Proof of Nuprl Lemma : combine-antecedent-surjections

Step * 1 2 2 2 of Lemma combine-antecedent-surjections

1. es : EO@i'
2. [A] : E ─→ ℙ
3. [B] : E ─→ ℙ
4. [P] : E ─→ ℙ
5. [Q] : E ─→ ℙ
6. ∀e:E. (¬((A e) ∧ (B e)))
7. ∀e:E. (¬((P e) ∧ (Q e)))
8. ∀e:E. Dec(P e)@i
9. ∀e:E. Dec(A e)@i
10. ∀e:E. Dec(B e)@i
11. f : {e:E| A e}  ─→ {e:E| P e} @i
12. g : {e:E| B e}  ─→ {e:E| Q e} @i
13. P ←──f── A@i
14. ∀e:{e:E| P e} . ∃e':{e:E| A e} . ((f e') = e ∈ E)@i
15. Q ←──g── B@i
16. ∀e:{e:E| Q e} . ∃e':{e:E| B e} . ((g e') = e ∈ E)@i
17. h : {e:E| (A e) ∨ (B e)}  ─→ {e:E| (P e) ∨ (Q e)}
18. ∀e:{e:E| (A e) ∨ (B e)} . ((A e) ⇒ ((h e) = (f e) ∈ E))
19. ∀e:{e:E| (A e) ∨ (B e)} . ((¬(A e)) ⇒ ((h e) = (g e) ∈ E))
20. λe.((P e) ∨ (Q e)) ←──h── λe.((A e) ∨ (B e))
21. e : {e:E| (P e) ∨ (Q e)} @i
22. ¬(P e)
⊢ ∃e':{e:E| (A e) ∨ (B e)} . ((h e') = e ∈ E)
BY
{ OnMaybeHyp 16 (\h. (InstHyp [⌈e⌉] h ⋅
                      THEN (Auto THEN Try ((RepeatFor 2 (D -2) THEN Complete (Auto))))
                      THEN ParallelLast
                      THEN Auto
                      THEN NthHypEq (-1)
                      THEN EqCD
                      THEN Auto
                      THEN (D -2 THEN BackThruSomeHyp THEN Auto)⋅))⋅ }

1
1. es : EO@i'
2. A : E ─→ ℙ
3. B : E ─→ ℙ
4. P : E ─→ ℙ
5. Q : E ─→ ℙ
6. ∀e:E. (¬((A e) ∧ (B e)))
7. ∀e:E. (¬((P e) ∧ (Q e)))
8. ∀e:E. Dec(P e)@i
9. ∀e:E. Dec(A e)@i
10. ∀e:E. Dec(B e)@i
11. f : {e:E| A e}  ─→ {e:E| P e} @i
12. g : {e:E| B e}  ─→ {e:E| Q e} @i
13. P ←──f── A@i
14. ∀e:{e:E| P e} . ∃e':{e:E| A e} . ((f e') = e ∈ E)@i
15. Q ←──g── B@i
16. ∀e:{e:E| Q e} . ∃e':{e:E| B e} . ((g e') = e ∈ E)@i
17. h : {e:E| (A e) ∨ (B e)}  ─→ {e:E| (P e) ∨ (Q e)}
18. ∀e:{e:E| (A e) ∨ (B e)} . ((A e) ⇒ ((h e) = (f e) ∈ E))
19. ∀e:{e:E| (A e) ∨ (B e)} . ((¬(A e)) ⇒ ((h e) = (g e) ∈ E))
20. λe.((P e) ∨ (Q e)) ←──h── λe.((A e) ∨ (B e))
21. e : {e:E| (P e) ∨ (Q e)} @i
22. ¬(P e)
23. e' : E
24. B e'
25. (g e') = e ∈ E
⊢ ¬(A e')

Latex:

1. es : EO@i' 2. [A] : E {}\mrightarrow{} \mBbbP{} 3. [B] : E {}\mrightarrow{} \mBbbP{} 4. [P] : E {}\mrightarrow{} \mBbbP{} 5. [Q] : E {}\mrightarrow{} \mBbbP{} 6. \mforall{}e:E. (\mneg{}((A e) \mwedge{} (B e))) 7. \mforall{}e:E. (\mneg{}((P e) \mwedge{} (Q e))) 8. \mforall{}e:E. Dec(P e)@i 9. \mforall{}e:E. Dec(A e)@i 10. \mforall{}e:E. Dec(B e)@i 11. f : \{e:E| A e\} {}\mrightarrow{} \{e:E| P e\} @i 12. g : \{e:E| B e\} {}\mrightarrow{} \{e:E| Q e\} @i 13. P \mleftarrow{}{}{}f{}{} A@i 14. \mforall{}e:\{e:E| P e\} . \mexists{}e':\{e:E| A e\} . ((f e') = e)@i 15. Q \mleftarrow{}{}{}g{}{} B@i 16. \mforall{}e:\{e:E| Q e\} . \mexists{}e':\{e:E| B e\} . ((g e') = e)@i 17. h : \{e:E| (A e) \mvee{} (B e)\} {}\mrightarrow{} \{e:E| (P e) \mvee{} (Q e)\} 18. \mforall{}e:\{e:E| (A e) \mvee{} (B e)\} . ((A e) {}\mRightarrow{} ((h e) = (f e))) 19. \mforall{}e:\{e:E| (A e) \mvee{} (B e)\} . ((\mneg{}(A e)) {}\mRightarrow{} ((h e) = (g e))) 20. \mlambda{}e.((P e) \mvee{} (Q e)) \mleftarrow{}{}{}h{}{} \mlambda{}e.((A e) \mvee{} (B e)) 21. e : \{e:E| (P e) \mvee{} (Q e)\} @i 22. \mneg{}(P e) \mvdash{} \mexists{}e':\{e:E| (A e) \mvee{} (B e)\} . ((h e') = e) By OnMaybeHyp 16 (\mbackslash{}h. (InstHyp [\mkleeneopen{}e\mkleeneclose{}] h \mcdot{} THEN (Auto THEN Try ((RepeatFor 2 (D -2) THEN Complete (Auto)))) THEN ParallelLast THEN Auto THEN NthHypEq (-1) THEN EqCD THEN Auto THEN (D -2 THEN BackThruSomeHyp THEN Auto)\mcdot{}))\mcdot{} Home Index