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I was wondering how could I write a function in Haskell that interleaves a list of lists into a single lists, for example, if I had a function called

interleavelists :: [[a]] -> [a]

it should be able to interleave the elements.

Example: [[1,2,3] [4,5,6] [7,8]] --> [1,4,7,2,5,8,3,6].

The lists can be both finite or infinite... Can I use foldr?

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Related: Merging two lists in Haskell –  Palec 8 hours ago

5 Answers 5

up vote 19 down vote accepted

The quickest way to write it is to use transpose from Data.List.

import Data.List

interleavelists :: [[a]] -> [a]
interleavelists = concat . transpose

transpose picks the first element of each non-empty list of its argument, putting them into one list, and after that, transposes the list of tails of the argument's elements. concatenating the lists of transpose's result interleaves the lists as desired. It works if some element lists are infinite, but if the list of lists itself has infinitely many elements, it of course never gets past the list of heads. But handling that case is problematic anyway.

Using foldr to interleave the lists is not trivial. Suppose you had

interleavelists xss = foldr something zero xss

interleavelists [] should probably produce [], so that'd be the zero value. And

interleavelists [xs] = xs

seems natural, so

something xs [] = xs

But what if the second argument isn't []? Then you want to insert the elements of the first argument of something at varying distances into the second argument. But at which distances? If all lists have the same length, the distances for each list are constant, then you could pass the distance as a further parameter,

interleavelists = snd . foldr insertAtDistance (0, [])
  where
    insertAtDistance xs (d, ys) = (d+1, helper d xs ys)
    helper _ [] ws = ws
    helper k (b:bs) cs = b : us ++ helper k bs vs
      where
        (us,vs) = splitAt k cs

That isn't very pretty, and if the lists are not all the same length will produce what probably isn't the desired output. But if the lists all have the same length, it does the job.

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I just wanted to leave my answer here as well...

-- | Takes a list of arrays and interleaves them according to given component sizes.
interleaveArrayData :: [[a]]    -- ^ The array data.
                    -> [GLint]  -- ^ The sizes of each component of a vertex.
                    -> [a]      -- ^ The interleaved array data.

interleaveArrayData arrays sizes = if all (not . null) arrays then
   let takes  = fmap (take . fromIntegral) sizes -- Get our 'take' functions.
       drops  = fmap (drop . fromIntegral) sizes -- Get our 'drop' functions.
       chunks = zipWith ($) takes arrays  -- The head vertex components.
       rest   = zipWith ($) drops arrays in
   concat chunks ++ interleaveArrayData rest sizes
   else []

I wrote this with OpenGL in mind, hence the GLint datatype. :)

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The "standard" (or perhaps, famous) way of interleaving lists, back in the jolly days of SICP (and later, Reasoned Scheme), was

infixr 5 ++/

[]     ++/ ys = ys
(x:xs) ++/ ys = x:(ys ++/ xs)

It can be used with foldr,

*Main> foldr (++/) [] [[1,2,3],[4,5,6],[7,8]]
[1,4,2,7,3,5,8,6]

This obviously does not produce the result in the order you wanted, but it will OTOH work OK when the input list of lists is infinite. I don't think there is a way to satisfy both requirements at the same time, as we have no way of knowing whether an input list will be infinite or not.

The above results are what the function insertAtDistance from Daniel's answer would produce, if modified to always insert at a distance of 1, instead of d+1:

insertAtDistance xs (d, ys) = (1, helper d xs ys)

When defined with d+1 it produces "flat" interleaving, whereas foldr (++/) [] produces skewed interleaving:

*Main> take 20 $ foldr (++/) [] [cycle[i] | i<-[1..]]
[1,2,1,3,1,2,1,4,1,2,1,3,1,2,1,5,1,2,1,3]
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we could do what you want

testList = [[1,2,3],[4,5,6],[7,8]]

interleave l = foldr' (concat [map (\x -> f x idx) l | idx <- [0..]])  
    where
        f x n = if (length(x)<=n) then Nothing else Just (x !! n)
        foldr' (x:xs) = case x of 
                         Nothing -> []
                         Just a  -> (:) a (foldr' xs)   

As required interleave [[1,2,3] [4,5,6] [7,8]] => [1, 4, 7, 2, 5, 8, 3, 6]

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what about [[1,2,3],[4,5],[6,7,8]] ... (check out Data.Maybe.catMaybes :: [Maybe a] -> [a])? What about [[1..],[4,5,6],[7,8]]? –  Will Ness Jan 26 '13 at 11:52
    
You're right, and I see what you are talking about, I'll try catMaybes (I don't know this fun, thks). In fact I've already realized that my answer was incomplete (or wrong) but the answer of D. Fisher was so complete and clever that i haven't judge useful to modify mine. –  zurgl Jan 27 '13 at 2:32
    
catMaybes does the only thing it could conceivably do, and that is exactly is needed here. If you decide to fix it, you could make some localized changes to foldr', or do a complete re-write, like [x | Just x<- input]. -- Both functions in Daniel Fischer's answer won't work on an infinite input list of lists - the first will get stuck on heads, but the 2nd will be completely unproductive, BTW. –  Will Ness Jan 27 '13 at 8:34
    
correction - there are several possibilities actually - catMaybes could return as from all Just as present in a list, or just the first/last/2nd/middle/each 3rd/etc... I guess returning all is the most general thing it can do. –  Will Ness Jan 27 '13 at 16:56

Simple recursive version:

inter :: [[a]] -> [a]
inter [] = []
inter xs = inter2 (filter (\x -> not (null x)) xs)
   where inter2 xs = map head xs ++ inter (map tail xs)

Now, about foldr...

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