Proof of Nuprl Lemma : separable-translation-group

Step * 1 1 2 of Lemma separable-translation-group_iff

1. rv : InnerProductSpace
2. e : {e:Point(rv)| e^2 = r1}
3. T : ℝ ⟶ Point(rv) ⟶ Point(rv)
4. translation-group-fun(rv;e;T)
5. translation-group-fun(rv;e;T)
6. separable-kernel(rv;e;λh,t. ρ(h;t))
7. phi : ℝ ⟶ ℝ
8. psi : {h:Point(rv)| h ⋅ e = r0}  ⟶ {r:ℝ| r0 < r}
9. ∀h:{h:Point(rv)| h ⋅ e = r0} . ∀t:ℝ.  (ρ(h;t) = ((phi t) * (psi h)))
10. (phi r0) = r0
11. (psi 0) = r1
12. ∀t,s:ℝ.  ((t < s) ⇒ ((phi t) < (phi s)))
13. ∀t:ℝ. ∃s:ℝ. ((phi s) = t)
14. ∀h1,h2:{h:Point(rv)| h ⋅ e = r0} .  (psi h1 ≠ psi h2 ⇒ h1 # h2)
15. ∀t,s:ℝ.  (phi t ≠ phi s ⇒ t ≠ s)
16. ∀h:{h:Point(rv)| h ⋅ e = r0} . ∀t:ℝ.  (||T_t(h) - h|| = (|phi t| * (psi h)))
⊢ (∀a:ℝ. ∀h:{h:Point(rv)| h ⋅ e = r0} .  (a ≠ r0 ⇒ (r0 < ||T_a(h) - h||)))
∧ (∀a,b:ℝ. ∀h:{h:Point(rv)| h ⋅ e = r0} .
     (a ≠ r0 ⇒ b ≠ r0 ⇒ ((||T_a(h) - h||/||T_b(h) - h||) = (||T_a(0)||/||T_b(0)||))))
BY
{ Auto }

1
1. rv : InnerProductSpace
2. e : {e:Point(rv)| e^2 = r1}
3. T : ℝ ⟶ Point(rv) ⟶ Point(rv)
4. translation-group-fun(rv;e;T)
5. translation-group-fun(rv;e;T)
6. separable-kernel(rv;e;λh,t. ρ(h;t))
7. phi : ℝ ⟶ ℝ
8. psi : {h:Point(rv)| h ⋅ e = r0}  ⟶ {r:ℝ| r0 < r}
9. ∀h:{h:Point(rv)| h ⋅ e = r0} . ∀t:ℝ.  (ρ(h;t) = ((phi t) * (psi h)))
10. (phi r0) = r0
11. (psi 0) = r1
12. ∀t,s:ℝ.  ((t < s) ⇒ ((phi t) < (phi s)))
13. ∀t:ℝ. ∃s:ℝ. ((phi s) = t)
14. ∀h1,h2:{h:Point(rv)| h ⋅ e = r0} .  (psi h1 ≠ psi h2 ⇒ h1 # h2)
15. ∀t,s:ℝ.  (phi t ≠ phi s ⇒ t ≠ s)
16. ∀h:{h:Point(rv)| h ⋅ e = r0} . ∀t:ℝ.  (||T_t(h) - h|| = (|phi t| * (psi h)))
17. a : ℝ
18. h : {h:Point(rv)| h ⋅ e = r0}
19. a ≠ r0
⊢ r0 < ||T_a(h) - h||

2
1. rv : InnerProductSpace
2. e : {e:Point(rv)| e^2 = r1}
3. T : ℝ ⟶ Point(rv) ⟶ Point(rv)
4. translation-group-fun(rv;e;T)
5. translation-group-fun(rv;e;T)
6. separable-kernel(rv;e;λh,t. ρ(h;t))
7. phi : ℝ ⟶ ℝ
8. psi : {h:Point(rv)| h ⋅ e = r0}  ⟶ {r:ℝ| r0 < r}
9. ∀h:{h:Point(rv)| h ⋅ e = r0} . ∀t:ℝ.  (ρ(h;t) = ((phi t) * (psi h)))
10. (phi r0) = r0
11. (psi 0) = r1
12. ∀t,s:ℝ.  ((t < s) ⇒ ((phi t) < (phi s)))
13. ∀t:ℝ. ∃s:ℝ. ((phi s) = t)
14. ∀h1,h2:{h:Point(rv)| h ⋅ e = r0} .  (psi h1 ≠ psi h2 ⇒ h1 # h2)
15. ∀t,s:ℝ.  (phi t ≠ phi s ⇒ t ≠ s)
16. ∀h:{h:Point(rv)| h ⋅ e = r0} . ∀t:ℝ.  (||T_t(h) - h|| = (|phi t| * (psi h)))
17. ∀a:ℝ. ∀h:{h:Point(rv)| h ⋅ e = r0} .  (a ≠ r0 ⇒ (r0 < ||T_a(h) - h||))
18. a : ℝ
19. b : ℝ
20. h : {h:Point(rv)| h ⋅ e = r0}
21. a ≠ r0
22. b ≠ r0
⊢ (||T_a(h) - h||/||T_b(h) - h||) = (||T_a(0)||/||T_b(0)||)

Latex:

Latex:
1. rv : InnerProductSpace 2. e : \{e:Point(rv)| e\^{}2 = r1\} 3. T : \mBbbR{} {}\mrightarrow{} Point(rv) {}\mrightarrow{} Point(rv) 4. translation-group-fun(rv;e;T) 5. translation-group-fun(rv;e;T) 6. separable-kernel(rv;e;\mlambda{}h,t. \mrho{}(h;t)) 7. phi : \mBbbR{} {}\mrightarrow{} \mBbbR{} 8. psi : \{h:Point(rv)| h \mcdot{} e = r0\} {}\mrightarrow{} \{r:\mBbbR{}| r0 < r\} 9. \mforall{}h:\{h:Point(rv)| h \mcdot{} e = r0\} . \mforall{}t:\mBbbR{}. (\mrho{}(h;t) = ((phi t) * (psi h))) 10. (phi r0) = r0 11. (psi 0) = r1 12. \mforall{}t,s:\mBbbR{}. ((t < s) {}\mRightarrow{} ((phi t) < (phi s))) 13. \mforall{}t:\mBbbR{}. \mexists{}s:\mBbbR{}. ((phi s) = t) 14. \mforall{}h1,h2:\{h:Point(rv)| h \mcdot{} e = r0\} . (psi h1 \mneq{} psi h2 {}\mRightarrow{} h1 \# h2) 15. \mforall{}t,s:\mBbbR{}. (phi t \mneq{} phi s {}\mRightarrow{} t \mneq{} s) 16. \mforall{}h:\{h:Point(rv)| h \mcdot{} e = r0\} . \mforall{}t:\mBbbR{}. (||T\_t(h) - h|| = (|phi t| * (psi h))) \mvdash{} (\mforall{}a:\mBbbR{}. \mforall{}h:\{h:Point(rv)| h \mcdot{} e = r0\} . (a \mneq{} r0 {}\mRightarrow{} (r0 < ||T\_a(h) - h||))) \mwedge{} (\mforall{}a,b:\mBbbR{}. \mforall{}h:\{h:Point(rv)| h \mcdot{} e = r0\} . (a \mneq{} r0 {}\mRightarrow{} b \mneq{} r0 {}\mRightarrow{} ((||T\_a(h) - h||/||T\_b(h) - h||) = (||T\_a(0)||/||T\_b(0)||)))) By Latex: Auto Home Index