This is not an easy question to answer: because the contours need to be calculated and the ellipse drawn using the ellipse package.
Done with elliptical t-densities to illustrate the plotting better.
nu <- 5 ## this is the degrees of freedom of the multivariate t.
library(mvtnorm)
library(ggplot2)
sig <- matrix(c(1, 0.5, 0.5, 1), ncol = 2) ## this is the sigma parameter for the multivariate t
xx <- data.frame( rmvt(n = 100, df = c(nu, nu), sigma = sig)) ## generating the original sample
rtsq <- rowSums(x = matrix(rt(n = 2e6, df = nu)^2, ncol = 2)) ## generating the sample for the ellipse-quantiles. Note that this is a cumbersome calculation because it is the sum of two independent t-squared random variables with the same degrees of freedom so I am using simulation to get the quantiles. This is the sample from which I will create the quantiles.
g <- ggplot( data = xx
, aes( x = X1
, y = X2
)
) + geom_point(colour = "red", size = 2) ## initial setup
library(ellipse)
for (i in seq(from = 0.01, to = 0.99, length.out = 20)) {
el.df <- data.frame(ellipse(x = sig, t = sqrt(quantile(rtsq, probs = i)))) ## create the data for the given quantile of the ellipse.
names(el.df) <- c("x", "y")
g <- g + geom_polygon(data=el.df, aes(x=x, y=y), fill = NA, linetype=1, colour = "blue") ## plot the ellipse
}
g + theme_bw()
This yields:

I still have a question: how does one reduce the size of the plotting ellispe lines?