Announcing Stack Overflow Documentation

We started with Q&A. Technical documentation is next, and we need your help.

Whether you're a beginner or an experienced developer, you can contribute.

Sign up and start helping → Learn more about Documentation →

I have the need to grab all the three element triangles that make up the lower triangle of a symmetric matrix. I can not think of how to grab all these pieces in the order of far left column working down and then next column to the right and so on. I know that the numbe rof mini triangles inside of the lower triangle is:

n = x(x - 1)/2
where: x = nrow(mats[[i]])

Here I've created three matrices with letters (it's easier for me to conceptualize this way) and the elements in the order I'm looking for:

FUN <- function(n) {
    matrix(LETTERS[1:(n*n)], n)

mats <- lapply(3:5, FUN)

So this is the output I'd like to get (I put it in code rather than output format) for each of the matrices created above:

list(c("B", "C", "F"))

list(c("B", "C", "G"), c("C", "D", "H"), c("G", "H", "L"))

list(c("B", "C", "H"), c("C", "D", "I"), c("D", "E", "J"), 
    c("H", "I", "N"), c("I", "J", "O"), c("N", "O", "T"))

How can I do this task in the fastest manner possible while staying in base R?

Not sure if this visual of what I'm after is helpful but it may be:

enter image description here

share|improve this question
Is a 5x5 matrix the largest that you would expect to have to test? – Brandon Bertelsen Dec 7 '12 at 5:48
No it could be larger (though I highly doubt it would ever be much larger). – Tyler Rinker Dec 7 '12 at 5:56
@TylerRinker - I just had to force close my R session while attempting some benchmarking on a 10K * 10K matrix. 1K*1K was a matter of a couple of seconds. I wonder if people out there might have more efficient implementations. – thelatemail Dec 7 '12 at 6:08
up vote 5 down vote accepted

Nice problem! Here is how you can solve it using a bit of recursion (followed by a MUCH simpler version)

triangle <- function(base.idx, mat) {
    upper.idx <- base.idx - 1L
    right.idx <- base.idx + nrow(mat)
    paste(mat[c(upper.idx, base.idx, right.idx)], collapse = " ")

get.triangles <- function(mat) {
    N <- nrow(mat)
    if (N == 3L) {
        return(triangle(3L, mat))
    } else {
        left.idx  <- 3:N
        right.mat <- mat[2:N, 2:N]
        left.triangles  <- sapply(left.idx, triangle, mat)
        right.triangles <- Recall(right.mat) 
        return(c(left.triangles, right.triangles))

x <- lapply(mats, get.triangles)

# [[1]]
# [1] "B C F"
# [[2]]
# [1] "B C G" "C D H" "G H L"
# [[3]]
# [1] "B C H" "C D I" "D E J" "H I N" "I J O" "N O T"

I'll just comment on the output not being exactly as you asked. It is because creating recursive functions that return a flat list are always difficult to work with: somehow you always end up with nested lists...

So the last step should be:

lapply(x, strsplit, split = " ")

and it will be in the same format you asked for.

And here is an even simpler version (forget about recursion!)

get.triangles <- function(mat) {
    base.idx  <- seq_along(mat)[row(mat) > col(mat) + 1]
    upper.idx <- base.idx - 1L
    right.idx <- base.idx + nrow(mat)

    lapply(mapply(c, upper.idx, base.idx, right.idx, SIMPLIFY = FALSE),
share|improve this answer
thank you that works very nicely. I will utilize the method without recursion as there's no need to use strsplit (and if it's a numeric matrix no need to use as.numeric). +1 – Tyler Rinker Dec 7 '12 at 5:10

Edited to add a SIMPLIFY=FALSE which now gives exactly what you want:

Basically, this method gets the indexes of all the top left corners of the triangles that you want and then grabs the [cell below] + [cell below + to the right]. Thrill. One added benefit of this method is that it works for matrix and data.frame objects.

bot.tris <- function(data) {
  idx1 <- unlist(sapply((nrow(data)-2):1,function(x) tail(2:(nrow(data)-1),x)))
  idx2 <- rep(1:(nrow(data)-2),(nrow(data)-2):1)
  mapply(function(x,y) {c(data[x,y],data[x+1,y],data[x+1,y+1])},idx1,idx2,SIMPLIFY=FALSE)

And the result:

> result <- lapply(mats,bot.tris)
> str(result)
List of 3
 $ :List of 1
  ..$ : chr [1:3] "B" "C" "F"
 $ :List of 3
  ..$ : chr [1:3] "B" "C" "G"
  ..$ : chr [1:3] "C" "D" "H"
  ..$ : chr [1:3] "G" "H" "L"
 $ :List of 6
  ..$ : chr [1:3] "B" "C" "H"
  ..$ : chr [1:3] "C" "D" "I"
  ..$ : chr [1:3] "D" "E" "J"
  ..$ : chr [1:3] "H" "I" "N"
  ..$ : chr [1:3] "I" "J" "O"
  ..$ : chr [1:3] "N" "O" "T"
share|improve this answer
This approach is definitely less coding and very easy to understand. I benchmarked both responses and flodel's is faster. Both functions here are faster than what I had (nothing). Thank you for much for tackling the problem. +1 – Tyler Rinker Dec 7 '12 at 5:20
"Both functions here are faster than what I had (nothing)" - I like that :-) – thelatemail Dec 7 '12 at 5:22

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.