Proof of Nuprl Lemma : trans-from-kernel-is-trans

Step * 1 1 1 1 1 of Lemma trans-from-kernel-is-trans

.....assertion.....
1. rv : InnerProductSpace
2. e : {e:Point(rv)| e^2 = r1}
3. f : {h:Point(rv)| h ⋅ e = r0}  ⟶ ℝ ⟶ ℝ
4. g : {h:Point(rv)| h ⋅ e = r0}  ⟶ ℝ ⟶ ℝ
5. e^2 = r1
6. ∀h1,h2:{h:Point(rv)| h ⋅ e = r0} . ∀t1,t2:ℝ.  (f h1 t1 ≠ f h2 t2 ⇒ (h1 # h2 ∨ t1 ≠ t2))
7. ∀h:{h:Point(rv)| h ⋅ e = r0} . ((f h r0) = r0)
8. ∀h:{h:Point(rv)| h ⋅ e = r0} . ∀t1,t2:ℝ.  ((t1 < t2) ⇒ ((f h t1) < (f h t2)))
9. ∀h:{h:Point(rv)| h ⋅ e = r0} . ∀r:ℝ.  ∃t:ℝ. ((f h t) = r)
10. ∀h:{h:Point(rv)| h ⋅ e = r0} . ∀r:ℝ.  ((f h (g h r)) = r)
11. ∀h1,h2:{h:Point(rv)| h ⋅ e = r0} . ∀t1,t2:ℝ.  (h1 ≡ h2 ⇒ (t1 = t2) ⇒ ((f h1 t1) = (f h2 t2)))
12. ∀h1,h2:{h:Point(rv)| h ⋅ e = r0} . ∀t1,t2:ℝ.  (g h1 t1 ≠ g h2 t2 ⇒ (h1 # h2 ∨ t1 ≠ t2))
13. ∀h1,h2:{h:Point(rv)| h ⋅ e = r0} . ∀t1,t2:ℝ.  (h1 ≡ h2 ⇒ (t1 = t2) ⇒ ((g h1 t1) = (g h2 t2)))
14. ∀y:Point(rv). (y - y ⋅ e*e ∈ {h:Point(rv)| h ⋅ e = r0} )
15. h : {h:Point(rv)| h ⋅ e = r0}
16. tau : ℝ
17. t : ℝ
18. v1 : Point(rv)
19. v2 : ℝ
20. h ⋅ e = r0
21. h + f h tau*e ≡ v1 + v2*e ∧ (v1 ⋅ e = r0)
22. h + f h tau*e - h + f h tau*e ⋅ e*e ≡ v1
23. (f h tau) = v2
24. v1 ≡ h
⊢ (g v1 v2) = tau
BY
{ ((Assert (g v1 v2) = (g h (f h tau)) BY
          (BackThruSomeHyp THEN Auto))
   THEN (RWO "-1" 0 THENA Auto)
   THEN ((BLemma `not-rneq` THENM D 0) THENA Auto)) }

1
1. rv : InnerProductSpace
2. e : {e:Point(rv)| e^2 = r1}
3. f : {h:Point(rv)| h ⋅ e = r0}  ⟶ ℝ ⟶ ℝ
4. g : {h:Point(rv)| h ⋅ e = r0}  ⟶ ℝ ⟶ ℝ
5. e^2 = r1
6. ∀h1,h2:{h:Point(rv)| h ⋅ e = r0} . ∀t1,t2:ℝ.  (f h1 t1 ≠ f h2 t2 ⇒ (h1 # h2 ∨ t1 ≠ t2))
7. ∀h:{h:Point(rv)| h ⋅ e = r0} . ((f h r0) = r0)
8. ∀h:{h:Point(rv)| h ⋅ e = r0} . ∀t1,t2:ℝ.  ((t1 < t2) ⇒ ((f h t1) < (f h t2)))
9. ∀h:{h:Point(rv)| h ⋅ e = r0} . ∀r:ℝ.  ∃t:ℝ. ((f h t) = r)
10. ∀h:{h:Point(rv)| h ⋅ e = r0} . ∀r:ℝ.  ((f h (g h r)) = r)
11. ∀h1,h2:{h:Point(rv)| h ⋅ e = r0} . ∀t1,t2:ℝ.  (h1 ≡ h2 ⇒ (t1 = t2) ⇒ ((f h1 t1) = (f h2 t2)))
12. ∀h1,h2:{h:Point(rv)| h ⋅ e = r0} . ∀t1,t2:ℝ.  (g h1 t1 ≠ g h2 t2 ⇒ (h1 # h2 ∨ t1 ≠ t2))
13. ∀h1,h2:{h:Point(rv)| h ⋅ e = r0} . ∀t1,t2:ℝ.  (h1 ≡ h2 ⇒ (t1 = t2) ⇒ ((g h1 t1) = (g h2 t2)))
14. ∀y:Point(rv). (y - y ⋅ e*e ∈ {h:Point(rv)| h ⋅ e = r0} )
15. h : {h:Point(rv)| h ⋅ e = r0}
16. tau : ℝ
17. t : ℝ
18. v1 : Point(rv)
19. v2 : ℝ
20. h ⋅ e = r0
21. h + f h tau*e ≡ v1 + v2*e ∧ (v1 ⋅ e = r0)
22. h + f h tau*e - h + f h tau*e ⋅ e*e ≡ v1
23. (f h tau) = v2
24. v1 ≡ h
25. (g v1 v2) = (g h (f h tau))
26. g h (f h tau) ≠ tau
⊢ False

Latex:

Latex:
.....assertion..... 1. rv : InnerProductSpace 2. e : \{e:Point(rv)| e\^{}2 = r1\} 3. f : \{h:Point(rv)| h \mcdot{} e = r0\} {}\mrightarrow{} \mBbbR{} {}\mrightarrow{} \mBbbR{} 4. g : \{h:Point(rv)| h \mcdot{} e = r0\} {}\mrightarrow{} \mBbbR{} {}\mrightarrow{} \mBbbR{} 5. e\^{}2 = r1 6. \mforall{}h1,h2:\{h:Point(rv)| h \mcdot{} e = r0\} . \mforall{}t1,t2:\mBbbR{}. (f h1 t1 \mneq{} f h2 t2 {}\mRightarrow{} (h1 \# h2 \mvee{} t1 \mneq{} t2)) 7. \mforall{}h:\{h:Point(rv)| h \mcdot{} e = r0\} . ((f h r0) = r0) 8. \mforall{}h:\{h:Point(rv)| h \mcdot{} e = r0\} . \mforall{}t1,t2:\mBbbR{}. ((t1 < t2) {}\mRightarrow{} ((f h t1) < (f h t2))) 9. \mforall{}h:\{h:Point(rv)| h \mcdot{} e = r0\} . \mforall{}r:\mBbbR{}. \mexists{}t:\mBbbR{}. ((f h t) = r) 10. \mforall{}h:\{h:Point(rv)| h \mcdot{} e = r0\} . \mforall{}r:\mBbbR{}. ((f h (g h r)) = r) 11. \mforall{}h1,h2:\{h:Point(rv)| h \mcdot{} e = r0\} . \mforall{}t1,t2:\mBbbR{}. (h1 \mequiv{} h2 {}\mRightarrow{} (t1 = t2) {}\mRightarrow{} ((f h1 t1) = (f h2 t2))) 12. \mforall{}h1,h2:\{h:Point(rv)| h \mcdot{} e = r0\} . \mforall{}t1,t2:\mBbbR{}. (g h1 t1 \mneq{} g h2 t2 {}\mRightarrow{} (h1 \# h2 \mvee{} t1 \mneq{} t2)) 13. \mforall{}h1,h2:\{h:Point(rv)| h \mcdot{} e = r0\} . \mforall{}t1,t2:\mBbbR{}. (h1 \mequiv{} h2 {}\mRightarrow{} (t1 = t2) {}\mRightarrow{} ((g h1 t1) = (g h2 t2))) 14. \mforall{}y:Point(rv). (y - y \mcdot{} e*e \mmember{} \{h:Point(rv)| h \mcdot{} e = r0\} ) 15. h : \{h:Point(rv)| h \mcdot{} e = r0\} 16. tau : \mBbbR{} 17. t : \mBbbR{} 18. v1 : Point(rv) 19. v2 : \mBbbR{} 20. h \mcdot{} e = r0 21. h + f h tau*e \mequiv{} v1 + v2*e \mwedge{} (v1 \mcdot{} e = r0) 22. h + f h tau*e - h + f h tau*e \mcdot{} e*e \mequiv{} v1 23. (f h tau) = v2 24. v1 \mequiv{} h \mvdash{} (g v1 v2) = tau By Latex: ((Assert (g v1 v2) = (g h (f h tau)) BY (BackThruSomeHyp THEN Auto)) THEN (RWO "-1" 0 THENA Auto) THEN ((BLemma `not-rneq` THENM D 0) THENA Auto)) Home Index