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I want to build binary tree with key - value leafs with tuple (k,v).

My code:

data Tree k v = EmptyTree 
                | Node (k, v) (Tree k v) (Tree k v)
                deriving (Show, Eq, Ord, Read)

emptyTree :: (k,v) -> Tree k v  
emptyTree (k,v) = Node (k, v) EmptyTree EmptyTree

treeInsert :: (Ord k) => (k,v) -> Tree k v -> Tree k v
treeInsert (k,v) EmptyTree = emptyTree (k, v)
treeInsert (a, b) (Node (k,v) left right) 
        | a == k = (Node (a,b) left right)
        | a < k = (Node (a, b) (treeInsert (a, b) left) right)   
        | a > k = (Node (a, b) left (treeInsert (a, b) right))

Now i'm trying to fill this tree:

fillTree :: Int -> Tree k v -> Tree k v
fillTree x tree = treeInsert (x, x) tree

But I get this error:

Couldn't match type `v' with `Int'
      `v' is a rigid type variable bound by
          the type signature for fillTree :: Int -> Tree k v -> Tree k v

What's the cause and how can I fix it?

share|improve this question
In situations like this, it can be helpful to remove the type signature, load the file in GHCi, and see what the compiler thinks the type should be. –  C. A. McCann Jul 20 '11 at 17:52
emptyTree is a really bad name for that function, as everybody would expect that it returns an EmptyTree. A better name would something like singleton or singleNode. –  Landei Jul 22 '11 at 14:14

1 Answer 1

up vote 6 down vote accepted

Your type is either too general or too specific. It should be

fillTree :: Int -> Tree Int Int -> Tree Int Int


fillTree :: (Ord a) => a -> Tree a a -> Tree a a

Your original declaration was trying to insert (Int, Int) into a Tree k v for any k, v. It was saying that no matter what kind of tree you have, we can insert a pair of Ints in it. This is clearly nonsense, and as your signature for treeInsert indicates, only pairs of type (k, v) can be inserted into a Tree k v.

treeInsert :: (Ord k) => (k, v) -> Tree k v -> Tree k v
share|improve this answer
Alternatively, something like (Ord a) => a -> Tree a a -> Tree a a. –  C. A. McCann Jul 20 '11 at 17:51
Yes, thank you. –  0xAX Jul 20 '11 at 17:51

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