Proof of Nuprl Lemma : cut-of-singleton

Step * 1 1 3 1 1 2 of Lemma cut-of-singleton

1. Info : Type@i'
2. es : EO+(Info)@i'
3. X : EClass(Top)@i'
4. f : sys-antecedent(es;X)@i
5. e : E(X)@i
6. ∀[s:fset(E(X))]. (s ⊆ cut(X;f;s) ∧ (∀[c':Cut(X;f)]. cut(X;f;s) ⊆ c' supposing s ⊆ c'))
7. {f e} ⊆ cut(X;f;{f e})
8. ∀[c':Cut(X;f)]. cut(X;f;{f e}) ⊆ c' supposing {f e} ⊆ c'
9. {e} ⊆ cut(X;f;{e})
10. ∀[c':Cut(X;f)]. cut(X;f;{e}) ⊆ c' supposing {e} ⊆ c'
11. ¬↑e ∈_b prior(X)
12. (f e) = e ∈ E
⊢ e ∈ {}+e
BY
{ (UsingVars [`f'] (BLemma `member-cut-add`) THEN Auto) }

Latex:

Latex:
1. Info : Type@i' 2. es : EO+(Info)@i' 3. X : EClass(Top)@i' 4. f : sys-antecedent(es;X)@i 5. e : E(X)@i 6. \mforall{}[s:fset(E(X))]. (s \msubseteq{} cut(X;f;s) \mwedge{} (\mforall{}[c':Cut(X;f)]. cut(X;f;s) \msubseteq{} c' supposing s \msubseteq{} c')) 7. \{f e\} \msubseteq{} cut(X;f;\{f e\}) 8. \mforall{}[c':Cut(X;f)]. cut(X;f;\{f e\}) \msubseteq{} c' supposing \{f e\} \msubseteq{} c' 9. \{e\} \msubseteq{} cut(X;f;\{e\}) 10. \mforall{}[c':Cut(X;f)]. cut(X;f;\{e\}) \msubseteq{} c' supposing \{e\} \msubseteq{} c' 11. \mneg{}\muparrow{}e \mmember{}\msubb{} prior(X) 12. (f e) = e \mvdash{} e \mmember{} \{\}+e By Latex: (UsingVars [`f'] (BLemma `member-cut-add`) THEN Auto) Home Index