FFT on low sample count signal

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I have sampled data of a slowly variating signal, about 1.85e-4 Hz . However since the variation is so slow I only have about 1.5 periods of data sampled at a rate about 28 times higher, so every 188 seconds I take a sample of the signal for a total of 9600 seconds. I want to do a fft analysis on this data to find the most important spectral component.
This gives a good approximation of the data I have:
Fs = 0.0053; % Sampling frequency
T = 1/Fs; % Sampling period
L = 9800; % Length of signal
t=0:T:L; % Time Vector
freq=1/5400;
X = (0.06*sin(2*pi*freq*t)+15.3)+(0.08*(rand(size(t))-0.5));
figure;
plot(t,X)
title('Signal')
xlabel('t (seconds)')
ylabel('X(t)')
I tried an FFT on this, but could nog get any good results. The highest spectral component is in the same order of magnitute as the original signal, but not exactly what I hoped for. I'm only interested in the frequency of the component.
Y = fft(X);
f=linspace(0, fs/2, N/2);
figure;
plot(f,abs(Y(1:N/2)))
title('Single-Sided Amplitude Spectrum of X(t)')
xlabel('f (Hz)')
xlim([0 0.001]);
ylim([0 5]);
is there any way to improve without increasing the number of effective signal samples??

Accepted Answer

Star Strider
Star Strider on 8 Jan 2019
Without seeing your signal, it is not possible to suggest a specif approach. One option may be doiing a nonlinear regression on your signal, using the approach in Curve fitting to a sinusoidal function (link).
  4 Comments
Jona Gladines
Jona Gladines on 14 Jan 2019
Thanks,
This is indeed what I was looking for. I didn't think about resampling the data.
Jona
Star Strider
Star Strider on 14 Jan 2019
As always, my pleasure.
Resampling to uniform sampling intervals is necessary in order to get reliable results from the fft.

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