forked from 170010011/fr
3478 lines
118 KiB
Python
3478 lines
118 KiB
Python
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import math
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import warnings
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from collections import namedtuple
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import numpy as np
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from numpy import (isscalar, r_, log, around, unique, asarray,
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zeros, arange, sort, amin, amax, any, atleast_1d,
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sqrt, ceil, floor, array, compress,
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pi, exp, ravel, count_nonzero, sin, cos, arctan2, hypot)
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from scipy import optimize
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from scipy import special
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from . import statlib
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from . import stats
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from .stats import find_repeats, _contains_nan
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from .contingency import chi2_contingency
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from . import distributions
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from ._distn_infrastructure import rv_generic
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from ._hypotests import _get_wilcoxon_distr
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__all__ = ['mvsdist',
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'bayes_mvs', 'kstat', 'kstatvar', 'probplot', 'ppcc_max', 'ppcc_plot',
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'boxcox_llf', 'boxcox', 'boxcox_normmax', 'boxcox_normplot',
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'shapiro', 'anderson', 'ansari', 'bartlett', 'levene', 'binom_test',
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'fligner', 'mood', 'wilcoxon', 'median_test',
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'circmean', 'circvar', 'circstd', 'anderson_ksamp',
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'yeojohnson_llf', 'yeojohnson', 'yeojohnson_normmax',
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'yeojohnson_normplot'
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]
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Mean = namedtuple('Mean', ('statistic', 'minmax'))
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Variance = namedtuple('Variance', ('statistic', 'minmax'))
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Std_dev = namedtuple('Std_dev', ('statistic', 'minmax'))
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def bayes_mvs(data, alpha=0.90):
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r"""
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Bayesian confidence intervals for the mean, var, and std.
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Parameters
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----------
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data : array_like
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Input data, if multi-dimensional it is flattened to 1-D by `bayes_mvs`.
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Requires 2 or more data points.
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alpha : float, optional
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Probability that the returned confidence interval contains
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the true parameter.
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Returns
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-------
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mean_cntr, var_cntr, std_cntr : tuple
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The three results are for the mean, variance and standard deviation,
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respectively. Each result is a tuple of the form::
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(center, (lower, upper))
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with `center` the mean of the conditional pdf of the value given the
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data, and `(lower, upper)` a confidence interval, centered on the
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median, containing the estimate to a probability ``alpha``.
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See Also
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--------
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mvsdist
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Notes
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-----
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Each tuple of mean, variance, and standard deviation estimates represent
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the (center, (lower, upper)) with center the mean of the conditional pdf
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of the value given the data and (lower, upper) is a confidence interval
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centered on the median, containing the estimate to a probability
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``alpha``.
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Converts data to 1-D and assumes all data has the same mean and variance.
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Uses Jeffrey's prior for variance and std.
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Equivalent to ``tuple((x.mean(), x.interval(alpha)) for x in mvsdist(dat))``
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References
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----------
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T.E. Oliphant, "A Bayesian perspective on estimating mean, variance, and
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standard-deviation from data", https://scholarsarchive.byu.edu/facpub/278,
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2006.
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Examples
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--------
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First a basic example to demonstrate the outputs:
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>>> from scipy import stats
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>>> data = [6, 9, 12, 7, 8, 8, 13]
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>>> mean, var, std = stats.bayes_mvs(data)
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>>> mean
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Mean(statistic=9.0, minmax=(7.103650222612533, 10.896349777387467))
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>>> var
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Variance(statistic=10.0, minmax=(3.176724206..., 24.45910382...))
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>>> std
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Std_dev(statistic=2.9724954732045084, minmax=(1.7823367265645143, 4.945614605014631))
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Now we generate some normally distributed random data, and get estimates of
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mean and standard deviation with 95% confidence intervals for those
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estimates:
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>>> n_samples = 100000
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>>> data = stats.norm.rvs(size=n_samples)
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>>> res_mean, res_var, res_std = stats.bayes_mvs(data, alpha=0.95)
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>>> import matplotlib.pyplot as plt
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>>> fig = plt.figure()
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>>> ax = fig.add_subplot(111)
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>>> ax.hist(data, bins=100, density=True, label='Histogram of data')
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>>> ax.vlines(res_mean.statistic, 0, 0.5, colors='r', label='Estimated mean')
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>>> ax.axvspan(res_mean.minmax[0],res_mean.minmax[1], facecolor='r',
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... alpha=0.2, label=r'Estimated mean (95% limits)')
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>>> ax.vlines(res_std.statistic, 0, 0.5, colors='g', label='Estimated scale')
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>>> ax.axvspan(res_std.minmax[0],res_std.minmax[1], facecolor='g', alpha=0.2,
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... label=r'Estimated scale (95% limits)')
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>>> ax.legend(fontsize=10)
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>>> ax.set_xlim([-4, 4])
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>>> ax.set_ylim([0, 0.5])
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>>> plt.show()
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"""
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m, v, s = mvsdist(data)
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if alpha >= 1 or alpha <= 0:
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raise ValueError("0 < alpha < 1 is required, but alpha=%s was given."
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% alpha)
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m_res = Mean(m.mean(), m.interval(alpha))
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v_res = Variance(v.mean(), v.interval(alpha))
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s_res = Std_dev(s.mean(), s.interval(alpha))
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return m_res, v_res, s_res
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def mvsdist(data):
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"""
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'Frozen' distributions for mean, variance, and standard deviation of data.
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Parameters
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----------
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data : array_like
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Input array. Converted to 1-D using ravel.
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Requires 2 or more data-points.
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Returns
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-------
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mdist : "frozen" distribution object
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Distribution object representing the mean of the data.
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vdist : "frozen" distribution object
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Distribution object representing the variance of the data.
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sdist : "frozen" distribution object
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Distribution object representing the standard deviation of the data.
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See Also
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--------
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bayes_mvs
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Notes
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-----
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The return values from ``bayes_mvs(data)`` is equivalent to
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``tuple((x.mean(), x.interval(0.90)) for x in mvsdist(data))``.
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In other words, calling ``<dist>.mean()`` and ``<dist>.interval(0.90)``
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on the three distribution objects returned from this function will give
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the same results that are returned from `bayes_mvs`.
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References
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----------
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T.E. Oliphant, "A Bayesian perspective on estimating mean, variance, and
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standard-deviation from data", https://scholarsarchive.byu.edu/facpub/278,
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2006.
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Examples
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--------
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>>> from scipy import stats
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>>> data = [6, 9, 12, 7, 8, 8, 13]
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>>> mean, var, std = stats.mvsdist(data)
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We now have frozen distribution objects "mean", "var" and "std" that we can
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examine:
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>>> mean.mean()
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9.0
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>>> mean.interval(0.95)
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(6.6120585482655692, 11.387941451734431)
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>>> mean.std()
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1.1952286093343936
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"""
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x = ravel(data)
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n = len(x)
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if n < 2:
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raise ValueError("Need at least 2 data-points.")
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xbar = x.mean()
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C = x.var()
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if n > 1000: # gaussian approximations for large n
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mdist = distributions.norm(loc=xbar, scale=math.sqrt(C / n))
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sdist = distributions.norm(loc=math.sqrt(C), scale=math.sqrt(C / (2. * n)))
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vdist = distributions.norm(loc=C, scale=math.sqrt(2.0 / n) * C)
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else:
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nm1 = n - 1
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fac = n * C / 2.
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val = nm1 / 2.
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mdist = distributions.t(nm1, loc=xbar, scale=math.sqrt(C / nm1))
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sdist = distributions.gengamma(val, -2, scale=math.sqrt(fac))
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vdist = distributions.invgamma(val, scale=fac)
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return mdist, vdist, sdist
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def kstat(data, n=2):
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r"""
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Return the nth k-statistic (1<=n<=4 so far).
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The nth k-statistic k_n is the unique symmetric unbiased estimator of the
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nth cumulant kappa_n.
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Parameters
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----------
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data : array_like
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Input array. Note that n-D input gets flattened.
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n : int, {1, 2, 3, 4}, optional
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Default is equal to 2.
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Returns
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-------
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kstat : float
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The nth k-statistic.
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See Also
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--------
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kstatvar: Returns an unbiased estimator of the variance of the k-statistic.
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moment: Returns the n-th central moment about the mean for a sample.
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Notes
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-----
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For a sample size n, the first few k-statistics are given by:
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.. math::
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k_{1} = \mu
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k_{2} = \frac{n}{n-1} m_{2}
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k_{3} = \frac{ n^{2} } {(n-1) (n-2)} m_{3}
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k_{4} = \frac{ n^{2} [(n + 1)m_{4} - 3(n - 1) m^2_{2}]} {(n-1) (n-2) (n-3)}
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where :math:`\mu` is the sample mean, :math:`m_2` is the sample
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variance, and :math:`m_i` is the i-th sample central moment.
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References
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----------
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http://mathworld.wolfram.com/k-Statistic.html
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http://mathworld.wolfram.com/Cumulant.html
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Examples
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--------
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>>> from scipy import stats
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>>> rndm = np.random.RandomState(1234)
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As sample size increases, n-th moment and n-th k-statistic converge to the
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same number (although they aren't identical). In the case of the normal
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distribution, they converge to zero.
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>>> for n in [2, 3, 4, 5, 6, 7]:
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... x = rndm.normal(size=10**n)
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... m, k = stats.moment(x, 3), stats.kstat(x, 3)
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... print("%.3g %.3g %.3g" % (m, k, m-k))
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-0.631 -0.651 0.0194
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0.0282 0.0283 -8.49e-05
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-0.0454 -0.0454 1.36e-05
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7.53e-05 7.53e-05 -2.26e-09
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0.00166 0.00166 -4.99e-09
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-2.88e-06 -2.88e-06 8.63e-13
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"""
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if n > 4 or n < 1:
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raise ValueError("k-statistics only supported for 1<=n<=4")
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n = int(n)
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S = np.zeros(n + 1, np.float64)
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data = ravel(data)
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N = data.size
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# raise ValueError on empty input
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if N == 0:
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raise ValueError("Data input must not be empty")
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# on nan input, return nan without warning
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if np.isnan(np.sum(data)):
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return np.nan
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for k in range(1, n + 1):
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S[k] = np.sum(data**k, axis=0)
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if n == 1:
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return S[1] * 1.0/N
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elif n == 2:
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return (N*S[2] - S[1]**2.0) / (N*(N - 1.0))
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elif n == 3:
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return (2*S[1]**3 - 3*N*S[1]*S[2] + N*N*S[3]) / (N*(N - 1.0)*(N - 2.0))
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elif n == 4:
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return ((-6*S[1]**4 + 12*N*S[1]**2 * S[2] - 3*N*(N-1.0)*S[2]**2 -
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4*N*(N+1)*S[1]*S[3] + N*N*(N+1)*S[4]) /
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(N*(N-1.0)*(N-2.0)*(N-3.0)))
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else:
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raise ValueError("Should not be here.")
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def kstatvar(data, n=2):
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r"""
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Return an unbiased estimator of the variance of the k-statistic.
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See `kstat` for more details of the k-statistic.
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Parameters
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----------
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data : array_like
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Input array. Note that n-D input gets flattened.
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n : int, {1, 2}, optional
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Default is equal to 2.
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Returns
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-------
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kstatvar : float
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The nth k-statistic variance.
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See Also
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--------
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kstat: Returns the n-th k-statistic.
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moment: Returns the n-th central moment about the mean for a sample.
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Notes
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-----
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The variances of the first few k-statistics are given by:
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.. math::
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var(k_{1}) = \frac{\kappa^2}{n}
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var(k_{2}) = \frac{\kappa^4}{n} + \frac{2\kappa^2_{2}}{n - 1}
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var(k_{3}) = \frac{\kappa^6}{n} + \frac{9 \kappa_2 \kappa_4}{n - 1} +
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\frac{9 \kappa^2_{3}}{n - 1} +
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\frac{6 n \kappa^3_{2}}{(n-1) (n-2)}
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var(k_{4}) = \frac{\kappa^8}{n} + \frac{16 \kappa_2 \kappa_6}{n - 1} +
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\frac{48 \kappa_{3} \kappa_5}{n - 1} +
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\frac{34 \kappa^2_{4}}{n-1} + \frac{72 n \kappa^2_{2} \kappa_4}{(n - 1) (n - 2)} +
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\frac{144 n \kappa_{2} \kappa^2_{3}}{(n - 1) (n - 2)} +
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\frac{24 (n + 1) n \kappa^4_{2}}{(n - 1) (n - 2) (n - 3)}
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"""
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data = ravel(data)
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N = len(data)
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if n == 1:
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return kstat(data, n=2) * 1.0/N
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elif n == 2:
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k2 = kstat(data, n=2)
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k4 = kstat(data, n=4)
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return (2*N*k2**2 + (N-1)*k4) / (N*(N+1))
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else:
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raise ValueError("Only n=1 or n=2 supported.")
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def _calc_uniform_order_statistic_medians(n):
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"""
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Approximations of uniform order statistic medians.
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Parameters
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----------
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n : int
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Sample size.
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Returns
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-------
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v : 1d float array
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Approximations of the order statistic medians.
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References
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----------
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.. [1] James J. Filliben, "The Probability Plot Correlation Coefficient
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Test for Normality", Technometrics, Vol. 17, pp. 111-117, 1975.
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Examples
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--------
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Order statistics of the uniform distribution on the unit interval
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are marginally distributed according to beta distributions.
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The expectations of these order statistic are evenly spaced across
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the interval, but the distributions are skewed in a way that
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pushes the medians slightly towards the endpoints of the unit interval:
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>>> n = 4
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>>> k = np.arange(1, n+1)
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>>> from scipy.stats import beta
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>>> a = k
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>>> b = n-k+1
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>>> beta.mean(a, b)
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array([ 0.2, 0.4, 0.6, 0.8])
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>>> beta.median(a, b)
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array([ 0.15910358, 0.38572757, 0.61427243, 0.84089642])
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The Filliben approximation uses the exact medians of the smallest
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and greatest order statistics, and the remaining medians are approximated
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by points spread evenly across a sub-interval of the unit interval:
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>>> from scipy.morestats import _calc_uniform_order_statistic_medians
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>>> _calc_uniform_order_statistic_medians(n)
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array([ 0.15910358, 0.38545246, 0.61454754, 0.84089642])
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This plot shows the skewed distributions of the order statistics
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of a sample of size four from a uniform distribution on the unit interval:
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>>> import matplotlib.pyplot as plt
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>>> x = np.linspace(0.0, 1.0, num=50, endpoint=True)
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||
|
>>> pdfs = [beta.pdf(x, a[i], b[i]) for i in range(n)]
|
||
|
>>> plt.figure()
|
||
|
>>> plt.plot(x, pdfs[0], x, pdfs[1], x, pdfs[2], x, pdfs[3])
|
||
|
|
||
|
"""
|
||
|
v = np.empty(n, dtype=np.float64)
|
||
|
v[-1] = 0.5**(1.0 / n)
|
||
|
v[0] = 1 - v[-1]
|
||
|
i = np.arange(2, n)
|
||
|
v[1:-1] = (i - 0.3175) / (n + 0.365)
|
||
|
return v
|
||
|
|
||
|
|
||
|
def _parse_dist_kw(dist, enforce_subclass=True):
|
||
|
"""Parse `dist` keyword.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
dist : str or stats.distributions instance.
|
||
|
Several functions take `dist` as a keyword, hence this utility
|
||
|
function.
|
||
|
enforce_subclass : bool, optional
|
||
|
If True (default), `dist` needs to be a
|
||
|
`_distn_infrastructure.rv_generic` instance.
|
||
|
It can sometimes be useful to set this keyword to False, if a function
|
||
|
wants to accept objects that just look somewhat like such an instance
|
||
|
(for example, they have a ``ppf`` method).
|
||
|
|
||
|
"""
|
||
|
if isinstance(dist, rv_generic):
|
||
|
pass
|
||
|
elif isinstance(dist, str):
|
||
|
try:
|
||
|
dist = getattr(distributions, dist)
|
||
|
except AttributeError as e:
|
||
|
raise ValueError("%s is not a valid distribution name" % dist) from e
|
||
|
elif enforce_subclass:
|
||
|
msg = ("`dist` should be a stats.distributions instance or a string "
|
||
|
"with the name of such a distribution.")
|
||
|
raise ValueError(msg)
|
||
|
|
||
|
return dist
|
||
|
|
||
|
|
||
|
def _add_axis_labels_title(plot, xlabel, ylabel, title):
|
||
|
"""Helper function to add axes labels and a title to stats plots"""
|
||
|
try:
|
||
|
if hasattr(plot, 'set_title'):
|
||
|
# Matplotlib Axes instance or something that looks like it
|
||
|
plot.set_title(title)
|
||
|
plot.set_xlabel(xlabel)
|
||
|
plot.set_ylabel(ylabel)
|
||
|
else:
|
||
|
# matplotlib.pyplot module
|
||
|
plot.title(title)
|
||
|
plot.xlabel(xlabel)
|
||
|
plot.ylabel(ylabel)
|
||
|
except Exception:
|
||
|
# Not an MPL object or something that looks (enough) like it.
|
||
|
# Don't crash on adding labels or title
|
||
|
pass
|
||
|
|
||
|
|
||
|
def probplot(x, sparams=(), dist='norm', fit=True, plot=None, rvalue=False):
|
||
|
"""
|
||
|
Calculate quantiles for a probability plot, and optionally show the plot.
|
||
|
|
||
|
Generates a probability plot of sample data against the quantiles of a
|
||
|
specified theoretical distribution (the normal distribution by default).
|
||
|
`probplot` optionally calculates a best-fit line for the data and plots the
|
||
|
results using Matplotlib or a given plot function.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
x : array_like
|
||
|
Sample/response data from which `probplot` creates the plot.
|
||
|
sparams : tuple, optional
|
||
|
Distribution-specific shape parameters (shape parameters plus location
|
||
|
and scale).
|
||
|
dist : str or stats.distributions instance, optional
|
||
|
Distribution or distribution function name. The default is 'norm' for a
|
||
|
normal probability plot. Objects that look enough like a
|
||
|
stats.distributions instance (i.e. they have a ``ppf`` method) are also
|
||
|
accepted.
|
||
|
fit : bool, optional
|
||
|
Fit a least-squares regression (best-fit) line to the sample data if
|
||
|
True (default).
|
||
|
plot : object, optional
|
||
|
If given, plots the quantiles and least squares fit.
|
||
|
`plot` is an object that has to have methods "plot" and "text".
|
||
|
The `matplotlib.pyplot` module or a Matplotlib Axes object can be used,
|
||
|
or a custom object with the same methods.
|
||
|
Default is None, which means that no plot is created.
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
(osm, osr) : tuple of ndarrays
|
||
|
Tuple of theoretical quantiles (osm, or order statistic medians) and
|
||
|
ordered responses (osr). `osr` is simply sorted input `x`.
|
||
|
For details on how `osm` is calculated see the Notes section.
|
||
|
(slope, intercept, r) : tuple of floats, optional
|
||
|
Tuple containing the result of the least-squares fit, if that is
|
||
|
performed by `probplot`. `r` is the square root of the coefficient of
|
||
|
determination. If ``fit=False`` and ``plot=None``, this tuple is not
|
||
|
returned.
|
||
|
|
||
|
Notes
|
||
|
-----
|
||
|
Even if `plot` is given, the figure is not shown or saved by `probplot`;
|
||
|
``plt.show()`` or ``plt.savefig('figname.png')`` should be used after
|
||
|
calling `probplot`.
|
||
|
|
||
|
`probplot` generates a probability plot, which should not be confused with
|
||
|
a Q-Q or a P-P plot. Statsmodels has more extensive functionality of this
|
||
|
type, see ``statsmodels.api.ProbPlot``.
|
||
|
|
||
|
The formula used for the theoretical quantiles (horizontal axis of the
|
||
|
probability plot) is Filliben's estimate::
|
||
|
|
||
|
quantiles = dist.ppf(val), for
|
||
|
|
||
|
0.5**(1/n), for i = n
|
||
|
val = (i - 0.3175) / (n + 0.365), for i = 2, ..., n-1
|
||
|
1 - 0.5**(1/n), for i = 1
|
||
|
|
||
|
where ``i`` indicates the i-th ordered value and ``n`` is the total number
|
||
|
of values.
|
||
|
|
||
|
Examples
|
||
|
--------
|
||
|
>>> from scipy import stats
|
||
|
>>> import matplotlib.pyplot as plt
|
||
|
>>> nsample = 100
|
||
|
>>> np.random.seed(7654321)
|
||
|
|
||
|
A t distribution with small degrees of freedom:
|
||
|
|
||
|
>>> ax1 = plt.subplot(221)
|
||
|
>>> x = stats.t.rvs(3, size=nsample)
|
||
|
>>> res = stats.probplot(x, plot=plt)
|
||
|
|
||
|
A t distribution with larger degrees of freedom:
|
||
|
|
||
|
>>> ax2 = plt.subplot(222)
|
||
|
>>> x = stats.t.rvs(25, size=nsample)
|
||
|
>>> res = stats.probplot(x, plot=plt)
|
||
|
|
||
|
A mixture of two normal distributions with broadcasting:
|
||
|
|
||
|
>>> ax3 = plt.subplot(223)
|
||
|
>>> x = stats.norm.rvs(loc=[0,5], scale=[1,1.5],
|
||
|
... size=(nsample//2,2)).ravel()
|
||
|
>>> res = stats.probplot(x, plot=plt)
|
||
|
|
||
|
A standard normal distribution:
|
||
|
|
||
|
>>> ax4 = plt.subplot(224)
|
||
|
>>> x = stats.norm.rvs(loc=0, scale=1, size=nsample)
|
||
|
>>> res = stats.probplot(x, plot=plt)
|
||
|
|
||
|
Produce a new figure with a loggamma distribution, using the ``dist`` and
|
||
|
``sparams`` keywords:
|
||
|
|
||
|
>>> fig = plt.figure()
|
||
|
>>> ax = fig.add_subplot(111)
|
||
|
>>> x = stats.loggamma.rvs(c=2.5, size=500)
|
||
|
>>> res = stats.probplot(x, dist=stats.loggamma, sparams=(2.5,), plot=ax)
|
||
|
>>> ax.set_title("Probplot for loggamma dist with shape parameter 2.5")
|
||
|
|
||
|
Show the results with Matplotlib:
|
||
|
|
||
|
>>> plt.show()
|
||
|
|
||
|
"""
|
||
|
x = np.asarray(x)
|
||
|
_perform_fit = fit or (plot is not None)
|
||
|
if x.size == 0:
|
||
|
if _perform_fit:
|
||
|
return (x, x), (np.nan, np.nan, 0.0)
|
||
|
else:
|
||
|
return x, x
|
||
|
|
||
|
osm_uniform = _calc_uniform_order_statistic_medians(len(x))
|
||
|
dist = _parse_dist_kw(dist, enforce_subclass=False)
|
||
|
if sparams is None:
|
||
|
sparams = ()
|
||
|
if isscalar(sparams):
|
||
|
sparams = (sparams,)
|
||
|
if not isinstance(sparams, tuple):
|
||
|
sparams = tuple(sparams)
|
||
|
|
||
|
osm = dist.ppf(osm_uniform, *sparams)
|
||
|
osr = sort(x)
|
||
|
if _perform_fit:
|
||
|
# perform a linear least squares fit.
|
||
|
slope, intercept, r, prob, _ = stats.linregress(osm, osr)
|
||
|
|
||
|
if plot is not None:
|
||
|
plot.plot(osm, osr, 'bo', osm, slope*osm + intercept, 'r-')
|
||
|
_add_axis_labels_title(plot, xlabel='Theoretical quantiles',
|
||
|
ylabel='Ordered Values',
|
||
|
title='Probability Plot')
|
||
|
|
||
|
# Add R^2 value to the plot as text
|
||
|
if rvalue:
|
||
|
xmin = amin(osm)
|
||
|
xmax = amax(osm)
|
||
|
ymin = amin(x)
|
||
|
ymax = amax(x)
|
||
|
posx = xmin + 0.70 * (xmax - xmin)
|
||
|
posy = ymin + 0.01 * (ymax - ymin)
|
||
|
plot.text(posx, posy, "$R^2=%1.4f$" % r**2)
|
||
|
|
||
|
if fit:
|
||
|
return (osm, osr), (slope, intercept, r)
|
||
|
else:
|
||
|
return osm, osr
|
||
|
|
||
|
|
||
|
def ppcc_max(x, brack=(0.0, 1.0), dist='tukeylambda'):
|
||
|
"""
|
||
|
Calculate the shape parameter that maximizes the PPCC.
|
||
|
|
||
|
The probability plot correlation coefficient (PPCC) plot can be used to
|
||
|
determine the optimal shape parameter for a one-parameter family of
|
||
|
distributions. ppcc_max returns the shape parameter that would maximize the
|
||
|
probability plot correlation coefficient for the given data to a
|
||
|
one-parameter family of distributions.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
x : array_like
|
||
|
Input array.
|
||
|
brack : tuple, optional
|
||
|
Triple (a,b,c) where (a<b<c). If bracket consists of two numbers (a, c)
|
||
|
then they are assumed to be a starting interval for a downhill bracket
|
||
|
search (see `scipy.optimize.brent`).
|
||
|
dist : str or stats.distributions instance, optional
|
||
|
Distribution or distribution function name. Objects that look enough
|
||
|
like a stats.distributions instance (i.e. they have a ``ppf`` method)
|
||
|
are also accepted. The default is ``'tukeylambda'``.
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
shape_value : float
|
||
|
The shape parameter at which the probability plot correlation
|
||
|
coefficient reaches its max value.
|
||
|
|
||
|
See Also
|
||
|
--------
|
||
|
ppcc_plot, probplot, boxcox
|
||
|
|
||
|
Notes
|
||
|
-----
|
||
|
The brack keyword serves as a starting point which is useful in corner
|
||
|
cases. One can use a plot to obtain a rough visual estimate of the location
|
||
|
for the maximum to start the search near it.
|
||
|
|
||
|
References
|
||
|
----------
|
||
|
.. [1] J.J. Filliben, "The Probability Plot Correlation Coefficient Test for
|
||
|
Normality", Technometrics, Vol. 17, pp. 111-117, 1975.
|
||
|
|
||
|
.. [2] https://www.itl.nist.gov/div898/handbook/eda/section3/ppccplot.htm
|
||
|
|
||
|
Examples
|
||
|
--------
|
||
|
First we generate some random data from a Tukey-Lambda distribution,
|
||
|
with shape parameter -0.7:
|
||
|
|
||
|
>>> from scipy import stats
|
||
|
>>> x = stats.tukeylambda.rvs(-0.7, loc=2, scale=0.5, size=10000,
|
||
|
... random_state=1234567) + 1e4
|
||
|
|
||
|
Now we explore this data with a PPCC plot as well as the related
|
||
|
probability plot and Box-Cox normplot. A red line is drawn where we
|
||
|
expect the PPCC value to be maximal (at the shape parameter -0.7 used
|
||
|
above):
|
||
|
|
||
|
>>> import matplotlib.pyplot as plt
|
||
|
>>> fig = plt.figure(figsize=(8, 6))
|
||
|
>>> ax = fig.add_subplot(111)
|
||
|
>>> res = stats.ppcc_plot(x, -5, 5, plot=ax)
|
||
|
|
||
|
We calculate the value where the shape should reach its maximum and a red
|
||
|
line is drawn there. The line should coincide with the highest point in the
|
||
|
ppcc_plot.
|
||
|
|
||
|
>>> max = stats.ppcc_max(x)
|
||
|
>>> ax.vlines(max, 0, 1, colors='r', label='Expected shape value')
|
||
|
|
||
|
>>> plt.show()
|
||
|
|
||
|
"""
|
||
|
dist = _parse_dist_kw(dist)
|
||
|
osm_uniform = _calc_uniform_order_statistic_medians(len(x))
|
||
|
osr = sort(x)
|
||
|
|
||
|
# this function computes the x-axis values of the probability plot
|
||
|
# and computes a linear regression (including the correlation)
|
||
|
# and returns 1-r so that a minimization function maximizes the
|
||
|
# correlation
|
||
|
def tempfunc(shape, mi, yvals, func):
|
||
|
xvals = func(mi, shape)
|
||
|
r, prob = stats.pearsonr(xvals, yvals)
|
||
|
return 1 - r
|
||
|
|
||
|
return optimize.brent(tempfunc, brack=brack, args=(osm_uniform, osr, dist.ppf))
|
||
|
|
||
|
|
||
|
def ppcc_plot(x, a, b, dist='tukeylambda', plot=None, N=80):
|
||
|
"""
|
||
|
Calculate and optionally plot probability plot correlation coefficient.
|
||
|
|
||
|
The probability plot correlation coefficient (PPCC) plot can be used to
|
||
|
determine the optimal shape parameter for a one-parameter family of
|
||
|
distributions. It cannot be used for distributions without shape parameters
|
||
|
(like the normal distribution) or with multiple shape parameters.
|
||
|
|
||
|
By default a Tukey-Lambda distribution (`stats.tukeylambda`) is used. A
|
||
|
Tukey-Lambda PPCC plot interpolates from long-tailed to short-tailed
|
||
|
distributions via an approximately normal one, and is therefore particularly
|
||
|
useful in practice.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
x : array_like
|
||
|
Input array.
|
||
|
a, b : scalar
|
||
|
Lower and upper bounds of the shape parameter to use.
|
||
|
dist : str or stats.distributions instance, optional
|
||
|
Distribution or distribution function name. Objects that look enough
|
||
|
like a stats.distributions instance (i.e. they have a ``ppf`` method)
|
||
|
are also accepted. The default is ``'tukeylambda'``.
|
||
|
plot : object, optional
|
||
|
If given, plots PPCC against the shape parameter.
|
||
|
`plot` is an object that has to have methods "plot" and "text".
|
||
|
The `matplotlib.pyplot` module or a Matplotlib Axes object can be used,
|
||
|
or a custom object with the same methods.
|
||
|
Default is None, which means that no plot is created.
|
||
|
N : int, optional
|
||
|
Number of points on the horizontal axis (equally distributed from
|
||
|
`a` to `b`).
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
svals : ndarray
|
||
|
The shape values for which `ppcc` was calculated.
|
||
|
ppcc : ndarray
|
||
|
The calculated probability plot correlation coefficient values.
|
||
|
|
||
|
See Also
|
||
|
--------
|
||
|
ppcc_max, probplot, boxcox_normplot, tukeylambda
|
||
|
|
||
|
References
|
||
|
----------
|
||
|
J.J. Filliben, "The Probability Plot Correlation Coefficient Test for
|
||
|
Normality", Technometrics, Vol. 17, pp. 111-117, 1975.
|
||
|
|
||
|
Examples
|
||
|
--------
|
||
|
First we generate some random data from a Tukey-Lambda distribution,
|
||
|
with shape parameter -0.7:
|
||
|
|
||
|
>>> from scipy import stats
|
||
|
>>> import matplotlib.pyplot as plt
|
||
|
>>> np.random.seed(1234567)
|
||
|
>>> x = stats.tukeylambda.rvs(-0.7, loc=2, scale=0.5, size=10000) + 1e4
|
||
|
|
||
|
Now we explore this data with a PPCC plot as well as the related
|
||
|
probability plot and Box-Cox normplot. A red line is drawn where we
|
||
|
expect the PPCC value to be maximal (at the shape parameter -0.7 used
|
||
|
above):
|
||
|
|
||
|
>>> fig = plt.figure(figsize=(12, 4))
|
||
|
>>> ax1 = fig.add_subplot(131)
|
||
|
>>> ax2 = fig.add_subplot(132)
|
||
|
>>> ax3 = fig.add_subplot(133)
|
||
|
>>> res = stats.probplot(x, plot=ax1)
|
||
|
>>> res = stats.boxcox_normplot(x, -5, 5, plot=ax2)
|
||
|
>>> res = stats.ppcc_plot(x, -5, 5, plot=ax3)
|
||
|
>>> ax3.vlines(-0.7, 0, 1, colors='r', label='Expected shape value')
|
||
|
>>> plt.show()
|
||
|
|
||
|
"""
|
||
|
if b <= a:
|
||
|
raise ValueError("`b` has to be larger than `a`.")
|
||
|
|
||
|
svals = np.linspace(a, b, num=N)
|
||
|
ppcc = np.empty_like(svals)
|
||
|
for k, sval in enumerate(svals):
|
||
|
_, r2 = probplot(x, sval, dist=dist, fit=True)
|
||
|
ppcc[k] = r2[-1]
|
||
|
|
||
|
if plot is not None:
|
||
|
plot.plot(svals, ppcc, 'x')
|
||
|
_add_axis_labels_title(plot, xlabel='Shape Values',
|
||
|
ylabel='Prob Plot Corr. Coef.',
|
||
|
title='(%s) PPCC Plot' % dist)
|
||
|
|
||
|
return svals, ppcc
|
||
|
|
||
|
|
||
|
def boxcox_llf(lmb, data):
|
||
|
r"""The boxcox log-likelihood function.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
lmb : scalar
|
||
|
Parameter for Box-Cox transformation. See `boxcox` for details.
|
||
|
data : array_like
|
||
|
Data to calculate Box-Cox log-likelihood for. If `data` is
|
||
|
multi-dimensional, the log-likelihood is calculated along the first
|
||
|
axis.
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
llf : float or ndarray
|
||
|
Box-Cox log-likelihood of `data` given `lmb`. A float for 1-D `data`,
|
||
|
an array otherwise.
|
||
|
|
||
|
See Also
|
||
|
--------
|
||
|
boxcox, probplot, boxcox_normplot, boxcox_normmax
|
||
|
|
||
|
Notes
|
||
|
-----
|
||
|
The Box-Cox log-likelihood function is defined here as
|
||
|
|
||
|
.. math::
|
||
|
|
||
|
llf = (\lambda - 1) \sum_i(\log(x_i)) -
|
||
|
N/2 \log(\sum_i (y_i - \bar{y})^2 / N),
|
||
|
|
||
|
where ``y`` is the Box-Cox transformed input data ``x``.
|
||
|
|
||
|
Examples
|
||
|
--------
|
||
|
>>> from scipy import stats
|
||
|
>>> import matplotlib.pyplot as plt
|
||
|
>>> from mpl_toolkits.axes_grid1.inset_locator import inset_axes
|
||
|
>>> np.random.seed(1245)
|
||
|
|
||
|
Generate some random variates and calculate Box-Cox log-likelihood values
|
||
|
for them for a range of ``lmbda`` values:
|
||
|
|
||
|
>>> x = stats.loggamma.rvs(5, loc=10, size=1000)
|
||
|
>>> lmbdas = np.linspace(-2, 10)
|
||
|
>>> llf = np.zeros(lmbdas.shape, dtype=float)
|
||
|
>>> for ii, lmbda in enumerate(lmbdas):
|
||
|
... llf[ii] = stats.boxcox_llf(lmbda, x)
|
||
|
|
||
|
Also find the optimal lmbda value with `boxcox`:
|
||
|
|
||
|
>>> x_most_normal, lmbda_optimal = stats.boxcox(x)
|
||
|
|
||
|
Plot the log-likelihood as function of lmbda. Add the optimal lmbda as a
|
||
|
horizontal line to check that that's really the optimum:
|
||
|
|
||
|
>>> fig = plt.figure()
|
||
|
>>> ax = fig.add_subplot(111)
|
||
|
>>> ax.plot(lmbdas, llf, 'b.-')
|
||
|
>>> ax.axhline(stats.boxcox_llf(lmbda_optimal, x), color='r')
|
||
|
>>> ax.set_xlabel('lmbda parameter')
|
||
|
>>> ax.set_ylabel('Box-Cox log-likelihood')
|
||
|
|
||
|
Now add some probability plots to show that where the log-likelihood is
|
||
|
maximized the data transformed with `boxcox` looks closest to normal:
|
||
|
|
||
|
>>> locs = [3, 10, 4] # 'lower left', 'center', 'lower right'
|
||
|
>>> for lmbda, loc in zip([-1, lmbda_optimal, 9], locs):
|
||
|
... xt = stats.boxcox(x, lmbda=lmbda)
|
||
|
... (osm, osr), (slope, intercept, r_sq) = stats.probplot(xt)
|
||
|
... ax_inset = inset_axes(ax, width="20%", height="20%", loc=loc)
|
||
|
... ax_inset.plot(osm, osr, 'c.', osm, slope*osm + intercept, 'k-')
|
||
|
... ax_inset.set_xticklabels([])
|
||
|
... ax_inset.set_yticklabels([])
|
||
|
... ax_inset.set_title(r'$\lambda=%1.2f$' % lmbda)
|
||
|
|
||
|
>>> plt.show()
|
||
|
|
||
|
"""
|
||
|
data = np.asarray(data)
|
||
|
N = data.shape[0]
|
||
|
if N == 0:
|
||
|
return np.nan
|
||
|
|
||
|
logdata = np.log(data)
|
||
|
|
||
|
# Compute the variance of the transformed data.
|
||
|
if lmb == 0:
|
||
|
variance = np.var(logdata, axis=0)
|
||
|
else:
|
||
|
# Transform without the constant offset 1/lmb. The offset does
|
||
|
# not effect the variance, and the subtraction of the offset can
|
||
|
# lead to loss of precision.
|
||
|
variance = np.var(data**lmb / lmb, axis=0)
|
||
|
|
||
|
return (lmb - 1) * np.sum(logdata, axis=0) - N/2 * np.log(variance)
|
||
|
|
||
|
|
||
|
def _boxcox_conf_interval(x, lmax, alpha):
|
||
|
# Need to find the lambda for which
|
||
|
# f(x,lmbda) >= f(x,lmax) - 0.5*chi^2_alpha;1
|
||
|
fac = 0.5 * distributions.chi2.ppf(1 - alpha, 1)
|
||
|
target = boxcox_llf(lmax, x) - fac
|
||
|
|
||
|
def rootfunc(lmbda, data, target):
|
||
|
return boxcox_llf(lmbda, data) - target
|
||
|
|
||
|
# Find positive endpoint of interval in which answer is to be found
|
||
|
newlm = lmax + 0.5
|
||
|
N = 0
|
||
|
while (rootfunc(newlm, x, target) > 0.0) and (N < 500):
|
||
|
newlm += 0.1
|
||
|
N += 1
|
||
|
|
||
|
if N == 500:
|
||
|
raise RuntimeError("Could not find endpoint.")
|
||
|
|
||
|
lmplus = optimize.brentq(rootfunc, lmax, newlm, args=(x, target))
|
||
|
|
||
|
# Now find negative interval in the same way
|
||
|
newlm = lmax - 0.5
|
||
|
N = 0
|
||
|
while (rootfunc(newlm, x, target) > 0.0) and (N < 500):
|
||
|
newlm -= 0.1
|
||
|
N += 1
|
||
|
|
||
|
if N == 500:
|
||
|
raise RuntimeError("Could not find endpoint.")
|
||
|
|
||
|
lmminus = optimize.brentq(rootfunc, newlm, lmax, args=(x, target))
|
||
|
return lmminus, lmplus
|
||
|
|
||
|
|
||
|
def boxcox(x, lmbda=None, alpha=None):
|
||
|
r"""
|
||
|
Return a dataset transformed by a Box-Cox power transformation.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
x : ndarray
|
||
|
Input array. Must be positive 1-dimensional. Must not be constant.
|
||
|
lmbda : {None, scalar}, optional
|
||
|
If `lmbda` is not None, do the transformation for that value.
|
||
|
|
||
|
If `lmbda` is None, find the lambda that maximizes the log-likelihood
|
||
|
function and return it as the second output argument.
|
||
|
alpha : {None, float}, optional
|
||
|
If ``alpha`` is not None, return the ``100 * (1-alpha)%`` confidence
|
||
|
interval for `lmbda` as the third output argument.
|
||
|
Must be between 0.0 and 1.0.
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
boxcox : ndarray
|
||
|
Box-Cox power transformed array.
|
||
|
maxlog : float, optional
|
||
|
If the `lmbda` parameter is None, the second returned argument is
|
||
|
the lambda that maximizes the log-likelihood function.
|
||
|
(min_ci, max_ci) : tuple of float, optional
|
||
|
If `lmbda` parameter is None and ``alpha`` is not None, this returned
|
||
|
tuple of floats represents the minimum and maximum confidence limits
|
||
|
given ``alpha``.
|
||
|
|
||
|
See Also
|
||
|
--------
|
||
|
probplot, boxcox_normplot, boxcox_normmax, boxcox_llf
|
||
|
|
||
|
Notes
|
||
|
-----
|
||
|
The Box-Cox transform is given by::
|
||
|
|
||
|
y = (x**lmbda - 1) / lmbda, for lmbda != 0
|
||
|
log(x), for lmbda = 0
|
||
|
|
||
|
`boxcox` requires the input data to be positive. Sometimes a Box-Cox
|
||
|
transformation provides a shift parameter to achieve this; `boxcox` does
|
||
|
not. Such a shift parameter is equivalent to adding a positive constant to
|
||
|
`x` before calling `boxcox`.
|
||
|
|
||
|
The confidence limits returned when ``alpha`` is provided give the interval
|
||
|
where:
|
||
|
|
||
|
.. math::
|
||
|
|
||
|
llf(\hat{\lambda}) - llf(\lambda) < \frac{1}{2}\chi^2(1 - \alpha, 1),
|
||
|
|
||
|
with ``llf`` the log-likelihood function and :math:`\chi^2` the chi-squared
|
||
|
function.
|
||
|
|
||
|
References
|
||
|
----------
|
||
|
G.E.P. Box and D.R. Cox, "An Analysis of Transformations", Journal of the
|
||
|
Royal Statistical Society B, 26, 211-252 (1964).
|
||
|
|
||
|
Examples
|
||
|
--------
|
||
|
>>> from scipy import stats
|
||
|
>>> import matplotlib.pyplot as plt
|
||
|
|
||
|
We generate some random variates from a non-normal distribution and make a
|
||
|
probability plot for it, to show it is non-normal in the tails:
|
||
|
|
||
|
>>> fig = plt.figure()
|
||
|
>>> ax1 = fig.add_subplot(211)
|
||
|
>>> x = stats.loggamma.rvs(5, size=500) + 5
|
||
|
>>> prob = stats.probplot(x, dist=stats.norm, plot=ax1)
|
||
|
>>> ax1.set_xlabel('')
|
||
|
>>> ax1.set_title('Probplot against normal distribution')
|
||
|
|
||
|
We now use `boxcox` to transform the data so it's closest to normal:
|
||
|
|
||
|
>>> ax2 = fig.add_subplot(212)
|
||
|
>>> xt, _ = stats.boxcox(x)
|
||
|
>>> prob = stats.probplot(xt, dist=stats.norm, plot=ax2)
|
||
|
>>> ax2.set_title('Probplot after Box-Cox transformation')
|
||
|
|
||
|
>>> plt.show()
|
||
|
|
||
|
"""
|
||
|
x = np.asarray(x)
|
||
|
if x.ndim != 1:
|
||
|
raise ValueError("Data must be 1-dimensional.")
|
||
|
|
||
|
if x.size == 0:
|
||
|
return x
|
||
|
|
||
|
if np.all(x == x[0]):
|
||
|
raise ValueError("Data must not be constant.")
|
||
|
|
||
|
if any(x <= 0):
|
||
|
raise ValueError("Data must be positive.")
|
||
|
|
||
|
if lmbda is not None: # single transformation
|
||
|
return special.boxcox(x, lmbda)
|
||
|
|
||
|
# If lmbda=None, find the lmbda that maximizes the log-likelihood function.
|
||
|
lmax = boxcox_normmax(x, method='mle')
|
||
|
y = boxcox(x, lmax)
|
||
|
|
||
|
if alpha is None:
|
||
|
return y, lmax
|
||
|
else:
|
||
|
# Find confidence interval
|
||
|
interval = _boxcox_conf_interval(x, lmax, alpha)
|
||
|
return y, lmax, interval
|
||
|
|
||
|
|
||
|
def boxcox_normmax(x, brack=(-2.0, 2.0), method='pearsonr'):
|
||
|
"""Compute optimal Box-Cox transform parameter for input data.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
x : array_like
|
||
|
Input array.
|
||
|
brack : 2-tuple, optional
|
||
|
The starting interval for a downhill bracket search with
|
||
|
`optimize.brent`. Note that this is in most cases not critical; the
|
||
|
final result is allowed to be outside this bracket.
|
||
|
method : str, optional
|
||
|
The method to determine the optimal transform parameter (`boxcox`
|
||
|
``lmbda`` parameter). Options are:
|
||
|
|
||
|
'pearsonr' (default)
|
||
|
Maximizes the Pearson correlation coefficient between
|
||
|
``y = boxcox(x)`` and the expected values for ``y`` if `x` would be
|
||
|
normally-distributed.
|
||
|
|
||
|
'mle'
|
||
|
Minimizes the log-likelihood `boxcox_llf`. This is the method used
|
||
|
in `boxcox`.
|
||
|
|
||
|
'all'
|
||
|
Use all optimization methods available, and return all results.
|
||
|
Useful to compare different methods.
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
maxlog : float or ndarray
|
||
|
The optimal transform parameter found. An array instead of a scalar
|
||
|
for ``method='all'``.
|
||
|
|
||
|
See Also
|
||
|
--------
|
||
|
boxcox, boxcox_llf, boxcox_normplot
|
||
|
|
||
|
Examples
|
||
|
--------
|
||
|
>>> from scipy import stats
|
||
|
>>> import matplotlib.pyplot as plt
|
||
|
>>> np.random.seed(1234) # make this example reproducible
|
||
|
|
||
|
Generate some data and determine optimal ``lmbda`` in various ways:
|
||
|
|
||
|
>>> x = stats.loggamma.rvs(5, size=30) + 5
|
||
|
>>> y, lmax_mle = stats.boxcox(x)
|
||
|
>>> lmax_pearsonr = stats.boxcox_normmax(x)
|
||
|
|
||
|
>>> lmax_mle
|
||
|
7.177...
|
||
|
>>> lmax_pearsonr
|
||
|
7.916...
|
||
|
>>> stats.boxcox_normmax(x, method='all')
|
||
|
array([ 7.91667384, 7.17718692])
|
||
|
|
||
|
>>> fig = plt.figure()
|
||
|
>>> ax = fig.add_subplot(111)
|
||
|
>>> prob = stats.boxcox_normplot(x, -10, 10, plot=ax)
|
||
|
>>> ax.axvline(lmax_mle, color='r')
|
||
|
>>> ax.axvline(lmax_pearsonr, color='g', ls='--')
|
||
|
|
||
|
>>> plt.show()
|
||
|
|
||
|
"""
|
||
|
|
||
|
def _pearsonr(x, brack):
|
||
|
osm_uniform = _calc_uniform_order_statistic_medians(len(x))
|
||
|
xvals = distributions.norm.ppf(osm_uniform)
|
||
|
|
||
|
def _eval_pearsonr(lmbda, xvals, samps):
|
||
|
# This function computes the x-axis values of the probability plot
|
||
|
# and computes a linear regression (including the correlation) and
|
||
|
# returns ``1 - r`` so that a minimization function maximizes the
|
||
|
# correlation.
|
||
|
y = boxcox(samps, lmbda)
|
||
|
yvals = np.sort(y)
|
||
|
r, prob = stats.pearsonr(xvals, yvals)
|
||
|
return 1 - r
|
||
|
|
||
|
return optimize.brent(_eval_pearsonr, brack=brack, args=(xvals, x))
|
||
|
|
||
|
def _mle(x, brack):
|
||
|
def _eval_mle(lmb, data):
|
||
|
# function to minimize
|
||
|
return -boxcox_llf(lmb, data)
|
||
|
|
||
|
return optimize.brent(_eval_mle, brack=brack, args=(x,))
|
||
|
|
||
|
def _all(x, brack):
|
||
|
maxlog = np.empty(2, dtype=float)
|
||
|
maxlog[0] = _pearsonr(x, brack)
|
||
|
maxlog[1] = _mle(x, brack)
|
||
|
return maxlog
|
||
|
|
||
|
methods = {'pearsonr': _pearsonr,
|
||
|
'mle': _mle,
|
||
|
'all': _all}
|
||
|
if method not in methods.keys():
|
||
|
raise ValueError("Method %s not recognized." % method)
|
||
|
|
||
|
optimfunc = methods[method]
|
||
|
return optimfunc(x, brack)
|
||
|
|
||
|
|
||
|
def _normplot(method, x, la, lb, plot=None, N=80):
|
||
|
"""Compute parameters for a Box-Cox or Yeo-Johnson normality plot,
|
||
|
optionally show it. See `boxcox_normplot` or `yeojohnson_normplot` for
|
||
|
details."""
|
||
|
|
||
|
if method == 'boxcox':
|
||
|
title = 'Box-Cox Normality Plot'
|
||
|
transform_func = boxcox
|
||
|
else:
|
||
|
title = 'Yeo-Johnson Normality Plot'
|
||
|
transform_func = yeojohnson
|
||
|
|
||
|
x = np.asarray(x)
|
||
|
if x.size == 0:
|
||
|
return x
|
||
|
|
||
|
if lb <= la:
|
||
|
raise ValueError("`lb` has to be larger than `la`.")
|
||
|
|
||
|
lmbdas = np.linspace(la, lb, num=N)
|
||
|
ppcc = lmbdas * 0.0
|
||
|
for i, val in enumerate(lmbdas):
|
||
|
# Determine for each lmbda the square root of correlation coefficient
|
||
|
# of transformed x
|
||
|
z = transform_func(x, lmbda=val)
|
||
|
_, (_, _, r) = probplot(z, dist='norm', fit=True)
|
||
|
ppcc[i] = r
|
||
|
|
||
|
if plot is not None:
|
||
|
plot.plot(lmbdas, ppcc, 'x')
|
||
|
_add_axis_labels_title(plot, xlabel='$\\lambda$',
|
||
|
ylabel='Prob Plot Corr. Coef.',
|
||
|
title=title)
|
||
|
|
||
|
return lmbdas, ppcc
|
||
|
|
||
|
|
||
|
def boxcox_normplot(x, la, lb, plot=None, N=80):
|
||
|
"""Compute parameters for a Box-Cox normality plot, optionally show it.
|
||
|
|
||
|
A Box-Cox normality plot shows graphically what the best transformation
|
||
|
parameter is to use in `boxcox` to obtain a distribution that is close
|
||
|
to normal.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
x : array_like
|
||
|
Input array.
|
||
|
la, lb : scalar
|
||
|
The lower and upper bounds for the ``lmbda`` values to pass to `boxcox`
|
||
|
for Box-Cox transformations. These are also the limits of the
|
||
|
horizontal axis of the plot if that is generated.
|
||
|
plot : object, optional
|
||
|
If given, plots the quantiles and least squares fit.
|
||
|
`plot` is an object that has to have methods "plot" and "text".
|
||
|
The `matplotlib.pyplot` module or a Matplotlib Axes object can be used,
|
||
|
or a custom object with the same methods.
|
||
|
Default is None, which means that no plot is created.
|
||
|
N : int, optional
|
||
|
Number of points on the horizontal axis (equally distributed from
|
||
|
`la` to `lb`).
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
lmbdas : ndarray
|
||
|
The ``lmbda`` values for which a Box-Cox transform was done.
|
||
|
ppcc : ndarray
|
||
|
Probability Plot Correlelation Coefficient, as obtained from `probplot`
|
||
|
when fitting the Box-Cox transformed input `x` against a normal
|
||
|
distribution.
|
||
|
|
||
|
See Also
|
||
|
--------
|
||
|
probplot, boxcox, boxcox_normmax, boxcox_llf, ppcc_max
|
||
|
|
||
|
Notes
|
||
|
-----
|
||
|
Even if `plot` is given, the figure is not shown or saved by
|
||
|
`boxcox_normplot`; ``plt.show()`` or ``plt.savefig('figname.png')``
|
||
|
should be used after calling `probplot`.
|
||
|
|
||
|
Examples
|
||
|
--------
|
||
|
>>> from scipy import stats
|
||
|
>>> import matplotlib.pyplot as plt
|
||
|
|
||
|
Generate some non-normally distributed data, and create a Box-Cox plot:
|
||
|
|
||
|
>>> x = stats.loggamma.rvs(5, size=500) + 5
|
||
|
>>> fig = plt.figure()
|
||
|
>>> ax = fig.add_subplot(111)
|
||
|
>>> prob = stats.boxcox_normplot(x, -20, 20, plot=ax)
|
||
|
|
||
|
Determine and plot the optimal ``lmbda`` to transform ``x`` and plot it in
|
||
|
the same plot:
|
||
|
|
||
|
>>> _, maxlog = stats.boxcox(x)
|
||
|
>>> ax.axvline(maxlog, color='r')
|
||
|
|
||
|
>>> plt.show()
|
||
|
|
||
|
"""
|
||
|
return _normplot('boxcox', x, la, lb, plot, N)
|
||
|
|
||
|
|
||
|
def yeojohnson(x, lmbda=None):
|
||
|
r"""
|
||
|
Return a dataset transformed by a Yeo-Johnson power transformation.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
x : ndarray
|
||
|
Input array. Should be 1-dimensional.
|
||
|
lmbda : float, optional
|
||
|
If ``lmbda`` is ``None``, find the lambda that maximizes the
|
||
|
log-likelihood function and return it as the second output argument.
|
||
|
Otherwise the transformation is done for the given value.
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
yeojohnson: ndarray
|
||
|
Yeo-Johnson power transformed array.
|
||
|
maxlog : float, optional
|
||
|
If the `lmbda` parameter is None, the second returned argument is
|
||
|
the lambda that maximizes the log-likelihood function.
|
||
|
|
||
|
See Also
|
||
|
--------
|
||
|
probplot, yeojohnson_normplot, yeojohnson_normmax, yeojohnson_llf, boxcox
|
||
|
|
||
|
Notes
|
||
|
-----
|
||
|
The Yeo-Johnson transform is given by::
|
||
|
|
||
|
y = ((x + 1)**lmbda - 1) / lmbda, for x >= 0, lmbda != 0
|
||
|
log(x + 1), for x >= 0, lmbda = 0
|
||
|
-((-x + 1)**(2 - lmbda) - 1) / (2 - lmbda), for x < 0, lmbda != 2
|
||
|
-log(-x + 1), for x < 0, lmbda = 2
|
||
|
|
||
|
Unlike `boxcox`, `yeojohnson` does not require the input data to be
|
||
|
positive.
|
||
|
|
||
|
.. versionadded:: 1.2.0
|
||
|
|
||
|
|
||
|
References
|
||
|
----------
|
||
|
I. Yeo and R.A. Johnson, "A New Family of Power Transformations to
|
||
|
Improve Normality or Symmetry", Biometrika 87.4 (2000):
|
||
|
|
||
|
|
||
|
Examples
|
||
|
--------
|
||
|
>>> from scipy import stats
|
||
|
>>> import matplotlib.pyplot as plt
|
||
|
|
||
|
We generate some random variates from a non-normal distribution and make a
|
||
|
probability plot for it, to show it is non-normal in the tails:
|
||
|
|
||
|
>>> fig = plt.figure()
|
||
|
>>> ax1 = fig.add_subplot(211)
|
||
|
>>> x = stats.loggamma.rvs(5, size=500) + 5
|
||
|
>>> prob = stats.probplot(x, dist=stats.norm, plot=ax1)
|
||
|
>>> ax1.set_xlabel('')
|
||
|
>>> ax1.set_title('Probplot against normal distribution')
|
||
|
|
||
|
We now use `yeojohnson` to transform the data so it's closest to normal:
|
||
|
|
||
|
>>> ax2 = fig.add_subplot(212)
|
||
|
>>> xt, lmbda = stats.yeojohnson(x)
|
||
|
>>> prob = stats.probplot(xt, dist=stats.norm, plot=ax2)
|
||
|
>>> ax2.set_title('Probplot after Yeo-Johnson transformation')
|
||
|
|
||
|
>>> plt.show()
|
||
|
|
||
|
"""
|
||
|
|
||
|
x = np.asarray(x)
|
||
|
if x.size == 0:
|
||
|
return x
|
||
|
|
||
|
if np.issubdtype(x.dtype, np.complexfloating):
|
||
|
raise ValueError('Yeo-Johnson transformation is not defined for '
|
||
|
'complex numbers.')
|
||
|
|
||
|
if np.issubdtype(x.dtype, np.integer):
|
||
|
x = x.astype(np.float64, copy=False)
|
||
|
|
||
|
if lmbda is not None:
|
||
|
return _yeojohnson_transform(x, lmbda)
|
||
|
|
||
|
# if lmbda=None, find the lmbda that maximizes the log-likelihood function.
|
||
|
lmax = yeojohnson_normmax(x)
|
||
|
y = _yeojohnson_transform(x, lmax)
|
||
|
|
||
|
return y, lmax
|
||
|
|
||
|
|
||
|
def _yeojohnson_transform(x, lmbda):
|
||
|
"""Return x transformed by the Yeo-Johnson power transform with given
|
||
|
parameter lmbda."""
|
||
|
|
||
|
out = np.zeros_like(x)
|
||
|
pos = x >= 0 # binary mask
|
||
|
|
||
|
# when x >= 0
|
||
|
if abs(lmbda) < np.spacing(1.):
|
||
|
out[pos] = np.log1p(x[pos])
|
||
|
else: # lmbda != 0
|
||
|
out[pos] = (np.power(x[pos] + 1, lmbda) - 1) / lmbda
|
||
|
|
||
|
# when x < 0
|
||
|
if abs(lmbda - 2) > np.spacing(1.):
|
||
|
out[~pos] = -(np.power(-x[~pos] + 1, 2 - lmbda) - 1) / (2 - lmbda)
|
||
|
else: # lmbda == 2
|
||
|
out[~pos] = -np.log1p(-x[~pos])
|
||
|
|
||
|
return out
|
||
|
|
||
|
|
||
|
def yeojohnson_llf(lmb, data):
|
||
|
r"""The yeojohnson log-likelihood function.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
lmb : scalar
|
||
|
Parameter for Yeo-Johnson transformation. See `yeojohnson` for
|
||
|
details.
|
||
|
data : array_like
|
||
|
Data to calculate Yeo-Johnson log-likelihood for. If `data` is
|
||
|
multi-dimensional, the log-likelihood is calculated along the first
|
||
|
axis.
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
llf : float
|
||
|
Yeo-Johnson log-likelihood of `data` given `lmb`.
|
||
|
|
||
|
See Also
|
||
|
--------
|
||
|
yeojohnson, probplot, yeojohnson_normplot, yeojohnson_normmax
|
||
|
|
||
|
Notes
|
||
|
-----
|
||
|
The Yeo-Johnson log-likelihood function is defined here as
|
||
|
|
||
|
.. math::
|
||
|
|
||
|
llf = N/2 \log(\hat{\sigma}^2) + (\lambda - 1)
|
||
|
\sum_i \text{ sign }(x_i)\log(|x_i| + 1)
|
||
|
|
||
|
where :math:`\hat{\sigma}^2` is estimated variance of the the Yeo-Johnson
|
||
|
transformed input data ``x``.
|
||
|
|
||
|
.. versionadded:: 1.2.0
|
||
|
|
||
|
Examples
|
||
|
--------
|
||
|
>>> from scipy import stats
|
||
|
>>> import matplotlib.pyplot as plt
|
||
|
>>> from mpl_toolkits.axes_grid1.inset_locator import inset_axes
|
||
|
>>> np.random.seed(1245)
|
||
|
|
||
|
Generate some random variates and calculate Yeo-Johnson log-likelihood
|
||
|
values for them for a range of ``lmbda`` values:
|
||
|
|
||
|
>>> x = stats.loggamma.rvs(5, loc=10, size=1000)
|
||
|
>>> lmbdas = np.linspace(-2, 10)
|
||
|
>>> llf = np.zeros(lmbdas.shape, dtype=float)
|
||
|
>>> for ii, lmbda in enumerate(lmbdas):
|
||
|
... llf[ii] = stats.yeojohnson_llf(lmbda, x)
|
||
|
|
||
|
Also find the optimal lmbda value with `yeojohnson`:
|
||
|
|
||
|
>>> x_most_normal, lmbda_optimal = stats.yeojohnson(x)
|
||
|
|
||
|
Plot the log-likelihood as function of lmbda. Add the optimal lmbda as a
|
||
|
horizontal line to check that that's really the optimum:
|
||
|
|
||
|
>>> fig = plt.figure()
|
||
|
>>> ax = fig.add_subplot(111)
|
||
|
>>> ax.plot(lmbdas, llf, 'b.-')
|
||
|
>>> ax.axhline(stats.yeojohnson_llf(lmbda_optimal, x), color='r')
|
||
|
>>> ax.set_xlabel('lmbda parameter')
|
||
|
>>> ax.set_ylabel('Yeo-Johnson log-likelihood')
|
||
|
|
||
|
Now add some probability plots to show that where the log-likelihood is
|
||
|
maximized the data transformed with `yeojohnson` looks closest to normal:
|
||
|
|
||
|
>>> locs = [3, 10, 4] # 'lower left', 'center', 'lower right'
|
||
|
>>> for lmbda, loc in zip([-1, lmbda_optimal, 9], locs):
|
||
|
... xt = stats.yeojohnson(x, lmbda=lmbda)
|
||
|
... (osm, osr), (slope, intercept, r_sq) = stats.probplot(xt)
|
||
|
... ax_inset = inset_axes(ax, width="20%", height="20%", loc=loc)
|
||
|
... ax_inset.plot(osm, osr, 'c.', osm, slope*osm + intercept, 'k-')
|
||
|
... ax_inset.set_xticklabels([])
|
||
|
... ax_inset.set_yticklabels([])
|
||
|
... ax_inset.set_title(r'$\lambda=%1.2f$' % lmbda)
|
||
|
|
||
|
>>> plt.show()
|
||
|
|
||
|
"""
|
||
|
data = np.asarray(data)
|
||
|
n_samples = data.shape[0]
|
||
|
|
||
|
if n_samples == 0:
|
||
|
return np.nan
|
||
|
|
||
|
trans = _yeojohnson_transform(data, lmb)
|
||
|
|
||
|
loglike = -n_samples / 2 * np.log(trans.var(axis=0))
|
||
|
loglike += (lmb - 1) * (np.sign(data) * np.log(np.abs(data) + 1)).sum(axis=0)
|
||
|
|
||
|
return loglike
|
||
|
|
||
|
|
||
|
def yeojohnson_normmax(x, brack=(-2, 2)):
|
||
|
"""
|
||
|
Compute optimal Yeo-Johnson transform parameter.
|
||
|
|
||
|
Compute optimal Yeo-Johnson transform parameter for input data, using
|
||
|
maximum likelihood estimation.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
x : array_like
|
||
|
Input array.
|
||
|
brack : 2-tuple, optional
|
||
|
The starting interval for a downhill bracket search with
|
||
|
`optimize.brent`. Note that this is in most cases not critical; the
|
||
|
final result is allowed to be outside this bracket.
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
maxlog : float
|
||
|
The optimal transform parameter found.
|
||
|
|
||
|
See Also
|
||
|
--------
|
||
|
yeojohnson, yeojohnson_llf, yeojohnson_normplot
|
||
|
|
||
|
Notes
|
||
|
-----
|
||
|
.. versionadded:: 1.2.0
|
||
|
|
||
|
Examples
|
||
|
--------
|
||
|
>>> from scipy import stats
|
||
|
>>> import matplotlib.pyplot as plt
|
||
|
>>> np.random.seed(1234) # make this example reproducible
|
||
|
|
||
|
Generate some data and determine optimal ``lmbda``
|
||
|
|
||
|
>>> x = stats.loggamma.rvs(5, size=30) + 5
|
||
|
>>> lmax = stats.yeojohnson_normmax(x)
|
||
|
|
||
|
>>> fig = plt.figure()
|
||
|
>>> ax = fig.add_subplot(111)
|
||
|
>>> prob = stats.yeojohnson_normplot(x, -10, 10, plot=ax)
|
||
|
>>> ax.axvline(lmax, color='r')
|
||
|
|
||
|
>>> plt.show()
|
||
|
|
||
|
"""
|
||
|
|
||
|
def _neg_llf(lmbda, data):
|
||
|
return -yeojohnson_llf(lmbda, data)
|
||
|
|
||
|
return optimize.brent(_neg_llf, brack=brack, args=(x,))
|
||
|
|
||
|
|
||
|
def yeojohnson_normplot(x, la, lb, plot=None, N=80):
|
||
|
"""Compute parameters for a Yeo-Johnson normality plot, optionally show it.
|
||
|
|
||
|
A Yeo-Johnson normality plot shows graphically what the best
|
||
|
transformation parameter is to use in `yeojohnson` to obtain a
|
||
|
distribution that is close to normal.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
x : array_like
|
||
|
Input array.
|
||
|
la, lb : scalar
|
||
|
The lower and upper bounds for the ``lmbda`` values to pass to
|
||
|
`yeojohnson` for Yeo-Johnson transformations. These are also the
|
||
|
limits of the horizontal axis of the plot if that is generated.
|
||
|
plot : object, optional
|
||
|
If given, plots the quantiles and least squares fit.
|
||
|
`plot` is an object that has to have methods "plot" and "text".
|
||
|
The `matplotlib.pyplot` module or a Matplotlib Axes object can be used,
|
||
|
or a custom object with the same methods.
|
||
|
Default is None, which means that no plot is created.
|
||
|
N : int, optional
|
||
|
Number of points on the horizontal axis (equally distributed from
|
||
|
`la` to `lb`).
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
lmbdas : ndarray
|
||
|
The ``lmbda`` values for which a Yeo-Johnson transform was done.
|
||
|
ppcc : ndarray
|
||
|
Probability Plot Correlelation Coefficient, as obtained from `probplot`
|
||
|
when fitting the Box-Cox transformed input `x` against a normal
|
||
|
distribution.
|
||
|
|
||
|
See Also
|
||
|
--------
|
||
|
probplot, yeojohnson, yeojohnson_normmax, yeojohnson_llf, ppcc_max
|
||
|
|
||
|
Notes
|
||
|
-----
|
||
|
Even if `plot` is given, the figure is not shown or saved by
|
||
|
`boxcox_normplot`; ``plt.show()`` or ``plt.savefig('figname.png')``
|
||
|
should be used after calling `probplot`.
|
||
|
|
||
|
.. versionadded:: 1.2.0
|
||
|
|
||
|
Examples
|
||
|
--------
|
||
|
>>> from scipy import stats
|
||
|
>>> import matplotlib.pyplot as plt
|
||
|
|
||
|
Generate some non-normally distributed data, and create a Yeo-Johnson plot:
|
||
|
|
||
|
>>> x = stats.loggamma.rvs(5, size=500) + 5
|
||
|
>>> fig = plt.figure()
|
||
|
>>> ax = fig.add_subplot(111)
|
||
|
>>> prob = stats.yeojohnson_normplot(x, -20, 20, plot=ax)
|
||
|
|
||
|
Determine and plot the optimal ``lmbda`` to transform ``x`` and plot it in
|
||
|
the same plot:
|
||
|
|
||
|
>>> _, maxlog = stats.yeojohnson(x)
|
||
|
>>> ax.axvline(maxlog, color='r')
|
||
|
|
||
|
>>> plt.show()
|
||
|
|
||
|
"""
|
||
|
return _normplot('yeojohnson', x, la, lb, plot, N)
|
||
|
|
||
|
|
||
|
ShapiroResult = namedtuple('ShapiroResult', ('statistic', 'pvalue'))
|
||
|
|
||
|
def shapiro(x):
|
||
|
"""
|
||
|
Perform the Shapiro-Wilk test for normality.
|
||
|
|
||
|
The Shapiro-Wilk test tests the null hypothesis that the
|
||
|
data was drawn from a normal distribution.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
x : array_like
|
||
|
Array of sample data.
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
statistic : float
|
||
|
The test statistic.
|
||
|
p-value : float
|
||
|
The p-value for the hypothesis test.
|
||
|
|
||
|
See Also
|
||
|
--------
|
||
|
anderson : The Anderson-Darling test for normality
|
||
|
kstest : The Kolmogorov-Smirnov test for goodness of fit.
|
||
|
|
||
|
Notes
|
||
|
-----
|
||
|
The algorithm used is described in [4]_ but censoring parameters as
|
||
|
described are not implemented. For N > 5000 the W test statistic is accurate
|
||
|
but the p-value may not be.
|
||
|
|
||
|
The chance of rejecting the null hypothesis when it is true is close to 5%
|
||
|
regardless of sample size.
|
||
|
|
||
|
References
|
||
|
----------
|
||
|
.. [1] https://www.itl.nist.gov/div898/handbook/prc/section2/prc213.htm
|
||
|
.. [2] Shapiro, S. S. & Wilk, M.B (1965). An analysis of variance test for
|
||
|
normality (complete samples), Biometrika, Vol. 52, pp. 591-611.
|
||
|
.. [3] Razali, N. M. & Wah, Y. B. (2011) Power comparisons of Shapiro-Wilk,
|
||
|
Kolmogorov-Smirnov, Lilliefors and Anderson-Darling tests, Journal of
|
||
|
Statistical Modeling and Analytics, Vol. 2, pp. 21-33.
|
||
|
.. [4] ALGORITHM AS R94 APPL. STATIST. (1995) VOL. 44, NO. 4.
|
||
|
|
||
|
Examples
|
||
|
--------
|
||
|
>>> from scipy import stats
|
||
|
>>> np.random.seed(12345678)
|
||
|
>>> x = stats.norm.rvs(loc=5, scale=3, size=100)
|
||
|
>>> shapiro_test = stats.shapiro(x)
|
||
|
>>> shapiro_test
|
||
|
ShapiroResult(statistic=0.9772805571556091, pvalue=0.08144091814756393)
|
||
|
>>> shapiro_test.statistic
|
||
|
0.9772805571556091
|
||
|
>>> shapiro_test.pvalue
|
||
|
0.08144091814756393
|
||
|
|
||
|
"""
|
||
|
x = np.ravel(x)
|
||
|
|
||
|
N = len(x)
|
||
|
if N < 3:
|
||
|
raise ValueError("Data must be at least length 3.")
|
||
|
|
||
|
a = zeros(N, 'f')
|
||
|
init = 0
|
||
|
|
||
|
y = sort(x)
|
||
|
a, w, pw, ifault = statlib.swilk(y, a[:N//2], init)
|
||
|
if ifault not in [0, 2]:
|
||
|
warnings.warn("Input data for shapiro has range zero. The results "
|
||
|
"may not be accurate.")
|
||
|
if N > 5000:
|
||
|
warnings.warn("p-value may not be accurate for N > 5000.")
|
||
|
|
||
|
return ShapiroResult(w, pw)
|
||
|
|
||
|
|
||
|
# Values from Stephens, M A, "EDF Statistics for Goodness of Fit and
|
||
|
# Some Comparisons", Journal of the American Statistical
|
||
|
# Association, Vol. 69, Issue 347, Sept. 1974, pp 730-737
|
||
|
_Avals_norm = array([0.576, 0.656, 0.787, 0.918, 1.092])
|
||
|
_Avals_expon = array([0.922, 1.078, 1.341, 1.606, 1.957])
|
||
|
# From Stephens, M A, "Goodness of Fit for the Extreme Value Distribution",
|
||
|
# Biometrika, Vol. 64, Issue 3, Dec. 1977, pp 583-588.
|
||
|
_Avals_gumbel = array([0.474, 0.637, 0.757, 0.877, 1.038])
|
||
|
# From Stephens, M A, "Tests of Fit for the Logistic Distribution Based
|
||
|
# on the Empirical Distribution Function.", Biometrika,
|
||
|
# Vol. 66, Issue 3, Dec. 1979, pp 591-595.
|
||
|
_Avals_logistic = array([0.426, 0.563, 0.660, 0.769, 0.906, 1.010])
|
||
|
|
||
|
|
||
|
AndersonResult = namedtuple('AndersonResult', ('statistic',
|
||
|
'critical_values',
|
||
|
'significance_level'))
|
||
|
|
||
|
|
||
|
def anderson(x, dist='norm'):
|
||
|
"""
|
||
|
Anderson-Darling test for data coming from a particular distribution.
|
||
|
|
||
|
The Anderson-Darling test tests the null hypothesis that a sample is
|
||
|
drawn from a population that follows a particular distribution.
|
||
|
For the Anderson-Darling test, the critical values depend on
|
||
|
which distribution is being tested against. This function works
|
||
|
for normal, exponential, logistic, or Gumbel (Extreme Value
|
||
|
Type I) distributions.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
x : array_like
|
||
|
Array of sample data.
|
||
|
dist : {'norm', 'expon', 'logistic', 'gumbel', 'gumbel_l', 'gumbel_r', 'extreme1'}, optional
|
||
|
The type of distribution to test against. The default is 'norm'.
|
||
|
The names 'extreme1', 'gumbel_l' and 'gumbel' are synonyms for the
|
||
|
same distribution.
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
statistic : float
|
||
|
The Anderson-Darling test statistic.
|
||
|
critical_values : list
|
||
|
The critical values for this distribution.
|
||
|
significance_level : list
|
||
|
The significance levels for the corresponding critical values
|
||
|
in percents. The function returns critical values for a
|
||
|
differing set of significance levels depending on the
|
||
|
distribution that is being tested against.
|
||
|
|
||
|
See Also
|
||
|
--------
|
||
|
kstest : The Kolmogorov-Smirnov test for goodness-of-fit.
|
||
|
|
||
|
Notes
|
||
|
-----
|
||
|
Critical values provided are for the following significance levels:
|
||
|
|
||
|
normal/exponenential
|
||
|
15%, 10%, 5%, 2.5%, 1%
|
||
|
logistic
|
||
|
25%, 10%, 5%, 2.5%, 1%, 0.5%
|
||
|
Gumbel
|
||
|
25%, 10%, 5%, 2.5%, 1%
|
||
|
|
||
|
If the returned statistic is larger than these critical values then
|
||
|
for the corresponding significance level, the null hypothesis that
|
||
|
the data come from the chosen distribution can be rejected.
|
||
|
The returned statistic is referred to as 'A2' in the references.
|
||
|
|
||
|
References
|
||
|
----------
|
||
|
.. [1] https://www.itl.nist.gov/div898/handbook/prc/section2/prc213.htm
|
||
|
.. [2] Stephens, M. A. (1974). EDF Statistics for Goodness of Fit and
|
||
|
Some Comparisons, Journal of the American Statistical Association,
|
||
|
Vol. 69, pp. 730-737.
|
||
|
.. [3] Stephens, M. A. (1976). Asymptotic Results for Goodness-of-Fit
|
||
|
Statistics with Unknown Parameters, Annals of Statistics, Vol. 4,
|
||
|
pp. 357-369.
|
||
|
.. [4] Stephens, M. A. (1977). Goodness of Fit for the Extreme Value
|
||
|
Distribution, Biometrika, Vol. 64, pp. 583-588.
|
||
|
.. [5] Stephens, M. A. (1977). Goodness of Fit with Special Reference
|
||
|
to Tests for Exponentiality , Technical Report No. 262,
|
||
|
Department of Statistics, Stanford University, Stanford, CA.
|
||
|
.. [6] Stephens, M. A. (1979). Tests of Fit for the Logistic Distribution
|
||
|
Based on the Empirical Distribution Function, Biometrika, Vol. 66,
|
||
|
pp. 591-595.
|
||
|
|
||
|
"""
|
||
|
if dist not in ['norm', 'expon', 'gumbel', 'gumbel_l',
|
||
|
'gumbel_r', 'extreme1', 'logistic']:
|
||
|
raise ValueError("Invalid distribution; dist must be 'norm', "
|
||
|
"'expon', 'gumbel', 'extreme1' or 'logistic'.")
|
||
|
y = sort(x)
|
||
|
xbar = np.mean(x, axis=0)
|
||
|
N = len(y)
|
||
|
if dist == 'norm':
|
||
|
s = np.std(x, ddof=1, axis=0)
|
||
|
w = (y - xbar) / s
|
||
|
logcdf = distributions.norm.logcdf(w)
|
||
|
logsf = distributions.norm.logsf(w)
|
||
|
sig = array([15, 10, 5, 2.5, 1])
|
||
|
critical = around(_Avals_norm / (1.0 + 4.0/N - 25.0/N/N), 3)
|
||
|
elif dist == 'expon':
|
||
|
w = y / xbar
|
||
|
logcdf = distributions.expon.logcdf(w)
|
||
|
logsf = distributions.expon.logsf(w)
|
||
|
sig = array([15, 10, 5, 2.5, 1])
|
||
|
critical = around(_Avals_expon / (1.0 + 0.6/N), 3)
|
||
|
elif dist == 'logistic':
|
||
|
def rootfunc(ab, xj, N):
|
||
|
a, b = ab
|
||
|
tmp = (xj - a) / b
|
||
|
tmp2 = exp(tmp)
|
||
|
val = [np.sum(1.0/(1+tmp2), axis=0) - 0.5*N,
|
||
|
np.sum(tmp*(1.0-tmp2)/(1+tmp2), axis=0) + N]
|
||
|
return array(val)
|
||
|
|
||
|
sol0 = array([xbar, np.std(x, ddof=1, axis=0)])
|
||
|
sol = optimize.fsolve(rootfunc, sol0, args=(x, N), xtol=1e-5)
|
||
|
w = (y - sol[0]) / sol[1]
|
||
|
logcdf = distributions.logistic.logcdf(w)
|
||
|
logsf = distributions.logistic.logsf(w)
|
||
|
sig = array([25, 10, 5, 2.5, 1, 0.5])
|
||
|
critical = around(_Avals_logistic / (1.0 + 0.25/N), 3)
|
||
|
elif dist == 'gumbel_r':
|
||
|
xbar, s = distributions.gumbel_r.fit(x)
|
||
|
w = (y - xbar) / s
|
||
|
logcdf = distributions.gumbel_r.logcdf(w)
|
||
|
logsf = distributions.gumbel_r.logsf(w)
|
||
|
sig = array([25, 10, 5, 2.5, 1])
|
||
|
critical = around(_Avals_gumbel / (1.0 + 0.2/sqrt(N)), 3)
|
||
|
else: # (dist == 'gumbel') or (dist == 'gumbel_l') or (dist == 'extreme1')
|
||
|
xbar, s = distributions.gumbel_l.fit(x)
|
||
|
w = (y - xbar) / s
|
||
|
logcdf = distributions.gumbel_l.logcdf(w)
|
||
|
logsf = distributions.gumbel_l.logsf(w)
|
||
|
sig = array([25, 10, 5, 2.5, 1])
|
||
|
critical = around(_Avals_gumbel / (1.0 + 0.2/sqrt(N)), 3)
|
||
|
|
||
|
i = arange(1, N + 1)
|
||
|
A2 = -N - np.sum((2*i - 1.0) / N * (logcdf + logsf[::-1]), axis=0)
|
||
|
|
||
|
return AndersonResult(A2, critical, sig)
|
||
|
|
||
|
|
||
|
def _anderson_ksamp_midrank(samples, Z, Zstar, k, n, N):
|
||
|
"""
|
||
|
Compute A2akN equation 7 of Scholz and Stephens.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
samples : sequence of 1-D array_like
|
||
|
Array of sample arrays.
|
||
|
Z : array_like
|
||
|
Sorted array of all observations.
|
||
|
Zstar : array_like
|
||
|
Sorted array of unique observations.
|
||
|
k : int
|
||
|
Number of samples.
|
||
|
n : array_like
|
||
|
Number of observations in each sample.
|
||
|
N : int
|
||
|
Total number of observations.
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
A2aKN : float
|
||
|
The A2aKN statistics of Scholz and Stephens 1987.
|
||
|
"""
|
||
|
|
||
|
A2akN = 0.
|
||
|
Z_ssorted_left = Z.searchsorted(Zstar, 'left')
|
||
|
if N == Zstar.size:
|
||
|
lj = 1.
|
||
|
else:
|
||
|
lj = Z.searchsorted(Zstar, 'right') - Z_ssorted_left
|
||
|
Bj = Z_ssorted_left + lj / 2.
|
||
|
for i in arange(0, k):
|
||
|
s = np.sort(samples[i])
|
||
|
s_ssorted_right = s.searchsorted(Zstar, side='right')
|
||
|
Mij = s_ssorted_right.astype(float)
|
||
|
fij = s_ssorted_right - s.searchsorted(Zstar, 'left')
|
||
|
Mij -= fij / 2.
|
||
|
inner = lj / float(N) * (N*Mij - Bj*n[i])**2 / (Bj*(N - Bj) - N*lj/4.)
|
||
|
A2akN += inner.sum() / n[i]
|
||
|
A2akN *= (N - 1.) / N
|
||
|
return A2akN
|
||
|
|
||
|
|
||
|
def _anderson_ksamp_right(samples, Z, Zstar, k, n, N):
|
||
|
"""
|
||
|
Compute A2akN equation 6 of Scholz & Stephens.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
samples : sequence of 1-D array_like
|
||
|
Array of sample arrays.
|
||
|
Z : array_like
|
||
|
Sorted array of all observations.
|
||
|
Zstar : array_like
|
||
|
Sorted array of unique observations.
|
||
|
k : int
|
||
|
Number of samples.
|
||
|
n : array_like
|
||
|
Number of observations in each sample.
|
||
|
N : int
|
||
|
Total number of observations.
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
A2KN : float
|
||
|
The A2KN statistics of Scholz and Stephens 1987.
|
||
|
"""
|
||
|
|
||
|
A2kN = 0.
|
||
|
lj = Z.searchsorted(Zstar[:-1], 'right') - Z.searchsorted(Zstar[:-1],
|
||
|
'left')
|
||
|
Bj = lj.cumsum()
|
||
|
for i in arange(0, k):
|
||
|
s = np.sort(samples[i])
|
||
|
Mij = s.searchsorted(Zstar[:-1], side='right')
|
||
|
inner = lj / float(N) * (N * Mij - Bj * n[i])**2 / (Bj * (N - Bj))
|
||
|
A2kN += inner.sum() / n[i]
|
||
|
return A2kN
|
||
|
|
||
|
|
||
|
Anderson_ksampResult = namedtuple('Anderson_ksampResult',
|
||
|
('statistic', 'critical_values',
|
||
|
'significance_level'))
|
||
|
|
||
|
|
||
|
def anderson_ksamp(samples, midrank=True):
|
||
|
"""The Anderson-Darling test for k-samples.
|
||
|
|
||
|
The k-sample Anderson-Darling test is a modification of the
|
||
|
one-sample Anderson-Darling test. It tests the null hypothesis
|
||
|
that k-samples are drawn from the same population without having
|
||
|
to specify the distribution function of that population. The
|
||
|
critical values depend on the number of samples.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
samples : sequence of 1-D array_like
|
||
|
Array of sample data in arrays.
|
||
|
midrank : bool, optional
|
||
|
Type of Anderson-Darling test which is computed. Default
|
||
|
(True) is the midrank test applicable to continuous and
|
||
|
discrete populations. If False, the right side empirical
|
||
|
distribution is used.
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
statistic : float
|
||
|
Normalized k-sample Anderson-Darling test statistic.
|
||
|
critical_values : array
|
||
|
The critical values for significance levels 25%, 10%, 5%, 2.5%, 1%,
|
||
|
0.5%, 0.1%.
|
||
|
significance_level : float
|
||
|
An approximate significance level at which the null hypothesis for the
|
||
|
provided samples can be rejected. The value is floored / capped at
|
||
|
0.1% / 25%.
|
||
|
|
||
|
Raises
|
||
|
------
|
||
|
ValueError
|
||
|
If less than 2 samples are provided, a sample is empty, or no
|
||
|
distinct observations are in the samples.
|
||
|
|
||
|
See Also
|
||
|
--------
|
||
|
ks_2samp : 2 sample Kolmogorov-Smirnov test
|
||
|
anderson : 1 sample Anderson-Darling test
|
||
|
|
||
|
Notes
|
||
|
-----
|
||
|
[1]_ defines three versions of the k-sample Anderson-Darling test:
|
||
|
one for continuous distributions and two for discrete
|
||
|
distributions, in which ties between samples may occur. The
|
||
|
default of this routine is to compute the version based on the
|
||
|
midrank empirical distribution function. This test is applicable
|
||
|
to continuous and discrete data. If midrank is set to False, the
|
||
|
right side empirical distribution is used for a test for discrete
|
||
|
data. According to [1]_, the two discrete test statistics differ
|
||
|
only slightly if a few collisions due to round-off errors occur in
|
||
|
the test not adjusted for ties between samples.
|
||
|
|
||
|
The critical values corresponding to the significance levels from 0.01
|
||
|
to 0.25 are taken from [1]_. p-values are floored / capped
|
||
|
at 0.1% / 25%. Since the range of critical values might be extended in
|
||
|
future releases, it is recommended not to test ``p == 0.25``, but rather
|
||
|
``p >= 0.25`` (analogously for the lower bound).
|
||
|
|
||
|
.. versionadded:: 0.14.0
|
||
|
|
||
|
References
|
||
|
----------
|
||
|
.. [1] Scholz, F. W and Stephens, M. A. (1987), K-Sample
|
||
|
Anderson-Darling Tests, Journal of the American Statistical
|
||
|
Association, Vol. 82, pp. 918-924.
|
||
|
|
||
|
Examples
|
||
|
--------
|
||
|
>>> from scipy import stats
|
||
|
>>> np.random.seed(314159)
|
||
|
|
||
|
The null hypothesis that the two random samples come from the same
|
||
|
distribution can be rejected at the 5% level because the returned
|
||
|
test value is greater than the critical value for 5% (1.961) but
|
||
|
not at the 2.5% level. The interpolation gives an approximate
|
||
|
significance level of 3.2%:
|
||
|
|
||
|
>>> stats.anderson_ksamp([np.random.normal(size=50),
|
||
|
... np.random.normal(loc=0.5, size=30)])
|
||
|
(2.4615796189876105,
|
||
|
array([ 0.325, 1.226, 1.961, 2.718, 3.752, 4.592, 6.546]),
|
||
|
0.03176687568842282)
|
||
|
|
||
|
|
||
|
The null hypothesis cannot be rejected for three samples from an
|
||
|
identical distribution. The reported p-value (25%) has been capped and
|
||
|
may not be very accurate (since it corresponds to the value 0.449
|
||
|
whereas the statistic is -0.731):
|
||
|
|
||
|
>>> stats.anderson_ksamp([np.random.normal(size=50),
|
||
|
... np.random.normal(size=30), np.random.normal(size=20)])
|
||
|
(-0.73091722665244196,
|
||
|
array([ 0.44925884, 1.3052767 , 1.9434184 , 2.57696569, 3.41634856,
|
||
|
4.07210043, 5.56419101]),
|
||
|
0.25)
|
||
|
|
||
|
"""
|
||
|
k = len(samples)
|
||
|
if (k < 2):
|
||
|
raise ValueError("anderson_ksamp needs at least two samples")
|
||
|
|
||
|
samples = list(map(np.asarray, samples))
|
||
|
Z = np.sort(np.hstack(samples))
|
||
|
N = Z.size
|
||
|
Zstar = np.unique(Z)
|
||
|
if Zstar.size < 2:
|
||
|
raise ValueError("anderson_ksamp needs more than one distinct "
|
||
|
"observation")
|
||
|
|
||
|
n = np.array([sample.size for sample in samples])
|
||
|
if any(n == 0):
|
||
|
raise ValueError("anderson_ksamp encountered sample without "
|
||
|
"observations")
|
||
|
|
||
|
if midrank:
|
||
|
A2kN = _anderson_ksamp_midrank(samples, Z, Zstar, k, n, N)
|
||
|
else:
|
||
|
A2kN = _anderson_ksamp_right(samples, Z, Zstar, k, n, N)
|
||
|
|
||
|
H = (1. / n).sum()
|
||
|
hs_cs = (1. / arange(N - 1, 1, -1)).cumsum()
|
||
|
h = hs_cs[-1] + 1
|
||
|
g = (hs_cs / arange(2, N)).sum()
|
||
|
|
||
|
a = (4*g - 6) * (k - 1) + (10 - 6*g)*H
|
||
|
b = (2*g - 4)*k**2 + 8*h*k + (2*g - 14*h - 4)*H - 8*h + 4*g - 6
|
||
|
c = (6*h + 2*g - 2)*k**2 + (4*h - 4*g + 6)*k + (2*h - 6)*H + 4*h
|
||
|
d = (2*h + 6)*k**2 - 4*h*k
|
||
|
sigmasq = (a*N**3 + b*N**2 + c*N + d) / ((N - 1.) * (N - 2.) * (N - 3.))
|
||
|
m = k - 1
|
||
|
A2 = (A2kN - m) / math.sqrt(sigmasq)
|
||
|
|
||
|
# The b_i values are the interpolation coefficients from Table 2
|
||
|
# of Scholz and Stephens 1987
|
||
|
b0 = np.array([0.675, 1.281, 1.645, 1.96, 2.326, 2.573, 3.085])
|
||
|
b1 = np.array([-0.245, 0.25, 0.678, 1.149, 1.822, 2.364, 3.615])
|
||
|
b2 = np.array([-0.105, -0.305, -0.362, -0.391, -0.396, -0.345, -0.154])
|
||
|
critical = b0 + b1 / math.sqrt(m) + b2 / m
|
||
|
|
||
|
sig = np.array([0.25, 0.1, 0.05, 0.025, 0.01, 0.005, 0.001])
|
||
|
if A2 < critical.min():
|
||
|
p = sig.max()
|
||
|
warnings.warn("p-value capped: true value larger than {}".format(p),
|
||
|
stacklevel=2)
|
||
|
elif A2 > critical.max():
|
||
|
p = sig.min()
|
||
|
warnings.warn("p-value floored: true value smaller than {}".format(p),
|
||
|
stacklevel=2)
|
||
|
else:
|
||
|
# interpolation of probit of significance level
|
||
|
pf = np.polyfit(critical, log(sig), 2)
|
||
|
p = math.exp(np.polyval(pf, A2))
|
||
|
|
||
|
return Anderson_ksampResult(A2, critical, p)
|
||
|
|
||
|
|
||
|
AnsariResult = namedtuple('AnsariResult', ('statistic', 'pvalue'))
|
||
|
|
||
|
|
||
|
def ansari(x, y):
|
||
|
"""
|
||
|
Perform the Ansari-Bradley test for equal scale parameters.
|
||
|
|
||
|
The Ansari-Bradley test ([1]_, [2]_) is a non-parametric test
|
||
|
for the equality of the scale parameter of the distributions
|
||
|
from which two samples were drawn.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
x, y : array_like
|
||
|
Arrays of sample data.
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
statistic : float
|
||
|
The Ansari-Bradley test statistic.
|
||
|
pvalue : float
|
||
|
The p-value of the hypothesis test.
|
||
|
|
||
|
See Also
|
||
|
--------
|
||
|
fligner : A non-parametric test for the equality of k variances
|
||
|
mood : A non-parametric test for the equality of two scale parameters
|
||
|
|
||
|
Notes
|
||
|
-----
|
||
|
The p-value given is exact when the sample sizes are both less than
|
||
|
55 and there are no ties, otherwise a normal approximation for the
|
||
|
p-value is used.
|
||
|
|
||
|
References
|
||
|
----------
|
||
|
.. [1] Ansari, A. R. and Bradley, R. A. (1960) Rank-sum tests for
|
||
|
dispersions, Annals of Mathematical Statistics, 31, 1174-1189.
|
||
|
.. [2] Sprent, Peter and N.C. Smeeton. Applied nonparametric
|
||
|
statistical methods. 3rd ed. Chapman and Hall/CRC. 2001.
|
||
|
Section 5.8.2.
|
||
|
|
||
|
Examples
|
||
|
--------
|
||
|
>>> from scipy.stats import ansari
|
||
|
|
||
|
For these examples, we'll create three random data sets. The first
|
||
|
two, with sizes 35 and 25, are drawn from a normal distribution with
|
||
|
mean 0 and standard deviation 2. The third data set has size 25 and
|
||
|
is drawn from a normal distribution with standard deviation 1.25.
|
||
|
|
||
|
>>> np.random.seed(1234567890)
|
||
|
>>> x1 = np.random.normal(loc=0, scale=2, size=35)
|
||
|
>>> x2 = np.random.normal(loc=0, scale=2, size=25)
|
||
|
>>> x3 = np.random.normal(loc=0, scale=1.25, size=25)
|
||
|
|
||
|
First we apply `ansari` to `x1` and `x2`. These samples are drawn
|
||
|
from the same distribution, so we expect the Ansari-Bradley test
|
||
|
should not lead us to conclude that the scales of the distributions
|
||
|
are different.
|
||
|
|
||
|
>>> ansari(x1, x2)
|
||
|
AnsariResult(statistic=511.0, pvalue=0.35506083719834347)
|
||
|
|
||
|
With a p-value of 0.355, we cannot conclude that there is a
|
||
|
significant difference in the scales (as expected).
|
||
|
|
||
|
Now apply the test to `x1` and `x3`:
|
||
|
|
||
|
>>> ansari(x1, x3)
|
||
|
AnsariResult(statistic=452.0, pvalue=0.006280278681971285)
|
||
|
|
||
|
With a p-value of 0.00628, the test provides strong evidence that
|
||
|
the scales of the distributions from which the samples were drawn
|
||
|
are not equal.
|
||
|
"""
|
||
|
x, y = asarray(x), asarray(y)
|
||
|
n = len(x)
|
||
|
m = len(y)
|
||
|
if m < 1:
|
||
|
raise ValueError("Not enough other observations.")
|
||
|
if n < 1:
|
||
|
raise ValueError("Not enough test observations.")
|
||
|
|
||
|
N = m + n
|
||
|
xy = r_[x, y] # combine
|
||
|
rank = stats.rankdata(xy)
|
||
|
symrank = amin(array((rank, N - rank + 1)), 0)
|
||
|
AB = np.sum(symrank[:n], axis=0)
|
||
|
uxy = unique(xy)
|
||
|
repeats = (len(uxy) != len(xy))
|
||
|
exact = ((m < 55) and (n < 55) and not repeats)
|
||
|
if repeats and (m < 55 or n < 55):
|
||
|
warnings.warn("Ties preclude use of exact statistic.")
|
||
|
if exact:
|
||
|
astart, a1, ifault = statlib.gscale(n, m)
|
||
|
ind = AB - astart
|
||
|
total = np.sum(a1, axis=0)
|
||
|
if ind < len(a1)/2.0:
|
||
|
cind = int(ceil(ind))
|
||
|
if ind == cind:
|
||
|
pval = 2.0 * np.sum(a1[:cind+1], axis=0) / total
|
||
|
else:
|
||
|
pval = 2.0 * np.sum(a1[:cind], axis=0) / total
|
||
|
else:
|
||
|
find = int(floor(ind))
|
||
|
if ind == floor(ind):
|
||
|
pval = 2.0 * np.sum(a1[find:], axis=0) / total
|
||
|
else:
|
||
|
pval = 2.0 * np.sum(a1[find+1:], axis=0) / total
|
||
|
return AnsariResult(AB, min(1.0, pval))
|
||
|
|
||
|
# otherwise compute normal approximation
|
||
|
if N % 2: # N odd
|
||
|
mnAB = n * (N+1.0)**2 / 4.0 / N
|
||
|
varAB = n * m * (N+1.0) * (3+N**2) / (48.0 * N**2)
|
||
|
else:
|
||
|
mnAB = n * (N+2.0) / 4.0
|
||
|
varAB = m * n * (N+2) * (N-2.0) / 48 / (N-1.0)
|
||
|
if repeats: # adjust variance estimates
|
||
|
# compute np.sum(tj * rj**2,axis=0)
|
||
|
fac = np.sum(symrank**2, axis=0)
|
||
|
if N % 2: # N odd
|
||
|
varAB = m * n * (16*N*fac - (N+1)**4) / (16.0 * N**2 * (N-1))
|
||
|
else: # N even
|
||
|
varAB = m * n * (16*fac - N*(N+2)**2) / (16.0 * N * (N-1))
|
||
|
|
||
|
z = (AB - mnAB) / sqrt(varAB)
|
||
|
pval = distributions.norm.sf(abs(z)) * 2.0
|
||
|
return AnsariResult(AB, pval)
|
||
|
|
||
|
|
||
|
BartlettResult = namedtuple('BartlettResult', ('statistic', 'pvalue'))
|
||
|
|
||
|
|
||
|
def bartlett(*args):
|
||
|
"""
|
||
|
Perform Bartlett's test for equal variances.
|
||
|
|
||
|
Bartlett's test tests the null hypothesis that all input samples
|
||
|
are from populations with equal variances. For samples
|
||
|
from significantly non-normal populations, Levene's test
|
||
|
`levene` is more robust.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
sample1, sample2,... : array_like
|
||
|
arrays of sample data. Only 1d arrays are accepted, they may have
|
||
|
different lengths.
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
statistic : float
|
||
|
The test statistic.
|
||
|
pvalue : float
|
||
|
The p-value of the test.
|
||
|
|
||
|
See Also
|
||
|
--------
|
||
|
fligner : A non-parametric test for the equality of k variances
|
||
|
levene : A robust parametric test for equality of k variances
|
||
|
|
||
|
Notes
|
||
|
-----
|
||
|
Conover et al. (1981) examine many of the existing parametric and
|
||
|
nonparametric tests by extensive simulations and they conclude that the
|
||
|
tests proposed by Fligner and Killeen (1976) and Levene (1960) appear to be
|
||
|
superior in terms of robustness of departures from normality and power
|
||
|
([3]_).
|
||
|
|
||
|
References
|
||
|
----------
|
||
|
.. [1] https://www.itl.nist.gov/div898/handbook/eda/section3/eda357.htm
|
||
|
|
||
|
.. [2] Snedecor, George W. and Cochran, William G. (1989), Statistical
|
||
|
Methods, Eighth Edition, Iowa State University Press.
|
||
|
|
||
|
.. [3] Park, C. and Lindsay, B. G. (1999). Robust Scale Estimation and
|
||
|
Hypothesis Testing based on Quadratic Inference Function. Technical
|
||
|
Report #99-03, Center for Likelihood Studies, Pennsylvania State
|
||
|
University.
|
||
|
|
||
|
.. [4] Bartlett, M. S. (1937). Properties of Sufficiency and Statistical
|
||
|
Tests. Proceedings of the Royal Society of London. Series A,
|
||
|
Mathematical and Physical Sciences, Vol. 160, No.901, pp. 268-282.
|
||
|
|
||
|
Examples
|
||
|
--------
|
||
|
Test whether or not the lists `a`, `b` and `c` come from populations
|
||
|
with equal variances.
|
||
|
|
||
|
>>> from scipy.stats import bartlett
|
||
|
>>> a = [8.88, 9.12, 9.04, 8.98, 9.00, 9.08, 9.01, 8.85, 9.06, 8.99]
|
||
|
>>> b = [8.88, 8.95, 9.29, 9.44, 9.15, 9.58, 8.36, 9.18, 8.67, 9.05]
|
||
|
>>> c = [8.95, 9.12, 8.95, 8.85, 9.03, 8.84, 9.07, 8.98, 8.86, 8.98]
|
||
|
>>> stat, p = bartlett(a, b, c)
|
||
|
>>> p
|
||
|
1.1254782518834628e-05
|
||
|
|
||
|
The very small p-value suggests that the populations do not have equal
|
||
|
variances.
|
||
|
|
||
|
This is not surprising, given that the sample variance of `b` is much
|
||
|
larger than that of `a` and `c`:
|
||
|
|
||
|
>>> [np.var(x, ddof=1) for x in [a, b, c]]
|
||
|
[0.007054444444444413, 0.13073888888888888, 0.008890000000000002]
|
||
|
"""
|
||
|
# Handle empty input and input that is not 1d
|
||
|
for a in args:
|
||
|
if np.asanyarray(a).size == 0:
|
||
|
return BartlettResult(np.nan, np.nan)
|
||
|
if np.asanyarray(a).ndim > 1:
|
||
|
raise ValueError('Samples must be one-dimensional.')
|
||
|
|
||
|
k = len(args)
|
||
|
if k < 2:
|
||
|
raise ValueError("Must enter at least two input sample vectors.")
|
||
|
Ni = np.empty(k)
|
||
|
ssq = np.empty(k, 'd')
|
||
|
for j in range(k):
|
||
|
Ni[j] = len(args[j])
|
||
|
ssq[j] = np.var(args[j], ddof=1)
|
||
|
Ntot = np.sum(Ni, axis=0)
|
||
|
spsq = np.sum((Ni - 1)*ssq, axis=0) / (1.0*(Ntot - k))
|
||
|
numer = (Ntot*1.0 - k) * log(spsq) - np.sum((Ni - 1.0)*log(ssq), axis=0)
|
||
|
denom = 1.0 + 1.0/(3*(k - 1)) * ((np.sum(1.0/(Ni - 1.0), axis=0)) -
|
||
|
1.0/(Ntot - k))
|
||
|
T = numer / denom
|
||
|
pval = distributions.chi2.sf(T, k - 1) # 1 - cdf
|
||
|
|
||
|
return BartlettResult(T, pval)
|
||
|
|
||
|
|
||
|
LeveneResult = namedtuple('LeveneResult', ('statistic', 'pvalue'))
|
||
|
|
||
|
|
||
|
def levene(*args, center='median', proportiontocut=0.05):
|
||
|
"""
|
||
|
Perform Levene test for equal variances.
|
||
|
|
||
|
The Levene test tests the null hypothesis that all input samples
|
||
|
are from populations with equal variances. Levene's test is an
|
||
|
alternative to Bartlett's test `bartlett` in the case where
|
||
|
there are significant deviations from normality.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
sample1, sample2, ... : array_like
|
||
|
The sample data, possibly with different lengths. Only one-dimensional
|
||
|
samples are accepted.
|
||
|
center : {'mean', 'median', 'trimmed'}, optional
|
||
|
Which function of the data to use in the test. The default
|
||
|
is 'median'.
|
||
|
proportiontocut : float, optional
|
||
|
When `center` is 'trimmed', this gives the proportion of data points
|
||
|
to cut from each end. (See `scipy.stats.trim_mean`.)
|
||
|
Default is 0.05.
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
statistic : float
|
||
|
The test statistic.
|
||
|
pvalue : float
|
||
|
The p-value for the test.
|
||
|
|
||
|
Notes
|
||
|
-----
|
||
|
Three variations of Levene's test are possible. The possibilities
|
||
|
and their recommended usages are:
|
||
|
|
||
|
* 'median' : Recommended for skewed (non-normal) distributions>
|
||
|
* 'mean' : Recommended for symmetric, moderate-tailed distributions.
|
||
|
* 'trimmed' : Recommended for heavy-tailed distributions.
|
||
|
|
||
|
The test version using the mean was proposed in the original article
|
||
|
of Levene ([2]_) while the median and trimmed mean have been studied by
|
||
|
Brown and Forsythe ([3]_), sometimes also referred to as Brown-Forsythe
|
||
|
test.
|
||
|
|
||
|
References
|
||
|
----------
|
||
|
.. [1] https://www.itl.nist.gov/div898/handbook/eda/section3/eda35a.htm
|
||
|
.. [2] Levene, H. (1960). In Contributions to Probability and Statistics:
|
||
|
Essays in Honor of Harold Hotelling, I. Olkin et al. eds.,
|
||
|
Stanford University Press, pp. 278-292.
|
||
|
.. [3] Brown, M. B. and Forsythe, A. B. (1974), Journal of the American
|
||
|
Statistical Association, 69, 364-367
|
||
|
|
||
|
Examples
|
||
|
--------
|
||
|
Test whether or not the lists `a`, `b` and `c` come from populations
|
||
|
with equal variances.
|
||
|
|
||
|
>>> from scipy.stats import levene
|
||
|
>>> a = [8.88, 9.12, 9.04, 8.98, 9.00, 9.08, 9.01, 8.85, 9.06, 8.99]
|
||
|
>>> b = [8.88, 8.95, 9.29, 9.44, 9.15, 9.58, 8.36, 9.18, 8.67, 9.05]
|
||
|
>>> c = [8.95, 9.12, 8.95, 8.85, 9.03, 8.84, 9.07, 8.98, 8.86, 8.98]
|
||
|
>>> stat, p = levene(a, b, c)
|
||
|
>>> p
|
||
|
0.002431505967249681
|
||
|
|
||
|
The small p-value suggests that the populations do not have equal
|
||
|
variances.
|
||
|
|
||
|
This is not surprising, given that the sample variance of `b` is much
|
||
|
larger than that of `a` and `c`:
|
||
|
|
||
|
>>> [np.var(x, ddof=1) for x in [a, b, c]]
|
||
|
[0.007054444444444413, 0.13073888888888888, 0.008890000000000002]
|
||
|
"""
|
||
|
if center not in ['mean', 'median', 'trimmed']:
|
||
|
raise ValueError("center must be 'mean', 'median' or 'trimmed'.")
|
||
|
|
||
|
k = len(args)
|
||
|
if k < 2:
|
||
|
raise ValueError("Must enter at least two input sample vectors.")
|
||
|
# check for 1d input
|
||
|
for j in range(k):
|
||
|
if np.asanyarray(args[j]).ndim > 1:
|
||
|
raise ValueError('Samples must be one-dimensional.')
|
||
|
|
||
|
Ni = np.empty(k)
|
||
|
Yci = np.empty(k, 'd')
|
||
|
|
||
|
if center == 'median':
|
||
|
func = lambda x: np.median(x, axis=0)
|
||
|
elif center == 'mean':
|
||
|
func = lambda x: np.mean(x, axis=0)
|
||
|
else: # center == 'trimmed'
|
||
|
args = tuple(stats.trimboth(np.sort(arg), proportiontocut)
|
||
|
for arg in args)
|
||
|
func = lambda x: np.mean(x, axis=0)
|
||
|
|
||
|
for j in range(k):
|
||
|
Ni[j] = len(args[j])
|
||
|
Yci[j] = func(args[j])
|
||
|
Ntot = np.sum(Ni, axis=0)
|
||
|
|
||
|
# compute Zij's
|
||
|
Zij = [None] * k
|
||
|
for i in range(k):
|
||
|
Zij[i] = abs(asarray(args[i]) - Yci[i])
|
||
|
|
||
|
# compute Zbari
|
||
|
Zbari = np.empty(k, 'd')
|
||
|
Zbar = 0.0
|
||
|
for i in range(k):
|
||
|
Zbari[i] = np.mean(Zij[i], axis=0)
|
||
|
Zbar += Zbari[i] * Ni[i]
|
||
|
|
||
|
Zbar /= Ntot
|
||
|
numer = (Ntot - k) * np.sum(Ni * (Zbari - Zbar)**2, axis=0)
|
||
|
|
||
|
# compute denom_variance
|
||
|
dvar = 0.0
|
||
|
for i in range(k):
|
||
|
dvar += np.sum((Zij[i] - Zbari[i])**2, axis=0)
|
||
|
|
||
|
denom = (k - 1.0) * dvar
|
||
|
|
||
|
W = numer / denom
|
||
|
pval = distributions.f.sf(W, k-1, Ntot-k) # 1 - cdf
|
||
|
return LeveneResult(W, pval)
|
||
|
|
||
|
|
||
|
def binom_test(x, n=None, p=0.5, alternative='two-sided'):
|
||
|
"""
|
||
|
Perform a test that the probability of success is p.
|
||
|
|
||
|
This is an exact, two-sided test of the null hypothesis
|
||
|
that the probability of success in a Bernoulli experiment
|
||
|
is `p`.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
x : int or array_like
|
||
|
The number of successes, or if x has length 2, it is the
|
||
|
number of successes and the number of failures.
|
||
|
n : int
|
||
|
The number of trials. This is ignored if x gives both the
|
||
|
number of successes and failures.
|
||
|
p : float, optional
|
||
|
The hypothesized probability of success. ``0 <= p <= 1``. The
|
||
|
default value is ``p = 0.5``.
|
||
|
alternative : {'two-sided', 'greater', 'less'}, optional
|
||
|
Indicates the alternative hypothesis. The default value is
|
||
|
'two-sided'.
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
p-value : float
|
||
|
The p-value of the hypothesis test.
|
||
|
|
||
|
References
|
||
|
----------
|
||
|
.. [1] https://en.wikipedia.org/wiki/Binomial_test
|
||
|
|
||
|
Examples
|
||
|
--------
|
||
|
>>> from scipy import stats
|
||
|
|
||
|
A car manufacturer claims that no more than 10% of their cars are unsafe.
|
||
|
15 cars are inspected for safety, 3 were found to be unsafe. Test the
|
||
|
manufacturer's claim:
|
||
|
|
||
|
>>> stats.binom_test(3, n=15, p=0.1, alternative='greater')
|
||
|
0.18406106910639114
|
||
|
|
||
|
The null hypothesis cannot be rejected at the 5% level of significance
|
||
|
because the returned p-value is greater than the critical value of 5%.
|
||
|
|
||
|
"""
|
||
|
x = atleast_1d(x).astype(np.int_)
|
||
|
if len(x) == 2:
|
||
|
n = x[1] + x[0]
|
||
|
x = x[0]
|
||
|
elif len(x) == 1:
|
||
|
x = x[0]
|
||
|
if n is None or n < x:
|
||
|
raise ValueError("n must be >= x")
|
||
|
n = np.int_(n)
|
||
|
else:
|
||
|
raise ValueError("Incorrect length for x.")
|
||
|
|
||
|
if (p > 1.0) or (p < 0.0):
|
||
|
raise ValueError("p must be in range [0,1]")
|
||
|
|
||
|
if alternative not in ('two-sided', 'less', 'greater'):
|
||
|
raise ValueError("alternative not recognized\n"
|
||
|
"should be 'two-sided', 'less' or 'greater'")
|
||
|
|
||
|
if alternative == 'less':
|
||
|
pval = distributions.binom.cdf(x, n, p)
|
||
|
return pval
|
||
|
|
||
|
if alternative == 'greater':
|
||
|
pval = distributions.binom.sf(x-1, n, p)
|
||
|
return pval
|
||
|
|
||
|
# if alternative was neither 'less' nor 'greater', then it's 'two-sided'
|
||
|
d = distributions.binom.pmf(x, n, p)
|
||
|
rerr = 1 + 1e-7
|
||
|
if x == p * n:
|
||
|
# special case as shortcut, would also be handled by `else` below
|
||
|
pval = 1.
|
||
|
elif x < p * n:
|
||
|
i = np.arange(np.ceil(p * n), n+1)
|
||
|
y = np.sum(distributions.binom.pmf(i, n, p) <= d*rerr, axis=0)
|
||
|
pval = (distributions.binom.cdf(x, n, p) +
|
||
|
distributions.binom.sf(n - y, n, p))
|
||
|
else:
|
||
|
i = np.arange(np.floor(p*n) + 1)
|
||
|
y = np.sum(distributions.binom.pmf(i, n, p) <= d*rerr, axis=0)
|
||
|
pval = (distributions.binom.cdf(y-1, n, p) +
|
||
|
distributions.binom.sf(x-1, n, p))
|
||
|
|
||
|
return min(1.0, pval)
|
||
|
|
||
|
|
||
|
def _apply_func(x, g, func):
|
||
|
# g is list of indices into x
|
||
|
# separating x into different groups
|
||
|
# func should be applied over the groups
|
||
|
g = unique(r_[0, g, len(x)])
|
||
|
output = [func(x[g[k]:g[k+1]]) for k in range(len(g) - 1)]
|
||
|
|
||
|
return asarray(output)
|
||
|
|
||
|
|
||
|
FlignerResult = namedtuple('FlignerResult', ('statistic', 'pvalue'))
|
||
|
|
||
|
|
||
|
def fligner(*args, center='median', proportiontocut=0.05):
|
||
|
"""
|
||
|
Perform Fligner-Killeen test for equality of variance.
|
||
|
|
||
|
Fligner's test tests the null hypothesis that all input samples
|
||
|
are from populations with equal variances. Fligner-Killeen's test is
|
||
|
distribution free when populations are identical [2]_.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
sample1, sample2, ... : array_like
|
||
|
Arrays of sample data. Need not be the same length.
|
||
|
center : {'mean', 'median', 'trimmed'}, optional
|
||
|
Keyword argument controlling which function of the data is used in
|
||
|
computing the test statistic. The default is 'median'.
|
||
|
proportiontocut : float, optional
|
||
|
When `center` is 'trimmed', this gives the proportion of data points
|
||
|
to cut from each end. (See `scipy.stats.trim_mean`.)
|
||
|
Default is 0.05.
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
statistic : float
|
||
|
The test statistic.
|
||
|
pvalue : float
|
||
|
The p-value for the hypothesis test.
|
||
|
|
||
|
See Also
|
||
|
--------
|
||
|
bartlett : A parametric test for equality of k variances in normal samples
|
||
|
levene : A robust parametric test for equality of k variances
|
||
|
|
||
|
Notes
|
||
|
-----
|
||
|
As with Levene's test there are three variants of Fligner's test that
|
||
|
differ by the measure of central tendency used in the test. See `levene`
|
||
|
for more information.
|
||
|
|
||
|
Conover et al. (1981) examine many of the existing parametric and
|
||
|
nonparametric tests by extensive simulations and they conclude that the
|
||
|
tests proposed by Fligner and Killeen (1976) and Levene (1960) appear to be
|
||
|
superior in terms of robustness of departures from normality and power [3]_.
|
||
|
|
||
|
References
|
||
|
----------
|
||
|
.. [1] Park, C. and Lindsay, B. G. (1999). Robust Scale Estimation and
|
||
|
Hypothesis Testing based on Quadratic Inference Function. Technical
|
||
|
Report #99-03, Center for Likelihood Studies, Pennsylvania State
|
||
|
University.
|
||
|
https://cecas.clemson.edu/~cspark/cv/paper/qif/draftqif2.pdf
|
||
|
|
||
|
.. [2] Fligner, M.A. and Killeen, T.J. (1976). Distribution-free two-sample
|
||
|
tests for scale. 'Journal of the American Statistical Association.'
|
||
|
71(353), 210-213.
|
||
|
|
||
|
.. [3] Park, C. and Lindsay, B. G. (1999). Robust Scale Estimation and
|
||
|
Hypothesis Testing based on Quadratic Inference Function. Technical
|
||
|
Report #99-03, Center for Likelihood Studies, Pennsylvania State
|
||
|
University.
|
||
|
|
||
|
.. [4] Conover, W. J., Johnson, M. E. and Johnson M. M. (1981). A
|
||
|
comparative study of tests for homogeneity of variances, with
|
||
|
applications to the outer continental shelf biding data.
|
||
|
Technometrics, 23(4), 351-361.
|
||
|
|
||
|
Examples
|
||
|
--------
|
||
|
Test whether or not the lists `a`, `b` and `c` come from populations
|
||
|
with equal variances.
|
||
|
|
||
|
>>> from scipy.stats import fligner
|
||
|
>>> a = [8.88, 9.12, 9.04, 8.98, 9.00, 9.08, 9.01, 8.85, 9.06, 8.99]
|
||
|
>>> b = [8.88, 8.95, 9.29, 9.44, 9.15, 9.58, 8.36, 9.18, 8.67, 9.05]
|
||
|
>>> c = [8.95, 9.12, 8.95, 8.85, 9.03, 8.84, 9.07, 8.98, 8.86, 8.98]
|
||
|
>>> stat, p = fligner(a, b, c)
|
||
|
>>> p
|
||
|
0.00450826080004775
|
||
|
|
||
|
The small p-value suggests that the populations do not have equal
|
||
|
variances.
|
||
|
|
||
|
This is not surprising, given that the sample variance of `b` is much
|
||
|
larger than that of `a` and `c`:
|
||
|
|
||
|
>>> [np.var(x, ddof=1) for x in [a, b, c]]
|
||
|
[0.007054444444444413, 0.13073888888888888, 0.008890000000000002]
|
||
|
"""
|
||
|
if center not in ['mean', 'median', 'trimmed']:
|
||
|
raise ValueError("center must be 'mean', 'median' or 'trimmed'.")
|
||
|
|
||
|
# Handle empty input
|
||
|
for a in args:
|
||
|
if np.asanyarray(a).size == 0:
|
||
|
return FlignerResult(np.nan, np.nan)
|
||
|
|
||
|
k = len(args)
|
||
|
if k < 2:
|
||
|
raise ValueError("Must enter at least two input sample vectors.")
|
||
|
|
||
|
if center == 'median':
|
||
|
func = lambda x: np.median(x, axis=0)
|
||
|
elif center == 'mean':
|
||
|
func = lambda x: np.mean(x, axis=0)
|
||
|
else: # center == 'trimmed'
|
||
|
args = tuple(stats.trimboth(arg, proportiontocut) for arg in args)
|
||
|
func = lambda x: np.mean(x, axis=0)
|
||
|
|
||
|
Ni = asarray([len(args[j]) for j in range(k)])
|
||
|
Yci = asarray([func(args[j]) for j in range(k)])
|
||
|
Ntot = np.sum(Ni, axis=0)
|
||
|
# compute Zij's
|
||
|
Zij = [abs(asarray(args[i]) - Yci[i]) for i in range(k)]
|
||
|
allZij = []
|
||
|
g = [0]
|
||
|
for i in range(k):
|
||
|
allZij.extend(list(Zij[i]))
|
||
|
g.append(len(allZij))
|
||
|
|
||
|
ranks = stats.rankdata(allZij)
|
||
|
a = distributions.norm.ppf(ranks / (2*(Ntot + 1.0)) + 0.5)
|
||
|
|
||
|
# compute Aibar
|
||
|
Aibar = _apply_func(a, g, np.sum) / Ni
|
||
|
anbar = np.mean(a, axis=0)
|
||
|
varsq = np.var(a, axis=0, ddof=1)
|
||
|
Xsq = np.sum(Ni * (asarray(Aibar) - anbar)**2.0, axis=0) / varsq
|
||
|
pval = distributions.chi2.sf(Xsq, k - 1) # 1 - cdf
|
||
|
return FlignerResult(Xsq, pval)
|
||
|
|
||
|
|
||
|
def mood(x, y, axis=0):
|
||
|
"""
|
||
|
Perform Mood's test for equal scale parameters.
|
||
|
|
||
|
Mood's two-sample test for scale parameters is a non-parametric
|
||
|
test for the null hypothesis that two samples are drawn from the
|
||
|
same distribution with the same scale parameter.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
x, y : array_like
|
||
|
Arrays of sample data.
|
||
|
axis : int, optional
|
||
|
The axis along which the samples are tested. `x` and `y` can be of
|
||
|
different length along `axis`.
|
||
|
If `axis` is None, `x` and `y` are flattened and the test is done on
|
||
|
all values in the flattened arrays.
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
z : scalar or ndarray
|
||
|
The z-score for the hypothesis test. For 1-D inputs a scalar is
|
||
|
returned.
|
||
|
p-value : scalar ndarray
|
||
|
The p-value for the hypothesis test.
|
||
|
|
||
|
See Also
|
||
|
--------
|
||
|
fligner : A non-parametric test for the equality of k variances
|
||
|
ansari : A non-parametric test for the equality of 2 variances
|
||
|
bartlett : A parametric test for equality of k variances in normal samples
|
||
|
levene : A parametric test for equality of k variances
|
||
|
|
||
|
Notes
|
||
|
-----
|
||
|
The data are assumed to be drawn from probability distributions ``f(x)``
|
||
|
and ``f(x/s) / s`` respectively, for some probability density function f.
|
||
|
The null hypothesis is that ``s == 1``.
|
||
|
|
||
|
For multi-dimensional arrays, if the inputs are of shapes
|
||
|
``(n0, n1, n2, n3)`` and ``(n0, m1, n2, n3)``, then if ``axis=1``, the
|
||
|
resulting z and p values will have shape ``(n0, n2, n3)``. Note that
|
||
|
``n1`` and ``m1`` don't have to be equal, but the other dimensions do.
|
||
|
|
||
|
Examples
|
||
|
--------
|
||
|
>>> from scipy import stats
|
||
|
>>> np.random.seed(1234)
|
||
|
>>> x2 = np.random.randn(2, 45, 6, 7)
|
||
|
>>> x1 = np.random.randn(2, 30, 6, 7)
|
||
|
>>> z, p = stats.mood(x1, x2, axis=1)
|
||
|
>>> p.shape
|
||
|
(2, 6, 7)
|
||
|
|
||
|
Find the number of points where the difference in scale is not significant:
|
||
|
|
||
|
>>> (p > 0.1).sum()
|
||
|
74
|
||
|
|
||
|
Perform the test with different scales:
|
||
|
|
||
|
>>> x1 = np.random.randn(2, 30)
|
||
|
>>> x2 = np.random.randn(2, 35) * 10.0
|
||
|
>>> stats.mood(x1, x2, axis=1)
|
||
|
(array([-5.7178125 , -5.25342163]), array([ 1.07904114e-08, 1.49299218e-07]))
|
||
|
|
||
|
"""
|
||
|
x = np.asarray(x, dtype=float)
|
||
|
y = np.asarray(y, dtype=float)
|
||
|
|
||
|
if axis is None:
|
||
|
x = x.flatten()
|
||
|
y = y.flatten()
|
||
|
axis = 0
|
||
|
|
||
|
# Determine shape of the result arrays
|
||
|
res_shape = tuple([x.shape[ax] for ax in range(len(x.shape)) if ax != axis])
|
||
|
if not (res_shape == tuple([y.shape[ax] for ax in range(len(y.shape)) if
|
||
|
ax != axis])):
|
||
|
raise ValueError("Dimensions of x and y on all axes except `axis` "
|
||
|
"should match")
|
||
|
|
||
|
n = x.shape[axis]
|
||
|
m = y.shape[axis]
|
||
|
N = m + n
|
||
|
if N < 3:
|
||
|
raise ValueError("Not enough observations.")
|
||
|
|
||
|
xy = np.concatenate((x, y), axis=axis)
|
||
|
if axis != 0:
|
||
|
xy = np.rollaxis(xy, axis)
|
||
|
|
||
|
xy = xy.reshape(xy.shape[0], -1)
|
||
|
|
||
|
# Generalized to the n-dimensional case by adding the axis argument, and
|
||
|
# using for loops, since rankdata is not vectorized. For improving
|
||
|
# performance consider vectorizing rankdata function.
|
||
|
all_ranks = np.empty_like(xy)
|
||
|
for j in range(xy.shape[1]):
|
||
|
all_ranks[:, j] = stats.rankdata(xy[:, j])
|
||
|
|
||
|
Ri = all_ranks[:n]
|
||
|
M = np.sum((Ri - (N + 1.0) / 2)**2, axis=0)
|
||
|
# Approx stat.
|
||
|
mnM = n * (N * N - 1.0) / 12
|
||
|
varM = m * n * (N + 1.0) * (N + 2) * (N - 2) / 180
|
||
|
z = (M - mnM) / sqrt(varM)
|
||
|
|
||
|
# sf for right tail, cdf for left tail. Factor 2 for two-sidedness
|
||
|
z_pos = z > 0
|
||
|
pval = np.zeros_like(z)
|
||
|
pval[z_pos] = 2 * distributions.norm.sf(z[z_pos])
|
||
|
pval[~z_pos] = 2 * distributions.norm.cdf(z[~z_pos])
|
||
|
|
||
|
if res_shape == ():
|
||
|
# Return scalars, not 0-D arrays
|
||
|
z = z[0]
|
||
|
pval = pval[0]
|
||
|
else:
|
||
|
z.shape = res_shape
|
||
|
pval.shape = res_shape
|
||
|
|
||
|
return z, pval
|
||
|
|
||
|
|
||
|
WilcoxonResult = namedtuple('WilcoxonResult', ('statistic', 'pvalue'))
|
||
|
|
||
|
|
||
|
def wilcoxon(x, y=None, zero_method="wilcox", correction=False,
|
||
|
alternative="two-sided", mode='auto'):
|
||
|
"""
|
||
|
Calculate the Wilcoxon signed-rank test.
|
||
|
|
||
|
The Wilcoxon signed-rank test tests the null hypothesis that two
|
||
|
related paired samples come from the same distribution. In particular,
|
||
|
it tests whether the distribution of the differences x - y is symmetric
|
||
|
about zero. It is a non-parametric version of the paired T-test.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
x : array_like
|
||
|
Either the first set of measurements (in which case ``y`` is the second
|
||
|
set of measurements), or the differences between two sets of
|
||
|
measurements (in which case ``y`` is not to be specified.) Must be
|
||
|
one-dimensional.
|
||
|
y : array_like, optional
|
||
|
Either the second set of measurements (if ``x`` is the first set of
|
||
|
measurements), or not specified (if ``x`` is the differences between
|
||
|
two sets of measurements.) Must be one-dimensional.
|
||
|
zero_method : {"pratt", "wilcox", "zsplit"}, optional
|
||
|
The following options are available (default is "wilcox"):
|
||
|
|
||
|
* "pratt": Includes zero-differences in the ranking process,
|
||
|
but drops the ranks of the zeros, see [4]_, (more conservative).
|
||
|
* "wilcox": Discards all zero-differences, the default.
|
||
|
* "zsplit": Includes zero-differences in the ranking process and
|
||
|
split the zero rank between positive and negative ones.
|
||
|
correction : bool, optional
|
||
|
If True, apply continuity correction by adjusting the Wilcoxon rank
|
||
|
statistic by 0.5 towards the mean value when computing the
|
||
|
z-statistic if a normal approximation is used. Default is False.
|
||
|
alternative : {"two-sided", "greater", "less"}, optional
|
||
|
The alternative hypothesis to be tested, see Notes. Default is
|
||
|
"two-sided".
|
||
|
mode : {"auto", "exact", "approx"}
|
||
|
Method to calculate the p-value, see Notes. Default is "auto".
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
statistic : float
|
||
|
If ``alternative`` is "two-sided", the sum of the ranks of the
|
||
|
differences above or below zero, whichever is smaller.
|
||
|
Otherwise the sum of the ranks of the differences above zero.
|
||
|
pvalue : float
|
||
|
The p-value for the test depending on ``alternative`` and ``mode``.
|
||
|
|
||
|
See Also
|
||
|
--------
|
||
|
kruskal, mannwhitneyu
|
||
|
|
||
|
Notes
|
||
|
-----
|
||
|
The test has been introduced in [4]_. Given n independent samples
|
||
|
(xi, yi) from a bivariate distribution (i.e. paired samples),
|
||
|
it computes the differences di = xi - yi. One assumption of the test
|
||
|
is that the differences are symmetric, see [2]_.
|
||
|
The two-sided test has the null hypothesis that the median of the
|
||
|
differences is zero against the alternative that it is different from
|
||
|
zero. The one-sided test has the null hypothesis that the median is
|
||
|
positive against the alternative that it is negative
|
||
|
(``alternative == 'less'``), or vice versa (``alternative == 'greater.'``).
|
||
|
|
||
|
To derive the p-value, the exact distribution (``mode == 'exact'``)
|
||
|
can be used for sample sizes of up to 25. The default ``mode == 'auto'``
|
||
|
uses the exact distribution if there are at most 25 observations and no
|
||
|
ties, otherwise a normal approximation is used (``mode == 'approx'``).
|
||
|
|
||
|
The treatment of ties can be controlled by the parameter `zero_method`.
|
||
|
If ``zero_method == 'pratt'``, the normal approximation is adjusted as in
|
||
|
[5]_. A typical rule is to require that n > 20 ([2]_, p. 383).
|
||
|
|
||
|
References
|
||
|
----------
|
||
|
.. [1] https://en.wikipedia.org/wiki/Wilcoxon_signed-rank_test
|
||
|
.. [2] Conover, W.J., Practical Nonparametric Statistics, 1971.
|
||
|
.. [3] Pratt, J.W., Remarks on Zeros and Ties in the Wilcoxon Signed
|
||
|
Rank Procedures, Journal of the American Statistical Association,
|
||
|
Vol. 54, 1959, pp. 655-667. :doi:`10.1080/01621459.1959.10501526`
|
||
|
.. [4] Wilcoxon, F., Individual Comparisons by Ranking Methods,
|
||
|
Biometrics Bulletin, Vol. 1, 1945, pp. 80-83. :doi:`10.2307/3001968`
|
||
|
.. [5] Cureton, E.E., The Normal Approximation to the Signed-Rank
|
||
|
Sampling Distribution When Zero Differences are Present,
|
||
|
Journal of the American Statistical Association, Vol. 62, 1967,
|
||
|
pp. 1068-1069. :doi:`10.1080/01621459.1967.10500917`
|
||
|
|
||
|
Examples
|
||
|
--------
|
||
|
In [4]_, the differences in height between cross- and self-fertilized
|
||
|
corn plants is given as follows:
|
||
|
|
||
|
>>> d = [6, 8, 14, 16, 23, 24, 28, 29, 41, -48, 49, 56, 60, -67, 75]
|
||
|
|
||
|
Cross-fertilized plants appear to be be higher. To test the null
|
||
|
hypothesis that there is no height difference, we can apply the
|
||
|
two-sided test:
|
||
|
|
||
|
>>> from scipy.stats import wilcoxon
|
||
|
>>> w, p = wilcoxon(d)
|
||
|
>>> w, p
|
||
|
(24.0, 0.041259765625)
|
||
|
|
||
|
Hence, we would reject the null hypothesis at a confidence level of 5%,
|
||
|
concluding that there is a difference in height between the groups.
|
||
|
To confirm that the median of the differences can be assumed to be
|
||
|
positive, we use:
|
||
|
|
||
|
>>> w, p = wilcoxon(d, alternative='greater')
|
||
|
>>> w, p
|
||
|
(96.0, 0.0206298828125)
|
||
|
|
||
|
This shows that the null hypothesis that the median is negative can be
|
||
|
rejected at a confidence level of 5% in favor of the alternative that
|
||
|
the median is greater than zero. The p-values above are exact. Using the
|
||
|
normal approximation gives very similar values:
|
||
|
|
||
|
>>> w, p = wilcoxon(d, mode='approx')
|
||
|
>>> w, p
|
||
|
(24.0, 0.04088813291185591)
|
||
|
|
||
|
Note that the statistic changed to 96 in the one-sided case (the sum
|
||
|
of ranks of positive differences) whereas it is 24 in the two-sided
|
||
|
case (the minimum of sum of ranks above and below zero).
|
||
|
|
||
|
"""
|
||
|
if mode not in ["auto", "approx", "exact"]:
|
||
|
raise ValueError("mode must be either 'auto', 'approx' or 'exact'")
|
||
|
|
||
|
if zero_method not in ["wilcox", "pratt", "zsplit"]:
|
||
|
raise ValueError("Zero method must be either 'wilcox' "
|
||
|
"or 'pratt' or 'zsplit'")
|
||
|
|
||
|
if alternative not in ["two-sided", "less", "greater"]:
|
||
|
raise ValueError("Alternative must be either 'two-sided', "
|
||
|
"'greater' or 'less'")
|
||
|
|
||
|
if y is None:
|
||
|
d = asarray(x)
|
||
|
if d.ndim > 1:
|
||
|
raise ValueError('Sample x must be one-dimensional.')
|
||
|
else:
|
||
|
x, y = map(asarray, (x, y))
|
||
|
if x.ndim > 1 or y.ndim > 1:
|
||
|
raise ValueError('Samples x and y must be one-dimensional.')
|
||
|
if len(x) != len(y):
|
||
|
raise ValueError('The samples x and y must have the same length.')
|
||
|
d = x - y
|
||
|
|
||
|
if mode == "auto":
|
||
|
if len(d) <= 25:
|
||
|
mode = "exact"
|
||
|
else:
|
||
|
mode = "approx"
|
||
|
|
||
|
n_zero = np.sum(d == 0)
|
||
|
if n_zero > 0 and mode == "exact":
|
||
|
mode = "approx"
|
||
|
warnings.warn("Exact p-value calculation does not work if there are "
|
||
|
"ties. Switching to normal approximation.")
|
||
|
|
||
|
if mode == "approx":
|
||
|
if zero_method in ["wilcox", "pratt"]:
|
||
|
if n_zero == len(d):
|
||
|
raise ValueError("zero_method 'wilcox' and 'pratt' do not "
|
||
|
"work if x - y is zero for all elements.")
|
||
|
if zero_method == "wilcox":
|
||
|
# Keep all non-zero differences
|
||
|
d = compress(np.not_equal(d, 0), d)
|
||
|
|
||
|
count = len(d)
|
||
|
if count < 10 and mode == "approx":
|
||
|
warnings.warn("Sample size too small for normal approximation.")
|
||
|
|
||
|
r = stats.rankdata(abs(d))
|
||
|
r_plus = np.sum((d > 0) * r)
|
||
|
r_minus = np.sum((d < 0) * r)
|
||
|
|
||
|
if zero_method == "zsplit":
|
||
|
r_zero = np.sum((d == 0) * r)
|
||
|
r_plus += r_zero / 2.
|
||
|
r_minus += r_zero / 2.
|
||
|
|
||
|
# return min for two-sided test, but r_plus for one-sided test
|
||
|
# the literature is not consistent here
|
||
|
# r_plus is more informative since r_plus + r_minus = count*(count+1)/2,
|
||
|
# i.e. the sum of the ranks, so r_minus and the min can be inferred
|
||
|
# (If alternative='pratt', r_plus + r_minus = count*(count+1)/2 - r_zero.)
|
||
|
# [3] uses the r_plus for the one-sided test, keep min for two-sided test
|
||
|
# to keep backwards compatibility
|
||
|
if alternative == "two-sided":
|
||
|
T = min(r_plus, r_minus)
|
||
|
else:
|
||
|
T = r_plus
|
||
|
|
||
|
if mode == "approx":
|
||
|
mn = count * (count + 1.) * 0.25
|
||
|
se = count * (count + 1.) * (2. * count + 1.)
|
||
|
|
||
|
if zero_method == "pratt":
|
||
|
r = r[d != 0]
|
||
|
# normal approximation needs to be adjusted, see Cureton (1967)
|
||
|
mn -= n_zero * (n_zero + 1.) * 0.25
|
||
|
se -= n_zero * (n_zero + 1.) * (2. * n_zero + 1.)
|
||
|
|
||
|
replist, repnum = find_repeats(r)
|
||
|
if repnum.size != 0:
|
||
|
# Correction for repeated elements.
|
||
|
se -= 0.5 * (repnum * (repnum * repnum - 1)).sum()
|
||
|
|
||
|
se = sqrt(se / 24)
|
||
|
|
||
|
# apply continuity correction if applicable
|
||
|
d = 0
|
||
|
if correction:
|
||
|
if alternative == "two-sided":
|
||
|
d = 0.5 * np.sign(T - mn)
|
||
|
elif alternative == "less":
|
||
|
d = -0.5
|
||
|
else:
|
||
|
d = 0.5
|
||
|
|
||
|
# compute statistic and p-value using normal approximation
|
||
|
z = (T - mn - d) / se
|
||
|
if alternative == "two-sided":
|
||
|
prob = 2. * distributions.norm.sf(abs(z))
|
||
|
elif alternative == "greater":
|
||
|
# large T = r_plus indicates x is greater than y; i.e.
|
||
|
# accept alternative in that case and return small p-value (sf)
|
||
|
prob = distributions.norm.sf(z)
|
||
|
else:
|
||
|
prob = distributions.norm.cdf(z)
|
||
|
elif mode == "exact":
|
||
|
# get frequencies cnt of the possible positive ranksums r_plus
|
||
|
cnt = _get_wilcoxon_distr(count)
|
||
|
# note: r_plus is int (ties not allowed), need int for slices below
|
||
|
r_plus = int(r_plus)
|
||
|
if alternative == "two-sided":
|
||
|
if r_plus == (len(cnt) - 1) // 2:
|
||
|
# r_plus is the center of the distribution.
|
||
|
prob = 1.0
|
||
|
else:
|
||
|
p_less = np.sum(cnt[:r_plus + 1]) / 2**count
|
||
|
p_greater = np.sum(cnt[r_plus:]) / 2**count
|
||
|
prob = 2*min(p_greater, p_less)
|
||
|
elif alternative == "greater":
|
||
|
prob = np.sum(cnt[r_plus:]) / 2**count
|
||
|
else:
|
||
|
prob = np.sum(cnt[:r_plus + 1]) / 2**count
|
||
|
|
||
|
return WilcoxonResult(T, prob)
|
||
|
|
||
|
|
||
|
def median_test(*args, ties='below', correction=True, lambda_=1,
|
||
|
nan_policy='propagate'):
|
||
|
"""
|
||
|
Perform a Mood's median test.
|
||
|
|
||
|
Test that two or more samples come from populations with the same median.
|
||
|
|
||
|
Let ``n = len(args)`` be the number of samples. The "grand median" of
|
||
|
all the data is computed, and a contingency table is formed by
|
||
|
classifying the values in each sample as being above or below the grand
|
||
|
median. The contingency table, along with `correction` and `lambda_`,
|
||
|
are passed to `scipy.stats.chi2_contingency` to compute the test statistic
|
||
|
and p-value.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
sample1, sample2, ... : array_like
|
||
|
The set of samples. There must be at least two samples.
|
||
|
Each sample must be a one-dimensional sequence containing at least
|
||
|
one value. The samples are not required to have the same length.
|
||
|
ties : str, optional
|
||
|
Determines how values equal to the grand median are classified in
|
||
|
the contingency table. The string must be one of::
|
||
|
|
||
|
"below":
|
||
|
Values equal to the grand median are counted as "below".
|
||
|
"above":
|
||
|
Values equal to the grand median are counted as "above".
|
||
|
"ignore":
|
||
|
Values equal to the grand median are not counted.
|
||
|
|
||
|
The default is "below".
|
||
|
correction : bool, optional
|
||
|
If True, *and* there are just two samples, apply Yates' correction
|
||
|
for continuity when computing the test statistic associated with
|
||
|
the contingency table. Default is True.
|
||
|
lambda_ : float or str, optional
|
||
|
By default, the statistic computed in this test is Pearson's
|
||
|
chi-squared statistic. `lambda_` allows a statistic from the
|
||
|
Cressie-Read power divergence family to be used instead. See
|
||
|
`power_divergence` for details.
|
||
|
Default is 1 (Pearson's chi-squared statistic).
|
||
|
nan_policy : {'propagate', 'raise', 'omit'}, optional
|
||
|
Defines how to handle when input contains nan. 'propagate' returns nan,
|
||
|
'raise' throws an error, 'omit' performs the calculations ignoring nan
|
||
|
values. Default is 'propagate'.
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
stat : float
|
||
|
The test statistic. The statistic that is returned is determined by
|
||
|
`lambda_`. The default is Pearson's chi-squared statistic.
|
||
|
p : float
|
||
|
The p-value of the test.
|
||
|
m : float
|
||
|
The grand median.
|
||
|
table : ndarray
|
||
|
The contingency table. The shape of the table is (2, n), where
|
||
|
n is the number of samples. The first row holds the counts of the
|
||
|
values above the grand median, and the second row holds the counts
|
||
|
of the values below the grand median. The table allows further
|
||
|
analysis with, for example, `scipy.stats.chi2_contingency`, or with
|
||
|
`scipy.stats.fisher_exact` if there are two samples, without having
|
||
|
to recompute the table. If ``nan_policy`` is "propagate" and there
|
||
|
are nans in the input, the return value for ``table`` is ``None``.
|
||
|
|
||
|
See Also
|
||
|
--------
|
||
|
kruskal : Compute the Kruskal-Wallis H-test for independent samples.
|
||
|
mannwhitneyu : Computes the Mann-Whitney rank test on samples x and y.
|
||
|
|
||
|
Notes
|
||
|
-----
|
||
|
.. versionadded:: 0.15.0
|
||
|
|
||
|
References
|
||
|
----------
|
||
|
.. [1] Mood, A. M., Introduction to the Theory of Statistics. McGraw-Hill
|
||
|
(1950), pp. 394-399.
|
||
|
.. [2] Zar, J. H., Biostatistical Analysis, 5th ed. Prentice Hall (2010).
|
||
|
See Sections 8.12 and 10.15.
|
||
|
|
||
|
Examples
|
||
|
--------
|
||
|
A biologist runs an experiment in which there are three groups of plants.
|
||
|
Group 1 has 16 plants, group 2 has 15 plants, and group 3 has 17 plants.
|
||
|
Each plant produces a number of seeds. The seed counts for each group
|
||
|
are::
|
||
|
|
||
|
Group 1: 10 14 14 18 20 22 24 25 31 31 32 39 43 43 48 49
|
||
|
Group 2: 28 30 31 33 34 35 36 40 44 55 57 61 91 92 99
|
||
|
Group 3: 0 3 9 22 23 25 25 33 34 34 40 45 46 48 62 67 84
|
||
|
|
||
|
The following code applies Mood's median test to these samples.
|
||
|
|
||
|
>>> g1 = [10, 14, 14, 18, 20, 22, 24, 25, 31, 31, 32, 39, 43, 43, 48, 49]
|
||
|
>>> g2 = [28, 30, 31, 33, 34, 35, 36, 40, 44, 55, 57, 61, 91, 92, 99]
|
||
|
>>> g3 = [0, 3, 9, 22, 23, 25, 25, 33, 34, 34, 40, 45, 46, 48, 62, 67, 84]
|
||
|
>>> from scipy.stats import median_test
|
||
|
>>> stat, p, med, tbl = median_test(g1, g2, g3)
|
||
|
|
||
|
The median is
|
||
|
|
||
|
>>> med
|
||
|
34.0
|
||
|
|
||
|
and the contingency table is
|
||
|
|
||
|
>>> tbl
|
||
|
array([[ 5, 10, 7],
|
||
|
[11, 5, 10]])
|
||
|
|
||
|
`p` is too large to conclude that the medians are not the same:
|
||
|
|
||
|
>>> p
|
||
|
0.12609082774093244
|
||
|
|
||
|
The "G-test" can be performed by passing ``lambda_="log-likelihood"`` to
|
||
|
`median_test`.
|
||
|
|
||
|
>>> g, p, med, tbl = median_test(g1, g2, g3, lambda_="log-likelihood")
|
||
|
>>> p
|
||
|
0.12224779737117837
|
||
|
|
||
|
The median occurs several times in the data, so we'll get a different
|
||
|
result if, for example, ``ties="above"`` is used:
|
||
|
|
||
|
>>> stat, p, med, tbl = median_test(g1, g2, g3, ties="above")
|
||
|
>>> p
|
||
|
0.063873276069553273
|
||
|
|
||
|
>>> tbl
|
||
|
array([[ 5, 11, 9],
|
||
|
[11, 4, 8]])
|
||
|
|
||
|
This example demonstrates that if the data set is not large and there
|
||
|
are values equal to the median, the p-value can be sensitive to the
|
||
|
choice of `ties`.
|
||
|
|
||
|
"""
|
||
|
if len(args) < 2:
|
||
|
raise ValueError('median_test requires two or more samples.')
|
||
|
|
||
|
ties_options = ['below', 'above', 'ignore']
|
||
|
if ties not in ties_options:
|
||
|
raise ValueError("invalid 'ties' option '%s'; 'ties' must be one "
|
||
|
"of: %s" % (ties, str(ties_options)[1:-1]))
|
||
|
|
||
|
data = [np.asarray(arg) for arg in args]
|
||
|
|
||
|
# Validate the sizes and shapes of the arguments.
|
||
|
for k, d in enumerate(data):
|
||
|
if d.size == 0:
|
||
|
raise ValueError("Sample %d is empty. All samples must "
|
||
|
"contain at least one value." % (k + 1))
|
||
|
if d.ndim != 1:
|
||
|
raise ValueError("Sample %d has %d dimensions. All "
|
||
|
"samples must be one-dimensional sequences." %
|
||
|
(k + 1, d.ndim))
|
||
|
|
||
|
cdata = np.concatenate(data)
|
||
|
contains_nan, nan_policy = _contains_nan(cdata, nan_policy)
|
||
|
if contains_nan and nan_policy == 'propagate':
|
||
|
return np.nan, np.nan, np.nan, None
|
||
|
|
||
|
if contains_nan:
|
||
|
grand_median = np.median(cdata[~np.isnan(cdata)])
|
||
|
else:
|
||
|
grand_median = np.median(cdata)
|
||
|
# When the minimum version of numpy supported by scipy is 1.9.0,
|
||
|
# the above if/else statement can be replaced by the single line:
|
||
|
# grand_median = np.nanmedian(cdata)
|
||
|
|
||
|
# Create the contingency table.
|
||
|
table = np.zeros((2, len(data)), dtype=np.int64)
|
||
|
for k, sample in enumerate(data):
|
||
|
sample = sample[~np.isnan(sample)]
|
||
|
|
||
|
nabove = count_nonzero(sample > grand_median)
|
||
|
nbelow = count_nonzero(sample < grand_median)
|
||
|
nequal = sample.size - (nabove + nbelow)
|
||
|
table[0, k] += nabove
|
||
|
table[1, k] += nbelow
|
||
|
if ties == "below":
|
||
|
table[1, k] += nequal
|
||
|
elif ties == "above":
|
||
|
table[0, k] += nequal
|
||
|
|
||
|
# Check that no row or column of the table is all zero.
|
||
|
# Such a table can not be given to chi2_contingency, because it would have
|
||
|
# a zero in the table of expected frequencies.
|
||
|
rowsums = table.sum(axis=1)
|
||
|
if rowsums[0] == 0:
|
||
|
raise ValueError("All values are below the grand median (%r)." %
|
||
|
grand_median)
|
||
|
if rowsums[1] == 0:
|
||
|
raise ValueError("All values are above the grand median (%r)." %
|
||
|
grand_median)
|
||
|
if ties == "ignore":
|
||
|
# We already checked that each sample has at least one value, but it
|
||
|
# is possible that all those values equal the grand median. If `ties`
|
||
|
# is "ignore", that would result in a column of zeros in `table`. We
|
||
|
# check for that case here.
|
||
|
zero_cols = np.nonzero((table == 0).all(axis=0))[0]
|
||
|
if len(zero_cols) > 0:
|
||
|
msg = ("All values in sample %d are equal to the grand "
|
||
|
"median (%r), so they are ignored, resulting in an "
|
||
|
"empty sample." % (zero_cols[0] + 1, grand_median))
|
||
|
raise ValueError(msg)
|
||
|
|
||
|
stat, p, dof, expected = chi2_contingency(table, lambda_=lambda_,
|
||
|
correction=correction)
|
||
|
return stat, p, grand_median, table
|
||
|
|
||
|
|
||
|
def _circfuncs_common(samples, high, low, nan_policy='propagate'):
|
||
|
# Ensure samples are array-like and size is not zero
|
||
|
samples = np.asarray(samples)
|
||
|
if samples.size == 0:
|
||
|
return np.nan, np.asarray(np.nan), np.asarray(np.nan), None
|
||
|
|
||
|
# Recast samples as radians that range between 0 and 2 pi and calculate
|
||
|
# the sine and cosine
|
||
|
sin_samp = sin((samples - low)*2.*pi / (high - low))
|
||
|
cos_samp = cos((samples - low)*2.*pi / (high - low))
|
||
|
|
||
|
# Apply the NaN policy
|
||
|
contains_nan, nan_policy = _contains_nan(samples, nan_policy)
|
||
|
if contains_nan and nan_policy == 'omit':
|
||
|
mask = np.isnan(samples)
|
||
|
# Set the sines and cosines that are NaN to zero
|
||
|
sin_samp[mask] = 0.0
|
||
|
cos_samp[mask] = 0.0
|
||
|
else:
|
||
|
mask = None
|
||
|
|
||
|
return samples, sin_samp, cos_samp, mask
|
||
|
|
||
|
|
||
|
def circmean(samples, high=2*pi, low=0, axis=None, nan_policy='propagate'):
|
||
|
"""
|
||
|
Compute the circular mean for samples in a range.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
samples : array_like
|
||
|
Input array.
|
||
|
high : float or int, optional
|
||
|
High boundary for circular mean range. Default is ``2*pi``.
|
||
|
low : float or int, optional
|
||
|
Low boundary for circular mean range. Default is 0.
|
||
|
axis : int, optional
|
||
|
Axis along which means are computed. The default is to compute
|
||
|
the mean of the flattened array.
|
||
|
nan_policy : {'propagate', 'raise', 'omit'}, optional
|
||
|
Defines how to handle when input contains nan. 'propagate' returns nan,
|
||
|
'raise' throws an error, 'omit' performs the calculations ignoring nan
|
||
|
values. Default is 'propagate'.
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
circmean : float
|
||
|
Circular mean.
|
||
|
|
||
|
Examples
|
||
|
--------
|
||
|
>>> from scipy.stats import circmean
|
||
|
>>> circmean([0.1, 2*np.pi+0.2, 6*np.pi+0.3])
|
||
|
0.2
|
||
|
|
||
|
>>> from scipy.stats import circmean
|
||
|
>>> circmean([0.2, 1.4, 2.6], high = 1, low = 0)
|
||
|
0.4
|
||
|
|
||
|
"""
|
||
|
samples, sin_samp, cos_samp, nmask = _circfuncs_common(samples, high, low,
|
||
|
nan_policy=nan_policy)
|
||
|
sin_sum = sin_samp.sum(axis=axis)
|
||
|
cos_sum = cos_samp.sum(axis=axis)
|
||
|
res = arctan2(sin_sum, cos_sum)
|
||
|
|
||
|
mask_nan = ~np.isnan(res)
|
||
|
if mask_nan.ndim > 0:
|
||
|
mask = res[mask_nan] < 0
|
||
|
else:
|
||
|
mask = res < 0
|
||
|
|
||
|
if mask.ndim > 0:
|
||
|
mask_nan[mask_nan] = mask
|
||
|
res[mask_nan] += 2*pi
|
||
|
elif mask:
|
||
|
res += 2*pi
|
||
|
|
||
|
# Set output to NaN if no samples went into the mean
|
||
|
if nmask is not None:
|
||
|
if nmask.all():
|
||
|
res = np.full(shape=res.shape, fill_value=np.nan)
|
||
|
else:
|
||
|
# Find out if any of the axis that are being averaged consist
|
||
|
# entirely of NaN. If one exists, set the result (res) to NaN
|
||
|
nshape = 0 if axis is None else axis
|
||
|
smask = nmask.shape[nshape] == nmask.sum(axis=axis)
|
||
|
if smask.any():
|
||
|
res[smask] = np.nan
|
||
|
|
||
|
return res*(high - low)/2.0/pi + low
|
||
|
|
||
|
|
||
|
def circvar(samples, high=2*pi, low=0, axis=None, nan_policy='propagate'):
|
||
|
"""
|
||
|
Compute the circular variance for samples assumed to be in a range.
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
samples : array_like
|
||
|
Input array.
|
||
|
high : float or int, optional
|
||
|
High boundary for circular variance range. Default is ``2*pi``.
|
||
|
low : float or int, optional
|
||
|
Low boundary for circular variance range. Default is 0.
|
||
|
axis : int, optional
|
||
|
Axis along which variances are computed. The default is to compute
|
||
|
the variance of the flattened array.
|
||
|
nan_policy : {'propagate', 'raise', 'omit'}, optional
|
||
|
Defines how to handle when input contains nan. 'propagate' returns nan,
|
||
|
'raise' throws an error, 'omit' performs the calculations ignoring nan
|
||
|
values. Default is 'propagate'.
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
circvar : float
|
||
|
Circular variance.
|
||
|
|
||
|
Notes
|
||
|
-----
|
||
|
This uses a definition of circular variance that in the limit of small
|
||
|
angles returns a number close to the 'linear' variance.
|
||
|
|
||
|
Examples
|
||
|
--------
|
||
|
>>> from scipy.stats import circvar
|
||
|
>>> circvar([0, 2*np.pi/3, 5*np.pi/3])
|
||
|
2.19722457734
|
||
|
|
||
|
"""
|
||
|
samples, sin_samp, cos_samp, mask = _circfuncs_common(samples, high, low,
|
||
|
nan_policy=nan_policy)
|
||
|
if mask is None:
|
||
|
sin_mean = sin_samp.mean(axis=axis)
|
||
|
cos_mean = cos_samp.mean(axis=axis)
|
||
|
else:
|
||
|
nsum = np.asarray(np.sum(~mask, axis=axis).astype(float))
|
||
|
nsum[nsum == 0] = np.nan
|
||
|
sin_mean = sin_samp.sum(axis=axis) / nsum
|
||
|
cos_mean = cos_samp.sum(axis=axis) / nsum
|
||
|
# hypot can go slightly above 1 due to rounding errors
|
||
|
with np.errstate(invalid='ignore'):
|
||
|
R = np.minimum(1, hypot(sin_mean, cos_mean))
|
||
|
|
||
|
return ((high - low)/2.0/pi)**2 * -2 * log(R)
|
||
|
|
||
|
|
||
|
def circstd(samples, high=2*pi, low=0, axis=None, nan_policy='propagate'):
|
||
|
"""
|
||
|
Compute the circular standard deviation for samples assumed to be in the
|
||
|
range [low to high].
|
||
|
|
||
|
Parameters
|
||
|
----------
|
||
|
samples : array_like
|
||
|
Input array.
|
||
|
high : float or int, optional
|
||
|
High boundary for circular standard deviation range.
|
||
|
Default is ``2*pi``.
|
||
|
low : float or int, optional
|
||
|
Low boundary for circular standard deviation range. Default is 0.
|
||
|
axis : int, optional
|
||
|
Axis along which standard deviations are computed. The default is
|
||
|
to compute the standard deviation of the flattened array.
|
||
|
nan_policy : {'propagate', 'raise', 'omit'}, optional
|
||
|
Defines how to handle when input contains nan. 'propagate' returns nan,
|
||
|
'raise' throws an error, 'omit' performs the calculations ignoring nan
|
||
|
values. Default is 'propagate'.
|
||
|
|
||
|
Returns
|
||
|
-------
|
||
|
circstd : float
|
||
|
Circular standard deviation.
|
||
|
|
||
|
Notes
|
||
|
-----
|
||
|
This uses a definition of circular standard deviation that in the limit of
|
||
|
small angles returns a number close to the 'linear' standard deviation.
|
||
|
|
||
|
Examples
|
||
|
--------
|
||
|
>>> from scipy.stats import circstd
|
||
|
>>> circstd([0, 0.1*np.pi/2, 0.001*np.pi, 0.03*np.pi/2])
|
||
|
0.063564063306
|
||
|
|
||
|
"""
|
||
|
samples, sin_samp, cos_samp, mask = _circfuncs_common(samples, high, low,
|
||
|
nan_policy=nan_policy)
|
||
|
if mask is None:
|
||
|
sin_mean = sin_samp.mean(axis=axis)
|
||
|
cos_mean = cos_samp.mean(axis=axis)
|
||
|
else:
|
||
|
nsum = np.asarray(np.sum(~mask, axis=axis).astype(float))
|
||
|
nsum[nsum == 0] = np.nan
|
||
|
sin_mean = sin_samp.sum(axis=axis) / nsum
|
||
|
cos_mean = cos_samp.sum(axis=axis) / nsum
|
||
|
# hypot can go slightly above 1 due to rounding errors
|
||
|
with np.errstate(invalid='ignore'):
|
||
|
R = np.minimum(1, hypot(sin_mean, cos_mean))
|
||
|
|
||
|
return ((high - low)/2.0/pi) * sqrt(-2*log(R))
|