Regression model with proportional dependent variable
On Apr 12, 2011, at 08:45 , Achim Zeileis wrote:
On Mon, 11 Apr 2011, ty ty wrote:
Hello, dear experts. I don't have much experience in building regression models, so sorry if this is too simple and not very interesting question. Currently I'm working on the model that have to predict proportion of the debt returned by the debtor in some period of time. So the dependent variable can be any number between 0 and 1 with very high probability of 0 (if there are no payment) and if there are some payments it can very likely be 1 (all debt paid) although can be any number from 0 to 1. Not having much knowledge in this area I can't think about any appropriate model and wasn't able to find much on the Internet. Can anyone give me some ideas about possible models, any information on-line and some R functions and packages that can implement it. Thank you in advance for any help.
Beta regression is one possibility to model proportions in the open unit interval (0, 1). It is available in R in the package "betareg": http://CRAN.R-project.org/package=betareg http://www.jstatsoft.org/v34/i02/ If 0 and 1 can occur, some authors have suggested to scale the response so that 0 and 1 are avoided. See the paper linked above for an example. If, however, there are many 0s and/or 1s, one might want to take a hurdle or inflation type approach. One such approach is implemented in the "gamlss" package: http://CRAN.R-project.org/package=gamlss http://www.jstatsoft.org/v23/i07/ http://www.gamlss.org/ The hurdle approach can be implemented using separate building blocks. First a binary regression model that captures whether the dependent variable is greater than 0 (i.e., crosses the hurdle): glm(I(y > 0) ~ ..., family = binomial). Second a beta regression for only the observations in (0, 1) that crossed the hurdle: betareg(y ~ ..., subset = y > 0). A recent technical report introduces such a family of models along with many further techniques (specialized residuals and regression diagnostics) that are not yet available in R: http://arxiv.org/abs/1103.2372
Hmm, but this is actually 0-_and_-1 inflated, is it not? Various versions of censored regression comes to mind (like a generalized tobit), but I don't know anything that is spot on. Doubly censored regression is not hard to set up using generic likelihood methods, once you decide on the underlying distribution. Obviously, a basic modelling decision is whether the same parameters apply to the censoring process as to the continuous part.
Peter Dalgaard Center for Statistics, Copenhagen Business School Solbjerg Plads 3, 2000 Frederiksberg, Denmark Phone: (+45)38153501 Email: pd.mes at cbs.dk Priv: PDalgd at gmail.com