/*
  This code can be loaded, or copied and paste using cpaste, into Sage.
  It will load the data associated to the HMF, including
  the field, level, and Hecke and Atkin-Lehner eigenvalue data.
*/

P.<x> = PolynomialRing(QQ)
g = P([12, -9, -1, 1])
F.<w> = NumberField(g)
ZF = F.ring_of_integers()

NN = ZF.ideal([4, 2, w^2 + w - 7])

primes_array = [
[2, 2, w - 2],\
[3, 3, -w + 3],\
[3, 3, w - 1],\
[4, 2, w^2 + w - 7],\
[19, 19, w + 1],\
[23, 23, w^2 - 2*w - 1],\
[31, 31, -2*w^2 + 19],\
[31, 31, -w^2 + 5],\
[31, 31, -3*w + 5],\
[41, 41, w^2 + 2*w - 7],\
[43, 43, w^2 - 11],\
[47, 47, 3*w - 7],\
[53, 53, -3*w^2 - 6*w + 11],\
[59, 59, 2*w - 1],\
[67, 67, 2*w^2 + w - 19],\
[67, 67, 3*w^2 + 2*w - 25],\
[67, 67, w - 5],\
[73, 73, -4*w^2 - 3*w + 29],\
[73, 73, 2*w^2 - w - 11],\
[73, 73, w^2 + 2*w - 11],\
[79, 79, 2*w^2 + 2*w - 11],\
[83, 83, 2*w^2 - 13],\
[89, 89, -2*w + 7],\
[97, 97, -2*w^2 + 4*w - 1],\
[101, 101, -2*w - 5],\
[103, 103, 2*w^2 + w - 13],\
[107, 107, -2*w^2 - 2*w + 17],\
[109, 109, -4*w^2 - 2*w + 31],\
[113, 113, w^2 + 2*w - 1],\
[125, 5, -5],\
[127, 127, 2*w^2 + 3*w - 13],\
[137, 137, -2*w^2 + 7*w - 7],\
[139, 139, 2*w^2 + w - 7],\
[149, 149, -6*w^2 - 9*w + 31],\
[157, 157, w^2 - 4*w + 1],\
[163, 163, 2*w^2 + 5*w - 5],\
[173, 173, 5*w^2 + 4*w - 37],\
[179, 179, 2*w^2 + w - 11],\
[179, 179, 3*w^2 - 2*w - 17],\
[179, 179, -4*w^2 - w + 37],\
[191, 191, -6*w^2 - 9*w + 29],\
[193, 193, -2*w^2 - 4*w + 5],\
[223, 223, -2*w^2 + 2*w + 7],\
[227, 227, 6*w^2 + 4*w - 47],\
[233, 233, 2*w^2 + 4*w - 13],\
[233, 233, -4*w^2 - 4*w + 25],\
[233, 233, 4*w + 13],\
[239, 239, -4*w^2 - 8*w + 13],\
[239, 239, 2*w^2 + 2*w - 5],\
[239, 239, -w^2 + 8*w - 11],\
[241, 241, 3*w - 1],\
[251, 251, w^2 + 4*w - 19],\
[263, 263, -2*w^2 + 2*w + 25],\
[263, 263, -5*w^2 - 4*w + 35],\
[263, 263, 3*w^2 - 25],\
[269, 269, 6*w^2 + 3*w - 47],\
[269, 269, -w^2 - 1],\
[269, 269, 2*w^2 - 7],\
[277, 277, 2*w^2 - w - 5],\
[277, 277, -5*w^2 - 6*w + 31],\
[277, 277, 2*w^2 - 2*w - 11],\
[281, 281, 4*w^2 + 5*w - 25],\
[307, 307, 4*w^2 + 2*w - 37],\
[317, 317, -w - 7],\
[317, 317, 3*w^2 + 2*w - 19],\
[317, 317, -2*w^2 + 2*w + 5],\
[331, 331, 2*w^2 + 3*w - 19],\
[337, 337, w^2 - 4*w + 7],\
[343, 7, -7],\
[347, 347, 4*w^2 + 2*w - 29],\
[349, 349, 3*w^2 - 19],\
[361, 19, w^2 - 2*w - 7],\
[367, 367, 4*w^2 + 5*w - 19],\
[367, 367, -6*w + 11],\
[373, 373, -4*w^2 + w + 25],\
[379, 379, -5*w^2 - 10*w + 19],\
[383, 383, 4*w^2 + 6*w - 23],\
[401, 401, -3*w + 11],\
[401, 401, -3*w - 1],\
[401, 401, -3*w - 7],\
[409, 409, -w^2 - 4*w + 13],\
[419, 419, 2*w^2 - w - 17],\
[421, 421, -3*w^2 + 31],\
[431, 431, w^2 + 4*w - 1],\
[449, 449, -w^2 + 4*w + 1],\
[457, 457, -w^2 + 2*w + 13],\
[461, 461, 4*w^2 - 4*w - 19],\
[463, 463, 2*w^2 + 4*w - 23],\
[467, 467, 2*w^2 - 5*w + 5],\
[479, 479, 3*w + 11],\
[491, 491, 8*w^2 + 9*w - 49],\
[499, 499, -6*w^2 - 6*w + 41],\
[499, 499, 2*w^2 + 2*w - 23],\
[499, 499, 2*w^2 + 5*w - 29],\
[523, 523, -4*w^2 + w + 41],\
[529, 23, 6*w^2 + 7*w - 35],\
[547, 547, -2*w^2 + 6*w + 1],\
[557, 557, 3*w^2 + 2*w - 13],\
[563, 563, -w^2 + 4*w + 23],\
[569, 569, 10*w^2 + 8*w - 73],\
[587, 587, 2*w^2 - 2*w - 13],\
[593, 593, -6*w^2 - 8*w + 31],\
[601, 601, 4*w^2 + 5*w - 41],\
[601, 601, 10*w^2 + 16*w - 49],\
[601, 601, w^2 - 2*w + 5],\
[613, 613, -8*w^2 - 7*w + 55],\
[617, 617, -8*w^2 - 12*w + 37],\
[617, 617, 2*w^2 + 3*w - 25],\
[617, 617, 3*w^2 - 17],\
[641, 641, 4*w^2 - 35],\
[643, 643, 4*w^2 + 4*w - 37],\
[659, 659, -3*w^2 - 4*w + 23],\
[661, 661, -w^2 - 4*w - 5],\
[673, 673, 4*w^2 + 4*w - 31],\
[683, 683, 2*w^2 + 4*w - 19],\
[683, 683, 2*w^2 + w - 23],\
[683, 683, 3*w^2 + 6*w - 19],\
[701, 701, -6*w^2 - 12*w + 23],\
[701, 701, -2*w^2 + 7*w - 1],\
[701, 701, 3*w^2 + 2*w - 31],\
[709, 709, 5*w^2 + 4*w - 41],\
[719, 719, -6*w^2 - 2*w + 55],\
[719, 719, w^2 + 2*w - 17],\
[719, 719, 3*w^2 + 4*w - 29],\
[727, 727, -9*w^2 - 12*w + 49],\
[733, 733, 13*w^2 + 20*w - 65],\
[739, 739, 11*w^2 + 6*w - 91],\
[743, 743, -2*w^2 - 8*w + 35],\
[751, 751, 3*w^2 - 4*w - 13],\
[769, 769, 2*w^2 - 1],\
[797, 797, 2*w^2 - 8*w + 11],\
[811, 811, 4*w^2 - w - 29],\
[821, 821, 2*w^2 + 5*w - 17],\
[827, 827, -3*w^2 - 6*w + 7],\
[827, 827, -11*w^2 - 8*w + 83],\
[827, 827, -5*w^2 - 6*w + 25],\
[829, 829, -4*w^2 + 41],\
[829, 829, 4*w^2 + 8*w - 23],\
[829, 829, 8*w - 19],\
[839, 839, 2*w^2 + 6*w - 7],\
[853, 853, 10*w^2 + 6*w - 77],\
[859, 859, -5*w^2 - 2*w + 47],\
[863, 863, 12*w^2 + 19*w - 59],\
[877, 877, 8*w^2 + 6*w - 61],\
[907, 907, -4*w - 1],\
[907, 907, 9*w^2 + 4*w - 71],\
[907, 907, 2*w^2 + 7*w - 17],\
[919, 919, -10*w^2 - 5*w + 79],\
[929, 929, 2*w^2 + 7*w - 11],\
[937, 937, -4*w^2 + 6*w + 11],\
[941, 941, 3*w^2 - 11],\
[947, 947, 6*w - 5],\
[967, 967, -2*w^2 + 5*w + 5],\
[971, 971, 5*w^2 - 2*w - 29],\
[991, 991, 4*w^2 + 2*w - 25],\
[997, 997, 3*w^2 - 2*w - 11]]
primes = [ZF.ideal(I) for I in primes_array]

heckePol = x^5 - 3*x^4 - 3*x^3 + 11*x^2 + x - 8
K.<e> = NumberField(heckePol)

hecke_eigenvalues_array = [e, -e^4 + 2*e^3 + 4*e^2 - 5*e - 3, -e^4 + e^3 + 7*e^2 - 3*e - 9, 1, 2*e^4 - 4*e^3 - 6*e^2 + 6*e + 2, -e^4 + 2*e^3 + 4*e^2 - 3*e - 2, -4*e^4 + 7*e^3 + 19*e^2 - 16*e - 21, -3*e^3 + 5*e^2 + 8*e - 8, 2*e^3 - 6*e^2 - 2*e + 12, -2*e^4 + 3*e^3 + 13*e^2 - 10*e - 16, -3*e^4 + 6*e^3 + 12*e^2 - 11*e - 15, 4*e^4 - 7*e^3 - 19*e^2 + 16*e + 23, 3*e^4 - 5*e^3 - 15*e^2 + 9*e + 15, e^4 - e^3 - 9*e^2 + e + 19, e^4 + e^3 - 7*e^2 - 9*e + 11, 3*e^4 - 4*e^3 - 14*e^2 + 9*e + 6, -3*e^4 + 8*e^3 + 6*e^2 - 21*e, -4*e^4 + 5*e^3 + 21*e^2 - 10*e - 26, 4*e^3 - 6*e^2 - 14*e + 10, -4*e^2 + 6*e + 14, 3*e^4 - 3*e^3 - 17*e^2 + 5*e + 17, 2*e^4 - 2*e^3 - 12*e^2 + 2*e + 26, 2*e^4 - 4*e^3 - 8*e^2 + 6*e + 12, 5*e^4 - 10*e^3 - 24*e^2 + 25*e + 26, e^4 - 5*e^3 - e^2 + 13*e + 9, -4*e^4 + 7*e^3 + 19*e^2 - 16*e - 14, -4*e^4 + 8*e^3 + 18*e^2 - 18*e - 22, e^4 - 4*e^3 - 2*e^2 + 9*e - 2, -2*e^4 + 6*e^3 - 10*e + 14, 3*e^4 - 6*e^3 - 10*e^2 + 15*e - 1, -2*e^4 + 5*e^3 + e^2 - 6*e + 8, -8*e + 6, -5*e^4 + 12*e^3 + 16*e^2 - 31*e - 12, -2*e^4 + 18*e^2 - 2*e - 26, -3*e^3 + 7*e^2 + 4*e - 18, e^4 - 5*e^3 - 3*e^2 + 17*e - 1, -4*e^4 + 7*e^3 + 15*e^2 - 10*e - 17, -3*e^4 + 3*e^3 + 19*e^2 + 3*e - 33, -2*e^4 + 5*e^3 + e^2 - 6*e + 8, -3*e^3 + 5*e^2 + 8*e + 10, 8*e^4 - 12*e^3 - 40*e^2 + 28*e + 40, 2*e^4 - 6*e^3 + 4*e^2 + 10*e - 28, -7*e^4 + 12*e^3 + 30*e^2 - 23*e - 33, -2*e^4 + 3*e^3 + 11*e^2 - 6*e - 19, -4*e^3 + 18*e + 2, 3*e^4 - 24*e^2 + 3*e + 29, 11*e^4 - 13*e^3 - 65*e^2 + 25*e + 87, e^4 + 5*e^3 - 23*e^2 - 9*e + 37, 6*e^4 - 8*e^3 - 30*e^2 + 20*e + 24, -e^3 + 5*e^2 + 10*e - 16, -6*e^4 + 6*e^3 + 32*e^2 - 14*e - 18, -e^4 - 2*e^3 + 4*e^2 + 15*e + 7, -3*e^4 + 4*e^3 + 22*e^2 - 21*e - 22, 5*e^4 - 7*e^3 - 33*e^2 + 23*e + 29, -10*e^4 + 18*e^3 + 50*e^2 - 50*e - 50, 4*e^4 - 6*e^3 - 24*e^2 + 28*e + 32, 9*e^4 - 14*e^3 - 38*e^2 + 25*e + 30, -2*e^4 + 2*e^3 + 12*e^2 - 16, 8*e^4 - 13*e^3 - 41*e^2 + 38*e + 41, 8*e^4 - 18*e^3 - 30*e^2 + 50*e + 28, 4*e^4 - 6*e^3 - 28*e^2 + 16*e + 34, -8*e^4 + 8*e^3 + 50*e^2 - 20*e - 66, 14*e^4 - 23*e^3 - 71*e^2 + 62*e + 66, -2*e^4 - 5*e^3 + 21*e^2 + 22*e - 30, -8*e^4 + 14*e^3 + 40*e^2 - 34*e - 34, 7*e^4 - 7*e^3 - 47*e^2 + 19*e + 59, 10*e^4 - 22*e^3 - 38*e^2 + 54*e + 36, -12*e^4 + 19*e^3 + 65*e^2 - 44*e - 72, 5*e^4 - 7*e^3 - 29*e^2 + 11*e + 31, e^4 - 6*e^3 + 8*e^2 + 11*e - 14, 3*e^4 - 4*e^3 - 14*e^2 + 7*e + 8, -2*e^4 + 9*e^3 - 9*e^2 - 18*e + 26, 11*e^4 - 21*e^3 - 45*e^2 + 43*e + 47, 2*e^4 - 6*e^3 - 4*e^2 + 16*e - 8, 12*e^4 - 19*e^3 - 67*e^2 + 46*e + 81, -6*e^4 + 14*e^3 + 16*e^2 - 22*e - 6, 2*e^4 - 3*e^3 - 11*e^2 + 14*e + 9, -3*e^4 - 2*e^3 + 24*e^2 + 17*e - 36, 9*e^4 - 21*e^3 - 19*e^2 + 39*e - 5, -2*e^4 + 2*e^3 + 14*e^2 - 8*e - 8, -3*e^4 + 9*e^3 + 11*e^2 - 15*e - 21, -12*e^4 + 27*e^3 + 35*e^2 - 52*e - 16, 12*e^4 - 26*e^3 - 52*e^2 + 58*e + 56, 5*e^4 - e^3 - 37*e^2 - 5*e + 51, -3*e^4 - 2*e^3 + 30*e^2 + 9*e - 31, -5*e^4 + 7*e^3 + 31*e^2 - 7*e - 39, 8*e^4 - 12*e^3 - 48*e^2 + 32*e + 58, 4*e^4 - 12*e^3 - 12*e^2 + 42*e + 4, 6*e^4 - 10*e^3 - 32*e^2 + 20*e + 38, -7*e^4 + 9*e^3 + 37*e^2 - 17*e - 63, -6*e^4 + 10*e^3 + 32*e^2 - 32*e - 30, -4*e^4 + 2*e^3 + 30*e^2 - 2*e - 40, -3*e^4 + 3*e^3 + 17*e^2 + 5*e - 13, 8*e^4 - 6*e^3 - 58*e^2 + 22*e + 80, -8*e^4 + 6*e^3 + 58*e^2 - 10*e - 80, 8*e^4 - 18*e^3 - 26*e^2 + 40*e + 14, 2*e^4 - 2*e^3 - 16*e^2 + 14*e + 22, 4*e^4 - 9*e^3 - 17*e^2 + 18*e + 30, -9*e^4 + 17*e^3 + 49*e^2 - 45*e - 57, -7*e^4 + 14*e^3 + 38*e^2 - 39*e - 38, 14*e^4 - 21*e^3 - 69*e^2 + 46*e + 62, 3*e^4 - 12*e^3 - 2*e^2 + 39*e + 4, -13*e^4 + 17*e^3 + 83*e^2 - 33*e - 115, 8*e^4 - 5*e^3 - 53*e^2 + 2*e + 79, 13*e^4 - 17*e^3 - 77*e^2 + 31*e + 101, 5*e^4 - 10*e^3 - 24*e^2 + 25*e + 22, 5*e^4 - 9*e^3 - 15*e^2 + 13*e + 19, 2*e^4 + 3*e^3 - 37*e^2 + 71, 2*e^4 - 10*e^3 + 26*e - 2, -8*e^4 + 20*e^3 + 30*e^2 - 46*e - 32, -20*e^4 + 42*e^3 + 76*e^2 - 90*e - 64, -8*e^4 + 23*e^3 + 23*e^2 - 52*e - 27, 5*e^4 - 5*e^3 - 35*e^2 + 5*e + 55, 2*e^4 - 6*e^3 - 2*e^2 + 10*e + 12, -8*e^4 + 22*e^3 + 12*e^2 - 50*e, -4*e^4 + 17*e^3 - 3*e^2 - 28*e + 23, 2*e^4 - 9*e^3 + 13*e^2 + 20*e - 36, 8*e^4 - 10*e^3 - 56*e^2 + 18*e + 98, 2*e^4 - 6*e^3 - 2*e + 6, 17*e^4 - 32*e^3 - 70*e^2 + 65*e + 52, 13*e^4 - 29*e^3 - 61*e^2 + 81*e + 57, 20*e^4 - 33*e^3 - 97*e^2 + 64*e + 113, -14*e^4 + 37*e^3 + 45*e^2 - 90*e - 34, 8*e^4 - 14*e^3 - 28*e^2 + 22*e + 38, -8*e^4 + 12*e^3 + 46*e^2 - 20*e - 82, -6*e^4 + 18*e^3 + 12*e^2 - 38*e - 14, -7*e^4 + 4*e^3 + 40*e^2 + 7*e - 40, -14*e^4 + 23*e^3 + 67*e^2 - 46*e - 79, 2*e^4 - 4*e^3 + 2*e + 16, 7*e^4 - 6*e^3 - 48*e^2 + 19*e + 64, 6*e^4 - 3*e^3 - 45*e^2 + 10*e + 66, 5*e^4 - 12*e^3 - 14*e^2 + 27*e - 4, 15*e^4 - 27*e^3 - 67*e^2 + 57*e + 79, -6*e^4 + 18*e^3 + 24*e^2 - 58*e - 20, 8*e^4 - 12*e^3 - 42*e^2 + 36*e + 20, -4*e^4 + 4*e^3 + 26*e^2 + 4*e - 34, -7*e^4 + 7*e^3 + 55*e^2 - 33*e - 85, 12*e^4 - 30*e^3 - 30*e^2 + 60*e + 4, 4*e^4 - 11*e^3 - 17*e^2 + 44*e + 18, 17*e^4 - 44*e^3 - 50*e^2 + 103*e + 38, -5*e^4 + 3*e^3 + 49*e^2 - 15*e - 63, 5*e^4 - 10*e^3 - 24*e^2 + 41*e - 1, 3*e^4 - 17*e^3 + 15*e^2 + 43*e - 29, -5*e^4 + 17*e^3 + 11*e^2 - 33*e - 21, -5*e^3 + 7*e^2 + 16*e - 30, -3*e^4 + 15*e^3 + e^2 - 57*e + 11, 4*e^4 - e^3 - 29*e^2 - 4*e + 26, -9*e^4 + 19*e^3 + 27*e^2 - 31*e - 15, 9*e^4 - 25*e^3 - 11*e^2 + 45*e - 31, -5*e^4 + 4*e^3 + 18*e^2 - e + 10, 5*e^4 - 14*e^3 + 4*e^2 + 21*e - 42, -5*e^4 + 11*e^3 + 23*e^2 - 15*e - 29, 10*e^4 - 23*e^3 - 35*e^2 + 54*e + 22, -10*e^4 + 23*e^3 + 27*e^2 - 42*e + 4, -8*e^4 + 20*e^3 + 24*e^2 - 68*e - 4, -10*e^3 + 14*e^2 + 20*e - 10]
hecke_eigenvalues = {}
for i in range(len(hecke_eigenvalues_array)):
    hecke_eigenvalues[primes[i]] = hecke_eigenvalues_array[i]

AL_eigenvalues = {}
AL_eigenvalues[ZF.ideal([4, 2, w^2 + w - 7])] = -1

# EXAMPLE:
# pp = ZF.ideal(2).factor()[0][0]
# hecke_eigenvalues[pp]