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I've written Collatz conjecture in Scheme:

(define C
  (lambda (n)
    (cond
     ((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)
(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).

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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
7  
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
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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).

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(define C
  (lambda (n)
    (cond
     ((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?

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