The Wikipedia article on Continuation says:
"In any language which supports closures, it is possible to write programs in continuation passing style and manually implement call/cc."
Either that is true and I need to know how to do it or it is not true and that statement needs to be corrected.
If this is true, please show me how to implement call/cc in Lua because I can't see how.
I think I'd be able to implement call/cc manually if Lua had the coroutine.clone function as explained here.
If closures are not enough to implement call/cc then what else is needed?
The text below is optional reading.
P.S.: Lua has one-shot continuations with its coroutine table. A coroutine.clone function would allow me to clone it to call it multiple times, thus effectively making call/cc possible (unless I misunderstand call/cc). However that cloning function doesn't exist in Lua. Someone on the Lua IRC channel suggested that I use the Pluto library (it implements serialization) to marshal a coroutine, copy it and then unmarshal it and use it again. While that would probably work, I am more interested in the theoretical implementation of call/cc and in finding what is the actual minimum set of features that a language needs to have in order to allow for its manual implementation.
EDIT 1: Ok people, help me out here, this took me a long time because I don't know any Scheme, but I came up with something that should help us out. Please look at the codes below. The first one is a program in Scheme, the second one is the same program but in Lua.
Hopefully this will help us out. I believe we are very close.
P.S.: These examples are taken from the first example on the Wikipedia article on CallCC. Scheme version
(define call/cc call-with-current-continuation) ; callcc CPS-transformed (thanks to the people from the #scheme channel at freenode.net) (define cpscallcc (lambda (consumer k) (let ((cc (lambda (result) (k result)))) (consumer cc k)))) ; this is the continuation we will use to display the "returned" values (define main-continuation (lambda (result) (display "--> ") (display result) (newline))) ; define f function non-CPS (define (f return) (return 2) 3) ; these are my past attempts at defining a CPS f function ;(define (cps-f return k) ; (k (return 2)) 3) ;(define (cps-f return k) ; (k (lambda () ; (return 2) ; 3))) ; this is what I came up with - I'm not sure if this is correctly CPS-transformed but I believe so (define (cps-f return k) (return 2) (k 3)) ; call the non-CPS f function (display (f (lambda (x) x))) ; displays 3 (newline) ; call the non-CPS f function with call/cc (I don't understand what this does) (display (call/cc f)) ; displays 2 (newline) ; now call the CPS version of the f function (cps-f (lambda (x) x) main-continuation) ; displays --> 3 ; now call the CPS version of the f function with the CPS version of call/cc (cpscallcc cps-f main-continuation) ; displays --> 2 but then it also displays --> 3 afterwards -> I'm not sure why it displays the 3 afterwards, as it should only display the 2 just like the non-CPS versions above
-- callcc CPS-version cpscallcc = function(consumer, k) local cc = function(result) return k(result) -- ?or k(result) end return consumer(cc, k) -- ?or return consumer(cc,k) end -- define f function non-CPS f = function(ret) ret(2) return 3 end -- define f function CPS-version (again, not sure this is correct) cps_f = function(ret, k) ret(2) k(3) end -- call the non-CPS f function print(f(function(x) return x end)) -- we cant call the non-CPS f function with callcc because -- Lua doesnt have callcc, but the line below displays the correct expected output (maybe by accident) --cpscallcc(f, print) -- now call the CPS version of the f function cps_f( function(x) return x end, print ) -- displays 3 ; now call the CPS version of the f function with the CPS version of call/cc cpscallcc( cps_f, print) -- displays 2 and then 3 just like the Scheme version!! -- so apparently the translation from Scheme to Lua is correct...
I'm using DrScheme and Lua for Windows - for anyone that wants to help up out those are two easy to download and install tools that just work.