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I want to take a list (or a string) and split it into sub-lists of N elements. How do I do it in Haskell?


mysteryFunction 2 "abcdefgh"
["ab", "cd", "ef", "gh"]
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7 Answers 7

up vote 9 down vote accepted
cabal update
cabal install split

And then use chunksOf from Data.List.Split

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Note that if you have installed the Haskell Platform, you already have the split package installed. It's a very useful package you should have anyway! –  kqr Aug 25 '13 at 9:11
Note that there is also chunksOf from Data.Text (package text) which works with a more efficient string implementation than lists of chars. –  nponeccop Aug 25 '13 at 12:40

Here's one option:

partition :: Int -> [a] -> [[a]]
partition _ [] = []
partition n xs = (take n xs) : (partition n (drop n xs))

And here's a tail recursive version of that function:

partition :: Int -> [a] -> [[a]]
partition n xs = partition' n xs []
    partition' _ [] acc = reverse acc
    partition' n xs acc = partition' n (drop n xs) ((take n xs) : acc)
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Because (:) is lazy, I would say that the first option is tail-recursive and the second is not. –  Toxaris Aug 25 '13 at 11:54
@Toxaris Hmm, good point. Edit: But the first option will still require a non-constant amount of memory on the stack, while the second will not, right? –  Paul Manta Aug 25 '13 at 12:10
The problem with the second option is that as soon as the caller of partition requests the first (:) cell of the output list, partition has to traverse the whole input list to build an intermediate list, and then reverse has to traverse this whole intermediate list to find the first (:) cell of the overall output. I expect these traversals to require stack space. The first option, however, can immediately return the first (:) cell after checking that the input list is not empty. I see no need to use the stack there. –  Toxaris Aug 25 '13 at 16:03
non-strict tail-recursion bad, guarded corecursion good. :) –  Will Ness Aug 25 '13 at 16:59
Tail recursion on non-strict data structures may lead to accumulation of thunks instead of accumulation of intermediate data. It depends on the optimization level and how well ghc is able to perform strictness analysis. –  Levi Pearson Aug 26 '13 at 2:07

You could use:

mysteryFunction :: Int -> [a] -> [[a]]
mysteryFunction n list = unfoldr takeList list
  where takeList [] = Nothing
        takeList l  = Just $ splitAt n l

or alternatively:

mysteryFunction :: Int -> [a] -> [[a]]
mysteryFunction n list = unfoldr (\l -> if null l then Nothing else Just $ splitAt n l) list

Note this puts any remaining elements in the last list, for example

mysteryFunction 2 "abcdefg" = ["ab", "cd", "ef", "g"]
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import Data.List 
import Data.Function

mysteryFunction n = map (map snd) . groupBy ((==) `on` fst) . zip ([0..] >>= replicate n)

... just kidding...

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Come on, you were not that far away from making it fully point-free and unreadable! –  JB. Aug 25 '13 at 13:58
Can you expand on how this works? –  Denomales Aug 25 '13 at 14:13
@Denomales Read it from right to left: First I build an infinite list with the right number of repetitions, e.g. [0,0,0,1,1,1,2,2,2...] and zip it together with our input list (point-free style, so I don't need an argument for this), which gives a list of pairs. Next I use groupBy in order to get the desired chunks based on my "number pattern", and as last step I remove the now no longer needed numbers with double-map (as I want to modify lists inside a list). However I would never use such a "train wreck" in real life. –  Landei Aug 25 '13 at 15:48
mysteryFunction x "" = []
mysteryFunction x s = take x s : mysteryFunction x (drop x s)

Probably not the elegant solution you had in mind.

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There's already

Prelude Data.List> :t either
either :: (a -> c) -> (b -> c) -> Either a b -> c


Prelude Data.List> :t maybe
maybe :: b -> (a -> b) -> Maybe a -> b

so there really should be

list :: t -> ([a] -> t) -> [a] -> t
list n _ [] = n
list _ c xs = c xs

as well. With it,

import Data.List (unfoldr)

g n = unfoldr $ list Nothing (Just . splitAt n)

without it,

g n = takeWhile (not.null) . unfoldr (Just . splitAt n)
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A fancy answer.

In the answers above you have to use splitAt, which is recursive, too. Let's see how we can build a recursive solution from scratch.

Functor L(X)=1+A*X can map X into a 1 or split it into a pair of A and X, and has List(A) as its minimal fixed point: List(A) can be mapped into 1+A*List(A) and back using a isomorphism; in other words, we have one way to decompose a non-empty list, and only one way to represent a empty list.

Functor F(X)=List(A)+A*X is similar, but the tail of the list is no longer a empty list - "1" - so the functor is able to extract a value A or turn X into a list of As. Then List(A) is its fixed point (but no longer the minimal fixed point), the functor can represent any given list as a List, or as a pair of a element and a list. In effect, any coalgebra can "stop" decomposing the list "at will".

{-# LANGUAGE DeriveFunctor #-}
import Data.Functor.Foldable

data N a x = Z [a] | S a x deriving (Functor)

(which is the same as adding the following trivial instance):

instance Functor (N a) where
  fmap f (Z xs) = Z xs
  fmap f (S x y) = S x $ f y

Consider the definition of hylomorphism:

hylo :: (f b -> b) -> (c -> f c) -> c -> b
hylo psi phi = psi . fmap (hylo psi phi) . phi

Given a seed value, it uses phi to produce f c, to which fmap applies hylo psi phi recursively, and psi then extracts b from the fmapped structure f b.

A hylomorphism for the pair of (co)algebras for this functor is a splitAt:

splitAt :: Int -> [a] -> ([a],[a])
splitAt n xs = hylo psi phi (n, xs) where
  phi (n, []) = Z []
  phi (0, xs) = Z xs
  phi (n, (x:xs)) = S x (n-1, xs)

This coalgebra extracts a head, as long as there is a head to extract and the counter of extracted elements is not zero. This is because of how the functor was defined: as long as phi produces S x y, hylo will feed y into phi as the next seed; once Z xs is produced, functor no longer applies hylo psi phi to it, and the recursion stops.

At the same time hylo will re-map the structure into a pair of lists:

  psi (Z ys) = ([], ys)
  psi (S h (t, b)) = (h:t, b)

So now we know how splitAt works. We can extend that to splitList using apomorphism:

splitList :: Int -> [a] -> [[a]]
splitList n xs = apo (hylo psi phi) (n, xs) where
  phi (n, []) = Z []
  phi (0, xs) = Z xs
  phi (n, (x:xs)) = S x (n-1, xs)

  psi (Z []) = Cons [] $ Left []
  psi (Z ys) = Cons [] $ Right (n, ys)
  psi (S h (Cons t b)) = Cons (h:t) b

This time the re-mapping is fitted for use with apomorphism: as long as it is Right, apomorphism will keep using hylo psi phi to produce the next element of the list; if it is Left, it produces the rest of the list in one step (in this case, just finishes off the list with []).

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