Inductance with physical symmetry

It has been suggested that this article be merged into Inductance. (Discuss) Proposed since November 2009.

A solenoid is a long, thin coil, i.e. a coil whose length is much greater than the diameter. Under these conditions, and without any magnetic material used, the magnetic flux density ${\displaystyle B}$ within the coil is practically constant and is given by

${\displaystyle \displaystyle B=\mu _{0}Ni/l}$

where ${\displaystyle \mu _{0}}$ is the magnetic constant, ${\displaystyle N}$ the number of turns, ${\displaystyle i}$ the current and ${\displaystyle l}$ the length of the coil. Ignoring end effects the total magnetic flux through the coil is obtained by multiplying the flux density ${\displaystyle B}$ by the cross-section area ${\displaystyle A}$ and the number of turns ${\displaystyle N}$:

${\displaystyle \displaystyle \Phi =\mu _{0}NiA/l,}$

When this is combined with the definition of inductance,

${\displaystyle \displaystyle L=N\Phi /i}$

it follows that the inductance of a solenoid is given by:

${\displaystyle \displaystyle L=\mu _{0}N^{2}A/l.}$

A table of inductance for short solenoids of various diameter to length ratios has been calculated by Dellinger, Whittmore, and Ould^[1]

This, and the inductance of more complicated shapes, can be derived from Maxwell's equations. For rigid air-core coils, inductance is a function of coil geometry and number of turns, and is independent of current.

Similar analysis applies to a solenoid with a magnetic core, but only if the length of the coil is much greater than the product of the relative permeability of the magnetic core and the diameter. That limits the simple analysis to low-permeability cores, or extremely long thin solenoids. Although rarely useful, the equations are,

${\displaystyle \displaystyle B=\mu _{0}\mu _{r}Ni/l}$

where ${\displaystyle \mu _{r}}$ the relative permeability of the material within the solenoid,

${\displaystyle \displaystyle \Phi =\mu _{0}\mu _{r}NiA/l,}$

from which it follows that the inductance of a solenoid is given by:

${\displaystyle \displaystyle L=\mu _{0}\mu _{r}N^{2}A/l.}$

where N is squared because of the definition of inductance.

Note that since the permeability of ferromagnetic materials changes with applied magnetic flux, the inductance of a coil with a ferromagnetic core will generally vary with current.

Let the inner conductor have radius ${\displaystyle r_{i}}$ and permeability ${\displaystyle \mu _{i}}$, let the dielectric between the inner and outer conductor have permeability ${\displaystyle \mu _{d}}$, and let the outer conductor have inner radius ${\displaystyle r_{o1}}$, outer radius ${\displaystyle r_{o2}}$, and permeability ${\displaystyle \mu _{o}}$. Assume that a DC current ${\displaystyle I}$ flows in opposite directions in the two conductors, with uniform current density. The magnetic field generated by these currents points in the azimuthal direction and is a function of radius ${\displaystyle r}$; it can be computed using Ampère's law:

${\displaystyle 0\leq r\leq r_{i}:B(r)={\frac {\mu _{i}Ir}{2\pi r_{i}^{2}}}}$

${\displaystyle r_{i}\leq r\leq r_{o1}:B(r)={\frac {\mu _{d}I}{2\pi r}}}$

${\displaystyle r_{o1}\leq r\leq r_{o2}:B(r)={\frac {\mu _{o}I}{2\pi r}}\left({\frac {r_{o2}^{2}-r^{2}}{r_{o2}^{2}-r_{o1}^{2}}}\right)}$

The flux per length ${\displaystyle l}$ in the region between the conductors can be computed by drawing a surface containing the axis:

${\displaystyle {\frac {d\phi _{d}}{dl}}=\int _{r_{i}}^{r_{o1}}B(r)dr={\frac {\mu _{d}I}{2\pi }}\ln {\frac {r_{o1}}{r_{i}}}}$

Inside the conductors, L can be computed by equating the energy stored in an inductor, ${\displaystyle {\frac {1}{2}}LI^{2}}$, with the energy stored in the magnetic field:

${\displaystyle {\frac {1}{2}}LI^{2}=\int _{V}{\frac {B^{2}}{2\mu }}dV}$

For a cylindrical geometry with no ${\displaystyle l}$ dependence, the energy per unit length is

${\displaystyle {\frac {1}{2}}L'I^{2}=\int _{r_{1}}^{r_{2}}{\frac {B^{2}}{2\mu }}2\pi r~dr}$

where ${\displaystyle L'}$ is the inductance per unit length. For the inner conductor, the integral on the right-hand-side is ${\displaystyle {\frac {\mu _{i}I^{2}}{16\pi }}}$; for the outer conductor it is ${\displaystyle {\frac {\mu _{o}I^{2}}{4\pi }}\left({\frac {r_{o2}^{2}}{r_{o2}^{2}-r_{o1}^{2}}}\right)^{2}\ln {\frac {r_{o2}}{r_{o1}}}-{\frac {\mu _{o}I^{2}}{8\pi }}\left({\frac {r_{o2}^{2}}{r_{o2}^{2}-r_{o1}^{2}}}\right)-{\frac {\mu _{o}I^{2}}{16\pi }}}$

Solving for ${\displaystyle L'}$ and summing the terms for each region together gives a total inductance per unit length of:

${\displaystyle L'={\frac {\mu _{i}}{8\pi }}+{\frac {\mu _{d}}{2\pi }}\ln {\frac {r_{o1}}{r_{i}}}+{\frac {\mu _{o}}{2\pi }}\left({\frac {r_{o2}^{2}}{r_{o2}^{2}-r_{o1}^{2}}}\right)^{2}\ln {\frac {r_{o2}}{r_{o1}}}-{\frac {\mu _{o}}{4\pi }}\left({\frac {r_{o2}^{2}}{r_{o2}^{2}-r_{o1}^{2}}}\right)-{\frac {\mu _{o}}{8\pi }}}$

However, for a typical coaxial line application we are interested in passing (non-DC) signals at frequencies for which the resistive skin effect cannot be neglected. In most cases, the inner and outer conductor terms are negligible, in which case one may approximate

${\displaystyle L'={\frac {dL}{dl}}\approx {\frac {\mu _{d}}{2\pi }}\ln {\frac {r_{o1}}{r_{i}}}}$

==References