R help - Jun 2010 - MANOVA proportion of variance explained

Hello everybody

 

After doing a MANOVA on a bunch of data, I want to be able to make some comment
on the amount of variation in the data that is explained by the factor of
interest. I want to say this in the following way: XX% of the data is explained
by A.

 

I can acheive something like what I want by doing the following: 

 

 

X <- structure(c(9, 6, 9, 3, 2, 7), .Dim = as.integer(c(3, 2)))
Y <- structure(c(0, 2, 4, 0), .Dim = as.integer(c(2, 2)))
Z <- structure(c(3, 1, 2, 8, 9, 7), .Dim = as.integer(c(3, 2)))

U <- rbind(X,Y,Z)
m <- manova(U~as.factor(rep(1:3, c(3, 2, 3))))

summary(m,test="Wilks")

SS<-summary(m)$SS

(a<-mean(SS[[1]]/(SS[[1]]+SS[[2]])))

 

and concluding that 94% of variation is explained.

 

Is my desire misguided? If it is a worthy aim, is this a valid way of acheiving
it?

 

Thanks a lot!

 

Sam

 

 

 

Samuel Brown

Research assistant

Bio-Protection Research Centre

PO Box 84

Lincoln University

Lincoln 7647

Canterbury

New Zealand

sam.brown@lincolnuni.ac.nz

http://www.the-praise-of-insects.blogspot.com

 

 

 

 

 

 
 		 	   		  
_________________________________________________________________

ws Live 

	[[alternative HTML version deleted]]

I think you are looking for a multivariate measure of association, 
analogous to R^2 for a univariate linear model.  If so, there are
extensions of eta^2 from univariate ANOVAs for each of the multivariate
test statistics, e.g.,

for Pillai (-Bartlett) trace and Hotelling-Lawley trace and a given 
effect tested on p response measures

eta2(Pillai) = Pillai / s
eta2(HLT) = HLT / (HLT+s)
where s = min(df_h, p)

Alternatively, you could look at the candisc package which, for an 
s-dimensional effect, gives a breakdown of the variance reflected in
each dimension of the latents roots of HE^{-1}


Sam Brown wrote:
> Hello everybody
> 
>  
> 
> After doing a MANOVA on a bunch of data, I want to be able to make some
comment on the amount of variation in the data that is explained by the factor
of interest. I want to say this in the following way: XX% of the data is
explained by A.
> 
>  
> 
> I can acheive something like what I want by doing the following: 
> 
>  
> 
>  
> 
> X <- structure(c(9, 6, 9, 3, 2, 7), .Dim = as.integer(c(3, 2)))
> Y <- structure(c(0, 2, 4, 0), .Dim = as.integer(c(2, 2)))
> Z <- structure(c(3, 1, 2, 8, 9, 7), .Dim = as.integer(c(3, 2)))
> 
> U <- rbind(X,Y,Z)
> m <- manova(U~as.factor(rep(1:3, c(3, 2, 3))))
> 
> summary(m,test="Wilks")
> 
> SS<-summary(m)$SS
> 
> (a<-mean(SS[[1]]/(SS[[1]]+SS[[2]])))
> 
>  
> 
> and concluding that 94% of variation is explained.
> 
>  
> 
> Is my desire misguided? If it is a worthy aim, is this a valid way of
acheiving it?
> 
>  
> 
> Thanks a lot!
> 
>  
> 
> Sam
> 
>  
> 
>  
> 
>  
> 
> Samuel Brown
> 
> Research assistant
> 
> Bio-Protection Research Centre
> 
> PO Box 84
> 
> Lincoln University
> 
> Lincoln 7647
> 
> Canterbury
> 
> New Zealand
> 
> sam.brown at lincolnuni.ac.nz
> 
> http://www.the-praise-of-insects.blogspot.com
> 
>  
> 
>  
> 
>  
> 
>  
> 
>  
> 
>  
>  		 	   		  
> _________________________________________________________________
> 
> ws Live 
> 
> 	[[alternative HTML version deleted]]
> 

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