Stack Overflow is a community of 4.7 million programmers, just like you, helping each other.

Join them; it only takes a minute:

Sign up
Join the Stack Overflow community to:
  1. Ask programming questions
  2. Answer and help your peers
  3. Get recognized for your expertise

just had a quick question on using Step AIC to make prediction. I'm a beginner in R, so please pardon if the solution is obvious. Tried searching around but couldn't really find what I was looking for.

So I'm trying to predict the response variable, after running stepwise AIC on a main model (main model has all the explanatory variables). The stepAIC gives out a new model that has a reduced number of variables. My question is how do I do an out of sample prediction using the new reduced model. In other words, how does I reduce the dataset so that when I feed it into predict.lm, it only has the variables that were selected in the reduced model.

Here's my code below:

# Specify start and end row of the first 5 year window

#declare matrix that will contain the predicted returns by specifying dimensions


# Perform linear regression on all factors and then select factors using stepwise AIC     method

initial_model<-    lm(y_var[,1]~x_var[,1]+x_var[,2]+x_var[,3]+x_var[,4]+x_var[,5]+x_var[,6]+x_var[,7]+x_var[,8]+x_var[,9]+x_var[,10]+x_var[,11]+x_var[,12]+x_var[,13]+x_var[,14]+x_var[,15]+x_var[,16]+x_var[,17]+x_var[,18]+x_var[,19]+x_var[,20])

reduced_model<-stepAIC(initial_model, direction="both")

Basically how do I multiply the coefficients that I get from the reduced model to only the corresponding explanatory variables in "x_var" (which has all the explanatory variables)

Thanks a lot for your help!

share|improve this question
In principle something like predict(reduced_model,newdata=x_input) except that there are going to be some complexities due to (1) your multiple response variables and (2) the fact that you're not using a data argument. If you give a reproducible example I might take a crack at this. – Ben Bolker Dec 5 '12 at 21:44

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Browse other questions tagged or ask your own question.