Proof of Nuprl Lemma : es-interface-extensionality

Step * of Lemma es-interface-extensionality

∀[Info,A:Type]. ∀[X,Y:EClass(A)].
  (X = Y ∈ EClass(A)) supposing
     ((∀es:EO+(Info). ∀e:E.  ((↑e ∈_b X) ⇒ (↑e ∈_b Y) ⇒ (X(e) = Y(e) ∈ A))) and
     (∀es:EO+(Info). ∀e:E.  (↑e ∈_b X ⇐⇒ ↑e ∈_b Y)) and
     Singlevalued(X) and
     Singlevalued(Y))
BY
{ (Auto
   THEN Auto
   THEN All (Unfold `eclass`)
   THEN Ext
   THEN Auto
   THEN RenameVar `es' (-1)
   THEN Ext
   THEN Auto
   THEN RenameVar `e' (-1)) }

1
1. Info : Type
2. A : Type
3. X : es:EO+(Info) ⟶ e:E ⟶ bag(A)
4. Y : es:EO+(Info) ⟶ e:E ⟶ bag(A)
5. Singlevalued(Y)
6. Singlevalued(X)
7. ∀es:EO+(Info). ∀e:E.  (↑e ∈_b X ⇐⇒ ↑e ∈_b Y)
8. ∀es:EO+(Info). ∀e:E.  ((↑e ∈_b X) ⇒ (↑e ∈_b Y) ⇒ (X(e) = Y(e) ∈ A))
9. es : EO+(Info)
10. e : E
⊢ (X es e) = (Y es e) ∈ bag(A)

Latex:

Latex:
\mforall{}[Info,A:Type]. \mforall{}[X,Y:EClass(A)]. (X = Y) supposing ((\mforall{}es:EO+(Info). \mforall{}e:E. ((\muparrow{}e \mmember{}\msubb{} X) {}\mRightarrow{} (\muparrow{}e \mmember{}\msubb{} Y) {}\mRightarrow{} (X(e) = Y(e)))) and (\mforall{}es:EO+(Info). \mforall{}e:E. (\muparrow{}e \mmember{}\msubb{} X \mLeftarrow{}{}\mRightarrow{} \muparrow{}e \mmember{}\msubb{} Y)) and Singlevalued(X) and Singlevalued(Y)) By Latex: (Auto THEN Auto THEN All (Unfold `eclass`) THEN Ext THEN Auto THEN RenameVar `es' (-1) THEN Ext THEN Auto THEN RenameVar `e' (-1)) Home Index