How to get solution for mixed model using nlme package

My data look like this

``````Study   NDF ADF CP  Eeff
1   35.8    24.4    18.6    34.83181476
1   35.8    24.4    18.6    33.76824264
1   35.8    24.4    18.6    32.67390287
1   35.8    24.4    18.6    33.05520666
2   39.7    23.4    16.1    33.19730252
2   39.4    22.9    16.3    34.04709188
3   28.9    20.6    18.7    33.22501606
3   27.1    18.9    17.9    33.80766289
``````

Of course, I have 80 lines like this. I used `lme` function to run a mixed model (Study as random effect), as following:

``````fm1<-lme(Eeff~NDF+ADF+CP,random=~1|Study, data=na.omit(phuong))
``````

I got this result:

``````Fixed effects: Ratio ~ ADF + CP + FCM + DMI + DIM
Value  Std.Error  DF   t-value p-value
(Intercept)  3.1199808 0.16237303 158 19.214896  0.0000
ADF         -0.0265626 0.00406990 158 -6.526603  0.0000
CP          -0.0534021 0.00539108 158 -9.905636  0.0000
FCM         -0.0149314 0.00353524 158 -4.223598  0.0000
DMI          0.0072318 0.00498779 158  1.449894  0.1491
DIM         -0.0008994 0.00019408 158 -4.634076  0.0000
Correlation:
CP  -0.515  0.089
FCM -0.299  0.269 -0.203
DMI -0.229 -0.145  0.083 -0.624
DIM -0.113  0.127 -0.061  0.010 -0.047
``````

These results show the case where intercept is random but slope is fixed. How can I see my 80 intercept, for example, like below when I used study as fixed effect:

``````Coefficients:
Estimate      Std. Error t value Pr(>|t|)
(Intercept)        -0.0021083  0.0102536  -0.206 0.837351
ADF                      0.0005248  0.0002962   1.772 0.078313 .
CP                        0.0021131  0.0003277   6.448 1.26e-09 ***
factor(Study)2   0.0057274  0.0038709   1.480 0.140933
factor(Study)3   0.0117722  0.0035262   3.338 0.001046 **
factor(Study)4   0.0091049  0.0043227   2.106 0.036730 *
factor(Study)6   0.0149733  0.0045345   3.302 0.001182 **
factor(Study)7   0.0065518  0.0036837   1.779 0.077196 .
factor(Study)8   0.0066134  0.0035371   1.870 0.063337 .
factor(Study)9   0.0086758  0.0036641   2.368 0.019083 *
factor(Study)10  0.0105657  0.0041296   2.559 0.011434 *
factor(Study)11  0.0083694  0.0040194   2.082 0.038900 *
factor(Study)16  0.0171258  0.0028962   5.913 1.95e-08 ***
factor(Study)18  0.0019277  0.0042300   0.456 0.649209
factor(Study)20  0.0172469  0.0040412   4.268 3.36e-05 ***
factor(Study)23  0.0132676  0.0031658   4.191 4.57e-05 ***
factor(Study)24  0.0063313  0.0031519   2.009 0.046236 *
factor(Study)25  0.0050929  0.0039135   1.301 0.194989
``````

Thank you very much, Phuong

-

You didn't give us a reproducible question, but the answer is to use `coef`, for example:

``````> library(nlme)
> fm1 <- lme(distance~age,random=~1|Subject,data=Orthodont)
> coef(fm1)
(Intercept)       age
M16    15.84314 0.6601852
M05    15.84314 0.6601852
M02    16.17959 0.6601852
M11    16.40389 0.6601852
M07    16.51604 0.6601852
M08    16.62819 0.6601852
M03    16.96464 0.6601852
[snip]
``````
• use `fixef()` to get just the fixed effect coefficients
• use `ranef()` to get just the random effects (i.e. deviations of each individual from the fixed coefficients
• the `Orthodont` example in `lme` actually uses a random-slope(+intercept) model; here I have fitted a random-intercept model, so the estimated slope (`age` parameter) is the same for every individual
• it looks like individuals are sorted in increasing order of estimated random effect
-
First thank you very much Ben. It is great! Second I am sorry for the problem of reproducible data. I still do not fully understand how to give you that? I though what I did was already reproducible. Could you please tell me more clearly, it would help me to annoy you next time when I ask. –  hn.phuong Sep 13 '12 at 14:13
can I have a small question: What is meaning of the results in this part of mixed effect model used lme: Correlation: (Intr) ADF CP FCM DMI ADF -0.628 CP -0.515 0.089 FCM -0.299 0.269 -0.203 DMI -0.229 -0.145 0.083 -0.624 DIM -0.113 0.127 -0.061 0.010 -0.047 –  hn.phuong Sep 13 '12 at 14:26
I think (hope? :-) ) you mean "not annoy you" (or "annoy you less") ... basically, "reproducible" means an example we can cut & paste to run ourselves -- see stackoverflow.com/questions/5963269/… . The "correlation" section you asked about shows the estimated correlations among the fixed effect parameters (which can help diagnose model instability, for example, but which can often be ignored) –  Ben Bolker Sep 13 '12 at 14:36