# R: Complex numbers not compatible with boot() function

I found out that `boot` function of the boot package is not working with complex numbers. I am trying to bootstrap a data by taking the eigenvalue of the bivariate matrix. The problem with the eigenvalue is that, it often returns complex numbers, and by that it (`boot`) gives error. Is there a way to avoid complex numbers?

Here is my codes,

``````Data <- read.table('http://ubuntuone.com/6n1igcHXq4EnOm4x2zeqFb', header = FALSE)
Mat <- cbind(Data[["V1"]],Data[["V2"]])
Data.ts <- as.ts(Mat)
``````

Below are some functions needed,

``````library(mvtnorm)

var1.sim <- function(T, n.start=100, phi1=matrix(c(0.7,0.2,0.2,0.7),nr=2),
err.mu=c(0,0), err.sigma2=matrix(c(1,0.5,0.5,1), nr=2),
errors=NULL) {

e <- rmvnorm(n.start + T, err.mu, err.sigma2)   # (n.start+T) x 2 matrix
y <- matrix(0, nrow=n.start+T, ncol=2)

if (!is.null(errors) && is.matrix(errors) && ncol(errors) == 2) {
rows <- nrow(errors)
if (rows < n.start + T) {
# replace last nrow(errors) errors
e[seq.int(n.start+T-rows+1,n.start+T),] <- errors
} else {
e <- errors[seq.int(n.start+T+1, rows)]
}
}

for (t in seq.int(2, n.start + T)) {
y[t,] <- phi1 %*% y[t-1,] + e[t,]
}

return(ts(y[seq.int(n.start+1,n.start+T),]))
}

########

coef.var1 <- function(var.fit) {
k <- coef(var.fit)
rbind(k[[1]][,"Estimate"], k[[2]][,"Estimate"])
}
``````

And here is the main method,

``````library(vars)
library(boot)

y.var <- VAR(Data.ts, p=1, type="none")
y.resid <- resid(y.var)

rm(y.boot)
y.boot <- boot(y.resid, R=100, statistic=function(x,i) {
resid.boot <- x[i,]
y.boot1 <- var1.sim(T=nrow(x), errors=resid.boot)
min(eigen(coef.var1(VAR(y.boot1, p=1, type="none")))\$values)
}, stype="i")

y.boot\$t

y.ci <- boot.ci(y.boot, type="norm", conf=0.95)\$normal[2:3]
list(t=y.boot\$t,ci=y.ci)
``````

The problem occurs in `y.boot` object, particularly this line

``````min(eigen(coef.var1(VAR(y.boot1, p=1, type="none")))\$values)
``````

When the obtain minimum eigenvalue is complex, then `boot` will return this error

``````Error in min(eigen(coef.var1(VAR(y.boot1, p = 1, type = "none")))\$values) :
invalid 'type' (complex) of argument
``````

Otherwise, there is no problem. Now, it would be safe if this 100 bootstraps is performed once, but I am going to loop this actually about 100 times too. So, there is a big chance that complex values will occur in these loops. Hence, we will obtain the above error again.

Is there a way to avoid these complex values?

-
What makes you think you can find the minimum of two complex numbers? –  BondedDust Jun 27 '13 at 6:28
This isn't a problem with `boot`; it's a problem with the code you're passing to the package. –  Hong Ooi Jun 27 '13 at 6:29
I am actually trying to avoid complex numbers. I just want the minimum eigenvalue. And sorry I never thought of that. Thank you DWin. But, is there a way to avoid these? –  Al-Ahmadgaid Asaad Jun 27 '13 at 6:32
You can compare the modulus of complex numbers. Whether that makes sense in the unstated problem you are addressing is unclear. –  BondedDust Jun 27 '13 at 6:58
I was thinking of Modulo too, thank you for suggestion. –  Al-Ahmadgaid Asaad Jun 27 '13 at 7:41