# Why does ECL can calculate factorial (1000)?

It is awesome that ECL can calculate fac(1000) ! How can ECL do it ?

`````` >(defun fac (n) (if (= n 1) 1 (* n (fac (- n 1)))))
>(disassemble #'fac)
#(FAC N = - * #<bytecompiled-function FAC> SI:FSET)
Name:           FAC
0    POP     REQ
1    BIND    N
3    NOMORE
4    PUSHV   0
6    PUSH    1
8    CALLG   2,=
11    JNIL    18
13    QUOTE   1
15    SET     VALUES(0),REG0
16    JMP     35
18    PUSHV   0
20    PUSHV   0
22    PUSH    1
24    CALLG   2,-
27    PUSH    VALUES(0)
28    CALLG   1,FAC
31    PUSH    VALUES(0)
32    CALLG   2,*
35    EXIT
``````

I know few about ECL bytecode. It seems there is no tail recursive optimization. Can any expert explain it ?

Sincerely!

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This is the byte code, but probably the interpreter can do the optimization? And 1000 level of stack is not really a problem - the interpreter implementation should take care of this case already (if it really does recursion for this case). –  nhahtdh Sep 19 '12 at 1:22
1000 is indeed not a problem. `(defun fac (n) (reduce #'* (loop for i from 1 to n collect i)))` even calculate (fac 30000) or more. Wonderful (E)CL, thanks! –  z_axis Sep 19 '12 at 2:17
If the interpreter really keeps a stack, it will be implemented as data structure to function like a stack so it can go arbitrarily many levels of stack (not sure about the internal implementation, but it may impose a limit, or the limit is the limit of the system). –  nhahtdh Sep 19 '12 at 7:13
I don't see any tail recursion in the function (`#'*` is in the tail position), so tail call optimisation isn't relevant. –  Frank Shearar Sep 19 '12 at 9:50

I don't know anything about ECL, but what I see from the source code you compiled and then later in dis-assembly, the compiler did its work properly. The function is defined as a recursive call to itself. The same I see in the dis-assembly. Thus, the only problems that may arise during call to this function is a stack overflow and arithmetic overflow.

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Overflow occurs using newlisp to calculate fac(30), so what i really want to know is how (E)CL can do it without overflow. –  z_axis Sep 19 '12 at 2:20
btw, does it print out all 2568 digits of the result? –  Serge Sep 19 '12 at 2:40
@z_axis Automatic promotion from fixnum to bignum, as the reult overflows the size of a fixnum. Relatively simple, in principle (but getting bignum math to be fast can be a bit tricky). –  Vatine Sep 19 '12 at 9:17
It print out all digits. –  z_axis Sep 19 '12 at 11:40