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I have a dataset with which I would like to compare the effect of species and habitat on homerange size - while using type III errors and pairwise comparisons within species and habitat.
Here's a subset of the data:

species<- c("a","b","c","c","b","c","b","b","a","b","c","c","a","a","b","b","a","a","b","c")
    habitat<-  c("x","x","x","y","y","y","x","x","y","z","y","y","z","z","x","x","y","y","z","z")
    homerange<-c(6,5,7,8,9,4,3,5,6,9,3,6,6,7,8,9,5,6,7,8)
    data1<-data.frame(cbind(species, habitat, homerange))
    data1$homerange<-as.numeric(as.character(data1$homerange))    

Currently I am spltting up the data on the three species, then running separate ANOVAs for each, but I believe it makes more sense to ask about species and habitat at the same time with one ANOVA. Here's an example of the ANOVA I ran for one species:

data.species.a<-subset(data1, species=="a")
fit<-aov(homerange ~ habitat, data=data.species.a)
summary(fit)
TukeyHSD(fit)

aov() appears to use type I errors . . . which I don't think are appropriate; plus I believe Tukey's test may be too conservative an approach for the pairwise comparisons. Can someone help me with an approach that allows me to run one ANOVA that considers both the effect of species and habitat on homerange, with type III errors, that also permits a less-conservative pairwise comparisons of species and habitat?

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Might be better suited for CrossValidated. They answer general R questions, too, but this also seeks modeling advice. –  Christopher Sep 5 '12 at 19:24
    
I think you mean type III sums of squares. –  Dason Sep 5 '12 at 19:49
    
I'm a little confused. For a model with a single predictor variable, tests based on type I, II, III SSQ give identical results (compare the results of your aov with @DWin's answer below and with a minor variant of his answer where you would use Anova(...,type="II"). Did you mean to test aov(homerange ~ habitat*species) above? I second the CrossValidated suggestion. –  Ben Bolker Sep 5 '12 at 21:35

1 Answer 1

up vote 2 down vote accepted

You can set up Anova in package 'car' to report type III sums of squares and there is an HSD.test in package 'agricolae' that should be able to take that model object as input. I do not think you can legitimately use aov() with your data being unbalanced, so I am doing it with an lm() fit.

fit<-lm(homerange ~ habitat, data=data.species.a)
require(car)
 Anova(fit, type="III")
require(agricolae)
comparison <- HSD.test(fit, "habitat", group=TRUE,
 main="Yield of sweetpotato\nDealt with different virus")

Note that the SAS default of type-III sums of square is viewed with disdain (and sometimes even outright derision) by the authors of the R base package (read this for more details). The presentation of that method in package 'car' is mainly for purposes of comparison, rather than being a recommendation regarding statistical correctness.

To add citations to the reasons for being very cautious about accepting the SAS-standard: Frank Harrell's comments re: loss of power and Bill Venables' later comments in the same thread on r-help

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