Suppose I have an array: adata=array([0.5, 1.,2.,3.,6.,10.])
and I want to calculate log likelihood of Weibull distribution of this array, given the parameters [5.,1.5]
and [5.1,1.6]
. I have never thought I need to write my own Weibull probability density functions for this task, as it is already provided in scipy.stat.distributions
. So, this ought to do it:
from scipy import stats
from numpy import *
adata=array([0.5, 1.,2.,3.,6.,10.])
def wb2LL(p, x): #log-likelihood of 2 parameter Weibull distribution
return sum(log(stats.weibull_min.pdf(x, p[1], 0., p[0])), axis=1)
And:
>>> wb2LL(array([[5.,1.5],[5.1,1.6]]).T[...,newaxis], adata)
array([-14.43743911, -14.68835298])
Or I reinvent the wheel and write a new Weibull pdf function, such as:
wbp=lambda p, x: p[1]/p[0]*((x/p[0])**(p[1]-1))*exp(-((x/p[0])**p[1]))
def wb2LL1(p, x): #log-likelihood of 2 paramter Weibull
return sum(log(wbp(p,x)), axis=1)
And:
>>> wb2LL1(array([[5.,1.5],[5.1,1.6]]).T[...,newaxis], adata)
array([-14.43743911, -14.68835298])
Admittedly, I always take it for granted that if something is already in scipy
, it should be very well optimized and re-inventing the wheel is seldom going to make it faster. But here comes the surprise: if I timeit
, 100000 calls of wb2LL1(array([[5.,1.5],[5.1,1.6]])[...,newaxis], adata)
takes 2.156s while 100000 calls of wb2LL(array([[5.,1.5],[5.1,1.6]])[...,newaxis], adata)
takes 5.219s, the build-in stats.weibull_min.pdf()
is more than twice slower.
Checking the source code python_path/sitepackage/scipy/stat/distributions.py
didn't provides an easy answer, at least for me. If anything, from it I would expect stats.weibull_min.pdf()
to be almost as fast as wbp()
.
Relevant source code: line 2999-3033:
class frechet_r_gen(rv_continuous):
"""A Frechet right (or Weibull minimum) continuous random variable.
%(before_notes)s
See Also
--------
weibull_min : The same distribution as `frechet_r`.
frechet_l, weibull_max
Notes
-----
The probability density function for `frechet_r` is::
frechet_r.pdf(x, c) = c * x**(c-1) * exp(-x**c)
for ``x > 0``, ``c > 0``.
%(example)s
"""
def _pdf(self, x, c):
return c*pow(x,c-1)*exp(-pow(x,c))
def _logpdf(self, x, c):
return log(c) + (c-1)*log(x) - pow(x,c)
def _cdf(self, x, c):
return -expm1(-pow(x,c))
def _ppf(self, q, c):
return pow(-log1p(-q),1.0/c)
def _munp(self, n, c):
return special.gamma(1.0+n*1.0/c)
def _entropy(self, c):
return -_EULER / c - log(c) + _EULER + 1
frechet_r = frechet_r_gen(a=0.0, name='frechet_r', shapes='c')
weibull_min = frechet_r_gen(a=0.0, name='weibull_min', shapes='c')
So, the question is: is stats.weibull_min.pdf()
really slower? If so, how come?
The
pdf()
method is defined inrv_continuous
class, which callsfrechet_r_gen._pdf()
. the code ofpdf()
is:So, it has many argument processing code, which make it slow.