Is this function really tail-recursive?

I read about recursion in Programming Interviews Exposed (3rd ed.) where they present the following recursive `factorial` function:

``````int factorial(int n){
if (n > 1) { /* Recursive case */
return factorial(n-1) * n;
} else {     /* Base case */
return 1;
}
}
``````

On the bottom of the same page (page 108) they talk about tail-recursive functions:

Note that when the value returned by the recursive call is itself immediately returned, as in the preceding definition for `factorial`, the function is tail-recursive.

But is this really the case here? The last call in the function is the `*` call, so won't this stack frame be preserved (if we don't take compiler optimization into account)? Is this really tail-recursive?

-
This function is indeed not tail-recursive. –  Cory Nelson Apr 20 at 1:44
The naive recursive implementation of factorial is the classic example of a recursive function that is not tail-recursive, often used to illustrate how to obtain tail-recursion by use of an accumulator ... I suggest that you get yourself a different book. –  Jim Balter Apr 20 at 2:25
You write "so won't this stack frame be preserved (if we don't take compiler optimization into account)" -- but compiler optimization is irrelevant for this function, because the stack frame cannot be eliminated ... precisely because the function isn't tail-recursive. A function that is tail-recursive, so the stack frame can be eliminated by an optimizing compiler, is given by Eric Jablow. The optimization isn't all that important for C C++, but is essential for functional language like F# and Haskell, where loops are normally implemented recursively. –  Jim Balter Apr 20 at 2:42
@JimBalter: So I take it that no compiler would optimize it to use an accumulator and thus make it tail-recursive? (Actually, that does sound a bit overreaching, now that I think about it…) –  beta Apr 20 at 3:12
I doubt it, as such a rewrite can be arbitrarily complex, depending on the function. –  Jim Balter Apr 20 at 3:31

No, it's not tail-recursive. The result being returned by `factorial(n-1)` still has to be multiplied by `n`, which requires that `factorial(n)` regain control (thus mandating that the call to `factorial(n-1)` be a call rather than a jump).

With that said, even if it were tail-recursive, the compiler still might not do TCO on it. Depends on the compiler and the optimizations that you ask it to do.

-
At least the book is correct when it says "Some compilers can perform tail call elimination ...". –  Jim Balter Apr 20 at 2:27
Right. So the book is simply wrong when stating that this function is tail-recursive. Thanks! –  beta Apr 20 at 3:10
The book is also misleading when it says that all recursive functions can be written iteratively. It's technically true, since you can always emulate recursion with a stack, but that isn't really an iterative form of the same function. Many recursive functions do not have straightforward iterative counterparts. –  Jim Balter Apr 20 at 3:35

You can rewrite it to be tail-recursive:

``````int factorial(int n){
return factorial2(n, 1);
}
int factorial2(int n, int accum) {
if (n < 1) {
return accum;
} else {
return factorial2(n - 1, accum * n);
}
}
``````
-

Quoting from this link: tail recursion using factorial as example

`````` factorial(n) {
if (n == 0) return 1;
return n * factorial(n - 1);

This definition is NOT tail-recursive since the recursive call to
factorial is not the last thing in the function
(its result has to be multiplied by n)
``````
-

`Tail Recursive` is a special case of recursion in which the last operation of the function is a recursive call. In a tail recursive function, there are no pending operations to be performed on return from a recursive call. The function you mentioned is not a tail recursive because there is a pending operation i.e multiplication to be performed on the return from a recursive call. In case you did this:

``````    int factorial(int n,int result)
{
if (n > 1)
{ /* Recursive case */
return factorial(n-1,n*result);
}
else
{     /* Base case */
return result;
}
}
``````

would be a tail recursive function. since it has no pending operation on return from a recursive call.

-