How to find which elements for each row of matrix B (NxM) are contained in matrix A (NxK), in their corresponding row n using vectorization?
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George Aipal
am 24 Feb. 2016
Bearbeitet: Stephen23
am 27 Feb. 2016
How to find which elements for each row of matrix B (NxM) are contained in matrix A (NxK), in their corresponding row n?
Toy example:
A = [1 2 3; 4 5 6; 7 8 9]
A =
1 2 3
4 5 6
7 8 9
B = [0 7 9 1 8; 1 15 5 15 4; 1 2 20 5 9]
B =
0 7 9 1 8
1 15 5 15 4
1 2 20 5 9
Which elements of B are contained in A (restricted to their corresponding row?): The answer should be a matrix C of same dimensions as B (NxM)
C =
0 0 0 1 0
0 0 1 0 1
0 0 0 0 1
For each column vector of matrix B, it should check if it is contained in A, but only row-wise. For instance, although B(2,1)=1 is contained in A(1,1), they belong to different rows (row 2 vs row 1).
The only solution I have is to use a sum inside a for loop:
C = [];
for i = 1:size(b, 2)
C = [C sum(b(:, i) == a, 2)];
end
C
C =
0 0 0 1 0
0 0 1 0 1
0 0 0 0 1
However, for very big matrices this is very slow. Is there a way I can vectorize this?
PS: because of a warning ("warning: mx_el_eq: automatic broadcasting operation applied"), I had started using sum(bsxfun(@eq, B(:, 4), A), 2) instead of sum(B(:, i) == A, 2), but running a small tic toc experiment it seems that the latter form without bsxfun runs faster and therefore is preferred?
1 Kommentar
Stephen23
am 24 Feb. 2016
Bearbeitet: Stephen23
am 24 Feb. 2016
@George Aipal: Your method of expanding C on every iteration is very memory inefficient. Because you concatenate (and expand) the array on each iteration MATLAB has to check its size and move it to larger memory when required. Slow! This is a topic that has been covered many times on this forum (and many others). Use your favorite internet search engine to find the thousands of explanations why this is slow code and how to fix it: search for "MATLAB array preallocation".
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Stephen23
am 24 Feb. 2016
Bearbeitet: Stephen23
am 24 Feb. 2016
No loops are required.
Method one: permute
>> any(bsxfun(@eq,B,permute(A,[1,3,2])),3)
ans =
0 0 0 1 0
0 0 1 0 1
0 0 0 0 1
Method two: reshape
>> any(bsxfun(@eq,B,reshape(A,size(A,1),1,[])),3)
ans =
0 0 0 1 0
0 0 1 0 1
0 0 0 0 1
6 Kommentare
Guillaume
am 27 Feb. 2016
Well, not exactly like your original code which wasn't efficient. You'll have to fall back to the loop method in my answer.
Weitere Antworten (2)
Guillaume
am 24 Feb. 2016
I don't think there's going to be a faster way than iterating over the rows to do what you want. The way you've constructed your loop is very inefficient though, for two reasons:
- you don't preallocate the output C and instead grow it on each loop iteration, meaning that matlab allocates a new array and copy the old one on each iteration. A big cause of slowdowns for large arrays.
- the way you test for membership is inefficient. Use ismember on rows of A and B instead of iterating over the columns of B and comparing to the whole A matrix.
So:
C = zeros(size(B)); %preallocation. no reallocation in the loop
for rowidx = 1:size(B, 1)
C(rowidx, :) = ismember(B(rowidx, :), A(rowidx, :)); %much faster membership test
end
You could also rewrite the above as the one-liner (no preallocation needed):
C = cell2mat(cellfun(@ismember, num2cell(B, 2), num2cell(A, 2), 'UniformOutput', false))
No guarantee it will be faster than the explicit loop.
3 Kommentare
Guillaume
am 24 Feb. 2016
D'oh! Of course, there is a way to do it without a loop. See Stephen's answer.
My comments on the inefficiencies of your loop still stand.
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