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I'm trying to define a function which will remove duplicates from a list. So far I have a working implementation:

rmdups :: Eq a => [a] -> [a]
rmdups [] = []
rmdups (x:xs)   | x `elem` xs   = rmdups xs
                | otherwise     = x : rmdups xs

However id like to rework this without using elem, what would be the best method for this?


(I'd like to do this using my own function and not nub or nubBy).

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4 Answers 4

up vote 12 down vote accepted

I don't think you'll be able to do it without elem (or your own re-implementation of it).

However, there is a semantic issue with your implementation. When elements are duplicated you're keeping the last one. Personally, I'd expect it to keep the first duplicate item and drop the rest.

*Main> rmdups "abacd"

The solution is to thread the 'seen' elements through as a state variable.

removeDuplicates :: Eq a => [a] -> [a]
removeDuplicates = rdHelper []
    where rdHelper seen [] = seen
          rdHelper seen (x:xs)
              | x `elem` seen = rdHelper seen xs
              | otherwise = rdHelper (seen ++ [x]) xs

This is more-or-less how nub is implemented in the standard library (read the source here). The small difference in nub's implementation ensures that it is non-strict, while removeDuplicates above is strict (it consumes the entire list before returning).

Primitive recursion is actually overkill here, if you're not worried about strictness. removeDuplicates can be implemented in one line with foldl:

removeDuplicates2 = foldl (\seen x -> if x `elem` seen
                                      then seen
                                      else seen ++ [x]) []
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@BradStevenson These solutions are based on very inefficient operations - both the elem function and (++) have an O(n) complexity on list. Although Haskell's laziness protects the algorithm from executing (++) on every cycle, these implementations still fall short quite contrastly as compared to alternative implementations presented in other answers. See benchmark results. –  Nikita Volkov Apr 24 '13 at 11:06
I think removeDuplicates3 = foldr (\x seen -> if x `elem` seen then seen else x : seen) [] runs faster than removeDuplicates2, as (:) operation is constant. –  Andrei Petre Apr 13 '14 at 12:20

Both your code and nub have O(N^2) complexity.

You can improve the complexity to O(N log N) and avoid using elem by sorting, grouping, and taking only the first element of each group.


rmdups :: (Ord a) => [a] -> [a]
rmdups = map head . group . sort

Suppose you start with the list [1, 2, 1, 3, 2, 4]. By sorting it, you get, [1, 1, 2, 2, 3, 4]; by grouping that, you get, [[1, 1], [2, 2], [3], [4]]; finally, by taking the head of each list, you get [1, 2, 3, 4].

The full implementation of the above just involves expanding each function.

Note that this requires the stronger Ord constraint on the elements of the list, and also changes their order in the returned list.

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Very nice, but note that this places an Ord restriction on the list elements, rather than just Eq, and the order is not preserved. –  Benjamin Hodgson Apr 19 '13 at 16:33
Good point. Made a note of that and the other change in semantics. –  scvalex Apr 19 '13 at 16:35
Ha, you beat me to the edit I made in my comment :) –  Benjamin Hodgson Apr 19 '13 at 16:35
ordNub provides a copy-paste-ready, stable (order-preserving) variant of @scvalex's suggestion to use Ord. It also contains analogues for \`, union` and intersect. –  nh2 Nov 24 '14 at 14:52

Same as @scvalex's solution the following has an O(n * log n) complexity and an Ord dependency. In difference to it, it preserves the order, keeping the first occurences of items.

import qualified Data.Set as Set

rmdups :: Ord a => [a] -> [a]
rmdups = rmdups' Set.empty where
  rmdups' _ [] = []
  rmdups' a (b : c) = if Set.member b a
    then rmdups' a c
    else b : rmdups' (Set.insert b a) c

Benchmark results

benchmark results

As you can see, the benchmark results prove this solution to be the most effective. You can find the source of this benchmark here.

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+1. Set is definitely a more efficient data structure for large inputs. I'd like to see where the standard library's nub fits into this graph - does laziness have an effect on the performance? –  Benjamin Hodgson Apr 24 '13 at 13:57
Heh. I was going to write up and submit a version using Set insertion, but you beat me to it. Good show. –  Inaimathi Apr 24 '13 at 13:58

Even easier.

import Data.Set 
mkUniq :: Ord a => [a] -> [a]
mkUniq = toList . fromList

O(n). Convert the set to a list of elements.

toList :: Set a -> [a]

O(n log n). Create a set from a list of elements.

fromList :: Ord a => [a] -> Set a

In python it would be no different.

def mkUniq(x): 
   return list(set(x)))
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elegant, but I don't think Set preserves the order. –  sam boosalis Nov 27 '14 at 7:49
yes, he didn't mention order preservation in his OP. –  The Internet Nov 27 '14 at 9:07
by the way, I had mis-clicked the down vote (I wanted to up-vote), and now my vote is locked in, because I had uploaded it earlier but it wasn't showing… edit the answer (with anything) so I can up vote you. –  sam boosalis Nov 27 '14 at 19:50
lolol, that's funny. No worries :) I edited it –  The Internet Nov 28 '14 at 19:15
and I upvoted :-) –  sam boosalis Nov 30 '14 at 22:03

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