Proof of Nuprl Lemma : continuous'-monotone-bunion

Step * 1 of Lemma continuous'-monotone-bunion

.....subterm..... T:t
1:n
1. F : Type ⟶ Type
2. G : Type ⟶ Type
3. ∀[A,B:Type].  (F A) ⊆r (F B) supposing A ⊆r B
4. ∀[X:type-incr-chain{i:l}()]. ((F ⋃n:ℕ.(X n)) ⊆r ⋃n:ℕ.(F (X n)))
5. ∀[A,B:Type].  (G A) ⊆r (G B) supposing A ⊆r B
6. ∀[X:type-incr-chain{i:l}()]. ((G ⋃n:ℕ.(X n)) ⊆r ⋃n:ℕ.(G (X n)))
7. ∀[A,B:Type].  ((F A) ⋃ (G A)) ⊆r ((F B) ⋃ (G B)) supposing A ⊆r B
8. X : type-incr-chain{i:l}()
9. x : (F ⋃n:ℕ.(X n)) ⋃ (G ⋃n:ℕ.(X n))@i
⊢ x ∈ ⋃n:ℕ.((F (X n)) ⋃ (G (X n)))
BY
{ D_b_union (-1) }

1
1. F : Type ⟶ Type
2. G : Type ⟶ Type
3. ∀[A,B:Type].  (F A) ⊆r (F B) supposing A ⊆r B
4. ∀[X:type-incr-chain{i:l}()]. ((F ⋃n:ℕ.(X n)) ⊆r ⋃n:ℕ.(F (X n)))
5. ∀[A,B:Type].  (G A) ⊆r (G B) supposing A ⊆r B
6. ∀[X:type-incr-chain{i:l}()]. ((G ⋃n:ℕ.(X n)) ⊆r ⋃n:ℕ.(G (X n)))
7. ∀[A,B:Type].  ((F A) ⋃ (G A)) ⊆r ((F B) ⋃ (G B)) supposing A ⊆r B
8. X : type-incr-chain{i:l}()
9. a1 : F ⋃n:ℕ.(X n)@i
⊢ a1 ∈ ⋃n:ℕ.((F (X n)) ⋃ (G (X n)))

2
1. F : Type ⟶ Type
2. G : Type ⟶ Type
3. ∀[A,B:Type].  (F A) ⊆r (F B) supposing A ⊆r B
4. ∀[X:type-incr-chain{i:l}()]. ((F ⋃n:ℕ.(X n)) ⊆r ⋃n:ℕ.(F (X n)))
5. ∀[A,B:Type].  (G A) ⊆r (G B) supposing A ⊆r B
6. ∀[X:type-incr-chain{i:l}()]. ((G ⋃n:ℕ.(X n)) ⊆r ⋃n:ℕ.(G (X n)))
7. ∀[A,B:Type].  ((F A) ⋃ (G A)) ⊆r ((F B) ⋃ (G B)) supposing A ⊆r B
8. X : type-incr-chain{i:l}()
9. a1 : G ⋃n:ℕ.(X n)@i
⊢ a1 ∈ ⋃n:ℕ.((F (X n)) ⋃ (G (X n)))

Latex:

Latex:
.....subterm..... T:t 1:n 1. F : Type {}\mrightarrow{} Type 2. G : Type {}\mrightarrow{} Type 3. \mforall{}[A,B:Type]. (F A) \msubseteq{}r (F B) supposing A \msubseteq{}r B 4. \mforall{}[X:type-incr-chain\{i:l\}()]. ((F \mcup{}n:\mBbbN{}.(X n)) \msubseteq{}r \mcup{}n:\mBbbN{}.(F (X n))) 5. \mforall{}[A,B:Type]. (G A) \msubseteq{}r (G B) supposing A \msubseteq{}r B 6. \mforall{}[X:type-incr-chain\{i:l\}()]. ((G \mcup{}n:\mBbbN{}.(X n)) \msubseteq{}r \mcup{}n:\mBbbN{}.(G (X n))) 7. \mforall{}[A,B:Type]. ((F A) \mcup{} (G A)) \msubseteq{}r ((F B) \mcup{} (G B)) supposing A \msubseteq{}r B 8. X : type-incr-chain\{i:l\}() 9. x : (F \mcup{}n:\mBbbN{}.(X n)) \mcup{} (G \mcup{}n:\mBbbN{}.(X n))@i \mvdash{} x \mmember{} \mcup{}n:\mBbbN{}.((F (X n)) \mcup{} (G (X n))) By Latex: D\_b\_union (-1) Home Index