moreFitIndices: Calculate more fit indices

1. gammaHat Gamma Hat

2. adjGammaHat Adjusted Gamma Hat

3. baseline.rmsea RMSEA of the Baseline (Null) Model

4. aic.smallN Corrected (for small sample size) Akaike Information Criterion

5. bic.priorN Bayesian Information Criterion with specifying the prior sample size

6. sic Stochastic Information Criterion

7. hqc Hannan-Quinn Information Criterion

8. gammaHat.scaled Gamma Hat using Scaled Chi-square

9. adjGammaHat.scaled Adjusted Gamma Hat using Scaled Chi-square

10. baseline.rmsea.scaled RMSEA of the Baseline (Null) Model using Scaled Chi-square

Gamma Hat (gammaHat; West, Taylor, & Wu, 2012) is a global fit index which can be computed by

$$ gammaHat =\frac{p}{p + 2 \times \frac{\chi^{2}_{k} - df_{k}}{N - 1}},$$

where \(p\) is the number of variables in the model, \(\chi^{2}_{k}\) is the chi-square test statistic value of the target model, \(df_{k}\) is the degree of freedom when fitting the target model, and \(N\) is the sample size. This formula assumes equal number of indicators across groups.

Adjusted Gamma Hat (adjGammaHat; West, Taylor, & Wu, 2012) is a global fit index which can be computed by

$$ adjGammaHat = \left(1 - \frac{K \times p \times (p + 1)}{2 \times df_{k}} \right) \times \left( 1 - gammaHat \right) ,$$

where \(K\) is the number of groups (please refer to Dudgeon, 2004 for the multiple-group adjustment for agfi*).

Corrected Akaike Information Criterion (aic.smallN; Burnham & Anderson, 2003) is the corrected version of aic for small sample size:

$$ aic.smallN = f + \frac{2k(k + 1)}{N - k - 1},$$

where \(f\) is the minimized discrepancy function, which is the product of the log likelihood and -2, and \(k\) is the number of parameters in the target model.

Corrected Bayesian Information Criterion (bic.priorN; Kuha, 2004) is similar to bic but explicitly specifying the sample size on which the prior is based (\(N_{prior}\)).

$$ bic.priorN = f + k\log{(1 + N/N_{prior})},$$

Stochastic information criterion (sic; Preacher, 2006) is similar to aic or bic. This index will account for model complexity in the model's function form, in addition to the number of free parameters. This index will be provided only when the chi-squared value is not scaled. The sic can be computed by

$$ sic = \frac{1}{2}\left(f - \log{\det{I(\hat{\theta})}}\right),$$

where \(I(\hat{\theta})\) is the information matrix of the parameters.

Hannan-Quinn Information Criterion (hqc; Hannan & Quinn, 1979) is used for model selection similar to aic or bic.

$$ hqc = f + 2k\log{(\log{N})},$$

Note that if Satorra-Bentler or Yuan-Bentler's method is used, the fit indices using the scaled chi-square values are also provided.

See nullRMSEA for the further details of the computation of RMSEA of the null model.