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I'm trying to generate an AR(2) process with MATLAB's filter() function, as shown here:

A=[1 -2.7607 3.8106 -2.6535 0.9238];
% AR(4) coefficients
% Filter a white noise input to create AR(4) process
[ar_coeffs,nv] =arburg(y,4);
%compare the results in ar_coeffs to the vector A.

I have a time series data set and would like to approximately match the 'total' variance of the data in a simulated data set. When I use nv in place of 0.2 in the second line of code, I get a variance in the simulated that is much too small.

Can anyone help me rectify this situation to generate a look-alike simulated AR(N) data set?



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I could be totally wrong (which is why this is a comment and not an answer), but shouldn't you pre-multiply randn with sqrt(nv) rather than nv? nv is a variance right? I'm simply applying the identity Var(c*X) = c^2 * Var(X). –  Colin T Bowers Oct 17 '12 at 6:30
D'oh. Yes, thanks! –  Mark C. Oct 17 '12 at 7:54

1 Answer 1

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If you look at nv in this example it is 0.0392, this is variance. To create a white noise with variance a^2 you need to multiply that sequence by a. If a^2 = 0.392 then a is 0.198 (very close to 0.2). So Colin T is right and you need to multiply your randn(1024,1) by sqrt(nv) not by nv.

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