a3bbd9fbb5
Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>
59 lines
2.1 KiB
Text
59 lines
2.1 KiB
Text
Set pp::colors false
|
||
Variable N : Type
|
||
Variable h : N -> N -> N
|
||
|
||
Theorem CongrH {a1 a2 b1 b2 : N} (H1 : a1 = b1) (H2 : a2 = b2) : (h a1 a2) = (h b1 b2) :=
|
||
Congr (Congr (Refl h) H1) H2
|
||
|
||
(* Display the theorem showing implicit arguments *)
|
||
Set lean::pp::implicit true
|
||
Show Environment 2
|
||
|
||
(* Display the theorem hiding implicit arguments *)
|
||
Set lean::pp::implicit false
|
||
Show Environment 2
|
||
|
||
Theorem Example1 (a b c d : N) (H: (a = b ∧ b = c) ∨ (a = d ∧ d = c)) : (h a b) = (h c b) :=
|
||
DisjCases H
|
||
(fun H1 : a = b ∧ b = c,
|
||
CongrH (Trans (Conjunct1 H1) (Conjunct2 H1)) (Refl b))
|
||
(fun H1 : a = d ∧ d = c,
|
||
CongrH (Trans (Conjunct1 H1) (Conjunct2 H1)) (Refl b))
|
||
|
||
(* Show proof of the last theorem with all implicit arguments *)
|
||
Set lean::pp::implicit true
|
||
Show Environment 1
|
||
|
||
(* Using placeholders to hide the type of H1 *)
|
||
Theorem Example2 (a b c d : N) (H: (a = b ∧ b = c) ∨ (a = d ∧ d = c)) : (h a b) = (h c b) :=
|
||
DisjCases H
|
||
(fun H1 : _,
|
||
CongrH (Trans (Conjunct1 H1) (Conjunct2 H1)) (Refl b))
|
||
(fun H1 : _,
|
||
CongrH (Trans (Conjunct1 H1) (Conjunct2 H1)) (Refl b))
|
||
|
||
Set lean::pp::implicit true
|
||
Show Environment 1
|
||
|
||
(* Same example but the first conjuct has unnecessary stuff *)
|
||
Theorem Example3 (a b c d e : N) (H: (a = b ∧ b = e ∧ b = c) ∨ (a = d ∧ d = c)) : (h a b) = (h c b) :=
|
||
DisjCases H
|
||
(fun H1 : _,
|
||
CongrH (Trans (Conjunct1 H1) (Conjunct2 (Conjunct2 H1))) (Refl b))
|
||
(fun H1 : _,
|
||
CongrH (Trans (Conjunct1 H1) (Conjunct2 H1)) (Refl b))
|
||
|
||
Set lean::pp::implicit false
|
||
Show Environment 1
|
||
|
||
Theorem Example4 (a b c d e : N) (H: (a = b ∧ b = e ∧ b = c) ∨ (a = d ∧ d = c)) : (h a c) = (h c a) :=
|
||
DisjCases H
|
||
(fun H1 : _,
|
||
let AeqC := Trans (Conjunct1 H1) (Conjunct2 (Conjunct2 H1))
|
||
in CongrH AeqC (Symm AeqC))
|
||
(fun H1 : _,
|
||
let AeqC := Trans (Conjunct1 H1) (Conjunct2 H1)
|
||
in CongrH AeqC (Symm AeqC))
|
||
|
||
Set lean::pp::implicit false
|
||
Show Environment 1
|