I've been using the following code to get all combinations of a pre-determined amount of numbers:

``````getList x = [ [a,b,c] | a <- [1..x], b <- [1..x], c <- [1..x]]
``````

This was fine to begin with, but I'm looking to expand the program to handle very large lists, and I keep thinking there must be a better way to do this. How would I create a function that takes the same parameter x as here, and also another parameter for how many items the sublists have. For four items I would go and modify the code:

``````getList x = [ [a,b,c,d] | a <- [1..x], b <- [1..x], c <- [1..x], d <- [1..x]]
``````

It doesn't need to be a list comprehension. Thank you for any help.

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I believe what you want would be the `replicateM` function in `Control.Monad`.

The list monad is based on "trying all possible combinations", and plain `replicate` creates a list by repeating an item some number of times. So the result of `replicateM` is, given some list of possible values, a list of all possible ways to select an item from that list some number of times.

For example:

``````> replicateM 2 [0, 1]
[[0,0],[0,1],[1,0],[1,1]]
> replicateM 3 [0, 1]
[[0,0,0],[0,0,1],[0,1,0],[0,1,1],[1,0,0],[1,0,1],[1,1,0],[1,1,1]]
``````

So to extend your function to arbitrary repetitions, you'd use something like:

``````getListN n x = replicateM n [1..x]
``````

...where your original `getList` would be equivalent to `getListN 3`.

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Thanks, that function covers everything I wanted to get done there. –  Sliderton May 12 '11 at 18:52
+1 Favorited. I'll definitely have to decompose/desugar this for myself and see the inner workings of this monadic magic. –  Dan Burton May 12 '11 at 19:13
@Dan: If it helps, I can say that the end result is pretty much the same as what the list comprehension in the question does, and that most of the magic is happening in the `sequence` function. –  C. A. McCann May 12 '11 at 19:22
In case, anyone likes a non-Monadic-solution to understand to inner workings (although, the soliution via `replicateM` is great!):
``````getListN n = foldl (\ass bs -> [ b:as | b <- bs, as <- ass]) [[]] . replicate n
Essentially, this implementation via `foldl` works exactly in the same way as the `replacatM`-solution does.
I think `sequence` actually uses a right fold, not left. Otherwise, yes, this is equivalent to `replicateM`'s implementation as `sequence . replicate n`. –  C. A. McCann May 13 '11 at 13:49
@camccann - you're right! `sequence ms = foldr ...` - thanks for the hint –  phynfo May 13 '11 at 18:49