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Merge Sort

Edit the file MergeSort.hs for this problem.

> module MergeSort where

> import SortedList
> import Data.Monoid
> import Test.HUnit

A warm-up exercise: write the function insert, which takes an element and a sorted list and inserts the element into the list at the first position where it is less than or equal to the next element. For this definition, do not use any functions from the Data.List library (which, indeed, contains such a function).

> insert :: Ord a => a -> [a] -> [a]
> insert = undefined

Using this function, we can define the insertion sort algorithm over lists. Insertion sort, like several other sorting algorithms, is incremental -- it works by processing a single element of the input unsorted list at a time, and when it finishes processing the input, its work is done. Using the insert function above, write a function which takes a list and returns the list sorted. You must express your answer in terms of a fold.

> insertionSort :: Ord a => [a] -> [a]
> insertionSort = undefined

Keep in mind that this sorting algorithm, although succinct, is not efficient -- it has O(N ^ 2) asymptotic complexity.

You may have noticed that the insert function above has an invariant attached to its description; namely, that its list argument is already sorted. If that invariant holds, then insert guarantees that its output will also be sorted; otherwise, there is no such guarantee.

A leading question: what if we could keep track of the "sorted-ness" of a list using the type system? You already know that we can -- that's precisely what we did in SortedList.lhs.

> -------------------------------------------------------------

SortedLists to the Rescue

I previously promised that the interface we built for SortedLists would be sufficient to do useful things with them. One particularly obvious useful thing to do with SortedLists is to construct them from arbitrary lists -- that is, to sort an arbitrary list and produce a SortedList with the result.

> sortedFromList :: Ord a => [a] -> SortedList a
> sortedFromList = undefined

By projecting out the underlying list, we get a sorting function, that we'll call sortedListSort.

> sortedListSort :: Ord a => [a] -> [a]
> sortedListSort = toNormalList . sortedFromList

> testSortedFromList :: Test
> testSortedFromList =
>   let unsorted = [51,67,89,95,14,31,28,87,0,25]
>       sorted   = [0,14,25,28,31,51,67,87,89,95] in
>   sortedListSort unsorted ~?= sorted

One thing you may have noticed while writing the above function is that there is only one place you could have made reference to the SortedList type specifically: in the use of the singleton operation. Indeed, this operation is the only SortedList-specific way to create new SortedLists -- any other way comes through the Monoid instance. Perhaps there's some common pattern here that we could abstract! (There is.) Let's express it by making the singleton function into a parameter of a new function, that we will call foldMapList, so that we can rewrite the algorithm above like so:

> sortedFromList' :: Ord a => [a] -> SortedList a
> sortedFromList' = foldMapList singleton

Again, we can project out the underlying list to get a list sorting function.

> sortedListSort' :: Ord a => [a] -> [a]
> sortedListSort' = toNormalList . sortedFromList'

> testSortedFromList' :: Test
> testSortedFromList' =
>   let unsorted = [47,80,28,47,45,76,1,35,19,1] in
>   sortedListSort' unsorted ~?= sortedListSort unsorted  -- old & new agree

In order to make this work, you need to define the foldMapList combinator.

> foldMapList :: Monoid m => (a -> m) -> [a] -> m
> foldMapList f = undefined

The type of foldMapList is very general --- we can use this function to combine arbitrary lists by providing a function that maps their contents to some particular Monoid (such as SortedList). For instance, foldMapList Sum gives us the sum of the numbers in the list; foldMap Product gives us their product.

A small exercise: using foldMapList and the Sum and Product newtypes you learned about in SortedList.lhs, implement the following function, which takes a doubly-nested list of numbers as input, and returns the sum of the product of each of the inner lists. In your solution, do not explicitly use any of the ordinary numeric operations like (+), (*), sum, or product, and eschew explicit recursion.

> sumOfProducts :: Num a => [[a]] -> a
> sumOfProducts = undefined

> testSumOfProducts :: Test
> testSumOfProducts = sumOfProducts [[1],[2,3],[4,5,6],[7,8,9,10]] ~?= 5167

Like Merge Sort, the sortedListSort function is based on merging sorted lists together. This merge-sort-like algorithm has a flaw, though: it's quadratic in runtime. Why?

For any singleton SortedList [a] and any other SortedList as, computing SortedList [a] <> SortedList as is identical not only in resultant value, but also in algorithmic structure to computing the result of insert a as. The definition of foldMapList linearly scans across its input list, successively combining values using (<>) -- and so, like insertion sort, the whole whole algorithm ends up executing a quadratic number of comparisons.

A real merge sort algorithm, as you likely know, divides its input more intelligently than the one we've written above in terms of foldMapList. By dividing its input roughly in half every iteration, it only has to do a logarithmic amount of merging.

To make our merge sort do this, we need to use a different kind of foldMap!

The Foldable Typeclass

At this point, I'd like to point something out: foldMapList can itself be even further generalized. We already know that lists are not the only data structures which support folding -- we've seen folds for trees of various kinds and for other data structures as well. As a result, it makes sense to allow some kind of foldMap operation for those structures also. In the standard library, we therefore have:

foldMap :: (Monoid m, Foldable t) => (a -> m) -> t a -> m

That is to say, foldMap is a method of yet another type class, Foldable, of which the type constructor [] is an instance. Implementing this interface roughly corresponds to saying, "this data structure contains some elements, and I know how to do a fold across them." To implement the Foldable class for some type, we just need to implement foldMap.

Implement the Functor and Foldable instances for the Crispy datatype. Remember to keep in mind a guiding principle: when you are confused, don't think about what things are supposed to mean; just follow the types and see where they take you.

> data Crispy a = Snap a [a] a
>               | Crackle [[Crispy a]]
>               | Pop Integer deriving (Eq,Show)

> instance Functor Crispy where
>   fmap = undefined

> instance Foldable Crispy where
>   foldMap = undefined

> testCrispy :: Test
> testCrispy =
>   let c1, c2, c3, c4, c5 :: Crispy Integer
>       c1 = fmap (+1) (Snap 0 [1,2,3] 4)
>       c2 = Snap 700 [] 600
>       c3 = Pop 1234567890
>       c4 = Crackle [[c3, c1], [c3, c1]]
>       c5 = fmap (subtract 1) (Crackle [[c1, c2], [c1, c3]]) in
>   TestList [ 15 ~?= getSum (foldMap Sum c1)
>            , 1 ~?= getProduct (foldMap Product c3)
>            , "0123469959901234" ~?= foldMap show c5]

> -------------------------------------------------------------

Back to Sorting

In order to express an efficient merge sort in terms of foldMap, we need to design a data structure that represents a sequence of elements (just like a list), but whose Foldable instance uses a divide-and-conquer strategy, rather than the [] instance's linear fold pattern of recursion.

> newtype DivideList a = DivideList { getDivideList :: [a] } deriving (Eq, Show)

A DivideList is a Monoid. Implement its Monoid instance below.

> instance Monoid (DivideList a) where
>   mempty = undefined
>   mappend = undefined

And of course, the vital part: we need DivideLists to be Foldable, but in a different way. First, implement the divide function, which splits a DivideList in its middle, returning the result of the split.

> divide :: DivideList a -> (DivideList a, DivideList a)
> divide = undefined

> testDivide :: Test
> testDivide = TestList [ divide (DivideList "abcd") ~?=
>                        (DivideList "ab", DivideList "cd"),
>                       divide (DivideList "abcde") ~?=
>                        (DivideList "ab", DivideList "cde"),
>                       divide (DivideList "") ~?=
>                        (DivideList "", DivideList "") ]

Using this function, we can define the Foldable instance for DivideLists. Note that this definition is trickier than it seems. If you encounter an infinite loop, it means that you have not covered one of a particular set of slightly non-trivial edge cases.

> instance Foldable DivideList where
>   foldMap f xs =
>     case divide xs of
>       (DivideList as, DivideList bs) -> undefined

> testDivideList :: Test
> testDivideList =
>   let xs = DivideList [1,2,3]
>       ys = DivideList [] in
>   TestList [ Product 6 ~?= foldMap Product xs
>            , Sum 0     ~?= foldMap Sum ys
>            ]

Now that we know how general the foldMap function is, have a look at the implementation of sortedListSort' above -- does its input type need to only be a list? Generalize its type signature so that it outputs a list of sorted elements located inside an arbitrary Foldable structure.

> -- foldSort ::
> foldSort = undefined -- implementation should use foldMap

By parameterizing over any Foldable container, what we've done is to factor out the folding strategy into the choice of original container! To pick a different divide-and-conquer strategy, we need only specify a different container type, and give it a Foldable instance that folds along different creases.

So, while our sortedListSort was O(N ^ 2), we can produce a differently structured algorithm by instead folding over a DivideList instead:

> realMergeSort :: Ord a => [a] -> [a]
> realMergeSort = foldSort . DivideList

If you've done everything correctly, this main function should return rather quickly.

> main :: IO ()
> main = (print . last . realMergeSort) [100000,99999..0]

Concluding Thoughts About This Exercise

The important takeaway here is this: foldMap defines once and for all a universal "divide-and-conquer" algorithm -- all we need to do to use it is to provide a way to "divide" an input container (i.e. give a Foldable instance), then give a way to compute on those elements (i.e. the mapped function a -> m) and a way to combine ("conquer") the results of that computation (i.e. a Monoid instance for the result type).

Almost any divide-and-conquer algorithm can be fit into this framework, and that means we can avoid repeating ourselves when writing such programs. We can reuse the division strategy of DivideList when writing some other algorithm, and likewise for the sorted-merging combination strategy of SortedList.