{-# LANGUAGE ExistentialQuantification, GADTs #-} {-# LANGUAGE DeriveDataTypeable #-} {-# LANGUAGE ImpredicativeTypes #-} {-# LANGUAGE FlexibleContexts #-} {-# LANGUAGE FlexibleInstances #-} {-# LANGUAGE UndecidableInstances #-} {-# LANGUAGE MultiParamTypeClasses #-} {-# LANGUAGE TypeOperators #-} {-# LANGUAGE TypeSynonymInstances #-} {-# LANGUAGE CPP #-} #if defined(__GLASGOW_HASKELL__) && __GLASGOW_HASKELL__ >= 702 {-# LANGUAGE Safe #-} #endif #if defined(__GLASGOW_HASKELL__) && __GLASGOW_HASKELL__ >= 708 {-# LANGUAGE PolyKinds #-} #endif module Data.Dependent.Sum where import Control.Applicative #if MIN_VERSION_base(4,7,0) import Data.Typeable (Typeable) #else import Data.Dependent.Sum.Typeable ({- instance Typeable ... -}) #endif import Data.GADT.Show import Data.GADT.Compare import Data.Maybe (fromMaybe) -- |A basic dependent sum type; the first component is a tag that specifies -- the type of the second; for example, think of a GADT such as: -- -- > data Tag a where -- > AString :: Tag String -- > AnInt :: Tag Int -- -- Then, we have the following valid expressions of type @DSum Tag@: -- -- > AString :=> "hello!" -- > AnInt :=> 42 -- -- And we can write functions that consume @DSum Tag@ values by matching, -- such as: -- -- > toString :: DSum Tag -> String -- > toString (AString :=> str) = str -- > toString (AnInt :=> int) = show int -- -- By analogy to the (key => value) construction for dictionary entries in -- many dynamic languages, we use (key :=> value) as the constructor for -- dependent sums. The :=> operator has very low precedence and binds to -- the right, so if the @Tag@ GADT is extended with an additional constructor -- @Rec :: Tag (DSum Tag)@, then @Rec :=> AnInt :=> 3 + 4@ is parsed as -- would be expected (@Rec :=> (AnInt :=> (3 + 4))@) and has type @DSum Tag@. -- Its precedence is just above that of '$', so @foo bar $ AString :=> "eep"@ -- is equivalent to @foo bar (AString :=> "eep")@. data DSum tag f = forall a. !(tag a) :=> f a #if MIN_VERSION_base(4,7,0) deriving Typeable #endif infixr 1 :=>, ==> (==>) :: Applicative f => tag a -> a -> DSum tag f k ==> v = k :=> pure v -- |In order to make a 'Show' instance for @DSum tag@, @tag@ must be able -- to show itself as well as any value of the tagged type. 'GShow' together -- with this class provides the interface by which it can do so. -- -- @ShowTag tag => t@ is conceptually equivalent to something like this -- imaginary syntax: @(forall a. Inhabited (tag a) => Show a) => t@, -- where 'Inhabited' is an imaginary predicate that characterizes -- non-empty types, and 'a' does not occur free in 't'. -- -- The @Tag@ example type introduced in the 'DSum' section could be given the -- following instances: -- -- > instance GShow Tag where -- > gshowsPrec _p AString = showString "AString" -- > gshowsPrec _p AnInt = showString "AnInt" -- > instance ShowTag Tag where -- > showTaggedPrec AString = showsPrec -- > showTaggedPrec AnInt = showsPrec -- class GShow tag => ShowTag tag f where -- |Given a value of type @tag a@, return the 'showsPrec' function for -- the type parameter @a@. showTaggedPrec :: tag a -> Int -> f a -> ShowS instance Show (f a) => ShowTag ((:=) a) f where showTaggedPrec Refl = showsPrec -- This instance is questionable. It works, but is pretty useless. instance Show (f a) => ShowTag (GOrdering a) f where showTaggedPrec GEQ = showsPrec showTaggedPrec _ = \p _ -> showParen (p > 10) ( showString "error " . shows "type information lost into the mists of oblivion" ) instance ShowTag tag f => Show (DSum tag f) where showsPrec p (tag :=> value) = showParen (p >= 10) ( gshowsPrec 0 tag . showString " :=> " . showTaggedPrec tag 1 value ) class GRead tag => ReadTag tag f where readTaggedPrec :: tag a -> Int -> ReadS (f a) -- |In order to make a 'Read' instance for @DSum tag@, @tag@ must be able -- to parse itself as well as any value of the tagged type. 'GRead' together -- with this class provides the interface by which it can do so. -- -- @ReadTag tag => t@ is conceptually equivalent to something like this -- imaginary syntax: @(forall a. Inhabited (tag a) => Read a) => t@, -- where 'Inhabited' is an imaginary predicate that characterizes -- non-empty types, and 'a' does not occur free in 't'. -- -- The @Tag@ example type introduced in the 'DSum' section could be given the -- following instances: -- -- > instance GRead Tag where -- > greadsPrec _p str = case tag of -- > "AString" -> [(\k -> k AString, rest)] -- > "AnInt" -> [(\k -> k AnInt, rest)] -- > _ -> [] -- > where (tag, rest) = break isSpace str -- > instance ReadTag Tag where -- > readTaggedPrec AString = readsPrec -- > readTaggedPrec AnInt = readsPrec -- instance Read (f a) => ReadTag ((:=) a) f where readTaggedPrec Refl = readsPrec -- This instance is questionable. It works, but is partial (and is also pretty useless) -- instance Read a => ReadTag (GOrdering a) where -- readTaggedPrec GEQ = readsPrec -- readTaggedPrec tag = \p -> readParen (p>10) $ \s -> -- [ (error msg, rest') -- | let (con, rest) = splitAt 6 s -- , con == "error " -- , (msg, rest') <- reads rest :: [(String, String)] -- ] instance ReadTag tag f => Read (DSum tag f) where readsPrec p = readParen (p > 1) $ \s -> concat [ withTag $ \tag -> [ (tag :=> val, rest'') | (val, rest'') <- readTaggedPrec tag 1 rest' ] | (withTag, rest) <- greadsPrec p s , let (con, rest') = splitAt 5 rest , con == " :=> " ] -- |In order to test @DSum tag@ for equality, @tag@ must know how to test -- both itself and its tagged values for equality. 'EqTag' defines -- the interface by which they are expected to do so. -- -- Continuing the @Tag@ example from the 'DSum' section, we can define: -- -- > instance GEq Tag where -- > geq AString AString = Just Refl -- > geq AnInt AnInt = Just Refl -- > geq _ _ = Nothing -- > instance EqTag Tag where -- > eqTagged AString AString = (==) -- > eqTagged AnInt AnInt = (==) -- -- Note that 'eqTagged' is not called until after the tags have been -- compared, so it only needs to consider the cases where 'gcompare' returns 'GEQ'. class GEq tag => EqTag tag f where -- |Given two values of type @tag a@ (for which 'gcompare' returns 'GEQ'), -- return the '==' function for the type @a@. eqTagged :: tag a -> tag a -> f a -> f a -> Bool instance Eq (f a) => EqTag ((:=) a) f where eqTagged Refl Refl = (==) instance EqTag tag f => Eq (DSum tag f) where (t1 :=> x1) == (t2 :=> x2) = fromMaybe False $ do Refl <- geq t1 t2 return (eqTagged t1 t2 x1 x2) -- |In order to compare @DSum tag@ values, @tag@ must know how to compare -- both itself and its tagged values. 'OrdTag' defines the -- interface by which they are expected to do so. -- -- Continuing the @Tag@ example from the 'EqTag' section, we can define: -- -- > instance GCompare Tag where -- > gcompare AString AString = GEQ -- > gcompare AString AnInt = GLT -- > gcompare AnInt AString = GGT -- > gcompare AnInt AnInt = GEQ -- > instance OrdTag Tag where -- > compareTagged AString AString = compare -- > compareTagged AnInt AnInt = compare -- -- As with 'eqTagged', 'compareTagged' only needs to consider cases where -- 'gcompare' returns 'GEQ'. class (EqTag tag f, GCompare tag) => OrdTag tag f where -- |Given two values of type @tag a@ (for which 'gcompare' returns 'GEQ'), -- return the 'compare' function for the type @a@. compareTagged :: tag a -> tag a -> f a -> f a -> Ordering instance Ord (f a) => OrdTag ((:=) a) f where compareTagged Refl Refl = compare instance OrdTag tag f => Ord (DSum tag f) where compare (t1 :=> x1) (t2 :=> x2) = case gcompare t1 t2 of GLT -> LT GGT -> GT GEQ -> compareTagged t1 t2 x1 x2