Multipole magnet

The equation for stored energy in an arbitrary magnetic field is[3]:

${\displaystyle U={\frac {1}{2}}\int \left({\frac {B^{2}}{\mu _{0}}}\right)\,d\tau .}$

Here, ${\displaystyle \mu _{0}}$ is the permeability of free space, ${\displaystyle B}$ is the magnitude of the field, and ${\displaystyle d\tau }$ is an infinitesimal element of volume. Now for an electromagnet with a cylindrical bore of radius ${\displaystyle R}$, producing a pure multipole field of order ${\displaystyle n}$, this integral becomes:

${\displaystyle U_{n}={\frac {1}{2\mu _{0}}}\int ^{\ell }\int _{0}^{R}\int _{0}^{2\pi }B^{2}\,d\tau .}$

Ampere's Law for multipole electromagnets gives the field within the bore as[4]:

${\displaystyle B(r)={\frac {n!\mu _{0}NI}{R^{n}}}r^{n-1}.}$

Here, ${\displaystyle r}$ is the radial coordinate. It can be seen that along ${\displaystyle r}$ the field of a dipole is constant, the field of a quadrupole magnet is linearly increasing (i.e. has a constant gradient), and the field of a sextupole magnet is parabolically increasing (i.e. has a constant second derivative). Substituting this equation into the previous equation for ${\displaystyle U_{n}}$ gives:

${\displaystyle U_{n}={\frac {1}{2\mu _{0}}}\int ^{\ell }\int _{0}^{R}\int _{0}^{2\pi }\left({\frac {n!\mu _{0}NI}{R^{n}}}r^{n-1}\right)^{2}\,d\tau ,}$

${\displaystyle U_{n}={\frac {1}{2\mu _{0}}}\int _{0}^{R}\left({\frac {n!\mu _{0}NI}{R^{n}}}r^{n-1}\right)^{2}(2\pi \ell r\,dr),}$

${\displaystyle U_{n}={\frac {\pi \mu _{0}\ell n!^{2}N^{2}I^{2}}{R^{2n}}}\int _{0}^{R}r^{2n-1}\,dr,}$

${\displaystyle U_{n}={\frac {\pi \mu _{0}\ell n!^{2}N^{2}I^{2}}{R^{2n}}}\left({\frac {R^{2n}}{2n}}\right),}$

${\displaystyle U_{n}={\frac {n!^{2}}{2n}}\pi \mu _{0}\ell N^{2}I^{2}.}$