What inputs would cause this function to not terminate?

I am trying to prove this function in ACL2s/Lisp, but it is returning a stack overflow error, though I can't see the flaw in the code.

``````(defunc foo (x y)
:input-contract (and (natp x) (natp y))
:output-contract (natp (foo x y))
(cond ((equal 0 x) (+ y 1))
((equal 0 y) (foo (- x 1) 1))
(t (foo (- x 1) (foo x (+ y 1))))))
``````
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What values are you passing in for a stack overflow? – DavidC Dec 3 '13 at 0:16
I am not. ACL2s has an automatic theorem prover that does pass inputs into it but I can't see what they are, but one of them is causing a stack overflow so it rejects the function. – b33k3rz Dec 3 '13 at 0:19

Wouldn't any positive `x` and `y` cause this to overflow? Let's look at `(foo 1 1)`.

Neither `x` nor `y` is zero, so it gets to the `t` branch of the cond, and calls:

``````(foo 0
(foo 1 2))
``````

Ok, let's evaluate the inner `foo` call:

``````(foo 1 2)
``````

Similarly, it gets to the `t` branch of the cond, and calls:

``````(foo 0
(foo 1 3))
``````

Let's evaluate the inner `foo`:

``````(foo 1 3)
``````

You can see where this is going. The `t` branch calls:

``````(foo 0
(foo 1 4))
``````

And so forth. This will happen anytime both `x` and `y` are nonzero. Where did you get this code? What are you trying to do with it? Running it's also a good idea to see what overflows. In this case, you would get stack overflows with nearly every possible call.

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