I am fitting gam's to data on the interval (0,1) using the gam function of the mgcv package in R. My model code looks like this:

mod <- gam(y ~ x1 + x2 + s(latitude, longitude), faimly=betar(link='logit'), data = data)

Model fits well, but when I plot the fitted vs. observed values, it looks like this:

plot(data$y ~ fitted(mod), ylab='observed',xlab='fitted')

enter image description here

Clearly, the model is fitting values greater than 1 and less than 0. This is not supposed to happen. It violates the assumptions of the beta distribution. It doesn't happen when I model the same data in the betareg package for R. What might be causing this discrepancy?

migrated from stats.stackexchange.com Sep 2 '16 at 13:23

This question came from our site for people interested in statistics, machine learning, data analysis, data mining, and data visualization.

  • 3
    How are you determining "fitted"? If you're using predict, you'll want to use the argument type="response", otherwise it will go outside of the range. If you're using the fitted function, I'm not sure. – Wayne Sep 1 '16 at 15:18
  • @Wayne I'm obtaining fitted values using fitted(mod). Plotting is done with plot(y ~ fitted(mod)) – colin Sep 1 '16 at 15:32

mod <- gam(y ~ x1 + x2 + s(latitude, longitude), faimly=betar(link='logit'), data = data)

It appears if you use faimly (typo), gam doesn't complain and goes ahead and does a Gaussian. Try:

print (mod)

And see if it says "Family: Beta regression" or "Family: Gaussian"

  • woof, thanks. this was it. Would have been nice if it had thrown a warning! – colin Sep 1 '16 at 16:35

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.