Proof of Nuprl Lemma : bag-partitions-cons

Step * 1 1 1 of Lemma bag-partitions-cons

1. X : Type
2. valueall-type(X)
3. eq : EqDecider(X)
4. x : X
5. b : bag(X)
6. bag-no-repeats(bag(X) × bag(X);bag-partitions(eq;x.b))
7. ∀[f:(bag(X) × bag(X)) ⟶ (bag(X) × bag(X))]. ∀[bs:bag(bag(X) × bag(X))].
     uiff(bag-no-repeats(bag(X) × bag(X);bag-map(f;bs));bag-no-repeats(bag(X) × bag(X);bs))
     supposing Inj(bag(X) × bag(X);bag(X) × bag(X);f)
⊢ Inj(bag(X) × bag(X);bag(X) × bag(X);λp.<x.fst(p), snd(p)>)
BY
{ ((D 0 THENA Auto) THEN Reduce 0) }

1
1. X : Type
2. valueall-type(X)
3. eq : EqDecider(X)
4. x : X
5. b : bag(X)
6. bag-no-repeats(bag(X) × bag(X);bag-partitions(eq;x.b))
7. ∀[f:(bag(X) × bag(X)) ⟶ (bag(X) × bag(X))]. ∀[bs:bag(bag(X) × bag(X))].
     uiff(bag-no-repeats(bag(X) × bag(X);bag-map(f;bs));bag-no-repeats(bag(X) × bag(X);bs))
     supposing Inj(bag(X) × bag(X);bag(X) × bag(X);f)
8. a1 : bag(X) × bag(X)
⊢ ∀a2:bag(X) × bag(X). ((<x.fst(a1), snd(a1)> = <x.fst(a2), snd(a2)> ∈ (bag(X) × bag(X))) ⇒ (a1 = a2 ∈ (bag(X) × bag(X)\000C)))

Latex:

Latex:
1. X : Type 2. valueall-type(X) 3. eq : EqDecider(X) 4. x : X 5. b : bag(X) 6. bag-no-repeats(bag(X) \mtimes{} bag(X);bag-partitions(eq;x.b)) 7. \mforall{}[f:(bag(X) \mtimes{} bag(X)) {}\mrightarrow{} (bag(X) \mtimes{} bag(X))]. \mforall{}[bs:bag(bag(X) \mtimes{} bag(X))]. uiff(bag-no-repeats(bag(X) \mtimes{} bag(X);bag-map(f;bs));bag-no-repeats(bag(X) \mtimes{} bag(X);bs)) supposing Inj(bag(X) \mtimes{} bag(X);bag(X) \mtimes{} bag(X);f) \mvdash{} Inj(bag(X) \mtimes{} bag(X);bag(X) \mtimes{} bag(X);\mlambda{}p.<x.fst(p), snd(p)>) By Latex: ((D 0 THENA Auto) THEN Reduce 0) Home Index