On Wed, Apr 28, 2010 at 04:16:08PM -0700, Ben wrote:
so i tried state machines of a sort
newtype STAuto s a b = STAuto { unSTAuto : (a, s) -> (b, s) }
where the interruptibility would come from being able to save out the state s. i was not successful, unfortunately, in this level of generality. the fully-polymorphic state doesn't work, because one needs to be able to compose arrows, which means composing state, so like Hughes (see below) one needs some way of nesting states inside one another. also, to implement delay in ArrowCircuit, one needs to be able to store in the state s something of type a. this is a dependency i was not able to model right.
You may try encapsulating the state within an existential: {-# LANGUAGE GADTs #-} import Prelude hiding ((.), id) import Control.Category import Control.Arrow data SFAuto a b where SFAuto :: (Read s, Show s) => s -> ((a, s) -> (b, s)) -> SFAuto a b instance Category SFAuto where id = SFAuto () id (SFAuto s f) . (SFAuto r g) = SFAuto (s, r) h where h (x, (s, r)) = let (gx, r') = g (x, r) (fgx, s') = f (gx, s) in (fgx, (s', r')) instance Arrow SFAuto where arr f = SFAuto () (\(x, _) -> (f x, ())) first (SFAuto s f) = SFAuto s f' where f' ((x, y), s1) = let (fx, s2) = f (x, s1) in ((fx, y), s2) instance ArrowChoice SFAuto where left (SFAuto s f) = SFAuto s f' where f' (Right x, s1) = (Right x, s1) f' (Left x, s1) = first Left $ f (x, s1) instance ArrowLoop SFAuto where loop (SFAuto s f) = SFAuto s f' where f' (b, s1) = let ((c, d), s2) = f ((b, d), s1) in (c, s2) Now, if you want to serialize an (SFAuto a b), you may if you know where the original arrow is. I mean, if you have something :: SFAuto a b something = ... and you want to apply it to a huge list, you may A1) 'applyN k', where k is adjustable. A2) Save the results so far, the remaining input and the current state (which is Showable and Readable in my example, but could be an instance of Binary, for example). A3) Go to A1. If anything bad happens, to recover: B1) Read results, input, and last state. B2) 'changeState something stateThatWasRead' B3) Go to A1. Helper functions mentioned above: applyN :: Int -> SFAuto a b -> [a] -> ([b], (SFAuto a b, [a])) applyN 0 sf xs = ([], (sf, xs)) applyN _ sf [] = ([], (sf, [])) applyN n (SFAuto s f) (x:xs) = let (fx, s') = f (x,s) in first (fx :) $ applyN (n-1) (SFAuto s' f) xs changeState :: SFAuto a b -> String -> SFAuto a b changeState (SFAuto _ f) str = SFAuto (read str) f I don't have any idea if this is what you're looking for, but I hope it helps :). Cheers, -- Felipe.