# R - min, max and mean of off-diagonal elements in a matrix

I have like a matrix in R and I want to get:

``````Max off - diagonal elements
Min off – diagonal elements
Mean off –diagonal elements
``````

With diagonal I used max(diag(A)) , min(diag(A)) , mean(diag(A)) and worked just fine

But for off-diagonal I tried

``````dataD <- subset(A, V1!=V2)

Error in subset.matrix(A, V1 != V2) : object 'V1' not found
``````

to use:

``````colMeans(dataD) # get the mean for columns
``````

but I cannot get dataD b/c it says object 'V1' not found

Thanks!

-
Can you clarify what you mean by "off diagonal", do you mean all elements of the matrix except the diagonal or do you mean the row/col immediately above/below the diagonal? –  Gavin Simpson Oct 24 '12 at 12:53
Just loop through the elements in the matrix and ignore the diagonal elements. What's stopping you? –  Jack Maney Oct 24 '12 at 12:54
@JackManey looping when there is a vectorised solution is exceedingly inefficient in R. –  Gavin Simpson Oct 24 '12 at 13:05

Here the `row()` and `col()` helper functions are useful. Using @James `A`, we can get the upper off-diagonal using this little trick:

``````> A[row(A) == (col(A) - 1)]
[1]  5 10 15
``````

and the lower off diagonal via this:

``````> A[row(A) == (col(A) + 1)]
[1]  2  7 12
``````

These can be generalised to give whatever diagonals you want:

``````> A[row(A) == (col(A) - 2)]
[1]  9 14
``````

and don't require any subsetting.

Then it is a simple matter of calling whatever function you want on these values. E.g.:

``````> mean(A[row(A) == (col(A) - 1)])
[1] 10
``````

If as per my comment you mean everything but the diagonal, then use

``````> diag(A) <- NA
> mean(A, na.rm = TRUE)
[1] 8.5
> max(A, na.rm = TRUE)
[1] 15
> # etc. using sum(A, na.rm = TRUE), min(A, na.rm = TRUE), etc..
``````

So this doesn't get lost, Ben Bolker suggests (in the comments) that the above code block can be done more neatly using the `row()` and `col()` functions I mentioned above:

``````mean(A[row(A)!=col(A)])
min(A[row(A)!=col(A)])
max(A[row(A)!=col(A)])
sum(A[row(A)!=col(A)])
``````

which is a nicer solution all round.

-
or `mean(A[row(A)!=col(A)])` etc. –  Ben Bolker Oct 24 '12 at 13:12
+1 Ben - I saw you'd covered that option so didn't edit it into mine. That didn't even occur to me, even though I was using `row()` and `col()` to get the other bits. Total blank there. –  Gavin Simpson Oct 24 '12 at 13:24
I deleted mine since you'd covered most of it, with more explanation and examples. –  Ben Bolker Oct 24 '12 at 13:38
I want to get the sum, min , max and mean for everything under and above diagonal i.e. in A sum everything above diagonal is 5 + 9 +10 +13 +14 + 15 = 66 , mean = 11 ..... –  amhemad ahmad Oct 24 '12 at 14:14
The last code block shows how to get some of these. use `sum()`, and `min()` for the other two. Also see Ben Bolkers comment here which has a different approach. –  Gavin Simpson Oct 24 '12 at 14:15

In one simple line of code:

For a matrix A if you wish to find the Minimum, 1st Quartile, Median, Mean, 3rd Quartile and Maximum of the upper and lower off diagonals:

`summary(c(A[upper.tri(A)],A[lower.tri(A)]))`.

-

The `diag` of a suitably subsetted matrix will give you the off-diagonals. For example:

``````A <- matrix(1:16,4)
#upper off-diagonal
diag(A[-4,-1])
[1]  5 10 15
#lower off-diagonal
diag(A[-1,-4])
[1]  2  7 12
``````
-

Just multiply matrix A by 1-diag (nofelements)

for example if A is a 4x4 matrix, then

mean(A*(1-diag(4)) or A*(1-diag(nrow(A)))

This is faster when you need to run the same line of code multiple times

-
In addition to James' answer, I want to add that you can use the diag function to directly exclude all diagonal elements of a matrix by use of `A[-diag(A)]`. For example, consider: `summary(A[-diag(A)])`
I was very excited by the compactness of this answer, but I think it doesn't actually work in general. Compare `m <- matrix(2:17,nrow=4); m[-diag(m)]; m[row(m)!=col(m)]` –  Ben Bolker Oct 24 '12 at 15:51
Damn, you are right, my bad. For larger matrices, my idea would have to be used in the form of `A[-which(A %in% diag(A))]`, which is far less elegant than yours. –  Wolfgang Pößnecker Oct 24 '12 at 16:00
I don't think that works either ... `diag(A)` returns the values on the diagonal, so if there were entries that were repeated among the diagonal and off-diagonal elements, this would fail ... –  Ben Bolker Oct 24 '12 at 16:08
Hm, unfortunately, you are correct. Complete failure from my side. A last try: `m[-seq(from=1,by=nrow(m)+1, length.out=nrow(m))]` That should work, although it is very inelegant. –  Wolfgang Pößnecker Oct 24 '12 at 16:54