# Why does scipy.optimize.curve_fit produce parameters which are barely different from the guess?

I've been trying to fit some histogram data with scipy.optimize.curve_fit, but so far I haven't once been able to produce fit parameters that differ significantly from my guess parameters.

I wouldn't be terribly surprised to find that the more arcane parameters in my fit get stuck in local minima, but even linear coefficients won't move from my initial guesses!

If you've seen anything like this before, I'd love some advice. Do least-squared minimization routines just not work for certain classes of functions?

I try this,

``````import numpy as np
from matplotlib.pyplot import *
from scipy.optimize import curve_fit

def grating_hist(x,frac,xmax,x0):
#  model data to be turned into a histogram
dx = x[1]-x[0]
z = np.linspace(0,1,20000,endpoint=True)
grating = np.cos(frac*np.pi*z)
norm_grating = xmax*(grating-grating[-1])/(1-grating[-1])+x0
# produce the histogram
bin_edges = np.append(x,x[-1]+x[1]-x[0])
hist,bin_edges = np.histogram(norm_grating,bins=bin_edges)
return hist

x = np.linspace(0,5,512)
p_data = [0.7,1.1,0.8]
pct = grating_hist(x,*p_data)
p_guess = [1,1,1]
p_fit,pcov = curve_fit(grating_hist,x,pct,p0=p_guess)

plot(x,pct,label='Data')
plot(x,grating_hist(x,*p_fit),label='Fit')
legend()

show()

print 'Data Parameters:', p_data
print 'Guess Parameters:', p_guess
print 'Fit Parameters:', p_fit
print 'Covariance:',pcov
``````

and I see this: http://i.stack.imgur.com/GwXzJ.png (I'm new here, so I can't post images)

``````Data Parameters: [0.7, 1.1, 0.8]
Guess Parameters: [1, 1, 1]
Fit Parameters: [ 0.97600854  0.99458336  1.00366634]
Covariance: [[  3.50047574e-06  -5.34574971e-07   2.99306123e-07]
[ -5.34574971e-07   9.78688795e-07  -6.94780671e-07]
[  2.99306123e-07  -6.94780671e-07   7.17068753e-07]]
``````

Whaaa? I'm pretty sure this isn't a local minimum for variations in xmax and x0, and it's a long way from the global minimum best fit. The fit parameters still don't change, even with better guesses. Different choices for curve functions (e.g. the sum of two normal distributions) do produce new parameters for the same data, so I know it's not the data itself. I also tried the same thing with scipy.optimize.leastsq itself just in case, but no dice; the parameters still don't move. If you have any thoughts on this, I'd love to hear them!

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I would try docs.scipy.org/doc/scipy/reference/generated/scipy.optimize.basinhopping.html –  user333700 Jun 29 '13 at 1:59

I think it is a local minimum, or the algorith fails for a non trivial reason. It is far easier to fit the data to the input, instead of fitting the statistical description of the data to the statistical description of the input.

Here's a modified version of the code doing so:

``````z = np.linspace(0,1,20000,endpoint=True)

def grating_hist_indicator(x,frac,xmax,x0):
#  model data to be turned into a histogram
dx = x[1]-x[0]
grating = np.cos(frac*np.pi*z)
norm_grating = xmax*(grating-grating[-1])/(1-grating[-1])+x0
return norm_grating

x = np.linspace(0,5,512)
p_data = [0.7,1.1,0.8]
pct = grating_hist(x,*p_data)

pct_indicator = grating_hist_indicator(x,*p_data)
p_guess = [1,1,1]
p_fit,pcov = curve_fit(grating_hist_indicator,x,pct_indicator,p0=p_guess)

plot(x,pct,label='Data')
plot(x,grating_hist(x,*p_fit),label='Fit')
legend()
show()
``````
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Of course you're right--I'm fitting the statistical description of the data because it's much slimmer and the data itself is a 3D surface locked up on arcane 1998 software with no sensible export format. –  user2530274 Jun 28 '13 at 15:50
You mean that you have no access to the data itself and the only output you have is the statistical description, i.e. what your function `grating_hist` returns? –  flebool Jul 1 '13 at 17:25