Proof of Nuprl Lemma : es-cut-induction

Step * 1 1 1 2 of Lemma es-cut-induction

1. [Info] : Type
2. es : EO+(Info)@i'
3. X : EClass(Top)@i'
4. f : sys-antecedent(es;X)@i
5. [P] : Cut(X;f) ─→ ℙ

6. (∃R:E(X) ─→ E(X) ─→ ℙ. (Linorder(E(X);x,y.R[x;y]) ∧ (∀x,y:E(X).  Dec(R[x;y])))) ∨ (∀c:Cut(X;f). SqStable(P[c]))@i'

7. P[{}]@i
8. c : Cut(X;f)@i
9. e : E(X)@i
10. P[c]@i
11. P[c+e] supposing add-cut-conditions(c;e)
12. (¬((f e) = e ∈ E(X))) ⇒ f e ∈ c@i
13. (↑e ∈_b prior(X)) ⇒ prior(X)(e) ∈ c@i
14. ¬e ∈ c
⊢ P[c+e]
BY
{ (D (-4) THEN Auto) }

1
.....antecedent.....
1. Info : Type
2. es : EO+(Info)@i'
3. X : EClass(Top)@i'
4. f : sys-antecedent(es;X)@i
5. P : Cut(X;f) ─→ ℙ

6. (∃R:E(X) ─→ E(X) ─→ ℙ. (Linorder(E(X);x,y.R[x;y]) ∧ (∀x,y:E(X).  Dec(R[x;y])))) ∨ (∀c:Cut(X;f). SqStable(P[c]))@i'

7. P[{}]@i
8. c : Cut(X;f)@i
9. e : E(X)@i
10. P[c]@i
11. (¬((f e) = e ∈ E(X))) ⇒ f e ∈ c@i
12. (↑e ∈_b prior(X)) ⇒ prior(X)(e) ∈ c@i
13. ¬e ∈ c
⊢ add-cut-conditions(c;e)

Latex:

Latex:
1. [Info] : Type 2. es : EO+(Info)@i' 3. X : EClass(Top)@i' 4. f : sys-antecedent(es;X)@i 5. [P] : Cut(X;f) {}\mrightarrow{} \mBbbP{} 6. (\mexists{}R:E(X) {}\mrightarrow{} E(X) {}\mrightarrow{} \mBbbP{}. (Linorder(E(X);x,y.R[x;y]) \mwedge{} (\mforall{}x,y:E(X). Dec(R[x;y])))) \mvee{} (\mforall{}c:Cut(X;f). SqStable(P[c]))@i' 7. P[\{\}]@i 8. c : Cut(X;f)@i 9. e : E(X)@i 10. P[c]@i 11. P[c+e] supposing add-cut-conditions(c;e) 12. (\mneg{}((f e) = e)) {}\mRightarrow{} f e \mmember{} c@i 13. (\muparrow{}e \mmember{}\msubb{} prior(X)) {}\mRightarrow{} prior(X)(e) \mmember{} c@i 14. \mneg{}e \mmember{} c \mvdash{} P[c+e] By Latex: (D (-4) THEN Auto) Home Index