Proof of Nuprl Lemma : Q-R-glues-conditional

Step * 1 3 1 of Lemma Q-R-glues-conditional

1. [Info] : Type
2. es : EO+(Info)@i'
3. [Q1] : E ─→ E ─→ ℙ
4. [Q2] : E ─→ E ─→ ℙ
5. [R] : E ─→ E ─→ ℙ
6. [A] : Type
7. [B] : Type
8. Ia1 : EClass(A)@i'
9. Ia2 : EClass(A)@i'
10. Ib1 : EClass(B)@i'
11. Ib2 : EClass(B)@i'
12. f : E([Ia1?Ia2]) ─→ B@i
13. g1 : E(Ib1) ─→ E(Ia1)@i
14. g2 : E(Ib2) ─→ E(Ia2)@i
15. Ia1 ∩ Ia2 = 0
16. Ib1 ∩ Ib2 = 0
17. λe.(↑e ∈_b Ia1) ←←= g1== λe.(↑e ∈_b Ib1)@i
18. g1 is Q1-R-pre-preserving on λe.(↑e ∈_b Ib1)@i
19. Inj(E(Ib1);E;g1)@i
20. ∀e:E(Ib1). ((f (g1 e)) = Ib1(e) ∈ B)@i
21. λe.(↑e ∈_b Ia2) ←←= g2== λe.(↑e ∈_b Ib2)@i
22. g2 is Q2-R-pre-preserving on λe.(↑e ∈_b Ib2)@i
23. Inj(E(Ib2);E;g2)@i
24. ∀e:E(Ib2). ((f (g2 e)) = Ib2(e) ∈ B)@i
25. λe.(↑e ∈_b [Ia1?Ia2]) ←←= [λe.(↑e ∈_b Ib1)? g1 : g2]== λe.(↑e ∈_b [Ib1?Ib2])

26. [λe.(↑e ∈_b Ib1)? g1 : g2] is Q1|λe.(↑e ∈_b Ia1) ∨ Q2|λe.(↑e ∈_b Ia2)-R-pre-preserving on λe.(↑e ∈_b [Ib1?Ib2])

⊢ Inj(E([Ib1?Ib2]);E;[λe.(↑e ∈_b Ib1)? g1 : g2])
BY
{ (All (Unfold `inject`) THEN Auto) }

1
1. Info : Type
2. es : EO+(Info)@i'
3. Q1 : E ─→ E ─→ ℙ
4. Q2 : E ─→ E ─→ ℙ
5. R : E ─→ E ─→ ℙ
6. A : Type
7. B : Type
8. Ia1 : EClass(A)@i'
9. Ia2 : EClass(A)@i'
10. Ib1 : EClass(B)@i'
11. Ib2 : EClass(B)@i'
12. f : E([Ia1?Ia2]) ─→ B@i
13. g1 : E(Ib1) ─→ E(Ia1)@i
14. g2 : E(Ib2) ─→ E(Ia2)@i
15. Ia1 ∩ Ia2 = 0
16. Ib1 ∩ Ib2 = 0
17. λe.(↑e ∈_b Ia1) ←←= g1== λe.(↑e ∈_b Ib1)@i
18. g1 is Q1-R-pre-preserving on λe.(↑e ∈_b Ib1)@i
19. ∀a1,a2:E(Ib1). (((g1 a1) = (g1 a2) ∈ E) ⇒ (a1 = a2 ∈ E(Ib1)))@i
20. ∀e:E(Ib1). ((f (g1 e)) = Ib1(e) ∈ B)@i
21. λe.(↑e ∈_b Ia2) ←←= g2== λe.(↑e ∈_b Ib2)@i
22. g2 is Q2-R-pre-preserving on λe.(↑e ∈_b Ib2)@i
23. ∀a1,a2:E(Ib2). (((g2 a1) = (g2 a2) ∈ E) ⇒ (a1 = a2 ∈ E(Ib2)))@i
24. ∀e:E(Ib2). ((f (g2 e)) = Ib2(e) ∈ B)@i
25. λe.(↑e ∈_b [Ia1?Ia2]) ←←= [λe.(↑e ∈_b Ib1)? g1 : g2]== λe.(↑e ∈_b [Ib1?Ib2])

26. [λe.(↑e ∈_b Ib1)? g1 : g2] is Q1|λe.(↑e ∈_b Ia1) ∨ Q2|λe.(↑e ∈_b Ia2)-R-pre-preserving on λe.(↑e ∈_b [Ib1?Ib2])

27. a1 : E([Ib1?Ib2])@i
28. a2 : E([Ib1?Ib2])@i
29. ([λe.(↑e ∈_b Ib1)? g1 : g2] a1) = ([λe.(↑e ∈_b Ib1)? g1 : g2] a2) ∈ E@i
⊢ a1 = a2 ∈ E([Ib1?Ib2])

2
1. Info : Type
2. es : EO+(Info)@i'
3. Q1 : E ─→ E ─→ ℙ
4. Q2 : E ─→ E ─→ ℙ
5. R : E ─→ E ─→ ℙ
6. A : Type
7. B : Type
8. Ia1 : EClass(A)@i'
9. Ia2 : EClass(A)@i'
10. Ib1 : EClass(B)@i'
11. Ib2 : EClass(B)@i'
12. f : E([Ia1?Ia2]) ─→ B@i
13. g1 : E(Ib1) ─→ E(Ia1)@i
14. g2 : E(Ib2) ─→ E(Ia2)@i
15. Ia1 ∩ Ia2 = 0
16. Ib1 ∩ Ib2 = 0
17. λe.(↑e ∈_b Ia1) ←←= g1== λe.(↑e ∈_b Ib1)@i
18. g1 is Q1-R-pre-preserving on λe.(↑e ∈_b Ib1)@i
19. ∀a1,a2:E(Ib1). (((g1 a1) = (g1 a2) ∈ E) ⇒ (a1 = a2 ∈ E(Ib1)))@i
20. ∀e:E(Ib1). ((f (g1 e)) = Ib1(e) ∈ B)@i
21. λe.(↑e ∈_b Ia2) ←←= g2== λe.(↑e ∈_b Ib2)@i
22. g2 is Q2-R-pre-preserving on λe.(↑e ∈_b Ib2)@i
23. ∀a1,a2:E(Ib2). (((g2 a1) = (g2 a2) ∈ E) ⇒ (a1 = a2 ∈ E(Ib2)))@i
24. ∀e:E(Ib2). ((f (g2 e)) = Ib2(e) ∈ B)@i
25. λe.(↑e ∈_b [Ia1?Ia2]) ←←= [λe.(↑e ∈_b Ib1)? g1 : g2]== λe.(↑e ∈_b [Ib1?Ib2])

26. [λe.(↑e ∈_b Ib1)? g1 : g2] is Q1|λe.(↑e ∈_b Ia1) ∨ Q2|λe.(↑e ∈_b Ia2)-R-pre-preserving on λe.(↑e ∈_b [Ib1?Ib2])

27. a1 : E([Ib1?Ib2])@i
28. a2 : E([Ib1?Ib2])@i
⊢ [λe.(↑e ∈_b Ib1)? g1 : g2] a1 ∈ E

3
1. Info : Type
2. es : EO+(Info)@i'
3. Q1 : E ─→ E ─→ ℙ
4. Q2 : E ─→ E ─→ ℙ
5. R : E ─→ E ─→ ℙ
6. A : Type
7. B : Type
8. Ia1 : EClass(A)@i'
9. Ia2 : EClass(A)@i'
10. Ib1 : EClass(B)@i'
11. Ib2 : EClass(B)@i'
12. f : E([Ia1?Ia2]) ─→ B@i
13. g1 : E(Ib1) ─→ E(Ia1)@i
14. g2 : E(Ib2) ─→ E(Ia2)@i
15. Ia1 ∩ Ia2 = 0
16. Ib1 ∩ Ib2 = 0
17. λe.(↑e ∈_b Ia1) ←←= g1== λe.(↑e ∈_b Ib1)@i
18. g1 is Q1-R-pre-preserving on λe.(↑e ∈_b Ib1)@i
19. ∀a1,a2:E(Ib1). (((g1 a1) = (g1 a2) ∈ E) ⇒ (a1 = a2 ∈ E(Ib1)))@i
20. ∀e:E(Ib1). ((f (g1 e)) = Ib1(e) ∈ B)@i
21. λe.(↑e ∈_b Ia2) ←←= g2== λe.(↑e ∈_b Ib2)@i
22. g2 is Q2-R-pre-preserving on λe.(↑e ∈_b Ib2)@i
23. ∀a1,a2:E(Ib2). (((g2 a1) = (g2 a2) ∈ E) ⇒ (a1 = a2 ∈ E(Ib2)))@i
24. ∀e:E(Ib2). ((f (g2 e)) = Ib2(e) ∈ B)@i
25. λe.(↑e ∈_b [Ia1?Ia2]) ←←= [λe.(↑e ∈_b Ib1)? g1 : g2]== λe.(↑e ∈_b [Ib1?Ib2])

26. [λe.(↑e ∈_b Ib1)? g1 : g2] is Q1|λe.(↑e ∈_b Ia1) ∨ Q2|λe.(↑e ∈_b Ia2)-R-pre-preserving on λe.(↑e ∈_b [Ib1?Ib2])

27. a1 : E([Ib1?Ib2])@i
28. a2 : E([Ib1?Ib2])@i
⊢ [λe.(↑e ∈_b Ib1)? g1 : g2] a2 ∈ E

Latex:

Latex:
1. [Info] : Type 2. es : EO+(Info)@i' 3. [Q1] : E {}\mrightarrow{} E {}\mrightarrow{} \mBbbP{} 4. [Q2] : E {}\mrightarrow{} E {}\mrightarrow{} \mBbbP{} 5. [R] : E {}\mrightarrow{} E {}\mrightarrow{} \mBbbP{} 6. [A] : Type 7. [B] : Type 8. Ia1 : EClass(A)@i' 9. Ia2 : EClass(A)@i' 10. Ib1 : EClass(B)@i' 11. Ib2 : EClass(B)@i' 12. f : E([Ia1?Ia2]) {}\mrightarrow{} B@i 13. g1 : E(Ib1) {}\mrightarrow{} E(Ia1)@i 14. g2 : E(Ib2) {}\mrightarrow{} E(Ia2)@i 15. Ia1 \mcap{} Ia2 = 0 16. Ib1 \mcap{} Ib2 = 0 17. \mlambda{}e.(\muparrow{}e \mmember{}\msubb{} Ia1) \mleftarrow{}\mleftarrow{}= g1== \mlambda{}e.(\muparrow{}e \mmember{}\msubb{} Ib1)@i 18. g1 is Q1-R-pre-preserving on \mlambda{}e.(\muparrow{}e \mmember{}\msubb{} Ib1)@i 19. Inj(E(Ib1);E;g1)@i 20. \mforall{}e:E(Ib1). ((f (g1 e)) = Ib1(e))@i 21. \mlambda{}e.(\muparrow{}e \mmember{}\msubb{} Ia2) \mleftarrow{}\mleftarrow{}= g2== \mlambda{}e.(\muparrow{}e \mmember{}\msubb{} Ib2)@i 22. g2 is Q2-R-pre-preserving on \mlambda{}e.(\muparrow{}e \mmember{}\msubb{} Ib2)@i 23. Inj(E(Ib2);E;g2)@i 24. \mforall{}e:E(Ib2). ((f (g2 e)) = Ib2(e))@i 25. \mlambda{}e.(\muparrow{}e \mmember{}\msubb{} [Ia1?Ia2]) \mleftarrow{}\mleftarrow{}= [\mlambda{}e.(\muparrow{}e \mmember{}\msubb{} Ib1)? g1 : g2]== \mlambda{}e.(\muparrow{}e \mmember{}\msubb{} [Ib1?Ib2]) 26. [\mlambda{}e.(\muparrow{}e \mmember{}\msubb{} Ib1)? g1 : g2] is Q1|\mlambda{}e.(\muparrow{}e \mmember{}\msubb{} Ia1) \mvee{} Q2|\mlambda{}e.(\muparrow{}e \mmember{}\msubb{} Ia2)-R-pre-preserving on \mlambda{}e.(\muparrow{}e \mmember{}\msubb{} [Ib1?Ib2]) \mvdash{} Inj(E([Ib1?Ib2]);E;[\mlambda{}e.(\muparrow{}e \mmember{}\msubb{} Ib1)? g1 : g2]) By Latex: (All (Unfold `inject`) THEN Auto) Home Index