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My problem is to turn this:

 iSort :: Ord a => [a] -> [a]
 iSort [] = []
 iSort (x:xs) = ins x (iSort xs)

 ins x [] = [x]
 ins x (y:ys)
   | x <= y    = x : y : ys
   | otherwise = y : ins x ys

Into a solution that keeps track of the number of times it makes a comparison, here a skeleton of the code I need to produce:

 iSortCount :: Ord a => [a] -> (Integer, [a])
 iSortCount [] = ...
 iSortCount (x:xs) = ...

 insCount x (k, [])     = ... 
 insCount x (k, (y:ys)) -- Count the times when it reach's here     
   | x <= y    =  ...
   | otherwise = ...
   where ... 

I've tried a lot of things from using lets, wheres, writer monad, making my own type, the state monad, and I seem to just be over looking something because I keep running into the problem with "y : ins x ys" because what that function returns should be (Int, [a]) and : does not work on a tuple. I tried to split it up to do something like this

(a,b) <- ins x (k+1, ys)
return (k, (y : b))

but it seems to not think that ins returns a tuple when it did in that version so it just wasn't pattern matching on it i guess. My main question is where I should look now? I worked on this for a long time and this problem is starting to frustrate me cause it look so easy...

Answer with Ezra help:

iSort' [] = []
iSort' (x:xs) = ins' x (iSort' xs)

ins' x [] = [x]
ins' (x,i) (y:ys)
    | x <= fst y = (x,i+1) : y : ys
    | otherwise  =     y : ins' (x,i+1) ys

countInsertions x = sum $ map snd $ iSort' $ zip x $ repeat 0 
share|improve this question
An MVar springs to mind, but that seems like a kludge. I'm curious what others will say. – Tim Perry Mar 7 '11 at 19:38
Can't you just write a function cmp x y = {-# SCC "cmp" #-} (x <= y), use cmp instead of <= and ghc's profiling? Or do you actually need the number of comparisons available in the program instead of just as a result of analysis? – Thomas M. DuBuisson Mar 7 '11 at 19:58
up vote 2 down vote accepted

Another approach would to just add an accumulator to the solution that you already have:

iSort' [] = []
iSort' (x:xs) = ins' x (iSort' xs)

ins' x [] = [x]
ins' (x,i) (y:ys)
    | x <= fst y = (x,i) : y : ys
    | otherwise  =     y : ins' (x,i+1) ys

countInsertions x = sum $ map snd $ iSort' $ zip x $ repeat 1 

This solution has the benefit of being familiar. I just replaced each item in the list with a tuple representing the item and the number of times it's been shuffled. They're initialized to 1 because I count everything as having been shuffled at least once.

The sort routine is largely the same, but a "setup" function is now needed, so you won't want to provide the list of tuples, but the list of items. Since it's the second item in the tuple, we need snd, and since we want the total we use sum.

share|improve this answer
I also tried something similar to this but didn't think about making the counter with x. Plus you did it with out monads which is what I was trying to do before converting it into a monadic function. Thank you for your response. – Lokk Mar 7 '11 at 22:12
I had to do a little change to your code to produce what I was aiming for but its a small change. I needed to make it count the number of times it made a comparison so [1,2,3,4,5] would be 4. 1 checks 2, 2 check 3 etc. So heres the update and thanks for your answer. "Edit" Put answer in my original post because comments dont let code indention. Hopefully Ill reach a monadic answer soon. – Lokk Mar 7 '11 at 22:40

Conversion of pure code to monadic code can be tricky, hopefully these tips can give you the right idea:

  • Pick a monad. You could also use writer on the Sum monoid, but you may find the state-based code more straight-forward.

  • Consider all of the expressions in your code: which expressions could cause the state variable to increment? ins makes a comparison, but more subtly, because the recursive call to iSort could call ins, it also one of these expressions you'll have to keep in mind.

  • Remember that the idea behind a monad is to hide the plumbing of passing the count behind the scenes. So the wrapped return types of your functions don’t change; they just grow a monadic skin which you can use >>= to get them out.

  • Recall all of the expressions that could cause the state variable to increment: those are your monadic calls. Rewrite them into tempVar <- ins foo form inside a do-block, and replace the old locations with the temporary variables you allocated.

  • Use your monad! Float your guard into an inner case statement, and before performing the case-match, increment the state variable.

And that should do it!

There's also an evil way to do it, which involves unsafePerformIO.

share|improve this answer
Thank you very, this will be very helpful! – Lokk Mar 7 '11 at 22:10

This looks like the perfect job for the writer monad. See

share|improve this answer
That was my first thought too, but I was just having problems with incrementing the log (the count), I was trying to use tell in a do notation, "tell (+1)" but Im pretty sure I miss read or understood how to use tell. It seemed tell effected the log but since on learnyouahaskell it usually only has the log as a [String] – Lokk Mar 7 '11 at 20:02
Int does not have a monoid defined for it; you'll have to use "Sum Int" instead. Fortunately, as long as you arrange your types correctly, tell 1 will do what you want! (Because Sum has a Num instance). – Edward Z. Yang Mar 7 '11 at 20:05

Try this one:

import Control.Monad.State

type Counter = State Int

incr :: Counter ()
incr = modify (+1)

ins :: Ord a => a -> [a] -> Counter a
ins x [] = return [x]
ins x (y:ys)
  | x <= y    = incr >> return $ x : y : ys
  | otherwise = incr >> ins x ys >>= (y :)

iSort :: Ord a => [a] -> Counter [a]
iSort [] = return []
iSort (x:xs) = iSort xs >>= ins x

cSort :: Ord a => [a] -> ([a],Int)
cSort = flip runState 0

But please notice, that this is rather inefficient.

share|improve this answer
Not quite correct: if he's counting comparisons the otherwise case of ins should also increment. – Edward Z. Yang Mar 7 '11 at 20:01
@Edward Z. Yang Yes. Actually it should. But how about the case in iSort, it's also a comparison, thus worth mentioning. – FUZxxl Mar 7 '11 at 20:05
Mmm, I don't think so: pattern-matching on a cons-cell is different from calling <=, the latter of which is what I think is being counted. – Edward Z. Yang Mar 7 '11 at 20:08

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