parent
e1257560b7
commit
b85dcb5402
4 changed files with 86 additions and 21 deletions
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@ -5,3 +5,4 @@ load "maybe.quox"
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load "nat.quox"
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load "pair.quox"
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load "list.quox"
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load "eta.quox"
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13
examples/eta.quox
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13
examples/eta.quox
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@ -0,0 +1,13 @@
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namespace eta {
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def0 Π : (A : ★) → (A → ★) → ★ = λ A B ⇒ (x : A) → B x
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def0 function : (A : ★) → (B : A → Type) → (P : Π A B → ★) → (f : Π A B) →
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P (λ x ⇒ f x) → P f =
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λ A B P f p ⇒ p
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def0 box : (A : ★) → (P : [ω.A] → ★) → (e : [ω.A]) →
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P [case1 e return A of {[x] ⇒ x}] → P e =
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λ A P e p ⇒ p
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}
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@ -140,12 +140,6 @@ compareType : Definitions -> EqContext n -> (s, t : Term 0 n) ->
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Eff EqualInner ()
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||| converts an elim "Γ ⊢ e" to "Γ, x ⊢ e x", for comparing with
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||| a lambda "Γ ⊢ λx ⇒ t" that has been converted to "Γ, x ⊢ t".
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private %inline
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toLamBody : Elim d n -> Term d (S n)
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toLamBody e = E $ App (weakE 1 e) (BVT 0 e.loc) e.loc
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namespace Term
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private covering
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compare0' : (defs : Definitions) -> EqContext n ->
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@ -174,13 +168,16 @@ namespace Term
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(Lam {}, t) => wrongType t.loc ctx ty t
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(E _, t) => wrongType t.loc ctx ty t
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(s, _) => wrongType s.loc ctx ty s
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where
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ctx' : EqContext (S n)
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ctx' = extendTy qty res.name arg ctx
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where
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ctx' : EqContext (S n)
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ctx' = extendTy qty res.name arg ctx
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eta : Loc -> Elim 0 n -> ScopeTerm 0 n -> Eff EqualInner ()
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eta _ e (S _ (Y b)) = compare0 defs ctx' res.term (toLamBody e) b
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eta loc e (S _ (N _)) = clashT loc ctx ty s t
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toLamBody : Elim d n -> Term d (S n)
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toLamBody e = E $ App (weakE 1 e) (BVT 0 e.loc) e.loc
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eta : Loc -> Elim 0 n -> ScopeTerm 0 n -> Eff EqualInner ()
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eta loc e (S _ (N _)) = clashT loc ctx ty s t
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eta _ e (S _ (Y b)) = compare0 defs ctx' res.term (toLamBody e) b
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compare0' defs ctx ty@(Sig {fst, snd, _}) s t = local_ Equal $
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case (s, t) of
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@ -251,18 +248,30 @@ namespace Term
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(E _, t) => wrongType t.loc ctx nat t
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(s, _) => wrongType s.loc ctx nat s
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compare0' defs ctx ty@(BOX q ty' {}) s t = local_ Equal $
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compare0' defs ctx bty@(BOX q ty {}) s t = local_ Equal $
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case (s, t) of
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-- Γ ⊢ s = t : A
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-- -----------------------
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-- Γ ⊢ [s] = [t] : [π.A]
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(Box s' {}, Box t' {}) => compare0 defs ctx ty' s' t'
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(Box s _, Box t _) => compare0 defs ctx ty s t
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-- Γ ⊢ s = (case1 e return A of {[x] ⇒ x}) ⇐ A
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-- -----------------------------------------------
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-- Γ ⊢ [s] = e ⇐ [ρ.A]
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(Box s loc, E f) => eta s f
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(E e, Box t loc) => eta t e
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(E e, E f) => ignore $ Elim.compare0 defs ctx e f
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(Box {}, t) => wrongType t.loc ctx ty t
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(E _, t) => wrongType t.loc ctx ty t
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(s, _) => wrongType s.loc ctx ty s
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(Box {}, _) => wrongType t.loc ctx bty t
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(E _, _) => wrongType t.loc ctx bty t
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_ => wrongType s.loc ctx bty s
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where
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eta : Term 0 n -> Elim 0 n -> Eff EqualInner ()
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eta s e = do
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nm <- mnb "inner" e.loc
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let e = CaseBox One e (SN ty) (SY [< nm] (BVT 0 nm.loc)) e.loc
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compare0 defs ctx ty s (E e)
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compare0' defs ctx ty@(E _) s t = do
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-- a neutral type can only be inhabited by neutral values
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@ -48,6 +48,7 @@ tests : Test
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tests = "equality & subtyping" :- [
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note #""s{t,…}" for term substs; "s‹p,…›" for dim substs"#,
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note #""0=1 ⊢ 𝒥" means that 𝒥 holds in an inconsistent dim context"#,
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note "binds before ∥ are globals, after it are BVs",
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"universes" :- [
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testEq "★₀ = ★₀" $
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@ -165,7 +166,6 @@ tests = "equality & subtyping" :- [
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refl a x = ^Ann (^DLam (SN x)) (^Eq0 a x x)
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in
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[
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note "binds before ∥ are globals, after it are BVs",
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note #"refl A x is an abbreviation for "(δ i ⇒ x) ∷ (x ≡ x : A)""#,
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testEq "refl A a = refl A a" $
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equalE empty
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@ -523,9 +523,51 @@ tests = "equality & subtyping" :- [
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todo "enum",
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todo "enum elim",
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todo "box types",
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todo "boxes",
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todo "box elim",
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"box types" :- [
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testEq "[1.A] = [1.A] : ★" $
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equalT empty
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(^TYPE 0)
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(^BOX One (^FT "A" 0))
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(^BOX One (^FT "A" 0)),
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testNeq "[1.A] ≠ [ω.A] : ★" $
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equalT empty
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(^TYPE 0)
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(^BOX One (^FT "A" 0))
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(^BOX Any (^FT "A" 0)),
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testNeq "[1.A] ≠ [1.B] : ★" $
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equalT empty
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(^TYPE 0)
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(^BOX One (^FT "A" 0))
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(^BOX One (^FT "B" 0)),
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testNeq "[1.A] ≠ A : ★" $
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equalT empty
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(^TYPE 0)
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(^BOX One (^FT "A" 0))
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(^FT "A" 0),
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testEq "0=1 ⊢ [1.A] = [1.B] : ★" $
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equalT empty01
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(^TYPE 0)
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(^BOX One (^FT "A" 0))
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(^BOX One (^FT "B" 0))
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],
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"boxes" :- [
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testEq "[a] = [a] : [ω.A]" $
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equalT empty
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(^BOX Any (^FT "A" 0))
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(^Box (^FT "a" 0))
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(^Box (^FT "a" 0)),
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testNeq "[a] ≠ [a'] : [ω.A]" $
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equalT empty
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(^BOX Any (^FT "A" 0))
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(^Box (^FT "a" 0))
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(^Box (^FT "a'" 0)),
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testEq "ω.x : [ω.A] ⊢ x = [case1 b return A of {[y] ⇒ y}] : [ω.A]" $
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equalT (ctx [< ("x", ^BOX Any (^FT "A" 0))])
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(^BOX Any (^FT "A" 0))
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(^BVT 0)
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(^Box (E $ ^CaseBox One (^BV 0) (SN $ ^FT "A" 0) (SY [< "y"] (^BVT 0))))
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],
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"elim closure" :- [
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note "bold numbers for de bruijn indices",
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