Constructions for C4[ 420, 9 ] = {4,4}_<26,16>
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On this page are all constructions for C4[ 420, 9 ]. See Glossary for some
detail.
{4, 4}_< 26, 16> = PS( 42, 20; 9) = MPS( 42, 20; 1)
= PS( 10, 84; 41) = MPS( 10, 84; 1) = PS( 4,105; 41)
= PS( 4,210; 41) = R_210( 82, 1) = R_210(128, 1)
= BC_210( 0, 2,147, 65) = PL(MC3( 6, 35, 1, 29, 29, 5, 1), [10^21, 42^5])
= PL(MC3( 14, 15, 1, 4, 4, 10, 1), [10^21, 42^5])
= PL(BC_105({ 0, 65 }, { 1, 64 }) = UG(ATD[420, 73]) = UG(ATD[420, 74])
= UG(ATD[420, 75]) = MG(Rmap(420, 51) { 20, 84| 2}_210) = DG(Rmap(420, 51) {
20, 84| 2}_210)
= DG(Rmap(420, 54) { 84, 20| 2}_210) = DG(Rmap(420, 60) { 20,210| 10}_ 84) =
BGCG(C_105(1, 41); K2;1)
= AT[420, 25]
Cyclic coverings
| 1 | 2 | |
|---|---|---|
| 1 | 1 209 | 0 128 |
| 2 | 0 82 | 1 209 |
| 1 | 2 | |
|---|---|---|
| 1 | - | 0 21 185 206 |
| 2 | 0 4 25 189 | - |
| 1 | 2 | 3 | 4 | 5 | |
|---|---|---|---|---|---|
| 1 | 1 83 | 0 2 | - | - | - |
| 2 | 0 82 | - | 0 2 | - | - |
| 3 | - | 0 82 | - | 0 2 | - |
| 4 | - | - | 0 82 | - | 0 2 |
| 5 | - | - | - | 0 82 | 41 43 |
| 1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 | 9 | 10 | 11 | 12 | 13 | 14 | 15 | 16 | 17 | 18 | 19 | 20 | 21 | |
|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
| 1 | 1 19 | 0 18 | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - |
| 2 | 0 2 | - | 17 19 | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - |
| 3 | - | 1 3 | - | 0 18 | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - |
| 4 | - | - | 0 2 | - | 0 18 | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - |
| 5 | - | - | - | 0 2 | - | 0 18 | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - |
| 6 | - | - | - | - | 0 2 | - | 0 18 | - | - | - | - | - | - | - | - | - | - | - | - | - | - |
| 7 | - | - | - | - | - | 0 2 | - | 0 18 | - | - | - | - | - | - | - | - | - | - | - | - | - |
| 8 | - | - | - | - | - | - | 0 2 | - | 0 18 | - | - | - | - | - | - | - | - | - | - | - | - |
| 9 | - | - | - | - | - | - | - | 0 2 | - | 0 18 | - | - | - | - | - | - | - | - | - | - | - |
| 10 | - | - | - | - | - | - | - | - | 0 2 | - | 0 18 | - | - | - | - | - | - | - | - | - | - |
| 11 | - | - | - | - | - | - | - | - | - | 0 2 | - | 0 18 | - | - | - | - | - | - | - | - | - |
| 12 | - | - | - | - | - | - | - | - | - | - | 0 2 | - | 0 18 | - | - | - | - | - | - | - | - |
| 13 | - | - | - | - | - | - | - | - | - | - | - | 0 2 | - | 0 18 | - | - | - | - | - | - | - |
| 14 | - | - | - | - | - | - | - | - | - | - | - | - | 0 2 | - | 0 18 | - | - | - | - | - | - |
| 15 | - | - | - | - | - | - | - | - | - | - | - | - | - | 0 2 | - | 0 18 | - | - | - | - | - |
| 16 | - | - | - | - | - | - | - | - | - | - | - | - | - | - | 0 2 | - | 0 18 | - | - | - | - |
| 17 | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - | 0 2 | - | 0 18 | - | - | - |
| 18 | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - | 0 2 | - | 0 18 | - | - |
| 19 | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - | 0 2 | - | 0 18 | - |
| 20 | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - | 0 2 | - | 0 18 |
| 21 | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - | - | 0 2 | 9 11 |