X be an
D matrix. Selecting a submatrix of size
d returns a matrix of those dimensions unless at least one of
d equals 1, in which case we get a vector instead. Interestingly, R still returns a matrix of the correct dimensions even if one of
d are 0, and the other not 1.
Now, if we are certain that
n!=1, then executing
cbind(X[row.subset,col.subset]) will return a matrix of the correct dimensions regardless of whether
d==1 or not (here
d=length(col.subset)). If we are certain that
d!=1, then we can use
rbind(...). But if both
d can be 1, neither approach will work since we could accidentally turn a row into a column or vice versa.
As far as I can tell, one way to always get a matrix of the right dimensions is to call
matrix(X[row.subset,col.subset],nrow=n,ncol=d). However, it doesn't feel like that should be the right way to go about it, plus I'm not confident that there is no performance penalty. Is there a more "native" solution?
Here's a working example:
N <- 6 D <- 3 X <- matrix(rnorm(N*D),ncol=D) dim(X[1:2,1:2]) #returns 2 2 dim(X[1:2,1]) #returns NULL, this is a vector dim(cbind(X[1:2,1])) #returns 2 1 dim(cbind(X[1,1:2])) #returns 2 1, but we'd like it to be 1 2 dim(rbind(X[1,1:2])) #returns 1 2 dim(rbind(X[1:2,1])) #returns 1 2, but we'd like it to be 2 1 row.subset <- 1:4 col.subset <- 2 #I _think_ this is always correct, but it's verbose: matrix(X[row.subset,col.subset],nrow=length(row.subset),ncol=length(col.subset))
Thanks in advance.