Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I have a data set with 6 clusters, each containing 48 (possibly censored, in which case event = 0) survival times. The x column contains a cluster-specific explanatory variable. I try to describe that data with a gamma frailty model as follows


 mod <- coxph(Surv(time, event) ~ 
   x + frailty.gamma(cluster, eps=1e-10, method="em", sparse=0),
              outer.max=1000, iter.max=10000,

Here is the error message:

Error in if (history[2, 3] < (history[1, 3] + 1)) theta <- mean(history[1:2,  : 
  missing value where TRUE/FALSE needed

Does anyone have an idea on how to debug?

share|improve this question
The help page for frailty says: "For Cox models the coxme package has replaced superseded this method." –  BondedDust Dec 3 '12 at 7:56
Thanks for you commont @DWin. However, coxme fits Gaussian frailties, not gamma frailties. –  Marco Dec 3 '12 at 8:01
no time to look into this further, but the place to look is in "cfun", which is produced by fraily.gamma():FG <- frailty.gamma(data$cluster, eps=1e-10, method="em", sparse=TRUE); FG["cfun"] –  tim riffe Dec 5 '12 at 16:47
@tim riffe: I would be interested to know a bit more when you have a minute ;-) –  Marco Dec 5 '12 at 17:50
up voted just so you can recover some of the massive bounty... –  Paul Cezanne Dec 6 '12 at 19:23
show 1 more comment

3 Answers

The problem is with the data; you cannot separate cluster-specific effects from your x if all of the x are the same in each cluster.

Looking at the distribution of x in your data by cluster we can see this:

     1  2  3  4  5  6
  0  0 48  0 48 48  0
  1 48  0 48  0  0 48

Which is I think what you mean by cluster-specific explanatory variable. This will be a problem in any model because x is collinear (I think that is the word) with cluster. Even trying the most basic model:

mod <- coxph(Surv(time, event) ~ x + cluster, data=data)

Warning message:
In coxph(Surv(time, event) ~ x + cluster, data = data) :
  X matrix deemed to be singular; variable 5

The matrix is singular because there is no way to differentiate between the effects of cluster and x.

If you have no other variables besides cluster and x, then all you can really do is run the effect of the cluster alone:

coxph(Surv(time, event) ~ cluster,data=data)

coxph(formula = Surv(time, event) ~ cluster, data = data)

          coef exp(coef) se(coef)     z       p
cluster2 1.070      2.92    0.382  2.80 5.1e-03
cluster3 0.499      1.65    0.384  1.30 1.9e-01
cluster4 1.705      5.50    0.365  4.68 2.9e-06
cluster5 2.058      7.83    0.370  5.56 2.7e-08
cluster6 4.415     82.69    0.399 11.06 0.0e+00

Consider that both cluster1 and cluster6 have the same value of x, and the hazard ratio between them is 83. Perhaps cluster6 was different, perhaps x acts differently within cluster6: you can't tell the difference because of the way the data is structured.

share|improve this answer
Many thanks for your answer. However, considering the "cluster effect" as random should allow to fit the model. By the way, changing "frailty.gamma(cluster, eps=1e-10, method="em", sparse=0)" into "frailty.gaussian(cluster, eps=1e-10, method="reml", sparse=0)" gives something. I really think that the problem comes from my R-code. Anyway, thx for your insight. –  Marco Dec 5 '12 at 17:48
Good point. I have done a little debugging so far, and it seems that within one of the fitting functions inside survival:::coxpenal.fit, the loglik is returned as NaN, indicating that something was divided by zero within the C code. I suspect that the division by zero itself is caused by a "perfect fit" due to the structure of your data, but that is just a guess. –  nograpes Dec 5 '12 at 19:08
add comment

Alternative solution : Changing the variance factor

Changing the method of the variance of the random effect, seems to fix the problem.


mod.aic <- coxph(Surv(time, event) ~ 
               x + frailty.gamma(cluster, eps=1e-10, method="aic", sparse=0),
             outer.max=1000, iter.max=10000,

plot(survfit(mod.aic), col=4)

enter image description here

ddd hoc solution: works if we remove one cluster

Maybe this don't answer exactly your question , but when I remove any cluster e.g:

res <- sapply( 1:6 , function(x) {
                      mod <- 
                        coxph(Surv(time, event) ~ 
                        x + frailty.gamma(cluster, eps=1e-10, method="em", sparse=0),
                        outer.max=1000, iter.max=10000,
                        data=subset(dat,cluster != x)
                     plot(survfit(mod), col=4,main= paste ('cluster', x, 'is removed'))

the coxph converge and I have the same result for all samples.

enter image description here

I don't have enough information about your data for further analysis but I Tried to do some comparison between different clusters.

qplot(data = dat, x=time , y = x , facets= event~cluster)

enter image description here

I notice that 3 groups :

  1. clusters 1,3,5 : events uniformally distributed
  2. clusters 2 ,4 : events just for small times.
  3. cluster 6 : amazing one ( only event 1)
share|improve this answer
Thanks for pointing that out. "method=aic" is however not standard and I have no idea how it performs compared to "method=em" which has been proven to give the same estimates as the EM algorithm... –  Marco Dec 6 '12 at 19:35
So no way to use aic to select the variance even with more explanation? –  agstudy Dec 6 '12 at 19:39
Sorry, I do not get the question... more explanation on what? By the way, +1 for your answer anyway –  Marco Dec 6 '12 at 19:46
I would trust in 'method=aic' if I see simulation results showing it performs well. But, to me, it looks like an ad-hoc method... I have never seen anyone using that method in this context. –  Marco Dec 6 '12 at 20:12
@Marco I update my solution. –  agstudy Dec 7 '12 at 13:30
show 1 more comment
up vote 2 down vote accepted

Here is the answer I was given by Terry Therneau (the author of coxph).

I looked at your data:

> table(x, cluster)
     1  2  3  4  5  6
  0  0 48  0 48 48  0
  1 48  0 48  0  0 48

Your covariate "x" is perfectly predicted by the cluster variable. If you fit a fixed effects model: coxph(Surv(time, event) ~ factor(cluster) +x)

then the "x" variable is declared redundant. When the variance of the random effect is sufficiently large, the same happens in the gamma model when the variance is sufficiently large. Your model approaches this limit, and the solution fails. As mentioned in the manual page, the coxme function is now preferred.

Last, your particular error message is caused by an invalid value for "sparse". I'll add a check to the program. You likely want "sparse=10" to force non-sparse computation.

share|improve this answer
add comment

Your Answer


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

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