# Plotting profile likelihood curves in R

I am trying to figure out how to plot the profile likelihood curve of a GLM parameter with 95% pLCI's on the same plot. The example I have been trying with is below. The plots I am getting are not the likelihood curves that I was expecting. The y-axis of the plots is tau and I would like that axis to be the likelihood so that I have a curve that maxes at the parameter estimate. I am not sure where I find those likelihood values? I may just be misinterpreting the theory behind this. Thanks for any help you can give.

Max

``````clotting <- data.frame(
u = c(5,10,15,20,30,40,60,80,100),
lot1 = c(118,58,42,35,27,25,21,19,18),
lot2 = c(69,35,26,21,18,16,13,12,12))
glm2<-glm(lot2 ~ log(u), data=clotting, family=Gamma)
prof<-profile(glm2)
plot(prof)
``````
-
You never stored the results of your call to glm here. –  Dason Aug 11 '12 at 16:12
Don't know how that did not copy over, thanks. –  ADW11 Aug 11 '12 at 17:51

``````clotting <- data.frame(
u = c(5,10,15,20,30,40,60,80,100),
lot1 = c(118,58,42,35,27,25,21,19,18),
lot2 = c(69,35,26,21,18,16,13,12,12))
glm2 <- glm(lot2 ~ log(u), data=clotting, family=Gamma)
``````

The `profile.glm` function actually lives in the `MASS` package:

``````library(MASS)
prof<-profile(glm2)
``````

In order to figure out what `profile.glm` and `plot.profile` are doing, see `?profile.glm` and `?plot.profile`. However, in order to dig into the `profile` object it may also be useful to examine the code of `MASS:::profile.glm` and `MASS:::plot.profile` ... basically, what these tell you is that `profile` is returning the signed square root of the difference between the deviance and the minimum deviance, scaled by the dispersion parameter. The reason that this is done is so that the profile for a perfectly quadratic profile will appear as a straight line (it's much easier to detect deviations from a straight line than from a parabola by eye).

The other thing that may be useful to know is how the profile is stored. Basically, it's a list of data frames (one for each parameter profiled), except that the individual data frames are a little bit weird (containing one vector component and one matrix component).

``````> str(prof)
List of 2
\$ (Intercept):'data.frame':    12 obs. of  3 variables:
..\$ tau     : num [1:12] -3.557 -2.836 -2.12 -1.409 -0.702 ...
..\$ par.vals: num [1:12, 1:2] -0.0286 -0.0276 -0.0267 -0.0258 -0.0248 ...
.. ..- attr(*, "dimnames")=List of 2
.. .. ..\$ : NULL
.. .. ..\$ : chr [1:2] "(Intercept)" "log(u)"
..\$ dev     : num [1:12] 0.00622 0.00753 0.00883 0.01012 0.0114 ...
\$ log(u)     :'data.frame':    12 obs. of  2 variables:
..\$ tau     : num [1:12] -3.516 -2.811 -2.106 -1.403 -0.701 ...
..\$ par.vals: num [1:12, 1:2] -0.0195 -0.0204 -0.0213 -0.0222 -0.023 ...
.. ..- attr(*, "dimnames")=List of 2
``````

It also contains attributes `summary` and `original.fit` that you can use to recover the dispersion and minimum deviance:

``````disp <- attr(prof,"summary")\$dispersion
mindev <- attr(prof,"original.fit")\$deviance
``````

Now reverse the transformation for parameter 1:

``````dev1 <- prof[[1]]\$tau^2
dev2 <- dev1*disp+mindev
``````

Plot:

``````plot(prof[[1]][,1],dev2,type="b")
``````

(This is the plot of the deviance. You can multiply by 0.5 to get the negative log-likelihood, or -0.5 to get the log-likelihood ...)

edit: some more general functions to transform the profile into a useful format for `lattice`/`ggplot` plotting ...

``````tmpf <- function(x,n) {
data.frame(par=n,tau=x\$tau,
deviance=x\$tau^2*disp+mindev,
x\$par.vals,check.names=FALSE)
}
pp <- do.call(rbind,mapply(tmpf,prof,names(prof),SIMPLIFY=FALSE))
library(reshape2)
pp2 <- melt(pp,id.var=1:3)
pp3 <- subset(pp2,par==variable,select=-variable)
``````

Now plot it with lattice:

``````library(lattice)
xyplot(deviance~value|par,type="b",data=pp3,
scales=list(x=list(relation="free")))
``````

Or with ggplot2:

``````library(ggplot2)
ggplot(pp3,aes(value,deviance))+geom_line()+geom_point()+
facet_wrap(~par,scale="free_x")
``````

-
Really helpful and exactly what I was looking for. Thanks so much, Ben. –  ADW11 Aug 11 '12 at 18:47