org.apache.commons.math4.stat.inference

## Class KolmogorovSmirnovTest

• java.lang.Object
• org.apache.commons.math4.stat.inference.KolmogorovSmirnovTest

• public class KolmogorovSmirnovTest
extends Object
Implementation of the Kolmogorov-Smirnov (K-S) test for equality of continuous distributions.

The K-S test uses a statistic based on the maximum deviation of the empirical distribution of sample data points from the distribution expected under the null hypothesis. For one-sample tests evaluating the null hypothesis that a set of sample data points follow a given distribution, the test statistic is $$D_n=\sup_x |F_n(x)-F(x)|$$, where $$F$$ is the expected distribution and $$F_n$$ is the empirical distribution of the $$n$$ sample data points. The distribution of $$D_n$$ is estimated using a method based on [1] with certain quick decisions for extreme values given in [2].

Two-sample tests are also supported, evaluating the null hypothesis that the two samples x and y come from the same underlying distribution. In this case, the test statistic is $$D_{n,m}=\sup_t | F_n(t)-F_m(t)|$$ where $$n$$ is the length of x, $$m$$ is the length of y, $$F_n$$ is the empirical distribution that puts mass $$1/n$$ at each of the values in x and $$F_m$$ is the empirical distribution of the y values. The default 2-sample test method, kolmogorovSmirnovTest(double[], double[]) works as follows:

• When the product of the sample sizes is less than 10000, the method presented in [4] is used to compute the exact p-value for the 2-sample test.
• When the product of the sample sizes is larger, the asymptotic distribution of $$D_{n,m}$$ is used. See approximateP(double, int, int) for details on the approximation.

For small samples (former case), if the data contains ties, random jitter is added to the sample data to break ties before applying the algorithm above. Alternatively, the bootstrap(double[],double[],int,boolean,UniformRandomProvider) method, modeled after ks.boot in the R Matching package [3], can be used if ties are known to be present in the data.

In the two-sample case, $$D_{n,m}$$ has a discrete distribution. This makes the p-value associated with the null hypothesis $$H_0 : D_{n,m} \ge d$$ differ from $$H_0 : D_{n,m} \ge d$$ by the mass of the observed value $$d$$. To distinguish these, the two-sample tests use a boolean strict parameter. This parameter is ignored for large samples.

The methods used by the 2-sample default implementation are also exposed directly:

References:

Note that [1] contains an error in computing h, refer to MATH-437 for details.
Since:
3.3
• ### Constructor Summary

Constructors
Constructor and Description
KolmogorovSmirnovTest()
• ### Method Summary

All Methods
Modifier and Type Method and Description
double approximateP(double d, int n, int m)
Uses the Kolmogorov-Smirnov distribution to approximate $$P(D_{n,m} > d)$$ where $$D_{n,m}$$ is the 2-sample Kolmogorov-Smirnov statistic.
double bootstrap(double[] x, double[] y, int iterations, boolean strict, org.apache.commons.rng.UniformRandomProvider rng)
Estimates the p-value of a two-sample Kolmogorov-Smirnov test evaluating the null hypothesis that x and y are samples drawn from the same probability distribution.
double cdf(double d, int n)
Calculates $$P(D_n < d)$$ using the method described in [1] with quick decisions for extreme values given in [2] (see above).
double cdf(double d, int n, boolean exact)
Calculates P(D_n < d) using method described in [1] with quick decisions for extreme values given in [2] (see above).
double cdfExact(double d, int n)
Calculates P(D_n < d).
double exactP(double d, int n, int m, boolean strict)
Computes $$P(D_{n,m} > d)$$ if strict is true; otherwise $$P(D_{n,m} \ge d)$$, where $$D_{n,m}$$ is the 2-sample Kolmogorov-Smirnov statistic.
double kolmogorovSmirnovStatistic(org.apache.commons.statistics.distribution.ContinuousDistribution distribution, double[] data)
Computes the one-sample Kolmogorov-Smirnov test statistic, $$D_n=\sup_x |F_n(x)-F(x)|$$ where $$F$$ is the distribution (cdf) function associated with distribution, $$n$$ is the length of data and $$F_n$$ is the empirical distribution that puts mass $$1/n$$ at each of the values in data.
double kolmogorovSmirnovStatistic(double[] x, double[] y)
Computes the two-sample Kolmogorov-Smirnov test statistic, $$D_{n,m}=\sup_x |F_n(x)-F_m(x)|$$ where $$n$$ is the length of x, $$m$$ is the length of y, $$F_n$$ is the empirical distribution that puts mass $$1/n$$ at each of the values in x and $$F_m$$ is the empirical distribution of the y values.
double kolmogorovSmirnovTest(org.apache.commons.statistics.distribution.ContinuousDistribution distribution, double[] data)
Computes the p-value, or observed significance level, of a one-sample Kolmogorov-Smirnov test evaluating the null hypothesis that data conforms to distribution.
double kolmogorovSmirnovTest(org.apache.commons.statistics.distribution.ContinuousDistribution distribution, double[] data, boolean exact)
Computes the p-value, or observed significance level, of a one-sample Kolmogorov-Smirnov test evaluating the null hypothesis that data conforms to distribution.
boolean kolmogorovSmirnovTest(org.apache.commons.statistics.distribution.ContinuousDistribution distribution, double[] data, double alpha)
Performs a Kolmogorov-Smirnov test evaluating the null hypothesis that data conforms to distribution.
double kolmogorovSmirnovTest(double[] x, double[] y)
Computes the p-value, or observed significance level, of a two-sample Kolmogorov-Smirnov test evaluating the null hypothesis that x and y are samples drawn from the same probability distribution.
double kolmogorovSmirnovTest(double[] x, double[] y, boolean strict)
Computes the p-value, or observed significance level, of a two-sample Kolmogorov-Smirnov test evaluating the null hypothesis that x and y are samples drawn from the same probability distribution.
double ksSum(double t, double tolerance, int maxIterations)
Computes $$1 + 2 \sum_{i=1}^\infty (-1)^i e^{-2 i^2 t^2}$$ stopping when successive partial sums are within tolerance of one another, or when maxIterations partial sums have been computed.
double monteCarloP(double d, int n, int m, boolean strict, int iterations, org.apache.commons.rng.UniformRandomProvider rng)
Uses Monte Carlo simulation to approximate $$P(D_{n,m} > d)$$ where $$D_{n,m}$$ is the 2-sample Kolmogorov-Smirnov statistic.
double pelzGood(double d, int n)
Computes the Pelz-Good approximation for $$P(D_n < d)$$ as described in [2] in the class javadoc.
• ### Methods inherited from class java.lang.Object

clone, equals, finalize, getClass, hashCode, notify, notifyAll, toString, wait, wait, wait
• ### Constructor Detail

• #### KolmogorovSmirnovTest

public KolmogorovSmirnovTest()
• ### Method Detail

• #### kolmogorovSmirnovTest

public double kolmogorovSmirnovTest(org.apache.commons.statistics.distribution.ContinuousDistribution distribution,
double[] data,
boolean exact)
Computes the p-value, or observed significance level, of a one-sample Kolmogorov-Smirnov test evaluating the null hypothesis that data conforms to distribution. If exact is true, the distribution used to compute the p-value is computed using extended precision. See cdfExact(double, int).
Parameters:
distribution - reference distribution
data - sample being being evaluated
exact - whether or not to force exact computation of the p-value
Returns:
the p-value associated with the null hypothesis that data is a sample from distribution
Throws:
InsufficientDataException - if data does not have length at least 2
NullArgumentException - if data is null
• #### kolmogorovSmirnovStatistic

public double kolmogorovSmirnovStatistic(org.apache.commons.statistics.distribution.ContinuousDistribution distribution,
double[] data)
Computes the one-sample Kolmogorov-Smirnov test statistic, $$D_n=\sup_x |F_n(x)-F(x)|$$ where $$F$$ is the distribution (cdf) function associated with distribution, $$n$$ is the length of data and $$F_n$$ is the empirical distribution that puts mass $$1/n$$ at each of the values in data.
Parameters:
distribution - reference distribution
data - sample being evaluated
Returns:
Kolmogorov-Smirnov statistic $$D_n$$
Throws:
InsufficientDataException - if data does not have length at least 2
NullArgumentException - if data is null
• #### kolmogorovSmirnovTest

public double kolmogorovSmirnovTest(double[] x,
double[] y,
boolean strict)
Computes the p-value, or observed significance level, of a two-sample Kolmogorov-Smirnov test evaluating the null hypothesis that x and y are samples drawn from the same probability distribution. Specifically, what is returned is an estimate of the probability that the kolmogorovSmirnovStatistic(double[], double[]) associated with a randomly selected partition of the combined sample into subsamples of sizes x.length and y.length will strictly exceed (if strict is true) or be at least as large as (if strict is false) as kolmogorovSmirnovStatistic(x, y).
Parameters:
x - first sample dataset.
y - second sample dataset.
strict - whether or not the probability to compute is expressed as a strict inequality (ignored for large samples).
Returns:
p-value associated with the null hypothesis that x and y represent samples from the same distribution.
Throws:
InsufficientDataException - if either x or y does not have length at least 2.
NullArgumentException - if either x or y is null.
NotANumberException - if the input arrays contain NaN values.
bootstrap(double[],double[],int,boolean,UniformRandomProvider)
• #### kolmogorovSmirnovTest

public double kolmogorovSmirnovTest(double[] x,
double[] y)
Computes the p-value, or observed significance level, of a two-sample Kolmogorov-Smirnov test evaluating the null hypothesis that x and y are samples drawn from the same probability distribution. Assumes the strict form of the inequality used to compute the p-value. See kolmogorovSmirnovTest(ContinuousDistribution, double[], boolean).
Parameters:
x - first sample dataset
y - second sample dataset
Returns:
p-value associated with the null hypothesis that x and y represent samples from the same distribution
Throws:
InsufficientDataException - if either x or y does not have length at least 2
NullArgumentException - if either x or y is null
• #### kolmogorovSmirnovStatistic

public double kolmogorovSmirnovStatistic(double[] x,
double[] y)
Computes the two-sample Kolmogorov-Smirnov test statistic, $$D_{n,m}=\sup_x |F_n(x)-F_m(x)|$$ where $$n$$ is the length of x, $$m$$ is the length of y, $$F_n$$ is the empirical distribution that puts mass $$1/n$$ at each of the values in x and $$F_m$$ is the empirical distribution of the y values.
Parameters:
x - first sample
y - second sample
Returns:
test statistic $$D_{n,m}$$ used to evaluate the null hypothesis that x and y represent samples from the same underlying distribution
Throws:
InsufficientDataException - if either x or y does not have length at least 2
NullArgumentException - if either x or y is null
• #### kolmogorovSmirnovTest

public double kolmogorovSmirnovTest(org.apache.commons.statistics.distribution.ContinuousDistribution distribution,
double[] data)
Computes the p-value, or observed significance level, of a one-sample Kolmogorov-Smirnov test evaluating the null hypothesis that data conforms to distribution.
Parameters:
distribution - reference distribution
data - sample being being evaluated
Returns:
the p-value associated with the null hypothesis that data is a sample from distribution
Throws:
InsufficientDataException - if data does not have length at least 2
NullArgumentException - if data is null
• #### kolmogorovSmirnovTest

public boolean kolmogorovSmirnovTest(org.apache.commons.statistics.distribution.ContinuousDistribution distribution,
double[] data,
double alpha)
Performs a Kolmogorov-Smirnov test evaluating the null hypothesis that data conforms to distribution.
Parameters:
distribution - reference distribution
data - sample being being evaluated
alpha - significance level of the test
Returns:
true iff the null hypothesis that data is a sample from distribution can be rejected with confidence 1 - alpha
Throws:
InsufficientDataException - if data does not have length at least 2
NullArgumentException - if data is null
• #### bootstrap

public double bootstrap(double[] x,
double[] y,
int iterations,
boolean strict,
org.apache.commons.rng.UniformRandomProvider rng)
Estimates the p-value of a two-sample Kolmogorov-Smirnov test evaluating the null hypothesis that x and y are samples drawn from the same probability distribution. This method estimates the p-value by repeatedly sampling sets of size x.length and y.length from the empirical distribution of the combined sample. When strict is true, this is equivalent to the algorithm implemented in the R function ks.boot, described in
 Jasjeet S. Sekhon. 2011. 'Multivariate and Propensity Score Matching
Software with Automated Balance Optimization: The Matching package for R.'
Journal of Statistical Software, 42(7): 1-52.

Parameters:
x - First sample.
y - Second sample.
iterations - Number of bootstrap resampling iterations.
strict - Whether or not the null hypothesis is expressed as a strict inequality.
rng - RNG for creating the sampling sets.
Returns:
the estimated p-value.
• #### cdf

public double cdf(double d,
int n)
Calculates $$P(D_n < d)$$ using the method described in [1] with quick decisions for extreme values given in [2] (see above). The result is not exact as with cdfExact(double, int) because calculations are based on double rather than BigFraction.
Parameters:
d - statistic
n - sample size
Returns:
$$P(D_n < d)$$
Throws:
MathArithmeticException - if algorithm fails to convert h to a BigFraction in expressing d as $$(k - h) / m$$ for integer k, m and $$0 \le h < 1$$
• #### cdfExact

public double cdfExact(double d,
int n)
Calculates P(D_n < d). The result is exact in the sense that BigFraction/BigReal is used everywhere at the expense of very slow execution time. Almost never choose this in real applications unless you are very sure; this is almost solely for verification purposes. Normally, you would choose cdf(double, int). See the class javadoc for definitions and algorithm description.
Parameters:
d - statistic
n - sample size
Returns:
$$P(D_n < d)$$
Throws:
MathArithmeticException - if the algorithm fails to convert h to a BigFraction in expressing d as $$(k - h) / m$$ for integer k, m and $$0 \le h < 1$$
• #### cdf

public double cdf(double d,
int n,
boolean exact)
Calculates P(D_n < d) using method described in [1] with quick decisions for extreme values given in [2] (see above).
Parameters:
d - statistic
n - sample size
exact - whether the probability should be calculated exact using BigFraction everywhere at the expense of very slow execution time, or if double should be used convenient places to gain speed. Almost never choose true in real applications unless you are very sure; true is almost solely for verification purposes.
Returns:
$$P(D_n < d)$$
Throws:
MathArithmeticException - if algorithm fails to convert h to a BigFraction in expressing d as $$(k - h) / m$$ for integer k, m and $$0 \le h < 1$$.
• #### pelzGood

public double pelzGood(double d,
int n)
Computes the Pelz-Good approximation for $$P(D_n < d)$$ as described in [2] in the class javadoc.
Parameters:
d - value of d-statistic (x in [2])
n - sample size
Returns:
$$P(D_n < d)$$
Since:
3.4
• #### ksSum

public double ksSum(double t,
double tolerance,
int maxIterations)
Computes $$1 + 2 \sum_{i=1}^\infty (-1)^i e^{-2 i^2 t^2}$$ stopping when successive partial sums are within tolerance of one another, or when maxIterations partial sums have been computed. If the sum does not converge before maxIterations iterations a TooManyIterationsException is thrown.
Parameters:
t - argument
tolerance - Cauchy criterion for partial sums
maxIterations - maximum number of partial sums to compute
Returns:
Kolmogorov sum evaluated at t
Throws:
TooManyIterationsException - if the series does not converge
• #### exactP

public double exactP(double d,
int n,
int m,
boolean strict)
Computes $$P(D_{n,m} > d)$$ if strict is true; otherwise $$P(D_{n,m} \ge d)$$, where $$D_{n,m}$$ is the 2-sample Kolmogorov-Smirnov statistic. See kolmogorovSmirnovStatistic(double[], double[]) for the definition of $$D_{n,m}$$.

The returned probability is exact, implemented by unwinding the recursive function definitions presented in [4] (class javadoc).

Parameters:
d - D-statistic value
n - first sample size
m - second sample size
strict - whether or not the probability to compute is expressed as a strict inequality
Returns:
probability that a randomly selected m-n partition of m + n generates $$D_{n,m}$$ greater than (resp. greater than or equal to) d
• #### approximateP

public double approximateP(double d,
int n,
int m)
Uses the Kolmogorov-Smirnov distribution to approximate $$P(D_{n,m} > d)$$ where $$D_{n,m}$$ is the 2-sample Kolmogorov-Smirnov statistic. See kolmogorovSmirnovStatistic(double[], double[]) for the definition of $$D_{n,m}$$.

Specifically, what is returned is $$1 - k(d \sqrt{mn / (m + n)})$$ where $$k(t) = 1 + 2 \sum_{i=1}^\infty (-1)^i e^{-2 i^2 t^2}$$. See ksSum(double, double, int) for details on how convergence of the sum is determined.

Parameters:
d - D-statistic value
n - first sample size
m - second sample size
Returns:
approximate probability that a randomly selected m-n partition of m + n generates $$D_{n,m}$$ greater than d
• #### monteCarloP

public double monteCarloP(double d,
int n,
int m,
boolean strict,
int iterations,
org.apache.commons.rng.UniformRandomProvider rng)
Uses Monte Carlo simulation to approximate $$P(D_{n,m} > d)$$ where $$D_{n,m}$$ is the 2-sample Kolmogorov-Smirnov statistic. See kolmogorovSmirnovStatistic(double[], double[]) for the definition of $$D_{n,m}$$.

The simulation generates iterations random partitions of m + n into an n set and an m set, computing $$D_{n,m}$$ for each partition and returning the proportion of values that are greater than d, or greater than or equal to d if strict is false.

Parameters:
d - D-statistic value.
n - First sample size.
m - Second sample size.
iterations - Number of random partitions to generate.
strict - whether or not the probability to compute is expressed as a strict inequality
rng - RNG used for generating the partitions.
Returns:
proportion of randomly generated m-n partitions of m + n that result in $$D_{n,m}$$ greater than (resp. greater than or equal to) d.