Array Broadcasting in Numpy¶
Let’s explore a more advanced concept in numpy called broadcasting. The term broadcasting describes how numpy treats arrays with different shapes during arithmetic operations. Subject to certain constraints, the smaller array is “broadcast” across the larger array so that they have compatible shapes. Broadcasting provides a means of vectorizing array operations so that looping occurs in C instead of Python. It does this without making needless copies of data and usually leads to efficient algorithm implementations. There are also cases where broadcasting is a bad idea because it leads to inefficient use of memory that slows computation. This article provides a gentle introduction to broadcasting with numerous examples ranging from simple to involved. It also provides hints on when and when not to use broadcasting.
numpy operations are usually done element-by-element which requires two arrays to have exactly the same shape:
>>> from numpy import array
>>> a = array([1.0, 2.0, 3.0])
>>> b = array([2.0, 2.0, 2.0])
>>> a * b
array([ 2., 4., 6.])
numpy’s broadcasting rule relaxes this constraint when the arrays’ shapes meet certain constraints. The simplest broadcasting example occurs when an array and a scalar value are combined in an operation:
>>> from numpy import array
>>> a = array([1.0,2.0,3.0])
>>> b = 2.0
>>> a * b
array([ 2., 4., 6.])
The result is equivalent to the previous example where b was an array. We
can think of the scalar b being stretched during the arithmetic operation
into an array with the same shape as a. The new elements in b, as shown
in Figure 1, are simply copies of the original scalar. The stretching
analogy is only conceptual. numpy is smart enough to use the original scalar
value without actually making copies so that broadcasting operations are as
memory and computationally efficient as possible. Because Example 2
moves less memory, (b is a scalar, not an array) around during the
multiplication, it is about 10% faster than Example 1 using the standard
numpy on Windows 2000 with one million element arrays.
Figure 1¶
In the simplest example of broadcasting, the scalar ``b`` is stretched to become an array of with the same shape as ``a`` so the shapes are compatible for element-by-element multiplication.
The rule governing whether two arrays have compatible shapes for broadcasting can be expressed in a single sentence.
The Broadcasting Rule
In order to broadcast, the size of the trailing axes for both arrays in an operation must either be the same size or one of them must be one.
If this condition is not met, a ValueError('frames are not aligned')
exception is thrown indicating that the arrays have incompatible shapes. The
size of the result array created by broadcast operations is the maximum size
along each dimension from the input arrays. Note that the rule does not say
anything about the two arrays needing to have the same number of dimensions.
So, for example, if you have a 256 x 256 x 3 array of RGB values, and you want
to scale each color in the image by a different value, you can multiply the
image by a one-dimensional array with 3 values. Lining up the sizes of the
trailing axes of these arrays according to the broadcast rule shows that they
are compatible
Image |
(3d array) |
256 x |
256 x |
3 |
Scale |
(1d array) |
3 |
||
Result |
(3d array) |
256 x |
256 x |
3 |
In the following example, both the A and B arrays have axes with length
one that are expanded to a larger size in a broadcast operation.
A |
(4d array) |
8 x |
1 x |
6 x |
1 |
B |
(3d array) |
7 x |
1 x |
5 |
|
Result |
(4d array) |
8 x |
7 x |
6 x |
5 |
Below, are several code examples and graphical representations that help make the broadcast rule visually obvious. Example 3 adds a one-dimensional array to a two-dimensional array:
>>> from numpy import array
>>> a = array([[ 0.0, 0.0, 0.0],
... [10.0, 10.0, 10.0],
... [20.0, 20.0, 20.0],
... [30.0, 30.0, 30.0]])
>>> b = array([1.0, 2.0, 3.0])
>>> a + b
array([[ 1., 2., 3.],
[ 11., 12., 13.],
[ 21., 22., 23.],
[ 31., 32., 33.]])
As shown in Figure 2, b is added to each row of a. When b is
longer than the rows of a, as in Figure 3, an exception is raised
because of the incompatible shapes.
Figure 2¶
A two dimensional array multiplied by a one dimensional array results in broadcasting if number of 1-d array elements matches the number of 2-d array columns.
Figure 3¶
When the trailing dimensions of the arrays are unequal, broadcasting fails because it is impossible to align the values in the rows of the 1st array with the elements of the 2nd arrays for element-by-element addition.
Broadcasting provides a convenient way of taking the outer product (or any other outer operation) of two arrays. The following example shows an outer addition operation of two 1-d arrays that produces the same result as Example 3
>>> from numpy import array, newaxis
>>> a = array([0.0, 10.0, 20.0, 30.0])
>>> b = array([1.0, 2.0, 3.0])
>>> a[:,newaxis] + b
array([[ 1., 2., 3.],
[ 11., 12., 13.],
[ 21., 22., 23.],
[ 31., 32., 33.]])
Here the newaxis index operator inserts a new axis into a, making it a
two-dimensional 4x1 array. Figure 4 illustrates the stretching of both
arrays to produce the desired 4x3 output array.
Figure 4¶
In some cases, broadcasting stretches both arrays to form an output array larger than either of the initial arrays.*
A Practical Example: Vector Quantization.¶
Broadcasting comes up quite often in real world problems. A typical example
occurs in the vector quantization (VQ) algorithm used in information theory,
classification, and other related areas. The basic operation in VQ [#f0] finds
the closest point in a set of points, called codes in VQ jargon, to a given
point, called the observation. In the very simple, two-dimensional case shown
in Figure 5, the values in observation describe the weight and height of an
athlete to be classified. The codes represent different classes of
athletes. 2 Finding the closest point requires calculating the distance
between observation and each of the codes. The shortest distance provides the
best match. In this example, codes[0] is the closest class indicating that
the athlete is likely a basketball player.
Figure 5¶
The basic operation of vector quantization calculates the distance between an object to be classified, the dark square, and multiple known codes, the gray circles. In this simple case, the codes represent individual classes. More complex cases use multiple codes per class.
Footnotes
- 1
Vector Quantization J. Makhoul, S. Roucos, and H. Gish, “Vector Quantization in Speech Coding,” Proc. IEEE, vol. 73, pp. 1551-1587, Nov. 1985.
- 2
In this example, weight has more impact on the distance calculation than height because of the larger values. In practice, it is important to normalize the height and weight, often by their standard deviation across the data set, so that both have equal influence on the distance calculation.
Note
The code to produce the figures is part of the AstroML book