The coercion model#
The coercion model manages how elements of one parent get related to elements of another. For example, the integer 2 can canonically be viewed as an element of the rational numbers. (The parent of a non-element is its Python type.)
sage: ZZ(2).parent()
Integer Ring
sage: QQ(2).parent()
Rational Field
The most prominent role of the coercion model is to make sense of binary operations between elements that have distinct parents. It does this by finding a parent where both elements make sense, and doing the operation there. For example:
sage: a = 1/2; a.parent()
Rational Field
sage: b = ZZ['x'].gen(); b.parent()
Univariate Polynomial Ring in x over Integer Ring
sage: a+b
x + 1/2
sage: (a+b).parent()
Univariate Polynomial Ring in x over Rational Field
If there is a coercion (see below) from one of the parents to the other, the operation is always performed in the codomain of that coercion. Otherwise a reasonable attempt to create a new parent with coercion maps from both original parents is made. The results of these discoveries are cached. On failure, a TypeError is always raised.
Some arithmetic operations (such as multiplication) can indicate an action rather than arithmetic in a common parent. For example:
sage: E = EllipticCurve('37a')
sage: P = E(0,0)
sage: 5*P
(1/4 : -5/8 : 1)
where there is action of \(\ZZ\) on the points of \(E\) given by the additive group law. Parents can specify how they act on or are acted upon by other parents.
There are two kinds of ways to get from one parent to another, coercions and conversions.
Coercions are canonical (possibly modulo a finite number of deterministic choices) morphisms, and the set of all coercions between all parents forms a commuting diagram (modulo possibly rounding issues). \(\ZZ \rightarrow \QQ\) is an example of a coercion. These are invoked implicitly by the coercion model.
Conversions try to construct an element out of their input if at all possible. Examples include sections of coercions, creating an element from a string or list, etc. and may fail on some inputs of a given type while succeeding on others (i.e. they may not be defined on the whole domain). Conversions are always explicitly invoked, and never used by the coercion model to resolve binary operations.
For more information on how to specify coercions, conversions, and actions,
see the documentation for Parent.
- class sage.structure.coerce.CoercionModel#
Bases:
objectSee also sage.categories.pushout
EXAMPLES:
sage: f = ZZ['t','x'].0 + QQ['x'].0 + CyclotomicField(13).gen(); f t + x + zeta13 sage: f.parent() Multivariate Polynomial Ring in t, x over Cyclotomic Field of order 13 and degree 12 sage: ZZ['x','y'].0 + ~Frac(QQ['y']).0 (x*y + 1)/y sage: MatrixSpace(ZZ['x'], 2, 2)(2) + ~Frac(QQ['x']).0 [(2*x + 1)/x 0] [ 0 (2*x + 1)/x] sage: f = ZZ['x,y,z'].0 + QQ['w,x,z,a'].0; f w + x sage: f.parent() Multivariate Polynomial Ring in w, x, y, z, a over Rational Field sage: ZZ['x,y,z'].0 + ZZ['w,x,z,a'].1 2*x
AUTHOR:
Robert Bradshaw
- analyse(xp, yp, op='mul')#
Emulate the process of doing arithmetic between xp and yp, returning a list of steps and the parent that the result will live in. The
explainfunction is easier to use, but if one wants access to the actual morphism and action objects (rather than their string representations) then this is the function to use.EXAMPLES:
sage: cm = sage.structure.element.get_coercion_model() sage: GF7 = GF(7) sage: steps, res = cm.analyse(GF7, ZZ) sage: steps ['Coercion on right operand via', Natural morphism: From: Integer Ring To: Finite Field of size 7, 'Arithmetic performed after coercions.'] sage: res Finite Field of size 7 sage: f = steps[1]; type(f) <class 'sage.rings.finite_rings.integer_mod.Integer_to_IntegerMod'> sage: f(100) 2
- bin_op(x, y, op)#
Execute the operation op on x and y. It first looks for an action corresponding to op, and failing that, it tries to coerces x and y into a common parent and calls op on them.
If it cannot make sense of the operation, a TypeError is raised.
INPUT:
x- the left operandy- the right operandop- a python function taking 2 argumentsNote
op is often an arithmetic operation, but need not be so.
EXAMPLES:
sage: cm = sage.structure.element.get_coercion_model() sage: cm.bin_op(1/2, 5, operator.mul) 5/2
The operator can be any callable:
sage: R.<x> = ZZ['x'] sage: cm.bin_op(x^2-1, x+1, gcd) x + 1
Actions are detected and performed:
sage: M = matrix(ZZ, 2, 2, range(4)) sage: V = vector(ZZ, [5,7]) sage: cm.bin_op(M, V, operator.mul) (7, 31)
- canonical_coercion(x, y)#
Given two elements x and y, with parents S and R respectively, find a common parent Z such that there are coercions \(f: S \mapsto Z\) and \(g: R \mapsto Z\) and return \(f(x), g(y)\) which will have the same parent.
Raises a type error if no such Z can be found.
EXAMPLES:
sage: cm = sage.structure.element.get_coercion_model() sage: cm.canonical_coercion(mod(2, 10), 17) (2, 7) sage: x, y = cm.canonical_coercion(1/2, matrix(ZZ, 2, 2, range(4))) sage: x [1/2 0] [ 0 1/2] sage: y [0 1] [2 3] sage: parent(x) is parent(y) True
There is some support for non-Sage datatypes as well:
sage: x, y = cm.canonical_coercion(int(5), 10) sage: type(x), type(y) (<class 'sage.rings.integer.Integer'>, <class 'sage.rings.integer.Integer'>) sage: x, y = cm.canonical_coercion(int(5), complex(3)) sage: type(x), type(y) (<class 'complex'>, <class 'complex'>) sage: class MyClass: ....: def _sage_(self): ....: return 13 sage: a, b = cm.canonical_coercion(MyClass(), 1/3) sage: a, b (13, 1/3) sage: type(a) <class 'sage.rings.rational.Rational'>
We also make an exception for 0, even if \(\ZZ\) does not map in:
sage: canonical_coercion(vector([1, 2, 3]), 0) ((1, 2, 3), (0, 0, 0)) sage: canonical_coercion(GF(5)(0), float(0)) (0, 0)
- coercion_maps(R, S)#
Give two parents \(R\) and \(S\), return a pair of coercion maps \(f: R \rightarrow Z\) and \(g: S \rightarrow Z\) , if such a \(Z\) can be found.
In the (common) case that \(R=Z\) or \(S=Z\) then
Noneis returned for \(f\) or \(g\) respectively rather than constructing (and subsequently calling) the identity morphism.If no suitable \(f, g\) can be found, a single
Noneis returned. This result is cached.Note
By trac ticket #14711, coerce maps should be copied when using them outside of the coercion system, because they may become defunct by garbage collection.
EXAMPLES:
sage: cm = sage.structure.element.get_coercion_model() sage: f, g = cm.coercion_maps(ZZ, QQ) sage: print(copy(f)) Natural morphism: From: Integer Ring To: Rational Field sage: print(g) None sage: ZZx = ZZ['x'] sage: f, g = cm.coercion_maps(ZZx, QQ) sage: print(f) (map internal to coercion system -- copy before use) Ring morphism: From: Univariate Polynomial Ring in x over Integer Ring To: Univariate Polynomial Ring in x over Rational Field sage: print(g) (map internal to coercion system -- copy before use) Polynomial base injection morphism: From: Rational Field To: Univariate Polynomial Ring in x over Rational Field sage: K = GF(7) sage: cm.coercion_maps(QQ, K) is None True
Note that to break symmetry, if there is a coercion map in both directions, the parent on the left is used:
sage: V = QQ^3 sage: W = V.__class__(QQ, 3) sage: V == W True sage: V is W False sage: cm = sage.structure.element.get_coercion_model() sage: cm.coercion_maps(V, W) (None, (map internal to coercion system -- copy before use) Coercion map: From: Vector space of dimension 3 over Rational Field To: Vector space of dimension 3 over Rational Field) sage: cm.coercion_maps(W, V) (None, (map internal to coercion system -- copy before use) Coercion map: From: Vector space of dimension 3 over Rational Field To: Vector space of dimension 3 over Rational Field) sage: v = V([1,2,3]) sage: w = W([1,2,3]) sage: parent(v+w) is V True sage: parent(w+v) is W True
- common_parent(*args)#
Computes a common parent for all the inputs. It’s essentially an \(n\)-ary canonical coercion except it can operate on parents rather than just elements.
INPUT:
args– a set of elements and/or parents
OUTPUT:
A
Parentinto which each input should coerce, or raises aTypeErrorif no suchParentcan be found.EXAMPLES:
sage: cm = sage.structure.element.get_coercion_model() sage: cm.common_parent(ZZ, QQ) Rational Field sage: cm.common_parent(ZZ, QQ, RR) Real Field with 53 bits of precision sage: ZZT = ZZ[['T']] sage: QQT = QQ['T'] sage: cm.common_parent(ZZT, QQT, RDF) Power Series Ring in T over Real Double Field sage: cm.common_parent(4r, 5r) <class 'int'> sage: cm.common_parent(int, float, ZZ) <class 'float'> sage: real_fields = [RealField(prec) for prec in [10,20..100]] sage: cm.common_parent(*real_fields) Real Field with 10 bits of precision
There are some cases where the ordering does matter, but if a parent can be found it is always the same:
sage: QQxy = QQ['x,y'] sage: QQyz = QQ['y,z'] sage: cm.common_parent(QQxy, QQyz) == cm.common_parent(QQyz, QQxy) True sage: QQzt = QQ['z,t'] sage: cm.common_parent(QQxy, QQyz, QQzt) Multivariate Polynomial Ring in x, y, z, t over Rational Field sage: cm.common_parent(QQxy, QQzt, QQyz) Traceback (most recent call last): ... TypeError: no common canonical parent for objects with parents: 'Multivariate Polynomial Ring in x, y over Rational Field' and 'Multivariate Polynomial Ring in z, t over Rational Field'
- discover_action(R, S, op, r=None, s=None)#
INPUT:
R- the left Parent (or type)S- the right Parent (or type)op- the operand, typically an element of the operator moduler- (optional) element of Rs- (optional) element of S.
OUTPUT:
An action A such that s op r is given by A(s,r).
The steps taken are illustrated below.
EXAMPLES:
sage: P.<x> = ZZ['x'] sage: P.get_action(ZZ) Right scalar multiplication by Integer Ring on Univariate Polynomial Ring in x over Integer Ring sage: ZZ.get_action(P) is None True sage: cm = sage.structure.element.get_coercion_model()
If R or S is a Parent, ask it for an action by/on R:
sage: cm.discover_action(ZZ, P, operator.mul) Left scalar multiplication by Integer Ring on Univariate Polynomial Ring in x over Integer Ring
If R or S a type, recursively call get_action with the Sage versions of R and/or S:
sage: cm.discover_action(P, int, operator.mul) Right scalar multiplication by Integer Ring on Univariate Polynomial Ring in x over Integer Ring with precomposition on right by Native morphism: From: Set of Python objects of class 'int' To: Integer Ring
If op is division, look for action on right by inverse:
sage: cm.discover_action(P, ZZ, operator.truediv) Right inverse action by Rational Field on Univariate Polynomial Ring in x over Integer Ring with precomposition on right by Natural morphism: From: Integer Ring To: Rational Field
Check that trac ticket #17740 is fixed:
sage: R = GF(5)['x'] sage: cm.discover_action(R, ZZ, operator.truediv) Right inverse action by Finite Field of size 5 on Univariate Polynomial Ring in x over Finite Field of size 5 with precomposition on right by Natural morphism: From: Integer Ring To: Finite Field of size 5 sage: cm.bin_op(R.gen(), 7, operator.truediv).parent() Univariate Polynomial Ring in x over Finite Field of size 5
Check that trac ticket #18221 is fixed:
sage: F.<x> = FreeAlgebra(QQ) sage: x / 2 1/2*x sage: cm.discover_action(F, ZZ, operator.truediv) Right inverse action by Rational Field on Free Algebra on 1 generators (x,) over Rational Field with precomposition on right by Natural morphism: From: Integer Ring To: Rational Field
- discover_coercion(R, S)#
This actually implements the finding of coercion maps as described in the
coercion_mapsmethod.EXAMPLES:
sage: cm = sage.structure.element.get_coercion_model()
If R is S, then two identity morphisms suffice:
sage: cm.discover_coercion(SR, SR) (None, None)
If there is a coercion map either direction, use that:
sage: cm.discover_coercion(ZZ, QQ) ((map internal to coercion system -- copy before use) Natural morphism: From: Integer Ring To: Rational Field, None) sage: cm.discover_coercion(RR, QQ) (None, (map internal to coercion system -- copy before use) Generic map: From: Rational Field To: Real Field with 53 bits of precision)
Otherwise, try and compute an appropriate cover:
sage: ZZxy = ZZ['x,y'] sage: cm.discover_coercion(ZZxy, RDF) ((map internal to coercion system -- copy before use) Call morphism: From: Multivariate Polynomial Ring in x, y over Integer Ring To: Multivariate Polynomial Ring in x, y over Real Double Field, (map internal to coercion system -- copy before use) Polynomial base injection morphism: From: Real Double Field To: Multivariate Polynomial Ring in x, y over Real Double Field)
Sometimes there is a reasonable “cover,” but no canonical coercion:
sage: sage.categories.pushout.pushout(QQ, QQ^3) Vector space of dimension 3 over Rational Field sage: print(cm.discover_coercion(QQ, QQ^3)) None
- division_parent(P)#
Deduces where the result of division in
Plies by calculating the inverse ofP.one()orP.an_element().The result is cached.
EXAMPLES:
sage: cm = sage.structure.element.get_coercion_model() sage: cm.division_parent(ZZ) Rational Field sage: cm.division_parent(QQ) Rational Field sage: ZZx = ZZ['x'] sage: cm.division_parent(ZZx) Fraction Field of Univariate Polynomial Ring in x over Integer Ring sage: K = GF(41) sage: cm.division_parent(K) Finite Field of size 41 sage: Zmod100 = Integers(100) sage: cm.division_parent(Zmod100) Ring of integers modulo 100 sage: S5 = SymmetricGroup(5) # optional - sage.groups sage: cm.division_parent(S5) # optional - sage.groups Symmetric group of order 5! as a permutation group
- exception_stack()#
Returns the list of exceptions that were caught in the course of executing the last binary operation. Useful for diagnosis when user-defined maps or actions raise exceptions that are caught in the course of coercion detection.
If all went well, this should be the empty list. If things aren’t happening as you expect, this is a good place to check. See also
coercion_traceback().EXAMPLES:
sage: cm = sage.structure.element.get_coercion_model() sage: cm.record_exceptions() sage: 1/2 + 2 5/2 sage: cm.exception_stack() [] sage: 1/2 + GF(3)(2) Traceback (most recent call last): ... TypeError: unsupported operand parent(s) for +: 'Rational Field' and 'Finite Field of size 3'
Now see what the actual problem was:
sage: import traceback sage: cm.exception_stack() ['Traceback (most recent call last):...', 'Traceback (most recent call last):...'] sage: print(cm.exception_stack()[-1]) Traceback (most recent call last): ... TypeError: no common canonical parent for objects with parents: 'Rational Field' and 'Finite Field of size 3'
This is typically accessed via the
coercion_traceback()function.sage: coercion_traceback() Traceback (most recent call last): ... TypeError: no common canonical parent for objects with parents: 'Rational Field' and 'Finite Field of size 3'
- explain(xp, yp, op='mul', verbosity=2)#
This function can be used to understand what coercions will happen for an arithmetic operation between xp and yp (which may be either elements or parents). If the parent of the result can be determined then it will be returned.
EXAMPLES:
sage: cm = sage.structure.element.get_coercion_model() sage: cm.explain(ZZ, ZZ) Identical parents, arithmetic performed immediately. Result lives in Integer Ring Integer Ring sage: cm.explain(QQ, int) Coercion on right operand via Native morphism: From: Set of Python objects of class 'int' To: Rational Field Arithmetic performed after coercions. Result lives in Rational Field Rational Field sage: R = ZZ['x'] sage: cm.explain(R, QQ) Action discovered. Right scalar multiplication by Rational Field on Univariate Polynomial Ring in x over Integer Ring Result lives in Univariate Polynomial Ring in x over Rational Field Univariate Polynomial Ring in x over Rational Field sage: cm.explain(ZZ['x'], QQ, operator.add) Coercion on left operand via Ring morphism: From: Univariate Polynomial Ring in x over Integer Ring To: Univariate Polynomial Ring in x over Rational Field Defn: Induced from base ring by Natural morphism: From: Integer Ring To: Rational Field Coercion on right operand via Polynomial base injection morphism: From: Rational Field To: Univariate Polynomial Ring in x over Rational Field Arithmetic performed after coercions. Result lives in Univariate Polynomial Ring in x over Rational Field Univariate Polynomial Ring in x over Rational Field
Sometimes with non-sage types there is not enough information to deduce what will actually happen:
sage: R100 = RealField(100) sage: cm.explain(R100, float, operator.add) Right operand is numeric, will attempt coercion in both directions. Unknown result parent. sage: parent(R100(1) + float(1)) <class 'float'> sage: cm.explain(QQ, float, operator.add) Right operand is numeric, will attempt coercion in both directions. Unknown result parent. sage: parent(QQ(1) + float(1)) <class 'float'>
Special care is taken to deal with division:
sage: cm.explain(ZZ, ZZ, operator.truediv) Identical parents, arithmetic performed immediately. Result lives in Rational Field Rational Field sage: ZZx = ZZ['x'] sage: QQx = QQ['x'] sage: cm.explain(ZZx, QQx, operator.truediv) Coercion on left operand via Ring morphism: From: Univariate Polynomial Ring in x over Integer Ring To: Univariate Polynomial Ring in x over Rational Field Defn: Induced from base ring by Natural morphism: From: Integer Ring To: Rational Field Arithmetic performed after coercions. Result lives in Fraction Field of Univariate Polynomial Ring in x over Rational Field Fraction Field of Univariate Polynomial Ring in x over Rational Field sage: cm.explain(int, ZZ, operator.truediv) Coercion on left operand via Native morphism: From: Set of Python objects of class 'int' To: Integer Ring Arithmetic performed after coercions. Result lives in Rational Field Rational Field sage: cm.explain(ZZx, ZZ, operator.truediv) Action discovered. Right inverse action by Rational Field on Univariate Polynomial Ring in x over Integer Ring with precomposition on right by Natural morphism: From: Integer Ring To: Rational Field Result lives in Univariate Polynomial Ring in x over Rational Field Univariate Polynomial Ring in x over Rational Field
Note
This function is accurate only in so far as
analyse()is kept in sync with thebin_op()andcanonical_coercion()which are kept separate for maximal efficiency.
- get_action(R, S, op='mul', r=None, s=None)#
Get the action of R on S or S on R associated to the operation op.
EXAMPLES:
sage: cm = sage.structure.element.get_coercion_model() sage: ZZx = ZZ['x'] sage: cm.get_action(ZZx, ZZ, operator.mul) Right scalar multiplication by Integer Ring on Univariate Polynomial Ring in x over Integer Ring sage: cm.get_action(ZZx, QQ, operator.mul) Right scalar multiplication by Rational Field on Univariate Polynomial Ring in x over Integer Ring sage: QQx = QQ['x'] sage: cm.get_action(QQx, int, operator.mul) Right scalar multiplication by Integer Ring on Univariate Polynomial Ring in x over Rational Field with precomposition on right by Native morphism: From: Set of Python objects of class 'int' To: Integer Ring sage: A = cm.get_action(QQx, ZZ, operator.truediv); A Right inverse action by Rational Field on Univariate Polynomial Ring in x over Rational Field with precomposition on right by Natural morphism: From: Integer Ring To: Rational Field sage: x = QQx.gen() sage: A(x+10, 5) 1/5*x + 2
- get_cache()#
This returns the current cache of coercion maps and actions, primarily useful for debugging and introspection.
EXAMPLES:
sage: cm = sage.structure.element.get_coercion_model() sage: cm.canonical_coercion(1,2/3) (1, 2/3) sage: maps, actions = cm.get_cache()
Now let us see what happens when we do a binary operations with an integer and a rational:
sage: left_morphism_ref, right_morphism_ref = maps[ZZ, QQ]
Note that by trac ticket #14058 the coercion model only stores a weak reference to the coercion maps in this case:
sage: left_morphism_ref <weakref at ...; to 'sage.rings.rational.Z_to_Q' at ...>
Moreover, the weakly referenced coercion map uses only a weak reference to the codomain:
sage: left_morphism_ref() (map internal to coercion system -- copy before use) Natural morphism: From: Integer Ring To: Rational Field
To get an actual valid map, we simply copy the weakly referenced coercion map:
sage: print(copy(left_morphism_ref())) Natural morphism: From: Integer Ring To: Rational Field sage: print(right_morphism_ref) None
We can see that it coerces the left operand from an integer to a rational, and doesn’t do anything to the right.
Now for some actions:
sage: R.<x> = ZZ['x'] sage: 1/2 * x 1/2*x sage: maps, actions = cm.get_cache() sage: act = actions[QQ, R, operator.mul]; act Left scalar multiplication by Rational Field on Univariate Polynomial Ring in x over Integer Ring sage: act.actor() Rational Field sage: act.domain() Univariate Polynomial Ring in x over Integer Ring sage: act.codomain() Univariate Polynomial Ring in x over Rational Field sage: act(1/5, x+10) 1/5*x + 2
- record_exceptions(value=True)#
Enables (or disables) recording of the exceptions suppressed during arithmetic.
Each time that record_exceptions is called (either enabling or disabling the record), the exception_stack is cleared.
- reset_cache()#
Clear the coercion cache.
This should have no impact on the result of arithmetic operations, as the exact same coercions and actions will be re-discovered when needed.
It may be useful for debugging, and may also free some memory.
EXAMPLES:
sage: cm = sage.structure.element.get_coercion_model() sage: len(cm.get_cache()[0]) # random 42 sage: cm.reset_cache() sage: cm.get_cache() ({}, {})
- richcmp(x, y, op)#
Given two arbitrary objects
xandy, coerce them to a common parent and compare them using rich comparison operatorop.EXAMPLES:
sage: from sage.structure.element import get_coercion_model sage: from sage.structure.richcmp import op_LT, op_LE, op_EQ, op_NE, op_GT, op_GE sage: richcmp = get_coercion_model().richcmp sage: richcmp(None, None, op_EQ) True sage: richcmp(None, 1, op_LT) True sage: richcmp("hello", None, op_LE) False sage: richcmp(-1, 1, op_GE) False sage: richcmp(int(1), float(2), op_GE) False
If there is no coercion, we only support
==and!=:sage: x = QQ.one(); y = GF(2).one() sage: richcmp(x, y, op_EQ) False sage: richcmp(x, y, op_NE) True sage: richcmp(x, y, op_GT) Traceback (most recent call last): ... TypeError: unsupported operand parent(s) for >: 'Rational Field' and 'Finite Field of size 2'
We support non-Sage types with the usual Python convention:
sage: class AlwaysEqual(): ....: def __eq__(self, other): ....: return True sage: x = AlwaysEqual() sage: x == 1 True sage: 1 == x True
- verify_action(action, R, S, op, fix=True)#
Verify that
actiontakes an element of R on the left and S on the right, raising an error if not.This is used for consistency checking in the coercion model.
EXAMPLES:
sage: R.<x> = ZZ['x'] sage: cm = sage.structure.element.get_coercion_model() sage: cm.verify_action(R.get_action(QQ), R, QQ, operator.mul) Right scalar multiplication by Rational Field on Univariate Polynomial Ring in x over Integer Ring sage: cm.verify_action(R.get_action(QQ), RDF, R, operator.mul) Traceback (most recent call last): ... RuntimeError: There is a BUG in the coercion model: Action found for R <built-in function mul> S does not have the correct domains R = Real Double Field S = Univariate Polynomial Ring in x over Integer Ring (should be Univariate Polynomial Ring in x over Integer Ring, Rational Field) action = Right scalar multiplication by Rational Field on Univariate Polynomial Ring in x over Integer Ring (<class 'sage.structure.coerce_actions.RightModuleAction'>)
- verify_coercion_maps(R, S, homs, fix=False)#
Make sure this is a valid pair of homomorphisms from R and S to a common parent. This function is used to protect the user against buggy parents.
EXAMPLES:
sage: cm = sage.structure.element.get_coercion_model() sage: homs = QQ.coerce_map_from(ZZ), None sage: cm.verify_coercion_maps(ZZ, QQ, homs) == homs True sage: homs = QQ.coerce_map_from(ZZ), RR.coerce_map_from(QQ) sage: cm.verify_coercion_maps(ZZ, QQ, homs) == homs Traceback (most recent call last): ... RuntimeError: ('BUG in coercion model, codomains must be identical', Natural morphism: From: Integer Ring To: Rational Field, Generic map: From: Rational Field To: Real Field with 53 bits of precision)
- sage.structure.coerce.is_mpmath_type(t)#
Check whether the type
tis a type whose name starts with eithermpmath.orsage.libs.mpmath..EXAMPLES:
sage: from sage.structure.coerce import is_mpmath_type sage: is_mpmath_type(int) False sage: import mpmath sage: is_mpmath_type(mpmath.mpc(2)) False sage: is_mpmath_type(type(mpmath.mpc(2))) True sage: is_mpmath_type(type(mpmath.mpf(2))) True
- sage.structure.coerce.is_numpy_type(t)#
Return
Trueif and only if \(t\) is a type whose name starts withnumpy.EXAMPLES:
sage: from sage.structure.coerce import is_numpy_type sage: import numpy sage: is_numpy_type(numpy.int16) True sage: is_numpy_type(numpy.floating) True sage: is_numpy_type(numpy.ndarray) True sage: is_numpy_type(numpy.matrix) True sage: is_numpy_type(int) False sage: is_numpy_type(Integer) False sage: is_numpy_type(Sudoku) False sage: is_numpy_type(None) False
- sage.structure.coerce.parent_is_integers(P)#
Check whether the type or parent represents the ring of integers.
EXAMPLES:
sage: from sage.structure.coerce import parent_is_integers sage: parent_is_integers(int) True sage: parent_is_integers(float) False sage: parent_is_integers(bool) True sage: parent_is_integers(dict) False sage: import numpy sage: parent_is_integers(numpy.int16) True sage: parent_is_integers(numpy.uint64) True sage: parent_is_integers(float) False sage: import gmpy2 sage: parent_is_integers(gmpy2.mpz) True sage: parent_is_integers(gmpy2.mpq) False
Ensure (trac ticket #27893) is fixed:
sage: K.<f> = QQ[] sage: gmpy2.mpz(2) * f 2*f
- sage.structure.coerce.parent_is_numerical(P)#
Test if elements of the parent or type
Pcan be numerically evaluated as complex numbers (in a canonical way).EXAMPLES:
sage: from sage.structure.coerce import parent_is_numerical sage: import gmpy2, numpy sage: [parent_is_numerical(R) for R in [RR, CC, QQ, QuadraticField(-1), ....: int, complex, gmpy2.mpc, numpy.complexfloating]] [True, True, True, True, True, True, True, True] sage: [parent_is_numerical(R) for R in [SR, QQ['x'], QQ[['x']], str]] [False, False, False, False] sage: [parent_is_numerical(R) for R in [RIF, RBF, CIF, CBF]] [False, False, False, False]
- sage.structure.coerce.parent_is_real_numerical(P)#
Test if elements of the parent or type
Pcan be numerically evaluated as real numbers (in a canonical way).EXAMPLES:
sage: from sage.structure.coerce import parent_is_real_numerical sage: import gmpy2, numpy sage: [parent_is_real_numerical(R) for R in [RR, QQ, ZZ, RLF, ....: QuadraticField(2), int, float, gmpy2.mpq, numpy.integer]] [True, True, True, True, True, True, True, True, True] sage: [parent_is_real_numerical(R) for R in [CC, QuadraticField(-1), ....: complex, gmpy2.mpc, numpy.complexfloating]] [False, False, False, False, False] sage: [parent_is_real_numerical(R) for R in [SR, QQ['x'], QQ[['x']], str]] [False, False, False, False] sage: [parent_is_real_numerical(R) for R in [RIF, RBF, CIF, CBF]] [False, False, False, False]
- sage.structure.coerce.py_scalar_parent(py_type)#
Returns the Sage equivalent of the given python type, if one exists. If there is no equivalent, return None.
EXAMPLES:
sage: from sage.structure.coerce import py_scalar_parent sage: py_scalar_parent(int) Integer Ring sage: py_scalar_parent(float) Real Double Field sage: py_scalar_parent(complex) Complex Double Field sage: py_scalar_parent(bool) Integer Ring sage: py_scalar_parent(dict), (None,) sage: import fractions sage: py_scalar_parent(fractions.Fraction) Rational Field sage: import numpy sage: py_scalar_parent(numpy.int16) Integer Ring sage: py_scalar_parent(numpy.int32) Integer Ring sage: py_scalar_parent(numpy.uint64) Integer Ring sage: py_scalar_parent(float) Real Double Field sage: py_scalar_parent(numpy.double) Real Double Field sage: py_scalar_parent(complex) Complex Double Field sage: import gmpy2 sage: py_scalar_parent(gmpy2.mpz) Integer Ring sage: py_scalar_parent(gmpy2.mpq) Rational Field sage: py_scalar_parent(gmpy2.mpfr) Real Double Field sage: py_scalar_parent(gmpy2.mpc) Complex Double Field
- sage.structure.coerce.py_scalar_to_element(x)#
Convert
xto a SageElementif possible.If
xwas already anElementor if there is no obvious conversion possible, just returnxitself.EXAMPLES:
sage: from sage.structure.coerce import py_scalar_to_element sage: x = py_scalar_to_element(42) sage: x, parent(x) (42, Integer Ring) sage: x = py_scalar_to_element(int(42)) sage: x, parent(x) (42, Integer Ring) sage: x = py_scalar_to_element(float(42)) sage: x, parent(x) (42.0, Real Double Field) sage: x = py_scalar_to_element(complex(42)) sage: x, parent(x) (42.0, Complex Double Field) sage: py_scalar_to_element('hello') 'hello' sage: from fractions import Fraction sage: f = Fraction(int(2^100), int(3^100)) sage: py_scalar_to_element(f) 1267650600228229401496703205376/515377520732011331036461129765621272702107522001
Note that bools are converted to 0 or 1:
sage: py_scalar_to_element(False), py_scalar_to_element(True) (0, 1)
Test gmpy2’s types:
sage: import gmpy2 sage: x = py_scalar_to_element(gmpy2.mpz(42)) sage: x, parent(x) (42, Integer Ring) sage: x = py_scalar_to_element(gmpy2.mpq('3/4')) sage: x, parent(x) (3/4, Rational Field) sage: x = py_scalar_to_element(gmpy2.mpfr(42.57)) sage: x, parent(x) (42.57, Real Double Field) sage: x = py_scalar_to_element(gmpy2.mpc(int(42), int(42))) sage: x, parent(x) (42.0 + 42.0*I, Complex Double Field)
Test compatibility with
py_scalar_parent():sage: from sage.structure.coerce import py_scalar_parent sage: elt = [True, int(42), float(42), complex(42)] sage: for x in elt: ....: assert py_scalar_parent(type(x)) == py_scalar_to_element(x).parent() sage: import numpy sage: elt = [numpy.int8('-12'), numpy.uint8('143'), ....: numpy.int16('-33'), numpy.uint16('122'), ....: numpy.int32('-19'), numpy.uint32('44'), ....: numpy.int64('-3'), numpy.uint64('552'), ....: numpy.float16('-1.23'), numpy.float32('-2.22'), ....: numpy.float64('-3.412'), numpy.complex64(1.2+I), ....: numpy.complex128(-2+I)] sage: for x in elt: ....: assert py_scalar_parent(type(x)) == py_scalar_to_element(x).parent() sage: elt = [gmpy2.mpz(42), gmpy2.mpq('3/4'), ....: gmpy2.mpfr(42.57), gmpy2.mpc(int(42), int(42))] sage: for x in elt: ....: assert py_scalar_parent(type(x)) == py_scalar_to_element(x).parent()