Proof of Nuprl Lemma : implies-isometry

Step * 1 1 1 of Lemma implies-isometry

1. rv : InnerProductSpace
2. f : Point ⟶ Point
3. r : {r:ℝ| r0 < r}
4. N : {2...}
5. ∀x,y:Point.  (x ≡ y ⇒ f x ≡ f y)
6. ∀x,y:Point.  ((||x - y|| = r) ⇒ (||f x - f y|| ≤ r))
7. ∀x,y:Point.  ((||x - y|| = (r(N) * r)) ⇒ ((r(N) * r) ≤ ||f x - f y||))
8. ∀x,y:Point.  (((||x - y|| = r) ∨ (||x - y|| = (r(2) * r))) ⇒ (||f x - f y|| = ||x - y||))
9. ∀s,r@0:ℝ.
     ((∃n,m:ℕ⁺. (s = (r(n)/r(m))))
     ⇒ (∃n,m:ℕ⁺. (r@0 = (r(n)/r(m))))
     ⇒ (∀x,y:Point.  ((||x - y|| ∈ (r@0 * r, s * r)) ⇒ (||f x - f y|| ∈ [r@0 * r, s * r]))))
⊢ Orthogonal(λx.f x - f 0)
BY
{ ((BLemma `rv-orthogonal-iff` THENA Auto)
   THEN Reduce 0
   THEN D 0
   THEN Try ((RealVecEqual THEN Auto))
   THEN Assert ⌜∀x,y:Point.  (||f x - f y|| = ||x - y||)⌝⋅) }

1
.....assertion.....
1. rv : InnerProductSpace
2. f : Point ⟶ Point
3. r : {r:ℝ| r0 < r}
4. N : {2...}
5. ∀x,y:Point.  (x ≡ y ⇒ f x ≡ f y)
6. ∀x,y:Point.  ((||x - y|| = r) ⇒ (||f x - f y|| ≤ r))
7. ∀x,y:Point.  ((||x - y|| = (r(N) * r)) ⇒ ((r(N) * r) ≤ ||f x - f y||))
8. ∀x,y:Point.  (((||x - y|| = r) ∨ (||x - y|| = (r(2) * r))) ⇒ (||f x - f y|| = ||x - y||))
9. ∀s,r@0:ℝ.
     ((∃n,m:ℕ⁺. (s = (r(n)/r(m))))
     ⇒ (∃n,m:ℕ⁺. (r@0 = (r(n)/r(m))))
     ⇒ (∀x,y:Point.  ((||x - y|| ∈ (r@0 * r, s * r)) ⇒ (||f x - f y|| ∈ [r@0 * r, s * r]))))
⊢ ∀x,y:Point.  (||f x - f y|| = ||x - y||)

2
1. rv : InnerProductSpace
2. f : Point ⟶ Point
3. r : {r:ℝ| r0 < r}
4. N : {2...}
5. ∀x,y:Point.  (x ≡ y ⇒ f x ≡ f y)
6. ∀x,y:Point.  ((||x - y|| = r) ⇒ (||f x - f y|| ≤ r))
7. ∀x,y:Point.  ((||x - y|| = (r(N) * r)) ⇒ ((r(N) * r) ≤ ||f x - f y||))
8. ∀x,y:Point.  (((||x - y|| = r) ∨ (||x - y|| = (r(2) * r))) ⇒ (||f x - f y|| = ||x - y||))
9. ∀s,r@0:ℝ.
     ((∃n,m:ℕ⁺. (s = (r(n)/r(m))))
     ⇒ (∃n,m:ℕ⁺. (r@0 = (r(n)/r(m))))
     ⇒ (∀x,y:Point.  ((||x - y|| ∈ (r@0 * r, s * r)) ⇒ (||f x - f y|| ∈ [r@0 * r, s * r]))))
10. ∀x,y:Point.  (||f x - f y|| = ||x - y||)
⊢ Isometry(λx.f x - f 0)

Latex:

Latex:
1. rv : InnerProductSpace 2. f : Point {}\mrightarrow{} Point 3. r : \{r:\mBbbR{}| r0 < r\} 4. N : \{2...\} 5. \mforall{}x,y:Point. (x \mequiv{} y {}\mRightarrow{} f x \mequiv{} f y) 6. \mforall{}x,y:Point. ((||x - y|| = r) {}\mRightarrow{} (||f x - f y|| \mleq{} r)) 7. \mforall{}x,y:Point. ((||x - y|| = (r(N) * r)) {}\mRightarrow{} ((r(N) * r) \mleq{} ||f x - f y||)) 8. \mforall{}x,y:Point. (((||x - y|| = r) \mvee{} (||x - y|| = (r(2) * r))) {}\mRightarrow{} (||f x - f y|| = ||x - y||)) 9. \mforall{}s,r@0:\mBbbR{}. ((\mexists{}n,m:\mBbbN{}\msupplus{}. (s = (r(n)/r(m)))) {}\mRightarrow{} (\mexists{}n,m:\mBbbN{}\msupplus{}. (r@0 = (r(n)/r(m)))) {}\mRightarrow{} (\mforall{}x,y:Point. ((||x - y|| \mmember{} (r@0 * r, s * r)) {}\mRightarrow{} (||f x - f y|| \mmember{} [r@0 * r, s * r])))) \mvdash{} Orthogonal(\mlambda{}x.f x - f 0) By Latex: ((BLemma `rv-orthogonal-iff` THENA Auto) THEN Reduce 0 THEN D 0 THEN Try ((RealVecEqual THEN Auto)) THEN Assert \mkleeneopen{}\mforall{}x,y:Point. (||f x - f y|| = ||x - y||)\mkleeneclose{}\mcdot{}) Home Index