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fa088dbd0c
- Rename reST target name for collections ABCs to avoid collisions - Add link to importlib ABCs (collections, numbers and io ABCs were already linked) - Link to glossary entry from numbers module doc (other modules already do it)
219 lines
7.8 KiB
ReStructuredText
219 lines
7.8 KiB
ReStructuredText
:mod:`numbers` --- Numeric abstract base classes
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================================================
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.. module:: numbers
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:synopsis: Numeric abstract base classes (Complex, Real, Integral, etc.).
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The :mod:`numbers` module (:pep:`3141`) defines a hierarchy of numeric
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:term:`abstract base classes <abstract base class>` which progressively define
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more operations. None of the types defined in this module can be instantiated.
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.. class:: Number
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The root of the numeric hierarchy. If you just want to check if an argument
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*x* is a number, without caring what kind, use ``isinstance(x, Number)``.
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The numeric tower
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-----------------
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.. class:: Complex
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Subclasses of this type describe complex numbers and include the operations
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that work on the built-in :class:`complex` type. These are: conversions to
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:class:`complex` and :class:`bool`, :attr:`.real`, :attr:`.imag`, ``+``,
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``-``, ``*``, ``/``, :func:`abs`, :meth:`conjugate`, ``==``, and ``!=``. All
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except ``-`` and ``!=`` are abstract.
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.. attribute:: real
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Abstract. Retrieves the real component of this number.
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.. attribute:: imag
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Abstract. Retrieves the imaginary component of this number.
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.. method:: conjugate()
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Abstract. Returns the complex conjugate. For example, ``(1+3j).conjugate()
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== (1-3j)``.
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.. class:: Real
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To :class:`Complex`, :class:`Real` adds the operations that work on real
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numbers.
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In short, those are: a conversion to :class:`float`, :func:`math.trunc`,
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:func:`round`, :func:`math.floor`, :func:`math.ceil`, :func:`divmod`, ``//``,
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``%``, ``<``, ``<=``, ``>``, and ``>=``.
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Real also provides defaults for :func:`complex`, :attr:`~Complex.real`,
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:attr:`~Complex.imag`, and :meth:`~Complex.conjugate`.
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.. class:: Rational
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Subtypes :class:`Real` and adds
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:attr:`~Rational.numerator` and :attr:`~Rational.denominator` properties, which
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should be in lowest terms. With these, it provides a default for
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:func:`float`.
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.. attribute:: numerator
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Abstract.
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.. attribute:: denominator
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Abstract.
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.. class:: Integral
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Subtypes :class:`Rational` and adds a conversion to :class:`int`.
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Provides defaults for :func:`float`, :attr:`~Rational.numerator`, and
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:attr:`~Rational.denominator`, and bit-string operations: ``<<``,
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``>>``, ``&``, ``^``, ``|``, ``~``.
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Notes for type implementors
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---------------------------
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Implementors should be careful to make equal numbers equal and hash
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them to the same values. This may be subtle if there are two different
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extensions of the real numbers. For example, :class:`fractions.Fraction`
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implements :func:`hash` as follows::
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def __hash__(self):
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if self.denominator == 1:
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# Get integers right.
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return hash(self.numerator)
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# Expensive check, but definitely correct.
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if self == float(self):
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return hash(float(self))
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else:
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# Use tuple's hash to avoid a high collision rate on
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# simple fractions.
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return hash((self.numerator, self.denominator))
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Adding More Numeric ABCs
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~~~~~~~~~~~~~~~~~~~~~~~~
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There are, of course, more possible ABCs for numbers, and this would
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be a poor hierarchy if it precluded the possibility of adding
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those. You can add ``MyFoo`` between :class:`Complex` and
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:class:`Real` with::
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class MyFoo(Complex): ...
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MyFoo.register(Real)
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Implementing the arithmetic operations
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~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
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We want to implement the arithmetic operations so that mixed-mode
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operations either call an implementation whose author knew about the
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types of both arguments, or convert both to the nearest built in type
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and do the operation there. For subtypes of :class:`Integral`, this
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means that :meth:`__add__` and :meth:`__radd__` should be defined as::
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class MyIntegral(Integral):
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def __add__(self, other):
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if isinstance(other, MyIntegral):
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return do_my_adding_stuff(self, other)
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elif isinstance(other, OtherTypeIKnowAbout):
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return do_my_other_adding_stuff(self, other)
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else:
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return NotImplemented
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def __radd__(self, other):
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if isinstance(other, MyIntegral):
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return do_my_adding_stuff(other, self)
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elif isinstance(other, OtherTypeIKnowAbout):
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return do_my_other_adding_stuff(other, self)
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elif isinstance(other, Integral):
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return int(other) + int(self)
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elif isinstance(other, Real):
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return float(other) + float(self)
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elif isinstance(other, Complex):
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return complex(other) + complex(self)
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else:
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return NotImplemented
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There are 5 different cases for a mixed-type operation on subclasses
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of :class:`Complex`. I'll refer to all of the above code that doesn't
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refer to ``MyIntegral`` and ``OtherTypeIKnowAbout`` as
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"boilerplate". ``a`` will be an instance of ``A``, which is a subtype
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of :class:`Complex` (``a : A <: Complex``), and ``b : B <:
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Complex``. I'll consider ``a + b``:
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1. If ``A`` defines an :meth:`__add__` which accepts ``b``, all is
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well.
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2. If ``A`` falls back to the boilerplate code, and it were to
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return a value from :meth:`__add__`, we'd miss the possibility
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that ``B`` defines a more intelligent :meth:`__radd__`, so the
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boilerplate should return :const:`NotImplemented` from
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:meth:`__add__`. (Or ``A`` may not implement :meth:`__add__` at
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all.)
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3. Then ``B``'s :meth:`__radd__` gets a chance. If it accepts
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``a``, all is well.
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4. If it falls back to the boilerplate, there are no more possible
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methods to try, so this is where the default implementation
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should live.
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5. If ``B <: A``, Python tries ``B.__radd__`` before
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``A.__add__``. This is ok, because it was implemented with
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knowledge of ``A``, so it can handle those instances before
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delegating to :class:`Complex`.
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If ``A <: Complex`` and ``B <: Real`` without sharing any other knowledge,
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then the appropriate shared operation is the one involving the built
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in :class:`complex`, and both :meth:`__radd__` s land there, so ``a+b
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== b+a``.
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Because most of the operations on any given type will be very similar,
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it can be useful to define a helper function which generates the
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forward and reverse instances of any given operator. For example,
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:class:`fractions.Fraction` uses::
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def _operator_fallbacks(monomorphic_operator, fallback_operator):
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def forward(a, b):
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if isinstance(b, (int, Fraction)):
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return monomorphic_operator(a, b)
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elif isinstance(b, float):
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return fallback_operator(float(a), b)
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elif isinstance(b, complex):
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return fallback_operator(complex(a), b)
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else:
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return NotImplemented
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forward.__name__ = '__' + fallback_operator.__name__ + '__'
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forward.__doc__ = monomorphic_operator.__doc__
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def reverse(b, a):
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if isinstance(a, Rational):
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# Includes ints.
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return monomorphic_operator(a, b)
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elif isinstance(a, numbers.Real):
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return fallback_operator(float(a), float(b))
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elif isinstance(a, numbers.Complex):
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return fallback_operator(complex(a), complex(b))
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else:
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return NotImplemented
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reverse.__name__ = '__r' + fallback_operator.__name__ + '__'
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reverse.__doc__ = monomorphic_operator.__doc__
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return forward, reverse
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def _add(a, b):
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"""a + b"""
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return Fraction(a.numerator * b.denominator +
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b.numerator * a.denominator,
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a.denominator * b.denominator)
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__add__, __radd__ = _operator_fallbacks(_add, operator.add)
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# ...
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