I would like to get 95% confidence intervals for the regression coefficients of a quantile regression. You can calculate quantile regressions using the rq function of the quantreg package in R (compared to an OLS model):
library(quantreg)
LM<-lm(mpg~disp, data = mtcars)
QR<-rq(mpg~disp, data = mtcars, tau=0.5)
I am able to get 95% confidence intervals for the linear model using the confint function:
confint(LM)
When I use quantile regression I understand that the following code produces bootstrapped standard errors:
summary.rq(QR,se="boot")
But actually I would like something like 95% confidence intervals. That is, something to interprete like: "with a probability of 95%, the interval [...] includes the true coefficient". When I calculate standard errors using summary.lm() I would just multiply SE*1.96 and get similar results as from confint(). But this is not possible using bootstrapped standard errors. So my question is how get 95% confidence intervals for quantile regression coefficients?
You can use the boot.rq function directly to bootstrap the coefficients:
x<-1:50
y<-c(x[1:48]+rnorm(48,0,5),rnorm(2,150,5))
QR <- rq(y~x, tau=0.5)
summary(QR, se='boot')
LM<-lm(y~x)
QR.b <- boot.rq(cbind(1,x),y,tau=0.5, R=10000)
t(apply(QR.b$B, 2, quantile, c(0.025,0.975)))
confint(LM)
plot(x,y)
abline(coefficients(LM),col="green")
abline(coefficients(QR),col="blue")
for(i in seq_len(nrow(QR.b$B))) {
abline(QR.b$B[i,1], QR.b$B[i,2], col='#0000ff01')
}
You may want to use the boot package to compute intervals other than the percentile interval.