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1 -- For reifyTH
2 {-# LANGUAGE TemplateHaskell #-}
3 {-# OPTIONS_GHC -Wno-incomplete-patterns #-}
4
5 -- | Reify an Haskell value using type-directed normalisation-by-evaluation (NBE).
6 module Symantic.Syntaxes.Reify where
7
8 import Control.Monad (Monad (..))
9 import Data.Function qualified as Fun
10 import Language.Haskell.TH qualified as TH
11
12 import Symantic.Syntaxes.Classes (Abstractable (..), Unabstractable (..))
13
14 -- | 'ReifyReflect' witnesses the duality between @meta@ and @(repr a)@.
15 -- It indicates which type variables in @a@ are not to be instantiated
16 -- with the arrow type, and instantiates them to @(repr _)@ in @meta@.
17 -- This is directly taken from: http://okmij.org/ftp/tagless-final/course/TDPE.hs
18 --
19 -- * @meta@ instantiates polymorphic types of the original Haskell expression
20 -- with @(repr _)@ types, according to how 'ReifyReflect' is constructed
21 -- using 'base' and @('-->')@. This is obviously not possible
22 -- if the orignal expression uses monomorphic types (like 'Int'),
23 -- but remains possible with constrained polymorphic types (like @(Num i => i)@),
24 -- because @(i)@ can still be inferred to @(repr _)@,
25 -- whereas the finally chosen @(repr)@
26 -- (eg. 'E', or 'Identity', or 'TH.CodeQ', or ...)
27 -- can have a 'Num' instance.
28 -- * @(repr a)@ is the symantic type as it would have been,
29 -- had the expression been written with explicit 'lam's
30 -- instead of bare haskell functions.
31 -- DOC: http://okmij.org/ftp/tagless-final/cookbook.html#TDPE
32 -- DOC: http://okmij.org/ftp/tagless-final/NBE.html
33 -- DOC: https://www.dicosmo.org/Articles/2004-BalatDiCosmoFiore-Popl.pdf
34 data ReifyReflect repr meta a = ReifyReflect
35 { -- | 'reflect' converts from a *represented* Haskell term of type @a@
36 -- to an object *representing* that value of type @a@.
37 reify :: meta -> repr a
38 , -- | 'reflect' converts back an object *representing* a value of type @a@,
39 -- to the *represented* Haskell term of type @a@.
40 reflect :: repr a -> meta
41 }
42
43 -- | The base of induction : placeholder for a type which is not the arrow type.
44 base :: ReifyReflect repr (repr a) a
45 base = ReifyReflect{reify = Fun.id, reflect = Fun.id}
46
47 -- | The inductive case : the arrow type.
48 infixr 8 -->
49
50 (-->) ::
51 Abstractable repr =>
52 ReifyReflect repr m1 o1 ->
53 ReifyReflect repr m2 o2 ->
54 ReifyReflect repr (m1 -> m2) (o1 -> o2)
55 r1 --> r2 =
56 ReifyReflect
57 { reify = \meta -> lam (reify r2 Fun.. meta Fun.. reflect r1)
58 , reflect = \repr -> reflect r2 Fun.. (.@) repr Fun.. reify r1
59 }
60
61 -- * Using TemplateHaskell to fully auto-generate 'ReifyReflect'
62
63 -- | @$(reifyTH 'Foo.bar)@ calls 'reify' on 'Foo.bar'
64 -- with an 'ReifyReflect' generated from the infered type of 'Foo.bar'.
65 reifyTH :: TH.Name -> TH.Q TH.Exp
66 reifyTH name = do
67 info <- TH.reify name
68 case info of
69 TH.VarI n (TH.ForallT _vs _ctx ty) _dec ->
70 [|reify $(genReifyReflect ty) $(return (TH.VarE n))|]
71 where
72 genReifyReflect (TH.AppT (TH.AppT TH.ArrowT a) b) = [|$(genReifyReflect a) --> $(genReifyReflect b)|]
73 genReifyReflect TH.VarT{} = [|base|]