Announcing Stack Overflow Documentation

We started with Q&A. Technical documentation is next, and we need your help.

Whether you're a beginner or an experienced developer, you can contribute.

Sign up and start helping → Learn more about Documentation →

I am learning Lisp from the book "The Land of Lisp" by Conrad Barski. Now I have hit my first stumbling block, where the author says:

Calling yourself in this way is not only allowed in Lisp, but is often strongly encouraged

after showing the following example function to count the items in a list:

(defun my-length (list)
  (if list
    (1+ (my-length (cdr list)))

When I call this function my-length with a list containing a million items, I get a stack overflow error. So either you never expect to have a list that long in Lisp (so maybe my use case is useless) or there is another way to count items in such a long list. Can you maybe shine some light on this? (I am using GNU CLISP on Windows, by the way).

share|improve this question
up vote 6 down vote accepted

Creating recursive functions to operate on recursive datastructures is indeed good for in lisp. And a list (in lisp) is defined as a recursive datastructure, so you should be ok.

However, as you have experienced, if traversing a datastructure a million items deep using recursion, will also allocate a million frames on the stack, and you can expect a stack overflow unless you specifically ask your runtime environment to allocate huge amount of stack-space (I have no idea if or how you could do this in gnu clisp...).

First of all, I think this shows that the list-datastructure isn't really a the best for everything, and in this case another structure might be better (however, you might not have come to vectors in your lisp-book yet ;-)

Another thing is that for large recursions such as this to be effective, the compiler should optimise tail recursions and convert them into iterations. I don't know if clisp has this functionality, but you would need to change your function to actually be optimisable. (If "tail recursion optimisation" makes noe sense, please let me know and I can dig up some references)

For other ways of iterating, take a look at:

Or other datastructures:

share|improve this answer
Cool, thanks a lot. Take away for me: 1) lists are not the best for everything, 2) there are other data structures to look at. I would love to learn more about tail recursion optimization, but maybe at a later stage, when I have conquered the basics ;-) Thanks! – mydoghasworms Mar 7 '13 at 11:15

TCO in CLISP using the example from Chris Taylor:

[1]> (defun helper (acc list)
  (if list
    (helper (1+ acc) (cdr list))

(defun my-length (list)
    (helper 0 list))


Now compile it:

[2]> (compile 'helper)
[3]> (my-length (loop repeat 100000 collect t))

*** - Program stack overflow. RESET

Now, above does not work. Let's set the debug level low. This allows the compiler to do TCO.

[4]> (proclaim '(optimize (debug 1))

Compile again.

[5]> (compile 'helper)
[6]> (my-length (loop repeat 100000 collect t))


Allowing the Common Lisp compiler to do TCO is most often controlled by the debug level. With a high debug level, the compiler generates code which uses a stack frame for each function call. This way each call can be traced and will be seen in a backtrace. With a lower debug level the compiler may replace tail calls with jumps in the compiled code. These calls then will not be seen in a backtrace - which usually makes debugging harder.

share|improve this answer
I am just wondering why this is not accepted as the correct answer. Just great piece if info, thanks. – Rorschach Mar 25 '14 at 11:44
With the help of this I calculated the factorial of 100,000. – Rorschach Mar 25 '14 at 11:54

You're looking for tail recursion. At the moment your function is defined like

(defun my-length (list)
  (if list
    (1+ (my-length (cdr list)))

Notice that after my-length has called itself, it needs to add one to the result before passing that value to its calling function. This need to modify the value before returning it means that you need to allocate a new stack frame for every call, the the space used is proportional to the length of the list. This is what causes a stack overflow on long lists.

You can re-write it to use a helper function

(defun helper (acc list)
  (if list
    (helper (1+ acc) (cdr list))

(defun my-length (list)
    (helper 0 list))

The helper function takes two parameters, an accumulation parameter acc, which stores the length of the list so far, and a list list which is the list we're computing the length of.

The important point is that helper is written tail recursively, which means that calling itself is the last thing it does. This means you don't need to allocate a new stack frame every time the function calls itself - since the final result will just be passed all the way back up the chain of stack frames anyway, you can get away with overwriting the old stack frame with a new one, so your recursive function can operate in constant space.

This form of program transformation - from a recursive (but non-tail-recursive) definition to an equivalent definition using a tail-recursive helper function is an important idiom in functional programming - one that it's worth spending a bit of time understanding.

share|improve this answer
Thanks, you have shown what Rolf hinted at in his answer, but even with this code (on GNU Clisp), I still get a stack overflow. – mydoghasworms Mar 7 '13 at 11:17
Interesting. Do you have another common lisp implementation you can try it on? This page on tail call optimization in common lisp implementations isn't clear on whether tail-call optimization is performed in GNU Clisp. – Chris Taylor Mar 7 '13 at 11:29
I just tried in Steel Bank Common Lisp, and that works. – mydoghasworms Mar 7 '13 at 11:34
there might be an optimisation-level that enables optimising of tail-recursion in clisp, but google didn't return any authorative documentaion on how this works in clisp. – Rolf Rander Mar 7 '13 at 11:42
Thank you for the nice and simple example of tail call optimization. I've heard this term used frequently, but never got around to understanding it till now. This example is so simple and clear, it deserves to be on the Wikipedia page for tall call optimization, imo. – Faheem Mitha Mar 10 '13 at 21:15
(DEFUN nrelem(l) 
    (if (null l)
       (+ (nrelem (rest l)) 1)
share|improve this answer

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.