Fractal dimension from power density spectrum using FFT

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Benoît Valley on 18 Dec 2013

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https://www.mathworks.com/matlabcentral/answers/110151-fractal-dimension-from-power-density-spectrum-using-fft

Answered: Stef van Haaren on 6 Nov 2018

I believe I am doing something wrong when computating of the power density spectrum using fft. See details of my problem below. Any hints welcomed. Thanks.

I need to compute the fractal dimension of a series. I want to use the slope of the power density spectrum to derive it. The slope of the spectrum on a log-log plot, -b, and the the fractal dimension, D, are related by D=(5-b)/2. I am computing the power density spectrum using FFT.

I am testing the approach on a serie of known fractal dimension D=1.1 (see attached csv file for the actual serie, and plot below)

I am computing the power spectrum as following:

x=myserieabsissavalue;
X=myseriesvalues;
figure; plot(x,X); % display the series
l=length(x);
xmax=max(x);
Fs=(l-1)/xmax; % sampling frequency
T=1/Fs; % sampling time interval
nfft=2^nextpow2(l);
Y = fft(X,nfft)/l;
f = Fs/2*linspace(0,1,nfft/2+1);
flo=log10(f); % log10 of the frequency
plo=log10((2*abs(Y(1:nfft/2+1))).^2)'; % log10 of the power. ^2 is there to convert from amplitude spectrum to power spectrum
ix=find(flo>=min(flo(2:end)) & flo<=min(flo(2:end))+(max(flo(2:end))-min(flo(2:end)))*0.83); % fit only a section of the spectra
fio = fit(flo(ix)',plo(ix)','poly1');
bfft = -fio.p1; % slope of the power density spectrum on log-log plot
Dfft=(5-bfft)/2; % estimated fractal dimension

I obtaining a slope of the spectrum of about -2 (b=2) and thus overestimate the fractal dimension (1.5 instead of 1.1). I will get a slope of the spectrum of about 2 for any series with fractal dimension <1.5.

I suspect I am doing something wrong when computing the power density spectrum. Any hints are welcomed.