Revision as of 17:46, 23 July 2021

Concentric Ellipsoidal (T6) Coordinates (Part 2)

Orthogonal Coordinates

Speculation5

Spherical Coordinates

$r \cos θ$	$=$	$z,$
$r \sin θ$	$=$	$(x^{2} + y^{2})^{1 / 2},$
$\tan φ$	$=$	$\frac{y}{x} .$

Use λ₁ Instead of r

Here, as above, we define,

$λ_{1}^{2}$

$\equiv$

$x^{2} + q^{2} y^{2} + p^{2} z^{2}$

Using this expression to eliminate "x" (in favor of λ₁) in each of the three spherical-coordinate definitions, we obtain,

$r^{2} \equiv x^{2} + y^{2} + z^{2}$	$=$	$λ_{1}^{2} - y^{2} (q^{2} - 1) - z^{2} (p^{2} - 1);$
$\tan^{2} θ \equiv \frac{x^{2} + y^{2}}{z^{2}}$	$=$	$\frac{1}{z^{2}} [λ_{1}^{2} - y^{2} (q^{2} - 1) - p^{2} z^{2}];$
$\frac{1}{\tan^{2} φ} \equiv \frac{x^{2}}{y^{2}}$	$=$	$\frac{λ_{1}^{2} - p^{2} z^{2}}{y^{2}} - q^{2} .$

After a bit of additional algebraic manipulation, we find that,

$\frac{z^{2}}{λ_{1}^{2}}$	$=$	$\frac{(1 + \tan^{2} φ)}{𝒟^{2}},$
$\frac{y^{2}}{λ_{1}^{2}}$	$=$	$[\frac{𝒟^{2} \tan^{2} φ - p^{2} \tan^{2} φ (1 + \tan^{2} φ)}{(1 + q^{2} \tan^{2} φ) 𝒟^{2}}],$
$\frac{x^{2}}{λ_{1}^{2}}$	$=$	$1 - q^{2} (\frac{y^{2}}{λ_{1}^{2}}) - p^{2} (\frac{z^{2}}{λ_{1}^{2}}),$

where,

$𝒟^{2}$

$\equiv$

$[(1 + q^{2} \tan^{2} φ) (p^{2} + \tan^{2} θ) - p^{2} (q^{2} - 1) \tan^{2} φ] .$

As a check, let's set $q^{2} = p^{2} = 1$ , which should reduce to the normal spherical coordinate system.

$λ_{1}^{2}$

$\to$

$r^{2},$

and,

$𝒟^{2}$

$\to$

$[(1 + \tan^{2} φ) (1 + \tan^{2} θ)] .$

$\Rightarrow \frac{z^{2}}{λ_{1}^{2}}$	$\to$	$\frac{1}{1 + \tan^{2} θ} = \cos^{2} θ = \frac{z^{2}}{r^{2}};$
$\frac{y^{2}}{λ_{1}^{2}}$	$\to$	$[\frac{(1 + \tan^{2} φ) (1 + \tan^{2} θ) \tan^{2} φ - \tan^{2} φ (1 + \tan^{2} φ)}{(1 + \tan^{2} φ) (1 + \tan^{2} φ) (1 + \tan^{2} θ)}]$
	$=$	$\frac{\tan^{2} φ}{(1 + \tan^{2} φ)} [\frac{\tan^{2} θ}{(1 + \tan^{2} θ)}] = \sin^{2} θ \sin^{2} φ = \frac{y^{2}}{r^{2}};$
$\frac{x^{2}}{λ_{1}^{2}}$	$\to$	$1 - (\frac{y^{2}}{λ_{1}^{2}}) - (\frac{z^{2}}{λ_{1}^{2}}),$
	$\to$	$1 - \sin^{2} θ \sin^{2} φ - \cos^{2} θ = - \sin^{2} θ \sin^{2} φ + \sin^{2} θ = \sin^{2} θ \cos^{2} φ = \frac{x^{2}}{r^{2}} .$

Relationship To T3 Coordinates

If we set, $q = 1$ , but continue to assume that $p > 1$ , we expect to see a representation that resembles our previously discussed, T3 Coordinates. Note, for example, that the new "radial" coordinate is,

$λ_{1}^{2}$

$\to$

$(ϖ^{2} + p^{2} z^{2}),$

and,

$𝒟^{2}$

$\to$

$[(1 + \tan^{2} φ) (p^{2} + \tan^{2} θ)] .$

$\Rightarrow \frac{p^{2} z^{2}}{λ_{1}^{2}}$	$\to$	$\frac{p^{2}}{(p^{2} + \tan^{2} θ)} = \frac{1}{(1 + p^{- 2} \tan^{2} θ)},$
$\frac{ϖ^{2}}{λ_{1}^{2}} = \frac{x^{2}}{λ_{1}^{2}} + \frac{y^{2}}{λ_{1}^{2}}$	$\to$	$1 - p^{2} (\frac{z^{2}}{λ_{1}^{2}}) = [1 - \frac{1}{(1 + p^{- 2} \tan^{2} θ)}] .$

We also see that,

$\frac{ϖ^{2}}{p^{2} z^{2}}$

$\to$

$(1 + p^{- 2} \tan^{2} θ) [1 - \frac{1}{(1 + p^{- 2} \tan^{2} θ)}] = p^{- 2} \tan^{2} θ .$

Again Consider Full 3D Ellipsoid

Let's try to replace everywhere, $[ϖ / (p z)]^{2} = p^{- 2} \tan^{2} θ$ with $λ_{2}$ . This gives,

$\frac{𝒟^{2}}{p^{2}}$

$\equiv$

$[(1 + q^{2} \tan^{2} φ) λ_{2} - (q^{2} - 1) \tan^{2} φ] .$

which means that,

$\frac{p^{2} z^{2}}{λ_{1}^{2}}$	$=$	$\frac{(1 + \tan^{2} φ)}{[(1 + q^{2} \tan^{2} φ) λ_{2} - (q^{2} - 1) \tan^{2} φ]}$
	$=$	$\frac{(1 + \tan^{2} φ) / \tan^{2} φ}{[q^{2} λ_{2} (1 + q^{2} \tan^{2} φ) / (q^{2} \tan^{2} φ) - (q^{2} - 1)]} = \frac{1 / \sin^{2} φ}{[q^{2} λ_{2} Q^{2} - (q^{2} - 1)]},$
$\frac{q^{2} y^{2}}{λ_{1}^{2}}$	$=$	$\frac{q^{2} \tan^{2} φ}{(1 + q^{2} \tan^{2} φ)} - \frac{q^{2} \tan^{2} φ (1 + \tan^{2} φ)}{(1 + q^{2} \tan^{2} φ) [(1 + q^{2} \tan^{2} φ) λ_{2} - (q^{2} - 1) \tan^{2} φ]}$
	$=$	$\frac{q^{2} \tan^{2} φ}{(1 + q^{2} \tan^{2} φ)} {1 - \frac{(1 + \tan^{2} φ)}{[(1 + q^{2} \tan^{2} φ) λ_{2} - (q^{2} - 1) \tan^{2} φ]}}$
	$=$	$\frac{q^{2} \tan^{2} φ}{(1 + q^{2} \tan^{2} φ)} {1 - \frac{(1 + \tan^{2} φ) / \tan^{2} φ}{[q^{2} λ_{2} (1 + q^{2} \tan^{2} φ) / (q^{2} \tan^{2} φ) - (q^{2} - 1)]}}$
	$=$	$\frac{1}{Q^{2}} {1 - \frac{1 / \sin^{2} φ}{[q^{2} λ_{2} Q^{2} - (q^{2} - 1)]}} = \frac{1}{Q^{2} []} [[] - \frac{1}{\sin^{2} φ}],$
$\frac{x^{2}}{λ_{1}^{2}}$	$=$	$1 - \frac{q^{2} \tan^{2} φ}{(1 + q^{2} \tan^{2} φ)} {1 - \frac{(1 + \tan^{2} φ)}{[(1 + q^{2} \tan^{2} φ) λ_{2} - (q^{2} - 1) \tan^{2} φ]}}$
		$- \frac{(1 + \tan^{2} φ)}{[(1 + q^{2} \tan^{2} φ) λ_{2} - (q^{2} - 1) \tan^{2} φ]}$
	$=$	$1 - \frac{q^{2} \tan^{2} φ}{(1 + q^{2} \tan^{2} φ)} - {\frac{(1 + \tan^{2} φ)}{[(1 + q^{2} \tan^{2} φ) λ_{2} - (q^{2} - 1) \tan^{2} φ]}}$
	$=$	$1 - \frac{1}{Q^{2}} - {\frac{1 / \sin^{2} φ}{[q^{2} λ_{2} Q^{2} - (q^{2} - 1)]}} = \frac{1}{Q^{2} []} {Q^{2} [] - [] - \frac{Q^{2}}{\sin^{2} φ}},$
$\frac{x^{2} + q^{2} y^{2}}{λ_{1}^{2}}$	$=$	$1 - [1 + \frac{q^{2} \tan^{2} φ}{(1 + q^{2} \tan^{2} φ)}] {\frac{(1 + \tan^{2} φ)}{[(1 + q^{2} \tan^{2} φ) λ_{2} - (q^{2} - 1) \tan^{2} φ]}} .$

Now, notice that,

$\frac{q^{2} y^{2} Q^{2}}{λ_{1}^{2}}$

$=$

$1 - \frac{1}{[] \sin^{2} φ},$

and,

$\frac{x^{2}}{λ_{1}^{2}} + \frac{1}{Q^{2}}$

$=$

$1 - \frac{1}{[] \sin^{2} φ} .$

Hence,

$\frac{x^{2}}{λ_{1}^{2}} + \frac{1}{Q^{2}}$	$=$	$\frac{q^{2} y^{2} Q^{2}}{λ_{1}^{2}}$
$\Rightarrow 0$	$=$	$Q^{4} (\frac{q^{2} y^{2}}{λ_{1}^{2}}) - Q^{2} (\frac{x^{2}}{λ_{1}^{2}}) - 1$
	$=$	$Q^{4} - Q^{2} (\frac{x^{2}}{q^{2} y^{2}}) - (\frac{λ_{1}^{2}}{q^{2} y^{2}}),$

where,

$Q^{2}$

$\equiv$

$\frac{1 + q^{2} \tan^{2} φ}{q^{2} \tan^{2} φ} .$

Solving the quadratic equation, we have,

$Q^{2}$	$=$	$\frac{1}{2} {(\frac{x^{2}}{q^{2} y^{2}}) \pm [(\frac{x^{2}}{q^{2} y^{2}})^{2} + 4 (\frac{λ_{1}^{2}}{q^{2} y^{2}})]^{1 / 2}}$
	$=$	$(\frac{x^{2}}{2 q^{2} y^{2}}) {1 \pm [1 + 4 (\frac{λ_{1}^{2} q^{2} y^{2}}{x^{4}})]^{1 / 2}} .$

Tentative Summary

$λ_{1}$	$\equiv$	$(x^{2} + q^{2} y^{2} + p^{2} z^{2})^{1 / 2},$
$λ_{2}$	$\equiv$	$\frac{(x^{2} + y^{2})^{1 / 2}}{p z},$
$λ_{3} = Q^{2}$	$\equiv$	$(\frac{x^{2}}{2 q^{2} y^{2}}) {1 \pm [1 + 4 (\frac{λ_{1}^{2} q^{2} y^{2}}{x^{4}})]^{1 / 2}} .$

Partial Derivatives & Scale Factors

First Coordinate

$\frac{\partial λ_{1}}{\partial x}$	$=$	$\frac{x}{λ_{1}},$
$\frac{\partial λ_{1}}{\partial y}$	$=$	$\frac{q^{2} y}{λ_{1}},$
$\frac{\partial λ_{1}}{\partial z}$	$=$	$\frac{p^{2} z}{λ_{1}} .$

$h_{1}^{- 2}$	$=$	$(\frac{\partial λ_{1}}{\partial x})^{2} + (\frac{\partial λ_{1}}{\partial y})^{2} + (\frac{\partial λ_{1}}{\partial z})^{2}$	$=$	$(\frac{x}{λ_{1}})^{2} + (\frac{q^{2} y}{λ_{1}})^{2} + (\frac{p^{2} z}{λ_{1}})^{2} .$
$\Rightarrow h_{1}$	$=$	$λ_{1} ℓ_{3 D},$

where,

ℓ_{3 D} \equiv (x^{2} + q^{4} y^{2} + p^{4} z^{2})^{- 1 / 2} .

As a result, the associated unit vector is,

${\hat{e}}_{1}$	$=$	$\hat{ı} h_{1} (\frac{\partial λ_{1}}{\partial x}) + \hat{ȷ} h_{1} (\frac{\partial λ_{1}}{\partial y}) + \hat{k} h_{1} (\frac{\partial λ_{1}}{\partial z})$
	$=$	$\hat{ı} x ℓ_{3 D} + \hat{ȷ} q^{2} y ℓ_{3 D} + \hat{k} p^{2} z ℓ_{3 D} .$

Notice that,

${\hat{e}}_{1} \cdot {\hat{e}}_{1}$

$=$

$(x^{2} + q^{4} y^{2} + p^{4} z^{2}) ℓ_{3 D}^{2} = 1 .$

Second Coordinate (1^st Try)

$\frac{\partial λ_{2}}{\partial x}$	$=$	$\frac{1}{p z} [\frac{x}{(x^{2} + y^{2})^{1 / 2}}],$
$\frac{\partial λ_{2}}{\partial y}$	$=$	$\frac{1}{p z} [\frac{y}{(x^{2} + y^{2})^{1 / 2}}],$
$\frac{\partial λ_{2}}{\partial z}$	$=$	$- \frac{(x^{2} + y^{2})^{1 / 2}}{p z^{2}} .$

$h_{2}^{- 2}$	$=$	$(\frac{\partial λ_{2}}{\partial x})^{2} + (\frac{\partial λ_{2}}{\partial y})^{2} + (\frac{\partial λ_{2}}{\partial z})^{2}$
	$=$	${\frac{1}{p z} [\frac{x}{(x^{2} + y^{2})^{1 / 2}}]}^{2} + {\frac{1}{p z} [\frac{y}{(x^{2} + y^{2})^{1 / 2}}]}^{2} + {\frac{(x^{2} + y^{2})^{1 / 2}}{p z^{2}}}^{2}$
	$=$	${[\frac{x^{2}}{(x^{2} + y^{2}) p^{2} z^{2}}]} + {[\frac{y^{2}}{(x^{2} + y^{2}) p^{2} z^{2}}]} + {\frac{(x^{2} + y^{2})}{p^{2} z^{4}}}$
	$=$	$\frac{1}{p^{2} z^{2}} + \frac{(x^{2} + y^{2})}{p^{2} z^{4}} = \frac{(x^{2} + y^{2} + z^{2})}{p^{2} z^{4}}$
$\Rightarrow h_{2}$	$=$	$\frac{p z^{2}}{r}$

As a result, the associated unit vector is,

${\hat{e}}_{2}$	$=$	$\hat{ı} h_{2} (\frac{\partial λ_{2}}{\partial x}) + \hat{ȷ} h_{2} (\frac{\partial λ_{2}}{\partial y}) + \hat{k} h_{2} (\frac{\partial λ_{2}}{\partial z})$
	$=$	$\hat{ı} [\frac{x z}{r (x^{2} + y^{2})^{1 / 2}}] + \hat{ȷ} [\frac{y z}{r (x^{2} + y^{2})^{1 / 2}}] - \hat{k} [\frac{(x^{2} + y^{2})^{1 / 2}}{r}] .$

Notice that,

${\hat{e}}_{2} \cdot {\hat{e}}_{2}$

$=$

$[\frac{x^{2} z^{2}}{r^{2} (x^{2} + y^{2})}] + [\frac{y^{2} z^{2}}{r^{2} (x^{2} + y^{2})}] + [\frac{(x^{2} + y^{2})}{r^{2}}] = 1 .$

Let's check to see if this "second" unit vector is orthogonal to the "first."

${\hat{e}}_{1} \cdot {\hat{e}}_{2}$	$=$	$x ℓ_{3 D} [\frac{x z}{r (x^{2} + y^{2})^{1 / 2}}] + q^{2} y ℓ_{3 D} [\frac{y z}{r (x^{2} + y^{2})^{1 / 2}}] - p^{2} z ℓ_{3 D} [\frac{(x^{2} + y^{2})^{1 / 2}}{r}]$
	$=$	$ℓ_{3 D} {[\frac{x^{2} z}{r (x^{2} + y^{2})^{1 / 2}}] + [\frac{q^{2} y^{2} z}{r (x^{2} + y^{2})^{1 / 2}}] - [\frac{p^{2} z (x^{2} + y^{2})^{1 / 2}}{r}]}$
	$=$	$\frac{z ℓ_{3 D}}{r (x^{2} + y^{2})^{1 / 2}} {[x^{2}] + [q^{2} y^{2}] - [p^{2} (x^{2} + y^{2})]}$
	$\neq$	$0 .$

Second Coordinate (2^nd Try)

Let's try,

$λ_{2}$	$=$	$[\frac{(x^{2} + q^{2} y^{2} + 𝔣 \cdot p^{2} z^{2})^{1 / 2}}{p z}],$
$\Rightarrow \frac{\partial λ_{2}}{\partial x}$	$=$	$\frac{x}{p z (x^{2} + q^{2} y^{2} + 𝔣 \cdot p^{2} z^{2})^{1 / 2}} = \frac{x}{p^{2} z^{2} λ_{2}},$
$\frac{\partial λ_{2}}{\partial y}$	$=$	$\frac{q^{2} y}{p z (x^{2} + q^{2} y^{2} + 𝔣 \cdot p^{2} z^{2})^{1 / 2}} = \frac{q^{2} y}{p^{2} z^{2} λ_{2}},$
$\frac{\partial λ_{2}}{\partial z}$	$=$	$\frac{𝔣 \cdot p^{2} z}{p z (x^{2} + q^{2} y^{2} + 𝔣 \cdot p^{2} z^{2})^{1 / 2}} - \frac{(x^{2} + q^{2} y^{2} + 𝔣 \cdot p^{2} z^{2})^{1 / 2}}{p z^{2}} = \frac{1}{p^{2} z^{2} λ_{2}} (𝔣 \cdot p^{2} z) - \frac{λ_{2}}{z} = \frac{1}{p^{2} z^{2} λ_{2}} (𝔣 \cdot p^{2} z - p^{2} z λ_{2}^{2}) .$

Hence,

$h_{2}^{- 2}$	$=$	$(\frac{\partial λ_{2}}{\partial x})^{2} + (\frac{\partial λ_{2}}{\partial y})^{2} + (\frac{\partial λ_{2}}{\partial z})^{2}$
	$=$	$[\frac{x}{p^{2} z^{2} λ_{2}}]^{2} + [\frac{q^{2} y}{p^{2} z^{2} λ_{2}}]^{2} + [\frac{𝔣}{z λ_{2}} - \frac{λ_{2}}{z}]^{2}$
	$=$	$[\frac{x^{2} + q^{4} y^{2}}{p^{4} z^{4} λ_{2}^{2}}] + [\frac{1}{z λ_{2}} (𝔣 - λ_{2}^{2})]^{2}$
	$=$	$\frac{1}{p^{4} z^{4} λ_{2}^{2}} [x^{2} + q^{4} y^{2} + p^{4} z^{2} (𝔣 - λ_{2}^{2})^{2}]$
$\Rightarrow h_{2}$	$=$	$\frac{p^{2} z^{2} λ_{2}}{[x^{2} + q^{4} y^{2} + p^{4} z^{2} (𝔣 - λ_{2}^{2})^{2}]^{1 / 2}} .$

So, the associated unit vector is,

${\hat{e}}_{2}$	$=$	$\hat{ı} h_{2} (\frac{\partial λ_{2}}{\partial x}) + \hat{ȷ} h_{2} (\frac{\partial λ_{2}}{\partial y}) + \hat{k} h_{2} (\frac{\partial λ_{2}}{\partial z})$
	$=$	$\hat{ı} {\frac{x}{[x^{2} + q^{4} y^{2} + p^{4} z^{2} (𝔣 - λ_{2}^{2})^{2}]^{1 / 2}}} + \hat{ȷ} {\frac{q^{2} y}{[x^{2} + q^{4} y^{2} + p^{4} z^{2} (𝔣 - λ_{2}^{2})^{2}]^{1 / 2}}} + \hat{k} {\frac{p^{2} z (𝔣 - λ_{2}^{2})}{[x^{2} + q^{4} y^{2} + p^{4} z^{2} (𝔣 - λ_{2}^{2})^{2}]^{1 / 2}}} .$

Checking orthogonality …

${\hat{e}}_{1} \cdot {\hat{e}}_{2}$	$=$	$x ℓ_{3 D} {\frac{x}{[x^{2} + q^{4} y^{2} + p^{4} z^{2} (𝔣 - λ_{2}^{2})^{2}]^{1 / 2}}} + q^{2} y ℓ_{3 D} {\frac{q^{2} y}{[x^{2} + q^{4} y^{2} + p^{4} z^{2} (𝔣 - λ_{2}^{2})^{2}]^{1 / 2}}} + p^{2} z ℓ_{3 D} {\frac{p^{2} z (𝔣 - λ_{2}^{2})}{[x^{2} + q^{4} y^{2} + p^{4} z^{2} (𝔣 - λ_{2}^{2})^{2}]^{1 / 2}}}$
	$=$	$\frac{ℓ_{3 D}}{[x^{2} + q^{4} y^{2} + p^{4} z^{2} (𝔣 - λ_{2}^{2})^{2}]^{1 / 2}} {x^{2} + q^{4} y^{2} + p^{4} z^{2} (𝔣 - λ_{2}^{2})} .$
	$=$	$\frac{ℓ_{3 D}}{[x^{2} + q^{4} y^{2} + p^{4} z^{2} (𝔣 - λ_{2}^{2})^{2}]^{1 / 2}} {x^{2} + q^{4} y^{2} + p^{4} z^{2} (𝔣 - λ_{2}^{2})} .$

If $𝔣 = 0$ , we have …

$p^{2} z (𝔣 - λ_{2}^{2})$

$\to$

$[- p^{2} z λ_{2}^{2}]_{𝔣 = 0} = - p^{2} z [\frac{(x^{2} + q^{2} y^{2} + {𝔣 \cdot}^{0} p^{2} z^{2})^{1 / 2}}{p z}]^{2} = - \frac{(x^{2} + q^{2} y^{2})}{z},$

which, in turn, means …

$[x^{2} + q^{4} y^{2} + p^{4} z^{2} (𝔣^{0} - λ_{2}^{2})^{2}]^{1 / 2}$	$=$	$[x^{2} + q^{4} y^{2} + p^{4} z^{2} λ_{2}^{4}]^{1 / 2}$
	$=$	${x^{2} + q^{4} y^{2} + p^{4} z^{2} [\frac{(x^{2} + q^{2} y^{2} + {𝔣 \cdot}^{0} p^{2} z^{2})^{1 / 2}}{p z}]^{4}}^{1 / 2}$
	$=$	${x^{2} + q^{4} y^{2} + [\frac{(x^{2} + q^{2} y^{2})^{2}}{z^{2}}]}^{1 / 2}$
	$=$	$(x^{2} + q^{4} y^{2})^{1 / 2} [1 + \frac{(x^{2} + q^{2} y^{2})}{z^{2}}]^{1 / 2}$
	$=$	$\frac{(x^{2} + q^{4} y^{2})^{1 / 2}}{z} [z^{2} + (x^{2} + q^{2} y^{2})]^{1 / 2},$

and,

${\hat{e}}_{1} \cdot {\hat{e}}_{2}$

$=$

$\frac{ℓ_{3 D}}{[x^{2} + q^{4} y^{2} + p^{4} z^{2} (𝔣 - λ_{2}^{2})^{2}]^{1 / 2}} {x^{2} + q^{4} y^{2} + p^{4} z^{2} (𝔣 - λ_{2}^{2})} .$

Speculation6

Determine λ₂

This is very similar to the above, Speculation2. Try,

$λ_{2}$

$=$

$\frac{x y^{1 / q^{2}}}{z^{2 / p^{2}}},$

in which case,

$\frac{\partial λ_{2}}{\partial x}$	$=$	$\frac{λ_{2}}{x},$
$\frac{\partial λ_{2}}{\partial y}$	$=$	$\frac{x}{z^{2 / p^{2}}} (\frac{1}{q^{2}}) y^{1 / q^{2} - 1} = \frac{λ_{2}}{q^{2} y},$
$\frac{\partial λ_{2}}{\partial z}$	$=$	$- \frac{2 λ_{2}}{p^{2} z} .$

The associated scale factor is, then,

$h_{2}$	$=$	$[(\frac{\partial λ_{2}}{\partial x})^{2} + (\frac{\partial λ_{2}}{\partial y})^{2} + (\frac{\partial λ_{2}}{\partial z})^{2}]^{- 1 / 2}$
	$=$	$[(\frac{λ_{2}}{x})^{2} + (\frac{λ_{2}}{q^{2} y})^{2} + (- \frac{2 λ_{2}}{p^{2} z})^{2}]^{- 1 / 2}$
	$=$	$\frac{1}{λ_{2}} [\frac{1}{x^{2}} + \frac{1}{q^{4} y^{2}} + \frac{4}{p^{4} z^{2}}]^{- 1 / 2}$
	$=$	$\frac{1}{λ_{2}} [\frac{(q^{4} y^{2} p^{4} z^{2} + x^{2} p^{4} z^{2} + 4 x^{2} q^{4} y^{2}}{x^{2} q^{4} y^{2} p^{4} z^{2}}]^{- 1 / 2}$
	$=$	$\frac{1}{λ_{2}} [\frac{x q^{2} y p^{2} z}{𝒟}] .$

where,

$𝒟$

$\equiv$

$(q^{4} y^{2} p^{4} z^{2} + x^{2} p^{4} z^{2} + 4 x^{2} q^{4} y^{2})^{1 / 2} .$

The associated unit vector is, then,

${\hat{e}}_{2}$	$=$	$\hat{ı} h_{2} (\frac{\partial λ_{2}}{\partial x}) + \hat{ȷ} h_{2} (\frac{\partial λ_{2}}{\partial y}) + \hat{k} h_{2} (\frac{\partial λ_{2}}{\partial z})$
	$=$	$\frac{x q^{2} y p^{2} z}{𝒟} {\hat{ı} (\frac{1}{x}) + \hat{ȷ} (\frac{1}{q^{2} y}) + \hat{k} (- \frac{2}{p^{2} z})} .$

Recalling that the unit vector associated with the "first" coordinate is,

${\hat{e}}_{1}$

$\equiv$

$\hat{ı} (x ℓ_{3 D}) + \hat{ȷ} (q^{2} y ℓ_{3 D}) + \hat{k} (p^{2} z ℓ_{3 D}),$

where,

$ℓ_{3 D}$

$=$

$(x^{2} + q^{4} y^{2} + p^{4} z^{2})^{- 1 / 2},$

let's check to see whether the "second" unit vector is orthogonal to the "first."

${\hat{e}}_{1} \cdot {\hat{e}}_{2}$

$=$

$\frac{(x q^{2} y p^{2} z) ℓ_{3 D}}{𝒟} [1 + 1 - 2] = 0 .$

Hooray!

Direction Cosines for Third Unit Vector

Now, what is the unit vector, ${\hat{e}}_{3}$ , that is simultaneously orthogonal to both these "first" and the "second" unit vectors?

${\hat{e}}_{3} \equiv {\hat{e}}_{1} \times {\hat{e}}_{2}$	$=$	$\hat{ı} [(e_{1 y}) (e_{2 z}) - (e_{2 y}) (e_{1 z}))] + \hat{ȷ} [(e_{1 z}) (e_{2 x}) - (e_{2 z}) (e_{1 x}))] + \hat{k} [(e_{1 x}) (e_{2 y}) - (e_{2 x}) (e_{1 y}))]$
	$=$	$\frac{(x q^{2} y p^{2} z) ℓ_{3 D}}{𝒟} {\hat{ı} [(- \frac{2 q^{2} y}{p^{2} z}) - (\frac{p^{2} z}{q^{2} y})] + \hat{ȷ} [(\frac{p^{2} z}{x}) - (- \frac{2 x}{p^{2} z})] + \hat{k} [(\frac{x}{q^{2} y}) - (\frac{q^{2} y}{x})]}$
	$=$	$\frac{(x q^{2} y p^{2} z) ℓ_{3 D}}{𝒟} {- \hat{ı} [\frac{2 q^{4} y^{2} + p^{4} z^{2}}{q^{2} y p^{2} z}] + \hat{ȷ} [\frac{p^{4} z^{2} + 2 x^{2}}{x p^{2} z}] + \hat{k} [\frac{x^{2} - q^{4} y^{2}}{x q^{2} y}]}$
	$=$	$\frac{ℓ_{3 D}}{𝒟} {- \hat{ı} [x (2 q^{4} y^{2} + p^{4} z^{2})] + \hat{ȷ} [q^{2} y (p^{4} z^{2} + 2 x^{2})] + \hat{k} [p^{2} z (x^{2} - q^{4} y^{2})]} .$

Is this a valid unit vector? First, note that …

$(\frac{ℓ_{3 D}}{𝒟})^{- 2}$	$=$	$(q^{4} y^{2} p^{4} z^{2} + x^{2} p^{4} z^{2} + 4 x^{2} q^{4} y^{2}) (x^{2} + q^{4} y^{2} + p^{4} z^{2})$
	$=$	$(x^{2} q^{4} y^{2} p^{4} z^{2} + x^{4} p^{4} z^{2} + 4 x^{4} q^{4} y^{2}) + (q^{8} y^{4} p^{4} z^{2} + x^{2} q^{4} y^{2} p^{4} z^{2} + 4 x^{2} q^{8} y^{4}) + (q^{4} y^{2} p^{8} z^{4} + x^{2} p^{8} z^{4} + 4 x^{2} q^{4} y^{2} p^{4} z^{2})$
	$=$	$6 x^{2} q^{4} y^{2} p^{4} z^{2} + x^{4} (p^{4} z^{2} + 4 q^{4} y^{2}) + q^{8} y^{4} (p^{4} z^{2} + 4 x^{2}) + p^{8} z^{4} (x^{2} + q^{4} y^{2}) .$

Then we have,

$(\frac{ℓ_{3 D}}{𝒟})^{- 2} {\hat{e}}_{3} \cdot {\hat{e}}_{3}$	$=$	$[x (2 q^{4} y^{2} + p^{4} z^{2})]^{2} + [q^{2} y (p^{4} z^{2} + 2 x^{2})]^{2} + [p^{2} z (x^{2} - q^{4} y^{2})]^{2}$
	$=$	$x^{2} (4 q^{8} y^{4} + 4 q^{4} y^{2} p^{4} z^{2} + p^{8} z^{4}) + q^{4} y^{2} (p^{8} z^{4} + 4 x^{2} p^{4} z^{2} + 4 x^{4}) + p^{4} z^{2} (x^{4} - 2 x^{2} q^{4} y^{2} + q^{8} y^{4})$
	$=$	$4 x^{2} q^{8} y^{4} + 4 x^{2} q^{4} y^{2} p^{4} z^{2} + x^{2} p^{8} z^{4} + q^{4} y^{2} p^{8} z^{4} + 4 x^{2} q^{4} y^{2} p^{4} z^{2} + 4 x^{4} q^{4} y^{2} + x^{4} p^{4} z^{2} - 2 x^{2} q^{4} y^{2} p^{4} z^{2} + q^{8} y^{4} p^{4} z^{2}$
	$=$	$6 x^{2} q^{4} y^{2} p^{4} z^{2} + p^{8} z^{4} (x^{2} + q^{4} y^{2}) + x^{4} (4 q^{4} y^{2} + p^{4} z^{2}) + q^{8} y^{4} (4 x^{2} + p^{4} z^{2})$
	$=$	$(\frac{ℓ_{3 D}}{𝒟})^{- 2},$

which means that, ${\hat{e}}_{3} \cdot {\hat{e}}_{3} = 1$ . Hooray! Again (11/11/2020)!

Direction Cosine Components for T6 Coordinates

n

λ_{n}

h_{n}

\frac{\partial λ_{n}}{\partial x}

\frac{\partial λ_{n}}{\partial y}

\frac{\partial λ_{n}}{\partial z}

γ_{n 1}

γ_{n 2}

γ_{n 3}

1

(x^{2} + q^{2} y^{2} + p^{2} z^{2})^{1 / 2}

λ_{1} ℓ_{3 D}

\frac{x}{λ_{1}}

\frac{q^{2} y}{λ_{1}}

\frac{p^{2} z}{λ_{1}}

(x) ℓ_{3 D}

(q^{2} y) ℓ_{3 D}

(p^{2} z) ℓ_{3 D}

2

\frac{x y^{1 / q^{2}}}{z^{2 / p^{2}}}

\frac{1}{λ_{2}} [\frac{x q^{2} y p^{2} z}{𝒟}]

\frac{λ_{2}}{x}

\frac{λ_{2}}{q^{2} y}

- \frac{2 λ_{2}}{p^{2} z}

\frac{x q^{2} y p^{2} z}{𝒟} (\frac{1}{x})

\frac{x q^{2} y p^{2} z}{𝒟} (\frac{1}{q^{2} y})

\frac{x q^{2} y p^{2} z}{𝒟} (- \frac{2}{p^{2} z})

3

---

- \frac{ℓ_{3 D}}{𝒟} [x (2 q^{4} y^{2} + p^{4} z^{2})]

\frac{ℓ_{3 D}}{𝒟} [q^{2} y (p^{4} z^{2} + 2 x^{2})]

\frac{ℓ_{3 D}}{𝒟} [p^{2} z (x^{2} - q^{4} y^{2})]

$ℓ_{3 D}$	$\equiv$	$(x^{2} + q^{4} y^{2} + p^{4} z^{2})^{- 1 / 2},$
$𝒟$	$\equiv$	$(q^{4} y^{2} p^{4} z^{2} + x^{2} p^{4} z^{2} + 4 x^{2} q^{4} y^{2})^{1 / 2} .$

Let's double-check whether this "third" unit vector is orthogonal to both the "first" and the "second" unit vectors.

${\hat{e}}_{1} \cdot {\hat{e}}_{3}$	$=$	$\frac{ℓ_{3 D}^{2}}{𝒟} {- x [x (2 q^{4} y^{2} + p^{4} z^{2})] + q^{2} y [q^{2} y (p^{4} z^{2} + 2 x^{2})] + p^{2} z [p^{2} z (x^{2} - q^{4} y^{2})]}$
	$=$	$\frac{ℓ_{3 D}^{2}}{𝒟} {- (2 x^{2} q^{4} y^{2} + x^{2} p^{4} z^{2}) + (q^{4} y^{2} p^{4} z^{2} + 2 x^{2} q^{4} y^{2}) + (x^{2} p^{4} z^{2} - q^{4} y^{2} p^{4} z^{2})}$
	$=$	$0,$

and,

${\hat{e}}_{2} \cdot {\hat{e}}_{3}$	$=$	$\frac{ℓ_{3 D}}{𝒟} \cdot \frac{x q^{2} y p^{2} z}{𝒟} {- [(2 q^{4} y^{2} + p^{4} z^{2})] + [(p^{4} z^{2} + 2 x^{2})] - [2 (x^{2} - q^{4} y^{2})]}$
	$=$	$0 .$

Q. E. D.

Search for Third Coordinate Expression

Let's try …

$λ_{3}$	$=$	$𝒟^{n} ℓ_{3 D}^{m}$
	$=$	$(q^{4} y^{2} p^{4} z^{2} + x^{2} p^{4} z^{2} + 4 x^{2} q^{4} y^{2})^{n / 2} (x^{2} + q^{4} y^{2} + p^{4} z^{2})^{- m / 2}$
$\Rightarrow \frac{\partial λ_{3}}{\partial x_{i}}$	$=$	$ℓ_{3 D}^{m} [\frac{n}{2} (q^{4} y^{2} p^{4} z^{2} + x^{2} p^{4} z^{2} + 4 x^{2} q^{4} y^{2})^{n / 2 - 1}] \frac{\partial}{\partial x_{i}} [(q^{4} y^{2} p^{4} z^{2} + x^{2} p^{4} z^{2} + 4 x^{2} q^{4} y^{2})]$
		$+ 𝒟^{n} [- \frac{m}{2} (x^{2} + q^{4} y^{2} + p^{4} z^{2})^{- m / 2 - 1}] \frac{\partial}{\partial x_{i}} [(x^{2} + q^{4} y^{2} + p^{4} z^{2})]$
	$=$	$𝒟^{n} ℓ_{3 D}^{m} [\frac{n}{2} (q^{4} y^{2} p^{4} z^{2} + x^{2} p^{4} z^{2} + 4 x^{2} q^{4} y^{2})^{- 1}] \frac{\partial}{\partial x_{i}} [(q^{4} y^{2} p^{4} z^{2} + x^{2} p^{4} z^{2} + 4 x^{2} q^{4} y^{2})]$
		$+ 𝒟^{n} ℓ_{3 D}^{m} [- \frac{m}{2} (x^{2} + q^{4} y^{2} + p^{4} z^{2})^{- 1}] \frac{\partial}{\partial x_{i}} [(x^{2} + q^{4} y^{2} + p^{4} z^{2})] .$

Hence,

$\frac{1}{𝒟^{n} ℓ_{3 D}^{m}} \cdot \frac{\partial λ_{3}}{\partial x}$	$=$	$\frac{n}{2 𝒟^{2}} \frac{\partial}{\partial x} [q^{4} y^{2} p^{4} z^{2} + x^{2} p^{4} z^{2} + 4 x^{2} q^{4} y^{2}] - \frac{m ℓ_{3 D}^{2}}{2} \frac{\partial}{\partial x} [x^{2} + q^{4} y^{2} + p^{4} z^{2}]$
	$=$	$x {\frac{n}{𝒟^{2}} [p^{4} z^{2} + 4 q^{4} y^{2}] - m ℓ_{3 D}^{2}}$
	$=$	$x {\frac{n (p^{4} z^{2} + 4 q^{4} y^{2})}{(q^{4} y^{2} p^{4} z^{2} + x^{2} p^{4} z^{2} + 4 x^{2} q^{4} y^{2})} - \frac{m}{(x^{2} + q^{4} y^{2} + p^{4} z^{2})}}$

This is overly cluttered! Let's try, instead …

$A \equiv ℓ_{3 D}^{- 2}$

$=$

$(x^{2} + q^{4} y^{2} + p^{4} z^{2}),$

and,

$B \equiv 𝒟^{2}$

$=$

$(q^{4} y^{2} p^{4} z^{2} + x^{2} p^{4} z^{2} + 4 x^{2} q^{4} y^{2})$

$\Rightarrow \frac{\partial A}{\partial x}$	$=$	$2 x,$
$\frac{\partial A}{\partial y}$	$=$	$2 q^{4} y,$
$\frac{\partial A}{\partial z}$	$=$	$2 p^{4} z;$
$\frac{\partial B}{\partial x}$	$=$	$2 x (4 q^{4} y^{2} + p^{4} z^{2}),$
$\frac{\partial B}{\partial y}$	$=$	$2 q^{4} y (p^{4} z^{2} + 4 x^{2}),$
$\frac{\partial B}{\partial z}$	$=$	$2 p^{4} z (q^{4} y^{2} + x^{2}) .$

Now, let's assume that,

@@ Line 2,232: / Line 2,232: @@
 </tr>
 </table>
+Hence,
+<table border="0" cellpadding="5" align="center">
+<tr>
+  <td align="right">
+<math>~\frac{1}{\mathcal{D}^n \ell_{3D}^m} \cdot \frac{\partial \lambda_3}{\partial x}</math>
+  </td>
+  <td align="center">
+<math>~=</math>
+  </td>
+  <td align="left">
+<math>~
+\frac{n}{2\mathcal{D}^2}\frac{\partial}{\partial x} \biggl[q^4 y^2 p^4 z^2 + x^2 p^4 z^2 + 4x^2q^4y^2 \biggr]
+-
+\frac{m \ell_{3D}^2}{2} \frac{\partial}{\partial x} \biggl[ x^2 + q^4y^2 + p^4 z^2 \biggr]
+</math>
+  </td>
+</tr>
+<tr>
+  <td align="right">
+&nbsp;
+  </td>
+  <td align="center">
+<math>~=</math>
+  </td>
+  <td align="left">
+<math>~x \biggl\{
+\frac{n}{\mathcal{D}^2}\biggl[p^4 z^2 + 4q^4y^2 \biggr]
+-
+m \ell_{3D}^2
+\biggr\}
+</math>
+  </td>
+</tr>
+<tr>
+  <td align="right">
+&nbsp;
+  </td>
+  <td align="center">
+<math>~=</math>
+  </td>
+  <td align="left">
+<math>~x \biggl\{
+\frac{n (p^4 z^2 + 4q^4y^2)}{ ( q^4 y^2 p^4 z^2 + x^2 p^4 z^2 + 4x^2q^4y^2 ) }
+-
+\frac{m}{ ( x^2 + q^4y^2 + p^4 z^2 ) }
+\biggr\}
+</math>
+  </td>
+</tr>
+</table>
+This is overly cluttered!  Let's try, instead &hellip;
+<table border="1" cellpadding="8" align="center" width="80%"><tr><td align="left">
+<table border="0" cellpadding="5" align="center">
+<tr>
+  <td align="right">
+<math>~A \equiv \ell_{3D}^{-2}</math>
+  </td>
+  <td align="center">
+<math>~=</math>
+  </td>
+  <td align="left">
+<math>~(x^2 + q^4y^2 + p^4 z^2 ) \, ,</math>
+  </td>
+<td align="center">&nbsp; &nbsp; &nbsp; and, &nbsp; &nbsp; &nbsp; </td>
+  <td align="right">
+<math>~B \equiv \mathcal{D}^2</math>
+  </td>
+  <td align="center">
+<math>~=</math>
+  </td>
+  <td align="left">
+<math>~(q^4 y^2 p^4 z^2 + x^2 p^4 z^2 + 4x^2q^4y^2)</math>
+  </td>
+</tr>
+</table>
+<table border="0" cellpadding="5" align="center">
+<tr>
+  <td align="right">
+<math>~\Rightarrow ~~~ \frac{\partial A}{\partial x}</math>
+  </td>
+  <td align="center">
+<math>~=</math>
+  </td>
+  <td align="left">
+<math>~2x \, ,</math>
+  </td>
+</tr>
+<tr>
+  <td align="right">
+<math>~\frac{\partial A}{\partial y}</math>
+  </td>
+  <td align="center">
+<math>~=</math>
+  </td>
+  <td align="left">
+<math>~2q^4 y \, ,</math>
+  </td>
+</tr>
+<tr>
+  <td align="right">
+<math>~\frac{\partial A}{\partial z}</math>
+  </td>
+  <td align="center">
+<math>~=</math>
+  </td>
+  <td align="left">
+<math>~ 2p^4 z\, ;</math>
+  </td>
+</tr>
+<tr>
+  <td align="right">
+<math>~ \frac{\partial B}{\partial x}</math>
+  </td>
+  <td align="center">
+<math>~=</math>
+  </td>
+  <td align="left">
+<math>~2x( 4q^4y^2 + p^4 z^2 ) \, ,</math>
+  </td>
+</tr>
+<tr>
+  <td align="right">
+<math>~\frac{\partial B}{\partial y}</math>
+  </td>
+  <td align="center">
+<math>~=</math>
+  </td>
+  <td align="left">
+<math>~2q^4 y (p^4 z^2 + 4x^2) \, ,</math>
+  </td>
+</tr>
+<tr>
+  <td align="right">
+<math>~\frac{\partial B}{\partial z}</math>
+  </td>
+  <td align="center">
+<math>~=</math>
+  </td>
+  <td align="left">
+<math>~ 2p^4 z(q^4 y^2 + x^2)\, .</math>
+  </td>
+</tr>
+</table>
+</td></tr></table>
+Now, let's assume that,
 {{ SGFfooter }}

Appendix/Ramblings/T6CoordinatesPt2: Difference between revisions

Revision as of 17:46, 23 July 2021

Contents

Concentric Ellipsoidal (T6) Coordinates (Part 2)

Orthogonal Coordinates

Speculation5

Spherical Coordinates

Use λ₁ Instead of r

Relationship To T3 Coordinates

Again Consider Full 3D Ellipsoid

Partial Derivatives & Scale Factors

First Coordinate

Second Coordinate (1^st Try)

Second Coordinate (2^nd Try)

Speculation6

Determine λ₂

Direction Cosines for Third Unit Vector

Search for Third Coordinate Expression

Navigation menu

Appendix/Ramblings/T6CoordinatesPt2: Difference between revisions

Revision as of 17:46, 23 July 2021

Concentric Ellipsoidal (T6) Coordinates (Part 2)

Orthogonal Coordinates

Speculation5

Spherical Coordinates

Use λ1 Instead of r

Relationship To T3 Coordinates

Again Consider Full 3D Ellipsoid

Partial Derivatives & Scale Factors

First Coordinate

Second Coordinate (1st Try)

Second Coordinate (2nd Try)

Speculation6

Determine λ2

Direction Cosines for Third Unit Vector

Search for Third Coordinate Expression

Navigation menu

Search

Use λ₁ Instead of r

Second Coordinate (1^st Try)

Second Coordinate (2^nd Try)

Determine λ₂