What is an efficient way to test if rows in a matrix are sorted? [Update: see Aaron's Rcpp answer - straightforward & very fast.]

I am porting some code that uses `issorted(,'rows')`

from Matlab. As it seems that `is.unsorted`

does not extend beyond vectors, I'm writing or looking for something else. The naive method is to check that the sorted version of the matrix (or data frame) is the same as the original, but that's obviously inefficient.

NB: For sorting, a la `sortrows()`

in Matlab, my code essentially uses `SortedDF <- DF[do.call(order, DF),]`

(it's wrapped in a larger function that converts matrices to data frames, passes parameters to `order`

, etc.). I wouldn't be surprised if there are faster implementations (data table comes to mind).

**Update 1:** To clarify: I'm not testing for sorting intra-row or intra-columns. (Such sorting generally results in an algebraically different matrix.)

As an example for creating an unsorted matrix:

```
set.seed(0)
x <- as.data.frame(matrix(sample(3, 60, replace = TRUE), ncol = 6, byrow = TRUE))
```

Its sorted version is:

```
y <- x[do.call(order, x),]
```

A proper test, say `testSorted`

, would return `FALSE`

for `testSorted(x)`

and `TRUE`

for `testSorted(y)`

.

**Update 2:**
The answers below are all good - they are concise and do the test. Regarding efficiency, it looks like these are sorting the data after all.

I've tried these with rather large matrices, such as 1M x 10, (just changing the creation of `x`

above) and all have about the same time and memory cost. What's peculiar is that they all consume more time for unsorted objects (about 5.5 seconds for 1Mx10) than for sorted ones (about 0.5 seconds for `y`

). This suggests they're sorting before testing.

I tested by creating a `z`

matrix:

```
z <- y
z[,2] <- y[,1]
z[,1] <- y[,2]
```

In this case, all of the methods take about 0.85 seconds to complete. Anyway, finishing in 5.5 seconds isn't terrible (in fact, that seems to be right about the time necessary to sort the object), but knowing that a sorted matrix is 11X faster suggests that a test that doesn't sort could be even faster. In the case of the 1M row matrix, the first three rows of `x`

are:

```
V1 V2 V3 V4 V5 V6 V7 V8 V9 V10
1 3 1 2 2 3 1 3 3 2 2
2 1 1 1 3 2 3 2 3 3 2
3 3 3 1 2 1 1 2 1 2 3
```

There's no need to look beyond row 2, though vectorization isn't a bad idea.

(I've also added the `byrow`

argument for the creation of `x`

, so that row values don't depend on the size of `x`

.)

**Update 3:**
Another comparison for this testing can be found with the `sort -c`

command in Linux. If the file is already written (using `write.table()`

), with 1M rows, then `time sort -c myfile.txt`

takes 0.003 seconds for the unsorted data and 0.101 seconds for the sorted data. I don't intend to write out to a file, but it's a useful comparison.

**Update 4:**
Aaron's Rcpp method bested all other methods offered here and that I've tried (including the `sort -c`

comparison above: in-memory is expected to beat on-disk). As for the ratio relative to other methods, it's hard to tell: the denominator is too small to give an accurate measurement, and I've not extensively explored `microbenchmark`

. The speedups can be very large (4-5 orders of magnitude) for some matrices (e.g. one made with `rnorm`

), but this is misleading - checking can terminate after only a couple of rows. I've had speedups with the example matrices of about 25-60 for the unsorted and about 1.1X for the sorted, as the competing methods were already very fast if the data is sorted.

Since this does the right thing (i.e. no sorting, just testing), and does it very quickly, it's the accepted answer.