Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

This is my second day learning Haskell and I am stuck terribly by a problem. I tried to solve the eighth problem in 99 Haskell questions The problem is to write a function called "compress" which works like this:

>compress "aaaabbbbccccddddd"
>compress [1,1,1,1,2,3,4,4,4,4]

and here's what I wrote:

compress :: (Eq a) => [a] -> [a]
compress [] = []
compress x = filter ( (head x) `notElem` ( compress $ tail x ) ) x

The compiler said:

Couldn't match expected type a -> Bool' with actual typeBool'

In compress, I tried to recursively pick up new elements from end to head. (like backtracking maybe??)

Is my algorithm wrong? Is there alternative way to implement the algorithm in a more readable way? (Like: where to put parentheses? or $ )

Can someone kindly help me with it? Thanks a lot.

Thanks to Lubomir's help, I corrected my code by :

compress'(x:xs) = x : compress' (dropWhile (== x) xs)

and it works!

And thanks everyone, I feel spoiled! You guys are so kind!

I'll keep on learning Haskell!

share|improve this question
always recompile after modifications before posting here. you have a typo –  Karoly Horvath Jan 23 at 9:40
It's refreshing to find a beginner having a good go before asking here. Keep working hard and you'll learn a lot. –  enough rep to comment Jan 23 at 15:01
This is my first post at Stackoverflow. It's amazing that everybody help me so generously!! Thanks a lot –  PurpleCow Jan 24 at 3:00

3 Answers 3

up vote 4 down vote accepted

The algorithm is basically fine, but it does not typecheck. The first argument to filter should be a function of type a -> Bool – for an element of the list it should tell you whether or not to throw it out. What you have is a single Bool value.

The second part of the function may be better implemented with a different pattern. This would allow you to drop the head and tail functions.

compress [] = []
compress (x:xs) = x : compress (filter (/= x) xs)

This pattern binds x to the first element of the list and xs is the tail of the list. The function should include x in the result and recursively call itself on filtered xs (with x removed from it).

EDIT: this function does not do what the problem requests. Only consecutive duplicates should be eliminated. This can be fixed by using dropWhile instead of filter and slightly modifying the predicate function.

share|improve this answer

Is there alternative way to implement the algorithm in a more readable way?


import Data.List

compress :: Eq a => [a] -> [a]
compress = map head . group

map head . group is basically \xs -> map head (group xs). group xs will create a list of lists were all equal consecutive elements are grouped together in a list. map head will then take the heads of these lists discarding the rest as required.

share|improve this answer
may be worth tacking on a sort so as to handle cases where the input list is unsorted: compress = map head . group . sort (type stays the same, sort is in Data.List) EDIT: just saw that the exercise just wants us to eliminate consecutive duplicates only (i.e., not all duplicates). so ignore this... (i don't see a delete button...) –  Dipak C Nov 8 at 8:09

Check the signature of filter:

Prelude> :t filter
filter :: (a -> Bool) -> [a] -> [a]

Note that the first argument must be a function. Now check the type of your expression within the paranthesis.

Prelude> :t notElem
notElem :: Eq a => a -> [a] -> Bool

Thus, notElem a b will return a value of type Bool.

Note: I think you might have misunderstood the problem statement. What is the expected output for aaabbbaaa? I would argue it should be aba, as the problem is stated as

Eliminate consecutive duplicates of list elements.

(emphasize mine).

share|improve this answer
Your interpretation is correct. The example given is compress "aaaabccaadeeee" returning "abcade". –  enough rep to comment Jan 23 at 14:49
Yes, thanks, I did misunderstand in the first place. –  PurpleCow Jan 24 at 3:01

Your Answer


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.