8c956280d9
Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>
29 lines
1.5 KiB
Text
29 lines
1.5 KiB
Text
import Int.
|
|
variable P : Int -> Int -> Bool
|
|
|
|
set::opaque exists false.
|
|
|
|
theorem T1 (R1 : not (exists x y, P x y)) : forall x y, not (P x y) :=
|
|
forall::intro (fun a,
|
|
forall::intro (fun b,
|
|
forall::elim (not::not::elim (forall::elim (not::not::elim R1) a)) b))
|
|
|
|
axiom Ax : forall x, exists y, P x y
|
|
|
|
theorem T2 : exists x y, P x y :=
|
|
refute (fun R : not (exists x y, P x y),
|
|
let L1 : forall x y, not (P x y) := forall::intro (fun a,
|
|
forall::intro (fun b,
|
|
forall::elim (not::not::elim (forall::elim (not::not::elim R) a)) b)),
|
|
L2 : exists y, P 0 y := forall::elim Ax 0
|
|
in exists::elim L2 (fun (w : Int) (H : P 0 w),
|
|
absurd H (forall::elim (forall::elim L1 0) w))).
|
|
|
|
theorem T3 (A : (Type U)) (P : A -> A -> Bool) (a : A) (H1 : forall x, exists y, P x y) : exists x y, P x y :=
|
|
refute (fun R : not (exists x y, P x y),
|
|
let L1 : forall x y, not (P x y) := forall::intro (fun a,
|
|
forall::intro (fun b,
|
|
forall::elim (not::not::elim (forall::elim (not::not::elim R) a)) b)),
|
|
L2 : exists y, P a y := forall::elim H1 a
|
|
in exists::elim L2 (fun (w : A) (H : P a w),
|
|
absurd H (forall::elim (forall::elim L1 a) w))).
|