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Optional exercise: Tree folds

> module TreeFolds where
> -- https://www.seas.upenn.edu/~cis5520/current/lectures/stub/03-trees/TreeFolds.html
> 
> import Test.HUnit
> import qualified Data.DList as DL

This exercise is about efficiently iterating over tree-structured data. Recall the basic type of binary trees.

> -- | a basic tree data structure
> data Tree a = Empty | Branch a (Tree a) (Tree a) deriving (Show, Eq)

And also the infixOrder function from the Datatypes module.

> infixOrder :: Tree a -> [a]
> infixOrder Empty = []
> infixOrder (Branch x l r) = infixOrder l ++ [x] ++ infixOrder r

For example, using this tree

          5
        /   \
       2     9
      / \     \
     1   4     7

> exTree :: Tree Int
> exTree = Branch 5 (Branch 2 (Branch 1 Empty Empty) (Branch 4 Empty Empty))
>                   (Branch 9 Empty (Branch 7 Empty Empty))

the infix order traversal produces this result.

> testInfixOrder :: Test
> testInfixOrder = "infixOrder" ~: infixOrder exTree ~?= [1,2,4,5,9,7]

However, as in the DList exercise, the (++) in the definition of infixOrder should bother you. What if the tree is terribly skewed?

             1
            /
           2 
          / 
         3
        /
       4
      / 
     5   
    /
  ...

> -- | A big "right-skewed" tree
> bigRightTree :: Int -> Tree Int
> bigRightTree m = go 0 where
>    go n = if n <= m then Branch n Empty (go (n+1)) else Empty

> -- | A big "left-skewed" tree
> bigLeftTree :: Int -> Tree Int
> bigLeftTree m = go 0 where
>    go n = if n <= m then Branch n (go (n+1)) Empty else Empty

If you turn on benchmarking, you can observe the difference between a left skewed and right skewed tree in ghci. At this scale, the time taken to print these trees dominates the computation, but take a look at the difference in allocation!

    ghci> :set +s
    ghci> sum (infixOrder (bigRightTree 10000))
    50005000
    (0.02 secs, 7,102,016 bytes)
    ghci> sum (infixOrder (bigLeftTree 10000))
    50005000
    (0.97 secs, 4,305,693,360 bytes)

We can improve things by using DLists while traversing the tree. Try to complete this version so that the number of bytes used for traversing t1 and t2 is more similar to the version above... (NOTE: There is an implementation of DLists in the standard library, and we have imported it above. So you can try this out even if you have not completed the DList exercise.)

> infixOrder1 :: Tree a -> [a]
> infixOrder1 = undefined

> tinfixOrder1 :: Test
> tinfixOrder1 = "infixOrder1a" ~: infixOrder1 exTree ~?= [1,2,4,5,9,7]

   ghci> sum (infixOrder1 (bigRightTree 10000))
   50005000
   (0.02 secs, 9,016,880 bytes)
   ghci> sum (infixOrder1 (bigLeftTree 10000))
   50005000
   (0.02 secs, 9,016,880 bytes)

Now, let's inline the DList definitions above to get rid of the use of library functions. If you have completed the DList exercise you can rewrite your code from infixOrder1 replacing the uses of DL.toList, DL.empty, DL.singleton, DL.append with your definitions in that file.

> infixOrder2 :: Tree Int -> [Int]
> infixOrder2 = undefined

On my microbenchmark, this also sped up the traversal!

   ghci> sum (infixOrder2 (bigLeftTree 10000))
   50005000
   (0.01 secs, 6,696,624 bytes)

Foldable Trees

Does this idea generalize to other forms of tree recursion? You betcha.

Let's generalize the "base case" and "inductive step" of the definition above, separating the recursion from the specific operation of traversal. Now turn your definition of infixOrder2 into a generic definition of foldrTree, specialized to the operations that we need for an infix traversal:

> foldrTree :: (a -> b -> b) -> b -> Tree a -> b
> foldrTree f b t = undefined
> 
> infixOrder3 :: Tree a -> [a]
> infixOrder3 = foldrTree (:) [] 

   ghci> sum (infixOrder3 (bigLeftTree 10000))
   50005000
   (0.01 secs, 6,856,728 bytes)

This fold function is general. We can use it define many different tree operations.

> sizeTree :: Tree Int -> Int
> sizeTree = foldrTree (const (1 +)) 0

> sumTree :: Tree Int -> Int
> sumTree = foldrTree (+) 0

> anyTree :: (a -> Bool) -> Tree a -> Bool
> anyTree f = foldrTree (\x b -> f x || b) False 

> allTree :: (a -> Bool) -> Tree a -> Bool
> allTree f = foldrTree (\x b -> f x && b) True

Extra challenge

Now use foldrTree as an inspiration to define a foldlTree function, which folds over the tree in the opposite order.

> foldlTree :: (b -> a -> b) -> b -> Tree a -> b
> foldlTree = undefined

> revOrder :: Tree a -> [a]
> revOrder = foldlTree (flip (:)) []
> 
> trevOrder :: Test
> trevOrder = "revOrder" ~: revOrder exTree ~?= [7, 9, 5, 4, 2, 1]

Note: Although they are efficient and useful, neither foldlTree nor foldrTree capture the general principle of tree recursion.

> foldTree :: (a -> b -> b -> b) -> b -> Tree a -> b
> foldTree _ e Empty = e
> foldTree f e (Branch a n1 n2) = f a (foldTree f e n1) (foldTree f e n2)

Define foldrTree and foldlTree in terms of foldTree. (This is challenging!)

> foldrTree' :: (a -> b -> b) -> b ->  Tree a -> b
> foldrTree' = undefined

> tree1 :: Tree Int
> tree1 = Branch 1 (Branch 2 Empty Empty) (Branch 3 Empty Empty)

> tfoldrTree' :: Test
> tfoldrTree' = "foldrTree'" ~: foldrTree' (+) 0 tree1 ~?= 6

> foldlTree' :: (b -> a -> b) -> b -> Tree a -> b
> foldlTree' = undefined

> tfoldlTree' :: Test
> tfoldlTree' = "foldlTree'" ~: foldlTree' (+) 0 tree1 ~?= 6