Proof of Nuprl Lemma : es-cut-add-at

Step * 1 4 of Lemma es-cut-add-at

1. Info : Type
2. es : EO+(Info)
3. X : EClass(Top)
4. f : sys-antecedent(es;X)
5. c : Cut(X;f)
6. e : E(X)
7. (¬((f e) = e ∈ E(X))) ⇒ f e ∈ c
8. (↑e ∈_b prior(X)) ⇒ prior(X)(e) ∈ c
9. ¬e ∈ c
10. c+e ∈ Cut(X;f)
11. c+e ∈ fset(E)
⊢ set-equal({e':E(X)| loc(e') = loc(e) ∈ Id} ;c+e(loc(e));c(loc(e)) @ [e])
BY

{ (((InstLemma `es-cut-at-property` [Info; ⌈es⌉;⌈X⌉;⌈f⌉;⌈c+e⌉;⌈loc(e)⌉]⋅ THENA Auto)⋅ THEN Auto THEN Thin (-1))⋅

   THEN ((InstLemma `es-cut-at-property` [Info; ⌈es⌉;⌈X⌉;⌈f⌉;⌈c⌉;⌈loc(e)⌉]⋅ THENA Auto)⋅ THEN Auto THEN Thin (-1))⋅

) }

1
1. Info : Type
2. es : EO+(Info)
3. X : EClass(Top)
4. f : sys-antecedent(es;X)
5. c : Cut(X;f)
6. e : E(X)
7. (¬((f e) = e ∈ E(X))) ⇒ f e ∈ c
8. (↑e ∈_b prior(X)) ⇒ prior(X)(e) ∈ c
9. ¬e ∈ c
10. c+e ∈ Cut(X;f)
11. c+e ∈ fset(E)
12. ∀e@0:E(X). ((e@0 ∈ c+e(loc(e))) ⇐⇒ (loc(e@0) = loc(e) ∈ Id) ∧ e@0 ∈ c+e)
13. ∀e@0:E(X). ((e@0 ∈ c(loc(e))) ⇐⇒ (loc(e@0) = loc(e) ∈ Id) ∧ e@0 ∈ c)
⊢ set-equal({e':E(X)| loc(e') = loc(e) ∈ Id} ;c+e(loc(e));c(loc(e)) @ [e])

Latex:

Latex:
1. Info : Type 2. es : EO+(Info) 3. X : EClass(Top) 4. f : sys-antecedent(es;X) 5. c : Cut(X;f) 6. e : E(X) 7. (\mneg{}((f e) = e)) {}\mRightarrow{} f e \mmember{} c 8. (\muparrow{}e \mmember{}\msubb{} prior(X)) {}\mRightarrow{} prior(X)(e) \mmember{} c 9. \mneg{}e \mmember{} c 10. c+e \mmember{} Cut(X;f) 11. c+e \mmember{} fset(E) \mvdash{} set-equal(\{e':E(X)| loc(e') = loc(e)\} ;c+e(loc(e));c(loc(e)) @ [e]) By Latex: (((InstLemma `es-cut-at-property` [Info; \mkleeneopen{}es\mkleeneclose{};\mkleeneopen{}X\mkleeneclose{};\mkleeneopen{}f\mkleeneclose{};\mkleeneopen{}c+e\mkleeneclose{};\mkleeneopen{}loc(e)\mkleeneclose{}]\mcdot{} THENA Auto)\mcdot{} THEN Auto THEN Thin (-1))\mcdot{} THEN ((InstLemma `es-cut-at-property` [Info; \mkleeneopen{}es\mkleeneclose{};\mkleeneopen{}X\mkleeneclose{};\mkleeneopen{}f\mkleeneclose{};\mkleeneopen{}c\mkleeneclose{};\mkleeneopen{}loc(e)\mkleeneclose{}]\mcdot{} THENA Auto)\mcdot{} THEN Auto THEN Thin (-1))\mcdot{} ) Home Index