I am working on a two-stage estimation of order quantity. In order to estimate the second stage (OLS), I need to control for selection bias, and thus need to calculate the inverse mills ratio of the first stage (probit model).
This is my code so far:
# required packages: sampleSelection library("sampleSelection", lib.loc="/Library/Frameworks/R.framework/Versions/2.15/Resources/library")
Set up of the Probit model to estimate Purchase
myprobit <- glm(Purchase ~ Lag_purchase + Avg_Order_Quantity + Ret_Expense + Ret_Expense_SQ + Gender + Married + Income + First_Purchase + Loyalty, data = mydata, family = binomial(link = "probit"), model=TRUE) ## probit model summary(myprobit)
Definition of a new variable, the predicted Repurchase Probability
mydata1$Repurchase_OQa <- predict(myprobit, newdata = mydata1, type = "response") mydata1$Repurchase_OQ <- as.numeric(mydata1$Repurchase_OQa)
The selection bias is controlled for via the inverse mills ratio, which is defined as pdf / cdf
mydata1$lambda <- dnorm(mydata1$Repurchase_OQ)/pnorm(mydata1$Repurchase_OQ)
Set up of an OLS regression to estimate Order Quantity taking into account the results
from the previous regression for Purchase. We include a variable lambda to account for selection bias.(inverse mills ratio)
myOLS <- lm( Order_Quantity ~ Lag_purchase + Avg_Order_Quantity + Ret_Expense + Ret_Expense_SQ + Gender + Married + Income + First_Purchase + Loyalty + lambda, data=mydata1) summary(myOLS) # model output
The probit model works just fine, however, I feel that my specification of the inverse mills ratio is not correct. I have tried to implement another R code for the definition of it, from the package SampleSelection. See below.
lambda <- invMillsRatio(myprobit, all=TRUE) # calculate inverse mills ratio mydata1$lambda <- lambda$IMR1
However, this does not yield correct results either. Can you give me any hints on how I could calculate the correct Inverse Mills Ratio with the help of R? Thanks.