# List comprehension: making lists of lists

hi im trying to make a function in haskell that takes a number a makes a partion of it using lists i.e. for number `4` it would create `[[1,1,1,1],[1,1,2],[1,3],[2,2],]`. I was thinking of using list comprehension for this where it would create list x and then create further lists using numbers from [1...n] (n being the partition number I would want) where the sum of the list created would be equal to n.

The code I have created so far is-

``````partions (n:xs) = [[x|x<-[1...n], sum[x]==n]]|xs<-[1..]]
``````

but obiviously it doesnt work, any suggestions?

thanks.

• Rolled back the edit which killed the post – Josh Smeaton Nov 23 '10 at 0:00
• And again. @dave, why are you attempting to delete both your questions? :/ – Dan J Nov 23 '10 at 0:03

I suggest trying recursion: To obtain the partitions of n, iterate over the numbers i = 1 to n, and recursively generate the partitions of (n-i), the base case being that the only partition of 1 is 1 itself, and the partition of 0 is the empty list.

• Making `partition 0` be `[[]]` instead of `[]` may help make the recursion simpler. – Joey Adams Nov 17 '10 at 3:09
• @Joey That's true. I was a bit sloppy in my description of what I'd do. – Lagerbaer Nov 17 '10 at 15:31

``````import Data.List (nub, sort)

parts :: Int -> [[Int]]
parts 0 = []
parts n = nub \$ map sort \$ [n] : [x:xs | x <- [1..n`div`2], xs <- parts(n - x)]
``````

Trying it:

``````*Main Control.Monad> forM [1..5] (print . parts)
[]
[,[1,1]]
[,[1,2],[1,1,1]]
[,[1,3],[1,1,2],[1,1,1,1],[2,2]]
[,[1,4],[1,1,3],[1,1,1,2],[1,1,1,1,1],[1,2,2],[2,3]]
``````

I think it's correct, if not efficient.

I found it helpful to define an auxiliary function, `partitionsCap`, which does not let any of the items be larger than a given value. Used recursively, it can be used to only produce the monotonically decreasing results you want (i.e. no `[1,3,1]` when you already have `[1,1,3]`):

``````partitions :: Int -> [[Int]]
partitions n = partitionsCap n n

partitionsCap :: Int -> Int -> [[Int]]
partitionsCap cap n
| n < 0  = error "partitions: negative number"
| n == 0 = [[]]
| n > 0  = [i : p | i <- [hi,hi-1..1], p <- partitionsCap i (n-i)]
where hi = min cap n
``````

At the heart of the algorithm is the idea that, when partitioning N, you take `i` from `n` down to 1, and prepend `i` to the partitions of `n-i`. Simplified:

``````concat [map (i:) \$ partitions (n-i) | i <- [n,n-1..1]]
``````

but wrong:

``````> partitions 3
[,[2,1],[1,2],[1,1,1]]
``````

We want that `[1,2]` to go away. Hence, we need to cap the partitions we're prepending to so they won't go above `i`:

``````concat [map (i:) \$ partitionsCap i (n-i) | i <- [hi,hi-1..1]]
where hi = min cap n
``````

Now, to clean it up: that concat and map so close together got my attention. A little background: list comprehensions and the list monad are very closely related, and concatMap is the same as `>>=` with its arguments flipped, in the list monad. So I wondered: can those concat and map somehow turn into a `>>=`, and can that `>>=` somehow sweet-talk its way into the list comprehension?

In this case, the answer is yes :-)

``````[i : p | i <- [hi,hi-1..1], p <- partitionsCap i (n-i)]
where hi = min cap n
``````

I'm a little rusty with Haskell, but maybe the following code can guide you to find the solution.

``````parts :: Int -> Int -> [[Int]]
parts 0 p = [[]]
parts x p = [(y:ys) | y <-[p..x], ys <- (parts (x - y) y)]
``````

And then you would have to call parts with x = n, and p = 1.

EDIT

I've fixed the base case when x equals 0 to return a list with a single item, being that item an empty list. Now it works fine :)

• maybe I'm missing something, but I get an error: Couldn't match expected type t1->t against inferred type [[Int]]. In the expression: parts 4 1. In the definition of 'it': it = parts 4 1 – Matt Ellen Nov 19 '10 at 16:47
• @Matt I'm no expert, but I think you may be using `it` in another context, and the type inference for `it` doesn't match with `[[Int]]`. I've called `parts 4 1` using WinHugs and the output was exactly as @dave's example – Fede Nov 19 '10 at 17:37
• You shouldn't define 'it'. 'it' is always the result of the last calculation in GHCi. – nomen Dec 11 '12 at 0:38