Proof of Nuprl Lemma : concat-lifting-list-member

Step * 1 2 1 of Lemma concat-lifting-list-member

1. B : Type
2. n : ℕ
3. A : ℕn ⟶ Type
4. bags : k:ℕn ⟶ bag(A k)
5. b : B
6. p : ℤ
7. 0 < p
8. 0 ≤ (n - p)
9. n - p < n + 1
10. f : funtype(n - n - p;λx.(A (x + (n - p)));bag(B))
11. b ↓∈ bag-union(⋃x∈bags (n - p).lifting-gen-list-rev(n;bags) ((n - p) + 1) (f x))
12. ∀f:funtype(n - (n - p) + 1;λx.(A (x + (n - p) + 1));bag(B))
(b ↓∈ concat-lifting-list(n;bags) ((n - p) + 1) f
⇒ (↓∃lst:k:{(n - p) + 1..n^-} ⟶ (A k)

            ((∀[k:{(n - p) + 1..n^-}]. lst k ↓∈ bags k) ∧ b ↓∈ uncurry-gen(n) ((n - p) + 1) (λx.f) lst)))

13. x : A (n - p)
⊢ lifting-gen-list-rev(n;bags) ((n - p) + 1) (f x) ∈ bag(bag(B))
BY
{ ((BLemma `lifting-gen-list-rev_wf` THENA Auto)
   THEN (RWO "funtype-unroll" 10 THENA Auto)
   THEN OnVar `f' SplitOnHypITE
   THEN Auto)⋅ }

Latex:

Latex:
1. B : Type 2. n : \mBbbN{} 3. A : \mBbbN{}n {}\mrightarrow{} Type 4. bags : k:\mBbbN{}n {}\mrightarrow{} bag(A k) 5. b : B 6. p : \mBbbZ{} 7. 0 < p 8. 0 \mleq{} (n - p) 9. n - p < n + 1 10. f : funtype(n - n - p;\mlambda{}x.(A (x + (n - p)));bag(B)) 11. b \mdownarrow{}\mmember{} bag-union(\mcup{}x\mmember{}bags (n - p).lifting-gen-list-rev(n;bags) ((n - p) + 1) (f x)) 12. \mforall{}f:funtype(n - (n - p) + 1;\mlambda{}x.(A (x + (n - p) + 1));bag(B)) (b \mdownarrow{}\mmember{} concat-lifting-list(n;bags) ((n - p) + 1) f {}\mRightarrow{} (\mdownarrow{}\mexists{}lst:k:\{(n - p) + 1..n\msupminus{}\} {}\mrightarrow{} (A k) ((\mforall{}[k:\{(n - p) + 1..n\msupminus{}\}]. lst k \mdownarrow{}\mmember{} bags k) \mwedge{} b \mdownarrow{}\mmember{} uncurry-gen(n) ((n - p) + 1) (\mlambda{}x.f) lst))) 13. x : A (n - p) \mvdash{} lifting-gen-list-rev(n;bags) ((n - p) + 1) (f x) \mmember{} bag(bag(B)) By Latex: ((BLemma `lifting-gen-list-rev\_wf` THENA Auto) THEN (RWO "funtype-unroll" 10 THENA Auto) THEN OnVar `f' SplitOnHypITE THEN Auto)\mcdot{} Home Index