Constraining parameters to be equal across latent classes is done in the same way as it is done in all other models in Mplus. A number in parentheses is used. For example,
y1 ON x1 (1); y2 ON x2 (1);
would constrain the regression coefficients in the regression of y1 on x1 and y2 on x2 to be held equal. If you look under Examples, Mixture Modeling, you will find equality constraints of the type you want in Mix14.
I think his/her question is about constraining parameters to be equal across latent classes. Mplus constrains parameters (e.g., time scores, variances, and covariances of growth factors) to be equal across latent classes by default unless you set the parameters different across classes.
The thresholds of the latent class indicators are held equal across classes by default in a latent class analysis if they are mentioned only in the %OVERALL% model command. To remove the equality constraint, mention the thresholds in the class-specific MODEL commands. To impose other equality constraints, for example, to have some held equal and others not, use the normal convention of the same number in parentheses following the parameters that are to be constrained.
tony posted on Monday, January 20, 2003 - 12:57 pm
Hi. I have a quick question. Can you direct me to examples of code that compare heterogeneous t-class models to partial homogeneity latent class models for say two populations (i.e., men and women)?
bmuthen posted on Tuesday, January 21, 2003 - 5:40 pm
You can study such questions by including the grouping variable (e.g. gender) as a covariate. See Example 25.10 on page 270 in the Mplus Users' guide. Direct effects capture group differences in measurement. This approach covers the models studied in the Clogg & Goodman chapter of Sociological Methodology, 1985.
hello my question relates to examining strict factorial invariance across four latent classes in a factor mixture model including 4 factors and 4 covariates. I have run the default model where factor loadings, residual variances and intercepts are held equal across classes, so I now want to free these parameters so as to compare the two models. However, i am a little unsure as to how the input instructions need to be set up. do i free the parameters in the %overall% model command through assigning different start values, or do i free them by merely mentioning them in the class specific model commands for each class? also, i understand that i need to fix the factor means to zero when doing this, but are there any other parameters i need to take into consideration in the input instructions? many thanks
Factor loadings and intercepts are constrained to be equalacross groups in Mplus as the default. To relax the equality constraint, mention these parameters in the group-specific MODEL commands. It is not necessary to give starting values. Note that you do not want to mention the factor loading that sets the metric of the factor. For residual variances, leaving the equality constraint out of the overall MODEL command will relax the equality constraint. When intercepts are free across groups, factor means should be fixed to zero in all groups. Otherwise, factor means shoud be zero in one group and free in the others. A brief description of testing for measurement invariance is contained in Chapter 13 of the Version 4 Mplus User's Guide which is available in pdf form on the website.
Sean Mullen posted on Saturday, April 25, 2009 - 10:05 am
Enders and Tofighi (2008) examined the impact of misspecifying class-specific residual variances. If the MPlus default in the general MODEL command is to free them across classes, which values should we use (or what steps might we follow) to improve the model fit if the tendency is for "level-1" (class 1) to be off the mark. Moreover, authors note that these parameters are rarely reported, so can you recommend a format for doing so (or a paper that does report residual variances)? For example, should they be reported for each class solution compared, or just the final solution?
Variances and residual variances are held equal across classes as the default. To see where these variances should be free, use the PLOT command to look at estimated means and observed individual values.
I’m running an EFA with 43 dichotomous variables (Mplus 5.1). It is my understanding that the “modification indices” indicate the drop in chi-square if I allow a correlated error between two given indicators. And that also, it would improve the other estimators (CFI, TLI, RMSEA, AND SMRM). Thus, I need to allow a correlation between two of my dichotomous indicators (x and y).
I am using the following instructions doing so
X with y@;
But it does not change anything; the chi-square, CFI, TLI, RMSEA and SMRM did not change at all. Am I using the right instruction?
Thank you very much for the feedback. It is highly appreciate.
I followed your suggestion and added it under the model section as it is shown below:
Model: x with y;
My previous EFA output showed for each factor solution a substantial high chi-square change in the modification indices for adding a correlated error between the two given indicators.
However, after implementing the “with” command, the modification indices show the same substantial high square change that I previously observed. I was expecting 0 or at least a lower number in the modification indices between these two indicators.
Furthermore, I revised the output and I could not find any information regarding the size of the correlation between these two indicators and its associated statistical significance, is it possible to get this information in MPLUS? Is any place in the MPLUS web site that provides examples to use statements such as WITH using the 5.1 version?
Hi Dr Muthen, I estimated a 2-class model with covariates. The outcome makes sense with good class separation and homogeneity within each class. Item-response probabilities show that however there is some ambiguity in the response pattern of one of the items in class 1, with this item showing similar probabilities (0.493 and 0.507) in terms of endorsing and not endorsing that item. Is this acceptable?