What precisely is conv2(A,B,'same')?

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Anonymous
Anonymous on 19 Nov 2018
Commented: Nunzio Russo on 26 Jan 2021
Hi All,
I am aware of the following:
  • Given two matrices A and B, the matrix is a submatrix of their convolution , and I know the definition of .
  • and A have the same size.
My question is:
If A is a matrix and B is , then what are the values of i and j such that ? That is, where does start inside the matrix ?
Many thanks
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Richard Lockwood
Richard Lockwood on 5 Nov 2020
I believe it is the middle half, from 1/4 to 3/4 of the total interval
Image Analyst
Image Analyst on 6 Nov 2020
RIchard, no, not correct. It's not the middle 50%.
'Same' is the part of the output signal where the moving kernel's central element overlaps some part of the signal. So it includes signal where the central element of the moving kernel overlaps an element of the input signal and includes locations where the kernel "falls off" the end of the signal as long as the central element is still over the input signal.
'Full" is the entire output signal, even when the kernel is at the end and only a single element of the kernel overlaps the signal.
'Valid' is where the kernel fully overlaps the signal. So it would not include the ends of the signal where some parts of the moving kernel "fall off" the end of the input signal (they do not overlap).

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Accepted Answer

Bruno Luong
Bruno Luong on 19 Nov 2018
Edited: Bruno Luong on 25 Jan 2021
For vectors A and B
C = conv(A,B,'same')
is equivalent to
Cfull = conv(A,B,'full')
C = Cfull(floor(length(B)/2) + (1:length(A)))
For 2D or ND, repeat the above indexing for each dimension d, using size(.,d) instead of length(.).
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Bruno Luong
Bruno Luong on 25 Jan 2021
Edited: Bruno Luong on 25 Jan 2021
This is ta reply to
Nunzio Russo 's deleted question
"Hello Bruno can you pls explain it again for 2dimensional arrays ? I don't get it right now. I don't know what you mean with variable d ? Perhaps you can explain it again and write it down as a formula. Thank you ! "
In 2D
C = conv2(A,B,'same')
is equivalent to
Cfull = conv2(A,B,'full')
C = Cfull(floor(size(B,1)/2) + (1:size(A,1)), ...
floor(size(B,2)/2) + (1:size(A,2)))
Fot nd case
C = convn(A,B,'same') % is eqivalent to
Cfull = convn(A,B,'full');
idx = arrayfun(@(B,A) floor(B/2)+(1:A), size(B), size(A), 'unif', 0); % NOTE: traling singleton needs to be handled
C = Cfull(idx{:})
Nunzio Russo
Nunzio Russo on 26 Jan 2021
Bruno Thank you again !
I deleted my question yesterday after coming to the same conclusion. :)

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More Answers (1)

Image Analyst
Image Analyst on 19 Nov 2018
Sounds like homework. This is very easy. Just make up arrays on paper, like cut out gridded paper or draw something. Then just physically move the paper along and look where you are. Really, it's trivial.

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