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An Exhaustive Power Comparison of Normality Tests

Jurgita Arnastauskaitė, Tomas Ruzgas, Mindaugas Bražėnas

2021Mathematics67 citationsDOIOpen Access PDF

Abstract

A goodness-of-fit test is a frequently used modern statistics tool. However, it is still unclear what the most reliable approach is to check assumptions about data set normality. A particular data set (especially with a small number of observations) only partly describes the process, which leaves many options for the interpretation of its true distribution. As a consequence, many goodness-of-fit statistical tests have been developed, the power of which depends on particular circumstances (i.e., sample size, outlets, etc.). With the aim of developing a more universal goodness-of-fit test, we propose an approach based on an N-metric with our chosen kernel function. To compare the power of 40 normality tests, the goodness-of-fit hypothesis was tested for 15 data distributions with 6 different sample sizes. Based on exhaustive comparative research results, we recommend the use of our test for samples of size n≥118.

Topics & Concepts

Goodness of fitNormalityStatisticsAnderson–Darling testSample size determinationNormality testMetric (unit)MathematicsStatistical hypothesis testingData setStatistical powerSample (material)Set (abstract data type)Computer scienceEconometricsKolmogorov–Smirnov testData miningEngineeringChemistryOperations managementProgramming languageChromatographyAdvanced Statistical Methods and ModelsStatistical Methods and InferenceStatistical Methods in Clinical Trials