Are the functions filter, map, foldr in Prelude library?
Did you know Hoogle tells you which module a function is from? Hoolging map results in this information on the search page:
map :: (a -> b) -> [a] -> [b]
base Prelude, base Data.List
This means map is defined both in
Prelude and in
Data.List. You can hoogle the other functions and likewise see that they are indeed in Prelude.
You can also look at Haskell 2010 > Standard Prelude or the Prelude hackage docs.
So we are allowed to
foldr, as well as anything else in Prelude. That's good. Let's start with Landei's idea, to turn the list into a list of lists.
groupSorted :: [a] -> [[a]]
groupSorted = undefined
-- groupSorted [1,1,2,2,3,3] ==> [[1,1],[2,2],[3,3]]
How are we supposed to implement
groupSorted? Well, I dunno. Let's think about that later. Pretend that we've implemented it. How would we use it to get the correct solution? I'm assuming it is OK to choose just one correct solution, in the event that there is more than one (as in your second example).
mode :: [a] -> a
mode xs = doSomething (groupSorted xs)
where doSomething :: [[a]] -> a
doSomething = undefined
-- doSomething [,,[3,3]] ==> 3
-- mode [1,2,3,3] ==> 3
We need to do something after we use
groupSorted on the list. But what? Well...we should find the longest list in the list of lists. Right? That would tell us which element appears the most in the original list. Then, once we find the longest sublist, we want to return the element inside it.
chooseLongest :: [[a]] -> a
chooseLongest xs = head $ chooseBy (\ys -> length ys) xs
where chooseBy :: ([a] -> b) -> [[a]] -> a
chooseBy f zs = undefined
-- chooseBy length [,,[3,3]] ==> [3,3]
-- chooseLongest [,,[3,3]] ==> 3
chooseLongest is the
doSomething from before. The idea is that we want to choose the best list in the list of lists
xs, and then take one of its elements (its
head does just fine). I defined this by creating a more general function,
chooseBy, which uses a function (in this case, we use the
length function) to determine which choice is best.
Now we're at the "hard" part. Folds.
groupSorted are both folds. I'll step you through
groupSorted, and leave
chooseBy up to you.
How to write your own folds
groupSorted is a fold, because it consumes the entire list, and produces something entirely new.
groupSorted :: [Int] -> [[Int]]
groupSorted xs = foldr step start xs
where step :: Int -> [[Int]] -> [[Int]]
step = undefined
start :: [[Int]]
start = undefined
We need to choose an initial value,
start, and a stepping function
step. We know their types because the type of
(a -> b -> b) -> b -> [a] -> b, and in this case,
[Int], which lines up with
[a]), and the
b we want to end up with is
Now remember, the stepping function will inspect the elements of the list, one by one, and use
step to fuse them into an accumulator. I will call the currently inspected element
v, and the accumulator
step v acc = undefined
Remember, in theory,
foldr works its way from right to left. So suppose we have the list
[1,2,3,3]. Let's step through the algorithm, starting with the rightmost
3 and working our way left.
step 3 start = []
start is, when we combine it with
3 it should end up as
[]. We know this because if the original input list to
groupSorted were simply
, then we would want
[] as a result. However, it isn't just
. Let's pretend now that it's just
[] is the new accumulator, and the result we would want is
step 3 [] = [[3,3]]
What should we do with these inputs? Well, we should tack the
3 onto that inner list. But what about the next step?
step 2 [[3,3]] = [,[3,3]]
In this case, we should create a new list with 2 in it.
step 1 [,[3,3]] = [,,[3,3]]
Just like last time, in this case we should create a new list with 1 inside of it.
At this point we have traversed the entire input list, and have our final result. So how do we define
step? There appear to be two cases, depending on a comparison between
step v acc@((x:xs):xss) | v == x = (v:x:xs) : xss
| otherwise = [v] : acc
In one case,
v is the same as the head of the first sublist in
acc. In that case we prepend
v to that same sublist. But if such is not the case, then we put
v in its own list and prepend that to
acc. So what should
start be? Well, it needs special treatment; let's just use
 and add a special pattern match for it.
step elem  = [[elem]]
start = 
And there you have it. All you have to do to write your on fold is determine what
step are, and you're done. With some cleanup and eta reduction:
groupSorted = foldr step 
where step v  = [[v]]
step v acc@((x:xs):xss)
| v == x = (v:x:xs) : xss
| otherwise = [v] : acc
This may not be the most efficient solution, but it works, and if you later need to optimize, you at least have an idea of how this function works.