# Quickly generate the cartesian product of a matrix

Let's say I have a matrix `x` which contains 10 rows and 2 columns. I want to generate a new matrix `M` that contains each unique pair of rows from `x` - that is, a new matrix with 55 rows and 4 columns.

E.g.,

``````x <- matrix (nrow=10, ncol=2, 1:20)

M <- data.frame(matrix(ncol=4, nrow=55))
k <- 1
for (i in 1:nrow(x))
for (j in i:nrow(x))
{
M[k,] <- unlist(cbind (x[i,], x[j,]))
k <- k + 1
}
``````

So, `x` is:

``````      [,1] [,2]
[1,]    1   11
[2,]    2   12
[3,]    3   13
[4,]    4   14
[5,]    5   15
[6,]    6   16
[7,]    7   17
[8,]    8   18
[9,]    9   19
[10,]   10   20
``````

And then `M` has 4 columns, the first two are one row from `x` and the next 2 are another row from `x`:

``````> head(M,10)
X1 X2 X3 X4
1   1 11  1 11
2   1 11  2 12
3   1 11  3 13
4   1 11  4 14
5   1 11  5 15
6   1 11  6 16
7   1 11  7 17
8   1 11  8 18
9   1 11  9 19
10  1 11 10 20
``````

Is there either a faster or simpler (or both) way of doing this in R?

-

The `expand.grid()` function useful for this:

``````R> GG <- expand.grid(1:10,1:10)
R> GG <- GG[GG[,1]>=GG[,2],]     # trim it to your 55 pairs
R> dim(GG)
[1] 55  2
Var1 Var2
1    1    1
2    2    1
3    3    1
4    4    1
5    5    1
6    6    1
R>
``````

Now you have the 'n*(n+1)/2' subsets and you can simple index your original matrix.

-

I'm not quite grokking what you are doing so I'll just throw out something that may, or may not help.

Here's what I think of as the Cartesian product of the two columns:

``````expand.grid(x[,1],x[,2])
``````
-
Never knew about expand.grid(). Dirk's answer brings it all together (as always...) –  Josh Reich Sep 15 '09 at 16:43

You can also try the "relations" package. Here is the vignette. It should work like this:

``````relation_table(x %><% x)
``````
-

``````idx <- expand.grid(1:nrow(x), 1:nrow(x))
idx<-idx[idx[,1] >= idx[,2],]
N <- cbind(x[idx[,2],], x[idx[,1],])

> all(M == N)
[1] TRUE
``````

Thanks everyone!

-

Although the answer constructed agrees with the implemented example it does not agree with the problem description. The number of unique combinations of 10 distinct items taken two at a time is 45, not 55. Neither is that 55 element set the Cartesian product which would contain 10 x 10 pairs. Here's a solution that would result in 45 unique "combinations" using the R combn function:

``````>  M <- data.frame(cbind(x[z[1,],], x[z[2,],])  )
>  nrow(M)
[1] 45
How is `z` created? –  Rekin Jun 30 '12 at 11:04
Man, that was a long time ago. I clearly didn't use expand.grid since I was retrieving rows rather than columns but I clearly applied a `>` test rather than a `>=` test. Must have been one of my very first postings since I clearly didn't understand how to format for SO. I am having trouble reconstructing my method and will probably delete this post in a day or so. –  BondedDust Jun 30 '12 at 12:56