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June 5, 2015 17:11
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Exploring Free Monads, Cofree Comonads, and Pairings: DSLs and Interpreters
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| {-# LANGUAGE DeriveFunctor #-} | |
| {-# LANGUAGE MultiParamTypeClasses #-} | |
| {- | |
| Explores Free Monads (DSLs) and Cofree Comonads (interpreters) and | |
| their relationship. | |
| Most of the code in this file comes from (1) below. Only minor | |
| modifications are made - semantics are preserved. | |
| Resources: | |
| 1. Free for DSLs, cofree for interpreters: http://dlaing.org/cofun/posts/free_and_cofree.html | |
| 2. Why free monads matter: http://www.haskellforall.com/2012/06/you-could-have-invented-free-monads.html | |
| 3. Purify code using free monads: http://www.haskellforall.com/2012/07/purify-code-using-free-monads.html | |
| 4. Cofree meets free: http://blog.sigfpe.com/2014/05/cofree-meets-free.html | |
| 5. Cofree meets free (notes): http://kovach.me/notes/2014-08-14-cofree.html | |
| 6. Free Monads are Simple: http://underscore.io/blog/posts/2015/04/14/free-monads-are-simple.html | |
| 7. The Monad Called Free: http://blog.sigfpe.com/2014/04/the-monad-called-free.html | |
| 8. Type Families Make Life and Free Monads Simpler: http://aaronlevin.ca/post/106721413033/type-families-make-life-and-free-monads-simpler | |
| -} | |
| module Free where | |
| import Control.Applicative | |
| import Control.Monad | |
| import Control.Monad.Identity | |
| -------------------------------------------------------------------------------- | |
| -- Free Monad -- | |
| -------------------------------------------------------------------------------- | |
| -- Free monad core type | |
| data Free f r | |
| = Free (f (Free f r)) | |
| | Pure r | |
| -- Functor over free monad | |
| instance (Functor f) => Functor (Free f) where | |
| fmap f (Free fx) = Free (fmap f <$> fx) | |
| fmap f (Pure x) = Pure (f x) | |
| -- Applicative instance to make GHC 7.10 happy | |
| instance (Functor f) => Applicative (Free f) where | |
| pure = Pure | |
| (<*>) = ap | |
| -- Free monad construction | |
| instance (Functor f) => Monad (Free f) where | |
| return = Pure | |
| (Free x) >>= f = Free (fmap (>>= f) x) | |
| (Pure r) >>= f = f r | |
| -- Lifts operations into Free | |
| liftF :: Functor f => f r -> Free f r | |
| liftF x = Free (fmap Pure x) | |
| -------------------------------------------------------------------------------- | |
| -- Adder DSL, Free Monad, Ad-Hoc Intepreter -- | |
| -------------------------------------------------------------------------------- | |
| -- The adder DSL | |
| data AdderF k | |
| = Add Int (Bool -> k) | |
| | Clear k | |
| | Total (Int -> k) | |
| -- Manual functor instance for fun: could just 'deriving Functor' | |
| instance Functor AdderF where | |
| fmap f (Add b k) = Add b (f . k) | |
| fmap f (Clear k) = Clear (f k) | |
| fmap f (Total k) = Total (f . k) | |
| type Adder a = Free AdderF a | |
| -- convenience functions for working with Adder DSL | |
| add :: Int -> Adder Bool | |
| add x = liftF $ Add x id | |
| clear :: Adder () | |
| clear = liftF $ Clear () | |
| total :: Adder Int | |
| total = liftF $ Total id | |
| -- safety: distinguish Count from Limit | |
| newtype Limit = Limit Int | |
| newtype Count = Count Int | |
| -- ad-hoc interpreter | |
| eval :: Limit -> Count -> Adder r -> r | |
| eval (Limit limit) (Count count) a = | |
| case a of | |
| (Pure r) -> r | |
| (Free (Add x k)) -> | |
| let count' = count + x | |
| test = count' <= limit | |
| next = if test then count' else count | |
| in eval (Limit limit) (Count next) (k test) | |
| (Free (Clear x)) -> eval (Limit limit) (Count 0) x | |
| (Free (Total x)) -> eval (Limit limit) (Count count) (x count) | |
| -------------------------------------------------------------------------------- | |
| -- Cofree and Comonads -- | |
| -------------------------------------------------------------------------------- | |
| -- Duplicated for convenience: Available under free on Hackage. | |
| data Cofree f a = a :< f (Cofree f a) deriving Functor | |
| -- Duplicated for convenience. Available under comonad on Hackage. | |
| class Functor w => Comonad w where | |
| extract :: w a -> a | |
| duplicate :: w a -> w (w a) | |
| instance Functor f => Comonad (Cofree f) where | |
| extract (a :< _) = a | |
| duplicate c@(_ :< fs) = c :< fmap duplicate fs | |
| coiter :: Functor f => (a -> f a) -> a -> Cofree f a | |
| coiter next start = start :< (coiter next <$> next start) | |
| -- Comonad for Adder DSL | |
| data CoAdderF k = | |
| CoAdderF { addH :: Int -> (Bool, k) | |
| , clearH :: k | |
| , totalH :: (Int, k) | |
| } | |
| instance Functor CoAdderF where | |
| fmap f (CoAdderF a c t) = CoAdderF (fmap (fmap f) a) (f c) (fmap f t) | |
| type CoAdder a = Cofree CoAdderF a | |
| -- Comonadic machinery for CoAdder | |
| mkCoAdder :: Limit -> Count -> CoAdder (Int, Int) | |
| mkCoAdder (Limit limit) (Count count) = coiter next start | |
| where next w = CoAdderF (coAdd w) (coClear w) (coTotal w) | |
| start = (limit, count) | |
| coClear :: (Int, Int) -> (Int, Int) | |
| coClear (limit, _) = (limit, 0) | |
| coTotal :: (Int, Int) -> (Int, (Int, Int)) | |
| coTotal (limit, count) = (count, (limit, count)) | |
| coAdd :: (Int, Int) -> Int -> (Bool, (Int, Int)) | |
| coAdd (limit, count) x = (test, (limit, next)) | |
| where count' = count + x | |
| test = count' <= limit | |
| next = if test then count' else count | |
| -------------------------------------------------------------------------------- | |
| -- Pairing Free Monads and Cofree Comonads -- | |
| -------------------------------------------------------------------------------- | |
| class (Functor f, Functor g) => Pairing f g where | |
| pair :: (a -> b -> r) -> f a -> g b -> r | |
| instance Pairing Identity Identity where | |
| pair f (Identity a) (Identity b) = f a b | |
| instance Pairing ((->) a) ((,) a) where | |
| pair p f = uncurry (p . f) | |
| instance Pairing ((,) a) ((->) a) where | |
| pair p f g = p (snd f) (g (fst f)) | |
| {- | |
| "The Pairing is what allows us to define our DSL and interpreter | |
| independently from one another while still being able to bring them | |
| together like this." - (1) | |
| -} | |
| instance Pairing f g => Pairing (Cofree f) (Free g) where | |
| pair p (a :< _) (Pure x) = p a x | |
| pair p (_ :< fs) (Free gs) = pair (pair p) fs gs | |
| instance Pairing CoAdderF AdderF where | |
| pair f (CoAdderF a _ _) (Add x k) = pair f (a x) k | |
| pair f (CoAdderF _ c _) (Clear k) = f c k | |
| pair f (CoAdderF _ _ t) (Total k) = pair f t k | |
| -------------------------------------------------------------------------------- | |
| -- Trying the Pieces Out -- | |
| -------------------------------------------------------------------------------- | |
| -- composing programs in the Adder DSL | |
| program :: Adder Int | |
| program = add 3 >> add 4 >> total | |
| runProgram :: CoAdder a -> Int | |
| runProgram w = pair (\_ b -> b) w program | |
| -- a simple main putting together Free w/ ad-hoc interpretation | |
| main :: IO () | |
| main = print ( | |
| runProgram (mkCoAdder limit count) -- comonadically | |
| , eval limit count program -- ad-hoc interpreter | |
| ) | |
| where limit = Limit 200 | |
| count = Count 20 |
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Most of this is available here, if you want to save some typing.
In general, I'll be making sure the code in the repo is at least up to date with whatever is mentioned in the associated blog posts.