Toroidal coordinates

(X, Y, Z) ^[1]

(R, φ, Z), where ^[2]

• R² = X² + Y², and
• tan φ = Y/X.

φ is called the toroidal angle (and not the cylindrical angle, at least not in the context of magnetic confinement).

Cylindrical symmetry (symmetry under rotation over φ) is referred to as axisymmetry.

(r, φ, θ), where

• R = R₀ + r cos θ, and
• Z = r sin θ

R₀ corresponds to the torus axis and is called the major radius, while r is called the minor radius, and θ the poloidal angle.

In order to adapt this simple system better to the magnetic surfaces of an axisymmetric MHD equilibrium, it may be enhanced by ^[3]

• letting R₀ depend on r (to account for the Shafranov shift of flux surfaces) ^[4]
• adding ellipticity (ε), triangularity (κ), etc. (to account for non-circular flux surface cross sections)

(ζ, η, φ), where ^{[5] [6]}

${\displaystyle R=R_{p}{\frac {\sinh \zeta }{\cosh \zeta -\cos \eta }}}$ 

${\displaystyle Z=R_{p}{\frac {\sin \eta }{\cosh \zeta -\cos \eta }}}$ 

where R_p is the pole of the coordinate system. Surfaces of constant ζ are tori with major radii R = R_p/tanh ζ and minor radii r = R_p/sinh ζ. At R = R_p, ζ = ∞, while at infinity and at R = 0, ζ = 0. The coordinate η is a poloidal angle and runs from 0 to 2π. This system is orthogonal.

The Laplace equation separates in this system of coordinates, thus allowing an expansion of the vacuum magnetic field in toroidal harmonics. ^{[7] [8]}

Here we briefly review the basic definitions of a general curvilinear coordinate system for later convenience when discussing toroidal flux coordinates and magnetic coordinates.

Function coordinates and basis vector

Given the spatial dependence of a coordinate set ${\displaystyle (\psi (\mathbf {x} ),\theta (\mathbf {x} ),\phi (\mathbf {x} ))}$  we can calculate the contravariant basis vectors

${\displaystyle \mathbf {e} ^{i}=\{\nabla \psi ,\nabla \theta ,\nabla \phi \}}$ 

and the dual covariant basis defined as

${\displaystyle \mathbf {e} _{i}={\frac {\partial \mathbf {x} }{\partial {u^{i}}}}\to \mathbf {e} _{i}\cdot \mathbf {e} ^{j}=\delta _{i}^{j}\to \mathbf {e} _{i}={\frac {\mathbf {e} ^{j}\times \mathbf {e} ^{k}}{|\mathbf {e} ^{i}\cdot \mathbf {e} ^{j}\times \mathbf {e} ^{k}|}}={\sqrt {g}}\;\mathbf {e} ^{j}\times \mathbf {e} ^{k}~,}$ 

where ${\displaystyle (i,j,k)}$  are cyclic permutations of ${\displaystyle (1,2,3)}$  and we have used the notation ${\displaystyle (u^{1},u^{2},u^{3})=(\psi ,\theta ,\phi )}$ . The Jacobian ${\displaystyle {\sqrt {g}}}$  is defined below.

Any vector field ${\displaystyle \mathbf {B} }$  can be represented as

${\displaystyle \mathbf {B} =(\mathbf {B} \cdot \mathbf {e} ^{i})\mathbf {e} _{i}=B^{i}\mathbf {e} _{i}}$ 

or

${\displaystyle \mathbf {B} =(\mathbf {B} \cdot \mathbf {e} _{i})\mathbf {e} ^{i}=B_{i}\mathbf {e} ^{i}~.}$ 

In particular any basis vector ${\displaystyle \mathbf {e} _{i}=(\mathbf {e} _{i}\cdot \mathbf {e} _{j})\mathbf {e} ^{j}}$ . The metric tensor is defined as

${\displaystyle g_{ij}=\mathbf {e} _{i}\cdot \mathbf {e} _{j}\;;\;g^{ij}=\mathbf {e} ^{i}\cdot \mathbf {e} ^{j}\;;\;g_{i}^{j}=\mathbf {e} _{i}\cdot \mathbf {e} ^{j}=\delta _{i}^{j}~.}$ 

Jacobian

The Jacobian of the coordinate transformation ${\displaystyle \mathbf {x} (\psi ,\theta ,\phi )}$  is defined as

${\displaystyle J=\det \left({\frac {\partial (x,y,z)}{\partial (\psi ,\theta ,\phi )}}\right)={\frac {\partial \mathbf {x} }{\partial {\psi }}}\cdot {\frac {\partial \mathbf {x} }{\partial {\theta }}}\times {\frac {\partial \mathbf {x} }{\partial {\phi }}}}$ 

and that of the inverse transformation

${\displaystyle J^{-1}=\det \left({\frac {\partial (\psi ,\theta ,\phi )}{\partial (x,y,z)}}\right)=\nabla {\psi }\cdot \nabla {\theta }\times \nabla {\phi }}$ 

It can be seen that ^[9] ${\displaystyle g\equiv \det(g_{ij})=J^{2}\Rightarrow J={\sqrt {g}}}$ 

A flux coordinate set is one that includes a flux surface label as a coordinate. A flux surface label is a function that is constant and single valued on each flux surface. In our naming of the general curvilinear coordinates we have already adopted the usual flux coordinate convention for toroidal equilibrium with nested flux surfaces with ${\displaystyle \psi }$  being the flux surface label and ${\displaystyle \theta ,\phi }$  are ${\displaystyle 2\pi }$ -periodic poloidal and toroidal-like angles.

Different flux surface labels can be chosen like toroidal or poloidal magnetic fluxes or the volume contained within the flux surface. By single valued we mean to ensure that any flux label ${\displaystyle \psi _{1}=f(\psi _{2})}$  is a monotonous function of any other flux label ${\displaystyle \psi _{2}}$ , so that the function ${\displaystyle f}$  is invertible at least in a volume containing the region of interest.

Flux Surface Average

The flux surface average of a function ${\displaystyle \Phi }$  is defined as the limit

${\displaystyle \langle \Phi \rangle =\lim _{\delta V\to 0}{\frac {1}{\delta V}}\int _{\delta V}\Phi \;dV}$ 

where ${\displaystyle \delta V}$  is the volume confined between two flux surfaces. It is therefore a volume average over an infinitesimal spatial region rather than a surface average.

Introducing the differential volume element ${\displaystyle dV={\sqrt {g}}d\psi d\theta d\phi }$ 

${\displaystyle \langle \Phi \rangle =\lim _{\delta V\to 0}{\frac {1}{\delta V}}\int _{\delta V}\Phi \;{\sqrt {g}}d\psi d\theta d\phi ={\frac {d\psi }{dV}}\int _{0}^{2\pi }\int _{0}^{2\pi }\Phi \;{\sqrt {g}}d\theta d\phi }$ 

or, noting that ${\displaystyle \langle 1\rangle =1}$ , we have ${\displaystyle {\frac {dV}{d\psi }}=\int _{0}^{2\pi }\int _{0}^{2\pi }{\sqrt {g}}d\theta d\phi }$  and we get to a more practical form of the Flux Surface Average

${\displaystyle \langle \Phi \rangle ={\frac {\int _{0}^{2\pi }\int _{0}^{2\pi }\Phi \;{\sqrt {g}}d\theta d\phi }{\int _{0}^{2\pi }\int _{0}^{2\pi }{\sqrt {g}}d\theta d\phi }}}$ 

Note that ${\displaystyle dS=|\nabla \psi |{\sqrt {g}}d\theta d\phi }$ , so the FSA is a surface integral weighted by ${\displaystyle |\nabla V|^{-1}}$  :

${\displaystyle \langle \Phi \rangle ={\frac {d\psi }{dV}}\int _{0}^{2\pi }\int _{0}^{2\pi }\Phi \;{\sqrt {g}}d\theta d\phi ={\frac {d\psi }{dV}}\int _{S(\psi )}{\frac {\Phi }{|\nabla \psi |}}\;dS=\int _{S(\psi )}{\frac {\Phi }{|\nabla V|}}\;dS}$ 

Applying Gauss' theorem to the definition of FSA we get to the identity

${\displaystyle \langle \nabla \cdot \Gamma \rangle =\lim _{\delta V\to 0}{\frac {1}{\delta V}}\int _{\delta V}\nabla \cdot \Gamma \;dV=\lim _{\delta V\to 0}{\frac {1}{\delta V}}\int _{S(\delta V)}\Gamma \cdot {\frac {\nabla V}{|\nabla V|}}dS=\lim _{\delta V\to 0}{\frac {1}{\delta V}}\int _{0}^{2\pi }\int _{0}^{2\pi }\Gamma \cdot \nabla V\;{\sqrt {g}}d\theta d\phi ={\frac {d}{dV}}\langle \Gamma \cdot \nabla V\rangle ~.}$ 

Useful properties of FSA

Some useful properties of the FSA are

• ${\displaystyle \langle \nabla \cdot \Gamma \rangle ={\frac {d}{dV}}\langle \Gamma \cdot \nabla V\rangle ={\frac {1}{V'}}{\frac {d}{d\psi }}V'\langle \Gamma \cdot \nabla \psi \rangle }$ 
• ${\displaystyle \int _{V}\nabla \cdot \Gamma \;dV=\langle \Gamma \cdot \nabla V\rangle =V'\langle \Gamma \cdot \nabla \psi \rangle }$ 
• ${\displaystyle \langle {\sqrt {g}}^{-1}\rangle ={\frac {4\pi ^{2}}{V'}}}$ 
• ${\displaystyle \langle \mathbf {B} \cdot \nabla f\rangle =0~,\qquad \forall ~\mathrm {single~valued~} f(\mathbf {x} ),~\mathrm {if} ~\nabla \cdot \mathbf {B} =0~\mathrm {and} ~\nabla V\cdot \mathbf {B} =0}$ 
• ${\displaystyle \langle \mathbf {B} \cdot \nabla \theta \rangle =2\pi {\frac {d\Psi _{pol}}{dV}}\qquad (\mathrm {Note:} ~\theta (\mathbf {x} )~\mathrm {is~not~single~valued} )}$ 
• ${\displaystyle \langle \mathbf {B} \cdot \nabla \phi \rangle =2\pi {\frac {d\Psi _{tor}}{dV}}\qquad (\mathrm {Note:} ~\phi (\mathbf {x} )~\mathrm {is~not~single~valued} )}$ 

where ${\displaystyle V'={\frac {dV}{d\psi }}}$ .

Magnetic field representation in flux coordinates

Contravariant From

Any solenoidal vector field ${\displaystyle \mathbf {B} }$  can be written as ${\displaystyle \mathbf {B} =\nabla \alpha \times \nabla \nu }$  called its Clebsch representation. For a magnetic field with flux surfaces ${\displaystyle (\psi =\mathrm {const} \;,\;\nabla \psi \cdot \mathbf {B} =0)}$  we can choose, say, ${\displaystyle \alpha }$  to be the flux surface label ${\displaystyle \psi }$ 

${\displaystyle \mathbf {B} =\nabla \psi \times \nabla \nu }$ 

Field lines are then given as the intersection of the constant-${\displaystyle \psi }$  and constant-${\displaystyle \nu }$  surfaces. This form provides a general expression for ${\displaystyle \mathbf {B} }$  in terms of the covariant basis vectors of a flux coordinate system

${\displaystyle \mathbf {B} ={\frac {\partial \nu }{\partial \theta }}\nabla \psi \times \nabla \theta +{\frac {\partial \nu }{\partial \phi }}\nabla \psi \times \nabla \phi ={\frac {1}{\sqrt {g}}}{\frac {\partial \nu }{\partial \theta }}\mathbf {e} _{\phi }-{\frac {1}{\sqrt {g}}}{\frac {\partial \nu }{\partial \phi }}\mathbf {e} _{\theta }=B^{\phi }\mathbf {e} _{\phi }+B^{\theta }\mathbf {e} _{\theta }~.}$ 

in terms of the function ${\displaystyle \nu }$ , sometimes referred to as the magnetic field's stream function.

It is worthwhile to note that the Clebsch form of ${\displaystyle \mathbf {B} }$  corresponds to a magnetic vector potential ${\displaystyle \mathbf {A} =\nu \nabla \psi }$  (or ${\displaystyle \mathbf {A} =\psi \nabla \nu }$  as they differ only by the Gauge transformation ${\displaystyle \mathbf {A} \to \mathbf {A} -\nabla (\psi \nu )}$ ).

The general form of the stream function is

${\displaystyle \nu (\psi ,\theta ,\phi )={\frac {1}{2\pi }}({\dot {\Psi }}_{tor}\theta -{\dot {\Psi }}_{pol}\phi )+{\tilde {\nu }}(\psi ,\theta ,\phi )}$ 

where ${\displaystyle {\tilde {\nu }}}$  is a differentiable function periodic in the two angles. This general form can be derived by using the fact that ${\displaystyle \mathbf {B} }$  is a physical function (hence singe-valued). The specific form for the coefficients in front of the secular terms (i.e. the non-periodic terms) can be obtained from the FSA properties .

Covariant Form

All of the above coordinate systems are fixed and axisymmetric (except the Cartesian system). By contrast, magnetic coordinates adapt to the magnetic field, and therefore to the MHD equilibrium (also see Flux surface). Magnetic coordinates simplify the description of the magnetic field. In 3 dimensions (not assuming axisymmetry), the most commonly used coordinate systems are: ^[9]

• Hamada coordinates. ^[10][11] In these coordinates, both the field lines and current lines corresponding to the MHD equilibrium are straight.
• Boozer coordinates. ^[12][13] In these coordinates, the field lines corresponding to the MHD equilibrium are straight.

These two coordinate systems are related. ^[14]