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I am trying to solve problem 10 from the ninety nine haskell problems. Here is my solution that I believe is correct.

The pack function (from question 9) is already correct. The problem is with the encode function.

pack :: (Eq a) => [a] -> [[a]]
pack [] = []
pack (x:xs) = (x : takeWhile (== x) xs) : (pack $ dropWhile (== x) xs)

encode :: (Eq a) => [a] -> [(Int, a)]
encode [] = []
encode list = (encode' $ head packed) : (encode $ tail packed)
    where packed = pack list
          encode' l = (length l, head l) 

When I load the file from ghci, this is the error:

encode.hs:6:0: Occurs check: cannot construct the infinite type: a = [a] When generalising the type(s) for `encode'

Line 6 is the line containing encode [] = []

What's wrong with my encode function? I keep checking the types of the variables used and I believe there is nothing wrong.

Function usage example (assuming code is working correctly):

pack "aaaabbbbccccccddddddd"
> ["aaaa","bbbb","cccccc","ddddddd"]
encode "aaaabbbbccccccddddddd"
> [(4,'a'),(4,'b'),(6,'c'),(7,'d')]
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5 Answers 5

up vote 3 down vote accepted
encode $ tail packed

We have

packed :: [[a]]
tail packed :: [[a]]

But we need to pass an [a] to encode.

(Think about it like this: list needs to go through pack. packed is the output from pack, but in the recursive call it will be passed to pack again.)

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Recursion is somewhat clumsy here. It's much better to use a higher-order function.

You already have a function encode' :: [a] -> (Int, a) that encodes one sub-list, and you want to encode all of them. Applying a function to every element of a list is a very common pattern which is encapsulated by the higher-order function map :: (a -> b) -> [a] -> [b].

Taking advantage of map, we can simply write:

encode :: (Eq a) => [a] -> [(Int, a)]
encode list = map encode' $ pack list
   where encode' xs = (length xs, head xs)

You can also avoid the helper function by using a list comprehension:

encode :: (Eq a) => [a] -> [(Int, a)]
encode list = [(length xs, head xs) | xs <- pack list]

In general, try to use existing higher-order functions where appropriate instead of doing your own recursion. It's both more readable and less prone to mistakes.

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Both of your solutions do look much cleaner. Thanks for the suggestion! –  Hery Jan 31 '12 at 1:31

Your problem is that the function encode expects "unpacked" lists, but you pass a "packed" list.

Adding type signatures helps a lot here, I added a type signature for encode'

{-# LANGUAGE ScopedTypeVariables #-}

pack :: (Eq a) => [a] -> [[a]]
pack [] = []
pack (x:xs) = (x : takeWhile (== x) xs) : (pack $ dropWhile (== x) xs)

encode :: forall a. (Eq a) => [a] -> [(Int, a)]
encode [] = []
encode list = (encode' $ head packed) : (encode $ tail packed)
    where packed = pack list
          encode' :: [a] -> (Int, a)
          encode' l = (length l, head l)

and the compiler finds the error quickly:

[1 of 1] Compiling Main             ( test.hs, interpreted )

    Couldn't match type `a' with `[a]'
      `a' is a rigid type variable bound by
          the type signature for encode :: Eq a => [a] -> [(Int, a)]
          at test.hs:8:1
    Expected type: [(Int, a)]
      Actual type: [(Int, [a])]
    In the second argument of `(:)', namely `(encode $ tail packed)'
    In the expression: (encode' $ head packed) : (encode $ tail packed)
Failed, modules loaded: none.

Because that would only work if a was the same as [a] and therefore the same as [[a]] etc. That's an infinite type error. Or simply the difference between a "packed" list ([[a]]) and a "unpacked" list ([a]) in your sample.

(For better understanding: "packed" list is a list after applying the pack function ;-) )

edit: fixed ScopedTypeVariables vs. ExistentialQuantification error, thanks John L

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this looks... too advanced for me (just starting with haskell). –  Hery Jan 30 '12 at 15:00
Let me rephrase that: The compiler tries to tell you: An "unpacked" list would be the same as a "packed" list iff [a] would be the same as [[a]]. That's true! See your definition of pack: pack :: (Eq a) => [a] -> [[a]]. pack transforms [a] to [[a]]. If that would be the same, "packed" and "unpacked" lists would be the same and your program would work. BUT: Then we'd have a == [a] == [[a]] == [[[a]]] == [[[[a]]]] so: an infinite number of "names" for the type a. And the compiler told you infinite type error :-) –  Johannes Weiß Jan 30 '12 at 15:03
Now I understand why the error is called "infinite type error"... By the way, I referred to the ExistentialQuantification thing when I said that your answer looks too advanced. I found one reference in wikibooks and it looks... well... too advanced, for now :) –  Hery Jan 30 '12 at 15:15
Cool :-). Just ignore the ExistentialQuantification thing right now. All it does is to tell the compiler that all as used in the function encode are THE SAME type. forall a. means that the type signatures of encode and encode' specify something about an arbitraty but fixed type a. I wanted to tell the compiler that the two as can't be a different type. –  Johannes Weiß Jan 30 '12 at 16:10
This answer doesn't actually use ExistentialQuantification; the extension which is in use is ScopedTypeVariables, which is implied by ExistentialQuantification. ScopedTypeVariables is very simple, it just means that the a variable in the type of encode' is the same as the a in encode's type signature. –  John L Jan 30 '12 at 16:11

You can do pattern matching on the result to pack, instead of using head and tail. Then it looks like this:

encode :: (Eq a) => [a] -> [(Int, a)]
encode [] = []
encode list = encode' x : encode xs
   where (x:xs)    = pack list
         encode' l = (length l, head l)

The type error comes from xs is of type [[a]] because pack returns [[a]], but encode expects an [a] argument.

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The @ operator is quite handy, is there any fancy name for it? –  Hery Jan 30 '12 at 14:43
@Hery: they are called as-patterns, or @-patterns –  danr Jan 30 '12 at 14:44

I agree with @hammar that higher-order functions are a great way to handle this problem.
Here's a general explanation of what happened, though:

Every time I've had an infinite type error, it's had the following form:
I've had a function which called itself, but called itself with a "deeper"* type than it had been passed.

Let's make a simple infinite type error:

*Main> let f (_:xs) = f [xs]

    Occurs check: cannot construct the infinite type: t0 = [t0]

And let's break down why: the type of f can't be determined: If f :: [a] -> [[a]], then the f [xs] :: [[a]] -> [[[a]]], which gets passed to the original f, which can't return [[[a]]].

*My definition of "deeper":
[[a]] is "deeper" than [a]
Constructor (Constructor a) is "deeper" than Constructor a

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It can also happen the other way, for example with f (x:_) = f x. –  hammar Jan 31 '12 at 2:31

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