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I want to make sure I am calculating the probabilities for a probit SEM, where my outcome is 4 category ordered variable. The example in the Mplus manual has an example for three categories. Is this correct? P(Y=1x)=F(t1  b1*x1+b2*x2...) P(Y=2x)=F(t2  b1*x1+b2*x2...)  F(t1b1*x1+b2*x2...) P(Y=3x)=F(t3  b1*x1+b2*x2...)  F(t2  b1*x1+b2*x2...)  F(t1  b1*x1+b2*x2...) P(Y=4x)=F(t3 + b1*x1+b2*x2...) When I calculate the results, the last category drops from a probability of .62 to .01, which makes me think I'm doing it wrong. 


You have to carry the minus sign for all the x terms, not just the first. Also the y=3 probability is incorrect  the last term should be dropped. Think of a normal curve where you are interested in the area between 2 thresholds  only the lower and the higher limit for the category are involved. 


Thank you for the clarification; I see my mistake for Y3. Let me make sure I understand your first point. Carry the minus sign for all x terms; thus for each level of Y, I subtract b1*x1, subtract b2*x2, subtract b3*x3... So, P(Y=2x)=F(t2  b1*x1  b2*x2...)  F(t1  b1*x1  b2*x2...) And for the last level of Y, I add all the regression weights (e.g., P(Y=4x)=F(t3 + b1*x1 + b2*x2 + b3*x3...)) 


Right. 


Can I "use" the standardised probit coefficients & threshfolds to calculate probabilities? Do you expect them the probabilties calculated from the standardised coefficients to differ from those calculated from the unstandardied coefficients? thank you. ramzi 


If you may also please offer me some guidance on estimating the probability impacts on categorical indicators given changes in the latent variable with a Probit CFA . thank you very much. ramzi 


Use unstandardized estimates to compute probabilities. With latent variables you can compute the probability for say 1 SD below and above the latent variable mean, where SD comes from the latent variable variance, squarerooted. 


Is it correct then to compute the probability effect of a standard deviation increase as follows: F(t[1]B*MEAN)F(t[1]B*(MEAN+1SD)) Where F is the standard normal, MEAN the factor mean, SD the factor standard deviation, B the probit unstandardised coefficient, and t(1) the first threshold? Thank you very much ramzi 


Yes, unless you have residual variances for the indicators that are different from unity. So it depends on whether you have covariates in the model and whether you have a multiplegroup situation. See the handout of Topic 2 for how to compute probitbased probabilities when you have factors and covariates. 


Thank you for that, I found the handout topic 2 very helpful. However, I am not considering the probability effects of the covariates on the indicators but the probability effect of the factor on the indicators. My question is, do I also have to include the covariates in the computation of the factor probability effects on the indicators? 


If the covariates influence the factor and not the indicators directly you don't have to include the covariates in the computation. You just have to know what the mean and variance of the factor is, either conditional on a certain covariate value or marginally. See also the Mplus Web Note #4. 


Does this mean the formula I posted on the 23rd of November is the one to use to compute the probability effects of a factor on the categorical indicators? thank you again. ramzi 


Web Note 4 gives the answer in formula (7) which shows that you need to involve the residual variance theta. Theta is not a free parameter but is computed as a remainder to add up to unit latent response variable variance when there are no covariates in the model. This means that Delta in equation (10) is one which then gives you theta as a function of lambda and psi. Then you take the square root of that theta value and use it to divide your F arguments. 


Thank you very much for this. Should I then use the inverse of the square root of the theta to compute both marginal factor effects on the indicators and model estimated probability proportion for the categorical indicator ? Can I also use the formulas in Webnote 4 to compute the factor probability effects on the reference indicator whose loading is fixed to one (to scale the factor; note that I am using the theta not delta parameterization)? & how come MPLUS computes unstandardised thresholds for this reference indicator if, according to Kamata & Bauer (2008:138), such thresholds should be 0? thank you. ramzi 


Answers to your 3 questions: Yes. Yes, but with the Theta parameterization the latent response variable variance is not 1. Instead, you should work with theta=1. Note also that with covariates you follow the formulas of theTopic 2 item bias segment. There are different ways to parameterize the model. I have not read the reference you give, but it might be that they fix the threshold to zero for the indicator with lambda fixed at 1 because they instead free the factor mean. These are equivalent parameterizations in terms of model fit. And as far as I can see none is preferable from an interpretation point of view. 


If I understand correctly then, the formula I posted on the 23rd November to compute the probability effect of a standard deviation increase in the factor on the categorical indicator __ F(t[1]B*MEAN)F(t[1]B*(MEAN+1SD)) __ should be the correct one to use with covariates and the theta parametrisation. I am however still not sure how to interpret this probability. It should not be the probability of changing thresholds at the mean of the factor because the other threshold, threshold2, is not included in the argument? 


Regarding your first question, yes this is the correct formula if your covariates do not have direct effects on the item and you use the Theta parameterization. This is seen in the Topic 2 handout I pointed to  see page 163, eqns (46) and (47). You just have to drop x and note that theta=1. Regarding your second question, your formula concerns the probability of being below the threshold which with a binary item implies the probability of observing 0 (not 1). It sounds like you consider a polytomous item. With say 3 categories you have 3 different probabilities to consider. Those probs are computed in line with eqns (18)(20) of Technical Appendix 1 on our web site, where the x is your factor. 


In a post above about calculating probabilities based on probit from WLSVM, Professor Muthen responded: "...With latent variables you can compute the probability for say 1 SD below and above the latent variable mean, where SD comes from the latent variable variance, squarerooted." My question: Because the factor mean in a single group analysis is zero, do you calculate the probability of a categorical observed variable with a latent variable of interest using a mean of zero? That is for Y1 ON F1, where for F1 => B*(mean+1SD) where the mean is always zero and the SD is the square root of the estimated factor variance? 


Yes. 

Sarah Ryan posted on Wednesday, September 28, 2011  12:50 pm



I have a model with 4 control covariates, 4 LV's, and 2 x's predicting an observed y with 5 levels. I am using WLSMV. The latent factors, but not any of their indicators, are regressed on the observed covariates. The observed y is regressed on the observed covariates. After reading the posts above, I'm still not clear on whether I need to include the covariates (ie use formulas 46 and 47 of Topic 2 handout) in the prediction of probabilities for y. I think I probably do, but can you confirm or disconfirm? Thanks in advance. 


Yes, you do need to include the covariates  as is done in those formulas with x. Unless, you have centered (subtracted their means) those covariates and want to compute the probability at their means (which is zero for the centered version). 

Sarah Ryan posted on Thursday, September 29, 2011  4:48 pm



Okay, so in calculating y probabilities do I include only those covariates that share a significant association with the outcome (given covariate associations with all other predictors)? Also, I would use this equation, then (with zero values for latent factor means), yes? P (uij=1eta*ij,xi) = 1– F[(tj – lambda*j_eta*i  kj_xi)*(1/sqrt(theta))] (with theta being the y* residual variance in the standardized output). Are you aware of any resources that can guide me in expanding this for a fivelevel outcome? I'm having trouble, and I'm not sure if it is because I'm not expanding the equation correctly or if my output is problematic. My thresholds are 1.51, 2.13, 2.19, and 2.96 and the y* residual variance is .45 (ie 1/sqrt(.45)=1.36), so I'm getting either very large or very small probabilities. 


You should use all covariates included in the model, unless you consider a simplified model. You get the factor mean value from Tech4  it might not be zero, depending on the covariates influencing it. See Appendix 1 of the V2 appendix to get the expression for the probabilities of an outcome u with more than 2 categories. 

Sarah Ryan posted on Friday, September 30, 2011  5:14 pm



Once again, thank you. With this information, I have predicted probabilities and the world makes sense again! 

Jak posted on Thursday, January 19, 2012  7:54 am



1) When I use (multilevel categorical) MLR estimation with link = probit, is it correct that the variance of the underlying latent response variables is 1? 2) I am trying to obtain the univariate probabilities for the categorical variables from the estimated thresholds. I thought a (first) threshold of 1.28 should match an observed proportion of .10 in the first category. But this seems incorrect, I hope you can help me out. Thanks in advance! 


1. The residual variance is one. 2. See the formulas on page 440 of the user's guide. 

Jak posted on Wednesday, January 25, 2012  7:27 am



Thank you for your reply. To be sure: With residual variance, you mean the residual variance at the within level? Or the total (within+between) residual variance? Kind regards, Suzanne 


It is the residual variance of the underlying latent response variable on within. In the between part of the model, the categorical variable is a continuous random intercept. 


I have estimated a probit model and have a question about the interpretation of the coefficients. I have noticed in other sources that authors recommend calculating marginal effects to make the probit coefficients more interpretable. However, this is not the method recommended in Chapter 14 of the Mplus user’s manual. Is there something about the way that the Mplus program estimates the coefficients that affects the translation of the probit coefficients? Why does the Mplus manual recommend calculating the predicted probabilities directly from the probit equation rather than from marginal effects? Thanks in advance for any help you can provide. 


Marginal effects are certainly also of interest, but are not provided automatically by Mplus. For definitions, see e.g. the book by Long (1997), section 3.7.4. The marginal effect of one covariate varies as a function of other covariate values so it isn't a simple description. I think you can express them in Mplus using the new LOOP and PLOT options of MODEL CONSTRAINT. This way you would also get confidence intervals. 

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