module Quox.Typechecker import public Quox.Typing import public Quox.Equal import Data.List import Data.SnocVect import Data.List1 import Quox.EffExtra %default total public export 0 TCEff : List (Type -> Type) TCEff = [ErrorEff, DefsReader] public export 0 TC : Type -> Type TC = Eff TCEff export runTC : Definitions -> TC a -> Either Error a runTC defs = extract . runExcept . runReader defs export popQs : Has ErrorEff fs => QOutput s -> QOutput (s + n) -> Eff fs (QOutput n) popQs [<] qout = pure qout popQs (pis :< pi) (qout :< rh) = do expectCompatQ rh pi; popQs pis qout export %inline popQ : Has ErrorEff fs => Qty -> QOutput (S n) -> Eff fs (QOutput n) popQ pi = popQs [< pi] export lubs1 : List1 (QOutput n) -> Maybe (QOutput n) lubs1 ([<] ::: _) = Just [<] lubs1 ((qs :< p) ::: pqs) = let (qss, ps) = unzip $ map unsnoc pqs in [|lubs1 (qs ::: qss) :< foldlM lub p ps|] export lubs : TyContext d n -> List (QOutput n) -> Maybe (QOutput n) lubs ctx [] = Just $ zeroFor ctx lubs ctx (x :: xs) = lubs1 $ x ::: xs mutual ||| "Ψ | Γ ⊢ σ · s ⇐ A ⊳ Σ" ||| ||| `check ctx sg subj ty` checks that in the context `ctx`, the term ||| `subj` has the type `ty`, with quantity `sg`. if so, returns the ||| quantities of all bound variables that it used. ||| ||| if the dimension context is inconsistent, then return `Nothing`, without ||| doing any further work. export covering %inline check : (ctx : TyContext d n) -> SQty -> Term d n -> Term d n -> TC (CheckResult ctx.dctx n) check ctx sg subj ty = ifConsistent ctx.dctx $ checkC ctx sg subj ty ||| "Ψ | Γ ⊢₀ s ⇐ A" ||| ||| `check0 ctx subj ty` checks a term (as `check`) in a zero context. export covering %inline check0 : TyContext d n -> Term d n -> Term d n -> TC () check0 ctx tm ty = ignore $ check ctx szero tm ty -- the output will always be 𝟎 because the subject quantity is 0 ||| `check`, assuming the dimension context is consistent export covering %inline checkC : (ctx : TyContext d n) -> SQty -> Term d n -> Term d n -> TC (CheckResult' n) checkC ctx sg subj ty = wrapErr (WhileChecking ctx sg.fst subj ty) $ let Element subj nc = pushSubsts subj in check' ctx sg subj ty ||| "Ψ | Γ ⊢₀ s ⇐ ★ᵢ" ||| ||| `checkType ctx subj ty` checks a type (in a zero context). sometimes the ||| universe doesn't matter, only that a term is _a_ type, so it is optional. export covering %inline checkType : TyContext d n -> Term d n -> Maybe Universe -> TC () checkType ctx subj l = ignore $ ifConsistent ctx.dctx $ checkTypeC ctx subj l export covering %inline checkTypeC : TyContext d n -> Term d n -> Maybe Universe -> TC () checkTypeC ctx subj l = wrapErr (WhileCheckingTy ctx subj l) $ checkTypeNoWrap ctx subj l export covering %inline checkTypeNoWrap : TyContext d n -> Term d n -> Maybe Universe -> TC () checkTypeNoWrap ctx subj l = let Element subj nc = pushSubsts subj in checkType' ctx subj l ||| "Ψ | Γ ⊢ σ · e ⇒ A ⊳ Σ" ||| ||| `infer ctx sg subj` infers the type of `subj` in the context `ctx`, ||| and returns its type and the bound variables it used. ||| ||| if the dimension context is inconsistent, then return `Nothing`, without ||| doing any further work. export covering %inline infer : (ctx : TyContext d n) -> SQty -> Elim d n -> TC (InferResult ctx.dctx d n) infer ctx sg subj = ifConsistent ctx.dctx $ inferC ctx sg subj ||| `infer`, assuming the dimension context is consistent export covering %inline inferC : (ctx : TyContext d n) -> SQty -> Elim d n -> TC (InferResult' d n) inferC ctx sg subj = wrapErr (WhileInferring ctx sg.fst subj) $ let Element subj nc = pushSubsts subj in infer' ctx sg subj private covering toCheckType : TyContext d n -> SQty -> (subj : Term d n) -> (0 nc : NotClo subj) => Term d n -> TC (CheckResult' n) toCheckType ctx sg t ty = do u <- expectTYPE !ask ctx ty expectEqualQ Zero sg.fst checkTypeNoWrap ctx t (Just u) pure $ zeroFor ctx private covering check' : TyContext d n -> SQty -> (subj : Term d n) -> (0 nc : NotClo subj) => Term d n -> TC (CheckResult' n) check' ctx sg t@(TYPE _) ty = toCheckType ctx sg t ty check' ctx sg t@(Pi {}) ty = toCheckType ctx sg t ty check' ctx sg (Lam body) ty = do (qty, arg, res) <- expectPi !ask ctx ty -- if Ψ | Γ, x : A ⊢ σ · t ⇐ B ⊳ Σ, ρ·x -- with ρ ≤ σπ let qty' = sg.fst * qty qout <- checkC (extendTy qty' body.name arg ctx) sg body.term res.term -- then Ψ | Γ ⊢ σ · (λx ⇒ t) ⇐ (π·x : A) → B ⊳ Σ popQ qty' qout check' ctx sg t@(Sig {}) ty = toCheckType ctx sg t ty check' ctx sg (Pair fst snd) ty = do (tfst, tsnd) <- expectSig !ask ctx ty -- if Ψ | Γ ⊢ σ · s ⇐ A ⊳ Σ₁ qfst <- checkC ctx sg fst tfst let tsnd = sub1 tsnd (fst :# tfst) -- if Ψ | Γ ⊢ σ · t ⇐ B[s] ⊳ Σ₂ qsnd <- checkC ctx sg snd tsnd -- then Ψ | Γ ⊢ σ · (s, t) ⇐ (x : A) × B ⊳ Σ₁ + Σ₂ pure $ qfst + qsnd check' ctx sg t@(Enum _) ty = toCheckType ctx sg t ty check' ctx sg (Tag t) ty = do tags <- expectEnum !ask ctx ty -- if t ∈ ts unless (t `elem` tags) $ throw $ TagNotIn t tags -- then Ψ | Γ ⊢ σ · t ⇐ {ts} ⊳ 𝟎 pure $ zeroFor ctx check' ctx sg t@(Eq {}) ty = toCheckType ctx sg t ty check' ctx sg (DLam body) ty = do (ty, l, r) <- expectEq !ask ctx ty -- if Ψ, i | Γ ⊢ σ · t ⇐ A ⊳ Σ qout <- checkC (extendDim body.name ctx) sg body.term ty.term -- if Ψ | Γ ⊢ t‹0› = l : A‹0› equal ctx ty.zero body.zero l -- if Ψ | Γ ⊢ t‹1› = r : A‹1› equal ctx ty.one body.one r -- then Ψ | Γ ⊢ σ · (δ i ⇒ t) ⇐ Eq [i ⇒ A] l r ⊳ Σ pure qout check' ctx sg Nat ty = toCheckType ctx sg Nat ty check' ctx sg Zero ty = do expectNat !ask ctx ty pure $ zeroFor ctx check' ctx sg (Succ n) ty = do expectNat !ask ctx ty checkC ctx sg n Nat check' ctx sg t@(BOX {}) ty = toCheckType ctx sg t ty check' ctx sg (Box val) ty = do (q, ty) <- expectBOX !ask ctx ty -- if Ψ | Γ ⊢ σ · s ⇐ A ⊳ Σ valout <- checkC ctx sg val ty -- then Ψ | Γ ⊢ σ · [s] ⇐ [π.A] ⊳ πΣ pure $ q * valout check' ctx sg (E e) ty = do -- if Ψ | Γ ⊢ σ · e ⇒ A' ⊳ Σ infres <- inferC ctx sg e -- if Ψ | Γ ⊢ A' <: A subtype ctx infres.type ty -- then Ψ | Γ ⊢ σ · e ⇐ A ⊳ Σ pure infres.qout private covering checkType' : TyContext d n -> (subj : Term d n) -> (0 nc : NotClo subj) => Maybe Universe -> TC () checkType' ctx (TYPE k) u = do -- if 𝓀 < ℓ then Ψ | Γ ⊢₀ Type 𝓀 ⇐ Type ℓ case u of Just l => unless (k < l) $ throw $ BadUniverse k l Nothing => pure () checkType' ctx (Pi qty arg res) u = do -- if Ψ | Γ ⊢₀ A ⇐ Type ℓ checkTypeC ctx arg u -- if Ψ | Γ, x : A ⊢₀ B ⇐ Type ℓ case res.body of Y res' => checkTypeC (extendTy Zero res.name arg ctx) res' u N res' => checkTypeC ctx res' u -- then Ψ | Γ ⊢₀ (π·x : A) → B ⇐ Type ℓ checkType' ctx t@(Lam {}) u = throw $ NotType ctx t checkType' ctx (Sig fst snd) u = do -- if Ψ | Γ ⊢₀ A ⇐ Type ℓ checkTypeC ctx fst u -- if Ψ | Γ, x : A ⊢₀ B ⇐ Type ℓ case snd.body of Y snd' => checkTypeC (extendTy Zero snd.name fst ctx) snd' u N snd' => checkTypeC ctx snd' u -- then Ψ | Γ ⊢₀ (x : A) × B ⇐ Type ℓ checkType' ctx t@(Pair {}) u = throw $ NotType ctx t checkType' ctx (Enum _) u = pure () -- Ψ | Γ ⊢₀ {ts} ⇐ Type ℓ checkType' ctx t@(Tag {}) u = throw $ NotType ctx t checkType' ctx (Eq t l r) u = do -- if Ψ, i | Γ ⊢₀ A ⇐ Type ℓ case t.body of Y t' => checkTypeC (extendDim t.name ctx) t' u N t' => checkTypeC ctx t' u -- if Ψ | Γ ⊢₀ l ⇐ A‹0› check0 ctx l t.zero -- if Ψ | Γ ⊢₀ r ⇐ A‹1› check0 ctx r t.one -- then Ψ | Γ ⊢₀ Eq [i ⇒ A] l r ⇐ Type ℓ checkType' ctx t@(DLam {}) u = throw $ NotType ctx t checkType' ctx Nat u = pure () checkType' ctx Zero u = throw $ NotType ctx Zero checkType' ctx t@(Succ _) u = throw $ NotType ctx t checkType' ctx (BOX q ty) u = checkType ctx ty u checkType' ctx t@(Box _) u = throw $ NotType ctx t checkType' ctx (E e) u = do -- if Ψ | Γ ⊢₀ E ⇒ Type ℓ infres <- inferC ctx szero e -- if Ψ | Γ ⊢ Type ℓ <: Type 𝓀 case u of Just u => subtype ctx infres.type (TYPE u) Nothing => ignore $ expectTYPE !ask ctx infres.type -- then Ψ | Γ ⊢₀ E ⇐ Type 𝓀 private covering infer' : TyContext d n -> SQty -> (subj : Elim d n) -> (0 nc : NotClo subj) => TC (InferResult' d n) infer' ctx sg (F x) = do -- if π·x : A {≔ s} in global context g <- lookupFree x -- if σ ≤ π expectCompatQ sg.fst g.qty.fst -- then Ψ | Γ ⊢ σ · x ⇒ A ⊳ 𝟎 pure $ InfRes {type = injectT ctx g.type, qout = zeroFor ctx} where lookupFree : Name -> TC Definition lookupFree x = lookupFree' !ask x infer' ctx sg (B i) = -- if x : A ∈ Γ -- then Ψ | Γ ⊢ σ · x ⇒ A ⊳ (𝟎, σ·x, 𝟎) pure $ lookupBound sg.fst i ctx.tctx where lookupBound : forall n. Qty -> Var n -> TContext d n -> InferResult' d n lookupBound pi VZ (ctx :< ty) = InfRes {type = weakT ty, qout = zeroFor ctx :< pi} lookupBound pi (VS i) (ctx :< _) = let InfRes {type, qout} = lookupBound pi i ctx in InfRes {type = weakT type, qout = qout :< Zero} infer' ctx sg (fun :@ arg) = do -- if Ψ | Γ ⊢ σ · f ⇒ (π·x : A) → B ⊳ Σ₁ funres <- inferC ctx sg fun (qty, argty, res) <- expectPi !ask ctx funres.type -- if Ψ | Γ ⊢ σ ⨴ π · s ⇐ A ⊳ Σ₂ argout <- checkC ctx (subjMult sg qty) arg argty -- then Ψ | Γ ⊢ σ · f s ⇒ B[s] ⊳ Σ₁ + Σ₂ pure $ InfRes { type = sub1 res $ arg :# argty, qout = funres.qout + argout } infer' ctx sg (CasePair pi pair ret body) = do -- no check for 1 ≤ π, since pairs have a single constructor. -- e.g. at 0 the components are also 0 in the body -- -- if Ψ | Γ ⊢ σ · pair ⇒ (x : A) × B ⊳ Σ₁ pairres <- inferC ctx sg pair -- if Ψ | Γ, p : (x : A) × B ⊢₀ ret ⇐ Type checkTypeC (extendTy Zero ret.name pairres.type ctx) ret.term Nothing (tfst, tsnd) <- expectSig !ask ctx pairres.type -- if Ψ | Γ, x : A, y : B ⊢ σ · body ⇐ -- ret[(x, y) ∷ (x : A) × B/p] ⊳ Σ₂, ρ₁·x, ρ₂·y -- with ρ₁, ρ₂ ≤ πσ let [< x, y] = body.names pisg = pi * sg.fst bodyctx = extendTyN [< (pisg, x, tfst), (pisg, y, tsnd.term)] ctx bodyty = substCasePairRet pairres.type ret bodyout <- checkC bodyctx sg body.term bodyty >>= popQs [< pisg, pisg] -- then Ψ | Γ ⊢ σ · case ⋯ ⇒ ret[pair/p] ⊳ πΣ₁ + Σ₂ pure $ InfRes { type = sub1 ret pair, qout = pi * pairres.qout + bodyout } infer' ctx sg (CaseEnum pi t ret arms) {d, n} = do -- if Ψ | Γ ⊢ σ · t ⇒ {ts} ⊳ Σ₁ tres <- inferC ctx sg t ttags <- expectEnum !ask ctx tres.type -- if 1 ≤ π, OR there is only zero or one option unless (length (SortedSet.toList ttags) <= 1) $ expectCompatQ One pi -- if Ψ | Γ, x : {ts} ⊢₀ A ⇐ Type checkTypeC (extendTy Zero ret.name tres.type ctx) ret.term Nothing -- if for each "a ⇒ s" in arms, -- Ψ | Γ ⊢ σ · s ⇐ A[a ∷ {ts}/x] ⊳ Σᵢ -- with Σ₂ = lubs Σᵢ let arms = SortedMap.toList arms let armTags = SortedSet.fromList $ map fst arms unless (ttags == armTags) $ throw $ BadCaseEnum ttags armTags armres <- for arms $ \(a, s) => checkC ctx sg s (sub1 ret (Tag a :# tres.type)) let Just armout = lubs ctx armres | _ => throw $ BadCaseQtys ctx $ zipWith (\qs, (t, rhs) => (qs, Tag t)) armres arms pure $ InfRes { type = sub1 ret t, qout = pi * tres.qout + armout } infer' ctx sg (CaseNat pi pi' n ret zer suc) = do -- if 1 ≤ π expectCompatQ One pi -- if Ψ | Γ ⊢ σ · n ⇒ ℕ ⊳ Σn nres <- inferC ctx sg n expectNat !ask ctx nres.type -- if Ψ | Γ, n : ℕ ⊢₀ A ⇐ Type checkTypeC (extendTy Zero ret.name Nat ctx) ret.term Nothing -- if Ψ | Γ ⊢ σ · zer ⇐ A[0 ∷ ℕ/n] ⊳ Σz zerout <- checkC ctx sg zer (sub1 ret (Zero :# Nat)) -- if Ψ | Γ, n : ℕ, ih : A ⊢ σ · suc ⇐ A[succ p ∷ ℕ/n] ⊳ Σs, ρ₁.p, ρ₂.ih -- with ρ₂ ≤ π'σ, (ρ₁ + ρ₂) ≤ πσ let [< p, ih] = suc.names pisg = pi * sg.fst sucCtx = extendTyN [< (pisg, p, Nat), (pi', ih, ret.term)] ctx sucType = substCaseSuccRet ret sucout :< qp :< qih <- checkC sucCtx sg suc.term sucType expectCompatQ qih (pi' * sg.fst) -- [fixme] better error here expectCompatQ (qp + qih) pisg -- then Ψ | Γ ⊢ case ⋯ ⇒ A[n] ⊳ πΣn + Σz + ωΣs pure $ InfRes { type = sub1 ret n, qout = pi * nres.qout + zerout + Any * sucout } infer' ctx sg (CaseBox pi box ret body) = do -- if Ψ | Γ ⊢ σ · b ⇒ [ρ.A] ⊳ Σ₁ boxres <- inferC ctx sg box (q, ty) <- expectBOX !ask ctx boxres.type -- if Ψ | Γ, x : [ρ.A] ⊢₀ R ⇐ Type checkTypeC (extendTy Zero ret.name boxres.type ctx) ret.term Nothing -- if Ψ | Γ, x : A ⊢ t ⇐ R[[x] ∷ [ρ.A/x]] ⊳ Σ₂, ς·x -- with ς ≤ ρπσ let qpisg = q * pi * sg.fst bodyCtx = extendTy qpisg body.name ty ctx bodyType = substCaseBoxRet ty ret bodyout <- checkC bodyCtx sg body.term bodyType >>= popQ qpisg -- then Ψ | Γ ⊢ case ⋯ ⇒ R[b/x] ⊳ Σ₁ + Σ₂ pure $ InfRes { type = sub1 ret box, qout = boxres.qout + bodyout } infer' ctx sg (fun :% dim) = do -- if Ψ | Γ ⊢ σ · f ⇒ Eq [𝑖 ⇒ A] l r ⊳ Σ InfRes {type, qout} <- inferC ctx sg fun ty <- fst <$> expectEq !ask ctx type -- then Ψ | Γ ⊢ σ · f p ⇒ A‹p/𝑖› ⊳ Σ pure $ InfRes {type = dsub1 ty dim, qout} infer' ctx sg (term :# type) = do -- if Ψ | Γ ⊢₀ A ⇐ Type ℓ checkTypeC ctx type Nothing -- if Ψ | Γ ⊢ σ · s ⇐ A ⊳ Σ qout <- checkC ctx sg term type -- then Ψ | Γ ⊢ σ · (s ∷ A) ⇒ A ⊳ Σ pure $ InfRes {type, qout}