Here, we look at how to see the generalizability of a given model in
the form of the cross-validated error. We simulate data with
n=200
and d=30
:
testdat <- lol.sims.rtrunk(n, d)
X <- testdat$X
Y <- testdat$Y
data <- data.frame(x1=X[,1], x2=X[,2], y=Y)
data$y <- factor(data$y)
ggplot(data, aes(x=x1, y=x2, color=y)) +
geom_point() +
xlab("x1") +
ylab("x2") +
ggtitle("Simulated Data")
We arbitrarily select LOL as our algorithm, and look at the
leave-one-out (loo) cross-validated error with the LDA classifier. We
project the resulting model to 3
dimensions and visualize
the first 2
:
result <- lol.xval.eval(X, Y, r, alg = lol.project.lol, alg.return="A",
classifier=MASS::lda, classifier.return="class", k='loo')
data <- data.frame(x1=result$model$Xr[,1], x2=result$model$Xr[,2], y=Y)
data$y <- factor(data$y)
ggplot(data, aes(x=x1, y=x2, color=y)) +
geom_point() +
xlab("x1") +
ylab("x2") +
ggtitle(sprintf("Projected Data using LOL, L=%.2f", result$lhat))
result <- lol.xval.optimal_dimselect(X, Y, rs=c(5, 10, 15), alg = lol.project.lol, alg.return="A",
classifier=MASS::lda, classifier.return="class", k='loo')
data <- data.frame(x1=result$model$Xr[,1], x2=result$model$Xr[,2], y=Y)
data$y <- factor(data$y)
ggplot(data, aes(x=x1, y=x2, color=y)) +
geom_point() +
xlab("x1") +
ylab("x2") +
ggtitle(sprintf("Projected Data using LOL, L=%.2f", result$optimal.lhat))
ggplot(result$foldmeans.data, aes(x=r, y=lhat)) +
geom_line() +
xlab("Embedding Dimensions, r") +
ylab("Misclassification Rate, L") +
ggtitle("Impact on Misclassification Rate of Embedding Dimension")
## [1] "optimal dimension: 10"
## [1] "Misclassification rate at rhat = 10: 0.07"