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For IGF data from nlme library, I'm getting this error message:

lme(conc ~ 1, data=IGF, random=~age|Lot)
Error in lme.formula(conc ~ 1, data = IGF, random = ~age | Lot) : 
  nlminb problem, convergence error code = 1
  message = iteration limit reached without convergence (10)

But everything is fine with this code

lme(conc ~ age, data=IGF)
Linear mixed-effects model fit by REML
  Data: IGF 
  Log-restricted-likelihood: -297.1831
  Fixed: conc ~ age 
 (Intercept)          age 
 5.374974367 -0.002535021 

Random effects:
 Formula: ~age | Lot
 Structure: General positive-definite
            StdDev      Corr  
(Intercept) 0.082512196 (Intr)
age         0.008092173 -1    
Residual    0.820627711       

Number of Observations: 237
Number of Groups: 10 

As IGF is groupedData, so both codes are identical. I'm confused why the first code produces error. Thanks for your time and help.

share|improve this question
I took a quick look at this and nothing jumps out at me. You might have better luck on the r-sig-mixed-models mailing list, which has a much higher concentration of people familiar with this package ... –  Ben Bolker Oct 27 '11 at 23:53
Have you tried increasing the iteration limits in the first example? See ?lmeControl. –  Hong Ooi Oct 28 '11 at 0:18
See answer and comments below. Your first model does not have age as a fixed effect, nor the random effect constraints that the second model has. –  John Colby Oct 28 '11 at 1:11
Also, if you want to dig into this package beyond just very basic models, I highly recommend getting a copy of the accompanying book Mixed-Effects Models in S and S-Plus. It has chapters and examples on all of these topics. Very thorough. –  John Colby Oct 28 '11 at 1:13
@JohnColby: I've taken this code from the book. –  MYaseen208 Oct 28 '11 at 4:55

1 Answer 1

If you plot the data, you can see that there is no effect of age, so it seems strange to be trying to fit a random effect of age in spite of this. No wonder it is not converging.


dev.new(width=6, height=3)
qplot(age, conc, data=IGF) + facet_wrap(~Lot, nrow=2) + geom_smooth(method='lm')

enter image description here

I think what you want to do is model a random effect of Lot on the intercept. We can try including age as a fixed effect, but we'll see that it is not significant and can be thrown out:

> summary(lme(conc ~ 1 + age, data=IGF, random=~1|Lot))
Linear mixed-effects model fit by REML
 Data: IGF 
       AIC      BIC    logLik
  604.8711 618.7094 -298.4355

Random effects:
 Formula: ~1 | Lot
        (Intercept) Residual
StdDev:  0.07153912 0.829998

Fixed effects: conc ~ 1 + age 
                Value  Std.Error  DF  t-value p-value
(Intercept)  5.354435 0.10619982 226 50.41849  0.0000
age         -0.000817 0.00396984 226 -0.20587  0.8371
age -0.828

Standardized Within-Group Residuals:
        Min          Q1         Med          Q3         Max 
-5.46774548 -0.43073893 -0.01519143  0.30336310  5.28952876 

Number of Observations: 237
Number of Groups: 10 
share|improve this answer
Your analysis certainly answers the question of what's going on in the data, but there's still an interesting question about what the differences are in the models that are actually fitted. Looking at the results of the successful model above you can see that it does fit a random effect of age (although there is a perfect correlation with the among-lot intercept variation, indicating that the model is overfitted ...) –  Ben Bolker Oct 28 '11 at 0:17
The model in the OP's post that does work is fitting an age slope, with a random effect of Lot on that slope. That is a fine thing to if the data support it. For a good example where that is the case, do lme(height ~ age, data = Oxboys, random=~1+age|Subject). This is also the example in §4.9.3 in the ggplot2 book. The first model in the OP's post, which doesn't work, has a random effect for something that isn't specified in the fixed effects structure. I don't even think that makes sense. –  John Colby Oct 28 '11 at 0:39
Yes, but this fails too: lme(conc~age, data=IGF,random=~age|Lot), which would seem on the face of it to be an identical model. (I'm not too inclined to spend a lot of effort following this up further, although I'm mildly curious about the answer, because it seems to fall under the category of: '"Doctor, it hurts when I do this." "Well, then don't do that ..."') –  Ben Bolker Oct 28 '11 at 0:42
Ohhh I see what you're saying now. That is just because there are extra constraints placed on the random effects based on what is specified for that groupedData object. You can see in the one where it works it says Structure: General positive-definite. To manually specify the model exactly like that it would be lme(conc ~ age, data=IGF, random=pdSymm(~age)). –  John Colby Oct 28 '11 at 1:07

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