Proof of Nuprl Lemma : bounded-decidable-nset-finite

Step * 1 1 1 of Lemma bounded-decidable-nset-finite

1. K : Type
2. K ⊆r ℕ
3. d : ∀l:ℕ. ((l ∈ K) ∨ (¬(l ∈ K)))
4. B : ℕ
5. ∀k:K. (k ≤ B)
6. K ⊆r ℕB + 1
7. ∀i:ℕ. ((i ∈ upto(B + 1)) ⇐⇒ i < B + 1)
8. filter(λl.isl(d l);upto(B + 1)) ∈ {x:ℕ| ↑isl(d x)}  List
9. filter(λl.isl(d l);upto(B + 1)) ∈ K List
⊢ no_repeats(K;filter(λl.isl(d l);upto(B + 1))) ∧ (∀x:K. (x ∈ filter(λl.isl(d l);upto(B + 1))))
BY
{ D 0 }

1
1. K : Type
2. K ⊆r ℕ
3. d : ∀l:ℕ. ((l ∈ K) ∨ (¬(l ∈ K)))
4. B : ℕ
5. ∀k:K. (k ≤ B)
6. K ⊆r ℕB + 1
7. ∀i:ℕ. ((i ∈ upto(B + 1)) ⇐⇒ i < B + 1)
8. filter(λl.isl(d l);upto(B + 1)) ∈ {x:ℕ| ↑isl(d x)}  List
9. filter(λl.isl(d l);upto(B + 1)) ∈ K List
⊢ no_repeats(K;filter(λl.isl(d l);upto(B + 1)))

2
1. K : Type
2. K ⊆r ℕ
3. d : ∀l:ℕ. ((l ∈ K) ∨ (¬(l ∈ K)))
4. B : ℕ
5. ∀k:K. (k ≤ B)
6. K ⊆r ℕB + 1
7. ∀i:ℕ. ((i ∈ upto(B + 1)) ⇐⇒ i < B + 1)
8. filter(λl.isl(d l);upto(B + 1)) ∈ {x:ℕ| ↑isl(d x)}  List
9. filter(λl.isl(d l);upto(B + 1)) ∈ K List
⊢ ∀x:K. (x ∈ filter(λl.isl(d l);upto(B + 1)))

Latex:

Latex:
1. K : Type 2. K \msubseteq{}r \mBbbN{} 3. d : \mforall{}l:\mBbbN{}. ((l \mmember{} K) \mvee{} (\mneg{}(l \mmember{} K))) 4. B : \mBbbN{} 5. \mforall{}k:K. (k \mleq{} B) 6. K \msubseteq{}r \mBbbN{}B + 1 7. \mforall{}i:\mBbbN{}. ((i \mmember{} upto(B + 1)) \mLeftarrow{}{}\mRightarrow{} i < B + 1) 8. filter(\mlambda{}l.isl(d l);upto(B + 1)) \mmember{} \{x:\mBbbN{}| \muparrow{}isl(d x)\} List 9. filter(\mlambda{}l.isl(d l);upto(B + 1)) \mmember{} K List \mvdash{} no\_repeats(K;filter(\mlambda{}l.isl(d l);upto(B + 1))) \mwedge{} (\mforall{}x:K. (x \mmember{} filter(\mlambda{}l.isl(d l);upto(B + 1)))) By Latex: D 0 Home Index