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==Definition==
==Definition==


The most common definition of toroidal coordinates <math>(\sigma, \tau, \phi)</math> is
The most common definition of toroidal coordinates <math>(\tau, \sigma, \phi)</math> is


:<math>
:<math>
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</math>
</math>
together with <math>\mathrm{sign}(\sigma)=\mathrm{sign}(z</math>).
together with <math>\mathrm{sign}(\sigma)=\mathrm{sign}(z</math>).
where the <math>\sigma</math> coordinate of a point <math>P</math> equals the angle <math>F_{1} P F_{2}</math> and the <math>\tau</math> coordinate equals the [[natural logarithm]] of the ratio of the distances <math>d_{1}</math> and <math>d_{2}</math> to opposite sides of the focal ring
The <math>\sigma</math> coordinate of a point <math>P</math> equals the angle <math>F_{1} P F_{2}</math> and the <math>\tau</math> coordinate equals the [[natural logarithm]] of the ratio of the distances <math>d_{1}</math> and <math>d_{2}</math> to opposite sides of the focal ring


:<math>
:<math>
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</math>
</math>


The coordinate ranges are <math>-\pi<\sigma\le\pi</math> and <math>\tau\ge 0</math> and <math>0\le\phi < 2\pi.</math>
The coordinate ranges are <math>-\pi<\sigma\le\pi</math>, <math>\tau\ge 0</math> and <math>0\le\phi < 2\pi.</math>


===Coordinate surfaces===
===Coordinate surfaces===
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===Inverse transformation===
===Inverse transformation===


The (σ, τ, φ) coordinates may be calculated from the Cartesian coordinates (''x'', ''y'', ''z'') as follows. The azimuthal angle φ is given by the formula
The <math>(\sigma, \tau, \phi)</math> coordinates may be calculated from the Cartesian coordinates (''x'', ''y'', ''z'') as follows. The azimuthal angle <math>\phi</math> is given by the formula


:<math>
:<math>
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</math>
</math>


The cylindrical radius ρ of the point P is given by
The cylindrical radius <math>\rho</math> of the point P is given by


:<math>
:<math>
\rho^{2} = x^{2} + y^{2}
\rho^{2} = x^{2} + y^{2} = \left(a \frac{\sinh \tau}{\cosh \tau - \cos \sigma}\right)^{2}
</math>
</math>


and its distances to the foci in the plane defined by φ is given by
and its distances to the foci in the plane defined by <math>\phi</math> is given by


:<math>
:<math>
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</math>
</math>


[[Image:Bipolar coordinates.png|thumb|right|350px|Geometric interpretation of the coordinates σ and τ of a point '''P'''. Observed in the plane of constant azimuthal angle φ, toroidal coordinates are equivalent to [[bipolar coordinates]]. The angle σ is formed by the two foci in this plane and '''P''', whereas τ is the logarithm of the ratio of distances to the foci. The corresponding circles of constant σ and τ are shown in red and blue, respectively, and meet at right angles (magenta box); they are orthogonal.]]
[[Image:Bipolar_coordinates.svg|thumb|right|350px|Geometric interpretation of the coordinates σ and τ of a point '''P'''. Observed in the plane of constant azimuthal angle <math>\phi</math>, toroidal coordinates are equivalent to [[bipolar coordinates]]. The angle <math>\sigma</math> is formed by the two foci in this plane and '''P''', whereas <math>\tau</math> is the logarithm of the ratio of distances to the foci. The corresponding circles of constant <math>\sigma</math> and <math>\tau</math> are shown in red and blue, respectively, and meet at right angles (magenta box); they are orthogonal.]]


The coordinate τ equals the [[natural logarithm]] of the focal distances
The coordinate <math>\tau</math> equals the [[natural logarithm]] of the focal distances


:<math>
:<math>
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</math>
</math>


whereas the coordinate σ equals the angle between the rays to the foci, which may be determined from the [[law of cosines]]
whereas <math>|\sigma|</math> equals the angle between the rays to the foci, which may be determined from the [[law of cosines]]


:<math>
:<math>
\cos \sigma = \frac{ d_{1}^{2} + d_{2}^{2} - 4 a^{2} }{2 d_{1} d_{2}}
\cos \sigma = \frac{ d_{1}^{2} + d_{2}^{2} - 4 a^{2} }{2 d_{1} d_{2}}.
</math>
</math>
Or explicitly, including the sign,
where the sign of σ matches the sign of <math>z</math>. Equivalently,
:<math>
:<math>
\sigma = \mathrm{sign}(z)\arccos \frac{r^2-a^2}{\sqrt{((r^2+a^2)^2-4\rho^2a^2}}
\sigma = \mathrm{sign}(z)\arccos \frac{r^2-a^2}{\sqrt{(r^2-a^2)^2+4a^2z^2}}
</math>
</math>
where <math> r=\sqrt{x^2+y^2+z^2} </math>.
where <math> r=\sqrt{\rho^2+z^2} </math>.


The transformations between cylindrical and toroidal coordinates can be expressed in complex notation as
The transformations between cylindrical and toroidal coordinates can be expressed in complex notation as
:<math>
:<math>
z+i\rho \ = ia\coth\frac{\tau+i\sigma}{2}
z+i\rho \ = ia\coth\frac{\tau+i\sigma}{2} ,
</math>
</math>
:<math>
:<math>
\tau+i\sigma \ = \ln\frac{ z+i(\rho+a) }{z-i(\rho-a)}
\tau+i\sigma \ = \ln\frac{ z+i(\rho+a) }{z+i(\rho-a)}.
</math>
</math>


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</math>
</math>


===Differential Operators===
and the Laplacian is given by
The Laplacian is given by

:<math>
<math display="block">
\begin{align}
\begin{align}
\nabla^2 \Phi =
\nabla^2 \Phi =
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\frac{\partial^2 \Phi}{\partial \phi^2}
\frac{\partial^2 \Phi}{\partial \phi^2}
\right]
\right]
\end{align}
\end{align}</math>

</math>
For a vector field <math display="block">\vec{n}(\tau,\sigma,\phi) = n_{\tau}(\tau,\sigma,\phi)\hat{e}_{\tau} + n_{\sigma}(\tau,\sigma,\phi) \hat{e}_{\sigma} + n_{\phi} (\tau,\sigma,\phi) \hat{e}_{\phi},</math> the Vector Laplacian is given by
<math display="block">\begin{align}
\Delta \vec{n}(\tau,\sigma,\phi) &= \nabla (\nabla \cdot \vec{n}) - \nabla \times (\nabla \times \vec{n}) \\
&= \frac{1}{a^2}\vec{e}_{\tau} \left \{
n_{\tau} \left( -\frac{\sinh^4 \tau + (\cosh \tau - \cos \sigma)^2}{\sinh^2 \tau} \right)
+ n_{\sigma} (- \sinh \tau \sin \sigma )
+ \frac{\partial n_{\tau}}{\partial \tau} \left( \frac{(\cosh \tau - \cos \sigma)(1 - \cosh \tau \cos \sigma)}{\sinh \tau} \right) + \cdots \right. \\
&\qquad + \frac{\partial n_{\tau}}{\partial \sigma} ( -(\cosh \tau - \cos \sigma) \sin \sigma )
+ \frac{\partial n_{\sigma}}{\partial \sigma} ( 2(\cosh \tau - \cos \sigma) \sinh \tau )
+ \frac{\partial n_{\sigma}}{\partial \tau} ( -2(\cosh \tau - \cos \sigma) \sin \sigma ) + \cdots \\
&\qquad + \frac{\partial n_{\phi}}{\partial \phi} \left( \frac{-2(\cosh \tau - \cos \sigma)(1 - \cosh \tau \cos \sigma)}{\sinh^2 \tau} \right)
+ \frac{\partial^2 n_{\tau}}{{\partial \tau}^2} (\cosh \tau - \cos \sigma)^2
+ \frac{\partial^2 n_{\tau}}{{\partial \sigma}^2} (- (\cosh \tau - \cos \sigma)^2 ) + \cdots \\
& \qquad \left. + \frac{\partial^2 n_{\tau}}{{\partial \phi}^2} \frac{(\cosh \tau - \cos \sigma)^2}{\sinh^2 \tau}
\right \}\\
&+ \frac{1}{a^2}\vec{e}_{\sigma} \left \{
n_{\tau} \left( -\frac{(\cosh^2 \tau + 1 -2\cosh \tau \cos \sigma)\sin \sigma}{\sinh \tau} \right)
+ n_{\sigma} \left( - \sinh^2 \tau - 2\sin^2 \sigma \right) + \ldots \right.\\
&\qquad \left. + \frac{\partial n_{\tau}}{\partial \tau} (2 \sin \sigma (\cosh \tau - \cos \sigma) )
+ \frac{\partial n_{\tau}}{\partial \sigma} \left( -2 \sinh \tau (\cosh \tau - \cos \sigma) \right) + \cdots \right.\\
&\qquad \left. + \frac{\partial n_{\sigma}}{\partial \tau} \left( \frac{(\cosh \tau - \cos \sigma) (1 - \cosh \tau \cos \sigma) }{\sinh \tau} \right)
+ \frac{\partial n_{\sigma}}{\partial \sigma} ( -(\cosh \tau - \cos \sigma)\sin \sigma) + \cdots \right.\\
&\qquad \left. + \frac{\partial n_{\phi}}{\partial \phi} \left( 2\frac{(\cosh \tau - \cos \sigma)\sin \sigma}{\sinh \tau} \right)
+ \frac{\partial^2 n_{\sigma}}{{\partial \tau}^2} (\cosh \tau - \cos \sigma)^2
+ \frac{\partial^2 n_{\sigma}}{{\partial \sigma}^2} (\cosh \tau - \cos \sigma)^2 + \cdots \right.\\
&\qquad \left. + \frac{\partial^2 n_{\sigma}}{{\partial \phi}^2} \left( \frac{(\cosh \tau - \cos \sigma)^2}{\sinh^2 \tau} \right)
\right \}\\
&+ \frac{1}{a^2}\vec{e}_{\phi} \left \{
n_{\phi} \left( -\frac{(\cosh \tau - \cos \sigma)^2}{\sinh^2 \tau} \right)
+ \frac{\partial n_{\tau}}{\partial \phi} \left( \frac{2(\cosh \tau - \cos \sigma)(1 - \cosh \tau \cos \sigma)}{\sinh^2 \tau} \right) + \cdots \right.\\
&\qquad \left. + \frac{\partial n_{\sigma}}{\partial \phi} \left( -\frac{2(\cosh \tau - \cos \sigma) \sin \sigma}{\sinh \tau} \right)
+ \frac{\partial n_{\phi}}{\partial \tau} \left( \frac{(\cosh \tau - \cos \sigma)(1 - \cosh \tau \cos \sigma)}{\sinh \tau} \right) + \cdots \right.\\
&\qquad \left. + \frac{\partial n_{\phi}}{\partial \sigma} (-(\cosh \tau - \cos \sigma) \sin \sigma ) + \frac{\partial^2 n_{\phi}}{{\partial \tau}^2} (\cosh \tau - \cos \sigma)^2 + \cdots \right. \\
&\qquad \left. + \frac{\partial^2 n_{\phi}}{{\partial \sigma}^2} (\cosh \tau - \cos \sigma)^2
+ \frac{\partial^2 n_{\phi}}{{\partial \phi}^2} \left( \frac{(\cosh \tau - \cos \sigma)^2}{\sinh^2 \tau} \right)
\right \}
\end{align}</math>


Other differential operators such as <math>\nabla \cdot \mathbf{F}</math>
Other differential operators such as <math>\nabla \cdot \mathbf{F}</math>
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==Bibliography==
==Bibliography==
*{{cite book | author = Morse P M, Feshbach H | year = 1953 | title = Methods of Theoretical Physics, Part I | publisher = McGraw–Hill | location = New York | page = 666}}
*{{cite book | author = Morse P M, Feshbach H | year = 1953 | title = Methods of Theoretical Physics, Part I | publisher = McGraw–Hill | location = New York | page = 666}}
*{{cite book | author = Korn G A, Korn T M |year = 1961 | title = Mathematical Handbook for Scientists and Engineers | publisher = McGraw-Hill | location = New York | page = 182 | lccn = 59014456}}
*{{cite book | author = Korn G A, [[Theresa M. Korn|Korn T M]] |year = 1961 | title = Mathematical Handbook for Scientists and Engineers | publisher = McGraw-Hill | location = New York | page = 182 | lccn = 59014456}}
*{{cite book | author = Margenau H, Murphy G M | year = 1956 | title = The Mathematics of Physics and Chemistry | publisher = D. van Nostrand | location = New York| pages = 190&ndash;192 | lccn = 55010911 }}
*{{cite book | author = Margenau H, Murphy G M | year = 1956 | title = The Mathematics of Physics and Chemistry | url = https://archive.org/details/mathematicsphysi00marg_501 | url-access = limited | publisher = D. van Nostrand | location = New York| pages = [https://archive.org/details/mathematicsphysi00marg_501/page/n203 190]&ndash;192 | lccn = 55010911 }}
*{{cite book | author = Moon P H, Spencer D E | year = 1988 | chapter = Toroidal Coordinates (''η'', ''θ'', ''ψ'') | title = Field Theory Handbook, Including Coordinate Systems, Differential Equations, and Their Solutions | edition = 2nd ed., 3rd revised printing | publisher = Springer Verlag | location = New York | isbn = 978-0-387-02732-6 | pages = 112&ndash;115 (Section IV, E4Ry)}}
*{{cite book | author = Moon P H, Spencer D E | year = 1988 | chapter = Toroidal Coordinates (''η'', ''θ'', ''ψ'') | title = Field Theory Handbook, Including Coordinate Systems, Differential Equations, and Their Solutions | edition = 2nd ed., 3rd revised printing | publisher = Springer Verlag | location = New York | isbn = 978-0-387-02732-6 | pages = 112&ndash;115 (Section IV, E4Ry)}}


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{{Orthogonal coordinate systems}}
{{Orthogonal coordinate systems}}


[[Category:Coordinate systems]]
[[Category:Three-dimensional coordinate systems]]
[[Category:Orthogonal coordinate systems]]

Latest revision as of 01:48, 10 December 2023

Illustration of toroidal coordinates, which are obtained by rotating a two-dimensional bipolar coordinate system about the axis separating its two foci. The foci are located at a distance 1 from the vertical z-axis. The portion of the red sphere that lies above the $xy$-plane is the σ = 30° isosurface, the blue torus is the τ = 0.5 isosurface, and the yellow half-plane is the φ = 60° isosurface. The green half-plane marks the x-z plane, from which φ is measured. The black point is located at the intersection of the red, blue and yellow isosurfaces, at Cartesian coordinates roughly (0.996, −1.725, 1.911).

Toroidal coordinates are a three-dimensional orthogonal coordinate system that results from rotating the two-dimensional bipolar coordinate system about the axis that separates its two foci. Thus, the two foci and in bipolar coordinates become a ring of radius in the plane of the toroidal coordinate system; the -axis is the axis of rotation. The focal ring is also known as the reference circle.

Definition

[edit]

The most common definition of toroidal coordinates is

together with ). The coordinate of a point equals the angle and the coordinate equals the natural logarithm of the ratio of the distances and to opposite sides of the focal ring

The coordinate ranges are , and

Coordinate surfaces

[edit]
Rotating this two-dimensional bipolar coordinate system about the vertical axis produces the three-dimensional toroidal coordinate system above. A circle on the vertical axis becomes the red sphere, whereas a circle on the horizontal axis becomes the blue torus.

Surfaces of constant correspond to spheres of different radii

that all pass through the focal ring but are not concentric. The surfaces of constant are non-intersecting tori of different radii

that surround the focal ring. The centers of the constant- spheres lie along the -axis, whereas the constant- tori are centered in the plane.

Inverse transformation

[edit]

The coordinates may be calculated from the Cartesian coordinates (x, y, z) as follows. The azimuthal angle is given by the formula

The cylindrical radius of the point P is given by

and its distances to the foci in the plane defined by is given by

Geometric interpretation of the coordinates σ and τ of a point P. Observed in the plane of constant azimuthal angle , toroidal coordinates are equivalent to bipolar coordinates. The angle is formed by the two foci in this plane and P, whereas is the logarithm of the ratio of distances to the foci. The corresponding circles of constant and are shown in red and blue, respectively, and meet at right angles (magenta box); they are orthogonal.

The coordinate equals the natural logarithm of the focal distances

whereas equals the angle between the rays to the foci, which may be determined from the law of cosines

Or explicitly, including the sign,

where .

The transformations between cylindrical and toroidal coordinates can be expressed in complex notation as

Scale factors

[edit]

The scale factors for the toroidal coordinates and are equal

whereas the azimuthal scale factor equals

Thus, the infinitesimal volume element equals

Differential Operators

[edit]

The Laplacian is given by

For a vector field the Vector Laplacian is given by

Other differential operators such as and can be expressed in the coordinates by substituting the scale factors into the general formulae found in orthogonal coordinates.

Toroidal harmonics

[edit]

Standard separation

[edit]

The 3-variable Laplace equation

admits solution via separation of variables in toroidal coordinates. Making the substitution

A separable equation is then obtained. A particular solution obtained by separation of variables is:

where each function is a linear combination of:

Where P and Q are associated Legendre functions of the first and second kind. These Legendre functions are often referred to as toroidal harmonics.

Toroidal harmonics have many interesting properties. If you make a variable substitution then, for instance, with vanishing order (the convention is to not write the order when it vanishes) and

and

where and are the complete elliptic integrals of the first and second kind respectively. The rest of the toroidal harmonics can be obtained, for instance, in terms of the complete elliptic integrals, by using recurrence relations for associated Legendre functions.

The classic applications of toroidal coordinates are in solving partial differential equations, e.g., Laplace's equation for which toroidal coordinates allow a separation of variables or the Helmholtz equation, for which toroidal coordinates do not allow a separation of variables. Typical examples would be the electric potential and electric field of a conducting torus, or in the degenerate case, an electric current-ring (Hulme 1982).

An alternative separation

[edit]

Alternatively, a different substitution may be made (Andrews 2006)

where

Again, a separable equation is obtained. A particular solution obtained by separation of variables is then:

where each function is a linear combination of:

Note that although the toroidal harmonics are used again for the T  function, the argument is rather than and the and indices are exchanged. This method is useful for situations in which the boundary conditions are independent of the spherical angle , such as the charged ring, an infinite half plane, or two parallel planes. For identities relating the toroidal harmonics with argument hyperbolic cosine with those of argument hyperbolic cotangent, see the Whipple formulae.

References

[edit]
  • Byerly, W E. (1893) An elementary treatise on Fourier's series and spherical, cylindrical, and ellipsoidal harmonics, with applications to problems in mathematical physics Ginn & co. pp. 264–266
  • Arfken G (1970). Mathematical Methods for Physicists (2nd ed.). Orlando, FL: Academic Press. pp. 112–115.
  • Andrews, Mark (2006). "Alternative separation of Laplace's equation in toroidal coordinates and its application to electrostatics". Journal of Electrostatics. 64 (10): 664–672. CiteSeerX 10.1.1.205.5658. doi:10.1016/j.elstat.2005.11.005.
  • Hulme, A. (1982). "A note on the magnetic scalar potential of an electric current-ring". Mathematical Proceedings of the Cambridge Philosophical Society. 92 (1): 183–191. doi:10.1017/S0305004100059831.

Bibliography

[edit]
  • Morse P M, Feshbach H (1953). Methods of Theoretical Physics, Part I. New York: McGraw–Hill. p. 666.
  • Korn G A, Korn T M (1961). Mathematical Handbook for Scientists and Engineers. New York: McGraw-Hill. p. 182. LCCN 59014456.
  • Margenau H, Murphy G M (1956). The Mathematics of Physics and Chemistry. New York: D. van Nostrand. pp. 190–192. LCCN 55010911.
  • Moon P H, Spencer D E (1988). "Toroidal Coordinates (η, θ, ψ)". Field Theory Handbook, Including Coordinate Systems, Differential Equations, and Their Solutions (2nd ed., 3rd revised printing ed.). New York: Springer Verlag. pp. 112–115 (Section IV, E4Ry). ISBN 978-0-387-02732-6.
[edit]