Stack Overflow is a community of 4.7 million programmers, just like you, helping each other.

Join them; it only takes a minute:

Sign up
Join the Stack Overflow community to:
  1. Ask programming questions
  2. Answer and help your peers
  3. Get recognized for your expertise

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].

share|improve this question
6  
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
2  
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 splitAts. That's an O(n) operation on immutable lists. – Carl Oct 6 '12 at 18:14
up vote 2 down vote accepted

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
share|improve this answer

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) 
share|improve this answer

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.