Mixed-design analysis of variance

In statistics, a mixed-design analysis of variance model (also known as a split-plot ANOVA) is used to test for differences between two or more independent groups whilst subjecting participants to repeated measures. Thus, in a mixed-design ANOVA model, one factor (a fixed effects factor) is a between-subjects variable and the other (a random effects factor) is a within-subjects variable. Thus, overall, the model is a type of mixed effect model.

A repeated measures design is used when multiple independent variables or measures exist in a data set, but all participants have been measured on each variable.^[1]

An example

Andy Field (2009)^[1] provided an example of a mixed-design ANOVA in which he wants to investigate whether personality or attractiveness is the most important quality for individuals seeking a partner. In his example, there is a speed dating event set up in which there are two sets of what he terms “stooge dates”: a set of males and a set of females. The experimenter selects 18 individuals, 9 males and 9 females to play stooge dates. Stooge dates are individuals who are chosen by the experimenter and they vary in attractiveness and personality. For males and females, there are three highly attractive individuals, three moderately attractive individuals, and three highly unattractive individuals. Of each set of three, one individual has a highly charismatic personality, one is moderately charismatic and the third is extremely dull.

The participants are the individuals who sign up for the speed dating event and interact with each of the 9 individuals of the opposite sex. There are 10 males and 10 female participants. After each date, they rate on a scale of 0 to 100 how much they would like to have a date with that person, with a zero indicating “not at all” and 100 indicating “very much”.

The repeated measures are looks, which consist of three levels (very attractive, moderately attractive, and highly unattractive) and the personality, which again has three levels (highly charismatic, moderately charismatic, and extremely dull). The between-subjects measure is gender because the participants making the ratings were either female or male.

ANOVA assumptions

When running an analysis of variance to analyse a data set, the data set should meet the following criteria:

(1) Normality: scores for each condition must be normally distributed around their mean.

(2) Homogeneity of variance: each population must have the same error variance.

(3) Sphericity of the covariance matrix: ensures the F ratios match the F distribution

For the between-subject effects to meet the assumptions of the analysis of variance, the variance for any level of a group must be the same as the variance for the mean of all other levels of the group. When there is homogeneity of variance, sphericity of the covariance matrix will occur, because for between-subjects independence has been maintained.^[2]^{[page needed]}

For the within-subject effects, it is important to ensure normality and homogeneity of variance are not being violated.^[2]^{[page needed]}

If the assumptions are violated, a possible solution is to use the Greenhouse & Geisser^[3] or the Huynh & Feldt^[4] adjustments to the degrees of freedom because they can correct for issues that can arise should the sphericity of the covariance matrix assumption be violated.^[2]

Partitioning the sums of squares & the logic of ANOVA

Due to the fact that the mixed-design ANOVA uses both between-subject variables and within-subject variables (a.k.a. repeated measures), it is necessary to partition out (or separate) the between-subject effects and the within-subject effects.^[2] It is as if you are running two separate ANOVAs with the same data set, except that it is possible to examine the interaction of the two effects in a mixed design. As can be seen in the source table provided below, the between-subject variables can be partitioned into the main effect of the first factor and into the error term. The within-subjects terms can be partitioned into three terms: the second (within-subjects) factor, the interaction term for the first and second factors, and the error term.^[2]^{[page needed]} The main difference between the sum of squares of the within-subject factors and between-subject factors is that within-subject factors have an interaction factor.

More specifically, the total sum of squares in a regular one-way ANOVA would consist of two parts: variance due to treatment or condition (SS_{between-subjects}) and variance due to error (SS_{within-subjects}). Normally the SS_{within-subjects} is a measurement of variance. In a mixed-design, you are taking repeated measures from the same participants and therefore the sum of squares can be broken down even further into three components: SS_{within-subjects} (variance due to being in different repeated measure conditions), SS_error (other variance), and SS_BT*WT (variance of interaction of between-subjects by within-subjects conditions).^[2]

Each effect has its own F value. Both the between-subject and within-subject factors have their own MS_error term which is used to calculate separate F values.

Between-subjects:

F_{Between-subjects} = MS_{between-subjects}/MS_{Error(between-subjects)}

Within-subjects:

F_{Within-subjects} = MS_{within-subjects}/MS_{Error(within-subjects)}
F_BS×WS = MS_{between×within}/MS_{Error(within-subjects)}

Analysis of variance table

Results are often presented in a table of the following form.^[2]^{[page needed]}

Source	SS	df	MS	F
Between-subjects
Factor_BS	SS_BS	df_BS	MS_BS	F_BS
Error	SS_BS/E	df_BS/E	MS_BS/E
Within-subjects
Factor_WS	SS_WS	df_WS	MS_WS	F_WS
Factor_WS×BS	SS_BS×WS	df_BS×WS	MS_BS×WS	F_BS×WS
Error	SS_WS/E	df_WS/E	MS_WS/E
Total	SS_T	df_T

Degrees of freedom

In order to calculate the degrees of freedom for between-subjects effects, df_BS = R – 1, where R refers to the number of levels of between-subject groups.^[2]^{[page needed]}

In the case of the degrees of freedom for the between-subject effects error, df_BS(Error) = N_k – R, where N_k is equal to the number of participants, and again R is the number of levels.

To calculate the degrees of freedom for within-subject effects, df_WS = C – 1, where C is the number of within-subject tests. For example, if participants completed a specific measure at three time points, C = 3, and df_WS = 2.

The degrees of freedom for the interaction term of between-subjects by within-subjects term(s), df_BSXWS = (R – 1)(C – 1), where again R refers to the number of levels of the between-subject groups, and C is the number of within-subject tests.

Finally, the within-subject error is calculated by, df_WS(Error) = (N_k – R)(C – 1), in which Nk is the number of participants, R and C remain the same.

Follow-up tests

When there is a significant interaction between a between-subject factor and a within-subject factor, statisticians often recommended pooling the between-subject and within-subject MS_error terms.^[2]^{[page needed]}^{[citation needed]} This can be calculated in the following way:

MSWCELL = SS_BSError + SS_WSError / df_BSError + df_WSError

When following up interactions for terms that are both between-subjects or both within-subjects variables, the method is identical to follow-up tests in ANOVA. The MS_Error term that applies to the follow-up in question is the appropriate one to use, e.g. if following up a significant interaction of two between-subject effects, use the MS_Error term from between-subjects.^[2]^{[page needed]} See ANOVA.

References

↑ ^1.0 ^1.1 Field, A. (2009). Discovering Statistics Using SPSS (3rd edition). Los Angeles: Sage.^{[page needed]} Cite error: Invalid <ref> tag; name "Field" defined multiple times with different content
↑ ^2.0 ^2.1 ^2.2 ^2.3 ^2.4 ^2.5 ^2.6 ^2.7 ^2.8 ^2.9 Howell, D. (2010). Statistical Methods for Psychology (7th edition). Australia: Wadsworth.^{[page needed]} Cite error: Invalid <ref> tag; name "Howell" defined multiple times with different content
↑ Geisser, S. and Greenhouse, S.W. (1958). An extension of Box's result on the use of the F distribution in multivariate analysis. Annals of Mathematical Statistics, 29, 885-891
↑ Hyunh, H. and Feldt, L.S. (1970). Conditions under which mean square ratios in repeated measurements designs have exact F-distributions. Journal of the American Statistical Association, 65, 1582-1589

External links

Examples of all ANOVA and ANCOVA models with up to three treatment factors, including randomized block, split plot, repeated measures, and Latin squares, and their analysis in R

[Field-1] 1.0 ^1.1 Field, A. (2009). Discovering Statistics Using SPSS (3rd edition). Los Angeles: Sage.^{[page needed]} Cite error: Invalid <ref> tag; name "Field" defined multiple times with different content

[Howell-2] 2.0 ^2.1 ^2.2 ^2.3 ^2.4 ^2.5 ^2.6 ^2.7 ^2.8 ^2.9 Howell, D. (2010). Statistical Methods for Psychology (7th edition). Australia: Wadsworth.^{[page needed]} Cite error: Invalid <ref> tag; name "Howell" defined multiple times with different content

[GG-3] Geisser, S. and Greenhouse, S.W. (1958). An extension of Box's result on the use of the F distribution in multivariate analysis. Annals of Mathematical Statistics, 29, 885-891

[4] Hyunh, H. and Feldt, L.S. (1970). Conditions under which mean square ratios in repeated measurements designs have exact F-distributions. Journal of the American Statistical Association, 65, 1582-1589

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Mixed-design analysis of variance

Contents

An example

ANOVA assumptions

Partitioning the sums of squares & the logic of ANOVA

Analysis of variance table

Degrees of freedom

Follow-up tests

See also

References

Further reading

External links

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