# Replacing non-diagonal elements in a matrix in R (hopefully a better asked this time) [duplicate]

Okay, I asked this question earlier but I got bashed (deservedly) for not specifying anything and showing no sign of previous attempt. So let me try again..

I'm using R, and I have a 463✕463 matrix. What I would like to do is to replace all elements other than the diagonal ones (X11, X22, X33,...,Xjj) with zero.

E.g. I want:

``````[1 4 5
2 3 5
3 9 8]
``````

to be:

``````[1 0 0
0 3 0
0 0 8]
``````

When I use the `diag()` function, it simply gives me a column vector of the diagonal values. I imagine I can use the `replace()` function somehow combined with a "if not diagonal" logic...but I am lost.

And yes, as some here have guessed, I am probably much younger than many people here and am completely new at this...so please put me in the right direction. Really appreciate all your help!

-
Be sure to tag your questions with the language that you're using. After I tagged the other one as r, you got some better answers. –  Shawn Balestracci May 23 '13 at 6:21
In situations where your original question is ill-written, it is usually better to edit that question in an attempt to improve it, instead of simply starting off with a new question. –  MvG May 23 '13 at 6:21

## marked as duplicate by MvG, mnel, Cairnarvon, Ian, jcernMay 24 '13 at 13:41

In R, the `diag` method has two functions.

1. It returns the diagonal of a matrix. I.e.

``````m <- matrix(1:9, ncol=3)
m
#      [,1] [,2] [,3]
# [1,]    1    4    7
# [2,]    2    5    8
# [3,]    3    6    9
diag(m)
# [1] 1 5 9
``````
2. It can construct a diagonal matrix.

``````diag(1:3)
#      [,1] [,2] [,3]
# [1,]    1    0    0
# [2,]    0    2    0
# [3,]    0    0    3
``````

So in your case, extract the diagonal from your existing matrix and supply it to `diag`:

``````diag(diag(m))
#      [,1] [,2] [,3]
# [1,]    1    0    0
# [2,]    0    5    0
# [3,]    0    0    9
``````
-
``````m[ col(m)==row(m) ] <- 0

> m <- matrix(1:9, 3)
> m[ col(m)==row(m) ]
[1] 1 5 9
> m[ col(m)!=row(m) ] <- 0
> m
[,1] [,2] [,3]
[1,]    1    0    0
[2,]    0    5    0
[3,]    0    0    9
``````
-

# using outer

You can use the following to compute a logical matrix which describes the non-diagonal entries of a `n`×`n` matrix:

``````outer(1:n, 1:n, function(i,j) i!=j)
``````

``````> m <- matrix(c(1,2,3,4,3,9,5,5,8),ncol=3)
> m
[,1] [,2] [,3]
[1,]    1    4    5
[2,]    2    3    5
[3,]    3    9    8
> m[outer(1:3, 1:3, function(i,j) i!=j)] <- 0
> m
[,1] [,2] [,3]
[1,]    1    0    0
[2,]    0    3    0
[3,]    0    0    8
``````

# using triangles

A possible alternative would be combining the two triangles on either side of the diagonal. In this case, you use the matrix `m` itself as input to determine the size.

``````upper.tri(m) | lower.tri(m)
``````

``````> m[upper.tri(m) | lower.tri(m)] <- 0