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183 lines
5.5 KiB
Python
183 lines
5.5 KiB
Python
6 years ago
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"""
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========================
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Broadcasting over arrays
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========================
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.. note::
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See `this article
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<https://numpy.org/devdocs/user/theory.broadcasting.html>`_
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for illustrations of broadcasting concepts.
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The term broadcasting describes how numpy treats arrays with different
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shapes during arithmetic operations. Subject to certain constraints,
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the smaller array is "broadcast" across the larger array so that they
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have compatible shapes. Broadcasting provides a means of vectorizing
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array operations so that looping occurs in C instead of Python. It does
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this without making needless copies of data and usually leads to
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efficient algorithm implementations. There are, however, cases where
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broadcasting is a bad idea because it leads to inefficient use of memory
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that slows computation.
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NumPy operations are usually done on pairs of arrays on an
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element-by-element basis. In the simplest case, the two arrays must
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have exactly the same shape, as in the following example:
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>>> a = np.array([1.0, 2.0, 3.0])
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>>> b = np.array([2.0, 2.0, 2.0])
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>>> a * b
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array([ 2., 4., 6.])
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NumPy's broadcasting rule relaxes this constraint when the arrays'
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shapes meet certain constraints. The simplest broadcasting example occurs
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when an array and a scalar value are combined in an operation:
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>>> a = np.array([1.0, 2.0, 3.0])
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>>> b = 2.0
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>>> a * b
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array([ 2., 4., 6.])
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The result is equivalent to the previous example where ``b`` was an array.
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We can think of the scalar ``b`` being *stretched* during the arithmetic
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operation into an array with the same shape as ``a``. The new elements in
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``b`` are simply copies of the original scalar. The stretching analogy is
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only conceptual. NumPy is smart enough to use the original scalar value
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without actually making copies, so that broadcasting operations are as
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memory and computationally efficient as possible.
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The code in the second example is more efficient than that in the first
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because broadcasting moves less memory around during the multiplication
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(``b`` is a scalar rather than an array).
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General Broadcasting Rules
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==========================
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When operating on two arrays, NumPy compares their shapes element-wise.
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It starts with the trailing dimensions, and works its way forward. Two
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dimensions are compatible when
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1) they are equal, or
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2) one of them is 1
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If these conditions are not met, a
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``ValueError: operands could not be broadcast together`` exception is
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thrown, indicating that the arrays have incompatible shapes. The size of
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the resulting array is the maximum size along each dimension of the input
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arrays.
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Arrays do not need to have the same *number* of dimensions. For example,
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if you have a ``256x256x3`` array of RGB values, and you want to scale
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each color in the image by a different value, you can multiply the image
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by a one-dimensional array with 3 values. Lining up the sizes of the
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trailing axes of these arrays according to the broadcast rules, shows that
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they are compatible::
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Image (3d array): 256 x 256 x 3
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Scale (1d array): 3
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Result (3d array): 256 x 256 x 3
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When either of the dimensions compared is one, the other is
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used. In other words, dimensions with size 1 are stretched or "copied"
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to match the other.
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In the following example, both the ``A`` and ``B`` arrays have axes with
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length one that are expanded to a larger size during the broadcast
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operation::
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A (4d array): 8 x 1 x 6 x 1
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B (3d array): 7 x 1 x 5
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Result (4d array): 8 x 7 x 6 x 5
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Here are some more examples::
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A (2d array): 5 x 4
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B (1d array): 1
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Result (2d array): 5 x 4
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A (2d array): 5 x 4
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B (1d array): 4
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Result (2d array): 5 x 4
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A (3d array): 15 x 3 x 5
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B (3d array): 15 x 1 x 5
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Result (3d array): 15 x 3 x 5
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A (3d array): 15 x 3 x 5
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B (2d array): 3 x 5
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Result (3d array): 15 x 3 x 5
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A (3d array): 15 x 3 x 5
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B (2d array): 3 x 1
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Result (3d array): 15 x 3 x 5
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Here are examples of shapes that do not broadcast::
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A (1d array): 3
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B (1d array): 4 # trailing dimensions do not match
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A (2d array): 2 x 1
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B (3d array): 8 x 4 x 3 # second from last dimensions mismatched
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An example of broadcasting in practice::
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>>> x = np.arange(4)
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>>> xx = x.reshape(4,1)
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>>> y = np.ones(5)
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>>> z = np.ones((3,4))
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>>> x.shape
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(4,)
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>>> y.shape
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(5,)
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>>> x + y
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ValueError: operands could not be broadcast together with shapes (4,) (5,)
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>>> xx.shape
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(4, 1)
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>>> y.shape
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(5,)
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>>> (xx + y).shape
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(4, 5)
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>>> xx + y
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array([[ 1., 1., 1., 1., 1.],
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[ 2., 2., 2., 2., 2.],
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[ 3., 3., 3., 3., 3.],
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[ 4., 4., 4., 4., 4.]])
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>>> x.shape
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(4,)
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>>> z.shape
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(3, 4)
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>>> (x + z).shape
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(3, 4)
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>>> x + z
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array([[ 1., 2., 3., 4.],
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[ 1., 2., 3., 4.],
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[ 1., 2., 3., 4.]])
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Broadcasting provides a convenient way of taking the outer product (or
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any other outer operation) of two arrays. The following example shows an
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outer addition operation of two 1-d arrays::
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>>> a = np.array([0.0, 10.0, 20.0, 30.0])
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>>> b = np.array([1.0, 2.0, 3.0])
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>>> a[:, np.newaxis] + b
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array([[ 1., 2., 3.],
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[ 11., 12., 13.],
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[ 21., 22., 23.],
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[ 31., 32., 33.]])
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Here the ``newaxis`` index operator inserts a new axis into ``a``,
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making it a two-dimensional ``4x1`` array. Combining the ``4x1`` array
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with ``b``, which has shape ``(3,)``, yields a ``4x3`` array.
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"""
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from __future__ import division, absolute_import, print_function
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