Proof of Nuprl Lemma : State-comb-fun-eq

Step * 4 1 1 3 of Lemma State-comb-fun-eq

.....truecase.....
1. Info : Type
2. B : Type
3. A : Type
4. f : A ⟶ B ⟶ B
5. init : Id ⟶ bag(B)
6. X : EClass(A)
7. es : EO+(Info)
8. e : E
9. ¬↑first(e)
10. ¬↑e ∈_b X
11. ∀l:Id. (1 ≤ #(init l))
12. ∀l:Id. single-valued-bag(init l;B)
13. single-valued-classrel(es;X;A)
14. (X es e) = {} ∈ bag(A)
15. y : ¬(∃e':{E| ((e' <loc e) ∧ (↑0 <z #(State-comb(init;f;X) es e')))})@i
16. (inl pred(e))
= (inr y )
∈ ((∃e':{E| ((e' <loc e)
            ∧ (↑0 <z #(State-comb(init;f;X) es e'))
            ∧ (∀e'':E. ((e' <loc e'') ⇒ (e'' <loc e) ⇒ (¬↑0 <z #(State-comb(init;f;X) es e'')))))})
  ∨ (¬(∃e':{E| ((e' <loc e) ∧ (↑0 <z #(State-comb(init;f;X) es e')))})))@i
17. ¬↑first(e)
18. 0 < #(State-comb(init;f;X) es pred(e))
⊢ sv-bag-only(init loc(e)) = sv-bag-only(State-comb(init;f;X) es pred(e)) ∈ B
BY
{ Auto }

Latex:

Latex:
.....truecase..... 1. Info : Type 2. B : Type 3. A : Type 4. f : A {}\mrightarrow{} B {}\mrightarrow{} B 5. init : Id {}\mrightarrow{} bag(B) 6. X : EClass(A) 7. es : EO+(Info) 8. e : E 9. \mneg{}\muparrow{}first(e) 10. \mneg{}\muparrow{}e \mmember{}\msubb{} X 11. \mforall{}l:Id. (1 \mleq{} \#(init l)) 12. \mforall{}l:Id. single-valued-bag(init l;B) 13. single-valued-classrel(es;X;A) 14. (X es e) = \{\} 15. y : \mneg{}(\mexists{}e':\{E| ((e' <loc e) \mwedge{} (\muparrow{}0 <z \#(State-comb(init;f;X) es e')))\})@i 16. (inl pred(e)) = (inr y )@i 17. \mneg{}\muparrow{}first(e) 18. 0 < \#(State-comb(init;f;X) es pred(e)) \mvdash{} sv-bag-only(init loc(e)) = sv-bag-only(State-comb(init;f;X) es pred(e)) By Latex: Auto Home Index