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Why is it possible to create non-singular normal random vectors by a covariance matrix which is not positive definite? e.g. its not possible to execute chol(V).

pigeon<-data.frame(response=c(10,19,27,28,9,13,25,29,4,10,20,18,5,6,12,17),
               treatment=factor(rep(1:4,4)),
               subject=factor(rep(1:4,each=4))
               )
m<-dcast(pigeon,subject~treatment, value.var="response")
fit<-lm(as.matrix(m[,-1])~1)
V<-cov(residuals(fit))
eigen(V)$values
rmvnorm(mean=rep(0,4),sigma=V,n=subject,method="chol")
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There is no package called "rmvnorm". Did you mean "mvtnorm"? –  Hong Ooi Jun 27 '13 at 16:02
    
You also need reshape2 for the dcast function; you haven't defined any variable called subject; and mvtnorm::rmvnorm did warn about an indefinite matrix. –  Hong Ooi Jun 27 '13 at 16:06

2 Answers 2

up vote 2 down vote accepted

First, I assume you're using mvtnorm::rmvnorm. When you specify method="chol", rmvnorm will use the Cholesky decomposition with pivoting. This allows for positive-semidefinite matrices, ie, some eigenvalues can be numerically zero. Emphasis on numerically; your smallest eigenvalue is -2.546e-15 which while negative is is zero to the limits of precision.

If you use the default method=eigen, you get a matrix of NaNs in this case which might be closer to what you're expecting.

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When running MASS::rmvnorm as

rmvnorm(mu=rep(0,4),V=V,nsim=4,method="chol") ,

I get

Error in chol.default(V) : the leading minor of order 4 is not positive definite

, the same as running chol(V). I am using R 2.15.3. Could you clarify the question?

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