Ring \(\ZZ\) of Integers¶
The IntegerRing_class
represents the ring \(\ZZ\) of (arbitrary
precision) integers. Each integer is an instance of Integer
,
which is defined in a Pyrex extension module that wraps GMP integers
(the mpz_t
type in GMP).
sage: Z = IntegerRing(); Z
Integer Ring
sage: Z.characteristic()
0
sage: Z.is_field()
False
There is a unique instance of the integer ring
.
To create an Integer
, coerce either a Python int, long, or a string. Various
other types will also coerce to the integers, when it makes sense.
sage: a = Z(1234); a
1234
sage: b = Z(5678); b
5678
sage: type(a)
<type 'sage.rings.integer.Integer'>
sage: a + b
6912
sage: Z('94803849083985934859834583945394')
94803849083985934859834583945394
- sage.rings.integer_ring.IntegerRing()¶
Return the integer ring.
EXAMPLES:
sage: IntegerRing() Integer Ring sage: ZZ==IntegerRing() True
- class sage.rings.integer_ring.IntegerRing_class¶
Bases:
sage.rings.ring.PrincipalIdealDomain
The ring of integers.
In order to introduce the ring \(\ZZ\) of integers, we illustrate creation, calling a few functions, and working with its elements.
sage: Z = IntegerRing(); Z Integer Ring sage: Z.characteristic() 0 sage: Z.is_field() False sage: Z.category() Join of Category of euclidean domains and Category of infinite enumerated sets and Category of metric spaces sage: Z(2^(2^5) + 1) 4294967297
One can give strings to create integers. Strings starting with
0x
are interpreted as hexadecimal, and strings starting with0o
are interpreted as octal:sage: parent('37') <... 'str'> sage: parent(Z('37')) Integer Ring sage: Z('0x10') 16 sage: Z('0x1a') 26 sage: Z('0o20') 16
As an inverse to
digits()
, lists of digits are accepted, provided that you give a base. The lists are interpreted in little-endian order, so that entryi
of the list is the coefficient ofbase^i
:sage: Z([4,1,7],base=100) 70104 sage: Z([4,1,7],base=10) 714 sage: Z([3, 7], 10) 73 sage: Z([3, 7], 9) 66 sage: Z([], 10) 0
Alphanumeric strings can be used for bases 2..36; letters
a
toz
represent numbers 10 to 36. Letter case does not matter.sage: Z("sage",base=32) 928270 sage: Z("SAGE",base=32) 928270 sage: Z("Sage",base=32) 928270 sage: Z([14, 16, 10, 28],base=32) 928270 sage: 14 + 16*32 + 10*32^2 + 28*32^3 928270
We next illustrate basic arithmetic in \(\ZZ\):
sage: a = Z(1234); a 1234 sage: b = Z(5678); b 5678 sage: type(a) <type 'sage.rings.integer.Integer'> sage: a + b 6912 sage: b + a 6912 sage: a * b 7006652 sage: b * a 7006652 sage: a - b -4444 sage: b - a 4444
When we divide two integers using
/
, the result is automatically coerced to the field of rational numbers, even if the result is an integer.sage: a / b 617/2839 sage: type(a/b) <type 'sage.rings.rational.Rational'> sage: a/a 1 sage: type(a/a) <type 'sage.rings.rational.Rational'>
For floor division, use the
//
operator instead:sage: a // b 0 sage: type(a//b) <type 'sage.rings.integer.Integer'>
Next we illustrate arithmetic with automatic coercion. The types that coerce are: str, int, long, Integer.
sage: a + 17 1251 sage: a * 374 461516 sage: 374 * a 461516 sage: a/19 1234/19 sage: 0 + Z(-64) -64
Integers can be coerced:
sage: a = Z(-64) sage: int(a) -64
We can create integers from several types of objects:
sage: Z(17/1) 17 sage: Z(Mod(19,23)) 19 sage: Z(2 + 3*5 + O(5^3)) 17
Arbitrary numeric bases are supported; strings or list of integers are used to provide the digits (more details in
IntegerRing_class
):sage: Z("sage",base=32) 928270 sage: Z([14, 16, 10, 28],base=32) 928270
The
digits
method allows you to get the list of digits of an integer in a different basis (note that the digits are returned in little-endian order):sage: b = Z([4,1,7],base=100) sage: b 70104 sage: b.digits(base=71) [27, 64, 13] sage: Z(15).digits(2) [1, 1, 1, 1] sage: Z(15).digits(3) [0, 2, 1]
The
str
method returns a string of the digits, using lettersa
toz
to represent digits 10..36:sage: Z(928270).str(base=32) 'sage'
Note that
str
only works with bases 2 through 36.- absolute_degree()¶
Return the absolute degree of the integers, which is 1.
Here, absolute degree refers to the rank of the ring as a module over the integers.
EXAMPLES:
sage: ZZ.absolute_degree() 1
- characteristic()¶
Return the characteristic of the integers, which is 0.
EXAMPLES:
sage: ZZ.characteristic() 0
- completion(p, prec, extras={})¶
Return the metric completion of the integers at the prime \(p\).
INPUT:
p
– a prime (orinfinity
)prec
– the desired precisionextras
– any further parameters to pass to the method used to create the completion.
OUTPUT:
The completion of \(\ZZ\) at \(p\).
EXAMPLES:
sage: ZZ.completion(infinity, 53) Integer Ring sage: ZZ.completion(5, 15, {'print_mode': 'bars'}) 5-adic Ring with capped relative precision 15
- degree()¶
Return the degree of the integers, which is 1.
Here, degree refers to the rank of the ring as a module over the integers.
EXAMPLES:
sage: ZZ.degree() 1
- extension(poly, names, **kwds)¶
Return the order generated by the specified list of polynomials.
INPUT:
poly
– a list of one or more polynomialsnames
– a parameter which will be passed toEquationOrder()
.embedding
– a parameter which will be passed toEquationOrder()
.
OUTPUT:
Given a single polynomial as input, return the order generated by a root of the polynomial in the field generated by a root of the polynomial.
Given a list of polynomials as input, return the relative order generated by a root of the first polynomial in the list, over the order generated by the roots of the subsequent polynomials.
EXAMPLES:
sage: ZZ.extension(x^2-5, 'a') Order in Number Field in a with defining polynomial x^2 - 5 sage: ZZ.extension([x^2 + 1, x^2 + 2], 'a,b') Relative Order in Number Field in a with defining polynomial x^2 + 1 over its base field
- fraction_field()¶
Return the field of rational numbers - the fraction field of the integers.
EXAMPLES:
sage: ZZ.fraction_field() Rational Field sage: ZZ.fraction_field() == QQ True
- gen(n=0)¶
Return the additive generator of the integers, which is 1.
INPUT:
n
(default: 0) – In a ring with more than one generator, the optional parameter \(n\) indicates which generator to return; since there is only one generator in this case, the only valid value for \(n\) is 0.
EXAMPLES:
sage: ZZ.gen() 1 sage: type(ZZ.gen()) <type 'sage.rings.integer.Integer'>
- gens()¶
Return the tuple
(1,)
containing a single element, the additive generator of the integers, which is 1.EXAMPLES:
sage: ZZ.gens(); ZZ.gens()[0] (1,) 1 sage: type(ZZ.gens()[0]) <type 'sage.rings.integer.Integer'>
- is_field(proof=True)¶
Return
False
since the integers are not a field.EXAMPLES:
sage: ZZ.is_field() False
- is_integrally_closed()¶
Return that the integer ring is, in fact, integrally closed.
EXAMPLES:
sage: ZZ.is_integrally_closed() True
- is_noetherian()¶
Return
True
since the integers are a Noetherian ring.EXAMPLES:
sage: ZZ.is_noetherian() True
- krull_dimension()¶
Return the Krull dimension of the integers, which is 1.
EXAMPLES:
sage: ZZ.krull_dimension() 1
- ngens()¶
Return the number of additive generators of the ring, which is 1.
EXAMPLES:
sage: ZZ.ngens() 1 sage: len(ZZ.gens()) 1
- order()¶
Return the order (cardinality) of the integers, which is
+Infinity
.EXAMPLES:
sage: ZZ.order() +Infinity
- parameter()¶
Return an integer of degree 1 for the Euclidean property of \(\ZZ\), namely 1.
EXAMPLES:
sage: ZZ.parameter() 1
- quotient(I, names=None, **kwds)¶
Return the quotient of \(\ZZ\) by the ideal or integer
I
.EXAMPLES:
sage: ZZ.quo(6*ZZ) Ring of integers modulo 6 sage: ZZ.quo(0*ZZ) Integer Ring sage: ZZ.quo(3) Ring of integers modulo 3 sage: ZZ.quo(3*QQ) Traceback (most recent call last): ... TypeError: I must be an ideal of ZZ
- random_element(x=None, y=None, distribution=None)¶
Return a random integer.
INPUT:
x
,y
integers – bounds for the result.distribution
– a string:'uniform'
'mpz_rrandomb'
'1/n'
'gaussian'
OUTPUT:
With no input, return a random integer.
If only one integer \(x\) is given, return an integer between 0 and \(x-1\).
If two integers are given, return an integer between \(x\) and \(y-1\) inclusive.
If at least one bound is given, the default distribution is the uniform distribution; otherwise, it is the distribution described below.
If the distribution
'1/n'
is specified, the bounds are ignored.If the distribution
'mpz_rrandomb'
is specified, the output is in the range from 0 to \(2^x - 1\).If the distribution
'gaussian'
is specified, the output is sampled from a discrete Gaussian distribution with parameter \(\sigma=x\) and centered at zero. That is, the integer \(v\) is returned with probability proportional to \(\mathrm{exp}(-v^2/(2\sigma^2))\). Seesage.stats.distributions.discrete_gaussian_integer
for details. Note that if many samples from the same discrete Gaussian distribution are needed, it is faster to construct asage.stats.distributions.discrete_gaussian_integer.DiscreteGaussianDistributionIntegerSampler
object which is then repeatedly queried.
The default distribution for
ZZ.random_element()
is based on \(X = \mbox{trunc}(4/(5R))\), where \(R\) is a random variable uniformly distributed between \(-1\) and \(1\). This gives \(\mbox{Pr}(X = 0) = 1/5\), and \(\mbox{Pr}(X = n) = 2/(5|n|(|n|+1))\) for \(n \neq 0\). Most of the samples will be small; \(-1\), \(0\), and \(1\) occur with probability \(1/5\) each. But we also have a small but non-negligible proportion of “outliers”; \(\mbox{Pr}(|X| \geq n) = 4/(5n)\), so for instance, we expect that \(|X| \geq 1000\) on one in 1250 samples.We actually use an easy-to-compute truncation of the above distribution; the probabilities given above hold fairly well up to about \(|n| = 10000\), but around \(|n| = 30000\) some values will never be returned at all, and we will never return anything greater than \(2^{30}\).
EXAMPLES:
sage: [ZZ.random_element() for _ in range(10)] [-8, 2, 0, 0, 1, -1, 2, 1, -95, -1]
The default uniform distribution is integers in \([-2, 2]\):
sage: [ZZ.random_element(distribution="uniform") for _ in range(10)] [2, -2, 2, -2, -1, 1, -1, 2, 1, 0]
Here we use the distribution
'1/n'
:sage: [ZZ.random_element(distribution="1/n") for _ in range(10)] [-6, 1, -1, 1, 1, -1, 1, -1, -3, 1]
If a range is given, the default distribution is uniform in that range:
sage: ZZ.random_element(-10,10) -2 sage: ZZ.random_element(10) 2 sage: ZZ.random_element(10^50) 9531604786291536727294723328622110901973365898988 sage: [ZZ.random_element(5) for _ in range(10)] [3, 1, 2, 3, 0, 0, 3, 4, 0, 3]
Notice that the right endpoint is not included:
sage: [ZZ.random_element(-2,2) for _ in range(10)] [1, -2, -2, -1, -2, -1, -1, -2, 0, -2]
We compute a histogram over 1000 samples of the default distribution:
sage: from collections import defaultdict sage: d = defaultdict(lambda: 0) sage: for _ in range(1000): ....: samp = ZZ.random_element() ....: d[samp] = d[samp] + 1 sage: sorted(d.items()) [(-1955, 1), (-1026, 1), (-357, 1), (-248, 1), (-145, 1), (-81, 1), (-80, 1), (-79, 1), (-75, 1), (-69, 1), (-68, 1), (-63, 2), (-61, 1), (-57, 1), (-50, 1), (-37, 1), (-35, 1), (-33, 1), (-29, 2), (-27, 1), (-25, 1), (-23, 2), (-22, 3), (-20, 1), (-19, 1), (-18, 1), (-16, 4), (-15, 3), (-14, 1), (-13, 2), (-12, 2), (-11, 2), (-10, 7), (-9, 3), (-8, 3), (-7, 7), (-6, 8), (-5, 13), (-4, 24), (-3, 34), (-2, 75), (-1, 206), (0, 208), (1, 189), (2, 63), (3, 35), (4, 13), (5, 11), (6, 10), (7, 4), (8, 3), (10, 1), (11, 1), (12, 1), (13, 1), (14, 1), (16, 3), (18, 2), (19, 1), (26, 2), (27, 1), (28, 2), (29, 1), (30, 1), (32, 1), (33, 2), (35, 1), (37, 1), (39, 1), (41, 1), (42, 1), (52, 1), (91, 1), (94, 1), (106, 1), (111, 1), (113, 2), (132, 1), (134, 1), (232, 1), (240, 1), (2133, 1), (3636, 1)]
We return a sample from a discrete Gaussian distribution:
sage: ZZ.random_element(11.0, distribution="gaussian") 5
- range(start, end=None, step=None)¶
Optimized range function for Sage integers.
AUTHORS:
Robert Bradshaw (2007-09-20)
EXAMPLES:
sage: ZZ.range(10) [0, 1, 2, 3, 4, 5, 6, 7, 8, 9] sage: ZZ.range(-5,5) [-5, -4, -3, -2, -1, 0, 1, 2, 3, 4] sage: ZZ.range(0,50,5) [0, 5, 10, 15, 20, 25, 30, 35, 40, 45] sage: ZZ.range(0,50,-5) [] sage: ZZ.range(50,0,-5) [50, 45, 40, 35, 30, 25, 20, 15, 10, 5] sage: ZZ.range(50,0,5) [] sage: ZZ.range(50,-1,-5) [50, 45, 40, 35, 30, 25, 20, 15, 10, 5, 0]
It uses different code if the step doesn’t fit in a long:
sage: ZZ.range(0,2^83,2^80) [0, 1208925819614629174706176, 2417851639229258349412352, 3626777458843887524118528, 4835703278458516698824704, 6044629098073145873530880, 7253554917687775048237056, 8462480737302404222943232]
Make sure trac ticket #8818 is fixed:
sage: ZZ.range(1r, 10r) [1, 2, 3, 4, 5, 6, 7, 8, 9]
- residue_field(prime, check=True, names=None)¶
Return the residue field of the integers modulo the given prime, i.e. \(\ZZ/p\ZZ\).
INPUT:
prime
- a prime numbercheck
- (boolean, defaultTrue
) whether or not to check the primality of primenames
- ignored (for compatibility with number fields)
OUTPUT: The residue field at this prime.
EXAMPLES:
sage: F = ZZ.residue_field(61); F Residue field of Integers modulo 61 sage: pi = F.reduction_map(); pi Partially defined reduction map: From: Rational Field To: Residue field of Integers modulo 61 sage: pi(123/234) 6 sage: pi(1/61) Traceback (most recent call last): ... ZeroDivisionError: Cannot reduce rational 1/61 modulo 61: it has negative valuation sage: lift = F.lift_map(); lift Lifting map: From: Residue field of Integers modulo 61 To: Integer Ring sage: lift(F(12345/67890)) 33 sage: (12345/67890) % 61 33
Construction can be from a prime ideal instead of a prime:
sage: ZZ.residue_field(ZZ.ideal(97)) Residue field of Integers modulo 97
- valuation(p)¶
Return the discrete valuation with uniformizer
p
.EXAMPLES:
sage: v = ZZ.valuation(3); v 3-adic valuation sage: v(3) 1
See also
- zeta(n=2)¶
Return a primitive
n
-th root of unity in the integers, or raise an error if none exists.INPUT:
n
– (default 2) a positive integer
OUTPUT:
an
n
-th root of unity in \(\ZZ\).
EXAMPLES:
sage: ZZ.zeta() -1 sage: ZZ.zeta(1) 1 sage: ZZ.zeta(3) Traceback (most recent call last): ... ValueError: no nth root of unity in integer ring sage: ZZ.zeta(0) Traceback (most recent call last): ... ValueError: n must be positive in zeta()
- sage.rings.integer_ring.crt_basis(X, xgcd=None)¶
Compute and return a Chinese Remainder Theorem basis for the list
X
of coprime integers.INPUT:
X
– a list of Integers that are coprime in pairs.xgcd
– an optional parameter which is ignored.
OUTPUT:
E
- a list of Integers such thatE[i] = 1
(modX[i]
) andE[i] = 0
(modX[j]
) for all \(j \neq i\).
For this explanation, let
E[i]
be denoted by \(E_i\).The \(E_i\) have the property that if \(A\) is a list of objects, e.g., integers, vectors, matrices, etc., where \(A_i\) is understood modulo \(X_i\), then a CRT lift of \(A\) is simply
\[\sum_i E_i A_i.\]ALGORITHM: To compute \(E_i\), compute integers \(s\) and \(t\) such that
\[s X_i + t \prod_{i \neq j} X_j = 1. (\*)\]Then
\[E_i = t \prod_{i \neq j} X[j].\]Notice that equation (*) implies that \(E_i\) is congruent to 1 modulo \(X_i\) and to 0 modulo the other \(X_j\) for \(j \neq i\).
COMPLEXITY: We compute
len(X)
extended GCD’s.EXAMPLES:
sage: X = [11,20,31,51] sage: E = crt_basis([11,20,31,51]) sage: E[0]%X[0], E[1]%X[0], E[2]%X[0], E[3]%X[0] (1, 0, 0, 0) sage: E[0]%X[1], E[1]%X[1], E[2]%X[1], E[3]%X[1] (0, 1, 0, 0) sage: E[0]%X[2], E[1]%X[2], E[2]%X[2], E[3]%X[2] (0, 0, 1, 0) sage: E[0]%X[3], E[1]%X[3], E[2]%X[3], E[3]%X[3] (0, 0, 0, 1)
- sage.rings.integer_ring.is_IntegerRing(x)¶
Internal function: return
True
iffx
is the ring \(\ZZ\) of integers.