Proof of Nuprl Lemma : eo-strict-forward-pred?

Step * 4 of Lemma eo-strict-forward-pred?

1. Info : Type
2. eo : EO+(Info)
3. e : E
4. e1 : E@i
5. E ⊆r E
6. y : Unit@i
7. es-pred?(eo>e;e1) = (inr y ) ∈ ({e':E| (e' <loc e1) ∧ (e' = pred(e1) ∈ E)} ?)@i
8. y1 : Unit@i
9. es-pred?(eo;e1) = (inr y1 ) ∈ ({e':E| (e' <loc e1) ∧ (e' = pred(e1) ∈ E)} ?)@i
10. ∀e':E. ¬(e' < e1) supposing loc(e') = loc(e1) ∈ Id@i
11. ∀e':E. ¬(e' < e1) supposing loc(e') = loc(e1) ∈ Id@i

⊢ (inr y ) = if loc(e) = loc(e1) ∧_b (es-eq(eo) pred(e1) e) then inr ⋅  else inr y1  fi  ∈ (E?)

BY
{ (BoolCase ⌈loc(e) = loc(e1)⌉⋅ THENA Auto) }

1
1. Info : Type
2. eo : EO+(Info)
3. e : E
4. e1 : E@i
5. E ⊆r E
6. y : Unit@i
7. es-pred?(eo>e;e1) = (inr y ) ∈ ({e':E| (e' <loc e1) ∧ (e' = pred(e1) ∈ E)} ?)@i
8. y1 : Unit@i
9. es-pred?(eo;e1) = (inr y1 ) ∈ ({e':E| (e' <loc e1) ∧ (e' = pred(e1) ∈ E)} ?)@i
10. ∀e':E. ¬(e' < e1) supposing loc(e') = loc(e1) ∈ Id@i
11. ∀e':E. ¬(e' < e1) supposing loc(e') = loc(e1) ∈ Id@i
12. loc(e) = loc(e1) ∈ Id
⊢ (inr y ) = if es-eq(eo) pred(e1) e then inr ⋅ else inr y1 fi ∈ (E?)

2
1. Info : Type
2. eo : EO+(Info)
3. e : E
4. e1 : E@i
5. ¬(loc(e) = loc(e1) ∈ Id)
6. E ⊆r E
7. y : Unit@i
8. es-pred?(eo>e;e1) = (inr y ) ∈ ({e':E| (e' <loc e1) ∧ (e' = pred(e1) ∈ E)} ?)@i
9. y1 : Unit@i
10. es-pred?(eo;e1) = (inr y1 ) ∈ ({e':E| (e' <loc e1) ∧ (e' = pred(e1) ∈ E)} ?)@i
11. ∀e':E. ¬(e' < e1) supposing loc(e') = loc(e1) ∈ Id@i
12. ∀e':E. ¬(e' < e1) supposing loc(e') = loc(e1) ∈ Id@i
⊢ (inr y ) = (inr y1 ) ∈ (E?)

Latex:

1. Info : Type 2. eo : EO+(Info) 3. e : E 4. e1 : E@i 5. E \msubseteq{}r E 6. y : Unit@i 7. es-pred?(eo>e;e1) = (inr y )@i 8. y1 : Unit@i 9. es-pred?(eo;e1) = (inr y1 )@i 10. \mforall{}e':E. \mneg{}(e' < e1) supposing loc(e') = loc(e1)@i 11. \mforall{}e':E. \mneg{}(e' < e1) supposing loc(e') = loc(e1)@i \mvdash{} (inr y ) = if loc(e) = loc(e1) \mwedge{}\msubb{} (es-eq(eo) pred(e1) e) then inr \mcdot{} else inr y1 fi By (BoolCase \mkleeneopen{}loc(e) = loc(e1)\mkleeneclose{}\mcdot{} THENA Auto) Home Index