Proof of Nuprl Lemma : assert-dlo

Step * 10 of Lemma assert-dlo_eq

1. x : Prop
2. x1 : Prop
3. ∀b:dl-Obj(). (↑dlo_eq(prop(x);b) ⇐⇒ prop(x) = b ∈ dl-Obj())
4. ∀b:dl-Obj(). (↑dlo_eq(prop(x1);b) ⇐⇒ prop(x1) = b ∈ dl-Obj())
⊢ ∀b:dl-Obj(). (↑dlo_eq(prop(x ∨ x1);b) ⇐⇒ prop(x ∨ x1) = b ∈ dl-Obj())
BY
{ (dlObjInduction
   THEN Intros
   THEN Unfold `dlo_eq` 0
   THEN (Unfold `dlo-eq` 0 THEN RW (HigherC MrecIndC) 0)
   THEN Try (Fold `dlo-eq` 0)
   THEN Try (Fold `dlo_eq` 0)
   THEN RW (SweepUpC BetaC) 0
   THEN RW (SweepUpC ReduceC) 0
   THEN Auto
   THEN Try (((Assert "prog" = "prop" ∈ Atom BY Complete (Auto)) THEN Auto))) }

1
1. x : Prop
2. x1 : Prop
3. ∀b:dl-Obj(). (↑dlo_eq(prop(x);b) ⇐⇒ prop(x) = b ∈ dl-Obj())
4. ∀b:dl-Obj(). (↑dlo_eq(prop(x1);b) ⇐⇒ prop(x1) = b ∈ dl-Obj())
5. x@0 : Prop
6. x1@0 : Prop
7. (↑dlo_eq(prop(x ∨ x1);prop(x@0))) ⇒ (prop(x ∨ x1) = prop(x@0) ∈ dl-Obj())
8. (↑dlo_eq(prop(x ∨ x1);prop(x@0))) ⇐ prop(x ∨ x1) = prop(x@0) ∈ dl-Obj()
9. (↑dlo_eq(prop(x ∨ x1);prop(x1@0))) ⇒ (prop(x ∨ x1) = prop(x1@0) ∈ dl-Obj())
10. (↑dlo_eq(prop(x ∨ x1);prop(x1@0))) ⇐ prop(x ∨ x1) = prop(x1@0) ∈ dl-Obj()
11. ↑(dlo_eq(prop(x);prop(x@0)) ∧_b dlo_eq(prop(x1);prop(x1@0)))
⊢ prop(x ∨ x1) = prop(x@0 ∨ x1@0) ∈ dl-Obj()

Latex:

Latex:
1. x : Prop 2. x1 : Prop 3. \mforall{}b:dl-Obj(). (\muparrow{}dlo\_eq(prop(x);b) \mLeftarrow{}{}\mRightarrow{} prop(x) = b) 4. \mforall{}b:dl-Obj(). (\muparrow{}dlo\_eq(prop(x1);b) \mLeftarrow{}{}\mRightarrow{} prop(x1) = b) \mvdash{} \mforall{}b:dl-Obj(). (\muparrow{}dlo\_eq(prop(x \mvee{} x1);b) \mLeftarrow{}{}\mRightarrow{} prop(x \mvee{} x1) = b) By Latex: (dlObjInduction THEN Intros THEN Unfold `dlo\_eq` 0 THEN (Unfold `dlo-eq` 0 THEN RW (HigherC MrecIndC) 0) THEN Try (Fold `dlo-eq` 0) THEN Try (Fold `dlo\_eq` 0) THEN RW (SweepUpC BetaC) 0 THEN RW (SweepUpC ReduceC) 0 THEN Auto THEN Try (((Assert "prog" = "prop" BY Complete (Auto)) THEN Auto))) Home Index