Proof of Nuprl Lemma : rv-orthogonal-iff

Step * 2 2 1 1 2 of Lemma rv-orthogonal-iff

1. rv : InnerProductSpace
2. f : Point(rv) ⟶ Point(rv)
3. f 0 ≡ 0
4. ∀[x,y:Point(rv)].  (||f x - f y|| = ||x - y||)
5. ∀x,y:Point(rv).  (x ≡ y ⇒ f x ≡ f y)
6. ∀x,y:Point(rv).  f x + y ≡ f x + f y
7. x : Point(rv)
8. a : ℝ
9. n : ℤ
10. 0 < n
11. ∀x:Point(rv). f r(n - 1)*x ≡ r(n - 1)*f x
12. x1 : Point(rv)
⊢ f r(n)*x1 ≡ r(n)*f x1
BY
{ (Assert ∀y:Point(rv). r(n)*y ≡ r(n - 1)*y + r1*y BY
         (Auto THEN RealVecEqual THEN Auto)) }

1
1. rv : InnerProductSpace
2. f : Point(rv) ⟶ Point(rv)
3. f 0 ≡ 0
4. ∀[x,y:Point(rv)].  (||f x - f y|| = ||x - y||)
5. ∀x,y:Point(rv).  (x ≡ y ⇒ f x ≡ f y)
6. ∀x,y:Point(rv).  f x + y ≡ f x + f y
7. x : Point(rv)
8. a : ℝ
9. n : ℤ
10. 0 < n
11. ∀x:Point(rv). f r(n - 1)*x ≡ r(n - 1)*f x
12. x1 : Point(rv)
13. ∀y:Point(rv). r(n)*y ≡ r(n - 1)*y + r1*y
⊢ f r(n)*x1 ≡ r(n)*f x1

Latex:

Latex:
1. rv : InnerProductSpace 2. f : Point(rv) {}\mrightarrow{} Point(rv) 3. f 0 \mequiv{} 0 4. \mforall{}[x,y:Point(rv)]. (||f x - f y|| = ||x - y||) 5. \mforall{}x,y:Point(rv). (x \mequiv{} y {}\mRightarrow{} f x \mequiv{} f y) 6. \mforall{}x,y:Point(rv). f x + y \mequiv{} f x + f y 7. x : Point(rv) 8. a : \mBbbR{} 9. n : \mBbbZ{} 10. 0 < n 11. \mforall{}x:Point(rv). f r(n - 1)*x \mequiv{} r(n - 1)*f x 12. x1 : Point(rv) \mvdash{} f r(n)*x1 \mequiv{} r(n)*f x1 By Latex: (Assert \mforall{}y:Point(rv). r(n)*y \mequiv{} r(n - 1)*y + r1*y BY (Auto THEN RealVecEqual THEN Auto)) Home Index