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I heard that in Haskell we can use MonadFix to access a value that will be evaluated in the future. But I think Monads are just syntactic sugar so there should be similar thing that can be implemented in pure functions. So I tried the following:

timemachine :: [a] -> (a -> Int -> b -> b) -> b -> b
timemachine al f b = result where
    ~(total, result) = foldr app (0,b) al
    app a (i,b1) = (i+1, f a (total - i) b1)

main :: IO ()
main = print $ timemachine "ddfdfeef" (\x i y -> (x,i):y) []

But the output is not expected:

[('d',1),('d',2),('f',3),('d',4),('f',5),('e',6),('e',7),('f',8)]

Ideally the result should be

[('d',8),('d',7),('f',6),('d',5),('f',4),('e',3),('e',2),('f',1)]

Am I did something wrong?

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Why do you expect that result? Where does the laziness(?) come from your code? –  Xiao Jia Sep 24 '13 at 6:37
    
Well my implementation may completely wrong but are there any right way to get the expected result? The point is that I need to access a value from the future - in the above example, the length of the list. –  Earth Engine Sep 24 '13 at 6:45
    
If I understand you properly, you're asking for a desugared version of some code using MonadFix. It seems only fair that you gave us the original one. :-) –  JB. Sep 24 '13 at 6:58

1 Answer 1

up vote 9 down vote accepted

Skipping the part about MonadFix, it seems you want to use a value that at least partially needs itself to be constructed (total being based on the fold which in turn is based on total).

You're actually already doing that, only you're expectations don't line up with your folding! To see the problem you can change timemachine to

timemachine al f b = result where
   ~(total, result) = foldr app (0,b) al
   app a (i,b1) = (i+1, f a i b1)

which yields

[('d',7),('d',6),('f',5),('d',4),('f',3),('e',2),('e',1),('f',0)]

So total-i is working, it's just your accumulating is that are not what you want.

Now, why? Well, you use a foldr which works out to something like:

app 'd' (app 'd' (app 'f' ... (app 'f' (0,b)))))))))

So the counting that app is doing is being worked from the right of the list. if we instead change it to a foldl which works the list from the other side, and change some of the rest of the code to line up with it:

timemachine :: [a] -> (a -> Int -> b -> b) -> b -> b
timemachine al f b = result where
  ~(total, result) = foldl app (0,b) al
  app (i,b1) a = (i+1, f a (total-i) b1)

main :: IO ()
main = print $ timemachine "ddfdfeef" (\x i y -> y++[(x,i)]) []

You get what you wanted:

[('d',8),('d',7),('f',6),('d',5),('f',4),('e',3),('e',2),('f',1)]
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Good answer, you solved the problem! –  Earth Engine Sep 24 '13 at 10:26
    
Shall I use foldl' instead? I heard that foldl is to be avoided. –  Earth Engine Sep 26 '13 at 6:28
1  
Usually using foldl' is preferred to foldl since it's strict in it's accumulator, and when you fold to the left you're normally not interested in laziness. In this case however, there are two issues with that: 1. Our accumulator is a pair, and seq (used by fold') only evaluates to HNF, which app already does, so there's no strictness gain there. 2. We ARE interested in laziness, it's what makes this work. If we would fold with something like deepseq, it'd try to evaluate the resulting list all too early, and it wouldn't finish. –  ollanta Sep 30 '13 at 8:44
    
@EarthEngine excuse the poor formatting of that answer, I didn't know about the 5-min comment edit window. I hope it still clear enough to answer your question! –  ollanta Sep 30 '13 at 8:54

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