Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I wanted to transform the folowing genEdges function in a tail recursive one.

genEdges :: Int -> Node -> IO [Edge]
genEdges n origin | n == 0 = return []
                  | otherwise =  do
                      edge <- genRandEdge origin
                      edges <- genEdges (n-1) (snd edge)
                      return $ edge : edges

I mean, the last line should be something like

return $ edge : genEdges (n-1) (snd edge)

although I know that the types of edge and genEdges (n-1) (snd edge) are different and hence this example line is incorrect.

Is that possible? If so, how should be the function? If not, why?

share|improve this question
Tail recursion is a red herring in Haskell anyway, because its evaluation model is so different from traditional languages. –  Daniel Wagner Sep 27 '13 at 18:05

3 Answers 3

up vote 2 down vote accepted

It's impossible. Your tail call is really

(genRange origin) >>= (\edge -> .....)

and hence it is not recursive.

----------- Edit for updated question -----------------

Generally, if you have something like

  a <- foo

you can't make something tail recursive out of it. This is because this gets desugared to

foo >>= (\a -> bar)

so (>>=) (or (>>)) is the tail call.

share|improve this answer
So the question changes to: is that possible to do a tail recursion edge : genEdges (n-1) (snd edge) and not use return? Because I'd like to have a [Edge], not a IO [Edge], but my Edges are "trapped" inside an IO monad since I'm working with random numbers (System.Random functions such as getStdRandom and randomR). –  Guiraldelli Sep 27 '13 at 13:35
You shouldn't be trapped in the IO monad in first place, there are better approaches. –  nponeccop Sep 27 '13 at 15:23
One minor quibble; it's not really impossible. The "solution" isn't generally advised, and there are definitely better approaches, but it does exist. –  John L Sep 28 '13 at 2:33
@JohnL If you mean to say that one can have a non-trivial and terminating tail recursive function with IO type, I ask you kindly to post an answer and tell us how. I'd surely upvote. –  Ingo Sep 28 '13 at 11:12
@Ingo: no, that's not what I meant. What I meant was that the OP could add a single function call and have exactly the desired code with good performance characteristics for the Haskell evaluation model. I don't think you'd upvote, it's a function with Interleave in the name... –  John L Sep 28 '13 at 21:08


Looking at Ingo's answer he is right, you'd probably have to pass the generator into the function then you can use a pure function to get the next random number and pass the gen that it produces to the next recursive function call.


You can make a helper function that has an accumulator so like this. I don't have a compiler so I can't guaranteed it is exactly correct.

genEdges :: Int -> Node -> IO [Edge]
genEdges n o = genEdgesTR n o []
    where genEdgesRec n origin acc
          | n == 0  = return acc
          | otherwise   = do
            edge <- get RandEdge orgin
            genEdgesRec (n-1) (snd edge) (edge : acc)

This could probably be written with foldM or something but that is up to you to figure out.

share|improve this answer
You also need to reverse the resulting list in the end. –  Mikhail Glushenkov Sep 27 '13 at 18:04

If you end up using IO or other monad/monad transformer such as RandT (other options are passing generators and/or pregenerated infinite lists around), here is an example of using the state monad transformer to help with threading of origin:

import Control.Monad.State

data Node = Node
type Edge = ((), Node)

genRandEdge :: Node -> IO Edge
genRandEdge = undefined

genEdges :: Int -> Node -> IO [Edge]
genEdges n = evalStateT $ replicateM n $ do
        origin <- get
        edge <- liftIO $ genRandEdge origin
        put $ snd edge
        return edge

To help you with better genRandEdge to avoid IO we need more context so feel free to ask another question on how your generation approach can be improved.

share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.