For a school project I am trying to show that economies follow a relatively sinusoidal growth pattern. Beyond the economics of it, which are admittedly dodgy, I am building a python simulation to show that even when we let some degree of randomness take hold, we can still produce something relatively sinusoidal. I am happy with my data that I'm producing but now Id like to find some way to get a sine graph that pretty closely matches the data. I know you can do polynomial fit, but can you do sine fit?

Thanks for your help in advance. Let me know if there's any parts of the code you want to see.

  • Do you expect the sine wave to be constant throughout the data, or do you expect it to change over time? – brentlance May 23 '13 at 14:39

You can use the least-square optimization function in scipy to fit any arbitrary function to another. In case of fitting a sin function, the 3 parameters to fit are the offset ('a'), amplitude ('b') and the phase ('c').

As long as you provide a reasonable first guess of the parameters, the optimization should converge well.Fortunately for a sine function, first estimates of 2 of these are easy: the offset can be estimated by taking the mean of the data and the amplitude via the RMS (3*standard deviation/sqrt(2)).

Note: as a later edit, frequency fitting has also been added. This does not work very well (can lead to extremely poor fits). Thus, use at your discretion, my advise would be to not use frequency fitting unless frequency error is smaller than a few percent.

This leads to the following code:

import numpy as np
from scipy.optimize import leastsq
import pylab as plt

N = 1000 # number of data points
t = np.linspace(0, 4*np.pi, N)
f = 1.15247 # Optional!! Advised not to use
data = 3.0*np.sin(f*t+0.001) + 0.5 + np.random.randn(N) # create artificial data with noise

guess_mean = np.mean(data)
guess_std = 3*np.std(data)/(2**0.5)/(2**0.5)
guess_phase = 0
guess_freq = 1
guess_amp = 1

# we'll use this to plot our first estimate. This might already be good enough for you
data_first_guess = guess_std*np.sin(t+guess_phase) + guess_mean

# Define the function to optimize, in this case, we want to minimize the difference
# between the actual data and our "guessed" parameters
optimize_func = lambda x: x[0]*np.sin(x[1]*t+x[2]) + x[3] - data
est_amp, est_freq, est_phase, est_mean = leastsq(optimize_func, [guess_amp, guess_freq, guess_phase, guess_mean])[0]

# recreate the fitted curve using the optimized parameters
data_fit = est_amp*np.sin(est_freq*t+est_phase) + est_mean

# recreate the fitted curve using the optimized parameters

fine_t = np.arange(0,max(t),0.1)

plt.plot(t, data, '.')
plt.plot(t, data_first_guess, label='first guess')
plt.plot(fine_t, data_fit, label='after fitting')

enter image description here

Edit: I assumed that you know the number of periods in the sine-wave. If you don't, it's somewhat trickier to fit. You can try and guess the number of periods by manual plotting and try and optimize it as your 6th parameter.

  • 3
    This solution, though accepted by OP, seems to skip over the trickiest part: the frequency f as in y = Amplitude*sin(frequency*x +Phase) + Offset. How well does this method work if f is unknown? – chux Nov 2 '13 at 18:28
  • @chux Indeed, its trickier to evaluate frequency, but not impossible: The biggest peak in the DFT spectrum should provide you with the frequency. I will update the answer to reflect this when I have some time. – Dhara Nov 20 '13 at 9:35
  • 1
    I am curious if one would see any peak in the DFT spectrum for just one or two oscillations. Maybe via peak finding or estimating the number of local maxima and dividing by the length of the dataset might provide a first estimate. – Alexander Feb 28 '14 at 23:24
  • 2
    I think the order of initial parameter values you provide the function is wrong. What about est_a, est_b, est_c = leastsq(optimize_func, [guess_b, guess_a, guess_c])[0]? For clarity, I would suggest replacing _a with _offset, _b with _amp, and _c with _phase everywhere and use increasing order of x[i] in your lambda. – chadwick.boulay Jul 25 '14 at 17:28
  • 2
    what a great answer and thanks for the work - I literally cut and pasted this into something I was doing and it totally did the trick. Thanks! – Pete P Feb 1 '16 at 22:35

Here is a parameter-free fitting function fit_sin() that does not require manual guess of frequency:

import numpy, scipy.optimize

def fit_sin(tt, yy):
    '''Fit sin to the input time sequence, and return fitting parameters "amp", "omega", "phase", "offset", "freq", "period" and "fitfunc"'''
    tt = numpy.array(tt)
    yy = numpy.array(yy)
    ff = numpy.fft.fftfreq(len(tt), (tt[1]-tt[0]))   # assume uniform spacing
    Fyy = abs(numpy.fft.fft(yy))
    guess_freq = abs(ff[numpy.argmax(Fyy[1:])+1])   # excluding the zero frequency "peak", which is related to offset
    guess_amp = numpy.std(yy) * 2.**0.5
    guess_offset = numpy.mean(yy)
    guess = numpy.array([guess_amp, 2.*numpy.pi*guess_freq, 0., guess_offset])

    def sinfunc(t, A, w, p, c):  return A * numpy.sin(w*t + p) + c
    popt, pcov = scipy.optimize.curve_fit(sinfunc, tt, yy, p0=guess)
    A, w, p, c = popt
    f = w/(2.*numpy.pi)
    fitfunc = lambda t: A * numpy.sin(w*t + p) + c
    return {"amp": A, "omega": w, "phase": p, "offset": c, "freq": f, "period": 1./f, "fitfunc": fitfunc, "maxcov": numpy.max(pcov), "rawres": (guess,popt,pcov)}

The initial frequency guess is given by the peak frequency in the frequency domain using FFT. The fitting result is almost perfect assuming there is only one dominant frequency (other than the zero frequency peak).

import pylab as plt

N, amp, omega, phase, offset, noise = 500, 1., 2., .5, 4., 3
#N, amp, omega, phase, offset, noise = 50, 1., .4, .5, 4., .2
#N, amp, omega, phase, offset, noise = 200, 1., 20, .5, 4., 1
tt = numpy.linspace(0, 10, N)
tt2 = numpy.linspace(0, 10, 10*N)
yy = amp*numpy.sin(omega*tt + phase) + offset
yynoise = yy + noise*(numpy.random.random(len(tt))-0.5)

res = fit_sin(tt, yynoise)
print( "Amplitude=%(amp)s, Angular freq.=%(omega)s, phase=%(phase)s, offset=%(offset)s, Max. Cov.=%(maxcov)s" % res )

plt.plot(tt, yy, "-k", label="y", linewidth=2)
plt.plot(tt, yynoise, "ok", label="y with noise")
plt.plot(tt2, res["fitfunc"](tt2), "r-", label="y fit curve", linewidth=2)

The result is good even with high noise:

Amplitude=1.00660540618, Angular freq.=2.03370472482, phase=0.360276844224, offset=3.95747467506, Max. Cov.=0.0122923578658

With noise Low frequency High frequency

  • 3
    Very nice combination of FFT and curve fit - this answer should be upvoted. Some small optimizations that could be done here: use rfft for real valued signals, extract phase from FFT using np.angle() to use in the guess array and use cosines instead of sines as they are naturally derived from FFT coeffs. @hwlau's code works as is, but I believe the curve fitting would be performed faster with the suggested improvements added. – mac13k May 30 '17 at 10:39
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    Dear unsym I tried to run your code but unfortunately I receive the following message: TypeError: 'numpy.float64' object cannot be interpreted as an integer When I try to plot the function. Do you have any idea to solve this? – Victor Aguiar Sep 27 '18 at 21:08

More userfriendly to us is the function curvefit. Here an example:

import numpy as np
from scipy.optimize import curve_fit
import pylab as plt

N = 1000 # number of data points
t = np.linspace(0, 4*np.pi, N)
data = 3.0*np.sin(t+0.001) + 0.5 + np.random.randn(N) # create artificial data with noise

guess_freq = 1
guess_amplitude = 3*np.std(data)/(2**0.5)
guess_phase = 0
guess_offset = np.mean(data)

p0=[guess_freq, guess_amplitude,
    guess_phase, guess_offset]

# create the function we want to fit
def my_sin(x, freq, amplitude, phase, offset):
    return np.sin(x * freq + phase) * amplitude + offset

# now do the fit
fit = curve_fit(my_sin, t, data, p0=p0)

# we'll use this to plot our first estimate. This might already be good enough for you
data_first_guess = my_sin(t, *p0)

# recreate the fitted curve using the optimized parameters
data_fit = my_sin(t, *fit[0])

plt.plot(data, '.')
plt.plot(data_fit, label='after fitting')
plt.plot(data_first_guess, label='first guess')
  • 1
    You should use the same names for "guess_XXXX" parameters inside and outside "p0" – Irene Mar 18 '15 at 16:15
  • I assume the function my_curve should actually be my_sin? – three_pineapples Jun 22 '15 at 23:41
  • Because the my_sin function is not well-behaved, the curve_fit function seems to require the initial guess to be pretty close to the final answer. There are other nonlinear solvers that might be able to do a better job--especially one that takes the function and its derivative (since the derivative function is closed form and simple to calculate). – IceArdor Oct 21 '17 at 8:26
  • @IceArdor: Can you add a working code example of the solvers you propose? – Vasco Oct 23 '17 at 12:12

The current methods to fit a sin curve to a given data set require a first guess of the parameters, followed by an interative process. This is a non-linear regression problem.

A different method consists in transforming the non-linear regression to a linear regression thanks to a convenient integral equation. Then, there is no need for initial guess and no need for iterative process : the fitting is directly obtained.

In case of the function y = a + r*sin(w*x+phi) or y=a+b*sin(w*x)+c*cos(w*x), see pages 35-36 of the paper "Régression sinusoidale" published on Scribd

In case of the function y = a + p*x + r*sin(w*x+phi) : pages 49-51 of the chapter "Mixed linear and sinusoidal regressions".

In case of more complicated functions, the general process is explained in the chapter "Generalized sinusoidal regression" pages 54-61, followed by a numerical example y = r*sin(w*x+phi)+(b/x)+c*ln(x), pages 62-63

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