Proof of Nuprl Lemma : hdf-union-eq-disju

Step * of Lemma hdf-union-eq-disju

∀[A,B,C:Type]. ∀[X:hdataflow(A;B)]. ∀[Y:hdataflow(A;C)].
  (X + Y = (λx.(inl x)) o X || (λx.(inr x )) o Y ∈ hdataflow(A;B + C)) supposing
     (valueall-type(B) and
     valueall-type(C))
BY
{ (Auto THEN BLemma `hdataflow-equal` THEN Auto) }

1
1. A : Type
2. B : Type
3. C : Type
4. X : hdataflow(A;B)
5. Y : hdataflow(A;C)
6. valueall-type(C)
7. valueall-type(B)
8. inputs : A List
⊢ hdf-halted(X + Y*(inputs)) = hdf-halted((λx.(inl x)) o X || (λx.(inr x )) o Y*(inputs))

2
1. A : Type
2. B : Type
3. C : Type
4. X : hdataflow(A;B)
5. Y : hdataflow(A;C)
6. valueall-type(C)
7. valueall-type(B)
8. inputs : A List
9. hdf-halted(X + Y*(inputs)) = hdf-halted((λx.(inl x)) o X || (λx.(inr x )) o Y*(inputs))
10. a : A

⊢ hdf-out(X + Y*(inputs);a) = hdf-out((λx.(inl x)) o X || (λx.(inr x )) o Y*(inputs);a) ∈ bag(B + C)

Latex:

Latex:
\mforall{}[A,B,C:Type]. \mforall{}[X:hdataflow(A;B)]. \mforall{}[Y:hdataflow(A;C)]. (X + Y = (\mlambda{}x.(inl x)) o X || (\mlambda{}x.(inr x )) o Y) supposing (valueall-type(B) and valueall-type(C)) By Latex: (Auto THEN BLemma `hdataflow-equal` THEN Auto) Home Index