quox/tests/Tests/Typechecker.idr

module Tests.Typechecker

import Quox.Syntax
import Quox.Syntax.Qty.Three
import Quox.Typechecker as Lib
import public TypingImpls
import TAP


0 M : Type -> Type
M = ReaderT (Definitions Three) $ Either (Error Three)


reflTy : IsQty q => Term q d n
reflTy =
  Pi zero "A" (TYPE 0) $ TUsed $
  Pi zero "x" (BVT 0)  $ TUsed $
  Eq0 (BVT 1) (BVT 0) (BVT 0)

reflDef : IsQty q => Term q d n
reflDef = ["A","x"] :\\ ["i"] :\\% BVT 0

defGlobals : Definitions Three
defGlobals = fromList
  [("A", mkAbstract Zero $ TYPE 0),
   ("B", mkAbstract Zero $ TYPE 0),
   ("C", mkAbstract Zero $ TYPE 1),
   ("D", mkAbstract Zero $ TYPE 1),
   ("a", mkAbstract Any  $ FT "A"),
   ("b", mkAbstract Any  $ FT "B"),
   ("f", mkAbstract Any  $ Arr One (FT "A") (FT "A")),
   ("refl", mkDef Any reflTy reflDef)]

parameters (label : String) (act : Lazy (M ()))
           {default defGlobals globals : Definitions Three}
  testTC : Test
  testTC = test label $ runReaderT globals act

  testTCFail : Test
  testTCFail = testThrows label (const True) $ runReaderT globals act


ctxWith : DContext d -> Context (\i => (Term Three d i, Three)) n ->
          TyContext Three d n
ctxWith dctx tqctx =
  let (tctx, qctx) = unzip tqctx in MkTyContext {dctx, tctx, qctx}

ctx : Context (\i => (Term Three 0 i, Three)) n -> TyContext Three 0 n
ctx = ctxWith DNil

inferAs : TyContext Three d n -> (sg : SQty Three) ->
          Elim Three d n -> Term Three d n -> M ()
inferAs ctx sg e ty = do
  ty' <- infer ctx sg e
  catchError
    (equalType (makeDimEq ctx.dctx) ctx.tctx ty ty'.type)
    (\_ : Error Three => throwError $ ClashT Equal (TYPE UAny) ty ty'.type)

infer_ : TyContext Three d n -> (sg : SQty Three) -> Elim Three d n -> M ()
infer_ ctx sg e = ignore $ infer ctx sg e

check_ : TyContext Three d n -> SQty Three ->
         Term Three d n -> Term Three d n -> M ()
check_ ctx sg s ty = ignore $ check ctx sg s ty

export
tests : Test
tests = "typechecker" :- [
  "universes" :- [
    testTC "0 · ★₀ ⇐ ★₁" $ check_ (ctx [<]) szero (TYPE 0) (TYPE 1),
    testTC "0 · ★₀ ⇐ ★₂" $ check_ (ctx [<]) szero (TYPE 0) (TYPE 2),
    testTC "0 · ★₀ ⇐ ★_" $ check_ (ctx [<]) szero (TYPE 0) (TYPE UAny),
    testTCFail "0 · ★₁ ⇍ ★₀" $ check_ (ctx [<]) szero (TYPE 1) (TYPE 0),
    testTCFail "0 · ★₀ ⇍ ★₀" $ check_ (ctx [<]) szero (TYPE 0) (TYPE 0),
    testTCFail "0 · ★_ ⇍ ★_" $ check_ (ctx [<]) szero (TYPE UAny) (TYPE UAny),
    testTCFail "1 · ★₀ ⇍ ★₁" $ check_ (ctx [<]) sone (TYPE 0) (TYPE 1)
  ],

  "function types" :- [
    note "A, B : ★₀;  C, D : ★₁",
    testTC "0 · (1·A) → B ⇐ ★₀" $
      check_ (ctx [<]) szero (Arr One (FT "A") (FT "B")) (TYPE 0),
    testTC "0 · (1·A) → B ⇐ ★₁👈" $
      check_ (ctx [<]) szero (Arr One (FT "A") (FT "B")) (TYPE 1),
    testTC "0 · (1·C) → D ⇐ ★₁" $
      check_ (ctx [<]) szero (Arr One (FT "C") (FT "D")) (TYPE 1),
    testTCFail "0 · (1·C) → D ⇍ ★₀" $
      check_ (ctx [<]) szero (Arr One (FT "C") (FT "D")) (TYPE 0)
  ],

  "free vars" :- [
    testTC "0 · A ⇒ ★₀" $
      inferAs (ctx [<]) szero (F "A") (TYPE 0),
    testTC "0 · A ⇐👈 ★₀" $
      check_ (ctx [<]) szero (FT "A") (TYPE 0),
    testTC "0 · A ⇐ ★₁👈" $
      check_ (ctx [<]) szero (FT "A") (TYPE 1),
    testTCFail "1👈 · A ⇏ ★₀" $
      infer_ (ctx [<]) sone (F "A"),
    note "refl : (0·A : ★₀) → (0·x : A) → (x ≡ x : A) ≔ (λ A x ⇒ λᴰ _ ⇒ x)",
    testTC "1 · refl ⇒ {type of refl}" $
      inferAs (ctx [<]) sone (F "refl") reflTy,
    testTC "1 · refl ⇐ {type of refl}" $
      check_ (ctx [<]) sone (FT "refl") reflTy
  ],

  "lambda" :- [
    testTC #"1 · (λ A x ⇒ refl A x) ⇐ {type of refl, see "free vars"}"# $
      check_ (ctx [<]) sone
        (["A", "x"] :\\ E (F "refl" :@@ [BVT 1, BVT 0]))
        reflTy
  ],

  "misc" :- [
    testTC "funext"
           {globals = fromList
              [("A", mkAbstract Zero $ TYPE 0),
               ("B", mkAbstract Zero $ Arr Any (FT "A") (TYPE 0)),
               ("f", mkAbstract Any  $
                  Pi Any "x" (FT "A") $ TUsed $ E $ F "B" :@ BVT 0),
               ("g", mkAbstract Any  $
                  Pi Any "x" (FT "A") $ TUsed $ E $ F "B" :@ BVT 0)]} $
      -- 0·A : Type, 0·B : ω·A → Type,
      -- ω·f, g : (ω·x : A) → B x
      -- ⊢
      -- 0·funext : (ω·eq : (0·x : A) → f x ≡ g x) → f ≡ g
      --          = λ eq ⇒ λᴰ i ⇒ λ x ⇒ eq x i
      check_ (ctx [<]) szero
        (["eq"] :\\ ["i"] :\\% ["x"] :\\ E (BV 1 :@ BVT 0 :% BV 0))
        (Pi Any "eq"
            (Pi Zero "x" (FT "A") $ TUsed $
              Eq0 (E $ F "B" :@ BVT 0)
                  (E $ F "f" :@ BVT 0) (E $ F "g" :@ BVT 0)) $ TUsed $
         Eq0 (Pi Any "x" (FT "A") $ TUsed $ E $ F "B" :@ BVT 0)
             (FT "f") (FT "g"))
  ]
]
more typed equality, uip, etc 2023-02-11 12:15:50 -05:00			`module Tests.Typechecker`

			`import Quox.Syntax`
			`import Quox.Syntax.Qty.Three`
			`import Quox.Typechecker as Lib`
			`import public TypingImpls`
			`import TAP`


			`0 M : Type -> Type`
			`M = ReaderT (Definitions Three) $ Either (Error Three)`



			`reflTy : IsQty q => Term q d n`
			`reflTy =`
			`Pi zero "A" (TYPE 0) $ TUsed $`
			`Pi zero "x" (BVT 0) $ TUsed $`
			`Eq0 (BVT 1) (BVT 0) (BVT 0)`

			`reflDef : IsQty q => Term q d n`
			`reflDef = ["A","x"] :\\ ["i"] :\\% BVT 0`

			`defGlobals : Definitions Three`
			`defGlobals = fromList`
			`[("A", mkAbstract Zero $ TYPE 0),`
			`("B", mkAbstract Zero $ TYPE 0),`
			`("C", mkAbstract Zero $ TYPE 1),`
			`("D", mkAbstract Zero $ TYPE 1),`
			`("a", mkAbstract Any $ FT "A"),`
			`("b", mkAbstract Any $ FT "B"),`
			`("f", mkAbstract Any $ Arr One (FT "A") (FT "A")),`
			`("refl", mkDef Any reflTy reflDef)]`

			`parameters (label : String) (act : Lazy (M ()))`
			`{default defGlobals globals : Definitions Three}`
			`testTC : Test`
			`testTC = test label $ runReaderT globals act`

			`testTCFail : Test`
			`testTCFail = testThrows label (const True) $ runReaderT globals act`


			`ctxWith : DContext d -> Context (\i => (Term Three d i, Three)) n ->`
			`TyContext Three d n`
			`ctxWith dctx tqctx =`
			`let (tctx, qctx) = unzip tqctx in MkTyContext {dctx, tctx, qctx}`

			`ctx : Context (\i => (Term Three 0 i, Three)) n -> TyContext Three 0 n`
			`ctx = ctxWith DNil`

			`inferAs : TyContext Three d n -> (sg : SQty Three) ->`
			`Elim Three d n -> Term Three d n -> M ()`
			`inferAs ctx sg e ty = do`
			`ty' <- infer ctx sg e`
			`catchError`
			`(equalType (makeDimEq ctx.dctx) ctx.tctx ty ty'.type)`
			`(\_ : Error Three => throwError $ ClashT Equal (TYPE UAny) ty ty'.type)`

			`infer_ : TyContext Three d n -> (sg : SQty Three) -> Elim Three d n -> M ()`
			`infer_ ctx sg e = ignore $ infer ctx sg e`

			`check_ : TyContext Three d n -> SQty Three ->`
			`Term Three d n -> Term Three d n -> M ()`
			`check_ ctx sg s ty = ignore $ check ctx sg s ty`

			`export`
			`tests : Test`
			`tests = "typechecker" :- [`
			`"universes" :- [`
			`testTC "0 · ★₀ ⇐ ★₁" $ check_ (ctx [<]) szero (TYPE 0) (TYPE 1),`
			`testTC "0 · ★₀ ⇐ ★₂" $ check_ (ctx [<]) szero (TYPE 0) (TYPE 2),`
			`testTC "0 · ★₀ ⇐ ★_" $ check_ (ctx [<]) szero (TYPE 0) (TYPE UAny),`
			`testTCFail "0 · ★₁ ⇍ ★₀" $ check_ (ctx [<]) szero (TYPE 1) (TYPE 0),`
			`testTCFail "0 · ★₀ ⇍ ★₀" $ check_ (ctx [<]) szero (TYPE 0) (TYPE 0),`
			`testTCFail "0 · ★_ ⇍ ★_" $ check_ (ctx [<]) szero (TYPE UAny) (TYPE UAny),`
			`testTCFail "1 · ★₀ ⇍ ★₁" $ check_ (ctx [<]) sone (TYPE 0) (TYPE 1)`
			`],`

			`"function types" :- [`
			`note "A, B : ★₀; C, D : ★₁",`
			`testTC "0 · (1·A) → B ⇐ ★₀" $`
			`check_ (ctx [<]) szero (Arr One (FT "A") (FT "B")) (TYPE 0),`
			`testTC "0 · (1·A) → B ⇐ ★₁👈" $`
			`check_ (ctx [<]) szero (Arr One (FT "A") (FT "B")) (TYPE 1),`
			`testTC "0 · (1·C) → D ⇐ ★₁" $`
			`check_ (ctx [<]) szero (Arr One (FT "C") (FT "D")) (TYPE 1),`
			`testTCFail "0 · (1·C) → D ⇍ ★₀" $`
			`check_ (ctx [<]) szero (Arr One (FT "C") (FT "D")) (TYPE 0)`
			`],`

			`"free vars" :- [`
			`testTC "0 · A ⇒ ★₀" $`
			`inferAs (ctx [<]) szero (F "A") (TYPE 0),`
			`testTC "0 · A ⇐👈 ★₀" $`
			`check_ (ctx [<]) szero (FT "A") (TYPE 0),`
			`testTC "0 · A ⇐ ★₁👈" $`
			`check_ (ctx [<]) szero (FT "A") (TYPE 1),`
			`testTCFail "1👈 · A ⇏ ★₀" $`
			`infer_ (ctx [<]) sone (F "A"),`
			`note "refl : (0·A : ★₀) → (0·x : A) → (x ≡ x : A) ≔ (λ A x ⇒ λᴰ _ ⇒ x)",`
			`testTC "1 · refl ⇒ {type of refl}" $`
			`inferAs (ctx [<]) sone (F "refl") reflTy,`
			`testTC "1 · refl ⇐ {type of refl}" $`
			`check_ (ctx [<]) sone (FT "refl") reflTy`
			`],`

			`"lambda" :- [`
			`testTC #"1 · (λ A x ⇒ refl A x) ⇐ {type of refl, see "free vars"}"# $`
			`check_ (ctx [<]) sone`
			`(["A", "x"] :\\ E (F "refl" :@@ [BVT 1, BVT 0]))`
			`reflTy`
			`],`

			`"misc" :- [`
			`testTC "funext"`
			`{globals = fromList`
			`[("A", mkAbstract Zero $ TYPE 0),`
			`("B", mkAbstract Zero $ Arr Any (FT "A") (TYPE 0)),`
			`("f", mkAbstract Any $`
			`Pi Any "x" (FT "A") $ TUsed $ E $ F "B" :@ BVT 0),`
			`("g", mkAbstract Any $`
			`Pi Any "x" (FT "A") $ TUsed $ E $ F "B" :@ BVT 0)]} $`
			`-- 0·A : Type, 0·B : ω·A → Type,`
			`-- ω·f, g : (ω·x : A) → B x`
			`-- ⊢`
			`-- 0·funext : (ω·eq : (0·x : A) → f x ≡ g x) → f ≡ g`
			`-- = λ eq ⇒ λᴰ i ⇒ λ x ⇒ eq x i`
			`check_ (ctx [<]) szero`
			`(["eq"] :\\ ["i"] :\\% ["x"] :\\ E (BV 1 :@ BVT 0 :% BV 0))`
			`(Pi Any "eq"`
			`(Pi Zero "x" (FT "A") $ TUsed $`
			`Eq0 (E $ F "B" :@ BVT 0)`
			`(E $ F "f" :@ BVT 0) (E $ F "g" :@ BVT 0)) $ TUsed $`
			`Eq0 (Pi Any "x" (FT "A") $ TUsed $ E $ F "B" :@ BVT 0)`
			`(FT "f") (FT "g"))`
			`]`
			`]`