I am trying to get a correct way of fitting a beta distribution. It's not a real world problem i am just testing the effects of a few different methods, and in doing this something is puzzling me.
Here is the python code I am working on, in which I tested 3 different approaches:
1>: fit using moments (sample mean and variance).
2>: fit by minimizing the negative log-likelihood (by using scipy.optimize.fmin()).
3>: simply call scipy.stats.beta.fit()
from scipy.optimize import fmin
from scipy.stats import beta
from scipy.special import gamma as gammaf
import matplotlib.pyplot as plt
import numpy
def betaNLL(param,*args):
'''Negative log likelihood function for beta
<param>: list for parameters to be fitted.
<args>: 1-element array containing the sample data.
Return <nll>: negative log-likelihood to be minimized.
'''
a,b=param
data=args[0]
pdf=beta.pdf(data,a,b,loc=0,scale=1)
lg=numpy.log(pdf)
#-----Replace -inf with 0s------
lg=numpy.where(lg==-numpy.inf,0,lg)
nll=-1*numpy.sum(lg)
return nll
#-------------------Sample data-------------------
data=beta.rvs(5,2,loc=0,scale=1,size=500)
#----------------Normalize to [0,1]----------------
#data=(data-numpy.min(data))/(numpy.max(data)-numpy.min(data))
#----------------Fit using moments----------------
mean=numpy.mean(data)
var=numpy.var(data,ddof=1)
alpha1=mean**2*(1-mean)/var-mean
beta1=alpha1*(1-mean)/mean
#------------------Fit using mle------------------
result=fmin(betaNLL,[1,1],args=(data,))
alpha2,beta2=result
#----------------Fit using beta.fit----------------
alpha3,beta3,xx,yy=beta.fit(data)
print '
# alpha,beta from moments:',alpha1,beta1
print '# alpha,beta from mle:',alpha2,beta2
print '# alpha,beta from beta.fit:',alpha3,beta3
#-----------------------Plot-----------------------
plt.hist(data,bins=30,normed=True)
fitted=lambda x,a,b:gammaf(a+b)/gammaf(a)/gammaf(b)*x**(a-1)*(1-x)**(b-1) #pdf of beta
xx=numpy.linspace(0,max(data),len(data))
plt.plot(xx,fitted(xx,alpha1,beta1),'g')
plt.plot(xx,fitted(xx,alpha2,beta2),'b')
plt.plot(xx,fitted(xx,alpha3,beta3),'r')
plt.show()
The problem I have is about the normalization process (z=(x-a)/(b-a)) where a and b are the min and max of the sample, respectively.
When I don't do the normalization, everything works Ok, there are slight differences among different fitting methods, by reasonably good.
But when I did the normalization, here is the result plot I got.
Only the moment method (green line) looks Ok.
The scipy.stats.beta.fit() method (red line) is uniform always, no matter what parameters I use to generate the random numbers.
And the MLE (blue line) fails.
So it seems like the normalization is creating these issues. But I think it is legal to have x=0 and x=1 in the beta distribution. And if given a real world problem, isn't it the 1st step to normalize the sample observations to make it in between [0,1] ? In that case, how should I fit the curve?
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