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I have $m=4$ group of mice (i.e group1, group2, group3, group4). Each group has a different number of mice. I measure a parameter $(y)$ on each mice of each group at $l=4$ different states (i.e state1, state2, state3, state4). I would like to build a mixed effect model to analyse the effect of group, state and group*state, allowing for the variability within each mouse and within each group.The mice within $group_{m}$ are labeled with an id (1,2,3...,number of mice of $group_{m}$)

$$y_{mln}=\mu +group_{m} +state_{l} +(group*state){ml}+b{ml}+\varepsilon_{mln} $$ with $b_{ml}$ the random effect for the nth mouse within $group_{m}$

My data frame has the following variables

value (num)
state (factor: 4 levels)
group (factor: 4 levels)
id (within group) (num)

Is the corresponding syntax correct?

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migrated from stats.stackexchange.com Jun 26 '12 at 20:47

This question came from our site for people interested in statistics, machine learning, data analysis, data mining, and data visualization.

@gung Thanks for your comment. I wasn't sure which place is the most appropriate. Please feel free to migrate my question. –  ECII Jun 26 '12 at 18:32
@ECII As stated, your model only considers a random intercept for group; id does not appear in your formula. We can migrate this question for you if you like, but if you are concerned with the design of this experiment and you do have a specific statistical question it should be easy to update your post so that it fits within the scope of this site. –  chl Jun 26 '12 at 19:46
@chi I think you are right that my question is more technical than "statistical". Please migrate my question. –  ECII Jun 26 '12 at 19:51
In the question you mention you're interested in the interaction between group and state, but your formula has group*time. Are time and state the same? Also, as chl asked, what role does id play? (Unrelated: does LaTeX coding not work in SO?) –  smillig Jun 26 '12 at 20:55
I don't know how to answer your full question, but in model formulas, 'a*b' is shorthand for 'a + b + a:b', so you should never need to write a + b + a*b. –  zwol Jun 26 '12 at 21:11

2 Answers 2

up vote 2 down vote accepted

You want this

mouseID <- interaction(group, ID)
lmer(value ~ group * state + (1|mouseID))

The mouseID must be unique for each mouse.

Since group is a factor, you can't have it both in the fixed and the random part. That would lead to an unidentifiable model.

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To allow for the non-unique coding of mouseID you can use (1|group:mouseID). If you want to treat group as random rather than a fixed effect (which might not work very well with only 4 groups, despite its potential conceptual justification) you would use value~state+(state|group)+(1|group:mouseID): (state|group) adds a random (intercept) effect of group and a state-by-group interaction (which is also random). –  Ben Bolker Jul 2 '12 at 19:14
Thanks Thierry and Ben for the clarifications. Great comments. I find mixed model approaches are a bit hazy in R. Could you recommend me perhaps some reading material? –  ECII Jul 3 '12 at 7:14
I enjoyed reading Zuur et al (2009) springer.com/life+sciences/ecology/book/978-0-387-87457-9 –  Thierry Jul 3 '12 at 7:45

I think what you're looking for is

lmer(value ~ group*state + (1|group) + (1|id))

This model estimates the fixed effect of group and state as well as the interaction between them (R automatically expands group*state to group + state + group*state) and estimates a random intercept for the effect of each group and for each mouse.

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Thanks for your answer, I am having difficulties wrapping my mind arround the syntax of lme4. What would be in your syntax different than in mine? Why and how to they differ? –  ECII Jun 26 '12 at 21:29
Your syntax doesn't include (1|id), the between-mouse variance (assuming that each mouse has its own unique id). –  smillig Jun 26 '12 at 21:32
Not really. In my data set the id identifies the mouse within this group. Group1 has 12 mice (with ids 1,2,3...12), group 2 has 6 mice (with id 1,2,3...6). id serves to identify each mouse within the group (since this mouse will have 3 measurements at the 3 states). The between mouse variace that you are talking about is it between groups or within states? Thank you for your time. –  ECII Jun 26 '12 at 21:44
(I thought there were 4 states?) If different mice in different groups can have the same id then the model as I described it doesn't make sense. However, if you code the id so that each mouse in the data has a unique id, then the (1|id) term is the overall mouse-to-mouse variability, regardless of group or state. –  smillig Jun 26 '12 at 22:04
It sounds like you want (1|group/id) ... –  Ben Bolker Jun 26 '12 at 22:21

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