Proof of Nuprl Lemma : primed-class-opt-classrel

Step * 2 2 1 of Lemma primed-class-opt-classrel

1. T : Type
2. Info : Type
3. X : EClass(T)
4. init : Id ⟶ bag(T)
5. es : EO+(Info)
6. e : E
7. v : T
8. P : E ⟶ 𝔹@i
9. (λe'.0 <z #(X es e')) = P ∈ (E ⟶ 𝔹)@i
10. Q : E ⟶ ℙ@i'
11. (λe'.(↓∃w:T. w ↓∈ X es e')) = Q ∈ (E ⟶ ℙ)@i'
12. y : ¬(∃e':{E| ((e' <loc e) ∧ (↑(P e')))})@i
13. (last(P) e)
= (inr y )
∈ ((∃e':{E| ((e' <loc e) ∧ (↑(P e')) ∧ (∀e'':E. ((e' <loc e'') ⇒ (e'' <loc e) ⇒ (¬↑(P e'')))))})
∨ (¬(∃e':{E| ((e' <loc e) ∧ (↑(P e')))})))@i
14. e' : E
15. es-p-local-pred(es;Q) e e'
16. v ↓∈ X es e'
⊢ v ↓∈ init loc(e)
BY
{ (RepUR ``es-p-local-pred`` -2 THEN D (-5) THEN With ⌜e'⌝ (D 0)⋅ THEN Auto) }

1
1. T : Type
2. Info : Type
3. X : EClass(T)
4. init : Id ⟶ bag(T)
5. es : EO+(Info)
6. e : E
7. v : T
8. P : E ⟶ 𝔹@i
9. (λe'.0 <z #(X es e')) = P ∈ (E ⟶ 𝔹)@i
10. Q : E ⟶ ℙ@i'
11. (λe'.(↓∃w:T. w ↓∈ X es e')) = Q ∈ (E ⟶ ℙ)@i'
12. y : (∃e':{E| ((e' <loc e) ∧ (↑(P e')))}) ⟶ False
13. (last(P) e)
= (inr y )
∈ ((∃e':{E| ((e' <loc e) ∧ (↑(P e')) ∧ (∀e'':E. ((e' <loc e'') ⇒ (e'' <loc e) ⇒ (¬↑(P e'')))))})
∨ (¬(∃e':{E| ((e' <loc e) ∧ (↑(P e')))})))@i
14. e' : E
15. (e' <loc e)
16. Q e'
17. ∀e'':E. ((e'' <loc e) ⇒ (e' <loc e'') ⇒ (¬(Q e'')))
18. v ↓∈ X es e'
19. (e' <loc e)
⊢ ↑(P e')

Latex:

Latex:
1. T : Type 2. Info : Type 3. X : EClass(T) 4. init : Id {}\mrightarrow{} bag(T) 5. es : EO+(Info) 6. e : E 7. v : T 8. P : E {}\mrightarrow{} \mBbbB{}@i 9. (\mlambda{}e'.0 <z \#(X es e')) = P@i 10. Q : E {}\mrightarrow{} \mBbbP{}@i' 11. (\mlambda{}e'.(\mdownarrow{}\mexists{}w:T. w \mdownarrow{}\mmember{} X es e')) = Q@i' 12. y : \mneg{}(\mexists{}e':\{E| ((e' <loc e) \mwedge{} (\muparrow{}(P e')))\})@i 13. (last(P) e) = (inr y )@i 14. e' : E 15. es-p-local-pred(es;Q) e e' 16. v \mdownarrow{}\mmember{} X es e' \mvdash{} v \mdownarrow{}\mmember{} init loc(e) By Latex: (RepUR ``es-p-local-pred`` -2 THEN D (-5) THEN With \mkleeneopen{}e'\mkleeneclose{} (D 0)\mcdot{} THEN Auto) Home Index