I have written a model that I am fitting to data using ML via the mle2 package. However, I have a large data frame of samples and I would like to fit the model to each replicate, and then retrieve all of the coefficients of the model in a data frame.

I have tried to use the ddply function in the plyr package with no success.

I get the following error message when I try:

```
Error in output[[var]][rng] <- df[[var]] :
incompatible types (from S4 to logical) in subassignment type fix
```

Any thoughts?

here is an example of what I am doing.

This is my data frame. I have measurement in `Pond`

5...n on `day`

1....n. Measurements consist of 143 fluxes (`flux.cor`

), which is the variable I am modelling.

```
Pond Obs Date Time Temp DO pH U day month PAR
932 5 932 2011-06-16 17:31:00 17:31:00 294.05 334.3750 8.47 2 1 1 685.08
933 5 933 2011-06-16 17:41:00 17:41:00 294.05 339.0625 8.47 2 1 1 808.44
934 5 934 2011-06-16 17:51:00 17:51:00 294.02 340.6250 8.46 2 1 1 752.78
935 5 935 2011-06-16 18:01:00 18:01:00 294.00 340.6250 8.45 2 1 1 684.14
936 5 936 2011-06-16 18:11:00 18:11:00 293.94 340.9375 8.50 2 1 1 625.86
937 5 937 2011-06-16 18:21:00 18:21:00 293.88 341.5625 8.48 2 1 1 597.06
day.night Treat H pOH OH DO.cor sd.DO av.DO DO.sat
932 1 A 3.388442e-09 5.53 2.951209e-06 342.1406 2.63078 342.1406 274.0811
933 1 A 3.388442e-09 5.53 2.951209e-06 339.0625 2.63078 342.1406 274.0811
934 1 A 3.467369e-09 5.54 2.884032e-06 340.6250 2.63078 342.1406 274.2432
935 1 A 3.548134e-09 5.55 2.818383e-06 340.6250 2.63078 342.1406 274.3513
936 1 A 3.162278e-09 5.50 3.162278e-06 340.9375 2.63078 342.1406 274.6763
937 1 A 3.311311e-09 5.52 3.019952e-06 341.5625 2.63078 342.1406 275.0020
DO_flux NEP.hr flux.cor sd.flux av.flux
932 -3.078125 -3.09222602 -3.078125 2.104482 -0.1070312
933 1.562500 1.54903673 1.562500 2.104482 -0.1070312
934 0.000000 -0.01375489 0.000000 2.104482 -0.1070312
935 0.312500 0.29876654 0.312500 2.104482 -0.1070312
936 0.625000 0.61126617 0.625000 2.104482 -0.1070312
```

here is the my model:

```
# function that generates predictions of O2 flux given GPP R and gas exchange
flux.pred <- function(GPP24, PAR, R24, Temp, U, DO, DOsat){
# calculates Schmidt coefficient from water temperature
Sc<-function(Temp){
S<-0.0476*(Temp)^2 + 3.7818*(Temp)^2 - 120.1*Temp + 1800.6
}
# calculates piston velocity k (m h-1) from wind speed at 10m (m s-1)
k600<-function(U){
k.600<-(2.07 + 0.215*((U)^1.7))/100
}
# calculates piston velocity k (m h-1) from wind speed at 10m (m s-1)
k<-function(Temp,U){
k<-k600(U)*((Sc(Temp)/600)^-0.5)
}
# physical gas flux (mg O2 m-2 10mins-1)
D<-function(Temp,U,DO,DOsat){
d<-(k(Temp,U)/6)*(DO-DOsat)
}
# main function to generate predictions
flux<-(GPP24/sum(YSI$PAR[YSI$PAR>40]))*(ifelse(YSI$PAR>40, YSI$PAR, 0))-(R24/144)+D(YSI$Temp,YSI$U,YSI$DO,YSI$DO.sat)
return(flux)
}
```

which returns predictions for the fluxes.

I then build my likelihood function:

```
# likelihood function
ll<-function(GPP24, PAR, R24, Temp, U, DO.cor, DO.sat){
pred = (flux.pred(GPP24, PAR, R24, Temp, U, DO.cor, DOsat))
pred = pred[-144]
obs = YSI$flux.cor[-144]
return(-sum(dnorm(obs, mean=pred, sd=sqrt(var(obs-pred)))))
}
```

and apply it

ll.fit<-mle2(ll,start=list(GPP24=100, R24=100))

It works beautifully for one Pond on one day, but what I want to do is apply it to all ponds on all days automatically.

I tried the ddply (as stated above)

```
metabolism<-ddply(YSI, .(Pond,Treat,day,month), summarise,
mle = mle2(ll,start=list(GPP24=100, R24=100)))
```

but had not success. I also tried just extracting the coefficients using a for loop, but this did not work either.

```
for(i in 1:length(unique(YSI$day))){
GPP<-numeric(length=length(unique(YSI$day)))
GPP[i]<-mle2(ll,start=list(GPP24=100, R24=100))
}
```

any help would be gratefully received.

as a parameterto the function provided. – Nick Sabbe Aug 17 '11 at 9:46`dlply`

? I don't see how you can shoehorn mle2 objects into a data frame. – hadley Aug 17 '11 at 11:29`dput`

next time ...), but I will point out that the`mle2`

function takes a`data`

argument, and attempts to evaluate the negative log-likelihood function in an environment that includes the data ... – Ben Bolker Aug 17 '11 at 12:47