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Between-Within

For determining the degrees of freedom (DF) required for the testing of fixed effects, one option is to use the “between-within” method, originally proposed by Schluchter and Elashoff (1990) as a small-sample adjustment.

General definition

Using this method, the DF are determined by the grouping level at which the term is estimated. Generally, assuming \(G\) levels of grouping:

\(DF_g=N_g-(N_{g-1}+p_g), g=1, ..., G+1\)

where \(N_g\) is the number of groups at the \(g\)-th grouping level and \(p_g\) is the number of parameters estimated at that level.

\(N_0=1\) if the model includes an intercept term and \(N_0=0\) otherwise. Note however that the DF for the intercept term itself (when it is included) are calculated at the \(G+1\) level, i.e. for the intercept we use \(DF_{G+1}\) degrees of freedom.

We note that general contrasts \(C\beta\) have not been considered in the literature so far. Here we therefore use a pragmatic approach and define that for a general contrast matrix \(C\) we take the minimum DF across the involved coefficients as the DF.

MMRM special case

In our case of an MMRM (with only fixed effect terms), there is only a single grouping level (subject), so \(G=1\). This means there are 3 potential “levels” of parameters (Gałecki and Burzykowski (2013)):

Example

Let’s look at a concrete example and what the “between-within” degrees of freedom method gives as results:

fit <- mmrm(
  formula = FEV1 ~ RACE + SEX + ARMCD * AVISIT + us(AVISIT | USUBJID),
  data = fev_data,
  control = mmrm_control(method = "Between-Within")
)
summary(fit)
#> mmrm fit
#> 
#> Formula:     FEV1 ~ RACE + SEX + ARMCD * AVISIT + us(AVISIT | USUBJID)
#> Data:        fev_data (used 537 observations from 197 subjects with maximum 4 
#> timepoints)
#> Covariance:  unstructured (10 variance parameters)
#> Method:      Between-Within
#> Vcov Method: Asymptotic
#> Inference:   REML
#> 
#> Model selection criteria:
#>      AIC      BIC   logLik deviance 
#>   3406.4   3439.3  -1693.2   3386.4 
#> 
#> Coefficients: 
#>                                Estimate Std. Error        df t value Pr(>|t|)
#> (Intercept)                    30.77748    0.88656 334.00000  34.715  < 2e-16
#> RACEBlack or African American   1.53050    0.62448 192.00000   2.451 0.015147
#> RACEWhite                       5.64357    0.66561 192.00000   8.479 5.98e-15
#> SEXFemale                       0.32606    0.53195 192.00000   0.613 0.540631
#> ARMCDTRT                        3.77423    1.07415 192.00000   3.514 0.000551
#> AVISITVIS2                      4.83959    0.80172 334.00000   6.037 4.19e-09
#> AVISITVIS3                     10.34211    0.82269 334.00000  12.571  < 2e-16
#> AVISITVIS4                     15.05390    1.31281 334.00000  11.467  < 2e-16
#> ARMCDTRT:AVISITVIS2            -0.04193    1.12932 334.00000  -0.037 0.970407
#> ARMCDTRT:AVISITVIS3            -0.69369    1.18765 334.00000  -0.584 0.559558
#> ARMCDTRT:AVISITVIS4             0.62423    1.85085 334.00000   0.337 0.736129
#>                                  
#> (Intercept)                   ***
#> RACEBlack or African American *  
#> RACEWhite                     ***
#> SEXFemale                        
#> ARMCDTRT                      ***
#> AVISITVIS2                    ***
#> AVISITVIS3                    ***
#> AVISITVIS4                    ***
#> ARMCDTRT:AVISITVIS2              
#> ARMCDTRT:AVISITVIS3              
#> ARMCDTRT:AVISITVIS4              
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
#> 
#> Covariance estimate:
#>         VIS1    VIS2    VIS3    VIS4
#> VIS1 40.5537 14.3960  4.9747 13.3867
#> VIS2 14.3960 26.5715  2.7855  7.4745
#> VIS3  4.9747  2.7855 14.8979  0.9082
#> VIS4 13.3867  7.4745  0.9082 95.5568

Let’s try to calculate the degrees of freedom manually now.

In fev_data there are 197 subjects with at least one non-missing FEV1 observation, and 537 non-missing observations in total. Therefore we obtain the following numbers of groups \(N_g\) at the levels \(g=1,2\):

And we note that \(N_0 = 1\) because we use an intercept term.

Now let’s look at the design matrix:

head(model.matrix(fit), 1)
#>   (Intercept) RACEBlack or African American RACEWhite SEXFemale ARMCDTRT
#> 2           1                             1         0         1        1
#>   AVISITVIS2 AVISITVIS3 AVISITVIS4 ARMCDTRT:AVISITVIS2 ARMCDTRT:AVISITVIS3
#> 2          1          0          0                   1                   0
#>   ARMCDTRT:AVISITVIS4
#> 2                   0

Leaving the intercept term aside, we therefore have the following number of parameters for the corresponding effects:

In the model above, RACE, SEX and ARMCD are between-subjects effects and belong to level 1; they do not vary within subject across the repeated observations. On the other hand, AVISIT is a within-subject effect; it represents study visit, so naturally its value changes over repeated observations for each subject. Similarly, the interaction of ARMCD and AVISIT also belongs to level 2.

Therefore we obtain the following numbers of parameters \(p_g\) at the levels \(g=1,2\):

And we obtain therefore the degrees of freedom \(DF_g\) at the levels \(g=1,2\):

So we can finally see that those degrees of freedom are exactly as displayed in the summary table above.

Differences compared to SAS

The implementation described above is not identical to that of SAS. Differences include:

Code contributions for adding the SAS version of between-within degrees of freedom to the mmrm package are welcome!

References

Gałecki A, Burzykowski T (2013). “Linear Mixed-Effects Model.” In Linear mixed-effects models using r 245–273. Springer.
Schluchter MD, Elashoff JT (1990). “Small-Sample Adjustments to Tests with Unbalanced Repeated Measures Assuming Several Covariance Structures.” Journal of Statistical Computation and Simulation, 37(1-2), 69–87.

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