All three of the input variables are single precision, the outputs are all complex single. I do realize that at the frequency I am checking the magnitude is 150dB less than the maximum, so I would expect some loss of resolution, but I would think it should be consistent.
fft(single) is giving inconsistent results
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I have found that if I have an array of singles and I want to run it through fft so the transform is performed independently for each column, I get a different answer if I add on additional columns. I haven't been able to reproduce using random inputs, but i did save my inputs out from my workspace so the issue can be reproduced. the input time histories are attached.
I basically have a 10000x20 array of single precision, real numbers. If I add on an additional 10 columns of single precision, real numbers and run it through fft, I get a different result than if I just run the 20 columns through fft. There seems to be some interaction between the columns during the calculation, and the transform should definitely be performed independently for each channel.
I am running on 2012b 64-bit, I see the same result on 2010b 64-bit and 2012b 32-bit but NOT on 2010b 32-bit
load('fft vars.mat');
xxx=[bData mData];
isequal(bData(:,2),xxx(:,2))
f1=fft(xxx);
f2=fft(bData);
f1(591,2)
f2(591,2)
%what?!!
ans =
1
ans =
-40.3370 -39.9248i
ans =
-38.6038 -39.4498i
2 Comments
Accepted Answer
Matt J
on 4 Oct 2013
Edited: Matt J
on 4 Oct 2013
Well, it is interesting that there are differences when the inputs are supposedly identical. However, the differences are tiny and seem like they must be attributable to floating point round-off issues. After all, the values of abs(f1) and abs(f2) range up to 10^8, so differences between
-40.3370 -39.9248i
and
-38.6038 -39.4498i
are well on the fringe of single floating point precision.
2 Comments
Matt J
on 4 Oct 2013
I suspect that the differences might be due to multi-threading. The larger array xxx is partitioned differently among cores when it is processed and so the additions/subtractions involved in the ffts are done in a different order. This would lead to different patterns of floating point errors.
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