Query:
/api/hmf_hecke/?_offset=0
{'AL_eigenvalues': [['[659, 659, -8*w^2 + 2*w + 9]', 1]], 'hecke_eigenvalues': ['e', '1/4*e^5 - 5/4*e^4 - 13/4*e^3 + 35/2*e^2 - 15/2*e - 15', '-7/40*e^5 + 39/40*e^4 + 77/40*e^3 - 72/5*e^2 + 47/5*e + 88/5', '3/40*e^5 - 21/40*e^4 - 23/40*e^3 + 167/20*e^2 - 33/5*e - 52/5', '-1/80*e^5 + 7/80*e^4 + 21/80*e^3 - 69/40*e^2 - 7/5*e + 27/5', '1/80*e^5 - 7/80*e^4 - 21/80*e^3 + 69/40*e^2 + 2/5*e - 12/5', '-19/40*e^5 + 27/10*e^4 + 51/10*e^3 - 1567/40*e^2 + 263/10*e + 191/5', '1/20*e^5 - 1/10*e^4 - 13/10*e^3 + 23/20*e^2 + 33/5*e - 8/5', '-5/8*e^5 + 7/2*e^4 + 7*e^3 - 405/8*e^2 + 29*e + 52', '-3/20*e^5 + 11/20*e^4 + 53/20*e^3 - 31/5*e^2 - 24/5*e - 16/5', '5/8*e^5 - 7/2*e^4 - 7*e^3 + 405/8*e^2 - 32*e - 50', '-29/80*e^5 + 163/80*e^4 + 329/80*e^3 - 1181/40*e^2 + 82/5*e + 158/5', '-11/40*e^5 + 47/40*e^4 + 181/40*e^3 - 167/10*e^2 - 19/5*e + 84/5', '1/2*e^5 - 3*e^4 - 5*e^3 + 89/2*e^2 - 31*e - 50', '17/40*e^5 - 119/40*e^4 - 117/40*e^3 + 913/20*e^2 - 212/5*e - 278/5', '-33/80*e^5 + 231/80*e^4 + 213/80*e^3 - 1797/40*e^2 + 219/5*e + 281/5', '-23/40*e^5 + 63/20*e^4 + 139/20*e^3 - 1829/40*e^2 + 103/5*e + 222/5', '1/8*e^5 - 11/8*e^4 + 7/8*e^3 + 91/4*e^2 - 33*e - 32', '1/20*e^5 - 1/10*e^4 - 13/10*e^3 + 43/20*e^2 + 33/5*e - 58/5', '1/8*e^5 - 3/4*e^4 - 5/4*e^3 + 83/8*e^2 - 15/2*e - 11', '-3/5*e^5 + 133/40*e^4 + 279/40*e^3 - 1947/40*e^2 + 263/10*e + 271/5', '-3/4*e^5 + 9/2*e^4 + 15/2*e^3 - 265/4*e^2 + 46*e + 70', '-1/8*e^5 + 11/8*e^4 - 7/8*e^3 - 91/4*e^2 + 30*e + 38', '1/8*e^5 - 5/8*e^4 - 15/8*e^3 + 17/2*e^2 + 2*e - 4', '-11/16*e^5 + 69/16*e^4 + 95/16*e^3 - 515/8*e^2 + 55*e + 72', '1/20*e^5 - 1/10*e^4 - 13/10*e^3 + 23/20*e^2 + 23/5*e + 22/5', '-21/20*e^5 + 239/40*e^4 + 477/40*e^3 - 3491/40*e^2 + 459/10*e + 443/5', '3/80*e^5 + 19/80*e^4 - 183/80*e^3 - 173/40*e^2 + 101/5*e + 49/5', '-9/20*e^5 + 12/5*e^4 + 26/5*e^3 - 677/20*e^2 + 118/5*e + 172/5', '1/2*e^5 - 3*e^4 - 5*e^3 + 89/2*e^2 - 32*e - 52', '31/40*e^5 - 19/5*e^4 - 52/5*e^3 + 2103/40*e^2 - 157/10*e - 249/5', '9/16*e^5 - 55/16*e^4 - 85/16*e^3 + 409/8*e^2 - 36*e - 58', '11/20*e^5 - 129/40*e^4 - 227/40*e^3 + 1861/40*e^2 - 299/10*e - 203/5', '-9/40*e^5 + 43/40*e^4 + 129/40*e^3 - 331/20*e^2 + 29/5*e + 136/5', '29/20*e^5 - 79/10*e^4 - 167/10*e^3 + 2267/20*e^2 - 318/5*e - 582/5', '39/80*e^5 - 193/80*e^4 - 499/80*e^3 + 1371/40*e^2 - 87/5*e - 193/5', '21/20*e^5 - 51/10*e^4 - 143/10*e^3 + 1423/20*e^2 - 112/5*e - 308/5', '-7/20*e^5 + 17/10*e^4 + 51/10*e^3 - 481/20*e^2 + 14/5*e + 106/5', '-3/16*e^5 + 29/16*e^4 - 9/16*e^3 - 227/8*e^2 + 38*e + 44', '53/40*e^5 - 261/40*e^4 - 703/40*e^3 + 453/5*e^2 - 163/5*e - 382/5', '-7/40*e^5 + 8/5*e^4 + 3/10*e^3 - 1051/40*e^2 + 132/5*e + 188/5', '23/40*e^5 - 12/5*e^4 - 46/5*e^3 + 1279/40*e^2 + 39/10*e - 117/5', '59/40*e^5 - 323/40*e^4 - 689/40*e^3 + 584/5*e^2 - 329/5*e - 616/5', '31/40*e^5 - 101/20*e^4 - 133/20*e^3 + 3073/40*e^2 - 291/5*e - 464/5', '-31/80*e^5 + 97/80*e^4 + 611/80*e^3 - 559/40*e^2 - 97/5*e + 32/5', '9/40*e^5 - 17/10*e^4 - 3/5*e^3 + 1017/40*e^2 - 164/5*e - 166/5', '-9/40*e^5 + 39/20*e^4 + 7/20*e^3 - 1287/40*e^2 + 194/5*e + 256/5', '1/8*e^5 - 11/8*e^4 + 7/8*e^3 + 87/4*e^2 - 31*e - 20', '3/5*e^5 - 27/10*e^4 - 91/10*e^3 + 383/10*e^2 - 14/5*e - 186/5', '11/20*e^5 - 18/5*e^4 - 24/5*e^3 + 1083/20*e^2 - 197/5*e - 318/5', '109/80*e^5 - 603/80*e^4 - 1249/80*e^3 + 4401/40*e^2 - 327/5*e - 598/5', '13/20*e^5 - 71/20*e^4 - 153/20*e^3 + 517/10*e^2 - 131/5*e - 304/5', '-9/80*e^5 + 3/80*e^4 + 249/80*e^3 + 69/40*e^2 - 73/5*e - 57/5', '3/10*e^5 - 13/5*e^4 - 4/5*e^3 + 429/10*e^2 - 222/5*e - 318/5', '-7/8*e^5 + 45/8*e^4 + 63/8*e^3 - 345/4*e^2 + 62*e + 108', '9/10*e^5 - 53/10*e^4 - 99/10*e^3 + 396/5*e^2 - 221/5*e - 484/5', '-1/40*e^5 - 13/40*e^4 + 81/40*e^3 + 141/20*e^2 - 104/5*e - 86/5', '-131/80*e^5 + 697/80*e^4 + 1611/80*e^3 - 5029/40*e^2 + 313/5*e + 597/5', '13/40*e^5 - 61/40*e^4 - 223/40*e^3 + 118/5*e^2 + 57/5*e - 182/5', '-43/80*e^5 + 241/80*e^4 + 483/80*e^3 - 1677/40*e^2 + 119/5*e + 171/5', '-1/2*e^5 + 9/4*e^4 + 31/4*e^3 - 121/4*e^2 - 5*e + 18', '-23/40*e^5 + 191/40*e^4 + 53/40*e^3 - 373/5*e^2 + 418/5*e + 522/5', '17/40*e^5 - 31/10*e^4 - 9/5*e^3 + 1841/40*e^2 - 282/5*e - 248/5', '-3/20*e^5 + 3/10*e^4 + 39/10*e^3 - 89/20*e^2 - 109/5*e + 64/5', '17/40*e^5 - 59/40*e^4 - 297/40*e^3 + 323/20*e^2 + 68/5*e + 2/5', '-1/40*e^5 - 3/40*e^4 + 31/40*e^3 + 43/10*e^2 - 14/5*e - 156/5', '-73/40*e^5 + 233/20*e^4 + 319/20*e^3 - 7079/40*e^2 + 1421/10*e + 1017/5', '57/40*e^5 - 38/5*e^4 - 173/10*e^3 + 4341/40*e^2 - 267/5*e - 458/5', '-4/5*e^5 + 209/40*e^4 + 267/40*e^3 - 3151/40*e^2 + 689/10*e + 393/5', '21/40*e^5 - 137/40*e^4 - 171/40*e^3 + 517/10*e^2 - 201/5*e - 254/5', '-163/80*e^5 + 961/80*e^4 + 1683/80*e^3 - 7097/40*e^2 + 619/5*e + 961/5', '49/40*e^5 - 233/40*e^4 - 699/40*e^3 + 414/5*e^2 - 84/5*e - 436/5', '7/80*e^5 + 31/80*e^4 - 307/80*e^3 - 357/40*e^2 + 109/5*e + 131/5', '7/16*e^5 - 57/16*e^4 - 11/16*e^3 + 447/8*e^2 - 75*e - 68', '-23/40*e^5 + 19/10*e^4 + 51/5*e^3 - 839/40*e^2 - 57/5*e - 88/5', '-31/40*e^5 + 137/40*e^4 + 491/40*e^3 - 979/20*e^2 + 11/5*e + 314/5', '-11/20*e^5 + 41/10*e^4 + 23/10*e^3 - 1273/20*e^2 + 382/5*e + 408/5', '3/5*e^5 - 79/20*e^4 - 97/20*e^3 + 1241/20*e^2 - 264/5*e - 416/5', '17/20*e^5 - 26/5*e^4 - 38/5*e^3 + 1501/20*e^2 - 304/5*e - 356/5', '-11/40*e^5 + 57/40*e^4 + 131/40*e^3 - 369/20*e^2 + 61/5*e + 34/5', '-7/10*e^5 + 22/5*e^4 + 36/5*e^3 - 661/10*e^2 + 168/5*e + 392/5', '37/40*e^5 - 259/40*e^4 - 257/40*e^3 + 2013/20*e^2 - 457/5*e - 678/5', '-21/20*e^5 + 179/40*e^4 + 617/40*e^3 - 2271/40*e^2 + 89/10*e + 93/5', '-1/2*e^4 + 3/2*e^3 + 19/2*e^2 - 23*e - 10', '37/40*e^5 - 219/40*e^4 - 377/40*e^3 + 1573/20*e^2 - 272/5*e - 318/5', '11/10*e^5 - 129/20*e^4 - 247/20*e^3 + 1941/20*e^2 - 244/5*e - 536/5', '25/16*e^5 - 147/16*e^4 - 249/16*e^3 + 1083/8*e^2 - 103*e - 147', '13/20*e^5 - 61/20*e^4 - 203/20*e^3 + 216/5*e^2 + 39/5*e - 264/5', '-9/80*e^5 + 123/80*e^4 - 111/80*e^3 - 1151/40*e^2 + 187/5*e + 293/5', '7/10*e^5 - 73/20*e^4 - 159/20*e^3 + 1017/20*e^2 - 163/5*e - 272/5', '-17/20*e^5 + 163/40*e^4 + 489/40*e^3 - 2247/40*e^2 + 53/10*e + 181/5', '177/80*e^5 - 999/80*e^4 - 1957/80*e^3 + 7293/40*e^2 - 571/5*e - 974/5', '27/80*e^5 - 169/80*e^4 - 267/80*e^3 + 1313/40*e^2 - 81/5*e - 309/5', '-31/20*e^5 + 43/5*e^4 + 84/5*e^3 - 2463/20*e^2 + 407/5*e + 578/5', '1/2*e^5 - 3*e^4 - 5*e^3 + 89/2*e^2 - 34*e - 36', '17/40*e^5 - 129/40*e^4 - 107/40*e^3 + 262/5*e^2 - 207/5*e - 398/5', '-91/40*e^5 + 507/40*e^4 + 1041/40*e^3 - 926/5*e^2 + 501/5*e + 904/5', '-59/80*e^5 + 493/80*e^4 + 119/80*e^3 - 3871/40*e^2 + 577/5*e + 638/5', '29/40*e^5 - 123/40*e^4 - 449/40*e^3 + 801/20*e^2 + 21/5*e - 186/5', '-e^5 + 11/2*e^4 + 23/2*e^3 - 157/2*e^2 + 45*e + 70', '-73/80*e^5 + 491/80*e^4 + 513/80*e^3 - 3727/40*e^2 + 449/5*e + 601/5', '-9/8*e^5 + 51/8*e^4 + 97/8*e^3 - 371/4*e^2 + 54*e + 108', '-e^5 + 5*e^4 + 14*e^3 - 72*e^2 + 11*e + 76', '-3/4*e^5 + 13/4*e^4 + 47/4*e^3 - 91/2*e^2 - 3*e + 44', '73/40*e^5 - 391/40*e^4 - 853/40*e^3 + 2757/20*e^2 - 373/5*e - 562/5', '93/40*e^5 - 511/40*e^4 - 1053/40*e^3 + 3647/20*e^2 - 548/5*e - 872/5', '11/80*e^5 - 97/80*e^4 - 51/80*e^3 + 829/40*e^2 - 73/5*e - 197/5', '3/8*e^5 - 5/8*e^4 - 71/8*e^3 + 11/4*e^2 + 38*e + 30', '1/8*e^5 - 7/8*e^4 - 13/8*e^3 + 65/4*e^2 + 4*e - 40', '41/20*e^5 - 197/20*e^4 - 571/20*e^3 + 682/5*e^2 - 167/5*e - 568/5', '79/40*e^5 - 373/40*e^4 - 1119/40*e^3 + 2581/20*e^2 - 164/5*e - 526/5', '-81/40*e^5 + 211/20*e^4 + 503/20*e^3 - 6023/40*e^2 + 356/5*e + 654/5', '7/10*e^5 - 83/20*e^4 - 149/20*e^3 + 1267/20*e^2 - 183/5*e - 362/5', '-29/40*e^5 + 153/40*e^4 + 379/40*e^3 - 563/10*e^2 + 114/5*e + 326/5', '-3/8*e^5 + 15/8*e^4 + 37/8*e^3 - 47/2*e^2 + 10*e - 16', -1, '43/40*e^5 - 221/40*e^4 - 543/40*e^3 + 1527/20*e^2 - 143/5*e - 272/5', '-19/8*e^5 + 99/8*e^4 + 233/8*e^3 - 175*e^2 + 88*e + 162', '-39/20*e^5 + 233/20*e^4 + 399/20*e^3 - 1731/10*e^2 + 553/5*e + 972/5', '51/40*e^5 - 39/5*e^4 - 129/10*e^3 + 4663/40*e^2 - 356/5*e - 684/5', '-2/5*e^5 + 9/5*e^4 + 32/5*e^3 - 126/5*e^2 - 39/5*e + 64/5', '83/80*e^5 - 501/80*e^4 - 863/80*e^3 + 3767/40*e^2 - 329/5*e - 506/5', '-199/80*e^5 + 1113/80*e^4 + 2219/80*e^3 - 8111/40*e^2 + 657/5*e + 1018/5', '233/80*e^5 - 1211/80*e^4 - 2913/80*e^3 + 8567/40*e^2 - 479/5*e - 961/5', '-17/20*e^5 + 163/40*e^4 + 449/40*e^3 - 2127/40*e^2 + 203/10*e + 151/5', '113/80*e^5 - 731/80*e^4 - 993/80*e^3 + 5587/40*e^2 - 569/5*e - 841/5', '-11/40*e^5 + 23/10*e^4 + 2/5*e^3 - 1443/40*e^2 + 191/5*e + 244/5', '11/8*e^5 - 33/4*e^4 - 53/4*e^3 + 965/8*e^2 - 89*e - 122', '191/80*e^5 - 1097/80*e^4 - 2011/80*e^3 + 8019/40*e^2 - 713/5*e - 1072/5', '23/40*e^5 - 101/40*e^4 - 343/40*e^3 + 717/20*e^2 - 48/5*e - 182/5', '-13/4*e^5 + 143/8*e^4 + 301/8*e^3 - 2059/8*e^2 + 285/2*e + 261', '111/40*e^5 - 74/5*e^4 - 339/10*e^3 + 8523/40*e^2 - 501/5*e - 1074/5', '31/20*e^5 - 71/10*e^4 - 223/10*e^3 + 1913/20*e^2 - 117/5*e - 258/5', '-111/40*e^5 + 637/40*e^4 + 1191/40*e^3 - 4669/20*e^2 + 801/5*e + 1294/5', '9/8*e^5 - 53/8*e^4 - 95/8*e^3 + 197/2*e^2 - 67*e - 92', '-3/10*e^5 + 17/20*e^4 + 131/20*e^3 - 213/20*e^2 - 163/5*e + 38/5', '-51/80*e^5 + 317/80*e^4 + 471/80*e^3 - 2499/40*e^2 + 263/5*e + 492/5', '-33/20*e^5 + 49/5*e^4 + 82/5*e^3 - 2869/20*e^2 + 561/5*e + 674/5', '-29/40*e^5 + 183/40*e^4 + 309/40*e^3 - 1411/20*e^2 + 164/5*e + 486/5', '-77/40*e^5 + 48/5*e^4 + 253/10*e^3 - 5441/40*e^2 + 287/5*e + 608/5', '-13/10*e^5 + 43/5*e^4 + 49/5*e^3 - 1309/10*e^2 + 597/5*e + 778/5', '-1/8*e^5 - 1/2*e^4 + 6*e^3 + 71/8*e^2 - 44*e + 2', '-11/40*e^5 + 33/10*e^4 - 31/10*e^3 - 2143/40*e^2 + 947/10*e + 319/5', '141/80*e^5 - 807/80*e^4 - 1541/80*e^3 + 5939/40*e^2 - 473/5*e - 777/5', '71/40*e^5 - 49/5*e^4 - 209/10*e^3 + 5763/40*e^2 - 376/5*e - 834/5', '-123/40*e^5 + 741/40*e^4 + 1223/40*e^3 - 5487/20*e^2 + 983/5*e + 1492/5', '-37/40*e^5 + 23/5*e^4 + 113/10*e^3 - 2521/40*e^2 + 162/5*e + 258/5', '-3/8*e^5 + 15/8*e^4 + 37/8*e^3 - 49/2*e^2 + 19*e - 16', '-81/40*e^5 + 59/5*e^4 + 209/10*e^3 - 6973/40*e^2 + 626/5*e + 944/5', '-5/8*e^5 + 31/8*e^4 + 37/8*e^3 - 223/4*e^2 + 60*e + 72', '9/20*e^5 - 19/10*e^4 - 57/10*e^3 + 467/20*e^2 - 108/5*e - 2/5', '159/80*e^5 - 753/80*e^4 - 2259/80*e^3 + 5191/40*e^2 - 157/5*e - 558/5', '-69/20*e^5 + 403/20*e^4 + 709/20*e^3 - 2961/10*e^2 + 1063/5*e + 1612/5', '23/80*e^5 - 241/80*e^4 + 157/80*e^3 + 1867/40*e^2 - 384/5*e - 236/5', '-1/8*e^5 + 3/8*e^4 + 17/8*e^3 - 19/4*e^2 + 5*e - 12', '-63/40*e^5 + 401/40*e^4 + 563/40*e^3 - 3027/20*e^2 + 593/5*e + 892/5', '11/20*e^5 - 77/20*e^4 - 71/20*e^3 + 559/10*e^2 - 292/5*e - 148/5', '-37/20*e^5 + 107/10*e^4 + 191/10*e^3 - 3111/20*e^2 + 554/5*e + 846/5', '-113/40*e^5 + 671/40*e^4 + 1133/40*e^3 - 4957/20*e^2 + 893/5*e + 1312/5', '-1/5*e^5 + 13/20*e^4 + 79/20*e^3 - 147/20*e^2 - 37/5*e + 102/5', '193/80*e^5 - 1071/80*e^4 - 2173/80*e^3 + 7737/40*e^2 - 589/5*e - 881/5', '159/80*e^5 - 973/80*e^4 - 1559/80*e^3 + 7161/40*e^2 - 597/5*e - 923/5', '-13/20*e^5 + 19/5*e^4 + 37/5*e^3 - 1129/20*e^2 + 96/5*e + 224/5', '-73/40*e^5 + 421/40*e^4 + 743/40*e^3 - 1541/10*e^2 + 633/5*e + 792/5', '11/5*e^5 - 243/20*e^4 - 489/20*e^3 + 3517/20*e^2 - 583/5*e - 922/5', '-31/20*e^5 + 167/20*e^4 + 361/20*e^3 - 612/5*e^2 + 362/5*e + 698/5', '37/16*e^5 - 195/16*e^4 - 441/16*e^3 + 1377/8*e^2 - 97*e - 148', '59/40*e^5 - 343/40*e^4 - 629/40*e^3 + 1223/10*e^2 - 349/5*e - 426/5', '-119/40*e^5 + 299/20*e^4 + 777/20*e^3 - 8497/40*e^2 + 863/10*e + 991/5'], 'hecke_polynomial': 'x^6 - 5*x^5 - 15*x^4 + 76*x^3 + 8*x^2 - 128*x - 64', 'id': 147, 'label': '3.3.49.1-659.1-b'}