disp

Class: LinearMixedModel

Display linear mixed-effects model

Description

example

````display(lme)` displays the fitted linear mixed-effects model `lme`.```

Input Arguments

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`lme` — Linear mixed-effects model`LinearMixedModel` object

Linear mixed-effects model, returned as a `LinearMixedModel` object.

For properties and methods of this object, see `LinearMixedModel`.

Examples

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Randomized Block Design

Navigate to a folder containing sample data.

```cd(matlabroot) cd('help/toolbox/stats/examples')```

`load shift`

The dataset array shows the absolute deviations from the target quality characteristic measured from the products that five operators manufacture during three shifts, morning, evening, and night. This is a randomized block design, where the operators are the blocks. The experiment is designed to study the impact of the time of shift on the performance. The performance measure is the absolute deviation of the quality characteristics from the target value. This is simulated data.

`Shift` and `Operator` are nominal variables.

```shift.Shift = nominal(shift.Shift); shift.Operator = nominal(shift.Operator); ```

Fit a linear mixed-effects model with a random intercept grouped by operator to assess if performance significantly differs according to the time of the shift.

`lme = fitlme(shift,'QCDev ~ Shift + (1|Operator)');`

Display the model.

`disp(lme)`
```Linear mixed-effects model fit by ML Model information: Number of observations 15 Fixed effects coefficients 3 Random effects coefficients 5 Covariance parameters 2 Formula: QCDev ~ 1 + Shift + (1 | Operator) Model fit statistics: AIC BIC LogLikelihood Deviance 59.012 62.552 -24.506 49.012 Fixed effects coefficients (95% CIs): Name Estimate SE tStat DF pValue Lower Upper '(Intercept)' 3.1196 0.88681 3.5178 12 0.0042407 1.1874 5.0518 'Shift_Morning' -0.3868 0.48344 -0.80009 12 0.43921 -1.4401 0.66653 'Shift_Night' 1.9856 0.48344 4.1072 12 0.0014535 0.93227 3.0389 Random effects covariance parameters (95% CIs): Group: Operator (5 Levels) Name1 Name2 Type Estimate Lower Upper '(Intercept)' '(Intercept)' 'std' 1.8297 0.94915 3.5272 Group: Error Name Estimate Lower Upper 'Res Std' 0.76439 0.49315 1.1848```

This display includes the model performance statistics, Akaike information criterion (AIC), Bayesian information criterion (BIC), loglikelihood, and deviance.

The fixed-effects coefficients table includes the names and estimates of the coefficients in the first two columns. The third column `SE` shows the standard errors of the coefficients. The column `tStat` includes the t-statistic values that correspond to each coefficient. `DF` is the residual degrees of freedom, and the `pValue` is the p-value that corresponds to the corresponding t-statistic value. The columns `Lower` and `Upper` display the lower and upper limits of a 95% confidence interval for each fixed-effects coefficient.

The first table for the random effects shows the types and the estimates of the random effects covariance parameters, with the lower and upper limits of a 95% confidence interval for each parameter. The display also shows the name of the grouping variable, operator, and the total number of levels, 5.

The second table for the random effects shows the estimate of the observation error, with the lower and upper limits of a 95% confidence interval.

Definitions

Akaike and Bayesian Information Criteria

Akaike information criterion (AIC) is AIC = –2*logLM + 2*(nc + p + 1), where logLM is the maximized log likelihood (or maximized restricted log likelihood) of the model, and nc + p + 1 is the number of parameters estimated in the model. p is the number of fixed-effects coefficients, and nc is the total number of parameters in the random-effects covariance excluding the residual variance.

Bayesian information criterion (BIC) is BIC = –2*logLM + ln(neff)*(nc + p + 1), where logLM is the maximized log likelihood (or maximized restricted log likelihood) of the model, neff is the effective number of observations, and (nc + p + 1) is the number of parameters estimated in the model.

• If the fitting method is maximum likelihood (ML), then neff = n, where n is the number of observations.

• If the fitting method is restricted maximum likelihood (REML), then neff = np.

A lower value of deviance indicates a better fit. As the value of deviance decreases, both AIC and BIC tend to decrease. Both AIC and BIC also include penalty terms based on the number of parameters estimated, p. So, when the number of parameters increase, the values of AIC and BIC tend to increase as well. When comparing different models, the model with the lowest AIC or BIC value is considered as the best fitting model.

Deviance

`LinearMixedModel` computes the deviance of model M as minus two times the loglikelihood of that model. Let LM denote the maximum value of the likelihood function for model M. Then, the deviance of model M is

$-2*\mathrm{log}{L}_{M}.$

A lower value of deviance indicates a better fit. Suppose M1 and M2 are two different models, where M1 is nested in M2. Then, the fit of the models can be assessed by comparing the deviances Dev1 and Dev2 of these models. The difference of the deviances is

$Dev=De{v}_{1}-De{v}_{2}=2\left(\mathrm{log}L{M}_{2}-\mathrm{log}L{M}_{1}\right).$

Usually, the asymptotic distribution of this difference has a chi-square distribution with degrees of freedom v equal to the number of parameters that are estimated in one model but fixed (typically at 0) in the other. That is, it is equal to the difference in the number of parameters estimated in M1 and M2. You can get the p-value for this test using `1 – chi2cdf(Dev,V)`, where Dev = Dev2Dev1.

However, in mixed-effects models, when some variance components fall on the boundary of the parameter space, the asymptotic distribution of this difference is more complicated. For example, consider the hypotheses

H0: $D=\left(\begin{array}{cc}{D}_{11}& 0\\ 0& 0\end{array}\right),$ D is a q-by-q symmetric positive semidefinite matrix.

H1: D is a (q+1)-by-(q+1) symmetric positive semidefinite matrix.

That is, H1 states that the last row and column of D are different from zero. Here, the bigger model M2 has q + 1 parameters and the smaller model M1 has q parameters. And Dev has a 50:50 mixture of χ2q and χ2(q + 1) distributions (Stram and Lee, 1994).

References

[1] Hox, J. Multilevel Analysis, Techniques and Applications. Lawrence Erlbaum Associates, Inc., 2002.

[2] Stram D. O. and J. W. Lee. "Variance components testing in the longitudinal mixed-effects model". Biometrics, Vol. 50, 4, 1994, pp. 1171–1177.