{
  "id": 60,
  "curve_key": "73759881:-559794203685",
  "ainvs": [
    "1",
    "-1",
    "0",
    "-1536664",
    "648294124"
  ],
  "rank_lower_bound": 10,
  "naive_height": 54.34897657161224,
  "faltings_height": 2.5105052071053513,
  "conductor": "25440555737235843986",
  "bad_primes": [
    "2",
    "53993",
    "235591240876001"
  ],
  "discriminant": "50881111474471687972",
  "regulator": "488600.0685314399839133782564429436509012776371221864320710",
  "points": [
    [
      "-1412",
      "1890"
    ],
    [
      "-1411",
      "3123"
    ],
    [
      "-1386",
      "11378"
    ],
    [
      "-1372",
      "13822"
    ],
    [
      "-1353",
      "16463"
    ],
    [
      "-1350",
      "16832"
    ],
    [
      "-1329",
      "19154"
    ],
    [
      "-1274",
      "23810"
    ],
    [
      "-1259",
      "24840"
    ],
    [
      "-1237",
      "26215"
    ]
  ],
  "submitter": "David Renshaw",
  "commentary": "Provenance: Elkies-Watkins, \"Elliptic curves of large rank and small conductor\" (arXiv:math/0403374), Table 4 low absolute-discriminant list for r=10: [1,-1,0,-1536664,648294124], |Delta|=50881111474471687972; their I-column records 207 integral x-coordinates. Also appears in Table 2 with conductor N=25440555737235843986 and |Delta|/N=2. The submitted points certify rank >= 10 here.",
  "created_at": "2026-05-29 00:04:02",
  "updated_at": "2026-07-01 22:49:33"
}