Hello
I am aware of the differences between the two models, excuse me
for being imprecise on that in my first posting. My question only
regards the "nature" or "structure" of the deviance, and thus
whether the residual deviance of the multinomial model is the same
residual deviance as reported by, say, glm. This is particularly
important, since I want to calculate a pseudo R-Squared as
follows (data from below):
library("nnet")
m <- multinom(y ~ ., data=df)
(llnull <- deviance(update(m, . ~ 1, trace=F)))
(llmod <- deviance(m))
(RMcFadden <- 1 - (llmod/llnull))
(I know that many statisticians here highly discourage people from
using the pseudo R-Squareds, however, not many editors read this
mailing list and still insist.)
The "MASS" book warning alerted me that the multinom residual
deviance may be of principally different structure/nature than the
glm one. Thus, while the calculation above holds for a glm, it
does not for a multinom model. Am I right? And how to fix?
On 11-04-09 05:43, bill.venab...@csiro.au wrote:
The two models you fit are quite different. The first is a binomial model
equivalent to
fm <- glm(I(y == "a") ~ x, binomial, df)
which you can check leads to the same result. I.e. this model amalgamates classes "b"
and "c" into one.
The second is a multivariate logistic model that considers all three classes defined by your factor y, (and
has twice the number of parameters, among other things). The three clases, "a", "b" and
"c" remain separate in the model.
Hence the two models are not directly comparable, so why should the deviance be?
Bill Venables.
________________________________________
From: r-help-boun...@r-project.org [r-help-boun...@r-project.org] On Behalf Of
Sascha Vieweg [saschav...@gmail.com]
Sent: 09 April 2011 01:14
To: r-help@r-project.org
Subject: [R] multinom() residual deviance
Running a binary logit model on the data
df <- data.frame(y=sample(letters[1:3], 100, repl=T),
x=rnorm(100))
reveals some residual deviance:
summary(glm(y ~ ., data=df, family=binomial("logit")))
However, running a multinomial model on that data (multinom, nnet)
reveals a residual deviance:
summary(multinom(y ~ ., data=df))
On page 203, the MASS book says that "here the deviance is
comparing with the model that correctly predicts each person, not
the multinomial response for each cell of the mininal model",
followed by and instruction how to compare with the saturated
model.
For me as a beginner, this sounds like an important warning,
however, I don't know what the warning exactly means and hence do
not know what the difference between the residual deviance of the
former (binary) and the latter (multinomial) model is.
(I need the deviances to calculate some of the pseudo R-squares
with function pR2(), package "pscl".)
Could you give good advice?
Thanks
*S*
--
Sascha Vieweg, saschav...@gmail.com
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--
Sascha Vieweg, saschav...@gmail.com
______________________________________________
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PLEASE do read the posting guide http://www.R-project.org/posting-guide.html
and provide commented, minimal, self-contained, reproducible code.
