A newbie question: does anyone know how to run a logistic regression with clustered standard errors in R? In Stata it's just
logit Y X1 X2 X3, vce(cluster Z), but unfortunately I haven't figured out how to do the same analysis in R. Thanks in advance!
You might want to look at the
rms (regression modelling strategies) package. So,
lrm is logistic regression model, and if
fit is the name of your output, you'd have something like this:
fit=lrm(disease ~ age + study + rcs(bmi,3), x=T, y=T, data=dataf) fit robcov(fit, cluster=dataf$id) bootcov(fit,cluster=dataf$id)
You have to specify
y=T in the model statement.
rcs indicates restricted cubic splines with 3 knots.
I have been banging my head against this problem for the past two days; I magically found what appears to be a new package which seems destined for great things--for example, I am also running in my analysis some cluster-robust Tobit models, and this package has that functionality built in as well. Not to mention the syntax is much cleaner than in all the other solutions I've seen (we're talking near-Stata levels of clean).
So for your toy example, I'd run:
There is a command
glm.cluster in the R package
miceadds which seems to give the same results for logistic regression as Stata does with the option
vce(cluster). See the documentation here.
In one of the examples on this page, the commands
mod2 <- miceadds::glm.cluster(data=dat, formula=highmath ~ hisei + female, cluster="idschool", family="binomial") summary(mod2)
give the same robust standard errors as the Stata command
logit highmath hisei female, vce(cluster idschool)
e.g. a standard error of 0.004038 for the variable
Another alternative would be to use the
lmtest package as follows. Suppose that
z is a column with the cluster indicators in your dataset
# load libraries library("sandwich") library("lmtest") # fit the logistic regression fit = glm(y ~ x, data = dat, family = binomial) # get results with clustered standard errors (of type HC0) coeftest(fit, vcov. = vcovCL(fit, cluster = dat$z, type = "HC0"))
will do the job.