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I have written the code below to test whether a list is a Palindrome or not. To my surprise its not compiling with the error "No instance for (Eq a) arising from a use of == ....". My assumption is that the compiler does not know that leftHalf and rightHalf are lists.

    isPalindrome :: [a] -> Bool
    isPalindrome [] = False
    isPalindrome xs = if (leftHalf == reverse rightHalf)
              then True
              else False
     where leftHalf = take center xs
           rightHalf = drop center xs
           center = if  even (length xs)
                       then (length xs) `div` 2
                   else ((length xs) - 1) `div` 2 

1) How do I tell the compiler that leftHalf and rightHalf are lists?
2) How would I use pattern matching or other haskell language features to solve this?

EDIT: Thank you all for your input. Special mention to Matt Fenwick for the documentation link and Duri for the elegant tip. I will write the final solutions below just in case

     isPalindrome' :: (Eq a) => [a] -> Bool
     isPalindrome' [] = False
     isPalindrome' xs = if p then True else False
                   where p = leftHalf == rightHalf
                         leftHalf = take c xs
                         rightHalf = take c (reverse xs)
                         c = div l 2
                         l = length xs

isPalindrome' can be improved like Demi pointed out

      isPalindrome'' :: (Eq a) => [a] -> Bool
      isPalindrome'' [] = False
      isPalindrome'' xs = if (reverse xs) == xs then True else False
share|improve this question
Just think about what xs and reverse xs look like for every palindrome and your code will be much simpler. – duri May 3 '12 at 14:52
btw this code is wrong (after getting it to compile): map isPalindrome [[1], [1,2,1]] is [False, False]. – Matt Fenwick May 3 '12 at 14:58
The div will round down, so the even test is unnecessary. Just divide the odd number by 2, and you'll get the same answer. However, as @Matt points out, your algorithm doesn't work when the length is odd, since you don't want the center element in either the left or the right half. The take needs to round down, and the drop needs to round up. – pat May 3 '12 at 16:46
Note that your definition of center is the same as center = div (length xs) 2. – augustss May 3 '12 at 18:01
Note that your use of take and drop can be replaced by splitAt. (Of course, to make your function work you need to change your take and drop calls.) – augustss May 3 '12 at 18:02
up vote 2 down vote accepted

Check out the Eq typeclass:

ghci> :i (==)
class Eq a where
  (==) :: a -> a -> Bool
    -- Defined in GHC.Classes
infix 4 ==

What you need is a type constraint on isPalindrome.

Also, this code

if (leftHalf == reverse rightHalf)
              then True
              else False

is unnecessarily long.

share|improve this answer
Thanks your response has been very insightful. – Mahara May 3 '12 at 15:34

In order to test if two lists are equal, it must be possible to test if the items in the list are equal. Therefore, your list of type [a] must ensure that a is an instance of Eq.

Also, as a matter of style:

x = if c then True else False

can be replaced with

x = c
share|improve this answer
thanks for the style guide that makes my code neater :-) – Mahara May 3 '12 at 15:11

You should change your type to:

isPalindrome :: Eq a => [a] -> Bool

And this is really extraneous to find center, it's enough to just write xs == reverse xs - when you computing length xs you go through all the list and there is no economy.

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