I'm having a problem creating an function similar to the nub function.

I need this func to remove duplicated elements form a list. An element is duplicated when 2 elements have the same email, and it should keep the newer one (is closer to the end of the list).

type Regist = [name,email,,...,date]
type ListRe = [Regist]

rmDup ListRe -> ListRe
rmDup [] = []
rmDup [a] = [a]
rmDup (h:t) | isDup h (head t) = rmDup t
            | otherwise = h : rmDup t

isDup :: Regist -> Regist -> Bool
isDup (a:b:c:xs) (d:e:f:ts) = b==e

The problem is that the function doesn't delete duplicated elements unless they are together in the list.

  • Why is this tagged [generic-algorithm]? – Juliet Dec 21 '10 at 0:24
  • Isn't it just frmDup = rmDup . sortBy (on compare (!!1)) ? Or do you need to retain the original order (minus all duplicates)? – Ed'ka Dec 21 '10 at 8:07

Slightly doctored version of your original code to make it run:

type Regist = [String]
type ListRe = [Regist]

rmDup :: ListRe -> ListRe
rmDup [] = []
rmDup (x:xs) = x : rmDup (filter (\y -> not(x == y)) xs)


*Main> rmDup [["a", "b"], ["a", "d"], ["a", "b"]]

Just use nubBy, and specify an equality function that compares things the way you want.

And I guess reverse the list a couple of times if you want to keep the last element instead of the first.

  • 1
    Assuming RegList is actually [String], the equality function would be as simple as import Data.Function (on); (==) `on` (!! 1). – ephemient Dec 21 '10 at 8:15

Anon is correct: nubBy is the function you are looking for, and can be found in Data.List.

That said, you want a function rem which accepts a list xs and a function f :: a -> a -> Bool (on which elements are compared for removal from xs). Since the definition is recursive, you need a base case and a recursive case.

In the base case xs = [] and rem f xs = [], since the result of removing all duplicate elements from [] is []:

rem :: Eq a => (a -> a -> Bool) -> [a] -> [a]
rem f [] = []

In the recursive case, xs = (a:as). Let as' be the list obtained by removing all elements a' such that f a a' = True from the list as. This is simply the function filter (\a' -> not $ f a a') applied to the list as. Them rem f (a:as) is the result of recursively calling rem f on as', that is, a : rem f as':

rem f (a:as) = a : rem f $ filter (\a' -> not $ f a a') as

Replace f be a function comparing your list elements for the appropriate equality (e-mail addresses).

  • rem is not a good choice of name; there is already a rem (remainder) function in the Prelude. – Nefrubyr Dec 21 '10 at 9:40
  • I could have used f or asdf and the idea would have been the same. He wanted an algorithm for "nubbing" a list by a function, which is what, hopefully, I gave. – danportin Dec 21 '10 at 18:22

While nubBy with two reverse's is probably the best among simple solutions (and probably exactly what Justin needs for his task), one should not forget that it isn't the ideal solution in terms of efficiency - after all nubBy is O(n^2) (in the "worst case" - when there are no duplicates). Two reverse's will also take their toll (in the form of memory allocation). For more efficient implementation Data.Map (O(logN) on inserts) can be used as an intermediate "latest non duplicating element" holder (Set.insert replaces older element with newer if there is a collision):

import Data.List
import Data.Function
import qualified Data.Set as S

newtype Regis i e = Regis { toTuple :: (i,[e]) }

selector (Regis (_,(_:a:_))) = a 

instance Eq e => Eq (Regis i e) where
    (==) = (==) `on` selector

instance Ord e => Ord (Regis i e) where
    compare = compare `on` selector

rmSet xs = map snd . sortBy (compare `on` fst) . map toTuple . S.toList $ set
      set = foldl' (flip (S.insert . Regis)) S.empty (zip [1..] xs)

While nubBy implementation is definitely much simpler:

rmNub xs = reverse . nubBy ((==) `on` (!!1)) . reverse $ xs

on 10M elements list (with lots of duplication - nub should play nice here) there is 3 times difference in terms of running time and 700 times difference in memory usage. Compiled with GHC with -O2 :

input = take 10000000 $ map (take 10) $ permutations [1..]

test1 = rmNub input
test2 = rmSet input

Not sure about the nature of the author's data though (the real data might change the picture).

  • foldl' (flip (S.insert . Regis)) S.empty (zip [1..] xs) can be written as S.fromList $ zipWith Regis [1..] xs – user102008 Jan 18 '11 at 20:09

(Assuming you want to figure out an answer, not just call a library function that does this job for you.)

You get what you ask for. What if h is not equal to head t but is instead equal to the 3rd element of t? You need to write an algorithm that compares h with every element of t, not just the first element.


Why not putting everything in a Map from email to Regist (of course respecting your "keep the newest" rule), and then transform the values of the map back in the list? That's the most efficient way I can think of.


I used Alexei Polkhanov's answer and came to the following, so you can remove duplicates from lists with a type that extends Eq class.

removeDuplicates :: Eq a => [[a]] -> [[a]]
removeDuplicates [] = []
removeDuplicates (x:xs) = x : removeDuplicates (filter (\y -> not (x == y)) xs)


*Verdieping> removeDuplicates [[1],[2],[1],[1,2],[1,2]]

*Verdieping> removeDuplicates [["a","b"],["a"],["a","b"],["c"],["c"]]

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