Difference between revisions of "- Magnetic Susceptibilities"

Magnetic Susceptibilities

We have seen that an assembly of nuclear magnets in a steady magnetic field ${\displaystyle H_{_{0}}}$ absorbs power from a suitably applied RF field.

We know from basic E&M theory (macroscopic formulation of Maxwell's equations) that absorption is associated with the imaginary part of the susceptibility ${\displaystyle \chi }$. In our case, ${\displaystyle \chi =\chi ^{'}+i\chi ^{''}}$ is the complex nuclear magnetic susceptibility, where ${\displaystyle \chi ^{'}}$ is the real part and is associated with dispersion while ${\displaystyle \chi ^{''}}$ is the imaginary part and is associated with absorption.

We will first derive the static (no transverse RF field) magnetic susceptibility ${\displaystyle \chi _{_{0}}}$.

Consider an assembly of identical weakly interacting nuclei of spin number ${\displaystyle I}$, in thermal equilibrium at a spin temperature ${\displaystyle T_{_{S}}}$ in a steady magnetic field ${\displaystyle H_{_{0}}}$. The nuclei having quantum number ${\displaystyle m}$ are found to be in the energy level ${\displaystyle -m\mu H_{_{0}}/I}$. The population of this level is then weighted by the Boltzmann factor ${\displaystyle e^{\tfrac {m\mu H_{_{0}}}{IkT_{_{S}}}}\approx 1+{\tfrac {m\mu H_{_{0}}}{IkT_{_{S}}}}}$. This approximation is very good for most practical conditions. Hence the population of each level is given by

${\displaystyle N(m)={\tfrac {N}{2I+1}}(1+{\tfrac {m\mu H_{_{0}}}{IkT_{_{S}}}})}$.

The total magnetic moment, the magnetization ${\displaystyle {\mathcal {M}}}$, is given by

${\displaystyle {\mathcal {M}}=\sum _{-I}^{I}N(m)m\mu /I={\tfrac {N\mu ^{2}H_{_{0}}}{I^{2}(2I+1)kT_{_{S}}}}\sum _{-I}^{I}m^{2}={\tfrac {N\mu ^{2}H_{_{0}}(I+1)}{3kT_{_{S}}I}}}$,

since ${\displaystyle \sum _{-I}^{I}m^{2}={\tfrac {1}{3}}I(I+1)(2I+1)}$.

The static magnetic susceptibility is then given by

${\displaystyle \chi _{_{0}}={\tfrac {\mathcal {M}}{H_{_{0}}}}={\tfrac {N\mu ^{2}(I+1)}{3kT_{_{S}}I}}}$.