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I want to write a merge function that takes multiple x sorted lists and merges them into just one sorted list by incremental values (smallest to largest). I think I can do two lists and combine into one, but can't figure out the base case for multiple lists and combining into one sorted.

merge :: [[a]] -> [a]
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5 Answers 5

up vote 5 down vote accepted

@sepp2k's answer is good, but it only works on finitely many input lists. If you give it infinitely many lists, it will take forever trying to find the minimum starting element.

We can fix this by requiring that the input lists are already sorted by increasing first elements. Then we know that we can yield the "top-left" element (first element of the first list) because it will be a lower bound for everything, which gives us enough information to use recursively and produce a complete merge.

merge :: (Ord a) => [[a]] -> [a]
merge [] = []
merge ([]:xss) = merge xss
merge ((x:xs):xss) = x : merge2 xs (merge xss)

Writing merge2 still left as an exercise for the reader :-)

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Maybe a faster implementation:

mergeTwo :: Ord a => [a] -> [a] -> [a]
mergeTwo x [] = x
mergeTwo [] x = x
mergeTwo (x:xs) (y:ys) = if x < y
                          then x:(mergeTwo xs (y:ys))
                          else y:(mergeTwo (x:xs) ys)

mergePairs :: Ord a => [[a]] -> [[a]]
mergePairs [] = []
mergePairs (x:[]) = [x]
mergePairs (x:y:tail) = mergePairs ((mergeTwo x y):(mergePairs tail))

mergeAll :: Ord a => [[a]] -> [a]
mergeAll [] = []
mergeAll x = head $ mergePairs x

mergeTwo just merges two lists. mergeAll just runs mergePairs and returns head if there is some. Magic happens in mergePairs, which takes list of lists and merges pairs, than does this again and so on, while there are at least two lists.

It might be faster, imagine you are running

merge = foldl merge2 []

It takes one long list and merges and merges. If you run it at [[1,2,3],[4,5,6],[7,8,9],[10,11,12]], it merges:

[] with [1,2,3]

[1,2,3] with [4,5,6]

[1,2,3,4,5,6] with [7,8,9]

[1,2,3,4,5,6,7,8,9] with [10,11,12]

But you want to keep lists of approx same lenght. So you want to merge:

[1,2,3] with [4,5,6]

[7,8,9] with [10,11,12]

[1,2,3,4,5,6] with [7,8,9,10,11,12]

You could also consider paraller implementation of mergePairs, it could be useful on multicore processors. But I have no experience in this :/

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this is the correct (as in asymptotically optimal) solution. –  Philip JF Mar 10 '13 at 21:32
In one thread yes, but imho it could be done multithread easily. –  kyticka Mar 10 '13 at 21:40

If you can define the function for two lists, then you can generalize it to arbitrarily many lists by simply going through each sublist and merging it with the current result until you've merge all the lists. This can be expressed as a fold like this:

merge = foldr merge2 []
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Imagine each sublist is a singleton, and they occur in reverse order, then this take O(n^2). You want to use a bottom up merge O(n log n). Since merge2 define a monoid, we can achieve this using a tree shaped implementation of foldM. The same problem applies to luqui's answer. –  Philip JF Mar 10 '13 at 21:29

It's much easier if you first merge the lists with concat and then sort.

import Data.List(sort)

mergeSort = sort . concat
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import Data.List ( sort )

sortLists :: (Ord a) => [[a]] -> [a]
sortLists cs = concatMap sort cs

test = [ [3,1,2],
         [6,8,9,7] ]

main = print $ sortLists test

To really enjoy haskell, take a good look and learn by heart the Prelude and Data.List. They are the bread and butter of every Haskell programmer.

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Better, re-encode every function of Data.List –  zurgl Mar 10 '13 at 21:43
I don't think this is what the question asked for at all – note in particular that sortLists [[2],[1]] is [2,1]. –  Ben Millwood Mar 10 '13 at 22:30

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