dd72269b13
It is not nice to have Set as a reserved keyword. See example examples/lean/set.lean Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>
50 lines
No EOL
2.5 KiB
Text
50 lines
No EOL
2.5 KiB
Text
Variable Eq {A : Type U+1} (a b : A) : Bool
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Infix 50 === : Eq
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Axiom EqSubst {A : Type U+1} {a b : A} (P : A -> Bool) (H1 : P a) (H2 : a === b) : P b
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Axiom EqRefl {A : Type U+1} (a : A) : a === a
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Theorem EqSymm {A : Type U+1} {a b : A} (H : a === b) : b === a :=
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EqSubst (fun x, x === a) (EqRefl a) H
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Theorem EqTrans {A : Type U+1} {a b c : A} (H1 : a === b) (H2 : b === c) : a === c :=
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EqSubst (fun x, a === x) H1 H2
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Theorem EqCongr {A B : Type U+1} (f : A -> B) {a b : A} (H : a === b) : (f a) === (f b) :=
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EqSubst (fun x, (f a) === (f x)) (EqRefl (f a)) H
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Theorem EqCongr1 {A : Type U+1} {B : A -> Type U+1} {f g : Pi x : A, B x} (a : A) (H : f === g) : (f a) === (g a) :=
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EqSubst (fun h : (Pi x : A, B x), (f a) === (h a)) (EqRefl (f a)) H
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Axiom ProofIrrelevance (P : Bool) (pr1 pr2 : P) : pr1 === pr2
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Axiom EqCast {A B : Type U} (H : A === B) (a : A) : B
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Axiom EqCastHom {A B : Type U} {a1 a2 : A} (HAB : A === B) (H : a1 === a2) : (EqCast HAB a1) === (EqCast HAB a2)
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Axiom EqCastRefl {A : Type U} (a : A) : (EqCast (EqRefl A) a) === a
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Variable Vector : (Type U) -> Nat -> (Type U)
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Variable empty {A : Type U} : Vector A 0
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Variable append {A : Type U} {m n : Nat} (v1 : Vector A m) (v2 : Vector A n) : Vector A (m + n)
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Axiom Plus0 (n : Nat) : (n + 0) === n
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Theorem VectorPlus0 (A : Type U) (n : Nat) : (Vector A (n + 0)) === (Vector A n) :=
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EqSubst (fun x : Nat, (Vector A x) === (Vector A n))
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(EqRefl (Vector A n))
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(EqSymm (Plus0 n))
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SetOption pp::implicit true
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(* Check fun (A : Type) (n : Nat), VectorPlus0 A n *)
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Axiom AppendNil {A : Type} {n : Nat} (v : Vector A n) : (EqCast (VectorPlus0 A n) (append v empty)) === v
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Variable List : Type U -> Type U.
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Variables A B : Type U
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Axiom H1 : A === B.
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Theorem LAB : (List A) === (List B) :=
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EqCongr List H1
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Variable l1 : List A
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Variable l2 : List B
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Variable H2 : (EqCast LAB l1) == l2
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(*
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Theorem EqCastInv {A B : Type U} (H : A === B) (a : A) : (EqCast (EqSymm H) (EqCast H a)) === a :=
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*)
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(*
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Variable ReflCast : Pi (A : Type U) (a : A) (H : Eq (Type U) A A), Eq A (Casting A A H a) a
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Theorem AppEq (A : Type U) (B : A -> Type U) (a b : A) (H : Eq A a b) : (Eq (Type U) (B b) (B a)) :=
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EqCongr A (Type U) B b a (EqSymm A a b H)
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Theorem EqCongr2 (A : Type U) (B : A -> Type U) (f : Pi x : A, B x) (a b : A) (H : Eq A a b) : Eq (B a) (f a) (Casting (B b) (B a) (AppEq A B a b H) (f a)) (f b) :=
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EqSubst (B a) a b (fun x : A, Eq (B a) (f a) (Casting (B x) (B a) (AppEq A B a b H) (f a)) (f x)
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*) |