I have a p-by-p-by-n tensor. I want to extract diagonal element for each p-by-p slice. Are there anyone know how to do this without looping?
Thank you.
3 Answers
Behold the ever mighty and ever powerful bsxfun for vectorizing MATLAB problems to do this task very efficiently using MATLAB's linear indexing -
diags = A(bsxfun(@plus,[1:p+1:p*p]',[0:n-1]*p*p))
Sample run with 4 x 4 x 3 sized input array -
A(:,:,1) =
0.7094 0.6551 0.9597 0.7513
0.7547 0.1626 0.3404 0.2551
0.2760 0.1190 0.5853 0.5060
0.6797 0.4984 0.2238 0.6991
A(:,:,2) =
0.8909 0.1493 0.8143 0.1966
0.9593 0.2575 0.2435 0.2511
0.5472 0.8407 0.9293 0.6160
0.1386 0.2543 0.3500 0.4733
A(:,:,3) =
0.3517 0.9172 0.3804 0.5308
0.8308 0.2858 0.5678 0.7792
0.5853 0.7572 0.0759 0.9340
0.5497 0.7537 0.0540 0.1299
diags =
0.7094 0.8909 0.3517
0.1626 0.2575 0.2858
0.5853 0.9293 0.0759
0.6991 0.4733 0.1299
Benchmarking
Here's few runtime tests comparing this bsxfun based approach against repmat + eye based approach for big datasizes -
***** Datasize: 500 x 500 x 500 *****
----------------------- With BSXFUN
Elapsed time is 0.008383 seconds.
----------------------- With REPMAT + EYE
Elapsed time is 0.163341 seconds.
***** Datasize: 800 x 800 x 500 *****
----------------------- With BSXFUN
Elapsed time is 0.012977 seconds.
----------------------- With REPMAT + EYE
Elapsed time is 0.402111 seconds.
***** Datasize: 1000 x 1000 x 500 *****
----------------------- With BSXFUN
Elapsed time is 0.017058 seconds.
----------------------- With REPMAT + EYE
Elapsed time is 0.690199 seconds.
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2@SanthanSalai Yup! Lot less memory requirements and still vectorized, just one of those special cases.– DivakarMay 16, 2015 at 10:06
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Any body seeing these kind of prob would obviously think of
maskingbut you took a different route ;) May 16, 2015 at 10:12 -
2@SanthanSalai I didn't take a different route, I took my instinctively default route, the bsxfun route! ;)– DivakarMay 16, 2015 at 12:58
One suggestion I have is to create a p x p logical identity matrix, replicate this n times in the third dimension, and then use this matrix to access your tensor. Something like this, supposing that your tensor was stored in A:
ind = repmat(logical(eye(p)), [1 1 n]);
out = A(ind);
Example use:
>> p = 5; n = 3;
>> A = reshape(1:75, p, p, n)
A(:,:,1) =
1 6 11 16 21
2 7 12 17 22
3 8 13 18 23
4 9 14 19 24
5 10 15 20 25
A(:,:,2) =
26 31 36 41 46
27 32 37 42 47
28 33 38 43 48
29 34 39 44 49
30 35 40 45 50
A(:,:,3) =
51 56 61 66 71
52 57 62 67 72
53 58 63 68 73
54 59 64 69 74
55 60 65 70 75
>> ind = repmat(logical(eye(p)), [1 1 n]);
>> out = A(ind)
out =
1
7
13
19
25
26
32
38
44
50
51
57
63
69
75
You'll notice that we grab the diagonals of the first slice, followed by the diagonals of the second slice, etc. up until the last slice. These values are all concatenated into a single vector.
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1
Just reading Divakar's answer and trying to understand why he again is roughly 10 times faster than my idea I put together code mixing both, and ended up with code which is faster:
A=reshape(A,[],n);
diags2 = A(1:p+1:p*p,:);
For a 500x500x500 tensor I get 0.008s for Divakar's solution and 0.005s for my solution using Matlab 2013a. Probably plain indexing is the only way to beat bsxfun.
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1Ah involves reshaping to index, nice. Won't that
reshapebe a bit costly affair?– DivakarMar 17, 2016 at 13:23 -
Isn't reshape basically zero cost? I never saw it adding any substantial runtime.– DanielMar 17, 2016 at 13:26
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Well, reshape isn't exactly costly when you compare with something like
permute, but not free for sure. Did you include reshape in the timings?– DivakarMar 17, 2016 at 13:28 -
Yes, it was included into my timings. A
reshapedoes not touch the data in memory at all.– DanielMar 17, 2016 at 13:30 -
@Divakar: Had a similar discussion with Ander Biguri yesterday in the chat. Now realizing that even you aren't aware of the speed of reshape, I think I should share that knowledge– DanielMar 17, 2016 at 13:55
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