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In lm and glm models, I use functions coef and confint to achieve the goal:

m = lm(resp ~ 0 + var1 + var1:var2) # var1 categorical, var2 continuous
coef(m)
confint(m)

Now I added random effect to the model - used mixed effects models using lmer function from lme4 package. But then, functions coef and confint do not work any more for me!

> mix1 = lmer(resp ~ 0 + var1 + var1:var2 + (1|var3)) 
                                      # var1, var3 categorical, var2 continuous
> coef(mix1)
Error in coef(mix1) : unable to align random and fixed effects
> confint(mix1)
Error: $ operator not defined for this S4 class

I tried to google and use docs but with no result. Please point me in the right direction.

EDIT: I was also thinking whether this question fits more to http://stats.stackexchange.com/ but I consider it more technical than statistical, so I concluded it fits best here (SO)... what do you think?

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To get you started until someone like @BenBolker shows up (an expert): ?lmer lists methods fixef and ranef in addition to coef. Since your error says it's having trouble combining the two, the issue is likely that your model specification is somehow "unusual". –  joran Jun 17 '12 at 16:01
    
Thanks @joran. My model spec is maybe unusual in omitting the intercept - I want to do this, because otherwise the coefficients are nonsense. var1 is categorical and I want "group specific intercepts" for each its category. If I allow the intercept (remove 0 + from formula), coef runs but doesn't give what I expect. fixef works great, thanks! However the confint doesn't work at all. –  TMS Jun 17 '12 at 16:09
    
I would extract the data you need directly from the S4 object -- see this post's answers: stackoverflow.com/questions/8526681/… –  baha-kev Jun 17 '12 at 16:26
    
Thanks @baha-kev, but are you sure the confidence intervals are in this object? I don't think so... –  TMS Jun 17 '12 at 21:52
1  
I am fixing the bug(let)? in coef in the r-forge versions of lme4 (lme4.0, the currently stable branch which corresponds to CRAN-lme4), and lme4, the development branch). confint is a bigger can of worms, as has been discussed, although the development branch of lme4 can calculate profile confidence intervals ... –  Ben Bolker Jun 26 '12 at 8:23

3 Answers 3

There is two new packages, lmerTest, cran.r-project.org/web/packages/lmerTest//lmerTest.pdf, and lsmeans, cran.r-project.org/web/packages/lsmeans/lsmeans.pdf, that can calculate 95% confidence limits for lmer and glmer output, maybe you can look into those? And coefplot2, r-forge.r-project.org/projects/coefplot2, I think can do it too (though as Ben points out below, in a not so sophisticated way, from the standard errors on the Wald statistics, as opposed to Kenward-Roger and/or Satterthwaite df approximations used in lmerTest and lsmeans)... Just a shame that there are still no inbuilt plotting facilities in package lsmeans (as there are in package effects(), which btw also returns 95% confidence limits on lmer and glmer objects but does so by refitting a model without any of the random factors, which is evidently not correct).

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+1 wow thanks, but please fix the links.. –  TMS Jun 26 '13 at 20:41
1  
coefplot2 does it very naively, by computing 1.96 times the Wald standard errors -- it doesn't address the very significant issues of finite-size corrections to the CIs –  Ben Bolker Jun 26 '13 at 21:14

I suggest that you use good old lme (in package nlme). It has confint, and if you need confint of contrasts, there is a series of choices (estimable in gmodels, contrast in contrasts, glht in multcomp).

Why p-values and confint are absent in lmer: see http://finzi.psych.upenn.edu/R/Rhelp02a/archive/76742.html .

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Thanks Dieter, I will try the older package. The absence of p-value - and possibility to tell significance right away - also alarmed me! Doesn't make any sense to me, if I will be able to get confidence interval then I will simply look whether it contains zero - and have the significance anyway! Regards, –  TMS Jun 17 '12 at 22:07
    
I forget to mention that confint(glht... from package multcomp give asymptotic confidence intervals for lmer. Douglas Bates caveats still apply, but his bold move to leave the p-value out of lmer/gaussian certainly has stirred the soup. –  Dieter Menne Jun 18 '12 at 6:24
    
Dieter, what do you mean with "confint(glht" ? There's no confint function in multcomp package... –  TMS Jun 18 '12 at 11:00
    
Dieter, I tried the old package lme, nice, it has p-values. But my main concern is to get the confidence interval of fixed effect coefficients. How do I do that? confint returns some big matrix, glht seems too complicated.. –  TMS Jun 18 '12 at 11:20
    
There is confint.glht. See examples and cran.r-project.org/web/packages/multcomp/vignettes/… –  Dieter Menne Jun 18 '12 at 16:15

Assuming a normal approximation for the fixed effects (which confint would also have done), we can obtain 95% confidence intervals by

estimate + 1.96*standard error.

The following does not apply to the variance components/random effects.

library("lme4")
mylm <- lmer(Reaction ~ Days + (Days|Subject),  data =sleepstudy)

# standard error of coefficient

days_se <- sqrt(diag(vcov(mylm)))[2]

# estimated coefficient

days_coef <- fixef(mylm)[2]

upperCI <-  days_coef + 1.96*days_se
lowerCI <-  days_coef  - 1.96*days_se
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Hi julieth, nice idea, however there is a difference between the real confidence intervals (computed by confint) and these .... Maybe the t-distribution would give the same result as confint (not sure about this though), but in this case I don't know the df which should be used. –  TMS Jun 17 '12 at 21:57
    
In other words, this is the reason why I prefer to use functions like confint etc. to do all this for me... (especially if I'm not sure about the normal distribution of coefficients). –  TMS Jun 17 '12 at 21:59
    
The t-distribution is asymptotically normal and the degrees of freedom for the error term in many multi-level designs is so high that the error distribution is normal at that point. Therefore, if you have a design with lots of degrees of freedom this is a perfectly reasonable confidence interval estimate. –  John Jun 18 '12 at 0:36

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