Proof of Nuprl Lemma : basic-axioms-imply

Step * 1 of Lemma basic-axioms-imply_between1

1. e : EuclideanPlaneStructure
2. ∀a,b,c,d:Point.  (ab>cd ⇒ ab ≥ cd)
3. ∀a,b,c:Point.  (ba>ac ⇒ b # c)
4. ∀a,b,c:Point.  bc ≥ aa
5. ∀a,b,c,d,e@0,f:Point.  (ab>cd ⇒ cd ≥ e@0f ⇒ ab>e@0f)
6. ∀a,b,c,d,e@0,f:Point.  (ab ≥ cd ⇒ cd>e@0f ⇒ ab>e@0f)
7. ∀a,b,c:Point.  (B(abc) ⇒ b # c ⇒ ac>ab)
8. ∀a,b,c:Point.  (a leftof bc ⇒ b leftof ca)
9. ∀a,b,c:Point.  (a leftof bc ⇒ b # c)
10. ∀a,b,c,d:Point.  (B(abd) ⇒ B(bcd) ⇒ B(abc))
11. ∀a,b,c,d,A,B,C,D:Point.  (a # b ⇒ B(abc) ⇒ B(ABC) ⇒ ab ≅ AB ⇒ bc ≅ BC ⇒ ad ≅ AD ⇒ bd ≅ BD ⇒ cd ≅ CD)
12. ∀a,b,c,x,y:Point.  (ax ≅ ay ⇒ bx ≅ by ⇒ cx ≅ cy ⇒ x # y ⇒ (¬a # bc))
13. ∀a,b,x,y,z:Point.  (x leftof ab ⇒ y leftof ab ⇒ B(xzy) ⇒ z leftof ab)
14. ∀a,b,c,y:Point.  (a # bc ⇒ y # b ⇒ (¬y # ab) ⇒ y # bc)
15. a1 : Point
16. a2 : Point
17. b : Point
18. c : Point
19. a1 ≡ a2
20. B(a1bc)
21. ∀a:Point. a ≡ a
22. ∀a,b:Point.  ab ≅ ba
23. ∀a,b,c:Point.  (a ≡ b ⇒ ac ≅ bc)
24. ∀a,b:Point.  (a # b ⇒ b # a)
⊢ B(a2bc)
BY
{ (Assert ∀a,b,x,y:Point.  ((¬ab>aa) ⇒ a leftof xy ⇒ b leftof xy) BY
         (Auto
          THEN (Assert B(ab1a) BY
                      (Unfold `geo-between` 0
                       THEN Auto
                       THEN (D 0 THEN Auto)
                       THEN Unfold `geo-lsep` -1
                       THEN D -1
                       THEN Auto))
          THEN InstHyp [⌜x⌝;⌜y⌝;⌜a⌝;⌜a⌝;⌜b1⌝] (13)⋅
          THEN Auto)) }

1
1. e : EuclideanPlaneStructure
2. ∀a,b,c,d:Point.  (ab>cd ⇒ ab ≥ cd)
3. ∀a,b,c:Point.  (ba>ac ⇒ b # c)
4. ∀a,b,c:Point.  bc ≥ aa
5. ∀a,b,c,d,e@0,f:Point.  (ab>cd ⇒ cd ≥ e@0f ⇒ ab>e@0f)
6. ∀a,b,c,d,e@0,f:Point.  (ab ≥ cd ⇒ cd>e@0f ⇒ ab>e@0f)
7. ∀a,b,c:Point.  (B(abc) ⇒ b # c ⇒ ac>ab)
8. ∀a,b,c:Point.  (a leftof bc ⇒ b leftof ca)
9. ∀a,b,c:Point.  (a leftof bc ⇒ b # c)
10. ∀a,b,c,d:Point.  (B(abd) ⇒ B(bcd) ⇒ B(abc))
11. ∀a,b,c,d,A,B,C,D:Point.  (a # b ⇒ B(abc) ⇒ B(ABC) ⇒ ab ≅ AB ⇒ bc ≅ BC ⇒ ad ≅ AD ⇒ bd ≅ BD ⇒ cd ≅ CD)
12. ∀a,b,c,x,y:Point.  (ax ≅ ay ⇒ bx ≅ by ⇒ cx ≅ cy ⇒ x # y ⇒ (¬a # bc))
13. ∀a,b,x,y,z:Point.  (x leftof ab ⇒ y leftof ab ⇒ B(xzy) ⇒ z leftof ab)
14. ∀a,b,c,y:Point.  (a # bc ⇒ y # b ⇒ (¬y # ab) ⇒ y # bc)
15. a1 : Point
16. a2 : Point
17. b : Point
18. c : Point
19. a1 ≡ a2
20. B(a1bc)
21. ∀a:Point. a ≡ a
22. ∀a,b:Point.  ab ≅ ba
23. ∀a,b,c:Point.  (a ≡ b ⇒ ac ≅ bc)
24. ∀a,b:Point.  (a # b ⇒ b # a)
25. ∀a,b,x,y:Point.  ((¬ab>aa) ⇒ a leftof xy ⇒ b leftof xy)
⊢ B(a2bc)

Latex:

Latex:
1. e : EuclideanPlaneStructure 2. \mforall{}a,b,c,d:Point. (ab>cd {}\mRightarrow{} ab \mgeq{} cd) 3. \mforall{}a,b,c:Point. (ba>ac {}\mRightarrow{} b \# c) 4. \mforall{}a,b,c:Point. bc \mgeq{} aa 5. \mforall{}a,b,c,d,e@0,f:Point. (ab>cd {}\mRightarrow{} cd \mgeq{} e@0f {}\mRightarrow{} ab>e@0f) 6. \mforall{}a,b,c,d,e@0,f:Point. (ab \mgeq{} cd {}\mRightarrow{} cd>e@0f {}\mRightarrow{} ab>e@0f) 7. \mforall{}a,b,c:Point. (B(abc) {}\mRightarrow{} b \# c {}\mRightarrow{} ac>ab) 8. \mforall{}a,b,c:Point. (a leftof bc {}\mRightarrow{} b leftof ca) 9. \mforall{}a,b,c:Point. (a leftof bc {}\mRightarrow{} b \# c) 10. \mforall{}a,b,c,d:Point. (B(abd) {}\mRightarrow{} B(bcd) {}\mRightarrow{} B(abc)) 11. \mforall{}a,b,c,d,A,B,C,D:Point. (a \# b {}\mRightarrow{} B(abc) {}\mRightarrow{} B(ABC) {}\mRightarrow{} ab \mcong{} AB {}\mRightarrow{} bc \mcong{} BC {}\mRightarrow{} ad \mcong{} AD {}\mRightarrow{} bd \mcong{} BD {}\mRightarrow{} cd \mcong{} CD) 12. \mforall{}a,b,c,x,y:Point. (ax \mcong{} ay {}\mRightarrow{} bx \mcong{} by {}\mRightarrow{} cx \mcong{} cy {}\mRightarrow{} x \# y {}\mRightarrow{} (\mneg{}a \# bc)) 13. \mforall{}a,b,x,y,z:Point. (x leftof ab {}\mRightarrow{} y leftof ab {}\mRightarrow{} B(xzy) {}\mRightarrow{} z leftof ab) 14. \mforall{}a,b,c,y:Point. (a \# bc {}\mRightarrow{} y \# b {}\mRightarrow{} (\mneg{}y \# ab) {}\mRightarrow{} y \# bc) 15. a1 : Point 16. a2 : Point 17. b : Point 18. c : Point 19. a1 \mequiv{} a2 20. B(a1bc) 21. \mforall{}a:Point. a \mequiv{} a 22. \mforall{}a,b:Point. ab \mcong{} ba 23. \mforall{}a,b,c:Point. (a \mequiv{} b {}\mRightarrow{} ac \mcong{} bc) 24. \mforall{}a,b:Point. (a \# b {}\mRightarrow{} b \# a) \mvdash{} B(a2bc) By Latex: (Assert \mforall{}a,b,x,y:Point. ((\mneg{}ab>aa) {}\mRightarrow{} a leftof xy {}\mRightarrow{} b leftof xy) BY (Auto THEN (Assert B(ab1a) BY (Unfold `geo-between` 0 THEN Auto THEN (D 0 THEN Auto) THEN Unfold `geo-lsep` -1 THEN D -1 THEN Auto)) THEN InstHyp [\mkleeneopen{}x\mkleeneclose{};\mkleeneopen{}y\mkleeneclose{};\mkleeneopen{}a\mkleeneclose{};\mkleeneopen{}a\mkleeneclose{};\mkleeneopen{}b1\mkleeneclose{}] (13)\mcdot{} THEN Auto)) Home Index