List of statistical tests

Statistical tests are used to test the fit between a hypothesis and the data.^[1]^[2] Choosing the right statistical test is not a trivial task.^[1] The choice of the test depends on many properties of the research question. The vast majority of studies can be addressed by 30 of the 100 or so statistical tests in use.^[3]^[4]^[5]

Explanation of properties

Scaling of data: One of the properties of the tests is the scale of the data, which can be interval-based, ordinal or nominal.^[3] Nominal scale is also known as categorical.^[6] Interval scale is also known as numerical.^[6] When categorical data has only two possibilities, it is called binary or dichotomous.^[1]

Assumptions, parametric and non-parametric: There are two groups of statistical tests, parametric and non-parametric. The choice between these two groups needs to be justified. Parametric tests assume that the data follow a particular distribution, typically a normal distribution, while non-parametric tests make no assumptions about the distribution.^[7] Non-parametric tests have the advantage of being more resistant to misbehaviour of the data, such as outliers.^[7] They also have the disadvantage of being less certain in the statistical estimate.^[7]

Type of data: Statistical tests use different types of data.^[1] Some tests perform univariate analysis on a single sample with a single variable. Others compare two or more paired or unpaired samples. Unpaired samples are also called independent samples. Paired samples are also called dependent. Finally, there are some statistical tests that perform analysis of relationship between multiple variables like regression.^[1]

Number of Samples: The number of samples of data.

Exactness: A test can be exact or be asymptotic delivering approximate results.

List of statistical tests


Test name	Scaling	Assumptions	Data	Samples	Exact	Special case of	Application conditions
One sample t-test	inverval	normal	univariate	1	No^[8]	Location test
Unpaired t-test	inverval	normal	unpaired	2	No^[8]	Location test	Homoscedasticity^[9]
Welch's t-test	inverval	normal	unpaired	2	No^[8]	Location test
Paired t-test	inverval	normal	paired	2	No	Location test
F-test	inverval	normal		2
Z-test	inverval	normal		2	No		variance is known
Permutation test	inverval	non-parametric	unpaired	≥2	Yes
Kruskal-Wallis test	ordinal	non-parametric	unpaired	≥2	Yes		small sample size^[10]
Mann–Whitney $U$ test	ordinal	non-parametric	unpaired	2		Kruskal-Wallis test^[11]
Wilcoxon signed-rank test	inverval	non-parametric	paired	≥1		Location test
Sign test	ordinal	non-parametric	paired	2
Friedman test	ordinal	non-parametric	paired	>2		Location test
$\chi ^{2}$ test	nominal^[1]	non-parametric^[12]			No		Contingency table, sample size > ca. 60,^[1] any cell content ≥ 5,^[13] marginal totals fixed^[13]
Pearson's $\chi ^{2}$ test	nominal/ordinal	non-parametric			No	$\chi ^{2}$ test
Median test	ordinal	non-parametric			No	Pearson's $\chi ^{2}$ test
Multinomial test	nominal	non-parametric	univariate	1	Yes	Location test
McNemar's test	binary	non-parametric^[14]	paired	2	Yes
Cochran's $Q$ test	binary	non-parametric	paired	≥2
Binomial test	binary	non-parametric	univariate	1	Yes	Multinomial test
Siegel–Tukey test	ordinal	non-parametric	unpaired	2
Chow test	inverval	parametric	linear regression	2	No		Time series
Fisher's exact test	nominal	non-parametric	unpaired	≥2^[13]	Yes		Contingency table, marginal totals fixed^[13]
Barnard's exact test	nominal	non-parametric	unpaired	2	Yes		Contingency table
Boschloo's test	nominal	non-parametric	unpaired	2	Yes		Contingency table
Shapiro–Wilk test	inverval		univariate	1		Normality test	sample size between 3 and 5000^[15]
Kolmogorov–Smirnov test	inverval			1		Normality test	distribution parameters known^[15]
Shapiro-Francia test	inverval		univariate	1		Normality test	Simpliplification of Shapiro–Wilk test
Lilliefors test	inverval			1		Normality test

References

^ ^a ^b ^c ^d ^e ^f ^g Parab, Shraddha; Bhalerao, Supriya (2010). "Choosing statistical test". International Journal of Ayurveda Research. 1 (3): 187–191. doi:10.4103/0974-7788.72494. ISSN 0974-7788. PMC 2996580. PMID 21170214.
^ "Entscheidbaum" (in German). Retrieved 8 February 2024.
^ ^a ^b Nayak, Barun K; Hazra, Avijit (2011). "How to choose the right statistical test?". Indian Journal of Ophthalmology. 59 (2): 85–86. doi:10.4103/0301-4738.77005. ISSN 0301-4738. PMC 3116565. PMID 21350275.
^ Lewis, Nancy D.; Lewis, Nigel Da Costa; Lewis, N. D. (2013). 100 Statistical Tests in R: What to Choose, how to Easily Calculate, with Over 300 Illustrations and Examples. Heather Hills Press. ISBN 978-1-4840-5299-0.
^ Kanji, Gopal K. (18 July 2006). 100 Statistical Tests. SAGE. ISBN 978-1-4462-2250-8.
^ ^a ^b "What is the difference between categorical, ordinal and interval variables?". stats.oarc.ucla.edu. Retrieved 10 February 2024.
^ ^a ^b ^c Huth, R.; Pokorná, L. (1 March 2004). "Parametric versus non-parametric estimates of climatic trends". Theoretical and Applied Climatology. 77 (1): 107–112. Bibcode:2004ThApC..77..107H. doi:10.1007/s00704-003-0026-3. ISSN 1434-4483. S2CID 121539673.
^ ^a ^b ^c de Winter, J.C.F. (2019). "Using the Student's t-test with extremely small sample sizes". Practical Assessment, Research, and Evaluation. 18. doi:10.7275/e4r6-dj05.
^ "t-Test für unabhängige Stichproben". Hochschule Luzern (in German). Retrieved 10 February 2024.
^ Choi, Won; Lee, Jae Won; Huh, Myung-Hoe; Kang, Seung-Ho (11 January 2003). "An Algorithm for Computing the Exact Distribution of the Kruskal–Wallis Test". Communications in Statistics - Simulation and Computation. 32 (4): 1029–1040. doi:10.1081/SAC-120023876. ISSN 0361-0918. S2CID 123037097.
^ McKight, Patrick E.; Najab, Julius (30 January 2010). "Kruskal-Wallis Test". The Corsini Encyclopedia of Psychology. Wiley. p. 1. doi:10.1002/9780470479216.corpsy0491. ISBN 978-0-470-17024-3.
^ McHugh, Mary L. (15 June 2013). "The Chi-square test of independence". Biochemia Medica. 23 (2): 143–149. doi:10.11613/BM.2013.018. PMC 3900058. PMID 23894860.
^ ^a ^b ^c ^d Warner, Pamela (1 October 2013). "Testing association with Fisher's Exact test". Journal of Family Planning and Reproductive Health Care. 39 (4): 281–284. doi:10.1136/jfprhc-2013-100747. ISSN 1471-1893. PMID 24062499.
^ Károly, Héberger; Róbert, Rajkó (1999). Pair-Correlation Method with parametric and non-parametric test-statistics for variable selection. Description of computer program and application for environmental data case studies. szef. pp. 82–91.
^ ^a ^b Ahmad, Fiaz; Khan, Rehan Ahmad (8 September 2015). "A power comparison of various normality tests". Pakistan Journal of Statistics and Operation Research. 11 (3): 331–345. doi:10.18187/pjsor.v11i3.845. ISSN 1816-2711.

Statistics

Descriptive statistics

Continuous data

Center	Mean Arithmetic Arithmetic-Geometric Cubic Generalized/power Geometric Harmonic Heronian Heinz Lehmer Median Mode
Dispersion	Average absolute deviation Coefficient of variation Interquartile range Percentile Range Standard deviation Variance
Shape	Central limit theorem Moments Kurtosis L-moments Skewness

Count data

Index of dispersion

Summary tables

Dependence

Graphics

Data collection

Study design	Effect size Missing data Optimal design Population Replication Sample size determination Statistic Statistical power
Survey methodology	Sampling Cluster Stratified Opinion poll Questionnaire Standard error
Controlled experiments	Blocking Factorial experiment Interaction Random assignment Randomized controlled trial Randomized experiment Scientific control
Adaptive designs	Adaptive clinical trial Stochastic approximation Up-and-down designs
Observational studies	Cohort study Cross-sectional study Natural experiment Quasi-experiment

Statistical inference

Statistical theory

Population
Statistic
Probability distribution
Sampling distribution
- Order statistic
Empirical distribution
- Density estimation
Statistical model
- Model specification
- L^p space
Parameter
- location
- scale
- shape
Parametric family
- Likelihood (monotone)
- Location–scale family
- Exponential family
Completeness
Sufficiency
Statistical functional
- Bootstrap
- U
- V
Optimal decision
- loss function
Efficiency
Statistical distance
- divergence
Asymptotics
Robustness

Frequentist inference

Point estimation	Estimating equations Maximum likelihood Method of moments M-estimator Minimum distance Unbiased estimators Mean-unbiased minimum-variance Rao–Blackwellization Lehmann–Scheffé theorem Median unbiased Plug-in
Interval estimation	Confidence interval Pivot Likelihood interval Prediction interval Tolerance interval Resampling Bootstrap Jackknife
Testing hypotheses	1- & 2-tails Power Uniformly most powerful test Permutation test Randomization test Multiple comparisons
Parametric tests	Likelihood-ratio Score/Lagrange multiplier Wald

Specific tests

Z-test (normal) Student's t-test F-test
Goodness of fit	Chi-squared G-test Kolmogorov–Smirnov Anderson–Darling Lilliefors Jarque–Bera Normality (Shapiro–Wilk) Likelihood-ratio test Model selection Cross validation AIC BIC
Rank statistics	Sign Sample median Signed rank (Wilcoxon) Hodges–Lehmann estimator Rank sum (Mann–Whitney) Nonparametric anova 1-way (Kruskal–Wallis) 2-way (Friedman) Ordered alternative (Jonckheere–Terpstra) Van der Waerden test

Bayesian inference

Correlation	Pearson product-moment Partial correlation Confounding variable Coefficient of determination
Regression analysis	Errors and residuals Regression validation Mixed effects models Simultaneous equations models Multivariate adaptive regression splines (MARS)
Linear regression	Simple linear regression Ordinary least squares General linear model Bayesian regression
Non-standard predictors	Nonlinear regression Nonparametric Semiparametric Isotonic Robust Heteroscedasticity Homoscedasticity
Generalized linear model	Exponential families Logistic (Bernoulli) / Binomial / Poisson regressions
Partition of variance	Analysis of variance (ANOVA, anova) Analysis of covariance Multivariate ANOVA Degrees of freedom

Categorical / Multivariate / Time-series / Survival analysis

Categorical

Multivariate

Time-series

General	Decomposition Trend Stationarity Seasonal adjustment Exponential smoothing Cointegration Structural break Granger causality
Specific tests	Dickey–Fuller Johansen Q-statistic (Ljung–Box) Durbin–Watson Breusch–Godfrey
Time domain	Autocorrelation (ACF) partial (PACF) Cross-correlation (XCF) ARMA model ARIMA model (Box–Jenkins) Autoregressive conditional heteroskedasticity (ARCH) Vector autoregression (VAR)
Frequency domain	Spectral density estimation Fourier analysis Least-squares spectral analysis Wavelet Whittle likelihood

Survival

Survival function	Kaplan–Meier estimator (product limit) Proportional hazards models Accelerated failure time (AFT) model First hitting time
Hazard function	Nelson–Aalen estimator
Test	Log-rank test

Applications

Biostatistics	Bioinformatics Clinical trials / studies Epidemiology Medical statistics
Engineering statistics	Chemometrics Methods engineering Probabilistic design Process / quality control Reliability System identification
Social statistics	Actuarial science Census Crime statistics Demography Econometrics Jurimetrics National accounts Official statistics Population statistics Psychometrics
Spatial statistics	Cartography Environmental statistics Geographic information system Geostatistics Kriging