花下猫语:在 Python 中,不同类型的数字可以直接做算术运算,并不需要作显式的类型转换。但是,它的“隐式类型转换”可能跟其它语言不同,因为 Python 中的数字是一种特殊的对象,派生自同一个抽象基类。在上一篇文章 中,我们讨论到了 Python 数字的运算,然后我想探究“Python 的数字对象到底是什么”的话题,所以就翻译了这篇 PEP,希望对你也有所帮助。
PEP原文: https://www.python.org/dev/peps/pep-3141
PEP标题: PEP 3141 -- A Type Hierarchy for Numbers
PEP作者: Jeffrey Yasskin
创建日期: 2007-04-23
译者 :豌豆花下猫@Python猫公众号
PEP翻译计划: https://github.com/chinesehuazhou/peps-cn
本提案定义了一种抽象基类(ABC)(PEP 3119)的层次结构,用来表示类似数字(number-like)的类。它提出了一个 Number :> Complex :> Real :> Rational :> Integral 的层次结构,其中 A :> B 表示“A 是 B 的超类”。该层次结构受到了 Scheme 的数字塔(numeric tower)启发。(译注:数字--复数--实数--有理数--整数)
以数字作为参数的函数应该能够判定这些数字的属性,并且根据数字的类型,确定是否以及何时进行重载,即基于参数的类型,函数应该是可重载的。
例如,切片要求其参数为Integrals
,而math
模块中的函数要求其参数为Real
。
本 PEP 规定了一组抽象基类(Abstract Base Class),并提出了一个实现某些方法的通用策略。它使用了来自于PEP 3119的术语,但是该层次结构旨在对特定类集的任何系统方法都有意义。
标准库中的类型检查应该使用这些类,而不是具体的内置类型。
我们从 Number 类开始,它是人们想象的数字类型的模糊概念。此类仅用于重载;它不提供任何操作。
class Number(metaclass=ABCMeta): pass
大多数复数(complex number)的实现都是可散列的,但是如果你需要依赖它,则必须明确地检查:此层次结构支持可变的数。
class Complex(Number):
"""Complex defines the operations that work on the builtin complex type.
In short, those are: conversion to complex, bool(), .real, .imag,
+, -, *, /, **, abs(), .conjugate(), ==, and !=.
If it is given heterogenous arguments, and doesn't have special
knowledge about them, it should fall back to the builtin complex
type as described below.
"""
@abstractmethod
def __complex__(self):
"""Return a builtin complex instance."""
def __bool__(self):
"""True if self != 0."""
return self != 0
@abstractproperty
def real(self):
"""Retrieve the real component of this number.
This should subclass Real.
"""
raise NotImplementedError
@abstractproperty
def imag(self):
"""Retrieve the real component of this number.
This should subclass Real.
"""
raise NotImplementedError
@abstractmethod
def __add__(self, other):
raise NotImplementedError
@abstractmethod
def __radd__(self, other):
raise NotImplementedError
@abstractmethod
def __neg__(self):
raise NotImplementedError
def __pos__(self):
"""Coerces self to whatever class defines the method."""
raise NotImplementedError
def __sub__(self, other):
return self + -other
def __rsub__(self, other):
return -self + other
@abstractmethod
def __mul__(self, other):
raise NotImplementedError
@abstractmethod
def __rmul__(self, other):
raise NotImplementedError
@abstractmethod
def __div__(self, other):
"""a/b; should promote to float or complex when necessary."""
raise NotImplementedError
@abstractmethod
def __rdiv__(self, other):
raise NotImplementedError
@abstractmethod
def __pow__(self, exponent):
"""a**b; should promote to float or complex when necessary."""
raise NotImplementedError
@abstractmethod
def __rpow__(self, base):
raise NotImplementedError
@abstractmethod
def __abs__(self):
"""Returns the Real distance from 0."""
raise NotImplementedError
@abstractmethod
def conjugate(self):
"""(x+y*i).conjugate() returns (x-y*i)."""
raise NotImplementedError
@abstractmethod
def __eq__(self, other):
raise NotImplementedError
# __ne__ is inherited from object and negates whatever __eq__ does.
Real
抽象基类表示在实数轴上的值,并且支持内置的float
的操作。实数(Real number)是完全有序的,除了 NaN(本 PEP 基本上不考虑它)。
class Real(Complex):
"""To Complex, Real adds the operations that work on real numbers.
In short, those are: conversion to float, trunc(), math.floor(),
math.ceil(), round(), divmod(), //, %, <, <=, >, and >=.
Real also provides defaults for some of the derived operations.
"""
# XXX What to do about the __int__ implementation that's
# currently present on float? Get rid of it?
@abstractmethod
def __float__(self):
"""Any Real can be converted to a native float object."""
raise NotImplementedError
@abstractmethod
def __trunc__(self):
"""Truncates self to an Integral.
Returns an Integral i such that:
* i>=0 iff self>0;
* abs(i) <= abs(self);
* for any Integral j satisfying the first two conditions,
abs(i) >= abs(j) [i.e. i has "maximal" abs among those].
i.e. "truncate towards 0".
"""
raise NotImplementedError
@abstractmethod
def __floor__(self):
"""Finds the greatest Integral <= self."""
raise NotImplementedError
@abstractmethod
def __ceil__(self):
"""Finds the least Integral >= self."""
raise NotImplementedError
@abstractmethod
def __round__(self, ndigits:Integral=None):
"""Rounds self to ndigits decimal places, defaulting to 0.
If ndigits is omitted or None, returns an Integral,
otherwise returns a Real, preferably of the same type as
self. Types may choose which direction to round half. For
example, float rounds half toward even.
"""
raise NotImplementedError
def __divmod__(self, other):
"""The pair (self // other, self % other).
Sometimes this can be computed faster than the pair of
operations.
"""
return (self // other, self % other)
def __rdivmod__(self, other):
"""The pair (self // other, self % other).
Sometimes this can be computed faster than the pair of
operations.
"""
return (other // self, other % self)
@abstractmethod
def __floordiv__(self, other):
"""The floor() of self/other. Integral."""
raise NotImplementedError
@abstractmethod
def __rfloordiv__(self, other):
"""The floor() of other/self."""
raise NotImplementedError
@abstractmethod
def __mod__(self, other):
"""self % other
See
https://mail.python.org/pipermail/python-3000/2006-May/001735.html
and consider using "self/other - trunc(self/other)"
instead if you're worried about round-off errors.
"""
raise NotImplementedError
@abstractmethod
def __rmod__(self, other):
"""other % self"""
raise NotImplementedError
@abstractmethod
def __lt__(self, other):
"""< on Reals defines a total ordering, except perhaps for NaN."""
raise NotImplementedError
@abstractmethod
def __le__(self, other):
raise NotImplementedError
# __gt__ and __ge__ are automatically done by reversing the arguments.
# (But __le__ is not computed as the opposite of __gt__!)
# Concrete implementations of Complex abstract methods.
# Subclasses may override these, but don't have to.
def __complex__(self):
return complex(float(self))
@property
def real(self):
return +self
@property
def imag(self):
return 0
def conjugate(self):
"""Conjugate is a no-op for Reals."""
return +self
我们应该整理 Demo/classes/Rat.py,并把它提升为 Rational.py 加入标准库。然后它将实现有理数(Rational)抽象基类。
class Rational(Real, Exact):
""".numerator and .denominator should be in lowest terms."""
@abstractproperty
def numerator(self):
raise NotImplementedError
@abstractproperty
def denominator(self):
raise NotImplementedError
# Concrete implementation of Real's conversion to float.
# (This invokes Integer.__div__().)
def __float__(self):
return self.numerator / self.denominator
最后是整数类:
class Integral(Rational):
"""Integral adds a conversion to int and the bit-string operations."""
@abstractmethod
def __int__(self):
raise NotImplementedError
def __index__(self):
"""__index__() exists because float has __int__()."""
return int(self)
def __lshift__(self, other):
return int(self) << int(other)
def __rlshift__(self, other):
return int(other) << int(self)
def __rshift__(self, other):
return int(self) >> int(other)
def __rrshift__(self, other):
return int(other) >> int(self)
def __and__(self, other):
return int(self) & int(other)
def __rand__(self, other):
return int(other) & int(self)
def __xor__(self, other):
return int(self) ^ int(other)
def __rxor__(self, other):
return int(other) ^ int(self)
def __or__(self, other):
return int(self) | int(other)
def __ror__(self, other):
return int(other) | int(self)
def __invert__(self):
return ~int(self)
# Concrete implementations of Rational and Real abstract methods.
def __float__(self):
"""float(self) == float(int(self))"""
return float(int(self))
@property
def numerator(self):
"""Integers are their own numerators."""
return +self
@property
def denominator(self):
"""Integers have a denominator of 1."""
return 1
为了支持从 float 到 int(确切地说,从 Real 到 Integral)的精度收缩,我们提出了以下新的 __magic__ 方法,可以从相应的库函数中调用。所有这些方法都返回 Intergral 而不是 Real。
在 2.6 版本中,math.floor、math.ceil 和 round 将继续返回浮点数。
float 的 int() 转换等效于 trunc()。一般而言,int() 的转换首先会尝试__int__(),如果找不到,再尝试__trunc__()。
complex.__{divmod, mod, floordiv, int, float}__ 也消失了。提供一个好的错误消息来帮助困惑的搬运工会很好,但更重要的是不出现在 help(complex) 中。
实现者应该注意使相等的数字相等,并将它们散列为相同的值。如果实数有两个不同的扩展,这可能会变得微妙。例如,一个复数类型可以像这样合理地实现 hash():
def __hash__(self):
return hash(complex(self))
但应注意所有超出了内置复数范围或精度的值。
当然,数字还可能有更多的抽象基类,如果排除了添加这些数字的可能性,这会是一个糟糕的等级体系。你可以使用以下方法在 Complex 和 Real 之间添加MyFoo:
class MyFoo(Complex): ...
MyFoo.register(Real)
我们希望实现算术运算,使得在混合模式的运算时,要么调用者知道如何处理两种参数类型,要么将两者都转换为最接近的内置类型,并以此进行操作。
对于 Integral 的子类型,这意味着__add__和__radd__应该被定义为:
class MyIntegral(Integral):
def __add__(self, other):
if isinstance(other, MyIntegral):
return do_my_adding_stuff(self, other)
elif isinstance(other, OtherTypeIKnowAbout):
return do_my_other_adding_stuff(self, other)
else:
return NotImplemented
def __radd__(self, other):
if isinstance(other, MyIntegral):
return do_my_adding_stuff(other, self)
elif isinstance(other, OtherTypeIKnowAbout):
return do_my_other_adding_stuff(other, self)
elif isinstance(other, Integral):
return int(other) + int(self)
elif isinstance(other, Real):
return float(other) + float(self)
elif isinstance(other, Complex):
return complex(other) + complex(self)
else:
return NotImplemented
对 Complex 的子类进行混合类型操作有 5 种不同的情况。我把以上所有未包含 MyIntegral 和 OtherTypeIKnowAbout 的代码称为“样板”。
a 是 A 的实例,它是Complex(a : A <: Complex)
的子类型,还有 b : B <: Complex
。对于 a + b,我这么考虑:
如果 A <: Complex 和 B <: Real 没有其它关系,则合适的共享操作是内置复数的操作,它们的__radd__都在其中,因此 a + b == b + a。(译注:这几段没看太明白,可能译得不对)
本 PEP 的初始版本定义了一个被 Haskell Numeric Prelude 所启发的代数层次结构,其中包括 MonoidUnderPlus、AdditiveGroup、Ring 和 Field,并在得到数字之前,还有其它几种可能的代数类型。
我们原本希望这对使用向量和矩阵的人有用,但 NumPy 社区确实对此并不感兴趣,另外我们还遇到了一个问题,即便 x 是 X <: MonoidUnderPlus 的实例,而且 y 是 Y < : MonoidUnderPlus 的实例,x + y 可能还是行不通。
然后,我们为数字提供了更多的分支结构,包括高斯整数(Gaussian Integer)和 Z/nZ 之类的东西,它们可以是 Complex,但不一定支持“除”之类的操作。
社区认为这对 Python 来说太复杂了,因此我现在缩小了提案的范围,使其更接近于 Scheme 数字塔。
经与作者协商,已决定目前不将 Decimal 类型作为数字塔的一部分。
1、抽象基类简介:http://www.python.org/dev/peps/pep-3119/
2、可能是 Python 3 的类树?Bill Janssen 的 Wiki 页面:http://wiki.python.org/moin/AbstractBaseClasses
3、NumericPrelude:数字类型类的实验性备选层次结构:http://darcs.haskell.org/numericprelude/docs/html/index.html
4、Scheme 数字塔:https://groups.csail.mit.edu/mac/ftpdir/scheme-reports/r5rs-html/r5rs_8.html#SEC50
(译注:在译完之后,我才发现“PEP中文翻译计划”已收录过一篇译文,有些地方译得不尽相同,读者们可点击阅读原文,比对阅读。)
感谢 Neal Norwitz 最初鼓励我编写此 PEP,感谢 Travis Oliphant 指出 numpy 社区并不真正关心代数概念,感谢 Alan Isaac 提醒我 Scheme 已经做到了,以及感谢 Guido van Rossum 和邮件组里的其他人帮忙完善了这套概念。
该文档已放入公共领域。
源文件:https://github.com/python/peps/blob/master/pep-3141.txt