I want to take a list (or a string) and split it into sublists of N elements. How do I do it in Haskell?
Example:
mysteryFunction 2 "abcdefgh"
["ab", "cd", "ef", "gh"]
I want to take a list (or a string) and split it into sublists of N elements. How do I do it in Haskell? Example:



And then use 


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 nonempty 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".
(which is the same as adding the following trivial instance):
Consider the definition of hylomorphism:
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:
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 remap the structure into a pair of lists:
So now we know how splitAt works. We can extend that to splitList using apomorphism:
This time the remapping 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 []). 


There's already
and
so there really should be
as well. With it,
without it,



Probably not the elegant solution you had in mind. 


... just kidding... 


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



You could use:
or alternatively:
Note this puts any remaining elements in the last list, for example


