One-way and two-way anova: Inferences about a robust, heteroscedastic measure of effect size

Wilcox, Rand

Article Version of Record

One-way and two-way anova: Inferences about a robust, heteroscedastic measure of effect size

Author(s) / Creator(s)

Wilcox, Rand

Abstract / Description

Consider a one-way or two-way ANOVA design. Typically, groups are compared based on some measure of location. The paper suggests alternative methods where measures of location are replaced by a robust measure of effect size that is based in part on a robust measure of dispersion. The measure of effect size used here does not assume that the groups have a common measure of dispersion. That is, it deals with heteroscedasticity. It is fairly evident that no single method reveals everything of interest regarding how groups differ. Certainly, comparing measures of location provides useful information. But as illustrated, comparing measures of effect size can provide a deeper understanding of how groups compare.

Keyword(s)

ANOVA non-normality effect size multiple comparisons heteroscedasticity interactions

Persistent Identifier

https://doi.org/10.23668/psycharchives.6321

Date of first publication

2022-03-31

Journal title

Methodology

Volume

18

Issue

1

Page numbers

58–73

Publisher

PsychOpen GOLD

Publication status

publishedVersion

Review status

peerReviewed

Is version of

https://doi.org/10.5964/meth.7769

Citation

Wilcox, R. (2022). One-way and two-way anova: Inferences about a robust, heteroscedastic measure of effect size. Methodology, 18(1), 58-73. https://doi.org/10.5964/meth.7769

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Author(s) / Creator(s)

Wilcox, Rand
PsychArchives acquisition timestamp

2022-04-14T11:25:04Z
Made available on

2022-04-14T11:25:04Z
Date of first publication

2022-03-31
Abstract / Description

Consider a one-way or two-way ANOVA design. Typically, groups are compared based on some measure of location. The paper suggests alternative methods where measures of location are replaced by a robust measure of effect size that is based in part on a robust measure of dispersion. The measure of effect size used here does not assume that the groups have a common measure of dispersion. That is, it deals with heteroscedasticity. It is fairly evident that no single method reveals everything of interest regarding how groups differ. Certainly, comparing measures of location provides useful information. But as illustrated, comparing measures of effect size can provide a deeper understanding of how groups compare.

en_US
Publication status

publishedVersion
Review status

peerReviewed
Citation

Wilcox, R. (2022). One-way and two-way anova: Inferences about a robust, heteroscedastic measure of effect size. Methodology, 18(1), 58-73. https://doi.org/10.5964/meth.7769

en_US
ISSN

1614-2241
Persistent Identifier

https://hdl.handle.net/20.500.12034/5717
Persistent Identifier

https://doi.org/10.23668/psycharchives.6321
Language of content

eng
Publisher

PsychOpen GOLD
Is version of

https://doi.org/10.5964/meth.7769
Keyword(s)

ANOVA

en_US
Keyword(s)

non-normality

en_US
Keyword(s)

effect size

en_US
Keyword(s)

multiple comparisons

en_US
Keyword(s)

heteroscedasticity

en_US
Keyword(s)

interactions

en_US
Dewey Decimal Classification number(s)

150
Title

One-way and two-way anova: Inferences about a robust, heteroscedastic measure of effect size

en_US
DRO type

article
Issue

1
Journal title

Methodology
Page numbers

58–73
Volume

18
Visible tag(s)

Version of Record

en_US