# R binary logit random intercept [closed]

Consider the standard binary logit regression model from any textbook

1. Write down and program the log-likelihood function
2. Introduce a random intercept assumption in which the intercept is drawn from a normal distribution with finite mean and variance. What justification can you offer for introducing an unobserved heterogeneity term in this way?
3. Rewrite the likelihood function conditional on unobserved heterogeneity. Next write down the likelihood function with unobserved heterogeneity integrated out.
4. Program a maximum simulated likelihood estimation procedure to estimate this model.

Please, maybe you've got some thoughts? I have done log-likehood function:

``````# Pre-init: clear all data in workspace
rm(list=ls(all=TRUE))

library(AER)
library(HH)
data("DoctorVisits", package="AER")

# Checking the data
DoctorVisits
# Checking the dimensions of the array
dim(DoctorVisits)
# Getting the titles
names(DoctorVisits)
# And global statistics
summary(DoctorVisits)

#Declaring the function to be used is optim
logit.lik<-function(y,n,lamda)
{
logl<-sum(y*log(exp(lamda)/(1+exp(lamda))) + (n-y)*log(1/(1+exp(lamda))))
return(-logl)
}

tx=as.data.frame(DoctorVisits[,c("age","visits","health","nchronic","lchronic")])
ordered<-tx[order(tx\$age, tx\$health),]
patients<-split(ordered,ordered\$age,drop=TRUE)
patients

count<-length(patients)
ni<-array(1:count)
yi<-array(1:count)

par(mfrow=c(4,3))

for(i in 1:count)
{
plot(patients[[i]]\$health,patients[[i]]\$visits)
ni[i]<-dim(patients[[i]])[1]
yi[i]<-sum(patients[[i]]\$nchronic=='yes')
myline.fit <- lm(patients[[i]]\$health ~ patients[[i]]\$visits)
abline(myline.fit)
}
count
par0 <- array(3,dim=count)
opt <- optim(par0,f=logit.lik,y=yi,n=ni)
antilogit(opt\$par)

ans_count<-length(opt\$par)
plot(1:ans_count,opt\$par,type="l",col="blue",cex.lab=0.8, lwd=2)
``````
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Tagged as "homework" because it looks an awful lot that way ... it doesn't look like your solving the problem asked, though. It looks like your log-likelihood function is a complicated way to retrieve the binomial likelihood ... –  Ben Bolker Nov 30 '11 at 14:27
Generally, clearing the workspace is not needed. –  Paul Hiemstra Nov 30 '11 at 16:20
yes, actually, it's a homework, but I'm doing this stuff not for me and I just want to know how to do. I suppose I've done first question, but I don't know how to immplement "random intercept" to binary data. –  xxxFeLiXxxx Nov 30 '11 at 17:31