Proof of Nuprl Lemma : Q-R-glued-first

Step * 2 of Lemma Q-R-glued-first

1. [Info] : Type
2. es : EO+(Info)@i'
3. [Q] : E ⟶ E ⟶ ℙ
4. [R] : E ⟶ E ⟶ ℙ
5. [A] : Type
6. [B] : Type
7. u : EClass(A)@i'
8. v : EClass(A) List@i'
9. ∀Ibs:EClass(B) List. ∀f:E(first-class(v)) ⟶ B.
     ((∀i:ℕ||v||. v[i]:Q →─f⟶  Ibs[i]:R)
        ⇒ first-class(v):Q →─f⟶  first-class(Ibs):R
           supposing (∀Ia1,Ia2∈v.  ∀e,e':E.

                                     ((¬(Q e e')) ∧ (¬(Q e' e))) supposing ((↑e' ∈_b Ia2) and (↑e ∈_b Ia1)))) supposing

        ((||v|| = ||Ibs|| ∈ ℤ) and
        (∀Ib1,Ib2∈Ibs.  Ib1 ⋂ Ib2 = 0) and
        (∀Ia1,Ia2∈v.  Ia1 ⋂ Ia2 = 0))@i 2
⊢ ∀Ibs:EClass(B) List. ∀f:E(first-class([u / v])) ⟶ B.
    ((∀i:ℕ||[u / v]||. [u / v][i]:Q →─f⟶  Ibs[i]:R)
       ⇒ first-class([u / v]):Q →─f⟶  first-class(Ibs):R
          supposing (∀Ia1,Ia2∈[u / v].  ∀e,e':E.

                                          ((¬(Q e e')) ∧ (¬(Q e' e))) supposing ((↑e' ∈_b Ia2) and (↑e ∈_b Ia1)))) supposi\000Cng

       ((||[u / v]|| = ||Ibs|| ∈ ℤ) and
       (∀Ib1,Ib2∈Ibs.  Ib1 ⋂ Ib2 = 0) and
       (∀Ia1,Ia2∈[u / v].  Ia1 ⋂ Ia2 = 0))
BY
{ RepeatFor 2 (Auto) }

1
1. [Info] : Type
2. es : EO+(Info)@i'
3. [Q] : E ⟶ E ⟶ ℙ
4. [R] : E ⟶ E ⟶ ℙ
5. [A] : Type
6. [B] : Type
7. u : EClass(A)@i'
8. v : EClass(A) List@i'
9. ∀Ibs:EClass(B) List. ∀f:E(first-class(v)) ⟶ B.
     ((∀i:ℕ||v||. v[i]:Q →─f⟶  Ibs[i]:R)
        ⇒ first-class(v):Q →─f⟶  first-class(Ibs):R
           supposing (∀Ia1,Ia2∈v.  ∀e,e':E.

                                     ((¬(Q e e')) ∧ (¬(Q e' e))) supposing ((↑e' ∈_b Ia2) and (↑e ∈_b Ia1)))) supposing

        ((||v|| = ||Ibs|| ∈ ℤ) and
        (∀Ib1,Ib2∈Ibs.  Ib1 ⋂ Ib2 = 0) and
        (∀Ia1,Ia2∈v.  Ia1 ⋂ Ia2 = 0))@i 2
10. Ibs : EClass(B) List@i'
11. f : E(first-class([u / v])) ⟶ B@i
12. (∀Ia1,Ia2∈[u / v].  Ia1 ⋂ Ia2 = 0)
13. (∀Ib1,Ib2∈Ibs.  Ib1 ⋂ Ib2 = 0)
14. ||[u / v]|| = ||Ibs|| ∈ ℤ
15. ∀i:ℕ||[u / v]||. [u / v][i]:Q →─f⟶  Ibs[i]:R@i

16. (∀Ia1,Ia2∈[u / v].  ∀e,e':E.  ((¬(Q e e')) ∧ (¬(Q e' e))) supposing ((↑e' ∈_b Ia2) and (↑e ∈_b Ia1)))

⊢ first-class([u / v]):Q →─f⟶ first-class(Ibs):R

Latex:

Latex:
1. [Info] : Type 2. es : EO+(Info)@i' 3. [Q] : E {}\mrightarrow{} E {}\mrightarrow{} \mBbbP{} 4. [R] : E {}\mrightarrow{} E {}\mrightarrow{} \mBbbP{} 5. [A] : Type 6. [B] : Type 7. u : EClass(A)@i' 8. v : EClass(A) List@i' 9. \mforall{}Ibs:EClass(B) List. \mforall{}f:E(first-class(v)) {}\mrightarrow{} B. ((\mforall{}i:\mBbbN{}||v||. v[i]:Q \mrightarrow{}{}f{}\mrightarrow{} Ibs[i]:R) {}\mRightarrow{} first-class(v):Q \mrightarrow{}{}f{}\mrightarrow{} first-class(Ibs):R supposing (\mforall{}Ia1,Ia2\mmember{}v. \mforall{}e,e':E. ((\mneg{}(Q e e')) \mwedge{} (\mneg{}(Q e' e))) supposing ((\muparrow{}e' \mmember{}\msubb{} Ia2) and (\muparrow{}e \mmember{}\msubb{} Ia1)))) supposing ((||v|| = ||Ibs||) and (\mforall{}Ib1,Ib2\mmember{}Ibs. Ib1 \mcap{} Ib2 = 0) and (\mforall{}Ia1,Ia2\mmember{}v. Ia1 \mcap{} Ia2 = 0))@i 2 \mvdash{} \mforall{}Ibs:EClass(B) List. \mforall{}f:E(first-class([u / v])) {}\mrightarrow{} B. ((\mforall{}i:\mBbbN{}||[u / v]||. [u / v][i]:Q \mrightarrow{}{}f{}\mrightarrow{} Ibs[i]:R) {}\mRightarrow{} first-class([u / v]):Q \mrightarrow{}{}f{}\mrightarrow{} first-class(Ibs):R supposing (\mforall{}Ia1,Ia2\mmember{}[u / v]. \mforall{}e,e':E. ((\mneg{}(Q e e')) \mwedge{} (\mneg{}(Q e' e))) supposing ((\muparrow{}e' \mmember{}\msubb{} Ia2) and (\muparrow{}e \mmember{}\msubb{} Ia1)))) supposing ((||[u / v]|| = ||Ibs||) and (\mforall{}Ib1,Ib2\mmember{}Ibs. Ib1 \mcap{} Ib2 = 0) and (\mforall{}Ia1,Ia2\mmember{}[u / v]. Ia1 \mcap{} Ia2 = 0)) By Latex: RepeatFor 2 (Auto) Home Index