{-# LANGUAGE ConstraintKinds #-} {-# LANGUAGE GADTs #-} {-# LANGUAGE PolyKinds #-} {-# LANGUAGE UndecidableInstances #-} module Language.Symantic.Parsing.Token where import Data.Proxy (Proxy(..)) import Data.String (String) import Data.Type.Equality import Language.Symantic.Helper.Data.Type.List import Language.Symantic.Helper.Data.Type.Peano -- * Type 'Token' type Token meta ts = TokenR meta ts ts -- ** Type 'TokenR' data TokenR meta (ts::[*]) (rs::[*]) (t:: *) where TokenZ :: meta -> TokenT meta ts t -> TokenR meta ts (t ': rs) t TokenS :: TokenR meta ts rs t -> TokenR meta ts (not_t ': rs) t infixr 5 `TokenS` -- ** Data family 'TokenT' data family TokenT meta (ts::[*]) (t:: *) :: * -- ** Type 'Eq_Token' type Eq_Token meta ts = Eq_TokenR meta ts ts -- *** Type 'Eq_TokenR' instance Eq_TokenR meta ts rs => Eq (TokenR meta ts rs t) where (==) = eq_TokenR class Eq_TokenR meta (ts::[*]) (rs::[*]) where eq_TokenR :: TokenR meta ts rs x -> TokenR meta ts rs y -> Bool instance ( Eq meta , Eq (TokenT meta ts t) , Eq_TokenR meta ts (r ': rs) ) => Eq_TokenR meta ts (t ': r ': rs) where eq_TokenR (TokenZ mx x) (TokenZ my y) = mx == my && x == y eq_TokenR (TokenS x) (TokenS y) = eq_TokenR x y eq_TokenR _ _ = False instance ( Eq meta , Eq (TokenT meta ts t) ) => Eq_TokenR meta ts (t ': '[]) where eq_TokenR (TokenZ mx x) (TokenZ my y) = mx == my && x == y eq_TokenR _ _ = False -- ** Type 'TestEquality_Token' type TestEquality_Token meta ts = TestEquality_TokenR meta ts ts -- *** Type 'TestEquality_TokenR' instance TestEquality_TokenR meta ts rs => TestEquality (TokenR meta ts rs) where testEquality = testEqualityR class TestEquality_TokenR meta (ts::[*]) (rs::[*]) where testEqualityR :: TokenR meta ts rs x -> TokenR meta ts rs y -> Maybe (x :~: y) instance ( Eq meta , Eq (TokenT meta ts t) , TestEquality_TokenR meta ts (r ': rs) ) => TestEquality_TokenR meta ts (t ': r ': rs) where testEqualityR (TokenZ mx x) (TokenZ my y) | mx == my && x == y = Just Refl testEqualityR (TokenS x) (TokenS y) = testEqualityR x y testEqualityR _ _ = Nothing instance ( Eq meta , Eq (TokenT meta ts t) ) => TestEquality_TokenR meta ts (t ': '[]) where testEqualityR (TokenZ mx x) (TokenZ my y) | mx == my && x == y = Just Refl testEqualityR _ _ = Nothing -- ** Type 'Show_Token' type Show_Token meta ts = Show_TokenR meta ts ts -- *** Type 'Show_TokenR' instance Show_TokenR meta ts rs => Show (TokenR meta ts rs t) where show = show_TokenR class Show_TokenR meta (ts::[*]) (rs::[*]) where show_TokenR :: TokenR meta ts rs x -> String instance ( Show meta , Show (TokenT meta ts t) , Show_TokenR meta ts (r ': rs) ) => Show_TokenR meta ts (t ': r ': rs) where show_TokenR (TokenZ m t) = show (m, t) show_TokenR (TokenS rs) = show_TokenR rs instance ( Show meta , Show (TokenT meta ts t) ) => Show_TokenR meta ts (t ': '[]) where show_TokenR (TokenZ m t) = show (m, t) show_TokenR TokenS{} = error "Oops, the impossible happened..." -- ** Type 'EToken' -- | Existential 'Token'. data EToken meta (ts::[*]) = forall t. EToken (Token meta ts t) instance Eq_Token meta ts => Eq (EToken meta ts) where EToken x == EToken y = eq_TokenR x y instance Show_Token meta ts => Show (EToken meta ts) where show (EToken x) = show x -- * Type 'Inj_Token' -- | Convenient type synonym wrapping 'Inj_TokenP' -- applied on the correct 'Index'. type Inj_Token meta ts t = Inj_TokenP (Index ts (Proxy t)) meta ts ts t inj_token :: forall meta ts t. Inj_Token meta ts t => meta -> TokenT meta ts (Proxy t) -> Token meta ts (Proxy t) inj_token = inj_tokenP (Proxy @(Index ts (Proxy t))) inj_EToken :: forall meta ts t. Inj_Token meta ts t => meta -> TokenT meta ts (Proxy t) -> EToken meta ts inj_EToken meta = EToken . inj_tokenP (Proxy @(Index ts (Proxy t))) meta -- ** Class 'Inj_TokenP' class Inj_TokenP p meta ts rs (t::kt) where inj_tokenP :: Proxy p -> meta -> TokenT meta ts (Proxy t) -> TokenR meta ts rs (Proxy t) instance Inj_TokenP Zero meta ts (Proxy t ': rs) t where inj_tokenP _ = TokenZ instance Inj_TokenP p meta ts rs t => Inj_TokenP (Succ p) meta ts (not_t ': rs) t where inj_tokenP _p meta = TokenS . inj_tokenP (Proxy @p) meta -- ** Type 'Inj_Tokens' type Inj_Tokens meta ts ts_to_inj = Concat_Constraints (Inj_TokensR meta ts ts_to_inj) -- *** Type family 'Inj_TokensR' type family Inj_TokensR meta ts ts_to_inj where Inj_TokensR meta ts '[] = '[] Inj_TokensR meta ts (Proxy t ': rs) = Inj_Token meta ts t ': Inj_TokensR meta ts rs -- * Class 'Proj_Token' -- | Convenient type synonym wrapping 'Proj_TokenP' -- applied on the correct 'Index'. type Proj_Token ts t = Proj_TokenP (Index ts (Proxy t)) ts ts t proj_token :: forall meta ts t u. Proj_Token ts t => Token meta ts u -> Maybe (Proxy t :~: u, meta, TokenT meta ts u) proj_token = proj_tokenP (Proxy @(Index ts (Proxy t))) proj_EToken :: forall meta ts t. Proj_Token ts t => EToken meta ts -> Maybe (TokenT meta ts (Proxy t)) proj_EToken (EToken (tok::TokenR meta ts ts u)) = case proj_token tok of Just (Refl :: Proxy t :~: u, _meta, tokD) -> Just tokD Nothing -> Nothing -- ** Type 'Proj_TokenP' class Proj_TokenP p ts rs t where proj_tokenP :: Proxy p -> TokenR meta ts rs u -> Maybe (Proxy t :~: u, meta, TokenT meta ts u) instance Proj_TokenP Zero ts (Proxy t ': rs) t where proj_tokenP _p (TokenZ meta tok) = Just (Refl, meta, tok) proj_tokenP _p TokenS{} = Nothing instance Proj_TokenP p ts rs t => Proj_TokenP (Succ p) ts (not_t ': rs) t where proj_tokenP _p TokenZ{} = Nothing proj_tokenP _p (TokenS u) = proj_tokenP (Proxy @p) u -- * Type 'At' -- | Attach a location. data At meta ts a = At (Maybe (EToken meta ts)) a deriving instance (Eq_Token meta ts, Eq a) => Eq (At meta ts a) deriving instance (Show_Token meta ts, Show a) => Show (At meta ts a) instance Functor (At meta ts) where fmap f (At at a) = At at (f a) unAt :: At meta ts a -> a unAt (At _ a) = a -- * Class 'Meta_of' class Meta_of tok where type Meta_Of tok meta_of :: tok -> Meta_Of tok instance Meta_of (TokenR meta ts rs t) where type Meta_Of (TokenR meta ts rs t) = meta meta_of (TokenZ m _) = m meta_of (TokenS t) = meta_of t instance Meta_of (EToken meta ts) where type Meta_Of (EToken meta ts) = meta meta_of (EToken t) = meta_of t