lean2/tests/lean/elab5.lean.expected.out

  Set: pp::colors
  Set: pp::unicode
  Assumed: C
  Assumed: D
  Assumed: R
  Proved: R2
  Set: lean::pp::implicit
Variable C {A B : Type} (H : eq::explicit Type A B) (a : A) : B
Variable D {A A' : Type} {B : A → Type} {B' : A' → Type} (H : eq::explicit Type (Π x : A, B x) (Π x : A', B' x)) :
    eq::explicit Type A A'
Variable R {A A' : Type}
    {B : A → Type}
    {B' : A' → Type}
    (H : eq::explicit Type (Π x : A, B x) (Π x : A', B' x))
    (a : A) :
    eq::explicit Type (B a) (B' (C::explicit A A' (D::explicit A A' (λ x : A, B x) (λ x : A', B' x) H) a))
Theorem R2 (A1 A2 B1 B2 : Type) (H : eq::explicit Type (A1 → B1) (A2 → B2)) (a : A1) : eq::explicit Type B1 B2 :=
    R::explicit A1 A2 (λ x : A1, B1) (λ x : A2, B2) H a
Display the input term in the output of the Check command. It is useful to see the fully elaborated term. Signed-off-by: Leonardo de Moura <leonardo@microsoft.com> 2013-09-09 05:54:22 +00:00			`Set: pp::colors`
			`Set: pp::unicode`
			`Assumed: C`
			`Assumed: D`
			`Assumed: R`
			`Proved: R2`
			`Set: lean::pp::implicit`
refactor(equality): make homogeneous equality the default equality It was not a good idea to use heterogeneous equality as the default equality in Lean. It creates the following problems. - Heterogeneous equality does not propagate constraints in the elaborator. For example, suppose that l has type (List Int), then the expression l = nil will not propagate the type (List Int) to nil. - It is easy to write false. For example, suppose x has type Real, and the user writes x = 0. This is equivalent to false, since 0 has type Nat. The elaborator cannot introduce the coercion since x = 0 is a type correct expression. Homogeneous equality does not suffer from the problems above. We keep heterogeneous equality because it is useful for generating proof terms. Signed-off-by: Leonardo de Moura <leonardo@microsoft.com> 2013-10-29 23:20:02 +00:00			`Variable C {A B : Type} (H : eq::explicit Type A B) (a : A) : B`
			`Variable D {A A' : Type} {B : A → Type} {B' : A' → Type} (H : eq::explicit Type (Π x : A, B x) (Π x : A', B' x)) :`
			`eq::explicit Type A A'`
			`Variable R {A A' : Type}`
			`{B : A → Type}`
			`{B' : A' → Type}`
			`(H : eq::explicit Type (Π x : A, B x) (Π x : A', B' x))`
			`(a : A) :`
			`eq::explicit Type (B a) (B' (C::explicit A A' (D::explicit A A' (λ x : A, B x) (λ x : A', B' x) H) a))`
			`Theorem R2 (A1 A2 B1 B2 : Type) (H : eq::explicit Type (A1 → B1) (A2 → B2)) (a : A1) : eq::explicit Type B1 B2 :=`
fix(tests/lean): adjust expected results, the new result is also acceptable Signed-off-by: Leonardo de Moura <leonardo@microsoft.com> 2013-10-25 00:54:09 +00:00			`R::explicit A1 A2 (λ x : A1, B1) (λ x : A2, B2) H a`