k and t, n and m, m and s, m and t, n and s, n and t.

Other Results with Identical Parameters

None.

Depending Results

The following results depend on this result:

	Result		Method
1	No OOA(2²³¹, 61, S₂, 4, 183)	[i]	Truncation for OOAs
2	No OOA(2²³¹, 60, S₂, 5, 183)	[i]	m-Reduction for OOAs
3	No OOA(2²³⁵, 60, S₂, 5, 187)	[i]
4	No OOA(2²³⁶, 60, S₂, 5, 188)	[i]
5	No OOA(2²³⁷, 60, S₂, 5, 189)	[i]
6	No OOA(2²³⁸, 60, S₂, 5, 190)	[i]
7	No OOA(2²³⁹, 60, S₂, 5, 191)	[i]
8	No OOA(2²⁴⁰, 60, S₂, 5, 192)	[i]
9	No OOA(2²⁴¹, 60, S₂, 5, 193)	[i]
10	No OOA(2²⁴², 60, S₂, 5, 194)	[i]
11	No OOA(2²⁴³, 60, S₂, 5, 195)	[i]
12	No OOA(2²⁴⁴, 60, S₂, 5, 196)	[i]
13	No OOA(2²⁴⁵, 60, S₂, 5, 197)	[i]
14	No OOA(2²⁴⁶, 60, S₂, 5, 198)	[i]
15	No OOA(2²⁴⁷, 60, S₂, 5, 199)	[i]
16	No OOA(2²⁴⁸, 60, S₂, 5, 200)	[i]
17	No OOA(2²⁴⁹, 60, S₂, 5, 201)	[i]
18	No OOA(2²⁵⁰, 60, S₂, 5, 202)	[i]
19	No OOA(2²⁵¹, 60, S₂, 5, 203)	[i]
20	No OOA(2²⁵², 60, S₂, 5, 204)	[i]
21	No OOA(2²⁵³, 60, S₂, 5, 205)	[i]
22	No OOA(2²⁵⁴, 60, S₂, 5, 206)	[i]
23	No OOA(2²⁵⁵, 60, S₂, 5, 207)	[i]
24	No OOA(2²⁵⁶, 60, S₂, 5, 208)	[i]
25	No OOA(2²⁵⁷, 60, S₂, 5, 209)	[i]
26	No OOA(2²⁵⁸, 60, S₂, 5, 210)	[i]
27	No OOA(2²⁵⁹, 60, S₂, 5, 211)	[i]
28	No OOA(2²⁶⁰, 60, S₂, 5, 212)	[i]
29	No OOA(2²³⁰, 60, S₂, 5, 182)	[i]	Depth Reduction
30	No OOA(2²³⁰, 60, S₂, 6, 182)	[i]
31	No OOA(2²³⁰, 60, S₂, 7, 182)	[i]
32	No OOA(2²³⁰, 60, S₂, 8, 182)	[i]
33	No (48, 230, 60)-net in base 2	[i]	Extracting Embedded OOA