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My understanding is that 1-D arrays in numpy can be interpreted as either a column-oriented vector or a row-oriented vector. For instance, a 1-D array with shape (8,) can be viewed as a 2-D array of shape (1,8) or shape (8,1) depending on context.

The problem I'm having is that the functions I write to manipulate arrays tend to generalize well in the 2-D case to handle both vectors and matrices, but not so well in the 1-D case.

As such, my functions end up doing something like this:

if arr.ndim == 1:
    # Do it this way
    # Do it that way

Or even this:

# Reshape the 1-D array to a 2-D array
if arr.ndim == 1:
    arr = arr.reshape((1, arr.shape[0]))

# ... Do it the 2-D way ...

That is, I find I can generalize code to handle 2-D cases (r,1), (1,c), (r,c), but not the 1-D cases without branching or reshaping.

It gets even uglier when the function operates on multiple arrays as I would check and convert each argument.

So my question is: am I missing some better idiom? Is the pattern I've described above common to numpy code?

Also, as a related matter of API design principles, if the caller passes a 1-D array to some function that returns a new array, and the return value is also a vector, is it common practice to reshape a 2-D vector (r,1) or (1,c) back to a 1-D array or simply document that the function returns a 2-D array regardless?


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up vote 6 down vote accepted

I think in general NumPy functions that require an array of shape (r,c) make no special allowance for 1-D arrays. Instead, they expect the user to either pass an array of shape (r,c) exactly, or for the user to pass a 1-D array that broadcasts up to shape (r,c).

If you pass such a function a 1-D array of shape (c,) it will broadcast to shape (1,c), since broadcasting adds new axes on the left. It can also broadcast to shape (r,c) for an arbitrary r (depending on what other array it is being combined with).

On the other hand, if you have a 1-D array, x, of shape (r,) and you need it to broadcast up to shape (r,c), then NumPy expects the user to pass an array of shape (r,1) since broadcasting will not add the new axes on the right for you.

To do that, the user must pass x[:,np.newaxis] instead of just x.

Regarding return values: I think it better to always return a 2-D array. If the user knows the output will be of shape (1,c), and wants a 1-D array, let her slice off the 1-D array x[0] herself.

By making the return value always the same shape, it will be easier to understand code that uses this function, since it is not always immediately apparent what the shape of the inputs are.

Also, broadcasting blurs the distinction between a 1-D array of shape (c,) and a 2-D array of shape (r,c). If your function returns a 1-D array when fed 1-D input, and a 2-D array when fed 2-D input, then your function makes the distinction strict instead of blurred. Stylistically, this reminds me of checking if isinstance(obj,type), which goes against the grain of duck-typing. Don't do it if you don't have to.

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unutbu's explanation is good, but I disagree on the return dimension.

The function internal pattern depends on the type of function.

Reduce operations with an axis argument can often be written so that the number of dimensions doesn't matter.

Numpy has also an atleast_2d (and atleast_1d) function that is also commonly used if you need an explicit 2d array. In statistics, I sometimes use a function like atleast_2d_cols, that reshapes 1d (r,) to 2d (r,1) for code that expects 2d, or if the input array is 1d, then the interpretation and linear algebra requires a column vector. (reshaping is cheap so this is not a problem)

In a third case, I might have different code paths if the lower dimensional case can be done cheaper or simpler than the higher dimensional case. (example: if 2d requires several dot products.)

return dimension

I think not following the numpy convention with the return dimension can be very confusing to users for general functions. (topic specific functions can be different.) For example, reduce operations loose one dimension.

For many other functions the output dimension matches the input dimension. I think a 1d input should have a 1d output and not an extra redundant dimension. Except for functions in linalg, I don't remember any functions that would return a redundant extra dimension. (The scalar versus 1-element array case is not always consistent.)

Stylistically this reminds me of an isinstance check:

Try without it if you allow for example for numpy matrices and masked arrays. You will get funny results that are not easy to debug. Although, for most numpy and scipy functions the user has to know whether the array type will work with them, since there are few isinstance checks and asarray might not always do the right thing.

As a user, I always know what kind of "array_like" I have, a list, tuple or which array subclass, especially when I use multiplication.

np.matrix(range(3)) * np.eye(3)
np.arange(3) * np.eye(3)

another example: What does this do?

>>> x = np.array(tuple(range(3)), [('',int)]*3)
>>> x
array((0, 1, 2), 
      dtype=[('f0', '<i4'), ('f1', '<i4'), ('f2', '<i4')])
>>> x * np.eye(3)
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This is a good use for decorators

def atmost_2d(func):
  def wrapr(x):
    return func(np.atleast_2d(x)).squeeze()
  return wrapr

For example, this function will pick out the last column of its input.

def g(x):
  return x[:,-1]

But: it works for:


In [46]: b
Out[46]: array([0, 1, 2, 3, 4, 5])

In [47]: g(b)
Out[47]: array(5)


In [49]: A
array([[0, 1],
       [2, 3],
       [4, 5]])

In [50]: g(A)
Out[50]: array([1, 3, 5])


In [51]: g(99)
Out[51]: array(99)

This answer builds on the previous two.

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