Fraction Field Elements¶
AUTHORS:
William Stein (input from David Joyner, David Kohel, and Joe Wetherell)
Sebastian Pancratz (2010-01-06): Rewrite of addition, multiplication and derivative to use Henrici’s algorithms [Hor1972]
- class sage.rings.fraction_field_element.FractionFieldElement¶
Bases:
sage.structure.element.FieldElement
EXAMPLES:
sage: K = FractionField(PolynomialRing(QQ, 'x')) sage: K Fraction Field of Univariate Polynomial Ring in x over Rational Field sage: loads(K.dumps()) == K True sage: x = K.gen() sage: f = (x^3 + x)/(17 - x^19); f (-x^3 - x)/(x^19 - 17) sage: loads(f.dumps()) == f True
- denominator()¶
Return the denominator of
self
.EXAMPLES:
sage: R.<x,y> = ZZ[] sage: f = x/y+1; f (x + y)/y sage: f.denominator() y
- is_one()¶
Return
True
if this element is equal to one.EXAMPLES:
sage: F = ZZ['x,y'].fraction_field() sage: x,y = F.gens() sage: (x/x).is_one() True sage: (x/y).is_one() False
- is_square(root=False)¶
Return whether or not
self
is a perfect square.If the optional argument
root
isTrue
, then also returns a square root (orNone
, if the fraction field element is not square).INPUT:
root
– whether or not to also return a square root (default:False
)
OUTPUT:
bool
- whether or not a squareobject
- (optional) an actual square root if found, and None otherwise.
EXAMPLES:
sage: R.<t> = QQ[] sage: (1/t).is_square() False sage: (1/t^6).is_square() True sage: ((1+t)^4/t^6).is_square() True sage: (4*(1+t)^4/t^6).is_square() True sage: (2*(1+t)^4/t^6).is_square() False sage: ((1+t)/t^6).is_square() False sage: (4*(1+t)^4/t^6).is_square(root=True) (True, (2*t^2 + 4*t + 2)/t^3) sage: (2*(1+t)^4/t^6).is_square(root=True) (False, None) sage: R.<x> = QQ[] sage: a = 2*(x+1)^2 / (2*(x-1)^2); a (x^2 + 2*x + 1)/(x^2 - 2*x + 1) sage: a.is_square() True sage: (0/x).is_square() True
- is_zero()¶
Return
True
if this element is equal to zero.EXAMPLES:
sage: F = ZZ['x,y'].fraction_field() sage: x,y = F.gens() sage: t = F(0)/x sage: t.is_zero() True sage: u = 1/x - 1/x sage: u.is_zero() True sage: u.parent() is F True
- nth_root(n)¶
Return a
n
-th root of this element.EXAMPLES:
sage: R = QQ['t'].fraction_field() sage: t = R.gen() sage: p = (t+1)^3 / (t^2+t-1)^3 sage: p.nth_root(3) (t + 1)/(t^2 + t - 1) sage: p = (t+1) / (t-1) sage: p.nth_root(2) Traceback (most recent call last): ... ValueError: not a 2nd power
- numerator()¶
Return the numerator of
self
.EXAMPLES:
sage: R.<x,y> = ZZ[] sage: f = x/y+1; f (x + y)/y sage: f.numerator() x + y
- reduce()¶
Reduce this fraction.
Divides out the gcd of the numerator and denominator. If the denominator becomes a unit, it becomes 1. Additionally, depending on the base ring, the leading coefficients of the numerator and the denominator may be normalized to 1.
Automatically called for exact rings, but because it may be numerically unstable for inexact rings it must be called manually in that case.
EXAMPLES:
sage: R.<x> = RealField(10)[] sage: f = (x^2+2*x+1)/(x+1); f (x^2 + 2.0*x + 1.0)/(x + 1.0) sage: f.reduce(); f x + 1.0
- specialization(D=None, phi=None)¶
Returns the specialization of a fraction element of a polynomial ring
- valuation(v=None)¶
Return the valuation of
self
, assuming that the numerator and denominator have valuation functions defined on them.EXAMPLES:
sage: x = PolynomialRing(RationalField(),'x').gen() sage: f = (x^3 + x)/(x^2 - 2*x^3) sage: f (-1/2*x^2 - 1/2)/(x^2 - 1/2*x) sage: f.valuation() -1 sage: f.valuation(x^2+1) 1
- class sage.rings.fraction_field_element.FractionFieldElement_1poly_field¶
Bases:
sage.rings.fraction_field_element.FractionFieldElement
A fraction field element where the parent is the fraction field of a univariate polynomial ring over a field.
Many of the functions here are included for coherence with number fields.
- is_integral()¶
Returns whether this element is actually a polynomial.
EXAMPLES:
sage: R.<t> = QQ[] sage: elt = (t^2 + t - 2) / (t + 2); elt # == (t + 2)*(t - 1)/(t + 2) t - 1 sage: elt.is_integral() True sage: elt = (t^2 - t) / (t+2); elt # == t*(t - 1)/(t + 2) (t^2 - t)/(t + 2) sage: elt.is_integral() False
- reduce()¶
Pick a normalized representation of self.
In particular, for any a == b, after normalization they will have the same numerator and denominator.
EXAMPLES:
For univariate rational functions over a field, we have:
sage: R.<x> = QQ[] sage: (2 + 2*x) / (4*x) # indirect doctest (1/2*x + 1/2)/x
Compare with:
sage: R.<x> = ZZ[] sage: (2 + 2*x) / (4*x) (x + 1)/(2*x)
- support()¶
Returns a sorted list of primes dividing either the numerator or denominator of this element.
EXAMPLES:
sage: R.<t> = QQ[] sage: h = (t^14 + 2*t^12 - 4*t^11 - 8*t^9 + 6*t^8 + 12*t^6 - 4*t^5 - 8*t^3 + t^2 + 2)/(t^6 + 6*t^5 + 9*t^4 - 2*t^2 - 12*t - 18) sage: h.support() [t - 1, t + 3, t^2 + 2, t^2 + t + 1, t^4 - 2]
- sage.rings.fraction_field_element.is_FractionFieldElement(x)¶
Return whether or not
x
is aFractionFieldElement
.EXAMPLES:
sage: from sage.rings.fraction_field_element import is_FractionFieldElement sage: R.<x> = ZZ[] sage: is_FractionFieldElement(x/2) False sage: is_FractionFieldElement(2/x) True sage: is_FractionFieldElement(1/3) False
- sage.rings.fraction_field_element.make_element(parent, numerator, denominator)¶
Used for unpickling
FractionFieldElement
objects (and subclasses).EXAMPLES:
sage: from sage.rings.fraction_field_element import make_element sage: R = ZZ['x,y'] sage: x,y = R.gens() sage: F = R.fraction_field() sage: make_element(F, 1+x, 1+y) (x + 1)/(y + 1)
- sage.rings.fraction_field_element.make_element_old(parent, cdict)¶
Used for unpickling old
FractionFieldElement
pickles.EXAMPLES:
sage: from sage.rings.fraction_field_element import make_element_old sage: R.<x,y> = ZZ[] sage: F = R.fraction_field() sage: make_element_old(F, {'_FractionFieldElement__numerator':x+y,'_FractionFieldElement__denominator':x-y}) (x + y)/(x - y)