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've written Collatz conjecture in Scheme:

(define C
  (lambda (n)
     ((eq? n 1) 1)
     ((even? n) (C (/ n 2)))
     (else (C (+ (* n 3) 1))))))

This is a tail recursive call, yet I get stack overflow when I call (C 121):

guile> (trace C)
guile> (C 121)
[C 121]
[C 364]
[C 182]
[C 91]
[C 274]
[C 137]
[C 412]
[C 206]
[C 103]
[C 310]
[C 155]
[C 466]
[C 233]
[C 700]
[C 350]
[C 175]
[C 526]
[C 263]
[C 790]
[C 395]
[C 1186]
ERROR: Stack overflow
ABORT: (stack-overflow)

Why is proper tail recursion causing an overflow? As you can see, I'm using Guile as a Scheme interpreter (version 1.8.7).

share|improve this question
What happens when you do not trace the function call? What happens when you use another scheme system? –  knivil Mar 16 '12 at 8:29
Disabling trace doesn't help. Racket does fine with the given example. –  Jan Stolarek Mar 16 '12 at 8:32
This might be a bug: that definition looks tail-recursive. (Most tracing libraries will destroy the tail-recursiveness, though.) –  Eli Barzilay Mar 16 '12 at 10:19
I tried this on ubuntu and it seems to be working fine. Which OS you are using? –  Ankur Mar 16 '12 at 12:12
This is on openSUSE 11.3, but I think this may be fault of older version of Guile (2.x versions are available, but not for my system). Anyway, if this definition is correct that everything is OK, I was afraid I misunderstood something about tail recursion. –  Jan Stolarek Mar 17 '12 at 9:49
show 4 more comments

2 Answers

up vote 2 down vote accepted

The procedure as defined works fine in Racket. It seems like a bug to me, or something very specific to your environment.

Almost certainly not related to your problem, but a bit of nit-picking: use the comparison (= n 1) for numbers instead of (eq? n 1).

share|improve this answer
add comment
(define C
  (lambda (n)
     ((eq? n 1) 1)
     ((even? n) (C (/ n 2)))
     (else (C (+ (* n 3) 1))))))

This looks like it always returns 1 (or loops infinitely -- the conjecture remains unproven). Is there a transcription error hiding a (+1 ...) around the recursive calls?

share|improve this answer
add comment

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.