Internal inductance: Difference between revisions

The self-inductance of a current loop is defined as the ratio of the magnetic flux Φ traversing the loop and its current I:

${\displaystyle L=\Phi /I\,}$

The flux is found by integrating the field over the loop area:

${\displaystyle \Phi =\int _{S}{{\vec {B}}\cdot d{\vec {S}}}}$

On the other hand, the energy contained in the magnetic field produced by the loop is

${\displaystyle W=\int {{\frac {B^{2}}{2\mu _{0}}}d{\vec {r}}}}$

It can be shown that^[1][2]

${\displaystyle W={\frac {1}{2}}LI^{2}}$

The internal inductance is defined as the part of the inductance obtained by integrating over the plasma volume P ^[3]:

${\displaystyle {\frac {1}{2}}L_{i}I^{2}=\int _{P}{{\frac {B^{2}}{2\mu _{0}}}d{\vec {r}}}}$

Its complement is the external inductance (L = L_i + L_e).

Normalized internal inductance

In a tokamak, the field produced by the plasma current is the poloidal magnetic field B_θ, so only this field component enters the definition. In this context, it is common to use the normalized internal inductance^[4]

${\displaystyle l_{i}={\frac {2\pi \int _{P}{B_{\theta }^{2}(\rho )\rho d\rho }}{\pi a^{2}B_{\theta }^{2}(a)}}}$

(for circular cross section plasmas with minor radius a).

Alternatively, sometimes the internal inductance per unit length is used, defined as^[3]

${\displaystyle l_{i}'={\frac {L_{i}}{2\pi R_{0}}}{\frac {4\pi }{\mu _{0}}}={\frac {2L_{i}}{\mu _{0}R_{0}}}}$

where R₀ is the major radius (note ${\displaystyle l_{i}=2\pi l_{i}'}$), and similar for the external inductance.

The value of the normalized internal inductance depends on the current density profile in the toroidal plasma.

References