Since you've tagged this with Haskell, I'll answer in that regard: In Haskell, the equivalent of doing a CPS transform is working in the
Cont monad, which transforms a value
x into a higher-order function that takes one argument and applies it to
So, to start with, here's 1 + 2 in regular Haskell:
(1 + 2) And here it is in the continuation monad:
contAdd x y = do x' <- x
y' <- y
return $ x' + y'
...not terribly informative. To see what's going on, let's disassemble the monad. First, removing the
contAdd x y = x >>= (\x' -> y >>= (\y' -> return $ x' + y'))
return function lifts a value into the monad, and in this case is implemented as
\x k -> k x, or using an infix operator section as
\x -> ($ x).
contAdd x y = x >>= (\x' -> y >>= (\y' -> ($ x' + y')))
(>>=) operator (read "bind") chains together computations in the monad, and in this case is implemented as
\m f k -> m (\x -> f x k). Changing the bind function to prefix form and substituting in the lambda, plus some renaming for clarity:
contAdd x y = (\m1 f1 k1 -> m1 (\a1 -> f1 a1 k1)) x (\x' -> (\m2 f2 k2 -> m2 (\a2 -> f2 a2 k2)) y (\y' -> ($ x' + y')))
Reducing some function applications:
contAdd x y = (\k1 -> x (\a1 -> (\x' -> (\k2 -> y (\a2 -> (\y' -> ($ x' + y')) a2 k2))) a1 k1))
contAdd x y = (\k1 -> x (\a1 -> y (\a2 -> ($ a1 + a2) k1)))
And a bit of final rearranging and renaming:
contAdd x y = \k -> x (\x' -> y (\y' -> k $ x' + y'))
In other words: The arguments to the function have been changed from numbers, into functions that take a number and return the final result of the entire expression, just as you'd expect.
Edit: A commenter points out that
contAdd itself still takes two arguments in curried style. This is sensible because it doesn't use the continuation directly, but not necessary. To do otherwise, you'd need to first break the function apart between the arguments:
contAdd x = x >>= (\x' -> return (\y -> y >>= (\y' -> return $ x' + y')))
And then use it like this:
foo = do f <- contAdd (return 1)
r <- f (return 2)
Note that this is really no different from the earlier version; it's simply packaging the result of each partial application as taking a continuation, not just the final result. Since functions are first-class values, there's no significant difference between a CPS expression holding a number vs. one holding a function.
Keep in mind that I'm writing things out in very verbose fashion here to make explicit all the steps where something is in continuation-passing style.
Addendum: You may notice that the final expression looks very similar to the de-sugared version of the monadic expression. This is not a coincidence, as the inward-nesting nature of monadic expressions that lets them change the structure of the computation based on previous values is closely related to continuation-passing style; in both cases, you have in some sense reified a notion of causality.