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I got the following time series of residuals from another regression. One index is a day. You can directly observe the year cycle.

Aim is to fit a harmonic function through it to expalain further part of the underlying time series.

I really appreciate your ideas about which function to use for estimating the right parameters! From acf we learn that there is also a week cycle. However, this issue i will adress later with sarima.

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closed as off topic by Joshua Ulrich, Ari B. Friedman, Andrie, Roman Luštrik, Justin Jul 4 '12 at 16:28

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Do you mean something like y=a0+a1*sin(a2+2*pi*t/a3) for the monthly cycle, where a0 is mean (possibly zero), a1 is amplitude and a3 could be, e.g., 30 if t is in days? –  Roland Jun 12 '12 at 15:36
    
I just edited my post a bit to make things clearer. Looking forward for your ideas. –  Fabian Stolz Jun 12 '12 at 17:50

2 Answers 2

up vote 1 down vote accepted

This seems to be the sort of thing a fourier transform is designed for.

Try

fftobj = fft(x)
plot(Mod(fftobj)[1:floor(length(x)/2)])

The peaks in this plot corresponds to frequencies with high coefficients in the fit. Arg(fftobj) will give you the phases.

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Well i tried it, but it provides a forecast that looks like a exponential distribution. I solved the problem meanwhile in another way. I added a factor component for each month and draw a regression. In the next step I smoothed the results from this regression and got a intra-year pattern that is more accurate than a harmonic function. E.g. during the June and July (around 185) there is generally a low level but also a high amount of peaks.

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