a35cce38b3
closes #426
27 lines
824 B
Text
27 lines
824 B
Text
import logic
|
||
open decidable
|
||
open eq
|
||
namespace experiment
|
||
inductive nat : Type :=
|
||
zero : nat,
|
||
succ : nat → nat
|
||
definition refl := @eq.refl
|
||
namespace nat
|
||
|
||
definition pred (n : nat) := nat.rec zero (fun m x, m) n
|
||
theorem pred_zero : pred zero = zero := refl _
|
||
theorem pred_succ (n : nat) : pred (succ n) = n := refl _
|
||
|
||
theorem zero_or_succ (n : nat) : n = zero ∨ n = succ (pred n)
|
||
:= nat.induction_on n
|
||
(or.intro_left _ (refl zero))
|
||
(take m IH, or.intro_right _
|
||
(show succ m = succ (pred (succ m)), from congr_arg succ (symm (pred_succ m))))
|
||
|
||
theorem zero_or_succ2 (n : nat) : n = zero ∨ n = succ (pred n)
|
||
:= @nat.induction_on _ n
|
||
(or.intro_left _ (refl zero))
|
||
(take m IH, or.intro_right _
|
||
(show succ m = succ (pred (succ m)), from congr_arg succ (symm (pred_succ m))))
|
||
end nat
|
||
end experiment
|