Number Field Ideals

AUTHORS:

  • Steven Sivek (2005-05-16)

  • William Stein (2007-09-06): vastly improved the doctesting

  • William Stein and John Cremona (2007-01-28): new class NumberFieldFractionalIdeal now used for all except the 0 ideal

  • Radoslav Kirov and Alyson Deines (2010-06-22):

    prime_to_S_part, is_S_unit, is_S_integral

We test that pickling works:

sage: K.<a> = NumberField(x^2 - 5)
sage: I = K.ideal(2/(5+a))
sage: I == loads(dumps(I))
True
class sage.rings.number_field.number_field_ideal.LiftMap(OK, M_OK_map, Q, I)

Bases: object

Class to hold data needed by lifting maps from residue fields to number field orders.

class sage.rings.number_field.number_field_ideal.NumberFieldFractionalIdeal(field, gens, coerce=True)

Bases: sage.structure.element.MultiplicativeGroupElement, sage.rings.number_field.number_field_ideal.NumberFieldIdeal

A fractional ideal in a number field.

EXAMPLES:

sage: R.<x> = PolynomialRing(QQ)
sage: K.<a> = NumberField(x^3 - 2)
sage: I = K.ideal(2/(5+a))
sage: J = I^2
sage: Jinv = I^(-2)
sage: J*Jinv
Fractional ideal (1)
denominator()

Return the denominator ideal of this fractional ideal. Each fractional ideal has a unique expression as \(N/D\) where \(N\), \(D\) are coprime integral ideals; the denominator is \(D\).

EXAMPLES:

sage: K.<i>=NumberField(x^2+1)
sage: I = K.ideal((3+4*i)/5); I
Fractional ideal (4/5*i + 3/5)
sage: I.denominator()
Fractional ideal (2*i + 1)
sage: I.numerator()
Fractional ideal (-i - 2)
sage: I.numerator().is_integral() and I.denominator().is_integral()
True
sage: I.numerator() + I.denominator() == K.unit_ideal()
True
sage: I.numerator()/I.denominator() == I
True
divides(other)

Returns True if this ideal divides other and False otherwise.

EXAMPLES:

sage: K.<a> = CyclotomicField(11); K
Cyclotomic Field of order 11 and degree 10
sage: I = K.factor(31)[0][0]; I
Fractional ideal (31, a^5 + 10*a^4 - a^3 + a^2 + 9*a - 1)
sage: I.divides(I)
True
sage: I.divides(31)
True
sage: I.divides(29)
False
element_1_mod(other)

Returns an element \(r\) in this ideal such that \(1-r\) is in other

An error is raised if either ideal is not integral of if they are not coprime.

INPUT:

  • other – another ideal of the same field, or generators of an ideal.

OUTPUT:

An element \(r\) of the ideal self such that \(1-r\) is in the ideal other

AUTHOR: Maite Aranes (modified to use PARI’s pari:idealaddtoone by Francis Clarke)

EXAMPLES:

sage: K.<a> = NumberField(x^3-2)
sage: A = K.ideal(a+1); A; A.norm()
Fractional ideal (a + 1)
3
sage: B = K.ideal(a^2-4*a+2); B; B.norm()
Fractional ideal (a^2 - 4*a + 2)
68
sage: r = A.element_1_mod(B); r
-33
sage: r in A
True
sage: 1-r in B
True
euler_phi()

Returns the Euler \(\varphi\)-function of this integral ideal.

This is the order of the multiplicative group of the quotient modulo the ideal.

An error is raised if the ideal is not integral.

EXAMPLES:

sage: K.<i>=NumberField(x^2+1)
sage: I = K.ideal(2+i)
sage: [r for r in I.residues() if I.is_coprime(r)]
[-2*i, -i, i, 2*i]
sage: I.euler_phi()
4
sage: J = I^3
sage: J.euler_phi()
100
sage: len([r for r in J.residues() if J.is_coprime(r)])
100
sage: J = K.ideal(3-2*i)
sage: I.is_coprime(J)
True
sage: I.euler_phi()*J.euler_phi() == (I*J).euler_phi()
True
sage: L.<b> = K.extension(x^2 - 7)
sage: L.ideal(3).euler_phi()
64
factor()

Factorization of this ideal in terms of prime ideals.

EXAMPLES:

sage: K.<a> = NumberField(x^4 + 23); K
Number Field in a with defining polynomial x^4 + 23
sage: I = K.ideal(19); I
Fractional ideal (19)
sage: F = I.factor(); F
(Fractional ideal (19, 1/2*a^2 + a - 17/2)) * (Fractional ideal (19, 1/2*a^2 - a - 17/2))
sage: type(F)
<class 'sage.structure.factorization.Factorization'>
sage: list(F)
[(Fractional ideal (19, 1/2*a^2 + a - 17/2), 1), (Fractional ideal (19, 1/2*a^2 - a - 17/2), 1)]
sage: F.prod()
Fractional ideal (19)
idealcoprime(J)

Returns l such that l*self is coprime to J.

INPUT:

  • J - another integral ideal of the same field as self, which must also be integral.

OUTPUT:

  • l - an element such that l*self is coprime to the ideal J

TODO: Extend the implementation to non-integral ideals.

EXAMPLES:

sage: k.<a> = NumberField(x^2 + 23)
sage: A = k.ideal(a+1)
sage: B = k.ideal(3)
sage: A.is_coprime(B)
False
sage: lam = A.idealcoprime(B)
sage: lam  # representation depends, not tested
-1/6*a + 1/6
sage: (lam*A).is_coprime(B)
True

ALGORITHM: Uses Pari function pari:idealcoprime.

ideallog(x, gens=None, check=True)

Returns the discrete logarithm of x with respect to the generators given in the bid structure of the ideal self, or with respect to the generators gens if these are given.

INPUT:

  • x - a non-zero element of the number field of self, which must have valuation equal to 0 at all prime ideals in the support of the ideal self.

  • gens - a list of elements of the number field which generate \((R / I)^*\), where \(R\) is the ring of integers of the field and \(I\) is this ideal, or None. If None, use the generators calculated by idealstar().

  • check - if True, do a consistency check on the results. Ignored if gens is None.

OUTPUT:

  • l - a list of non-negative integers \((x_i)\) such that \(x = \prod_i g_i^{x_i}\) in \((R/I)^*\), where \(x_i\) are the generators, and the list \((x_i)\) is lexicographically minimal with respect to this requirement. If the \(x_i\) generate independent cyclic factors of order \(d_i\), as is the case for the default generators calculated by idealstar(), this just means that \(0 \le x_i < d_i\).

A ValueError will be raised if the elements specified in gens do not in fact generate the unit group (even if the element \(x\) is in the subgroup they generate).

EXAMPLES:

sage: k.<a> = NumberField(x^3 - 11)
sage: A = k.ideal(5)
sage: G = A.idealstar(2)
sage: l = A.ideallog(a^2 +3)
sage: r = G(l).value()
sage: (a^2 + 3) - r in A
True
sage: A.small_residue(r) # random
a^2 - 2

Examples with custom generators:

sage: K.<a> = NumberField(x^2 - 7)
sage: I = K.ideal(17)
sage: I.ideallog(a + 7, [1+a, 2])
[10, 3]
sage: I.ideallog(a + 7, [2, 1+a])
[0, 118]

sage: L.<b> = NumberField(x^4 - x^3 - 7*x^2 + 3*x + 2)
sage: J = L.ideal(-b^3 - b^2 - 2)
sage: u = -14*b^3 + 21*b^2 + b - 1
sage: v = 4*b^2 + 2*b - 1
sage: J.ideallog(5+2*b, [u, v], check=True)
[4, 13]

A non-example:

sage: I.ideallog(a + 7, [2])
Traceback (most recent call last):
...
ValueError: Given elements do not generate unit group -- they generate a subgroup of index 36

ALGORITHM: Uses Pari function pari:ideallog, and (if gens is not None) a Hermite normal form calculation to express the result in terms of the generators gens.

idealstar(flag=1)

Returns the finite abelian group \((O_K/I)^*\), where I is the ideal self of the number field K, and \(O_K\) is the ring of integers of K.

INPUT:

  • flag (int default 1) – when flag =2, it also computes the generators of the group \((O_K/I)^*\), which takes more time. By default flag =1 (no generators are computed). In both cases the special pari structure bid is computed as well. If flag =0 (deprecated) it computes only the group structure of \((O_K/I)^*\) (with generators) and not the special bid structure.

OUTPUT:

The finite abelian group \((O_K/I)^*\).

Note

Uses the pari function pari:idealstar. The pari function outputs a special bid structure which is stored in the internal field _bid of the ideal (when flag=1,2). The special structure bid is used in the pari function pari:ideallog to compute discrete logarithms.

EXAMPLES:

sage: k.<a> = NumberField(x^3 - 11)
sage: A = k.ideal(5)
sage: G = A.idealstar(); G
Multiplicative Abelian group isomorphic to C24 x C4
sage: G.gens()
(f0, f1)

sage: G = A.idealstar(2)
sage: G.gens()
(f0, f1)
sage: G.gens_values()   # random output
(2*a^2 - 1, 2*a^2 + 2*a - 2)
sage: all(G.gen(i).value() in k for i in range(G.ngens()))
True

ALGORITHM: Uses Pari function pari:idealstar

invertible_residues(reduce=True)

Returns a iterator through a list of invertible residues modulo this integral ideal.

An error is raised if this fractional ideal is not integral.

INPUT:

  • reduce - bool. If True (default), use small_residue to get small representatives of the residues.

OUTPUT:

  • An iterator through a list of invertible residues modulo this ideal \(I\), i.e. a list of elements in the ring of integers \(R\) representing the elements of \((R/I)^*\).

ALGORITHM: Use pari:idealstar to find the group structure and generators of the multiplicative group modulo the ideal.

EXAMPLES:

sage: K.<i>=NumberField(x^2+1)
sage: ires =  K.ideal(2).invertible_residues(); ires
xmrange_iter([[0, 1]], <function ...<lambda> at 0x...>)
sage: list(ires)
[1, -i]
sage: list(K.ideal(2+i).invertible_residues())
[1, 2, 4, 3]
sage: list(K.ideal(i).residues())
[0]
sage: list(K.ideal(i).invertible_residues())
[1]
sage: I = K.ideal(3+6*i)
sage: units=I.invertible_residues()
sage: len(list(units))==I.euler_phi()
True

sage: K.<a> = NumberField(x^3-10)
sage: I = K.ideal(a-1)
sage: len(list(I.invertible_residues())) == I.euler_phi()
True

sage: K.<z> = CyclotomicField(10)
sage: len(list(K.primes_above(3)[0].invertible_residues()))
80

AUTHOR: John Cremona

invertible_residues_mod(subgp_gens=[], reduce=True)

Returns a iterator through a list of representatives for the invertible residues modulo this integral ideal, modulo the subgroup generated by the elements in the list subgp_gens.

INPUT:

  • subgp_gens - either None or a list of elements of the number field of self. These need not be integral, but should be coprime to the ideal self. If the list is empty or None, the function returns an iterator through a list of representatives for the invertible residues modulo the integral ideal self.

  • reduce - bool. If True (default), use small_residues to get small representatives of the residues.

Note

See also invertible_residues() for a simpler version without the subgroup.

OUTPUT:

  • An iterator through a list of representatives for the invertible residues modulo self and modulo the group generated by subgp_gens, i.e. a list of elements in the ring of integers \(R\) representing the elements of \((R/I)^*/U\), where \(I\) is this ideal and \(U\) is the subgroup of \((R/I)^*\) generated by subgp_gens.

EXAMPLES:

sage: k.<a> = NumberField(x^2 +23)
sage: I = k.ideal(a)
sage: list(I.invertible_residues_mod([-1]))
[1, 5, 2, 10, 4, 20, 8, 17, 16, 11, 9]
sage: list(I.invertible_residues_mod([1/2]))
[1, 5]
sage: list(I.invertible_residues_mod([23]))
Traceback (most recent call last):
...
TypeError: the element must be invertible mod the ideal
sage: K.<a> = NumberField(x^3-10)
sage: I = K.ideal(a-1)
sage: len(list(I.invertible_residues_mod([]))) == I.euler_phi()
True

sage: I = K.ideal(1)
sage: list(I.invertible_residues_mod([]))
[1]
sage: K.<z> = CyclotomicField(10)
sage: len(list(K.primes_above(3)[0].invertible_residues_mod([])))
80

AUTHOR: Maite Aranes.

is_S_integral(S)

Return True if this fractional ideal is integral with respect to the list of primes S.

INPUT:

  • \(S\) - a list of prime ideals (not checked if they are indeed prime).

Note

This function assumes that \(S\) is a list of prime ideals, but does not check this. This function will fail if \(S\) is not a list of prime ideals.

OUTPUT:

True, if the ideal is \(S\)-integral: that is, if the valuations of the ideal at all primes not in \(S\) are non-negative. False, otherwise.

EXAMPLES:

sage: K.<a> = NumberField(x^2+23)
sage: I = K.ideal(1/2)
sage: P = K.ideal(2,1/2*a - 1/2)
sage: I.is_S_integral([P])
False

sage: J = K.ideal(1/5)
sage: J.is_S_integral([K.ideal(5)])
True
is_S_unit(S)

Return True if this fractional ideal is a unit with respect to the list of primes S.

INPUT:

  • \(S\) - a list of prime ideals (not checked if they are indeed prime).

Note

This function assumes that \(S\) is a list of prime ideals, but does not check this. This function will fail if \(S\) is not a list of prime ideals.

OUTPUT:

True, if the ideal is an \(S\)-unit: that is, if the valuations of the ideal at all primes not in \(S\) are zero. False, otherwise.

EXAMPLES:

sage: K.<a> = NumberField(x^2+23)
sage: I = K.ideal(2)
sage: P = I.factor()[0][0]
sage: I.is_S_unit([P])
False
is_coprime(other)

Returns True if this ideal is coprime to the other, else False.

INPUT:

  • other – another ideal of the same field, or generators of an ideal.

OUTPUT:

True if self and other are coprime, else False.

Note

This function works for fractional ideals as well as integral ideals.

AUTHOR: John Cremona

EXAMPLES:

sage: K.<i>=NumberField(x^2+1)
sage: I = K.ideal(2+i)
sage: J = K.ideal(2-i)
sage: I.is_coprime(J)
True
sage: (I^-1).is_coprime(J^3)
True
sage: I.is_coprime(5)
False
sage: I.is_coprime(6+i)
True

See trac ticket #4536:

sage: E.<a> = NumberField(x^5 + 7*x^4 + 18*x^2 + x - 3)
sage: OE = E.ring_of_integers()
sage: i,j,k = [u[0] for u in factor(3*OE)]
sage: (i/j).is_coprime(j/k)
False
sage: (j/k).is_coprime(j/k)
False

sage: F.<a, b> = NumberField([x^2 - 2, x^2 - 3])
sage: F.ideal(3 - a*b).is_coprime(F.ideal(3))
False
is_maximal()

Return True if this ideal is maximal. This is equivalent to self being prime, since it is nonzero.

EXAMPLES:

sage: K.<a> = NumberField(x^3 + 3); K
Number Field in a with defining polynomial x^3 + 3
sage: K.ideal(5).is_maximal()
False
sage: K.ideal(7).is_maximal()
True
is_trivial(proof=None)

Returns True if this is a trivial ideal.

EXAMPLES:

sage: F.<a> = QuadraticField(-5)
sage: I = F.ideal(3)
sage: I.is_trivial()
False
sage: J = F.ideal(5)
sage: J.is_trivial()
False
sage: (I+J).is_trivial()
True
numerator()

Return the numerator ideal of this fractional ideal.

Each fractional ideal has a unique expression as \(N/D\) where \(N\), \(D\) are coprime integral ideals. The numerator is \(N\).

EXAMPLES:

sage: K.<i>=NumberField(x^2+1)
sage: I = K.ideal((3+4*i)/5); I
Fractional ideal (4/5*i + 3/5)
sage: I.denominator()
Fractional ideal (2*i + 1)
sage: I.numerator()
Fractional ideal (-i - 2)
sage: I.numerator().is_integral() and I.denominator().is_integral()
True
sage: I.numerator() + I.denominator() == K.unit_ideal()
True
sage: I.numerator()/I.denominator() == I
True
prime_factors()

Return a list of the prime ideal factors of self

OUTPUT:

list – list of prime ideals (a new list is returned each time this function is called)

EXAMPLES:

sage: K.<w> = NumberField(x^2 + 23)
sage: I = ideal(w+1)
sage: I.prime_factors()
[Fractional ideal (2, 1/2*w - 1/2), Fractional ideal (2, 1/2*w + 1/2), Fractional ideal (3, 1/2*w + 1/2)]
prime_to_S_part(S)

Return the part of this fractional ideal which is coprime to the prime ideals in the list S.

Note

This function assumes that \(S\) is a list of prime ideals, but does not check this. This function will fail if \(S\) is not a list of prime ideals.

INPUT:

  • \(S\) – a list of prime ideals

OUTPUT:

A fractional ideal coprime to the primes in \(S\), whose prime factorization is that of self with the primes in \(S\) removed.

EXAMPLES:

sage: K.<a> = NumberField(x^2-23)
sage: I = K.ideal(24)
sage: S = [K.ideal(-a+5),K.ideal(5)]
sage: I.prime_to_S_part(S)
Fractional ideal (3)
sage: J = K.ideal(15)
sage: J.prime_to_S_part(S)
Fractional ideal (3)

sage: K.<a> = NumberField(x^5-23)
sage: I = K.ideal(24)
sage: S = [K.ideal(15161*a^4 + 28383*a^3 + 53135*a^2 + 99478*a + 186250),K.ideal(2*a^4 + 3*a^3 + 4*a^2 + 15*a + 11), K.ideal(101)]
sage: I.prime_to_S_part(S)
Fractional ideal (24)
prime_to_idealM_part(M)

Version for integral ideals of the prime_to_m_part function over \(\ZZ\). Returns the largest divisor of self that is coprime to the ideal M.

INPUT:

  • M – an integral ideal of the same field, or generators of an ideal

OUTPUT:

An ideal which is the largest divisor of self that is coprime to \(M\).

AUTHOR: Maite Aranes

EXAMPLES:

sage: k.<a> = NumberField(x^2 + 23)
sage: I = k.ideal(a+1)
sage: M = k.ideal(2, 1/2*a - 1/2)
sage: J = I.prime_to_idealM_part(M); J
Fractional ideal (12, 1/2*a + 13/2)
sage: J.is_coprime(M)
True

sage: J = I.prime_to_idealM_part(2); J
Fractional ideal (3, 1/2*a + 1/2)
sage: J.is_coprime(M)
True
ramification_index()

Return the ramification index of this fractional ideal, assuming it is prime. Otherwise, raise a ValueError.

The ramification index is the power of this prime appearing in the factorization of the prime in \(\ZZ\) that this prime lies over.

EXAMPLES:

sage: K.<a> = NumberField(x^2 + 2); K
Number Field in a with defining polynomial x^2 + 2
sage: f = K.factor(2); f
(Fractional ideal (a))^2
sage: f[0][0].ramification_index()
2
sage: K.ideal(13).ramification_index()
1
sage: K.ideal(17).ramification_index()
Traceback (most recent call last):
...
ValueError: Fractional ideal (17) is not a prime ideal
ray_class_number()

Return the order of the ray class group modulo this ideal. This is a wrapper around Pari’s pari:bnrclassno function.

EXAMPLES:

sage: K.<z> = QuadraticField(-23)
sage: p = K.primes_above(3)[0]
sage: p.ray_class_number()
3

sage: x = polygen(K)
sage: L.<w> = K.extension(x^3 - z)
sage: I = L.ideal(5)
sage: I.ray_class_number()
5184
reduce(f)

Return the canonical reduction of the element of \(f\) modulo the ideal \(I\) (=self). This is an element of \(R\) (the ring of integers of the number field) that is equivalent modulo \(I\) to \(f\).

An error is raised if this fractional ideal is not integral or the element \(f\) is not integral.

INPUT:

  • f - an integral element of the number field

OUTPUT:

An integral element \(g\), such that \(f - g\) belongs to the ideal self and such that \(g\) is a canonical reduced representative of the coset \(f + I\) (\(I\) =self) as described in the residues function, namely an integral element with coordinates \((r_0, \dots,r_{n-1})\), where:

  • \(r_i\) is reduced modulo \(d_i\)

  • \(d_i = b_i[i]\), with \({b_0, b_1, \dots, b_n}\) HNF basis of the ideal self.

Note

The reduced element \(g\) is not necessarily small. To get a small \(g\) use the method small_residue.

EXAMPLES:

sage: k.<a> = NumberField(x^3 + 11)
sage: I = k.ideal(5, a^2 - a + 1)
sage: c = 4*a + 9
sage: I.reduce(c)
a^2 - 2*a
sage: c - I.reduce(c) in I
True

The reduced element is in the list of canonical representatives returned by the residues method:

sage: I.reduce(c) in list(I.residues())
True

The reduced element does not necessarily have smaller norm (use small_residue for that)

sage: c.norm()
25
sage: (I.reduce(c)).norm()
209
sage: (I.small_residue(c)).norm()
10

Sometimes the canonical reduced representative of \(1\) won’t be \(1\) (it depends on the choice of basis for the ring of integers):

sage: k.<a> = NumberField(x^2 + 23)
sage: I = k.ideal(3)
sage: I.reduce(3*a + 1)
-3/2*a - 1/2
sage: k.ring_of_integers().basis()
[1/2*a + 1/2, a]

AUTHOR: Maite Aranes.

residue_class_degree()

Return the residue class degree of this fractional ideal, assuming it is prime. Otherwise, raise a ValueError.

The residue class degree of a prime ideal \(I\) is the degree of the extension \(O_K/I\) of its prime subfield.

EXAMPLES:

sage: K.<a> = NumberField(x^5 + 2); K
Number Field in a with defining polynomial x^5 + 2
sage: f = K.factor(19); f
(Fractional ideal (a^2 + a - 3)) * (Fractional ideal (2*a^4 + a^2 - 2*a + 1)) * (Fractional ideal (a^2 + a - 1))
sage: [i.residue_class_degree() for i, _ in f]
[2, 2, 1]
residue_field(names=None)

Return the residue class field of this fractional ideal, which must be prime.

EXAMPLES:

sage: K.<a> = NumberField(x^3-7)
sage: P = K.ideal(29).factor()[0][0]
sage: P.residue_field()
Residue field in abar of Fractional ideal (2*a^2 + 3*a - 10)
sage: P.residue_field('z')
Residue field in z of Fractional ideal (2*a^2 + 3*a - 10)

Another example:

sage: K.<a> = NumberField(x^3-7)
sage: P = K.ideal(389).factor()[0][0]; P
Fractional ideal (389, a^2 - 44*a - 9)
sage: P.residue_class_degree()
2
sage: P.residue_field()
Residue field in abar of Fractional ideal (389, a^2 - 44*a - 9)
sage: P.residue_field('z')
Residue field in z of Fractional ideal (389, a^2 - 44*a - 9)
sage: FF.<w> = P.residue_field()
sage: FF
Residue field in w of Fractional ideal (389, a^2 - 44*a - 9)
sage: FF((a+1)^390)
36
sage: FF(a)
w

An example of reduction maps to the residue field: these are defined on the whole valuation ring, i.e. the subring of the number field consisting of elements with non-negative valuation. This shows that the issue raised in trac ticket #1951 has been fixed:

sage: K.<i> = NumberField(x^2 + 1)
sage: P1, P2 = [g[0] for g in K.factor(5)]; (P1,P2)
(Fractional ideal (-i - 2), Fractional ideal (2*i + 1))
sage: a = 1/(1+2*i)
sage: F1, F2 = [g.residue_field() for g in [P1,P2]]; (F1,F2)
(Residue field of Fractional ideal (-i - 2), Residue field of Fractional ideal (2*i + 1))
sage: a.valuation(P1)
0
sage: F1(i/7)
4
sage: F1(a)
3
sage: a.valuation(P2)
-1
sage: F2(a)
Traceback (most recent call last):
...
ZeroDivisionError: Cannot reduce field element -2/5*i + 1/5 modulo Fractional ideal (2*i + 1): it has negative valuation

An example with a relative number field:

sage: L.<a,b> = NumberField([x^2 + 1, x^2 - 5])
sage: p = L.ideal((-1/2*b - 1/2)*a + 1/2*b - 1/2)
sage: R = p.residue_field(); R
Residue field in abar of Fractional ideal ((-1/2*b - 1/2)*a + 1/2*b - 1/2)
sage: R.cardinality()
9
sage: R(17)
2
sage: R((a + b)/17)
abar
sage: R(1/b)
2*abar

We verify that trac ticket #8721 is fixed:

sage: L.<a, b> = NumberField([x^2 - 3, x^2 - 5])
sage: L.ideal(a).residue_field()
Residue field in abar of Fractional ideal (a)
residues()

Return a iterator through a complete list of residues modulo this integral ideal.

An error is raised if this fractional ideal is not integral.

OUTPUT:

An iterator through a complete list of residues modulo the integral ideal self. This list is the set of canonical reduced representatives given by all integral elements with coordinates \((r_0, \dots,r_{n-1})\), where:

  • \(r_i\) is reduced modulo \(d_i\)

  • \(d_i = b_i[i]\), with \({b_0, b_1, \dots, b_n}\) HNF basis of the ideal.

AUTHOR: John Cremona (modified by Maite Aranes)

EXAMPLES:

sage: K.<i>=NumberField(x^2+1)
sage: res =  K.ideal(2).residues(); res
xmrange_iter([[0, 1], [0, 1]], <function ...<lambda> at 0x...>)
sage: list(res)
[0, i, 1, i + 1]
sage: list(K.ideal(2+i).residues())
[-2*i, -i, 0, i, 2*i]
sage: list(K.ideal(i).residues())
[0]
sage: I = K.ideal(3+6*i)
sage: reps=I.residues()
sage: len(list(reps)) == I.norm()
True
sage: all(r == s or not (r-s) in I for r in reps for s in reps)  # long time (6s on sage.math, 2011)
True

sage: K.<a> = NumberField(x^3-10)
sage: I = K.ideal(a-1)
sage: len(list(I.residues())) == I.norm()
True

sage: K.<z> = CyclotomicField(11)
sage: len(list(K.primes_above(3)[0].residues())) == 3**5  # long time (5s on sage.math, 2011)
True
small_residue(f)

Given an element \(f\) of the ambient number field, returns an element \(g\) such that \(f - g\) belongs to the ideal self (which must be integral), and \(g\) is small.

Note

The reduced representative returned is not uniquely determined.

ALGORITHM: Uses Pari function pari:nfeltreduce.

EXAMPLES:

sage: k.<a> = NumberField(x^2 + 5)
sage: I = k.ideal(a)
sage: I.small_residue(14)
4
sage: K.<a> = NumberField(x^5 + 7*x^4 + 18*x^2 + x - 3)
sage: I = K.ideal(5)
sage: I.small_residue(a^2 -13)
a^2 + 5*a - 3
support()

Return a list of the prime ideal factors of self

OUTPUT:

list – list of prime ideals (a new list is returned each time this function is called)

EXAMPLES:

sage: K.<w> = NumberField(x^2 + 23)
sage: I = ideal(w+1)
sage: I.prime_factors()
[Fractional ideal (2, 1/2*w - 1/2), Fractional ideal (2, 1/2*w + 1/2), Fractional ideal (3, 1/2*w + 1/2)]
class sage.rings.number_field.number_field_ideal.NumberFieldIdeal(field, gens, coerce=True)

Bases: sage.rings.ideal.Ideal_generic

An ideal of a number field.

S_ideal_class_log(S)

S-class group version of ideal_class_log().

EXAMPLES:

sage: K.<a> = QuadraticField(-14)
sage: S = K.primes_above(2)
sage: I = K.ideal(3, a + 1)
sage: I.S_ideal_class_log(S)
[1]
sage: I.S_ideal_class_log([])
[3]
absolute_norm()

A synonym for norm.

EXAMPLES:

sage: K.<i> = NumberField(x^2 + 1)
sage: K.ideal(1 + 2*i).absolute_norm()
5
absolute_ramification_index()

A synonym for ramification_index.

EXAMPLES:

sage: K.<i> = NumberField(x^2 + 1)
sage: K.ideal(1 + i).absolute_ramification_index()
2
artin_symbol()

Return the Artin symbol \(( K / \QQ, P)\), where \(K\) is the number field of \(P\) =self. This is the unique element \(s\) of the decomposition group of \(P\) such that \(s(x) = x^p \pmod{P}\) where \(p\) is the residue characteristic of \(P\). (Here \(P\) (self) should be prime and unramified.)

See the artin_symbol method of the GaloisGroup_v2 class for further documentation and examples.

EXAMPLES:

sage: QuadraticField(-23, 'w').primes_above(7)[0].artin_symbol()
(1,2)
basis()

Return a basis for this ideal viewed as a \(\ZZ\) -module.

OUTPUT:

An immutable sequence of elements of this ideal (note: their parent is the number field) forming a basis for this ideal.

EXAMPLES:

sage: K.<z> = CyclotomicField(7)
sage: I = K.factor(11)[0][0]
sage: I.basis()           # warning -- choice of basis can be somewhat random
[11, 11*z, 11*z^2, z^3 + 5*z^2 + 4*z + 10, z^4 + z^2 + z + 5, z^5 + z^4 + z^3 + 2*z^2 + 6*z + 5]

An example of a non-integral ideal.:

sage: J = 1/I
sage: J          # warning -- choice of generators can be somewhat random
Fractional ideal (2/11*z^5 + 2/11*z^4 + 3/11*z^3 + 2/11)
sage: J.basis()           # warning -- choice of basis can be somewhat random
[1, z, z^2, 1/11*z^3 + 7/11*z^2 + 6/11*z + 10/11, 1/11*z^4 + 1/11*z^2 + 1/11*z + 7/11, 1/11*z^5 + 1/11*z^4 + 1/11*z^3 + 2/11*z^2 + 8/11*z + 7/11]

Number fields defined by non-monic and non-integral polynomials are supported (trac ticket #252):

sage: K.<a> = NumberField(2*x^2 - 1/3)
sage: K.ideal(a).basis()
[1, a]
coordinates(x)

Returns the coordinate vector of \(x\) with respect to this ideal.

INPUT:

x – an element of the number field (or ring of integers) of this ideal.

OUTPUT:

List giving the coordinates of \(x\) with respect to the integral basis of the ideal. In general this will be a vector of rationals; it will consist of integers if and only if \(x\) is in the ideal.

AUTHOR: John Cremona 2008-10-31

ALGORITHM:

Uses linear algebra. Provides simpler implementations for _contains_(), is_integral() and smallest_integer().

EXAMPLES:

sage: K.<i> = QuadraticField(-1)
sage: I = K.ideal(7+3*i)
sage: Ibasis = I.integral_basis(); Ibasis
[58, i + 41]
sage: a = 23-14*i
sage: acoords = I.coordinates(a); acoords
(597/58, -14)
sage: sum([Ibasis[j]*acoords[j] for j in range(2)]) == a
True
sage: b = 123+456*i
sage: bcoords = I.coordinates(b); bcoords
(-18573/58, 456)
sage: sum([Ibasis[j]*bcoords[j] for j in range(2)]) == b
True
sage: J = K.ideal(0)
sage: J.coordinates(0)
()
sage: J.coordinates(1)
Traceback (most recent call last):
...
TypeError: vector is not in free module
decomposition_group()

Return the decomposition group of self, as a subset of the automorphism group of the number field of self. Raises an error if the field isn’t Galois. See the decomposition_group method of the GaloisGroup_v2 class for further examples and doctests.

EXAMPLES:

sage: QuadraticField(-23, 'w').primes_above(7)[0].decomposition_group()
Subgroup generated by [(1,2)] of (Galois group 2T1 (S2) with order 2 of x^2 + 23)
free_module()

Return the free \(\ZZ\)-module contained in the vector space associated to the ambient number field, that corresponds to this ideal.

EXAMPLES:

sage: K.<z> = CyclotomicField(7)
sage: I = K.factor(11)[0][0]; I
Fractional ideal (-3*z^4 - 2*z^3 - 2*z^2 - 2)
sage: A = I.free_module()
sage: A              # warning -- choice of basis can be somewhat random
Free module of degree 6 and rank 6 over Integer Ring
User basis matrix:
[11  0  0  0  0  0]
[ 0 11  0  0  0  0]
[ 0  0 11  0  0  0]
[10  4  5  1  0  0]
[ 5  1  1  0  1  0]
[ 5  6  2  1  1  1]

However, the actual \(\ZZ\)-module is not at all random:

sage: A.basis_matrix().change_ring(ZZ).echelon_form()
[ 1  0  0  5  1  1]
[ 0  1  0  1  1  7]
[ 0  0  1  7  6 10]
[ 0  0  0 11  0  0]
[ 0  0  0  0 11  0]
[ 0  0  0  0  0 11]

The ideal doesn’t have to be integral:

sage: J = I^(-1)
sage: B = J.free_module()
sage: B.echelonized_basis_matrix()
[ 1/11     0     0  7/11  1/11  1/11]
[    0  1/11     0  1/11  1/11  5/11]
[    0     0  1/11  5/11  4/11 10/11]
[    0     0     0     1     0     0]
[    0     0     0     0     1     0]
[    0     0     0     0     0     1]

This also works for relative extensions:

sage: K.<a,b> = NumberField([x^2 + 1, x^2 + 2])
sage: I = K.fractional_ideal(4)
sage: I.free_module()
Free module of degree 4 and rank 4 over Integer Ring
User basis matrix:
[  4   0   0   0]
[ -3   7  -1   1]
[  3   7   1   1]
[  0 -10   0  -2]
sage: J = I^(-1); J.free_module()
Free module of degree 4 and rank 4 over Integer Ring
User basis matrix:
[  1/4     0     0     0]
[-3/16  7/16 -1/16  1/16]
[ 3/16  7/16  1/16  1/16]
[    0  -5/8     0  -1/8]

An example of intersecting ideals by intersecting free modules.:

sage: K.<a> = NumberField(x^3 + x^2 - 2*x + 8)
sage: I = K.factor(2)
sage: p1 = I[0][0]; p2 = I[1][0]
sage: N = p1.free_module().intersection(p2.free_module()); N
Free module of degree 3 and rank 3 over Integer Ring
Echelon basis matrix:
[  1 1/2 1/2]
[  0   1   1]
[  0   0   2]
sage: N.index_in(p1.free_module()).abs()
2
gens_reduced(proof=None)

Express this ideal in terms of at most two generators, and one if possible.

This function indirectly uses bnfisprincipal, so set proof=True if you want to prove correctness (which is the default).

EXAMPLES:

sage: R.<x> = PolynomialRing(QQ)
sage: K.<a> = NumberField(x^2 + 5)
sage: K.ideal(0).gens_reduced()
(0,)
sage: J = K.ideal([a+2, 9])
sage: J.gens()
(a + 2, 9)
sage: J.gens_reduced()  # random sign
(a + 2,)
sage: K.ideal([a+2, 3]).gens_reduced()
(3, a + 2)
gens_two()

Express this ideal using exactly two generators, the first of which is a generator for the intersection of the ideal with \(Q\).

ALGORITHM: uses PARI’s pari:idealtwoelt function, which runs in randomized polynomial time and is very fast in practice.

EXAMPLES:

sage: R.<x> = PolynomialRing(QQ)
sage: K.<a> = NumberField(x^2 + 5)
sage: J = K.ideal([a+2, 9])
sage: J.gens()
(a + 2, 9)
sage: J.gens_two()
(9, a + 2)
sage: K.ideal([a+5, a+8]).gens_two()
(3, a + 2)
sage: K.ideal(0).gens_two()
(0, 0)

The second generator is zero if and only if the ideal is generated by a rational, in contrast to the PARI function pari:idealtwoelt:

sage: I = K.ideal(12)
sage: pari(K).idealtwoelt(I)  # Note that second element is not zero
[12, [0, 12]~]
sage: I.gens_two()
(12, 0)
ideal_class_log(proof=None)

Return the output of PARI’s pari:bnfisprincipal for this ideal, i.e. a vector expressing the class of this ideal in terms of a set of generators for the class group.

Since it uses the PARI method pari:bnfisprincipal, specify proof=True (this is the default setting) to prove the correctness of the output.

EXAMPLES:

When the class number is 1, the result is always the empty list:

sage: K.<a> = QuadraticField(-163)
sage: J = K.primes_above(random_prime(10^6))[0]
sage: J.ideal_class_log()
[]

An example with class group of order 2. The first ideal is not principal, the second one is:

sage: K.<a> = QuadraticField(-5)
sage: J = K.ideal(23).factor()[0][0]
sage: J.ideal_class_log()
[1]
sage: (J^10).ideal_class_log()
[0]

An example with a more complicated class group:

sage: K.<a, b> = NumberField([x^3 - x + 1, x^2 + 26])
sage: K.class_group()
Class group of order 18 with structure C6 x C3 of Number Field in a with defining polynomial x^3 - x + 1 over its base field
sage: K.primes_above(7)[0].ideal_class_log() # random
[1, 2]
inertia_group()

Return the inertia group of self, i.e. the set of elements s of the Galois group of the number field of self (which we assume is Galois) such that s acts trivially modulo self. This is the same as the 0th ramification group of self. See the inertia_group method of the GaloisGroup_v2 class for further examples and doctests.

EXAMPLES:

sage: QuadraticField(-23, 'w').primes_above(23)[0].inertia_group()
Subgroup generated by [(1,2)] of (Galois group 2T1 (S2) with order 2 of x^2 + 23)
integral_basis()

Return a list of generators for this ideal as a \(\ZZ\)-module.

EXAMPLES:

sage: R.<x> = PolynomialRing(QQ)
sage: K.<i> = NumberField(x^2 + 1)
sage: J = K.ideal(i+1)
sage: J.integral_basis()
[2, i + 1]
integral_split()

Return a tuple \((I, d)\), where \(I\) is an integral ideal, and \(d\) is the smallest positive integer such that this ideal is equal to \(I/d\).

EXAMPLES:

sage: R.<x> = PolynomialRing(QQ)
sage: K.<a> = NumberField(x^2-5)
sage: I = K.ideal(2/(5+a))
sage: I.is_integral()
False
sage: J,d = I.integral_split()
sage: J
Fractional ideal (-1/2*a + 5/2)
sage: J.is_integral()
True
sage: d
5
sage: I == J/d
True
intersection(other)

Return the intersection of self and other.

EXAMPLES:

sage: K.<a> = QuadraticField(-11)
sage: p = K.ideal((a + 1)/2); q = K.ideal((a + 3)/2)
sage: p.intersection(q) == q.intersection(p) == K.ideal(a-2)
True

An example with non-principal ideals:

sage: L.<a> = NumberField(x^3 - 7)
sage: p = L.ideal(a^2 + a + 1, 2)
sage: q = L.ideal(a+1)
sage: p.intersection(q) == L.ideal(8, 2*a + 2)
True

A relative example:

sage: L.<a,b> = NumberField([x^2 + 11, x^2 - 5])
sage: A = L.ideal([15, (-3/2*b + 7/2)*a - 8])
sage: B = L.ideal([6, (-1/2*b + 1)*a - b - 5/2])
sage: A.intersection(B) == L.ideal(-1/2*a - 3/2*b - 1)
True
is_integral()

Return True if this ideal is integral.

EXAMPLES:

sage: R.<x> = PolynomialRing(QQ)
sage: K.<a> = NumberField(x^5-x+1)
sage: K.ideal(a).is_integral()
True
sage: (K.ideal(1) / (3*a+1)).is_integral()
False
is_maximal()

Return True if this ideal is maximal. This is equivalent to self being prime and nonzero.

EXAMPLES:

sage: K.<a> = NumberField(x^3 + 3); K
Number Field in a with defining polynomial x^3 + 3
sage: K.ideal(5).is_maximal()
False
sage: K.ideal(7).is_maximal()
True
is_prime()

Return True if this ideal is prime.

EXAMPLES:

sage: K.<a> = NumberField(x^2 - 17); K
Number Field in a with defining polynomial x^2 - 17
sage: K.ideal(5).is_prime()   # inert prime
True
sage: K.ideal(13).is_prime()  # split
False
sage: K.ideal(17).is_prime()  # ramified
False
is_principal(proof=None)

Return True if this ideal is principal.

Since it uses the PARI method pari:bnfisprincipal, specify proof=True (this is the default setting) to prove the correctness of the output.

EXAMPLES:

sage: K = QuadraticField(-119,'a')
sage: P = K.factor(2)[1][0]
sage: P.is_principal()
False
sage: I = P^5
sage: I.is_principal()
True
sage: I # random
Fractional ideal (-1/2*a + 3/2)
sage: P = K.ideal([2]).factor()[1][0]
sage: I = P^5
sage: I.is_principal()
True
is_zero()

Return True iff self is the zero ideal

Note that \((0)\) is a NumberFieldIdeal, not a NumberFieldFractionalIdeal.

EXAMPLES:

sage: K.<a> = NumberField(x^2 + 2); K
Number Field in a with defining polynomial x^2 + 2
sage: K.ideal(3).is_zero()
False
sage: I=K.ideal(0); I.is_zero()
True
sage: I
Ideal (0) of Number Field in a with defining polynomial x^2 + 2
norm()

Return the norm of this fractional ideal as a rational number.

EXAMPLES:

sage: K.<a> = NumberField(x^4 + 23); K
Number Field in a with defining polynomial x^4 + 23
sage: I = K.ideal(19); I
Fractional ideal (19)
sage: factor(I.norm())
19^4
sage: F = I.factor()
sage: F[0][0].norm().factor()
19^2
number_field()

Return the number field that this is a fractional ideal in.

EXAMPLES:

sage: K.<a> = NumberField(x^2 + 2); K
Number Field in a with defining polynomial x^2 + 2
sage: K.ideal(3).number_field()
Number Field in a with defining polynomial x^2 + 2
sage: K.ideal(0).number_field() # not tested (not implemented)
Number Field in a with defining polynomial x^2 + 2
pari_hnf()

Return PARI’s representation of this ideal in Hermite normal form.

EXAMPLES:

sage: R.<x> = PolynomialRing(QQ)
sage: K.<a> = NumberField(x^3 - 2)
sage: I = K.ideal(2/(5+a))
sage: I.pari_hnf()
[2, 0, 50/127; 0, 2, 244/127; 0, 0, 2/127]
pari_prime()

Returns a PARI prime ideal corresponding to the ideal self.

INPUT:

  • self - a prime ideal.

OUTPUT: a PARI “prime ideal”, i.e. a five-component vector \([p,a,e,f,b]\) representing the prime ideal \(p O_K + a O_K\), \(e\), \(f\) as usual, \(a\) as vector of components on the integral basis, \(b\) Lenstra’s constant.

EXAMPLES:

sage: K.<i> = QuadraticField(-1)
sage: K.ideal(3).pari_prime()
[3, [3, 0]~, 1, 2, 1]
sage: K.ideal(2+i).pari_prime()
[5, [2, 1]~, 1, 1, [-2, -1; 1, -2]]
sage: K.ideal(2).pari_prime()
Traceback (most recent call last):
...
ValueError: Fractional ideal (2) is not a prime ideal
ramification_group(v)

Return the \(v\)’th ramification group of self, i.e. the set of elements \(s\) of the Galois group of the number field of self (which we assume is Galois) such that \(s\) acts trivially modulo the \((v+1)\)’st power of self. See the ramification_group method of the GaloisGroup class for further examples and doctests.

EXAMPLES:

sage: QuadraticField(-23, 'w').primes_above(23)[0].ramification_group(0)
Subgroup generated by [(1,2)] of (Galois group 2T1 (S2) with order 2 of x^2 + 23)
sage: QuadraticField(-23, 'w').primes_above(23)[0].ramification_group(1)
Subgroup generated by [()] of (Galois group 2T1 (S2) with order 2 of x^2 + 23)
random_element(*args, **kwds)

Return a random element of this order.

INPUT:

  • *args, *kwds - Parameters passed to the random integer function. See the documentation of ZZ.random_element() for details.

OUTPUT:

A random element of this fractional ideal, computed as a random \(\ZZ\)-linear combination of the basis.

EXAMPLES:

sage: K.<a> = NumberField(x^3 + 2)
sage: I = K.ideal(1-a)
sage: I.random_element() # random output
-a^2 - a - 19
sage: I.random_element(distribution="uniform") # random output
a^2 - 2*a - 8
sage: I.random_element(-30,30) # random output
-7*a^2 - 17*a - 75
sage: I.random_element(-100, 200).is_integral()
True
sage: I.random_element(-30,30).parent() is K
True

A relative example:

sage: K.<a, b> = NumberField([x^2 + 2, x^2 + 1000*x + 1])
sage: I = K.ideal(1-a)
sage: I.random_element() # random output
17/500002*a^3 + 737253/250001*a^2 - 1494505893/500002*a + 752473260/250001
sage: I.random_element().is_integral()
True
sage: I.random_element(-100, 200).parent() is K
True
reduce_equiv()

Return a small ideal that is equivalent to self in the group of fractional ideals modulo principal ideals. Very often (but not always) if self is principal then this function returns the unit ideal.

ALGORITHM: Calls pari:idealred function.

EXAMPLES:

sage: K.<w> = NumberField(x^2 + 23)
sage: I = ideal(w*23^5); I
Fractional ideal (6436343*w)
sage: I.reduce_equiv()
Fractional ideal (1)
sage: I = K.class_group().0.ideal()^10; I
Fractional ideal (1024, 1/2*w + 979/2)
sage: I.reduce_equiv()
Fractional ideal (2, 1/2*w - 1/2)
relative_norm()

A synonym for norm.

EXAMPLES:

sage: K.<i> = NumberField(x^2 + 1)
sage: K.ideal(1 + 2*i).relative_norm()
5
relative_ramification_index()

A synonym for ramification_index.

EXAMPLES:

sage: K.<i> = NumberField(x^2 + 1)
sage: K.ideal(1 + i).relative_ramification_index()
2
residue_symbol(e, m, check=True)

The m-th power residue symbol for an element e and the proper ideal.

\[\left(\frac{\alpha}{\mathbf{P}}\right) \equiv \alpha^{\frac{N(\mathbf{P})-1}{m}} \operatorname{mod} \mathbf{P}\]

Note

accepts m=1, in which case returns 1

Note

can also be called for an element from sage.rings.number_field_element.residue_symbol

Note

e is coerced into the number field of self

Note

if m=2, e is an integer, and self.number_field() has absolute degree 1 (i.e. it is a copy of the rationals), then this calls kronecker_symbol, which is implemented using GMP.

INPUT:

  • e - element of the number field

  • m - positive integer

OUTPUT:

  • an m-th root of unity in the number field

EXAMPLES:

Quadratic Residue (7 is not a square modulo 11):

sage: K.<a> = NumberField(x - 1)
sage: K.ideal(11).residue_symbol(7,2)
-1

Cubic Residue:

sage: K.<w> = NumberField(x^2 - x + 1)
sage: K.ideal(17).residue_symbol(w^2 + 3,3)
-w

The field must contain the m-th roots of unity:

sage: K.<w> = NumberField(x^2 - x + 1)
sage: K.ideal(17).residue_symbol(w^2 + 3,5)
Traceback (most recent call last):
...
ValueError: The residue symbol to that power is not defined for the number field
smallest_integer()

Return the smallest non-negative integer in \(I \cap \ZZ\), where \(I\) is this ideal. If \(I = 0\), returns 0.

EXAMPLES:

sage: R.<x> = PolynomialRing(QQ)
sage: K.<a> = NumberField(x^2+6)
sage: I = K.ideal([4,a])/7; I
Fractional ideal (2/7, 1/7*a)
sage: I.smallest_integer()
2
valuation(p)

Return the valuation of self at p.

INPUT:

  • p – a prime ideal \(\mathfrak{p}\) of this number field.

OUTPUT:

(integer) The valuation of this fractional ideal at the prime \(\mathfrak{p}\). If \(\mathfrak{p}\) is not prime, raise a ValueError.

EXAMPLES:

sage: K.<a> = NumberField(x^5 + 2); K
Number Field in a with defining polynomial x^5 + 2
sage: i = K.ideal(38); i
Fractional ideal (38)
sage: i.valuation(K.factor(19)[0][0])
1
sage: i.valuation(K.factor(2)[0][0])
5
sage: i.valuation(K.factor(3)[0][0])
0
sage: i.valuation(0)
Traceback (most recent call last):
...
ValueError: p (= Ideal (0) of Number Field in a with defining polynomial x^5 + 2) must be nonzero
sage: K.ideal(0).valuation(K.factor(2)[0][0])
+Infinity
class sage.rings.number_field.number_field_ideal.QuotientMap(K, M_OK_change, Q, I)

Bases: object

Class to hold data needed by quotient maps from number field orders to residue fields. These are only partial maps: the exact domain is the appropriate valuation ring. For examples, see residue_field().

sage.rings.number_field.number_field_ideal.basis_to_module(B, K)

Given a basis \(B\) of elements for a \(\ZZ\)-submodule of a number field \(K\), return the corresponding \(\ZZ\)-submodule.

EXAMPLES:

sage: K.<w> = NumberField(x^4 + 1)
sage: from sage.rings.number_field.number_field_ideal import basis_to_module
sage: basis_to_module([K.0, K.0^2 + 3], K)
Free module of degree 4 and rank 2 over Integer Ring
User basis matrix:
[0 1 0 0]
[3 0 1 0]
sage.rings.number_field.number_field_ideal.is_NumberFieldFractionalIdeal(x)

Return True if x is a fractional ideal of a number field.

EXAMPLES:

sage: from sage.rings.number_field.number_field_ideal import is_NumberFieldFractionalIdeal
sage: is_NumberFieldFractionalIdeal(2/3)
False
sage: is_NumberFieldFractionalIdeal(ideal(5))
False
sage: k.<a> = NumberField(x^2 + 2)
sage: I = k.ideal([a + 1]); I
Fractional ideal (a + 1)
sage: is_NumberFieldFractionalIdeal(I)
True
sage: Z = k.ideal(0); Z
Ideal (0) of Number Field in a with defining polynomial x^2 + 2
sage: is_NumberFieldFractionalIdeal(Z)
False
sage.rings.number_field.number_field_ideal.is_NumberFieldIdeal(x)

Return True if x is an ideal of a number field.

EXAMPLES:

sage: from sage.rings.number_field.number_field_ideal import is_NumberFieldIdeal
sage: is_NumberFieldIdeal(2/3)
False
sage: is_NumberFieldIdeal(ideal(5))
False
sage: k.<a> = NumberField(x^2 + 2)
sage: I = k.ideal([a + 1]); I
Fractional ideal (a + 1)
sage: is_NumberFieldIdeal(I)
True
sage: Z = k.ideal(0); Z
Ideal (0) of Number Field in a with defining polynomial x^2 + 2
sage: is_NumberFieldIdeal(Z)
True
sage.rings.number_field.number_field_ideal.quotient_char_p(I, p)

Given an integral ideal \(I\) that contains a prime number \(p\), compute a vector space \(V = (O_K \mod p) / (I \mod p)\), along with a homomorphism \(O_K \to V\) and a section \(V \to O_K\).

EXAMPLES:

sage: from sage.rings.number_field.number_field_ideal import quotient_char_p

sage: K.<i> = NumberField(x^2 + 1); O = K.maximal_order(); I = K.fractional_ideal(15)
sage: quotient_char_p(I, 5)[0]
Vector space quotient V/W of dimension 2 over Finite Field of size 5 where
V: Vector space of dimension 2 over Finite Field of size 5
W: Vector space of degree 2 and dimension 0 over Finite Field of size 5
Basis matrix:
[]
sage: quotient_char_p(I, 3)[0]
Vector space quotient V/W of dimension 2 over Finite Field of size 3 where
V: Vector space of dimension 2 over Finite Field of size 3
W: Vector space of degree 2 and dimension 0 over Finite Field of size 3
Basis matrix:
[]

sage: I = K.factor(13)[0][0]; I
Fractional ideal (-3*i - 2)
sage: I.residue_class_degree()
1
sage: quotient_char_p(I, 13)[0]
Vector space quotient V/W of dimension 1 over Finite Field of size 13 where
V: Vector space of dimension 2 over Finite Field of size 13
W: Vector space of degree 2 and dimension 1 over Finite Field of size 13
Basis matrix:
[1 8]