# Haskell: repeat a function a large number of times without stackoverflow

As a newbie to Haskell I am trying to iterate a function (e.g., the logistic map) a large number of times. In an imperative language this would be a simple loop, however in Haskell I end up with stack overflow. Take for example this code:

``````main  = print \$ iter 1000000

f x = 4.0*x*(1.0-x)

iter :: Int -> Double
iter 0 = 0.3
iter n = f \$ iter (n-1)
``````

For a small number of iterations the code works, but for a million iterations I get a stack space overflow:

``````Stack space overflow: current size 8388608 bytes.
Use `+RTS -Ksize -RTS' to increase it.
``````

I cannot understand why this does happen. The tail recursion should be fine here. Maybe the problem is lazy evaluation. I experimented with several ways to force strict evaluation, by inserting `\$!` or `seq` at various positions, but with no success.

What would be the Haskell way to iterate a function a huge number of times?

I have tried suggestions from related posts: here or here, but I always ended up with stackoverflow for a large number of iterations, e.g., `main = print \$ iterate f 0.3 !! 1000000`.

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the problem is that you don't have a tail recursion since you are not returning directly `iter (n-1)` –  Simon Jan 18 '12 at 12:32
It is funny that people just don't get what tail recursion is. FYI, this definition is wrong: "when the name of the function we're just in appears on the last line of that function". –  Ingo Jan 18 '12 at 14:33

The problem is that your definition

``````iter :: Int -> Double
iter 0 = 0.3
iter n = f \$ iter (n-1)
``````

tries to evaluate in the wrong direction. Unfolding it for a few steps, we obtain

``````iter n = f (iter (n-1))
= f (f (iter (n-2)))
= f (f (f (iter (n-3))))
...
``````

and the entire call stack from `iter 1000000` to `iter 0` has to be built before anything can be evaluated. It would be the same in a strict language. You have to organise it so that part of the evaluation can take place before recurring. The usual way is to have an accumulation parameter, like

``````iter n = go n 0.3
where
go 0 x = x
go k x = go (k-1) (f x)
``````

Then adding strictness annotations - in case the compiler doesn't already add them - will make it run smoothly without consuming stack.

The `iterate` variant has the same problem as your `iter`, only the call stack is built inside-out rather than outside-in as for yours. But since `iterate` builds its call-stack inside-out, a stricter version of `iterate` (or a consumption pattern where earlier iterations are forced before) solves the problem,

``````iterate' :: (a -> a) -> a -> [a]
iterate' f x = x `seq` (x : iterate' f (f x))
``````

calculates `iterate' f 0.3 !! 1000000` without problem.

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In other words, the original definition of `iter` isn't tail-recursive. –  John L Jan 18 '12 at 12:33
which makes this a great time to learn about folds! `iter n = foldl' (\acc f -> f acc) 0.3 (replicate n f)` –  rampion Jan 18 '12 at 12:36
@JohnL Right, but tail recursion isn't the important thing in Haskell, on the one hand, due to laziness/nonstrictness, tail recursive functions can still cause stack overflows by building large thunks, so one has to ensure the right amount of strictness/eagerness too. On the other hand, non-tail-recursion has no stack overflow problems if the recursive call is in the right place, e.g. a lazy constructor field (guarded recursion is the important concept here). –  Daniel Fischer Jan 18 '12 at 12:50
The last line should be `iterate' f 0.3 !! 1000000` –  wenlong Jan 18 '12 at 13:54
@wenlong Thanks, fixed. –  Daniel Fischer Jan 18 '12 at 13:56