Proof of Nuprl Lemma : hyptrans

Step * 1 1 1 3 1 1 of Lemma hyptrans_lemma

1. rv : InnerProductSpace
2. e : Point
3. h : Point
4. e^2 = r1
5. h ⋅ e = r0
6. tau : ℝ
7. t : ℝ
8. e ⋅ h = r0
9. h + sinh(tau) * rsqrt(r1 + h^2)*e^2 = (h^2 + (sinh(tau)^2 * (r1 + h^2)))
10. (r1 + h^2 + (sinh(tau)^2 * (r1 + h^2))) = (cosh(tau)^2 * (r1 + h^2))
11. r0 ≤ (r1 + h^2)
12. r0 ≤ (r1 + h + sinh(tau) * rsqrt(r1 + h^2)*e^2)
13. (cosh(tau) * rsqrt(r1 + h^2)) = rsqrt(r1 + h + sinh(tau) * rsqrt(r1 + h^2)*e^2)
14. v : {r:ℝ| (r0 ≤ r) ∧ ((r * r) = (r1 + h^2))}
15. rsqrt(r1 + h^2) = v ∈ {r:ℝ| (r0 ≤ r) ∧ ((r * r) = (r1 + h^2))}

⊢ h + sinh(tau) * v*e + (r0 + ((sinh(tau) * v) * r1)) * (cosh(t) - r1)*e + (cosh(tau) * v) * sinh(t)*e ≡ h + ((sinh(tau)

* cosh(t))
+ (cosh(tau) * sinh(t)))
* v*e
BY
{ nRNorm 0 }

1
1. rv : InnerProductSpace
2. e : Point
3. h : Point
4. e^2 = r1
5. h ⋅ e = r0
6. tau : ℝ
7. t : ℝ
8. e ⋅ h = r0
9. h + sinh(tau) * rsqrt(r1 + h^2)*e^2 = (h^2 + (sinh(tau)^2 * (r1 + h^2)))
10. (r1 + h^2 + (sinh(tau)^2 * (r1 + h^2))) = (cosh(tau)^2 * (r1 + h^2))
11. r0 ≤ (r1 + h^2)
12. r0 ≤ (r1 + h + sinh(tau) * rsqrt(r1 + h^2)*e^2)
13. (cosh(tau) * rsqrt(r1 + h^2)) = rsqrt(r1 + h + sinh(tau) * rsqrt(r1 + h^2)*e^2)
14. v : {r:ℝ| (r0 ≤ r) ∧ ((r * r) = (r1 + h^2))}
15. rsqrt(r1 + h^2) = v ∈ {r:ℝ| (r0 ≤ r) ∧ ((r * r) = (r1 + h^2))}

⊢ h + sinh(tau) * v*e + -(sinh(tau) * v) + (cosh(t) * sinh(tau) * v)*e + cosh(tau) * sinh(t) * v*e ≡ h + (cosh(t)

* sinh(tau)
* v)
+ (cosh(tau) * sinh(t) * v)*e

Latex:

Latex:
1. rv : InnerProductSpace 2. e : Point 3. h : Point 4. e\^{}2 = r1 5. h \mcdot{} e = r0 6. tau : \mBbbR{} 7. t : \mBbbR{} 8. e \mcdot{} h = r0 9. h + sinh(tau) * rsqrt(r1 + h\^{}2)*e\^{}2 = (h\^{}2 + (sinh(tau)\^{}2 * (r1 + h\^{}2))) 10. (r1 + h\^{}2 + (sinh(tau)\^{}2 * (r1 + h\^{}2))) = (cosh(tau)\^{}2 * (r1 + h\^{}2)) 11. r0 \mleq{} (r1 + h\^{}2) 12. r0 \mleq{} (r1 + h + sinh(tau) * rsqrt(r1 + h\^{}2)*e\^{}2) 13. (cosh(tau) * rsqrt(r1 + h\^{}2)) = rsqrt(r1 + h + sinh(tau) * rsqrt(r1 + h\^{}2)*e\^{}2) 14. v : \{r:\mBbbR{}| (r0 \mleq{} r) \mwedge{} ((r * r) = (r1 + h\^{}2))\} 15. rsqrt(r1 + h\^{}2) = v \mvdash{} h + sinh(tau) * v*e + (r0 + ((sinh(tau) * v) * r1)) * (cosh(t) - r1)*e + (cosh(tau) * v) * sinh(t)*e \mequiv{} h + ((sinh(tau) * cosh(t)) + (cosh(tau) * sinh(t))) * v*e By Latex: nRNorm 0 Home Index