The database currently contains 96815 elliptic curves defined over number fields of degree 4, in 36648 isogeny classes, with conductors of norm up to 4079.
Signature (4,0): 96815 curves in 36648 isogeny classes, conductor norm ≤ 4079
Field | Number of curves | Number of isogeny classes | Maximum conductor norm |
---|---|---|---|
4.4.725.1 | 4064 | 1992 | 4079 |
4.4.1125.1 | 1458 | 563 | 961 |
4.4.1600.1 | 1702 | 579 | 991 |
4.4.1957.1 | 1725 | 751 | 999 |
4.4.2000.1 | 1660 | 675 | 961 |
4.4.2048.1 | 6180 | 2310 | 1951 |
4.4.2225.1 | 4105 | 1279 | 1409 |
4.4.2304.1 | 4438 | 1473 | 1151 |
4.4.2525.1 | 1560 | 811 | 1231 |
4.4.2624.1 | 2243 | 1069 | 1244 |
4.4.2777.1 | 3323 | 1164 | 976 |
4.4.3600.1 | 1860 | 758 | 839 |
4.4.3981.1 | 1479 | 645 | 657 |
4.4.4205.1 | 709 | 338 | 469 |
4.4.4225.1 | 2066 | 642 | 625 |
4.4.4352.1 | 2372 | 826 | 593 |
4.4.4400.1 | 1412 | 600 | 620 |
4.4.4525.1 | 724 | 333 | 439 |
4.4.4752.1 | 1334 | 559 | 549 |
4.4.4913.1 | 1272 | 467 | 523 |
4.4.5125.1 | 698 | 318 | 495 |
4.4.5225.1 | 682 | 220 | 275 |
4.4.5725.1 | 421 | 222 | 419 |
4.4.5744.1 | 684 | 326 | 365 |
4.4.6125.1 | 476 | 252 | 361 |
4.4.6224.1 | 1006 | 362 | 260 |
4.4.6809.1 | 817 | 302 | 232 |
4.4.7053.1 | 472 | 251 | 267 |
4.4.7056.1 | 1072 | 380 | 300 |
4.4.7168.1 | 1132 | 402 | 289 |
4.4.7225.1 | 1078 | 339 | 289 |
4.4.7232.1 | 2328 | 710 | 284 |
4.4.7488.1 | 1196 | 418 | 263 |
4.4.7537.1 | 402 | 126 | 93 |
4.4.7600.1 | 476 | 216 | 269 |
4.4.7625.1 | 1054 | 326 | 256 |
4.4.8000.1 | 386 | 184 | 229 |
4.4.8069.1 | 386 | 172 | 247 |
4.4.8112.1 | 800 | 294 | 243 |
4.4.8468.1 | 883 | 272 | 128 |
4.4.8525.1 | 292 | 138 | 209 |
4.4.8725.1 | 219 | 137 | 211 |
4.4.8768.1 | 388 | 241 | 217 |
4.4.8789.1 | 198 | 117 | 221 |
4.4.8957.1 | 597 | 256 | 211 |
4.4.9225.1 | 574 | 185 | 191 |
4.4.9248.1 | 1584 | 472 | 202 |
4.4.9301.1 | 391 | 195 | 201 |
4.4.9792.1 | 288 | 125 | 164 |
4.4.9909.1 | 388 | 186 | 183 |
4.4.10025.1 | 444 | 168 | 181 |
4.4.10273.1 | 891 | 288 | 174 |
4.4.10304.1 | 1240 | 370 | 164 |
4.4.10309.1 | 189 | 90 | 173 |
4.4.10512.1 | 328 | 104 | 144 |
4.4.10816.1 | 276 | 138 | 153 |
4.4.10889.1 | 550 | 178 | 154 |
4.4.11025.1 | 838 | 208 | 144 |
4.4.11197.1 | 226 | 108 | 147 |
4.4.11324.1 | 574 | 222 | 139 |
4.4.11344.1 | 682 | 254 | 150 |
4.4.11348.1 | 388 | 120 | 64 |
4.4.11525.1 | 134 | 88 | 145 |
4.4.11661.1 | 724 | 262 | 144 |
4.4.12197.1 | 172 | 99 | 127 |
4.4.12357.1 | 374 | 160 | 131 |
4.4.12400.1 | 422 | 180 | 125 |
4.4.12544.1 | 816 | 240 | 128 |
4.4.12725.1 | 113 | 80 | 121 |
4.4.13025.1 | 420 | 150 | 116 |
4.4.13068.1 | 836 | 208 | 121 |
4.4.13448.1 | 719 | 224 | 113 |
4.4.13525.1 | 104 | 63 | 99 |
4.4.13625.1 | 328 | 92 | 100 |
4.4.13676.1 | 555 | 186 | 110 |
4.4.13725.1 | 98 | 48 | 89 |
4.4.13768.1 | 760 | 226 | 108 |
4.4.13824.1 | 558 | 203 | 111 |
4.4.13888.1 | 228 | 94 | 92 |
4.4.13968.1 | 918 | 253 | 109 |
4.4.14013.1 | 454 | 186 | 107 |
4.4.14197.1 | 170 | 72 | 101 |
4.4.14272.1 | 230 | 102 | 99 |
4.4.14336.1 | 332 | 142 | 100 |
4.4.14400.1 | 352 | 155 | 100 |
4.4.14656.1 | 508 | 184 | 103 |
4.4.14725.1 | 116 | 46 | 99 |
4.4.15125.1 | 176 | 40 | 95 |
4.4.15188.1 | 698 | 266 | 104 |
4.4.15317.1 | 962 | 242 | 103 |
4.4.15529.1 | 346 | 110 | 103 |
4.4.15952.1 | 418 | 166 | 102 |
4.4.16225.1 | 120 | 58 | 81 |
4.4.16317.1 | 144 | 94 | 101 |
4.4.16357.1 | 274 | 114 | 103 |
4.4.16400.1 | 184 | 97 | 100 |
4.4.16448.1 | 266 | 122 | 86 |
4.4.16448.2 | 526 | 196 | 82 |
4.4.16609.1 | 628 | 212 | 103 |
4.4.16997.1 | 73 | 51 | 103 |
4.4.17069.1 | 204 | 99 | 87 |
4.4.17417.1 | 278 | 130 | 100 |
4.4.17424.1 | 986 | 291 | 100 |
4.4.17428.1 | 713 | 194 | 72 |
4.4.17600.1 | 172 | 80 | 76 |
4.4.17609.1 | 350 | 146 | 98 |
4.4.17725.1 | 32 | 14 | 49 |
4.4.17989.1 | 140 | 85 | 99 |
4.4.18097.1 | 380 | 124 | 93 |
4.4.18432.1 | 392 | 165 | 98 |
4.4.18496.1 | 836 | 226 | 100 |
4.4.18625.1 | 248 | 80 | 100 |
4.4.18688.1 | 212 | 138 | 98 |
4.4.18736.1 | 256 | 136 | 100 |
4.4.19025.1 | 238 | 87 | 64 |
4.4.19225.1 | 257 | 84 | 100 |
4.4.19429.1 | 156 | 82 | 95 |
4.4.19525.1 | 96 | 52 | 95 |
4.4.19600.1 | 94 | 35 | 64 |
4.4.19664.1 | 940 | 330 | 100 |
4.4.19773.1 | 392 | 128 | 81 |
4.4.19796.1 | 398 | 147 | 68 |
4.4.19821.1 | 109 | 58 | 97 |