# Fitting empirical distribution to theoretical ones with Scipy (Python)?

INTRODUCTION: I have a list of more than 30,000 integer values ranging from 0 to 47, inclusive, e.g.`[0,0,0,0,..,1,1,1,1,...,2,2,2,2,...,47,47,47,...]` sampled from some continuous distribution. The values in the list are not necessarily in order, but order doesn't matter for this problem.

PROBLEM: Based on my distribution I would like to calculate p-value (the probability of seeing greater values) for any given value. For example, as you can see p-value for 0 would be approaching 1 and p-value for higher numbers would be tending to 0.

I don't know if I am right, but to determine probabilities I think I need to fit my data to a theoretical distribution that is the most suitable to describe my data. I assume that some kind of goodness of fit test is needed to determine the best model.

Is there a way to implement such an analysis in Python (`Scipy` or `Numpy`)? Could you present any examples?

Thank you!

# Distribution Fitting with Sum of Square Error (SSE)

This is an update and modification to Saullo's answer, that uses the full list of the current `scipy.stats` distributions and returns the distribution with the least SSE between the distribution's histogram and the data's histogram.

## Example Fitting

Using the El Niño dataset from `statsmodels`, the distributions are fit and error is determined. The distribution with the least error is returned.

### Example Code

``````%matplotlib inline

import warnings
import numpy as np
import pandas as pd
import scipy.stats as st
import statsmodels as sm
import matplotlib
import matplotlib.pyplot as plt

matplotlib.rcParams['figure.figsize'] = (16.0, 12.0)
matplotlib.style.use('ggplot')

# Create models from data
def best_fit_distribution(data, bins=200, ax=None):
"""Model data by finding best fit distribution to data"""
# Get histogram of original data
y, x = np.histogram(data, bins=bins, density=True)
x = (x + np.roll(x, -1))[:-1] / 2.0

# Distributions to check
DISTRIBUTIONS = [
st.dgamma,st.dweibull,st.erlang,st.expon,st.exponnorm,st.exponweib,st.exponpow,st.f,st.fatiguelife,st.fisk,
st.foldcauchy,st.foldnorm,st.frechet_r,st.frechet_l,st.genlogistic,st.genpareto,st.gennorm,st.genexpon,
st.genextreme,st.gausshyper,st.gamma,st.gengamma,st.genhalflogistic,st.gilbrat,st.gompertz,st.gumbel_r,
st.gumbel_l,st.halfcauchy,st.halflogistic,st.halfnorm,st.halfgennorm,st.hypsecant,st.invgamma,st.invgauss,
st.invweibull,st.johnsonsb,st.johnsonsu,st.ksone,st.kstwobign,st.laplace,st.levy,st.levy_l,st.levy_stable,
st.logistic,st.loggamma,st.loglaplace,st.lognorm,st.lomax,st.maxwell,st.mielke,st.nakagami,st.ncx2,st.ncf,
st.nct,st.norm,st.pareto,st.pearson3,st.powerlaw,st.powerlognorm,st.powernorm,st.rdist,st.reciprocal,
st.rayleigh,st.rice,st.recipinvgauss,st.semicircular,st.t,st.triang,st.truncexpon,st.truncnorm,st.tukeylambda,
st.uniform,st.vonmises,st.vonmises_line,st.wald,st.weibull_min,st.weibull_max,st.wrapcauchy
]

# Best holders
best_distribution = st.norm
best_params = (0.0, 1.0)
best_sse = np.inf

# Estimate distribution parameters from data
for distribution in DISTRIBUTIONS:

# Try to fit the distribution
try:
# Ignore warnings from data that can't be fit
with warnings.catch_warnings():
warnings.filterwarnings('ignore')

# fit dist to data
params = distribution.fit(data)

# Separate parts of parameters
arg = params[:-2]
loc = params[-2]
scale = params[-1]

# Calculate fitted PDF and error with fit in distribution
pdf = distribution.pdf(x, loc=loc, scale=scale, *arg)
sse = np.sum(np.power(y - pdf, 2.0))

# if axis pass in add to plot
try:
if ax:
pd.Series(pdf, x).plot(ax=ax)
end
except Exception:
pass

# identify if this distribution is better
if best_sse > sse > 0:
best_distribution = distribution
best_params = params
best_sse = sse

except Exception:
pass

return (best_distribution.name, best_params)

def make_pdf(dist, params, size=10000):
"""Generate distributions's Probability Distribution Function """

# Separate parts of parameters
arg = params[:-2]
loc = params[-2]
scale = params[-1]

# Get sane start and end points of distribution
start = dist.ppf(0.01, *arg, loc=loc, scale=scale) if arg else dist.ppf(0.01, loc=loc, scale=scale)
end = dist.ppf(0.99, *arg, loc=loc, scale=scale) if arg else dist.ppf(0.99, loc=loc, scale=scale)

# Build PDF and turn into pandas Series
x = np.linspace(start, end, size)
y = dist.pdf(x, loc=loc, scale=scale, *arg)
pdf = pd.Series(y, x)

return pdf

# Load data from statsmodels datasets

# Plot for comparison
plt.figure(figsize=(12,8))
ax = data.plot(kind='hist', bins=50, normed=True, alpha=0.5, color=plt.rcParams['axes.color_cycle'][1])
# Save plot limits
dataYLim = ax.get_ylim()

# Find best fit distribution
best_fit_name, best_fit_params = best_fit_distribution(data, 200, ax)
best_dist = getattr(st, best_fit_name)

# Update plots
ax.set_ylim(dataYLim)
ax.set_title(u'El Niño sea temp.\n All Fitted Distributions')
ax.set_xlabel(u'Temp (°C)')
ax.set_ylabel('Frequency')

# Make PDF with best params
pdf = make_pdf(best_dist, best_fit_params)

# Display
plt.figure(figsize=(12,8))
ax = pdf.plot(lw=2, label='PDF', legend=True)
data.plot(kind='hist', bins=50, normed=True, alpha=0.5, label='Data', legend=True, ax=ax)

param_names = (best_dist.shapes + ', loc, scale').split(', ') if best_dist.shapes else ['loc', 'scale']
param_str = ', '.join(['{}={:0.2f}'.format(k,v) for k,v in zip(param_names, best_fit_params)])
dist_str = '{}({})'.format(best_fit_name, param_str)

ax.set_title(u'El Niño sea temp. with best fit distribution \n' + dist_str)
ax.set_xlabel(u'Temp. (°C)')
ax.set_ylabel('Frequency')
``````
• Awesome. Consider using `density=True` instead of `normed=True` in `np.histogram()`. ^^ – Peque Apr 28 '17 at 16:13
• @tmthydvnprt Maybe you could undo the changes in the `.plot()` methods to avoid future confusion. ^^ – Peque Jun 30 '17 at 8:45
• To get distribution names: `from scipy.stats._continuous_distns import _distn_names`. You can then use something like `getattr(scipy.stats, distname)` for each `distname` in _distn_names`. Useful because the distributions are updated with different SciPy versions. – Brad Solomon Aug 29 '17 at 19:49
• Can you please explain why this code checks for best fit of continuous distributions only, and cannot check for discrete or multivariate distributions. Thank you. – Adam Schroeder Mar 16 '18 at 20:56
• Very cool. I had to update the color parameter - `ax = data.plot(kind='hist', bins=50, normed=True, alpha=0.5, color=list(matplotlib.rcParams['axes.prop_cycle'])[1]['color'])` – basswaves May 10 '18 at 19:43

There are 82 implemented distribution functions in SciPy 0.12.0. You can test how some of them fit to your data using their `fit()` method. Check the code below for more details:

``````import matplotlib.pyplot as plt
import scipy
import scipy.stats
size = 30000
x = scipy.arange(size)
y = scipy.int_(scipy.round_(scipy.stats.vonmises.rvs(5,size=size)*47))
h = plt.hist(y, bins=range(48))

dist_names = ['gamma', 'beta', 'rayleigh', 'norm', 'pareto']

for dist_name in dist_names:
dist = getattr(scipy.stats, dist_name)
param = dist.fit(y)
pdf_fitted = dist.pdf(x, *param[:-2], loc=param[-2], scale=param[-1]) * size
plt.plot(pdf_fitted, label=dist_name)
plt.xlim(0,47)
plt.legend(loc='upper right')
plt.show()
``````

References:

- Fitting distributions, goodness of fit, p-value. Is it possible to do this with Scipy (Python)?

- Distribution fitting with Scipy

And here a list with the names of all distribution functions available in Scipy 0.12.0 (VI):

``````dist_names = [ 'alpha', 'anglit', 'arcsine', 'beta', 'betaprime', 'bradford', 'burr', 'cauchy', 'chi', 'chi2', 'cosine', 'dgamma', 'dweibull', 'erlang', 'expon', 'exponweib', 'exponpow', 'f', 'fatiguelife', 'fisk', 'foldcauchy', 'foldnorm', 'frechet_r', 'frechet_l', 'genlogistic', 'genpareto', 'genexpon', 'genextreme', 'gausshyper', 'gamma', 'gengamma', 'genhalflogistic', 'gilbrat', 'gompertz', 'gumbel_r', 'gumbel_l', 'halfcauchy', 'halflogistic', 'halfnorm', 'hypsecant', 'invgamma', 'invgauss', 'invweibull', 'johnsonsb', 'johnsonsu', 'ksone', 'kstwobign', 'laplace', 'logistic', 'loggamma', 'loglaplace', 'lognorm', 'lomax', 'maxwell', 'mielke', 'nakagami', 'ncx2', 'ncf', 'nct', 'norm', 'pareto', 'pearson3', 'powerlaw', 'powerlognorm', 'powernorm', 'rdist', 'reciprocal', 'rayleigh', 'rice', 'recipinvgauss', 'semicircular', 't', 'triang', 'truncexpon', 'truncnorm', 'tukeylambda', 'uniform', 'vonmises', 'wald', 'weibull_min', 'weibull_max', 'wrapcauchy']
``````
• What if `normed = True` in plotting the histogram? You wouldn't multiply `pdf_fitted` by the `size`, right? – aloha Mar 23 '15 at 21:00
• See this answer if you would like to see what all the distributions look like or for an idea of how to access all of them. – tmthydvnprt Jun 1 '16 at 12:54
• @SaulloCastro What does the 3 values in param represent, in the output of dist.fit – shaifali Gupta Aug 12 '17 at 16:40
• To get distribution names: `from scipy.stats._continuous_distns import _distn_names`. You can then use something like `getattr(scipy.stats, distname)` for each `distname` in _distn_names`. Useful because the distributions are updated with different SciPy versions. – Brad Solomon Aug 29 '17 at 19:49
• I would removed color='w' from the code otherwise the histogram is not displayed. – Eran May 9 '19 at 19:58

`fit()` method mentioned by @Saullo Castro provides maximum likelihood estimates (MLE). The best distribution for your data is the one give you the highest can be determined by several different ways: such as

1, the one that gives you the highest log likelihood.

2, the one that gives you the smallest AIC, BIC or BICc values (see wiki: http://en.wikipedia.org/wiki/Akaike_information_criterion, basically can be viewed as log likelihood adjusted for number of parameters, as distribution with more parameters are expected to fit better)

3, the one that maximize the Bayesian posterior probability. (see wiki: http://en.wikipedia.org/wiki/Posterior_probability)

Of course, if you already have a distribution that should describe you data (based on the theories in your particular field) and want to stick to that, you will skip the step of identifying the best fit distribution.

`scipy` does not come with a function to calculate log likelihood (although MLE method is provided), but hard code one is easy: see Is the build-in probability density functions of `scipy.stat.distributions` slower than a user provided one?

• How would I apply this method to a situation where the data has already been binned - that is is already a histogram rather than generating a histogram from the data? – Pete Mar 15 '17 at 15:45
• @pete, that would be a situation of interval-censored data, there are maximum likelihood method for it, but it is currently not implemented in `scipy` – CT Zhu Mar 16 '17 at 0:08
• Don't forget the Evidence – jtlz2 Apr 30 at 20:10

Try the `distfit` library.

pip install distfit

``````# Create 1000 random integers, value between [0-50]
X = np.random.randint(0, 50,1000)

# Retrieve P-value for y
y = [0,10,45,55,100]

# From the distfit library import the class distfit
from distfit import distfit

# Initialize.
# Set any properties here, such as alpha.
# The smoothing can be of use when working with integers. Otherwise your histogram
# may be jumping up-and-down, and getting the correct fit may be harder.
dist = distfit(alpha=0.05, smooth=10)

# Search for best theoretical fit on your empirical data
dist.fit_transform(X)

> [distfit] >fit..
> [distfit] >transform..
> [distfit] >[norm      ] [RSS: 0.0037894] [loc=23.535 scale=14.450]
> [distfit] >[expon     ] [RSS: 0.0055534] [loc=0.000 scale=23.535]
> [distfit] >[pareto    ] [RSS: 0.0056828] [loc=-384473077.778 scale=384473077.778]
> [distfit] >[dweibull  ] [RSS: 0.0038202] [loc=24.535 scale=13.936]
> [distfit] >[t         ] [RSS: 0.0037896] [loc=23.535 scale=14.450]
> [distfit] >[genextreme] [RSS: 0.0036185] [loc=18.890 scale=14.506]
> [distfit] >[gamma     ] [RSS: 0.0037600] [loc=-175.505 scale=1.044]
> [distfit] >[lognorm   ] [RSS: 0.0642364] [loc=-0.000 scale=1.802]
> [distfit] >[beta      ] [RSS: 0.0021885] [loc=-3.981 scale=52.981]
> [distfit] >[uniform   ] [RSS: 0.0012349] [loc=0.000 scale=49.000]

# Best fitted model
best_distr = dist.model
print(best_distr)

# Uniform shows best fit, with 95% CII (confidence intervals), and all other parameters
> {'distr': <scipy.stats._continuous_distns.uniform_gen at 0x16de3a53160>,
>  'params': (0.0, 49.0),
>  'name': 'uniform',
>  'loc': 0.0,
>  'scale': 49.0,
>  'arg': (),
>  'CII_min_alpha': 2.45,
>  'CII_max_alpha': 46.55}

# Ranking distributions
dist.summary

# Plot the summary of fitted distributions
dist.plot_summary()
``````

``````# Make prediction on new datapoints based on the fit
dist.predict(y)

dist.y_pred
# array(['down', 'none', 'none', 'up', 'up'], dtype='<U4')
dist.y_proba
array([0.02040816, 0.02040816, 0.02040816, 0.        , 0.        ])

# Or in one dataframe
dist.df

# The plot function will now also include the predictions of y
dist.plot()
``````

Note that in this case, all points will be significant because of the uniform distribution. You can filter with the dist.y_pred if required.

AFAICU, your distribution is discrete (and nothing but discrete). Therefore just counting the frequencies of different values and normalizing them should be enough for your purposes. So, an example to demonstrate this:

``````In []: values= [0, 0, 0, 0, 0, 1, 1, 1, 1, 2, 2, 2, 3, 3, 4]
In []: counts= asarray(bincount(values), dtype= float)
In []: cdf= counts.cumsum()/ counts.sum()
``````

Thus, probability of seeing values higher than `1` is simply (according to the complementary cumulative distribution function (ccdf):

``````In []: 1- cdf[1]
Out[]: 0.40000000000000002
``````

Please note that ccdf is closely related to survival function (sf), but it's also defined with discrete distributions, whereas sf is defined only for contiguous distributions.

It sounds like probability density estimation problem to me.

``````from scipy.stats import gaussian_kde
occurences = [0,0,0,0,..,1,1,1,1,...,2,2,2,2,...,47]
values = range(0,48)
kde = gaussian_kde(map(float, occurences))
p = kde(values)
p = p/sum(p)
print "P(x>=1) = %f" % sum(p[1:])
``````
• For future readers: this solution (or at least the idea) provides the simplest answer to the OPs questions ('what is the p-value') - it would be interesting to know how this compares to some of the more involved methods that fit a known distribution. – Greg Oct 10 '16 at 20:58
• Do Gaussian kernel regressions work for all distributions? – user7345804 Apr 1 '17 at 9:57
• @mikey As a general rule, no regressions work for all distributions. They're not bad though – TheEnvironmentalist Jul 22 '17 at 9:42

Forgive me if I don't understand your need but what about storing your data in a dictionary where keys would be the numbers between 0 and 47 and values the number of occurrences of their related keys in your original list?
Thus your likelihood p(x) will be the sum of all the values for keys greater than x divided by 30000.

• In this case the p(x) will be the same (equals 0) for any value greater than 47. I need a continuous probability distribution. – s_sherly Jul 8 '11 at 6:15
• @s_sherly - It would be probably a good thing if you could edit and clarify your question better, as indeed the "the probability of seeing greater values" - as you put it - IS zero for values that are above the highest value in the pool. – mac Jul 8 '11 at 7:00

While many of the above answers are completely valid, no one seems to answer your question completely, specifically the part:

I don't know if I am right, but to determine probabilities I think I need to fit my data to a theoretical distribution that is the most suitable to describe my data. I assume that some kind of goodness of fit test is needed to determine the best model.

## The parametric approach

This is the process you're describing of using some theoretical distribution and fitting the parameters to your data and there's some excellent answers how to do this.

## The non-parametric approach

However, it's also possible to use a non-parametric approach to your problem, which means you do not assume any underlying distribution at all.

By using the so-called Empirical distribution function which equals: Fn(x)= SUM( I[X<=x] ) / n. So the proportion of values below x.

As was pointed out in one of the above answers is that what you're interested in is the inverse CDF (cumulative distribution function), which is equal to 1-F(x)

It can be shown that the empirical distribution function will converge to whatever 'true' CDF that generated your data.

Furthermore, it is straightforward to construct a 1-alpha confidence interval by:

``````L(X) = max{Fn(x)-en, 0}
U(X) = min{Fn(x)+en, 0}
en = sqrt( (1/2n)*log(2/alpha)
``````

Then P( L(X) <= F(X) <= U(X) ) >= 1-alpha for all x.

I'm quite surprised that PierrOz answer has 0 votes, while it's a completely valid answer to the question using a non-parametric approach to estimating F(x).

Note that the issue you mention of P(X>=x)=0 for any x>47 is simply a personal preference that might lead you to chose the parametric approach above the non-parametric approach. Both approaches however are completely valid solutions to your problem.

For more details and proofs of the above statements I would recommend having a look at 'All of Statistics: A Concise Course in Statistical Inference by Larry A. Wasserman'. An excellent book on both parametric and non-parametric inference.

EDIT: Since you specifically asked for some python examples it can be done using numpy:

``````import numpy as np

def empirical_cdf(data, x):
return np.sum(x<=data)/len(data)

def p_value(data, x):
return 1-empirical_cdf(data, x)

# Generate some data for demonstration purposes
data = np.floor(np.random.uniform(low=0, high=48, size=30000))

print(empirical_cdf(data, 20))
print(p_value(data, 20)) # This is the value you're interested in
``````

With OpenTURNS, I would use the BIC criteria to select the best distribution that fits such data. This is because this criteria does not give too much advantage to the distributions which have more parameters. Indeed, if a distribution has more parameters, it is easier for the fitted distribution to be closer to the data. Moreover, the Kolmogorov-Smirnov may not make sense in this case, because a small error in the measured values will have a huge impact on the p-value.

To illustrate the process, I load the El-Nino data, which contains 732 monthly temperature measurements from 1950 to 2010:

``````import statsmodels.api as sm
dta['YEAR'] = dta.YEAR.astype(int).astype(str)
dta = dta.set_index('YEAR').T.unstack()
data = dta.values
``````

It is easy to get the 30 of built-in univariate factories of distributions with the `GetContinuousUniVariateFactories` static method. Once done, the `BestModelBIC` static method returns the best model and the corresponding BIC score.

``````sample = ot.Sample([[p] for p in data]) # data reshaping
tested_factories = ot.DistributionFactory.GetContinuousUniVariateFactories()
best_model, best_bic = ot.FittingTest.BestModelBIC(sample,
tested_factories)
print("Best=",best_model)
``````

which prints:

``````Best= Beta(alpha = 1.64258, beta = 2.4348, a = 18.936, b = 29.254)
``````

In order to graphically compare the fit to the histogram, I use the `drawPDF` methods of the best distribution.

``````import openturns.viewer as otv
graph = ot.HistogramFactory().build(sample).drawPDF()
bestPDF = best_model.drawPDF()
bestPDF.setColors(["blue"])