Proof of Nuprl Lemma : rec-combined-class-opt-1-es-sv

Step * 1 3 of Lemma rec-combined-class-opt-1-es-sv

1. Info : Type
2. A : Type
3. es : EO+(Info)
4. F : Top
5. X : EClass(A)
6. init : Id ─→ bag(Top)
7. ∀l:Id. (#(init l) ≤ 1)
8. es-sv-class(es;X)
9. bs : k:ℕ1 ─→ bag((λx.A) k)@i
10. l : Id@i
11. b : bag(Top)@i
12. ∀k:ℕ1. (#(bs k) ≤ 1)@i
13. #(b) ≤ 1@i
⊢ #(lifting-2(F) (bs 0) b) ≤ 1
BY
{ (RepUR ``lifting-2 lifting2 lifting-gen-rev`` 0
   THEN RepeatFor 3 ((RecUnfold `lifting-gen-list-rev` 0⋅ THEN Reduce 0))
   THEN (InstHyp [⌈0⌉] (-2)⋅ THENA Auto)
   THEN Reduce (-1)
   THEN (Assert ⌈(#(bs 0) = 0 ∈ ℤ) ∨ (#(bs 0) = 1 ∈ ℤ)⌉⋅ THENA Auto')
   THEN D (-1)) }

1
1. Info : Type
2. A : Type
3. es : EO+(Info)
4. F : Top
5. X : EClass(A)
6. init : Id ─→ bag(Top)
7. ∀l:Id. (#(init l) ≤ 1)
8. es-sv-class(es;X)
9. bs : k:ℕ1 ─→ bag((λx.A) k)@i
10. l : Id@i
11. b : bag(Top)@i
12. ∀k:ℕ1. (#(bs k) ≤ 1)@i
13. #(b) ≤ 1@i
14. #(bs 0) ≤ 1
15. #(bs 0) = 0 ∈ ℤ
⊢ #(∪x∈bs 0.∪x@0∈b.{F x x@0}) ≤ 1

2
1. Info : Type
2. A : Type
3. es : EO+(Info)
4. F : Top
5. X : EClass(A)
6. init : Id ─→ bag(Top)
7. ∀l:Id. (#(init l) ≤ 1)
8. es-sv-class(es;X)
9. bs : k:ℕ1 ─→ bag((λx.A) k)@i
10. l : Id@i
11. b : bag(Top)@i
12. ∀k:ℕ1. (#(bs k) ≤ 1)@i
13. #(b) ≤ 1@i
14. #(bs 0) ≤ 1
15. #(bs 0) = 1 ∈ ℤ
⊢ #(∪x∈bs 0.∪x@0∈b.{F x x@0}) ≤ 1

Latex:

Latex:
1. Info : Type 2. A : Type 3. es : EO+(Info) 4. F : Top 5. X : EClass(A) 6. init : Id {}\mrightarrow{} bag(Top) 7. \mforall{}l:Id. (\#(init l) \mleq{} 1) 8. es-sv-class(es;X) 9. bs : k:\mBbbN{}1 {}\mrightarrow{} bag((\mlambda{}x.A) k)@i 10. l : Id@i 11. b : bag(Top)@i 12. \mforall{}k:\mBbbN{}1. (\#(bs k) \mleq{} 1)@i 13. \#(b) \mleq{} 1@i \mvdash{} \#(lifting-2(F) (bs 0) b) \mleq{} 1 By Latex: (RepUR ``lifting-2 lifting2 lifting-gen-rev`` 0 THEN RepeatFor 3 ((RecUnfold `lifting-gen-list-rev` 0\mcdot{} THEN Reduce 0)) THEN (InstHyp [\mkleeneopen{}0\mkleeneclose{}] (-2)\mcdot{} THENA Auto) THEN Reduce (-1) THEN (Assert \mkleeneopen{}(\#(bs 0) = 0) \mvee{} (\#(bs 0) = 1)\mkleeneclose{}\mcdot{} THENA Auto') THEN D (-1)) Home Index