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Welch’s ANOVA: Heteroskedastic skew-<i>t</i> error terms

Nuri Çelik

2020Communication in Statistics- Theory and Methods28 citationsDOI

Abstract

In analysis of variance (ANOVA) models, it is generally assumed that the distribution of the error terms is normal with mean zero and constant variance σ2. Traditionally, a least square (LS) method is used for estimating the unknown parameters and testing the null hypothesis. It is known that, when the normality assumption is not satisfied, LS estimators of the parameters and the test statistics based on them lose their efficiency, see Tukey. On the other hand, a non constant variance problem which is called heteroskedasticity is another serious issue for LS estimators. The LS estimators still remain unbiased but the estimated standard error (SE) is wrong. Because of this, confidence intervals and hypotheses tests cannot be relied on. Welch’s ANOVA is the most popular method to solve this problem. In this paper, we assume that the distribution of the error terms is skew-t with non constant variance in one-way ANOVA. We also propose a new test statistics based on the maximum likelihood (ML) estimators of skew-t distribution. A Monte Carlo simulation study is performed to compare traditional LS and Welch’s method with the proposed method in terms of Type I errors and the powers. At the end of this study, an example is given for the illustration of the methods.

Topics & Concepts

HeteroscedasticityStatisticsMathematicsEstimatorOne-way analysis of varianceConstant (computer programming)Analysis of varianceNormalitySkewVariance (accounting)Computer scienceBusinessTelecommunicationsProgramming languageAccountingStatistical Distribution Estimation and ApplicationsStatistical Methods and Bayesian InferenceAdvanced Statistical Process Monitoring
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