Confirmatory Methods, or Huge Samples, Are Required to Obtain Power for the  Evaluation of Theories

Klugkist, Irene; Post, Laura; Haarhuis, Freek; Wesel, Floryt van

doi:10.4236/ojs.2014.49066

Cited by 7 publications

(13 citation statements)

References 18 publications

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“…Such a full report allows the reader to assess the robustness of the statistical evidence. Of course, the royal road to obtaining sufficient power is not to choose a lenient correction method; instead, one is best advised to plan for a large sample size (Klugkist, Post, Haarhuis, & van Wesel, 2014). …”

Section: Resultsmentioning

confidence: 99%

Hidden multiplicity in exploratory multiway ANOVA: Prevalence and remedies

et al. 2015

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Many psychologists do not realize that exploratory use of the popular multiway analysis of variance harbors a multiple-comparison problem. In the case of two factors, three separate null hypotheses are subject to test (i.e., two main effects and one interaction). Consequently, the probability of at least one Type I error (if all null hypotheses are true) is 14 % rather than 5 %, if the three tests are independent. We explain the multiple-comparison problem and demonstrate that researchers almost never correct for it. To mitigate the problem, we describe four remedies: the omnibus F test, control of the familywise error rate, control of the false discovery rate, and preregistration of the hypotheses.

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Section: Resultsmentioning

confidence: 99%

Hidden multiplicity in exploratory multiway ANOVA: Prevalence and remedies

et al. 2015

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“…The three approaches presented in this paper make use of sampling distributions of the Bayes factors under H i and H c , or under H i and H i . Approach 1, like in Klugkist et al (2014) and Weiss (1997), chooses…”

Section: Methodsmentioning

confidence: 99%

“…Sample size determination for the evaluation of the null hypothesis H 0 with an inequality constrained hypothesis H i using BF i0 is considered by Klugkist et al (2014). The decision criterion used is that Bayes factors larger and smaller than 1 result in conclusions in favor of H i and H 0 respectively.…”

Section: Sample Size Determinationmentioning

confidence: 99%

“…The decision criterion used is that Bayes factors larger and smaller than 1 result in conclusions in favor of H i and H 0 respectively. Using this decision criterion, the sample size is determined for various effect sizes, such that the traditional Type I error probability is below .05, and the power is above .80 (Klugkist et al, 2014). Although this article uses order constrained hypotheses, no elaboration is made on the sample sizes required for the evaluation of H i with H c or with H i .…”

Section: Sample Size Determinationmentioning

confidence: 99%

“…Unconditional error probabilities have been investigated in the context of Bayesian hypothesis testing (e.g. Weiss, 1997;Klugkist, Post, Haarhuis, & van Wesel, 2014).…”

Section: Introductionmentioning

confidence: 99%

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The power of informative hypotheses

Klaassen¹,

Hoijtink²,

Gu³

2019

Preprint

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Researchers can express expectations regarding the ordering of group means in simple order constrained hypotheses, for example $H_i: \mu_1>\mu_2>\mu_3$, $H_c: \text{ not } H_i$, and $H_{i'}:\mu_3>\mu_2>\mu_1$. They can compare these hypotheses by means of a Bayes factor, the relative evidence for two hypotheses. The required sample size for a hypothesis test can depend on the desired level of unconditional error probabilities (Type I and Type II error probabilities), or the conditional error probabilities (the level of evidence). This article presents four approaches for sample size determination, that make use of both conditional and unconditional error probabilities. Simulations were performed to determine the sample size such that error probabilities are acceptably low or expected evidence is acceptably strong. The required sample size is lower if $H_{i}$ is evaluated against $H_{i'}$ than when it is evaluated against $H_c$. Thus, specifying what orderings of means are expected or are of interest decreases the required sample size. Second, the required sample sizes differ over the four approaches. The sample size tables are illustrated with example research questions. The choice for an approach is, among others, dependent on the type of conclusion a researcher wants to obtain. A decision tree is provided to guide researchers to the appropriate approach. Applied researchers can use the decision tree and the tables presented to determine the required sample size for their research or use R code and associated manual provided in this paper.

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