Area under autocorrelation function.
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I need to calculate the area under an autocorrelation function, BUT, only the first positive area. In other words, the area under the graph from y=1 to the first point that y=0.
At the moment I just have
[ACF, lags] = autocorr(u(1,:), 53)
Where u is a 39x54 matrix. (Hence 53=54-1)
Any ideas?
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Answers (2)
kjetil87
on 1 Sep 2013
Edited: kjetil87
on 1 Sep 2013
Initially i thought the previous answer was ok, but when reading your entire post you specified that you needed the FIRST positive area. Also, just setting negative values to zero introduces additional errors because when going from last positive value to first negative, say eg from 1 to -1 , the zero crossing is actually between the two indexes not on the first negative index. Therefor interpolation will be a better approximation.
%here is your example, note that the interpolation gives only a very small
%improvement here since your first negative value is so close to zero.
y=[1:1:10];
[C,lags]=autocorr(y,9);
lags2=1:0.1:lags(end)+1;
CI=interp1(1+lags,C,lags2); %inperpolate 10 x.
idx1=find(CI>0,1,'first'); %from first positive value
idx2=find(CI(idx1:end)<0,1,'first'); %to first negative after first pos.
Area=trapz(CI(idx1:idx2-1))*0.1 % either give the selected value of lags2 or
% do as here, calculate with unit spacing and
% multiply by the actual increment.
Area =
1.7345
Note that you will still have errors related to the fact that you dont know the actual zero crossings. To illustrate zoom in on this plot:
figure;
plot(lags2,CI,'-x');
hold on
plot(lags2(idx1:idx2-1),CI(idx1:idx2-1),'-rx');
grid minor
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Youssef Khmou
on 24 Aug 2013
Edited: Youssef Khmou
on 24 Aug 2013
hi,
You evaluate the integral of the auto-correlation function with respect to your boundaries , here is an example :
y=sin(2*pi*4*(0:0.1:10)); % 4 Hz
[C,lags]=xcorr(y,530);
Z=C;
Z(Z<0)=0; % boundaries
Z(Z>1)=0;
figure, plot(lags,Z);
Area01=trapz(lags,Z);
The result can be null; it depends on the number of samples in lags .
2 Comments
hugoles
on 1 Sep 2013
Hello Pete,
Have you found the right way to calculate this ? I have exactly the same problem.
Thanks,
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