Message/Author 


In a multiplegroup latent growth model, I would like to constrain the factor means for the intercept and linear factors to invariance across groups. Unfortunately, I cannot find a syntax expression that will accomplish this. I have tried something like: Model: ....[f1*](1); [f2*] (2); Model: grp2 .... This doesn't work; grp2 ends up with zero values for the factor means, while the other group is nonzero. Note that I don't want to fix the means to zero, but rather to estimate common (possibly) nonzero values for the means. Also, the two factor means should be allowed to differ within group. Hope this is clear. How is it done? thanks 


In multiple group analysis, the factor means are fixed to zero in the first group by default and free in the other groups by default. You must explicitly refer to the factor means in group 1 to override the default. If you change group 2 to group 1, it should work: MODEL: [f1] (1); MODEL g2: [f1] (1); 


I think I have done what is suggested here, but it still estimates factor mean@0 for group 1 and free for group two. What am I doing wrong? MODEL: leisure BY walktri strendi sportdi; home BY yargar houswk homrep care; [leisure] (1); [home](2); Model wave2: [leisure] (1); [home](2); 


In multiple group analysis, the test of factor mean differences consists of one model where factor means are zero in all groups and another model where factor means are zero in one group and free in the other groups. This is described in the Topic 1 course handout under multiple group analysis. See specifically slides 223 and 224. 


So if I write the following code and the results fit equally well, can I assume invariance of factor means? MODEL: leisure BY walktri strendi sportdi; home BY yargar houswk homrep care; [leisure@0]; [home@0]; Thank you 


You would need to do a difference test to determine whether the means are the same across groups. See page 434435 of the user's guide to see how to do this. 

pauline posted on Tuesday, May 15, 2012  5:31 am



In am doing a multigroup latent growth model with a quadratic growth form. There are two groups. I would like to freely estimate the intercepts, factor loadings, and residual variances across groups while fixing factor means at zero in all groups. I am unclear as to how to write the group specific model to achieve this. Thank you Model: i s q  y@0 y@1 y@2 y@3 y@4 y@5; 


With growth modeling, testing for measurement invariance of the growth factors cannot be done in the traditional way because the factor loadings must be fixed to specify the growth model. In this case, the first step is to find a wellfitting growth model in each group. If the same growth model does not fit in each group, the groups cannot be compared on the growth factor means, variances, and covariances. 

pauline posted on Tuesday, May 15, 2012  10:49 pm



Thank you. Of course, that absolutely makes sense. There is a well fitting quadratic model for each group. Just to clarify, the Grouping option for MG analysis by default looks at equality of factor loadings which in this case of MG LGM is already be fixed for I S and Q anyways. The chi square stat for this MG LGM will then become the baseline for testing further invariance? I would then proceed to constrain factor means. Am I correct to specify the constraints for grp 2 instead of grp 1 for the group specific model? Model: i s q  y@0 y@1 y@2 y@3 y@4 y@5; [i] (1); [s] (2); [q](3); Model grp 2: [i](1); [s](2); [q](3); Then factor variances: i (4); s (5); q (6); And covariances : i with s (7); i with q (8); s with q (9); Many thanks 


Yes on your first question. Constraints across groups are only needed in your Model statement. You can check in the output that you get what you want. See also the UG, chapter 14. 

Back to top 