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Intelegentny_Pszczelarz/.venv/Lib/site-packages/scipy/stats/_resampling.py

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feature: "ANN commit 2"
2023-06-19 00:49:18 +02:00
import warnings
import numpy as np
from itertools import combinations, permutations, product
import inspect
from scipy._lib._util import check_random_state
from scipy.special import ndtr, ndtri, comb, factorial
from scipy._lib._util import rng_integers
from dataclasses import make_dataclass
from ._common import ConfidenceInterval
from ._axis_nan_policy import _broadcast_concatenate, _broadcast_arrays
from ._warnings_errors import DegenerateDataWarning
__all__ = ['bootstrap', 'monte_carlo_test', 'permutation_test']
def _vectorize_statistic(statistic):
"""Vectorize an n-sample statistic"""
# This is a little cleaner than np.nditer at the expense of some data
# copying: concatenate samples together, then use np.apply_along_axis
def stat_nd(*data, axis=0):
lengths = [sample.shape[axis] for sample in data]
split_indices = np.cumsum(lengths)[:-1]
z = _broadcast_concatenate(data, axis)
# move working axis to position 0 so that new dimensions in the output
# of `statistic` are _prepended_. ("This axis is removed, and replaced
# with new dimensions...")
z = np.moveaxis(z, axis, 0)
def stat_1d(z):
data = np.split(z, split_indices)
return statistic(*data)
return np.apply_along_axis(stat_1d, 0, z)[()]
return stat_nd
def _jackknife_resample(sample, batch=None):
"""Jackknife resample the sample. Only one-sample stats for now."""
n = sample.shape[-1]
batch_nominal = batch or n
for k in range(0, n, batch_nominal):
# col_start:col_end are the observations to remove
batch_actual = min(batch_nominal, n-k)
# jackknife - each row leaves out one observation
j = np.ones((batch_actual, n), dtype=bool)
np.fill_diagonal(j[:, k:k+batch_actual], False)
i = np.arange(n)
i = np.broadcast_to(i, (batch_actual, n))
i = i[j].reshape((batch_actual, n-1))
resamples = sample[..., i]
yield resamples
def _bootstrap_resample(sample, n_resamples=None, random_state=None):
"""Bootstrap resample the sample."""
n = sample.shape[-1]
# bootstrap - each row is a random resample of original observations
i = rng_integers(random_state, 0, n, (n_resamples, n))
resamples = sample[..., i]
return resamples
def _percentile_of_score(a, score, axis):
"""Vectorized, simplified `scipy.stats.percentileofscore`.
Uses logic of the 'mean' value of percentileofscore's kind parameter.
Unlike `stats.percentileofscore`, the percentile returned is a fraction
in [0, 1].
"""
B = a.shape[axis]
return ((a < score).sum(axis=axis) + (a <= score).sum(axis=axis)) / (2 * B)
def _percentile_along_axis(theta_hat_b, alpha):
"""`np.percentile` with different percentile for each slice."""
# the difference between _percentile_along_axis and np.percentile is that
# np.percentile gets _all_ the qs for each axis slice, whereas
# _percentile_along_axis gets the q corresponding with each axis slice
shape = theta_hat_b.shape[:-1]
alpha = np.broadcast_to(alpha, shape)
percentiles = np.zeros_like(alpha, dtype=np.float64)
for indices, alpha_i in np.ndenumerate(alpha):
if np.isnan(alpha_i):
# e.g. when bootstrap distribution has only one unique element
msg = (
"The BCa confidence interval cannot be calculated."
" This problem is known to occur when the distribution"
" is degenerate or the statistic is np.min."
)
warnings.warn(DegenerateDataWarning(msg))
percentiles[indices] = np.nan
else:
theta_hat_b_i = theta_hat_b[indices]
percentiles[indices] = np.percentile(theta_hat_b_i, alpha_i)
return percentiles[()] # return scalar instead of 0d array
def _bca_interval(data, statistic, axis, alpha, theta_hat_b, batch):
"""Bias-corrected and accelerated interval."""
# closely follows [1] 14.3 and 15.4 (Eq. 15.36)
# calculate z0_hat
theta_hat = np.asarray(statistic(*data, axis=axis))[..., None]
percentile = _percentile_of_score(theta_hat_b, theta_hat, axis=-1)
z0_hat = ndtri(percentile)
# calculate a_hat
theta_hat_ji = [] # j is for sample of data, i is for jackknife resample
for j, sample in enumerate(data):
# _jackknife_resample will add an axis prior to the last axis that
# corresponds with the different jackknife resamples. Do the same for
# each sample of the data to ensure broadcastability. We need to
# create a copy of the list containing the samples anyway, so do this
# in the loop to simplify the code. This is not the bottleneck...
samples = [np.expand_dims(sample, -2) for sample in data]
theta_hat_i = []
for jackknife_sample in _jackknife_resample(sample, batch):
samples[j] = jackknife_sample
broadcasted = _broadcast_arrays(samples, axis=-1)
theta_hat_i.append(statistic(*broadcasted, axis=-1))
theta_hat_ji.append(theta_hat_i)
theta_hat_ji = [np.concatenate(theta_hat_i, axis=-1)
for theta_hat_i in theta_hat_ji]
n_j = [theta_hat_i.shape[-1] for theta_hat_i in theta_hat_ji]
theta_hat_j_dot = [theta_hat_i.mean(axis=-1, keepdims=True)
for theta_hat_i in theta_hat_ji]
U_ji = [(n - 1) * (theta_hat_dot - theta_hat_i)
for theta_hat_dot, theta_hat_i, n
in zip(theta_hat_j_dot, theta_hat_ji, n_j)]
nums = [(U_i**3).sum(axis=-1)/n**3 for U_i, n in zip(U_ji, n_j)]
dens = [(U_i**2).sum(axis=-1)/n**2 for U_i, n in zip(U_ji, n_j)]
a_hat = 1/6 * sum(nums) / sum(dens)**(3/2)
# calculate alpha_1, alpha_2
z_alpha = ndtri(alpha)
z_1alpha = -z_alpha
num1 = z0_hat + z_alpha
alpha_1 = ndtr(z0_hat + num1/(1 - a_hat*num1))
num2 = z0_hat + z_1alpha
alpha_2 = ndtr(z0_hat + num2/(1 - a_hat*num2))
return alpha_1, alpha_2, a_hat # return a_hat for testing
def _bootstrap_iv(data, statistic, vectorized, paired, axis, confidence_level,
n_resamples, batch, method, bootstrap_result, random_state):
"""Input validation and standardization for `bootstrap`."""
if vectorized not in {True, False, None}:
raise ValueError("`vectorized` must be `True`, `False`, or `None`.")
if vectorized is None:
vectorized = 'axis' in inspect.signature(statistic).parameters
if not vectorized:
statistic = _vectorize_statistic(statistic)
axis_int = int(axis)
if axis != axis_int:
raise ValueError("`axis` must be an integer.")
n_samples = 0
try:
n_samples = len(data)
except TypeError:
raise ValueError("`data` must be a sequence of samples.")
if n_samples == 0:
raise ValueError("`data` must contain at least one sample.")
data_iv = []
for sample in data:
sample = np.atleast_1d(sample)
if sample.shape[axis_int] <= 1:
raise ValueError("each sample in `data` must contain two or more "
"observations along `axis`.")
sample = np.moveaxis(sample, axis_int, -1)
data_iv.append(sample)
if paired not in {True, False}:
raise ValueError("`paired` must be `True` or `False`.")
if paired:
n = data_iv[0].shape[-1]
for sample in data_iv[1:]:
if sample.shape[-1] != n:
message = ("When `paired is True`, all samples must have the "
"same length along `axis`")
raise ValueError(message)
# to generate the bootstrap distribution for paired-sample statistics,
# resample the indices of the observations
def statistic(i, axis=-1, data=data_iv, unpaired_statistic=statistic):
data = [sample[..., i] for sample in data]
return unpaired_statistic(*data, axis=axis)
data_iv = [np.arange(n)]
confidence_level_float = float(confidence_level)
n_resamples_int = int(n_resamples)
if n_resamples != n_resamples_int or n_resamples_int < 0:
raise ValueError("`n_resamples` must be a non-negative integer.")
if batch is None:
batch_iv = batch
else:
batch_iv = int(batch)
if batch != batch_iv or batch_iv <= 0:
raise ValueError("`batch` must be a positive integer or None.")
methods = {'percentile', 'basic', 'bca'}
method = method.lower()
if method not in methods:
raise ValueError(f"`method` must be in {methods}")
message = "`bootstrap_result` must have attribute `bootstrap_distribution'"
if (bootstrap_result is not None
and not hasattr(bootstrap_result, "bootstrap_distribution")):
raise ValueError(message)
message = ("Either `bootstrap_result.bootstrap_distribution.size` or "
"`n_resamples` must be positive.")
if ((not bootstrap_result or
not bootstrap_result.bootstrap_distribution.size)
and n_resamples_int == 0):
raise ValueError(message)
random_state = check_random_state(random_state)
return (data_iv, statistic, vectorized, paired, axis_int,
confidence_level_float, n_resamples_int, batch_iv,
method, bootstrap_result, random_state)
fields = ['confidence_interval', 'bootstrap_distribution', 'standard_error']
BootstrapResult = make_dataclass("BootstrapResult", fields)
def bootstrap(data, statistic, *, n_resamples=9999, batch=None,
vectorized=None, paired=False, axis=0, confidence_level=0.95,
method='BCa', bootstrap_result=None, random_state=None):
r"""
Compute a two-sided bootstrap confidence interval of a statistic.
When `method` is ``'percentile'``, a bootstrap confidence interval is
computed according to the following procedure.
1. Resample the data: for each sample in `data` and for each of
`n_resamples`, take a random sample of the original sample
(with replacement) of the same size as the original sample.
2. Compute the bootstrap distribution of the statistic: for each set of
resamples, compute the test statistic.
3. Determine the confidence interval: find the interval of the bootstrap
distribution that is
- symmetric about the median and
- contains `confidence_level` of the resampled statistic values.
While the ``'percentile'`` method is the most intuitive, it is rarely
used in practice. Two more common methods are available, ``'basic'``
('reverse percentile') and ``'BCa'`` ('bias-corrected and accelerated');
they differ in how step 3 is performed.
If the samples in `data` are taken at random from their respective
distributions :math:`n` times, the confidence interval returned by
`bootstrap` will contain the true value of the statistic for those
distributions approximately `confidence_level`:math:`\, \times \, n` times.
Parameters
----------
data : sequence of array-like
Each element of data is a sample from an underlying distribution.
statistic : callable
Statistic for which the confidence interval is to be calculated.
`statistic` must be a callable that accepts ``len(data)`` samples
as separate arguments and returns the resulting statistic.
If `vectorized` is set ``True``,
`statistic` must also accept a keyword argument `axis` and be
vectorized to compute the statistic along the provided `axis`.
n_resamples : int, default: ``9999``
The number of resamples performed to form the bootstrap distribution
of the statistic.
batch : int, optional
The number of resamples to process in each vectorized call to
`statistic`. Memory usage is O(`batch`*``n``), where ``n`` is the
sample size. Default is ``None``, in which case ``batch = n_resamples``
(or ``batch = max(n_resamples, n)`` for ``method='BCa'``).
vectorized : bool, optional
If `vectorized` is set ``False``, `statistic` will not be passed
keyword argument `axis` and is expected to calculate the statistic
only for 1D samples. If ``True``, `statistic` will be passed keyword
argument `axis` and is expected to calculate the statistic along `axis`
when passed an ND sample array. If ``None`` (default), `vectorized`
will be set ``True`` if ``axis`` is a parameter of `statistic`. Use of
a vectorized statistic typically reduces computation time.
paired : bool, default: ``False``
Whether the statistic treats corresponding elements of the samples
in `data` as paired.
axis : int, default: ``0``
The axis of the samples in `data` along which the `statistic` is
calculated.
confidence_level : float, default: ``0.95``
The confidence level of the confidence interval.
method : {'percentile', 'basic', 'bca'}, default: ``'BCa'``
Whether to return the 'percentile' bootstrap confidence interval
(``'percentile'``), the 'basic' (AKA 'reverse') bootstrap confidence
interval (``'basic'``), or the bias-corrected and accelerated bootstrap
confidence interval (``'BCa'``).
bootstrap_result : BootstrapResult, optional
Provide the result object returned by a previous call to `bootstrap`
to include the previous bootstrap distribution in the new bootstrap
distribution. This can be used, for example, to change
`confidence_level`, change `method`, or see the effect of performing
additional resampling without repeating computations.
random_state : {None, int, `numpy.random.Generator`,
`numpy.random.RandomState`}, optional
Pseudorandom number generator state used to generate resamples.
If `random_state` is ``None`` (or `np.random`), the
`numpy.random.RandomState` singleton is used.
If `random_state` is an int, a new ``RandomState`` instance is used,
seeded with `random_state`.
If `random_state` is already a ``Generator`` or ``RandomState``
instance then that instance is used.
Returns
-------
res : BootstrapResult
An object with attributes:
confidence_interval : ConfidenceInterval
The bootstrap confidence interval as an instance of
`collections.namedtuple` with attributes `low` and `high`.
bootstrap_distribution : ndarray
The bootstrap distribution, that is, the value of `statistic` for
each resample. The last dimension corresponds with the resamples
(e.g. ``res.bootstrap_distribution.shape[-1] == n_resamples``).
standard_error : float or ndarray
The bootstrap standard error, that is, the sample standard
deviation of the bootstrap distribution.
Warns
-----
`~scipy.stats.DegenerateDataWarning`
Generated when ``method='BCa'`` and the bootstrap distribution is
degenerate (e.g. all elements are identical).
Notes
-----
Elements of the confidence interval may be NaN for ``method='BCa'`` if
the bootstrap distribution is degenerate (e.g. all elements are identical).
In this case, consider using another `method` or inspecting `data` for
indications that other analysis may be more appropriate (e.g. all
observations are identical).
References
----------
.. [1] B. Efron and R. J. Tibshirani, An Introduction to the Bootstrap,
Chapman & Hall/CRC, Boca Raton, FL, USA (1993)
.. [2] Nathaniel E. Helwig, "Bootstrap Confidence Intervals",
http://users.stat.umn.edu/~helwig/notes/bootci-Notes.pdf
.. [3] Bootstrapping (statistics), Wikipedia,
https://en.wikipedia.org/wiki/Bootstrapping_%28statistics%29
Examples
--------
Suppose we have sampled data from an unknown distribution.
>>> import numpy as np
>>> rng = np.random.default_rng()
>>> from scipy.stats import norm
>>> dist = norm(loc=2, scale=4) # our "unknown" distribution
>>> data = dist.rvs(size=100, random_state=rng)
We are interested in the standard deviation of the distribution.
>>> std_true = dist.std() # the true value of the statistic
>>> print(std_true)
4.0
>>> std_sample = np.std(data) # the sample statistic
>>> print(std_sample)
3.9460644295563863
The bootstrap is used to approximate the variability we would expect if we
were to repeatedly sample from the unknown distribution and calculate the
statistic of the sample each time. It does this by repeatedly resampling
values *from the original sample* with replacement and calculating the
statistic of each resample. This results in a "bootstrap distribution" of
the statistic.
>>> import matplotlib.pyplot as plt
>>> from scipy.stats import bootstrap
>>> data = (data,) # samples must be in a sequence
>>> res = bootstrap(data, np.std, confidence_level=0.9,
... random_state=rng)
>>> fig, ax = plt.subplots()
>>> ax.hist(res.bootstrap_distribution, bins=25)
>>> ax.set_title('Bootstrap Distribution')
>>> ax.set_xlabel('statistic value')
>>> ax.set_ylabel('frequency')
>>> plt.show()
The standard error quantifies this variability. It is calculated as the
standard deviation of the bootstrap distribution.
>>> res.standard_error
0.24427002125829136
>>> res.standard_error == np.std(res.bootstrap_distribution, ddof=1)
True
The bootstrap distribution of the statistic is often approximately normal
with scale equal to the standard error.
>>> x = np.linspace(3, 5)
>>> pdf = norm.pdf(x, loc=std_sample, scale=res.standard_error)
>>> fig, ax = plt.subplots()
>>> ax.hist(res.bootstrap_distribution, bins=25, density=True)
>>> ax.plot(x, pdf)
>>> ax.set_title('Normal Approximation of the Bootstrap Distribution')
>>> ax.set_xlabel('statistic value')
>>> ax.set_ylabel('pdf')
>>> plt.show()
This suggests that we could construct a 90% confidence interval on the
statistic based on quantiles of this normal distribution.
>>> norm.interval(0.9, loc=std_sample, scale=res.standard_error)
(3.5442759991341726, 4.3478528599786)
Due to central limit theorem, this normal approximation is accurate for a
variety of statistics and distributions underlying the samples; however,
the approximation is not reliable in all cases. Because `bootstrap` is
designed to work with arbitrary underlying distributions and statistics,
it uses more advanced techniques to generate an accurate confidence
interval.
>>> print(res.confidence_interval)
ConfidenceInterval(low=3.57655333533867, high=4.382043696342881)
If we sample from the original distribution 1000 times and form a bootstrap
confidence interval for each sample, the confidence interval
contains the true value of the statistic approximately 90% of the time.
>>> n_trials = 1000
>>> ci_contains_true_std = 0
>>> for i in range(n_trials):
... data = (dist.rvs(size=100, random_state=rng),)
... ci = bootstrap(data, np.std, confidence_level=0.9, n_resamples=1000,
... random_state=rng).confidence_interval
... if ci[0] < std_true < ci[1]:
... ci_contains_true_std += 1
>>> print(ci_contains_true_std)
875
Rather than writing a loop, we can also determine the confidence intervals
for all 1000 samples at once.
>>> data = (dist.rvs(size=(n_trials, 100), random_state=rng),)
>>> res = bootstrap(data, np.std, axis=-1, confidence_level=0.9,
... n_resamples=1000, random_state=rng)
>>> ci_l, ci_u = res.confidence_interval
Here, `ci_l` and `ci_u` contain the confidence interval for each of the
``n_trials = 1000`` samples.
>>> print(ci_l[995:])
[3.77729695 3.75090233 3.45829131 3.34078217 3.48072829]
>>> print(ci_u[995:])
[4.88316666 4.86924034 4.32032996 4.2822427 4.59360598]
And again, approximately 90% contain the true value, ``std_true = 4``.
>>> print(np.sum((ci_l < std_true) & (std_true < ci_u)))
900
`bootstrap` can also be used to estimate confidence intervals of
multi-sample statistics, including those calculated by hypothesis
tests. `scipy.stats.mood` perform's Mood's test for equal scale parameters,
and it returns two outputs: a statistic, and a p-value. To get a
confidence interval for the test statistic, we first wrap
`scipy.stats.mood` in a function that accepts two sample arguments,
accepts an `axis` keyword argument, and returns only the statistic.
>>> from scipy.stats import mood
>>> def my_statistic(sample1, sample2, axis):
... statistic, _ = mood(sample1, sample2, axis=-1)
... return statistic
Here, we use the 'percentile' method with the default 95% confidence level.
>>> sample1 = norm.rvs(scale=1, size=100, random_state=rng)
>>> sample2 = norm.rvs(scale=2, size=100, random_state=rng)
>>> data = (sample1, sample2)
>>> res = bootstrap(data, my_statistic, method='basic', random_state=rng)
>>> print(mood(sample1, sample2)[0]) # element 0 is the statistic
-5.521109549096542
>>> print(res.confidence_interval)
ConfidenceInterval(low=-7.255994487314675, high=-4.016202624747605)
The bootstrap estimate of the standard error is also available.
>>> print(res.standard_error)
0.8344963846318795
Paired-sample statistics work, too. For example, consider the Pearson
correlation coefficient.
>>> from scipy.stats import pearsonr
>>> n = 100
>>> x = np.linspace(0, 10, n)
>>> y = x + rng.uniform(size=n)
>>> print(pearsonr(x, y)[0]) # element 0 is the statistic
0.9962357936065914
We wrap `pearsonr` so that it returns only the statistic.
>>> def my_statistic(x, y):
... return pearsonr(x, y)[0]
We call `bootstrap` using ``paired=True``.
Also, since ``my_statistic`` isn't vectorized to calculate the statistic
along a given axis, we pass in ``vectorized=False``.
>>> res = bootstrap((x, y), my_statistic, vectorized=False, paired=True,
... random_state=rng)
>>> print(res.confidence_interval)
ConfidenceInterval(low=0.9950085825848624, high=0.9971212407917498)
The result object can be passed back into `bootstrap` to perform additional
resampling:
>>> len(res.bootstrap_distribution)
9999
>>> res = bootstrap((x, y), my_statistic, vectorized=False, paired=True,
... n_resamples=1001, random_state=rng,
... bootstrap_result=res)
>>> len(res.bootstrap_distribution)
11000
or to change the confidence interval options:
>>> res2 = bootstrap((x, y), my_statistic, vectorized=False, paired=True,
... n_resamples=0, random_state=rng, bootstrap_result=res,
... method='percentile', confidence_level=0.9)
>>> np.testing.assert_equal(res2.bootstrap_distribution,
... res.bootstrap_distribution)
>>> res.confidence_interval
ConfidenceInterval(low=0.9950035351407804, high=0.9971170323404578)
without repeating computation of the original bootstrap distribution.
"""
# Input validation
args = _bootstrap_iv(data, statistic, vectorized, paired, axis,
confidence_level, n_resamples, batch, method,
bootstrap_result, random_state)
data, statistic, vectorized, paired, axis, confidence_level = args[:6]
n_resamples, batch, method, bootstrap_result, random_state = args[6:]
theta_hat_b = ([] if bootstrap_result is None
else [bootstrap_result.bootstrap_distribution])
batch_nominal = batch or n_resamples or 1
for k in range(0, n_resamples, batch_nominal):
batch_actual = min(batch_nominal, n_resamples-k)
# Generate resamples
resampled_data = []
for sample in data:
resample = _bootstrap_resample(sample, n_resamples=batch_actual,
random_state=random_state)
resampled_data.append(resample)
# Compute bootstrap distribution of statistic
theta_hat_b.append(statistic(*resampled_data, axis=-1))
theta_hat_b = np.concatenate(theta_hat_b, axis=-1)
# Calculate percentile interval
alpha = (1 - confidence_level)/2
if method == 'bca':
interval = _bca_interval(data, statistic, axis=-1, alpha=alpha,
theta_hat_b=theta_hat_b, batch=batch)[:2]
percentile_fun = _percentile_along_axis
else:
interval = alpha, 1-alpha
def percentile_fun(a, q):
return np.percentile(a=a, q=q, axis=-1)
# Calculate confidence interval of statistic
ci_l = percentile_fun(theta_hat_b, interval[0]*100)
ci_u = percentile_fun(theta_hat_b, interval[1]*100)
if method == 'basic': # see [3]
theta_hat = statistic(*data, axis=-1)
ci_l, ci_u = 2*theta_hat - ci_u, 2*theta_hat - ci_l
return BootstrapResult(confidence_interval=ConfidenceInterval(ci_l, ci_u),
bootstrap_distribution=theta_hat_b,
standard_error=np.std(theta_hat_b, ddof=1, axis=-1))
def _monte_carlo_test_iv(sample, rvs, statistic, vectorized, n_resamples,
batch, alternative, axis):
"""Input validation for `monte_carlo_test`."""
axis_int = int(axis)
if axis != axis_int:
raise ValueError("`axis` must be an integer.")
if vectorized not in {True, False, None}:
raise ValueError("`vectorized` must be `True`, `False`, or `None`.")
if not callable(rvs):
raise TypeError("`rvs` must be callable.")
if not callable(statistic):
raise TypeError("`statistic` must be callable.")
if vectorized is None:
vectorized = 'axis' in inspect.signature(statistic).parameters
if not vectorized:
statistic_vectorized = _vectorize_statistic(statistic)
else:
statistic_vectorized = statistic
sample = np.atleast_1d(sample)
sample = np.moveaxis(sample, axis, -1)
n_resamples_int = int(n_resamples)
if n_resamples != n_resamples_int or n_resamples_int <= 0:
raise ValueError("`n_resamples` must be a positive integer.")
if batch is None:
batch_iv = batch
else:
batch_iv = int(batch)
if batch != batch_iv or batch_iv <= 0:
raise ValueError("`batch` must be a positive integer or None.")
alternatives = {'two-sided', 'greater', 'less'}
alternative = alternative.lower()
if alternative not in alternatives:
raise ValueError(f"`alternative` must be in {alternatives}")
return (sample, rvs, statistic_vectorized, vectorized, n_resamples_int,
batch_iv, alternative, axis_int)
fields = ['statistic', 'pvalue', 'null_distribution']
MonteCarloTestResult = make_dataclass("MonteCarloTestResult", fields)
def monte_carlo_test(sample, rvs, statistic, *, vectorized=None,
n_resamples=9999, batch=None, alternative="two-sided",
axis=0):
r"""
Monte Carlo test that a sample is drawn from a given distribution.
The null hypothesis is that the provided `sample` was drawn at random from
the distribution for which `rvs` generates random variates. The value of
the `statistic` for the given sample is compared against a Monte Carlo null
distribution: the value of the statistic for each of `n_resamples`
samples generated by `rvs`. This gives the p-value, the probability of
observing such an extreme value of the test statistic under the null
hypothesis.
Parameters
----------
sample : array-like
An array of observations.
rvs : callable
Generates random variates from the distribution against which `sample`
will be tested. `rvs` must be a callable that accepts keyword argument
``size`` (e.g. ``rvs(size=(m, n))``) and returns an N-d array sample
of that shape.
statistic : callable
Statistic for which the p-value of the hypothesis test is to be
calculated. `statistic` must be a callable that accepts a sample
(e.g. ``statistic(sample)``) and returns the resulting statistic.
If `vectorized` is set ``True``, `statistic` must also accept a keyword
argument `axis` and be vectorized to compute the statistic along the
provided `axis` of the sample array.
vectorized : bool, optional
If `vectorized` is set ``False``, `statistic` will not be passed
keyword argument `axis` and is expected to calculate the statistic
only for 1D samples. If ``True``, `statistic` will be passed keyword
argument `axis` and is expected to calculate the statistic along `axis`
when passed an ND sample array. If ``None`` (default), `vectorized`
will be set ``True`` if ``axis`` is a parameter of `statistic`. Use of
a vectorized statistic typically reduces computation time.
n_resamples : int, default: 9999
Number of random permutations used to approximate the Monte Carlo null
distribution.
batch : int, optional
The number of permutations to process in each call to `statistic`.
Memory usage is O(`batch`*``sample.size[axis]``). Default is
``None``, in which case `batch` equals `n_resamples`.
alternative : {'two-sided', 'less', 'greater'}
The alternative hypothesis for which the p-value is calculated.
For each alternative, the p-value is defined as follows.
- ``'greater'`` : the percentage of the null distribution that is
greater than or equal to the observed value of the test statistic.
- ``'less'`` : the percentage of the null distribution that is
less than or equal to the observed value of the test statistic.
- ``'two-sided'`` : twice the smaller of the p-values above.
axis : int, default: 0
The axis of `sample` over which to calculate the statistic.
Returns
-------
statistic : float or ndarray
The observed test statistic of the sample.
pvalue : float or ndarray
The p-value for the given alternative.
null_distribution : ndarray
The values of the test statistic generated under the null hypothesis.
References
----------
.. [1] B. Phipson and G. K. Smyth. "Permutation P-values Should Never Be
Zero: Calculating Exact P-values When Permutations Are Randomly Drawn."
Statistical Applications in Genetics and Molecular Biology 9.1 (2010).
Examples
--------
Suppose we wish to test whether a small sample has been drawn from a normal
distribution. We decide that we will use the skew of the sample as a
test statistic, and we will consider a p-value of 0.05 to be statistically
significant.
>>> import numpy as np
>>> from scipy import stats
>>> def statistic(x, axis):
... return stats.skew(x, axis)
After collecting our data, we calculate the observed value of the test
statistic.
>>> rng = np.random.default_rng()
>>> x = stats.skewnorm.rvs(a=1, size=50, random_state=rng)
>>> statistic(x, axis=0)
0.12457412450240658
To determine the probability of observing such an extreme value of the
skewness by chance if the sample were drawn from the normal distribution,
we can perform a Monte Carlo hypothesis test. The test will draw many
samples at random from their normal distribution, calculate the skewness
of each sample, and compare our original skewness against this
distribution to determine an approximate p-value.
>>> from scipy.stats import monte_carlo_test
>>> # because our statistic is vectorized, we pass `vectorized=True`
>>> rvs = lambda size: stats.norm.rvs(size=size, random_state=rng)
>>> res = monte_carlo_test(x, rvs, statistic, vectorized=True)
>>> print(res.statistic)
0.12457412450240658
>>> print(res.pvalue)
0.7012
The probability of obtaining a test statistic less than or equal to the
observed value under the null hypothesis is ~70%. This is greater than
our chosen threshold of 5%, so we cannot consider this to be significant
evidence against the null hypothesis.
Note that this p-value essentially matches that of
`scipy.stats.skewtest`, which relies on an asymptotic distribution of a
test statistic based on the sample skewness.
>>> stats.skewtest(x).pvalue
0.6892046027110614
This asymptotic approximation is not valid for small sample sizes, but
`monte_carlo_test` can be used with samples of any size.
>>> x = stats.skewnorm.rvs(a=1, size=7, random_state=rng)
>>> # stats.skewtest(x) would produce an error due to small sample
>>> res = monte_carlo_test(x, rvs, statistic, vectorized=True)
The Monte Carlo distribution of the test statistic is provided for
further investigation.
>>> import matplotlib.pyplot as plt
>>> fig, ax = plt.subplots()
>>> ax.hist(res.null_distribution, bins=50)
>>> ax.set_title("Monte Carlo distribution of test statistic")
>>> ax.set_xlabel("Value of Statistic")
>>> ax.set_ylabel("Frequency")
>>> plt.show()
"""
args = _monte_carlo_test_iv(sample, rvs, statistic, vectorized,
n_resamples, batch, alternative, axis)
(sample, rvs, statistic, vectorized,
n_resamples, batch, alternative, axis) = args
# Some statistics return plain floats; ensure they're at least np.float64
observed = np.asarray(statistic(sample, axis=-1))[()]
n_observations = sample.shape[-1]
batch_nominal = batch or n_resamples
null_distribution = []
for k in range(0, n_resamples, batch_nominal):
batch_actual = min(batch_nominal, n_resamples-k)
resamples = rvs(size=(batch_actual, n_observations))
null_distribution.append(statistic(resamples, axis=-1))
null_distribution = np.concatenate(null_distribution)
null_distribution = null_distribution.reshape([-1] + [1]*observed.ndim)
def less(null_distribution, observed):
cmps = null_distribution <= observed
pvalues = (cmps.sum(axis=0) + 1) / (n_resamples + 1) # see [1]
return pvalues
def greater(null_distribution, observed):
cmps = null_distribution >= observed
pvalues = (cmps.sum(axis=0) + 1) / (n_resamples + 1) # see [1]
return pvalues
def two_sided(null_distribution, observed):
pvalues_less = less(null_distribution, observed)
pvalues_greater = greater(null_distribution, observed)
pvalues = np.minimum(pvalues_less, pvalues_greater) * 2
return pvalues
compare = {"less": less,
"greater": greater,
"two-sided": two_sided}
pvalues = compare[alternative](null_distribution, observed)
pvalues = np.clip(pvalues, 0, 1)
return MonteCarloTestResult(observed, pvalues, null_distribution)
attributes = ('statistic', 'pvalue', 'null_distribution')
PermutationTestResult = make_dataclass('PermutationTestResult', attributes)
def _all_partitions_concatenated(ns):
"""
Generate all partitions of indices of groups of given sizes, concatenated
`ns` is an iterable of ints.
"""
def all_partitions(z, n):
for c in combinations(z, n):
x0 = set(c)
x1 = z - x0
yield [x0, x1]
def all_partitions_n(z, ns):
if len(ns) == 0:
yield [z]
return
for c in all_partitions(z, ns[0]):
for d in all_partitions_n(c[1], ns[1:]):
yield c[0:1] + d
z = set(range(np.sum(ns)))
for partitioning in all_partitions_n(z, ns[:]):
x = np.concatenate([list(partition)
for partition in partitioning]).astype(int)
yield x
def _batch_generator(iterable, batch):
"""A generator that yields batches of elements from an iterable"""
iterator = iter(iterable)
if batch <= 0:
raise ValueError("`batch` must be positive.")
z = [item for i, item in zip(range(batch), iterator)]
while z: # we don't want StopIteration without yielding an empty list
yield z
z = [item for i, item in zip(range(batch), iterator)]
def _pairings_permutations_gen(n_permutations, n_samples, n_obs_sample, batch,
random_state):
# Returns a generator that yields arrays of size
# `(batch, n_samples, n_obs_sample)`.
# Each row is an independent permutation of indices 0 to `n_obs_sample`.
batch = min(batch, n_permutations)
if hasattr(random_state, 'permuted'):
def batched_perm_generator():
indices = np.arange(n_obs_sample)
indices = np.tile(indices, (batch, n_samples, 1))
for k in range(0, n_permutations, batch):
batch_actual = min(batch, n_permutations-k)
# Don't permute in place, otherwise results depend on `batch`
permuted_indices = random_state.permuted(indices, axis=-1)
yield permuted_indices[:batch_actual]
else: # RandomState and early Generators don't have `permuted`
def batched_perm_generator():
for k in range(0, n_permutations, batch):
batch_actual = min(batch, n_permutations-k)
size = (batch_actual, n_samples, n_obs_sample)
x = random_state.random(size=size)
yield np.argsort(x, axis=-1)[:batch_actual]
return batched_perm_generator()
def _calculate_null_both(data, statistic, n_permutations, batch,
random_state=None):
"""
Calculate null distribution for independent sample tests.
"""
n_samples = len(data)
# compute number of permutations
# (distinct partitions of data into samples of these sizes)
n_obs_i = [sample.shape[-1] for sample in data] # observations per sample
n_obs_ic = np.cumsum(n_obs_i)
n_obs = n_obs_ic[-1] # total number of observations
n_max = np.prod([comb(n_obs_ic[i], n_obs_ic[i-1])
for i in range(n_samples-1, 0, -1)])
# perm_generator is an iterator that produces permutations of indices
# from 0 to n_obs. We'll concatenate the samples, use these indices to
# permute the data, then split the samples apart again.
if n_permutations >= n_max:
exact_test = True
n_permutations = n_max
perm_generator = _all_partitions_concatenated(n_obs_i)
else:
exact_test = False
# Neither RandomState.permutation nor Generator.permutation
# can permute axis-slices independently. If this feature is
# added in the future, batches of the desired size should be
# generated in a single call.
perm_generator = (random_state.permutation(n_obs)
for i in range(n_permutations))
batch = batch or int(n_permutations)
null_distribution = []
# First, concatenate all the samples. In batches, permute samples with
# indices produced by the `perm_generator`, split them into new samples of
# the original sizes, compute the statistic for each batch, and add these
# statistic values to the null distribution.
data = np.concatenate(data, axis=-1)
for indices in _batch_generator(perm_generator, batch=batch):
indices = np.array(indices)
# `indices` is 2D: each row is a permutation of the indices.
# We use it to index `data` along its last axis, which corresponds
# with observations.
# After indexing, the second to last axis of `data_batch` corresponds
# with permutations, and the last axis corresponds with observations.
data_batch = data[..., indices]
# Move the permutation axis to the front: we'll concatenate a list
# of batched statistic values along this zeroth axis to form the
# null distribution.
data_batch = np.moveaxis(data_batch, -2, 0)
data_batch = np.split(data_batch, n_obs_ic[:-1], axis=-1)
null_distribution.append(statistic(*data_batch, axis=-1))
null_distribution = np.concatenate(null_distribution, axis=0)
return null_distribution, n_permutations, exact_test
def _calculate_null_pairings(data, statistic, n_permutations, batch,
random_state=None):
"""
Calculate null distribution for association tests.
"""
n_samples = len(data)
# compute number of permutations (factorial(n) permutations of each sample)
n_obs_sample = data[0].shape[-1] # observations per sample; same for each
n_max = factorial(n_obs_sample)**n_samples
# `perm_generator` is an iterator that produces a list of permutations of
# indices from 0 to n_obs_sample, one for each sample.
if n_permutations >= n_max:
exact_test = True
n_permutations = n_max
batch = batch or int(n_permutations)
# cartesian product of the sets of all permutations of indices
perm_generator = product(*(permutations(range(n_obs_sample))
for i in range(n_samples)))
batched_perm_generator = _batch_generator(perm_generator, batch=batch)
else:
exact_test = False
batch = batch or int(n_permutations)
# Separate random permutations of indices for each sample.
# Again, it would be nice if RandomState/Generator.permutation
# could permute each axis-slice separately.
args = n_permutations, n_samples, n_obs_sample, batch, random_state
batched_perm_generator = _pairings_permutations_gen(*args)
null_distribution = []
for indices in batched_perm_generator:
indices = np.array(indices)
# `indices` is 3D: the zeroth axis is for permutations, the next is
# for samples, and the last is for observations. Swap the first two
# to make the zeroth axis correspond with samples, as it does for
# `data`.
indices = np.swapaxes(indices, 0, 1)
# When we're done, `data_batch` will be a list of length `n_samples`.
# Each element will be a batch of random permutations of one sample.
# The zeroth axis of each batch will correspond with permutations,
# and the last will correspond with observations. (This makes it
# easy to pass into `statistic`.)
data_batch = [None]*n_samples
for i in range(n_samples):
data_batch[i] = data[i][..., indices[i]]
data_batch[i] = np.moveaxis(data_batch[i], -2, 0)
null_distribution.append(statistic(*data_batch, axis=-1))
null_distribution = np.concatenate(null_distribution, axis=0)
return null_distribution, n_permutations, exact_test
def _calculate_null_samples(data, statistic, n_permutations, batch,
random_state=None):
"""
Calculate null distribution for paired-sample tests.
"""
n_samples = len(data)
# By convention, the meaning of the "samples" permutations type for
# data with only one sample is to flip the sign of the observations.
# Achieve this by adding a second sample - the negative of the original.
if n_samples == 1:
data = [data[0], -data[0]]
# The "samples" permutation strategy is the same as the "pairings"
# strategy except the roles of samples and observations are flipped.
# So swap these axes, then we'll use the function for the "pairings"
# strategy to do all the work!
data = np.swapaxes(data, 0, -1)
# (Of course, the user's statistic doesn't know what we've done here,
# so we need to pass it what it's expecting.)
def statistic_wrapped(*data, axis):
data = np.swapaxes(data, 0, -1)
if n_samples == 1:
data = data[0:1]
return statistic(*data, axis=axis)
return _calculate_null_pairings(data, statistic_wrapped, n_permutations,
batch, random_state)
def _permutation_test_iv(data, statistic, permutation_type, vectorized,
n_resamples, batch, alternative, axis, random_state):
"""Input validation for `permutation_test`."""
axis_int = int(axis)
if axis != axis_int:
raise ValueError("`axis` must be an integer.")
permutation_types = {'samples', 'pairings', 'independent'}
permutation_type = permutation_type.lower()
if permutation_type not in permutation_types:
raise ValueError(f"`permutation_type` must be in {permutation_types}.")
if vectorized not in {True, False, None}:
raise ValueError("`vectorized` must be `True`, `False`, or `None`.")
if vectorized is None:
vectorized = 'axis' in inspect.signature(statistic).parameters
if not vectorized:
statistic = _vectorize_statistic(statistic)
message = "`data` must be a tuple containing at least two samples"
try:
if len(data) < 2 and permutation_type == 'independent':
raise ValueError(message)
except TypeError:
raise TypeError(message)
data = _broadcast_arrays(data, axis)
data_iv = []
for sample in data:
sample = np.atleast_1d(sample)
if sample.shape[axis] <= 1:
raise ValueError("each sample in `data` must contain two or more "
"observations along `axis`.")
sample = np.moveaxis(sample, axis_int, -1)
data_iv.append(sample)
n_resamples_int = (int(n_resamples) if not np.isinf(n_resamples)
else np.inf)
if n_resamples != n_resamples_int or n_resamples_int <= 0:
raise ValueError("`n_resamples` must be a positive integer.")
if batch is None:
batch_iv = batch
else:
batch_iv = int(batch)
if batch != batch_iv or batch_iv <= 0:
raise ValueError("`batch` must be a positive integer or None.")
alternatives = {'two-sided', 'greater', 'less'}
alternative = alternative.lower()
if alternative not in alternatives:
raise ValueError(f"`alternative` must be in {alternatives}")
random_state = check_random_state(random_state)
return (data_iv, statistic, permutation_type, vectorized, n_resamples_int,
batch_iv, alternative, axis_int, random_state)
def permutation_test(data, statistic, *, permutation_type='independent',
vectorized=None, n_resamples=9999, batch=None,
alternative="two-sided", axis=0, random_state=None):
r"""
Performs a permutation test of a given statistic on provided data.
For independent sample statistics, the null hypothesis is that the data are
randomly sampled from the same distribution.
For paired sample statistics, two null hypothesis can be tested:
that the data are paired at random or that the data are assigned to samples
at random.
Parameters
----------
data : iterable of array-like
Contains the samples, each of which is an array of observations.
Dimensions of sample arrays must be compatible for broadcasting except
along `axis`.
statistic : callable
Statistic for which the p-value of the hypothesis test is to be
calculated. `statistic` must be a callable that accepts samples
as separate arguments (e.g. ``statistic(*data)``) and returns the
resulting statistic.
If `vectorized` is set ``True``, `statistic` must also accept a keyword
argument `axis` and be vectorized to compute the statistic along the
provided `axis` of the sample arrays.
permutation_type : {'independent', 'samples', 'pairings'}, optional
The type of permutations to be performed, in accordance with the
null hypothesis. The first two permutation types are for paired sample
statistics, in which all samples contain the same number of
observations and observations with corresponding indices along `axis`
are considered to be paired; the third is for independent sample
statistics.
- ``'samples'`` : observations are assigned to different samples
but remain paired with the same observations from other samples.
This permutation type is appropriate for paired sample hypothesis
tests such as the Wilcoxon signed-rank test and the paired t-test.
- ``'pairings'`` : observations are paired with different observations,
but they remain within the same sample. This permutation type is
appropriate for association/correlation tests with statistics such
as Spearman's :math:`\rho`, Kendall's :math:`\tau`, and Pearson's
:math:`r`.
- ``'independent'`` (default) : observations are assigned to different
samples. Samples may contain different numbers of observations. This
permutation type is appropriate for independent sample hypothesis
tests such as the Mann-Whitney :math:`U` test and the independent
sample t-test.
Please see the Notes section below for more detailed descriptions
of the permutation types.
vectorized : bool, optional
If `vectorized` is set ``False``, `statistic` will not be passed
keyword argument `axis` and is expected to calculate the statistic
only for 1D samples. If ``True``, `statistic` will be passed keyword
argument `axis` and is expected to calculate the statistic along `axis`
when passed an ND sample array. If ``None`` (default), `vectorized`
will be set ``True`` if ``axis`` is a parameter of `statistic`. Use
of a vectorized statistic typically reduces computation time.
n_resamples : int or np.inf, default: 9999
Number of random permutations (resamples) used to approximate the null
distribution. If greater than or equal to the number of distinct
permutations, the exact null distribution will be computed.
Note that the number of distinct permutations grows very rapidly with
the sizes of samples, so exact tests are feasible only for very small
data sets.
batch : int, optional
The number of permutations to process in each call to `statistic`.
Memory usage is O(`batch`*``n``), where ``n`` is the total size
of all samples, regardless of the value of `vectorized`. Default is
``None``, in which case ``batch`` is the number of permutations.
alternative : {'two-sided', 'less', 'greater'}, optional
The alternative hypothesis for which the p-value is calculated.
For each alternative, the p-value is defined for exact tests as
follows.
- ``'greater'`` : the percentage of the null distribution that is
greater than or equal to the observed value of the test statistic.
- ``'less'`` : the percentage of the null distribution that is
less than or equal to the observed value of the test statistic.
- ``'two-sided'`` (default) : twice the smaller of the p-values above.
Note that p-values for randomized tests are calculated according to the
conservative (over-estimated) approximation suggested in [2]_ and [3]_
rather than the unbiased estimator suggested in [4]_. That is, when
calculating the proportion of the randomized null distribution that is
as extreme as the observed value of the test statistic, the values in
the numerator and denominator are both increased by one. An
interpretation of this adjustment is that the observed value of the
test statistic is always included as an element of the randomized
null distribution.
The convention used for two-sided p-values is not universal;
the observed test statistic and null distribution are returned in
case a different definition is preferred.
axis : int, default: 0
The axis of the (broadcasted) samples over which to calculate the
statistic. If samples have a different number of dimensions,
singleton dimensions are prepended to samples with fewer dimensions
before `axis` is considered.
random_state : {None, int, `numpy.random.Generator`,
`numpy.random.RandomState`}, optional
Pseudorandom number generator state used to generate permutations.
If `random_state` is ``None`` (default), the
`numpy.random.RandomState` singleton is used.
If `random_state` is an int, a new ``RandomState`` instance is used,
seeded with `random_state`.
If `random_state` is already a ``Generator`` or ``RandomState``
instance then that instance is used.
Returns
-------
statistic : float or ndarray
The observed test statistic of the data.
pvalue : float or ndarray
The p-value for the given alternative.
null_distribution : ndarray
The values of the test statistic generated under the null hypothesis.
Notes
-----
The three types of permutation tests supported by this function are
described below.
**Unpaired statistics** (``permutation_type='independent'``):
The null hypothesis associated with this permutation type is that all
observations are sampled from the same underlying distribution and that
they have been assigned to one of the samples at random.
Suppose ``data`` contains two samples; e.g. ``a, b = data``.
When ``1 < n_resamples < binom(n, k)``, where
* ``k`` is the number of observations in ``a``,
* ``n`` is the total number of observations in ``a`` and ``b``, and
* ``binom(n, k)`` is the binomial coefficient (``n`` choose ``k``),
the data are pooled (concatenated), randomly assigned to either the first
or second sample, and the statistic is calculated. This process is
performed repeatedly, `permutation` times, generating a distribution of the
statistic under the null hypothesis. The statistic of the original
data is compared to this distribution to determine the p-value.
When ``n_resamples >= binom(n, k)``, an exact test is performed: the data
are *partitioned* between the samples in each distinct way exactly once,
and the exact null distribution is formed.
Note that for a given partitioning of the data between the samples,
only one ordering/permutation of the data *within* each sample is
considered. For statistics that do not depend on the order of the data
within samples, this dramatically reduces computational cost without
affecting the shape of the null distribution (because the frequency/count
of each value is affected by the same factor).
For ``a = [a1, a2, a3, a4]`` and ``b = [b1, b2, b3]``, an example of this
permutation type is ``x = [b3, a1, a2, b2]`` and ``y = [a4, b1, a3]``.
Because only one ordering/permutation of the data *within* each sample
is considered in an exact test, a resampling like ``x = [b3, a1, b2, a2]``
and ``y = [a4, a3, b1]`` would *not* be considered distinct from the
example above.
``permutation_type='independent'`` does not support one-sample statistics,
but it can be applied to statistics with more than two samples. In this
case, if ``n`` is an array of the number of observations within each
sample, the number of distinct partitions is::
np.product([binom(sum(n[i:]), sum(n[i+1:])) for i in range(len(n)-1)])
**Paired statistics, permute pairings** (``permutation_type='pairings'``):
The null hypothesis associated with this permutation type is that
observations within each sample are drawn from the same underlying
distribution and that pairings with elements of other samples are
assigned at random.
Suppose ``data`` contains only one sample; e.g. ``a, = data``, and we
wish to consider all possible pairings of elements of ``a`` with elements
of a second sample, ``b``. Let ``n`` be the number of observations in
``a``, which must also equal the number of observations in ``b``.
When ``1 < n_resamples < factorial(n)``, the elements of ``a`` are
randomly permuted. The user-supplied statistic accepts one data argument,
say ``a_perm``, and calculates the statistic considering ``a_perm`` and
``b``. This process is performed repeatedly, `permutation` times,
generating a distribution of the statistic under the null hypothesis.
The statistic of the original data is compared to this distribution to
determine the p-value.
When ``n_resamples >= factorial(n)``, an exact test is performed:
``a`` is permuted in each distinct way exactly once. Therefore, the
`statistic` is computed for each unique pairing of samples between ``a``
and ``b`` exactly once.
For ``a = [a1, a2, a3]`` and ``b = [b1, b2, b3]``, an example of this
permutation type is ``a_perm = [a3, a1, a2]`` while ``b`` is left
in its original order.
``permutation_type='pairings'`` supports ``data`` containing any number
of samples, each of which must contain the same number of observations.
All samples provided in ``data`` are permuted *independently*. Therefore,
if ``m`` is the number of samples and ``n`` is the number of observations
within each sample, then the number of permutations in an exact test is::
factorial(n)**m
Note that if a two-sample statistic, for example, does not inherently
depend on the order in which observations are provided - only on the
*pairings* of observations - then only one of the two samples should be
provided in ``data``. This dramatically reduces computational cost without
affecting the shape of the null distribution (because the frequency/count
of each value is affected by the same factor).
**Paired statistics, permute samples** (``permutation_type='samples'``):
The null hypothesis associated with this permutation type is that
observations within each pair are drawn from the same underlying
distribution and that the sample to which they are assigned is random.
Suppose ``data`` contains two samples; e.g. ``a, b = data``.
Let ``n`` be the number of observations in ``a``, which must also equal
the number of observations in ``b``.
When ``1 < n_resamples < 2**n``, the elements of ``a`` are ``b`` are
randomly swapped between samples (maintaining their pairings) and the
statistic is calculated. This process is performed repeatedly,
`permutation` times, generating a distribution of the statistic under the
null hypothesis. The statistic of the original data is compared to this
distribution to determine the p-value.
When ``n_resamples >= 2**n``, an exact test is performed: the observations
are assigned to the two samples in each distinct way (while maintaining
pairings) exactly once.
For ``a = [a1, a2, a3]`` and ``b = [b1, b2, b3]``, an example of this
permutation type is ``x = [b1, a2, b3]`` and ``y = [a1, b2, a3]``.
``permutation_type='samples'`` supports ``data`` containing any number
of samples, each of which must contain the same number of observations.
If ``data`` contains more than one sample, paired observations within
``data`` are exchanged between samples *independently*. Therefore, if ``m``
is the number of samples and ``n`` is the number of observations within
each sample, then the number of permutations in an exact test is::
factorial(m)**n
Several paired-sample statistical tests, such as the Wilcoxon signed rank
test and paired-sample t-test, can be performed considering only the
*difference* between two paired elements. Accordingly, if ``data`` contains
only one sample, then the null distribution is formed by independently
changing the *sign* of each observation.
.. warning::
The p-value is calculated by counting the elements of the null
distribution that are as extreme or more extreme than the observed
value of the statistic. Due to the use of finite precision arithmetic,
some statistic functions return numerically distinct values when the
theoretical values would be exactly equal. In some cases, this could
lead to a large error in the calculated p-value. `permutation_test`
guards against this by considering elements in the null distribution
that are "close" (within a factor of ``1+1e-14``) to the observed
value of the test statistic as equal to the observed value of the
test statistic. However, the user is advised to inspect the null
distribution to assess whether this method of comparison is
appropriate, and if not, calculate the p-value manually. See example
below.
References
----------
.. [1] R. A. Fisher. The Design of Experiments, 6th Ed (1951).
.. [2] B. Phipson and G. K. Smyth. "Permutation P-values Should Never Be
Zero: Calculating Exact P-values When Permutations Are Randomly Drawn."
Statistical Applications in Genetics and Molecular Biology 9.1 (2010).
.. [3] M. D. Ernst. "Permutation Methods: A Basis for Exact Inference".
Statistical Science (2004).
.. [4] B. Efron and R. J. Tibshirani. An Introduction to the Bootstrap
(1993).
Examples
--------
Suppose we wish to test whether two samples are drawn from the same
distribution. Assume that the underlying distributions are unknown to us,
and that before observing the data, we hypothesized that the mean of the
first sample would be less than that of the second sample. We decide that
we will use the difference between the sample means as a test statistic,
and we will consider a p-value of 0.05 to be statistically significant.
For efficiency, we write the function defining the test statistic in a
vectorized fashion: the samples ``x`` and ``y`` can be ND arrays, and the
statistic will be calculated for each axis-slice along `axis`.
>>> import numpy as np
>>> def statistic(x, y, axis):
... return np.mean(x, axis=axis) - np.mean(y, axis=axis)
After collecting our data, we calculate the observed value of the test
statistic.
>>> from scipy.stats import norm
>>> rng = np.random.default_rng()
>>> x = norm.rvs(size=5, random_state=rng)
>>> y = norm.rvs(size=6, loc = 3, random_state=rng)
>>> statistic(x, y, 0)
-3.5411688580987266
Indeed, the test statistic is negative, suggesting that the true mean of
the distribution underlying ``x`` is less than that of the distribution
underlying ``y``. To determine the probability of this occuring by chance
if the two samples were drawn from the same distribution, we perform
a permutation test.
>>> from scipy.stats import permutation_test
>>> # because our statistic is vectorized, we pass `vectorized=True`
>>> # `n_resamples=np.inf` indicates that an exact test is to be performed
>>> res = permutation_test((x, y), statistic, vectorized=True,
... n_resamples=np.inf, alternative='less')
>>> print(res.statistic)
-3.5411688580987266
>>> print(res.pvalue)
0.004329004329004329
The probability of obtaining a test statistic less than or equal to the
observed value under the null hypothesis is 0.4329%. This is less than our
chosen threshold of 5%, so we consider this to be significant evidence
against the null hypothesis in favor of the alternative.
Because the size of the samples above was small, `permutation_test` could
perform an exact test. For larger samples, we resort to a randomized
permutation test.
>>> x = norm.rvs(size=100, random_state=rng)
>>> y = norm.rvs(size=120, loc=0.3, random_state=rng)
>>> res = permutation_test((x, y), statistic, n_resamples=100000,
... vectorized=True, alternative='less',
... random_state=rng)
>>> print(res.statistic)
-0.5230459671240913
>>> print(res.pvalue)
0.00016999830001699983
The approximate probability of obtaining a test statistic less than or
equal to the observed value under the null hypothesis is 0.0225%. This is
again less than our chosen threshold of 5%, so again we have significant
evidence to reject the null hypothesis in favor of the alternative.
For large samples and number of permutations, the result is comparable to
that of the corresponding asymptotic test, the independent sample t-test.
>>> from scipy.stats import ttest_ind
>>> res_asymptotic = ttest_ind(x, y, alternative='less')
>>> print(res_asymptotic.pvalue)
0.00012688101537979522
The permutation distribution of the test statistic is provided for
further investigation.
>>> import matplotlib.pyplot as plt
>>> plt.hist(res.null_distribution, bins=50)
>>> plt.title("Permutation distribution of test statistic")
>>> plt.xlabel("Value of Statistic")
>>> plt.ylabel("Frequency")
>>> plt.show()
Inspection of the null distribution is essential if the statistic suffers
from inaccuracy due to limited machine precision. Consider the following
case:
>>> from scipy.stats import pearsonr
>>> x = [1, 2, 4, 3]
>>> y = [2, 4, 6, 8]
>>> def statistic(x, y):
... return pearsonr(x, y).statistic
>>> res = permutation_test((x, y), statistic, vectorized=False,
... permutation_type='pairings',
... alternative='greater')
>>> r, pvalue, null = res.statistic, res.pvalue, res.null_distribution
In this case, some elements of the null distribution differ from the
observed value of the correlation coefficient ``r`` due to numerical noise.
We manually inspect the elements of the null distribution that are nearly
the same as the observed value of the test statistic.
>>> r
0.8
>>> unique = np.unique(null)
>>> unique
array([-1. , -0.8, -0.8, -0.6, -0.4, -0.2, -0.2, 0. , 0.2, 0.2, 0.4,
0.6, 0.8, 0.8, 1. ]) # may vary
>>> unique[np.isclose(r, unique)].tolist()
[0.7999999999999999, 0.8]
If `permutation_test` were to perform the comparison naively, the
elements of the null distribution with value ``0.7999999999999999`` would
not be considered as extreme or more extreme as the observed value of the
statistic, so the calculated p-value would be too small.
>>> incorrect_pvalue = np.count_nonzero(null >= r) / len(null)
>>> incorrect_pvalue
0.1111111111111111 # may vary
Instead, `permutation_test` treats elements of the null distribution that
are within ``max(1e-14, abs(r)*1e-14)`` of the observed value of the
statistic ``r`` to be equal to ``r``.
>>> correct_pvalue = np.count_nonzero(null >= r - 1e-14) / len(null)
>>> correct_pvalue
0.16666666666666666
>>> res.pvalue == correct_pvalue
True
This method of comparison is expected to be accurate in most practical
situations, but the user is advised to assess this by inspecting the
elements of the null distribution that are close to the observed value
of the statistic. Also, consider the use of statistics that can be
calculated using exact arithmetic (e.g. integer statistics).
"""
args = _permutation_test_iv(data, statistic, permutation_type, vectorized,
n_resamples, batch, alternative, axis,
random_state)
(data, statistic, permutation_type, vectorized, n_resamples, batch,
alternative, axis, random_state) = args
observed = statistic(*data, axis=-1)
null_calculators = {"pairings": _calculate_null_pairings,
"samples": _calculate_null_samples,
"independent": _calculate_null_both}
null_calculator_args = (data, statistic, n_resamples,
batch, random_state)
calculate_null = null_calculators[permutation_type]
null_distribution, n_resamples, exact_test = (
calculate_null(*null_calculator_args))
# See References [2] and [3]
adjustment = 0 if exact_test else 1
# relative tolerance for detecting numerically distinct but
# theoretically equal values in the null distribution
eps = 1e-14
gamma = np.maximum(eps, np.abs(eps * observed))
def less(null_distribution, observed):
cmps = null_distribution <= observed + gamma
pvalues = (cmps.sum(axis=0) + adjustment) / (n_resamples + adjustment)
return pvalues
def greater(null_distribution, observed):
cmps = null_distribution >= observed - gamma
pvalues = (cmps.sum(axis=0) + adjustment) / (n_resamples + adjustment)
return pvalues
def two_sided(null_distribution, observed):
pvalues_less = less(null_distribution, observed)
pvalues_greater = greater(null_distribution, observed)
pvalues = np.minimum(pvalues_less, pvalues_greater) * 2
return pvalues
compare = {"less": less,
"greater": greater,
"two-sided": two_sided}
pvalues = compare[alternative](null_distribution, observed)
pvalues = np.clip(pvalues, 0, 1)
return PermutationTestResult(observed, pvalues, null_distribution)
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