# Simplifying selectionsort and mergesort

I have managed to implement insertionsort and quicksort in a couple of lines, but selectionsort and mergesort still give me headaches ;)

``````selectionsort [] = []

selectionsort (x:xs) =
let (minimum, greater) = extractMinimum x [] xs
in  minimum : selectionsort greater

extractMinimum minimumSoFar greater [] = (minimumSoFar, greater)

extractMinimum minimumSoFar greater (x:xs)
| x < minimumSoFar = extractMinimum x (minimumSoFar:greater) xs
| otherwise        = extractMinimum minimumSoFar (x:greater) xs
``````

Is something like the `extractMinimum` function available in the standard library? I tried hoogling for `(a -> a -> Bool/Ordering) -> [a] -> (a, [a])` without any luck.

``````mergesort [ ] = [ ]

mergesort [x] = [x]

mergesort xs =
let (left, right) = splitAt (length xs `div` 2) xs
in  merge (mergesort left) (mergesort right)

merge xs [] = xs

merge [] ys = ys

merge xxs@(x:xs) yys@(y:ys)
| x < y     = x : merge  xs yys
| otherwise = y : merge xxs  ys
``````

Again, do I have to write `merge` myself, or can I reuse existing components? Hoogle gave me no useful results for `(a -> a -> Bool/Ordering) -> [a] -> [a] -> [a]`.

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n.b. @sudo_o and whoever approved that edit: Hoogle is a search engine that allows you to search for Haskell library functions by type signature; it is not a typo of Google. – dave4420 Oct 6 '12 at 14:58
Excuse my ignorance haha.. – iiSeymour Oct 6 '12 at 15:00
By the way, top-down mergesort is a very poor idea with lists in Haskell. You spend a bunch of time splitting lists and finding the length of lists. Working from the bottom up is much simpler. Start by converting the input to length-one lists, then merge adjacent pairs of lists until there's only one left. – Carl Oct 6 '12 at 16:27
@Carl What if I compute the length of the list only once at the beginning and then pass the smaller lengths down explicitly? – fredoverflow Oct 6 '12 at 17:42
@FredOverflow It won't remove the cost of repeated `splitAt`s. That's an O(n) operation on immutable lists. – Carl Oct 6 '12 at 18:14

There's nothing in the standard libraries, but at least `merge` is provided by a package on hackage, although I'm not sure it's worth pulling in a dependency for such a simple function.

However,

``````merge xxs@(x:xs) yys@(y:ys)
| x < y     = x : merge  xs yys
| otherwise = y : merge xxs  ys
``````

produces a non-stable sort, to get a stable sort, the condition to place `x` should be `x <= y`.

For `extractMinimum`, I haven't found anything either, but I can offer an alternative definition,

``````extractMinimum :: Ord a => a -> [a] -> (a,[a])
extractMinimum x = foldl' select (x, [])
where
select (mini, greater) y
| y < mini  = (y, mini:greater)
| otherwise = (mini, y:greater)
``````

A nice definition of `selectionSort` would be

``````import Data.List -- for unfoldr

selectionSort :: Ord a => [a] -> [a]
selectionSort = unfoldr getMin
where
getMin [] = Nothing
getMin (x:xs) = Just \$ extractMinimum x xs
``````
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My suggestion for selection sort:

``````import Data.List

selectionsort xs = unfoldr f xs where
f [] = Nothing
f xs = Just \$ extractMinimum xs

extractMinimum (x:xs) = foldl' f (x,[]) xs where
f (minimum, greater) x | x < minimum = (x, minimum : greater)
| otherwise = (minimum, x : greater)
``````
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