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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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2 Answers

up vote 17 down vote accepted

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
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+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
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@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
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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.

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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
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