2D Convolution in Python similar to Matlab's conv2

I have been trying to do Convolution of a 2D Matrix using SciPy, and Numpy but have failed. For SciPy I tried, sepfir2d and scipy.signal.convolve and Convolve2D for Numpy. Is there a simple function like conv2 in Matlab for Python?

Here is an example:

`````` A= [ 5     4     5     4;
3     2     3     2;
5     4     5     4;
3     2     3     2 ]
``````

I want to convolve it with `[0.707 0.707]`

And the result as by conv2 from Matlab is

``````3.5350    6.3630    6.3630    6.3630    2.8280
2.1210    3.5350    3.5350    3.5350    1.4140
3.5350    6.3630    6.3630    6.3630    2.8280
2.1210    3.5350    3.5350    3.5350    1.4140
``````

Some function to compute this output in Python? I will be grateful for a response.

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There are a number of different ways to do it with `scipy`, but 2D convolution isn't directly included in `numpy`. (It's also easy to implement with an fft using only numpy, if you need to avoid a scipy dependency.)

`scipy.signal.convolve2d`, `scipy.signal.convolve`, `scipy.signal.fftconvolve`, and `scipy.ndimage.convolve` will all handle a 2D convolution (the last three are N-d) in different ways.

`scipy.signal.fftconvolve` does the convolution in the fft domain (where it's a simple multiplication). This is much faster in many cases, but can lead to very small differences in edge effects than the discrete case, and your data will be coerced into floating point with this particular implementation. Additionally, there's unnecessary memory usage when convolving a small array with a much larger array. All in all, fft-based methods can be dramatically faster, but there are some common use cases where `scipy.singal.fftconvolve` is not an ideal solution.

`scipy.signal.convolve2d`, `scipy.signal.convolve`, and `scipy.ndimage.convolve` all use a discrete convolution implemented in C, however, they implement it in different ways.

`scipy.ndimage.convolve` keeps the same data type, and gives you control over the location of the output to minimize memory usage. If you're convolving `uint8`'s (e.g. image data), it's often the best option. The output will always be the same shape as the first input array, which makes sense for images, but perhaps not for more general convolution. `ndimage.convolve` gives you a lot of control over how edge effects are handled through the `mode` kwarg (which functions completely differently than `scipy.signal`'s `mode` kwarg).

Avoid `scipy.signal.convolve` if you're working with 2d arrays. It works for the N-d case, but it's suboptimal for 2d arrays, and `scipy.signal.convolve2d` exists to do the exact same thing a bit more efficiently. The convolution functions in `scipy.signal` give you control over the output shape using the `mode` kwarg. (By default, they'll behave just like matlab's `conv2`.) This is useful for general mathematical convolution, but less useful for image processing. However, `scipy.signal.convolve2d` is generally slower than `scipy.ndimage.convolve`.

There are a lot of different options partly due to duplication in the different submodules of `scipy` and partly because there are different ways to implement a convolution that have different performance tradeoffs.

If you can give a bit more detail about your use case, we can recommend a better solution. If you're convolving two arrays of roughly the same size, and they're already floats, `fftconvolve` is an excellent choice. Otherwise, `scipy.ndimage.convolve` may beat it.

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Thank you Joe for a detailed response. I am trying to do Stationary Wavelet Transform of an Image to be used in denoising. That is where I want to use it. –  user1343318 Apr 20 '13 at 15:38
In that case, `scipy.ndimage.convolve1d`, as Bitwise mentioned is probably your best choice. It's optimized for the particular use case of convolving a 1d array with a 2d array. Hope that helps! –  Joe Kington Apr 20 '13 at 15:45
Also, if you don't want to have to pad `A` with zeros, `scipy.signal.convolve2d` may be a better option. The shape of the array returned will be just like matlab's `conv2`, by default. (I forgot to include that information in my answer originally) If you're working with an image, though, I'd assume that you want the returned array to be the same shape as the original. In that case, `ndimage` is your best bet. –  Joe Kington Apr 20 '13 at 16:01

scipy's convolved1d() does what you want, just treats the edges a bit differently:

``````sp.ndimage.filters.convolve1d(A,[0.707,0.707],axis=1,mode='constant')
``````

will give you:

``````array([[ 6.363,  6.363,  6.363,  2.828],
[ 3.535,  3.535,  3.535,  1.414],
[ 6.363,  6.363,  6.363,  2.828],
[ 3.535,  3.535,  3.535,  1.414]])
``````

If you want the exact same result, just add a column of zeros to A like this:

``````sp.ndimage.filters.convolve1d(np.c_[np.zeros((4,1)),A],[0.707,0.707],axis=1,mode='constant')
``````

and you will get:

``````array([[ 3.535,  6.363,  6.363,  6.363,  2.828],
[ 2.121,  3.535,  3.535,  3.535,  1.414],
[ 3.535,  6.363,  6.363,  6.363,  2.828],
[ 2.121,  3.535,  3.535,  3.535,  1.414]])
``````

From my experience you can do in scipy/numpy most of what you do in Matlab very easily (and more).

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Thanks a ton Bitwise, I am going to try it. –  user1343318 Apr 20 '13 at 15:36