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Hi everyone. I'm new to both OpenMX and mixture models and am trying to do a latent profile analysis, or a mixture model (initially with two classes) of a Two-factor Model.

With the good documentation and code examples for Two-factor Models and mixture models (specifically the code for a growth mixture model), I tried to combine the two. However, when I run it, I get the following error that I'm having trouble debugging:

Error: The reference 'Class1.fitfunction' is unknown in the algebra named 'Latent Profile Model.mixtureObj'

Can you help point me in the right direction? A reproducible example is given in the attached code. Thank you in advance for considering this!

I made a few corrections to the attached code to let it run. I'm not sure whether its exactly the model you want, but it no longer fails to run.

Do you use source code control? You probably could have figured this out yourself if you did. There are lots of online tutorials to help you get up to speed such as the one at github

thank you. I do use GitHub. In the future, I'll share code via it.

just wondering, how would source code control (use of GitHub) have helped figure out the error?

thank you again,

Josh

Well, I might be wrong about how you put that script together. What it looked like is that you copied some working code and modified it. If you indeed followed this method then you could have examined each change to determine whether the change caused the script to break. Going back to an earlier version of the script is facilitated by source code control. In any case, I'm glad it's working now.

In comparing them (as part of making a commit on GitHub), I now see some obvious errors (and one that was not obvious to me) - I'm sorry about that. Thanks again for the (quick) help and sorry for the (easy-to-fix) problems in the code!

Happy to help people learn GIT.

Thank you again. I'm circling back to this and noticed that the estimates for the free parameters seem to only be for Class 1 - whereas the estimates for this growth mixture model example here are for both Class 1 and Class 2.

Could I ask if you could help me to modify this code to allow both classes to have free parameters estimated in this example - now here on GitHub?

Thanks so much.

When 2 or more parameters have the same label, they are treated as a single parameter that is populated to 2 or more locations in the model. To free a parameter to have different estimates in Class1 and Class2, simply remove the label.

Thank you - when I remove the labels, so change the means part of the model specification from:

means <- mxPath( from="one", to=c("x1","x2","x3","y1","y2","y3","F1","F2"),

arrows=1,

free=c(T,T,T,T,T,T,F,F), values=c(1,1,1,1,1,1,0,0),

labels=c("meanx1","meanx2","meanx3",

"meany1","meany2","meany3",NA,NA) )

To:

means <- mxPath( from="one", to=c("ce","be","ae"),

arrows=1,

free=c(T,T,T), values=c(1,1,1)

)

I now see different estimates for Class1 and Class2 mean parameters, but they have the same values (though different standard errors).

I pushed the change to the example here.

Thank you again very much for helping me work through this.

Currently your mixture is per-model, not per row. What kind of mixture do you want to estimate?

I

thinkper row - something akin to a Latent Profile Analysis or Latent Class Analysis, in which each observation is assigned a posterior probability to one of the classes (and means and residuals variances for each of the classes are estimated).Thank you again

An easy way to do standard mixture models is to use

`EasyMx`

, an R package that is a wrapper around`OpenMx`

. Run this:The general idea with the mixture model helper is that you give it a list of

`MxModel`

objects and it creates the needed mixture pieces. As I understand it, a latent profile analysis is a mixture model in which each mixture component freely estimates all of its means, variances, and covariances. Here's the example latent profile model:Thank you, this worked great. Will explore EasyMx more.

Could I ask for help for specifying a model for equal variance across mixture components?

Thank you and Joshua very much.

If I can, please allow me to clarify.

Can I ask for help specifying models with:

My understanding is the model fit in the example above is:

In many applications a latent profile model makes the same assumptions as a latent class analysis, so it has the (questionable) assumption of conditional independence of the measures, given class membership. Thus only the means and variances, not the covariances, would be free. If I controlled the nomenclature, I'd term models with non-zero covariances as general mixture distributions, of which a factor mixture model is one, and only diagonal covariance structures as latent profile, consistent with latent class models. But Hunter is as usual correct, see, e.g., http://members.home.nl/jeroenvermunt/ermss2004f.pdf

Thanks for the clarifying info. (and the link).

If

only the means and variances would be freed, how can: a) the model in which both are freed and b) the model in which only the means are freed be estimated? And am I understanding correctly that the model (using EasyMx) specified above would be the model corresponding to a) the model in which both means and variances are freely estimated?You should be able to answer that question by yourself by inspecting the model. Have you even glanced at the documentation?

I have, but I will review the documentation more closely. I was particularly asking about how to specify these models in light of how omxSaturatedModel() or the EasyMx code is used.

The function

`omxSaturatedModel`

is just a quick way to build a saturated model. It returns a list where the first element is the saturated model (free means, free variances, free covariances), and the second element is the independence model (i.e., has free means, free variances, and zero covariances). The input to`emxMixtureModel`

is just a list of models and a data set. I used`omxSaturatedModel`

just as a one-line way to build a model. You'll have to do some thinking about what model you want to specify for the components of the mixture, and build those models.You can constrain parameters to be equal by given them the same "label".