I am having an hard time in getting the model estimated by the R package lars for my data.

For example I create a fake dataset x and corresponding values y like this:

x = cbind(runif(100),rnorm(100))
colnames(x) = c("a","b")
y = 0.5 + 3 * x[,1,drop = FALSE]

Next I train a model that uses lasso regularization using the lars function:

m = lars(x,y,type = "lasso", normalize = FALSE, intercept = TRUE)

Now I would like to know what is the estimated model (that I know to be: y = 0.5 + 3 * x[,1] + 0 * x[,2])

I am only interested in the coefficients obtained in the last step:

cf = predict(m, x, s=1, mode = "fraction", type = "coef")$coef
a b 
3 0

These are the coefficients that I expect, but I can't find a way to get the intercept (0.5) from m.

I have tried to check the code of predict.lars, where the fit is done as such:

fit = drop(scale(newx, 
           object$meanx, FALSE) %*% t(newbetas)) + object$mu)

I can see that the variables are scaled, and that the mean of y (object$mu) is used, but I can't find an easy way to obtain the value of the intercept I am looking for. How can I get that?

  • Hi, you can replace x with cbind(1,x) to add a column of ones and use the option intercept=FALSE. – Stéphane Laurent Aug 14 '14 at 16:06
  • 1
    ... but it is not a good idea because lasso could set the intercept at 0 – Stéphane Laurent Aug 17 '14 at 16:50

intercept=T in lars has the effect of centering the x variables and y variable. It doesn't include an explicit intercept term with a coefficient.

That being said, you could do predict(m,data.frame(a=0,b=0),s=2)$fit to get the predicted value of y when the covariates are 0 (the definition of a traditional intercept)

  • 1
    thanks, I was looking for a way to access them from the data structure, but it doesn't seam to be possible.. Another way I have found, is using the fact that you have fit the model (y - ym) = b1*(x1 - x1m) + b2*(x2 - x2m), so that the intercept in terms of your un-centred variables is y = (y -b1*xm1 - b2*xm2) where the m denotes the mean of the variables – lucacerone Jan 30 '14 at 21:48

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service, privacy policy and cookie policy

Not the answer you're looking for? Browse other questions tagged or ask your own question.