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[haskell/symantic-base.git] / src / Symantic / Syntaxes / EithersOfTuples.hs
1 {-# LANGUAGE AllowAmbiguousTypes #-}
2 {-# LANGUAGE ConstraintKinds #-}
3 {-# LANGUAGE DataKinds #-}
4 {-# LANGUAGE EmptyCase #-}
5 {-# LANGUAGE PolyKinds #-}
6 {-# LANGUAGE UndecidableInstances #-}
7
8 -- | This modules leverages @GHC.Generics@ to generate reciprocal functions
9 -- between algebraic data type (aka. ADT) constructors
10 -- and Eithers-of-Tuples (aka. EOT).
11 --
12 -- This is like what is done in @generic-sop@:
13 -- https://hackage.haskell.org/package/generics-sop-0.5.1.0/docs/src/Generics.SOP.GGP.html#gSumFrom
14 -- but using directly 'Either' and 'Tuples'
15 -- instead of passing by the intermediary GADTs @NP@ and @NS@,
16 -- enabling to produce or consume custom ADT with @('<.>')@ and @('<+>')@.
17 module Symantic.Syntaxes.EithersOfTuples where
18
19 import Data.Either (Either (..))
20 import Data.Function (const, id, ($), (.))
21 import Data.Kind (Type)
22 import Data.Void (Void, absurd)
23 import GHC.Generics as Generics
24
25 -- * Type family 'EoT'
26
27 -- Return an 'Either' of 'Tuples' from the given 'ADT',
28 -- matching the nesting occuring when using @('<.>')@ and ('<+>')@
29 -- and their associativity and precedence,
30 -- with no parenthesis messing around.
31 type family EoT (adt :: [[Type]]) :: Type where
32 -- This is 'absurd'
33 EoT '[] = Void
34 -- There Is No Alternative
35 EoT '[ps] = Tuples ps
36 -- The right associativity of @('<+>')@
37 -- puts leaves on 'Left' and nodes on 'Right'
38 EoT (ps ': ss) = Either (Tuples ps) (EoT ss)
39
40 -- * Type family 'Tuples'
41
42 -- | Return the type of 'snd'-nested 2-tuples
43 -- from the given list of types.
44 type family Tuples (as :: [Type]) :: (r :: Type) where
45 Tuples '[] = ()
46 Tuples '[a] = a
47 Tuples (a ': rest) = (a, Tuples rest)
48
49 -- * Type 'ADT'
50
51 -- | Normalized type-level representation of an Algebraic Data Type.
52 type ADT (adt :: Type) = ListOfRepSums (Rep adt) '[]
53
54 -- ** Type family 'ListOfRepSums'
55
56 -- | Collect the alternatives in a continuation passing-style.
57 type family ListOfRepSums (a :: Type -> Type) (ss :: [[Type]]) :: [[Type]]
58
59 type instance ListOfRepSums (a :+: b) ss = ListOfRepSums a (ListOfRepSums b ss)
60
61 -- | Meta-information for datatypes
62 type instance ListOfRepSums (M1 D _c a) ss = ListOfRepSums a ss
63
64 -- | Meta-information for constructors
65 type instance ListOfRepSums (M1 C _c a) ss = ListOfRepProducts a '[] ': ss
66
67 -- | Empty datatypes
68 type instance ListOfRepSums V1 ss = ss
69
70 -- ** Type family 'ListOfRepProducts'
71
72 -- | Collect the records in a continuation passing-style.
73 type family ListOfRepProducts (a :: Type -> Type) (ps :: [Type]) :: [Type]
74
75 type instance ListOfRepProducts (a :*: b) ps = ListOfRepProducts a (ListOfRepProducts b ps)
76
77 -- | Meta-information for record selectors
78 type instance ListOfRepProducts (M1 S _c a) ps = TypeOfRepField a ': ps
79
80 -- | Constructor without fields
81 type instance ListOfRepProducts U1 ps = ps
82
83 -- ** Type family 'TypeOfRepField'
84 type family TypeOfRepField (a :: Type -> Type) :: Type
85 type instance TypeOfRepField (K1 _i a) = a
86
87 -- * Class 'RepOfEoT'
88 type RepOfEoT a = RepOfEithers (Rep a) '[]
89
90 -- | Morph the 'Either' of 'Tuples' corresponding to an 'ADT'
91 -- into a constructor of this 'ADT'.
92 -- This is the reverse of 'eotOfadt'.
93 adtOfeot :: Generic a => RepOfEoT a => EoT (ADT a) -> a
94 adtOfeot eot = Generics.to $ repOfEithers @_ @'[] eot id absurd
95
96 -- ** Class 'RepOfEithers'
97 class RepOfEithers (a :: Type -> Type) ss where
98 -- | Parse the 'Either' (list-like) binary tree of 'EoT'
99 -- into the @(':+:')@ (balanced) binary tree of 'Rep',
100 -- using continuation passing-style for performance.
101 repOfEithers ::
102 EoT (ListOfRepSums a ss) ->
103 -- the 'a' 'Rep' is the current alternative in the 'EoT'
104 (a x -> r) ->
105 -- the 'a' 'Rep' is a following alternative in the 'EoT'
106 (EoT ss -> r) ->
107 r
108 instance (RepOfEithers a (ListOfRepSums b ss), RepOfEithers b ss) => RepOfEithers (a :+: b) ss where
109 repOfEithers eot ok ko =
110 -- try to parse 'a' on the current 'eot'
111 repOfEithers @a @(ListOfRepSums b ss)
112 eot
113 (ok . L1)
114 ( \next ->
115 -- parsing 'a' failed
116 -- try to parse 'b' on the 'Right' of the current 'eot'
117 repOfEithers @b @ss
118 next
119 (ok . R1)
120 ko -- parsing 'b' failed: backtrack
121 )
122 instance RepOfEithers a ss => RepOfEithers (M1 D c a) ss where
123 repOfEithers eot ok = repOfEithers @a @ss eot (ok . M1)
124 instance RepOfTuples a '[] => RepOfEithers (M1 C c a) (ps ': ss) where
125 repOfEithers eot ok ko =
126 case eot of
127 -- 'EoT' is a leaf, and 'Rep' too: parsing succeeds
128 Left ts -> ok $ M1 $ repOfTuples @a @'[] ts const
129 -- 'EoT' is a node, but 'Rep' is a leaf: parsing fails
130 Right ss -> ko ss
131 instance RepOfTuples a '[] => RepOfEithers (M1 C c a) '[] where
132 repOfEithers eot ok _ko = ok $ M1 $ repOfTuples @_ @'[] eot const
133 instance RepOfEithers V1 ss where
134 repOfEithers eot _ok ko = ko eot
135
136 -- ** Class 'RepOfTuples'
137 class RepOfTuples (a :: Type -> Type) (xs :: [Type]) where
138 -- | Parse the 'Tuples' (list-like) binary tree of 'EoT'
139 -- into the @(':*:')@ (balanced) binary tree of 'Rep',
140 -- using continuation passing-style for performance.
141 repOfTuples ::
142 Tuples (ListOfRepProducts a xs) ->
143 (a x -> Tuples xs -> r) ->
144 r
145 instance (RepOfTuples a (ListOfRepProducts b ps), RepOfTuples b ps) => RepOfTuples (a :*: b) ps where
146 repOfTuples ts k =
147 -- uncons 'a'
148 repOfTuples @a @(ListOfRepProducts b ps)
149 ts
150 ( \a ts' ->
151 -- uncons 'b'
152 repOfTuples @b @ps
153 ts'
154 (\b -> k (a :*: b))
155 )
156 instance RepOfField a => RepOfTuples (M1 S c a) (p ': ps) where
157 repOfTuples (a, ts) k = k (M1 (repOfField a)) ts
158 instance RepOfField a => RepOfTuples (M1 S c a) '[] where
159 repOfTuples a k = k (M1 (repOfField a)) ()
160 instance RepOfTuples U1 ps where
161 repOfTuples ts k = k U1 ts
162
163 -- ** Class 'RepOfField'
164 class RepOfField (a :: Type -> Type) where
165 repOfField :: TypeOfRepField a -> a x
166 instance RepOfField (K1 i a) where
167 repOfField = K1
168
169 -- * Class 'EoTOfRep'
170 type EoTOfRep a = EithersOfRep (Rep a) '[]
171
172 -- | Morph the constructor of an 'ADT'
173 -- into the corresponding 'Either' of 'Tuples' of this 'ADT'.
174 -- This is the reverse of 'adtOfeot'.
175 eotOfadt :: Generic a => EoTOfRep a => a -> EoT (ADT a)
176 eotOfadt = eithersOfRepL @_ @'[] . Generics.from
177
178 -- ** Class 'EithersOfRep'
179 class EithersOfRep (a :: Type -> Type) ss where
180 eithersOfRepL :: a x -> EoT (ListOfRepSums a ss)
181 eithersOfRepR :: EoT ss -> EoT (ListOfRepSums a ss)
182 instance
183 (EithersOfRep a (ListOfRepSums b ss), EithersOfRep b ss) =>
184 EithersOfRep (a :+: b) ss
185 where
186 eithersOfRepL = \case
187 L1 a -> eithersOfRepL @a @(ListOfRepSums b ss) a
188 R1 b -> eithersOfRepR @a @(ListOfRepSums b ss) (eithersOfRepL @b @ss b)
189 eithersOfRepR ss = eithersOfRepR @a @(ListOfRepSums b ss) (eithersOfRepR @b @ss ss)
190 instance EithersOfRep a ss => EithersOfRep (M1 D c a) ss where
191 eithersOfRepL (M1 a) = eithersOfRepL @a @ss a
192 eithersOfRepR = eithersOfRepR @a @ss
193 instance TuplesOfRep a '[] => EithersOfRep (M1 C c a) '[] where
194 eithersOfRepL (M1 a) = tuplesOfRep @_ @'[] a ()
195 eithersOfRepR = absurd
196 instance TuplesOfRep a '[] => EithersOfRep (M1 C c a) (ps ': ss) where
197 eithersOfRepL (M1 a) = Left $ tuplesOfRep @_ @'[] a ()
198 eithersOfRepR = Right
199 instance EithersOfRep V1 ss where
200 eithersOfRepL = \case {}
201 eithersOfRepR = id
202
203 -- ** Class 'TuplesOfRep'
204 class TuplesOfRep (a :: Type -> Type) (ps :: [Type]) where
205 tuplesOfRep :: a x -> Tuples ps -> Tuples (ListOfRepProducts a ps)
206 instance (TuplesOfRep a (ListOfRepProducts b ps), TuplesOfRep b ps) => TuplesOfRep (a :*: b) ps where
207 tuplesOfRep (a :*: b) ps =
208 tuplesOfRep @a @(ListOfRepProducts b ps)
209 a
210 (tuplesOfRep @b @ps b ps)
211 instance TuplesOfRep U1 ps where
212 tuplesOfRep U1 xs = xs
213 instance FieldOfRep a => TuplesOfRep (M1 S c a) (x ': ps) where
214 tuplesOfRep (M1 a) xs = (fieldOfRep a, xs)
215 instance FieldOfRep a => TuplesOfRep (M1 S c a) '[] where
216 tuplesOfRep (M1 a) _xs = fieldOfRep a
217
218 -- ** Class 'FieldOfRep'
219 class FieldOfRep (a :: Type -> Type) where
220 fieldOfRep :: a x -> TypeOfRepField a
221 instance FieldOfRep (K1 i a) where
222 fieldOfRep (K1 a) = a