# Stack overflow during evaluation (looping recursion?). OCaml

I'm trying to write a function that accepts an int n and returns a list that runs down from n to 0.

This is what I have

``````let rec downFrom n =
let m = n+1 in
if m = 0 then
[]
else
(m-1) :: downFrom (m - 1);;
``````

The function compiles ok but when I test it with any int it gives me the error Stack overflow during evaluation (looping recursion?).

I know it's the local varible that gets in the way but I don't know another way to declare it. Thank you!!!

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First, the real thing wrong with your program is that you have an infinite loop. Why, because your inductive base case is 0, but you always stay at `n`! This is because you recurse on `m - 1` which is really `n + 1 - 1`

I'm surprised as to why this compiles, because it doesn't include the `rec` keyword, which is necessary on recursive functions. To avoid stack overflows in OCaml, you generally switch to a tail recursive style, such as follows:

``````let downFrom n =
let rec h n acc =
if n = 0 then List.rev acc else h (n-1) (n::acc)
in
h n []
``````

Someone suggested the following edit:

``````let downFrom n =
let rec h m acc =
if m > n then acc else h (m + 1) (m::acc)
in
h 0 [];
``````

This saves a call to List.rev, I agree.

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thank you! although i havent learn tail recursion, i changed the last statement to (m-1) :: downFrom (m - 2) and it worked – otchkcom Sep 19 '12 at 23:26
as a hint, I would (for better style) simply eliminate the definition of m, and instead replace it by n+1 everywhere, otherwise it looks awkward. – Kristopher Micinski Sep 20 '12 at 0:59
I have corrected a few typos to have your version of `downFrom` compile. But still, it returns an increasing list, while the OP asks for a decreasing list. – jrouquie Sep 20 '12 at 6:21
@jrouquie yup, I forgot the rev, a common thing when you have tail recursion.. – Kristopher Micinski Sep 20 '12 at 7:07

The key with recursion is that the recursive call has to be a smaller version of the problem. Your recursive call doesn't create a smaller version of the problem. It just repeats the same problem.

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You can try with a filtering parameter syntax:

``````let f = function
p1 -> expr1
| p2 -> expr2
| p3 -> ...;;
``````

``````let rec n_to_one =function
0->[]
|n->n::n_to_one (n-1);;

# n_to_one 3;;
- : int list = [3; 2; 1]
``````
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