Refine search
Label | Base field | Level | Dimension |
---|---|---|---|
1.1-a | \(\Q(\sqrt{433}) \) | $[1, 1, 1]$ | $2$ |
1.1-b | \(\Q(\sqrt{433}) \) | $[1, 1, 1]$ | $10$ |
1.1-c | \(\Q(\sqrt{433}) \) | $[1, 1, 1]$ | $17$ |
2.1-a | \(\Q(\sqrt{433}) \) | $[2, 2, w + 10]$ | $3$ |
2.1-b | \(\Q(\sqrt{433}) \) | $[2, 2, w + 10]$ | $9$ |
2.1-c | \(\Q(\sqrt{433}) \) | $[2, 2, w + 10]$ | $12$ |
2.2-a | \(\Q(\sqrt{433}) \) | $[2,2,-w + 11]$ | $3$ |
2.2-b | \(\Q(\sqrt{433}) \) | $[2,2,-w + 11]$ | $9$ |
2.2-c | \(\Q(\sqrt{433}) \) | $[2,2,-w + 11]$ | $12$ |
3.1-a | \(\Q(\sqrt{433}) \) | $[3, 3, 1202w - 13107]$ | $1$ |
3.1-b | \(\Q(\sqrt{433}) \) | $[3, 3, 1202w - 13107]$ | $2$ |
3.1-c | \(\Q(\sqrt{433}) \) | $[3, 3, 1202w - 13107]$ | $2$ |
3.1-d | \(\Q(\sqrt{433}) \) | $[3, 3, 1202w - 13107]$ | $3$ |
3.1-e | \(\Q(\sqrt{433}) \) | $[3, 3, 1202w - 13107]$ | $3$ |
3.1-f | \(\Q(\sqrt{433}) \) | $[3, 3, 1202w - 13107]$ | $17$ |
3.1-g | \(\Q(\sqrt{433}) \) | $[3, 3, 1202w - 13107]$ | $23$ |
3.2-a | \(\Q(\sqrt{433}) \) | $[3,3,-1202w - 11905]$ | $1$ |
3.2-b | \(\Q(\sqrt{433}) \) | $[3,3,-1202w - 11905]$ | $2$ |
3.2-c | \(\Q(\sqrt{433}) \) | $[3,3,-1202w - 11905]$ | $2$ |
3.2-d | \(\Q(\sqrt{433}) \) | $[3,3,-1202w - 11905]$ | $3$ |
3.2-e | \(\Q(\sqrt{433}) \) | $[3,3,-1202w - 11905]$ | $3$ |
3.2-f | \(\Q(\sqrt{433}) \) | $[3,3,-1202w - 11905]$ | $17$ |
3.2-g | \(\Q(\sqrt{433}) \) | $[3,3,-1202w - 11905]$ | $23$ |
4.1-a | \(\Q(\sqrt{433}) \) | $[4, 2, 2]$ | $1$ |
4.1-b | \(\Q(\sqrt{433}) \) | $[4, 2, 2]$ | $1$ |
4.1-c | \(\Q(\sqrt{433}) \) | $[4, 2, 2]$ | $1$ |
4.1-d | \(\Q(\sqrt{433}) \) | $[4, 2, 2]$ | $1$ |
4.1-e | \(\Q(\sqrt{433}) \) | $[4, 2, 2]$ | $1$ |
4.1-f | \(\Q(\sqrt{433}) \) | $[4, 2, 2]$ | $2$ |
4.1-g | \(\Q(\sqrt{433}) \) | $[4, 2, 2]$ | $4$ |
4.1-h | \(\Q(\sqrt{433}) \) | $[4, 2, 2]$ | $4$ |
4.1-i | \(\Q(\sqrt{433}) \) | $[4, 2, 2]$ | $9$ |
4.1-j | \(\Q(\sqrt{433}) \) | $[4, 2, 2]$ | $9$ |
4.2-a | \(\Q(\sqrt{433}) \) | $[4, 4, 21w + 208]$ | $27$ |
4.3-a | \(\Q(\sqrt{433}) \) | $[4,4,-21w + 229]$ | $27$ |
6.1-a | \(\Q(\sqrt{433}) \) | $[6, 6, 115w - 1254]$ | $8$ |
6.1-b | \(\Q(\sqrt{433}) \) | $[6, 6, 115w - 1254]$ | $14$ |
6.1-c | \(\Q(\sqrt{433}) \) | $[6, 6, 115w - 1254]$ | $15$ |
6.1-d | \(\Q(\sqrt{433}) \) | $[6, 6, 115w - 1254]$ | $22$ |
6.2-a | \(\Q(\sqrt{433}) \) | $[6, 6, -7975w + 86962]$ | $1$ |
6.2-b | \(\Q(\sqrt{433}) \) | $[6, 6, -7975w + 86962]$ | $13$ |
6.2-c | \(\Q(\sqrt{433}) \) | $[6, 6, -7975w + 86962]$ | $14$ |
6.2-d | \(\Q(\sqrt{433}) \) | $[6, 6, -7975w + 86962]$ | $15$ |
6.2-e | \(\Q(\sqrt{433}) \) | $[6, 6, -7975w + 86962]$ | $16$ |
6.3-a | \(\Q(\sqrt{433}) \) | $[6,6,7975w + 78987]$ | $1$ |
6.3-b | \(\Q(\sqrt{433}) \) | $[6,6,7975w + 78987]$ | $13$ |
6.3-c | \(\Q(\sqrt{433}) \) | $[6,6,7975w + 78987]$ | $14$ |
6.3-d | \(\Q(\sqrt{433}) \) | $[6,6,7975w + 78987]$ | $15$ |
6.3-e | \(\Q(\sqrt{433}) \) | $[6,6,7975w + 78987]$ | $16$ |
6.4-a | \(\Q(\sqrt{433}) \) | $[6,6,-115w - 1139]$ | $8$ |