Cyclotron resonance

Cyclotron resonance describes the interaction of external forces with charged particles experiencing a magnetic field, thus moving on a circular path. It is named after the cyclotron, a cyclic particle accelerator that utilizes an oscillating electric field tuned to this resonance to add kinetic energy to charged particles.

Cyclotron resonance frequency

The cyclotron frequency or gyrofrequency is the frequency of a charged particle moving perpendicular to the direction of a uniform magnetic field B (constant magnitude and direction).

Cyclotron frequency

SI units	CGS units
${\displaystyle \omega _{C}={\frac {qB}{m}}}$	${\displaystyle \omega _{C}={\frac {qB}{mc}}}$

Derivation

Since the motion in an orthogonal and constant magnetic field is always circular,^[1] the cyclotron frequency is given by equality of centripetal force and magnetic Lorentz force

${\displaystyle {\frac {mv^{2}}{r}}=qBv}$

with the particle mass m, its charge q, velocity v, and the circular path radius r, also called gyroradius.

The angular speed is then:

${\displaystyle \omega ={\frac {v}{r}}={\frac {qB}{m}}}$.

Giving the rotational frequency (being the cyclotron frequency) as:

${\displaystyle f={\frac {\omega }{2\pi }}={\frac {qB}{2\pi m}}}$,

It is notable that the cyclotron frequency is independent of the radius and velocity and therefore independent of the particle's kinetic energy; all particles with the same charge-to-mass ratio rotate around magnetic field lines with the same frequency. This is only true in the non-relativistic limit, and underpins the principle of operation of the cyclotron.

The cyclotron frequency is also useful in non-uniform magnetic fields, in which (assuming slow variation of magnitude of the magnetic field) the movement is approximately helical - in the direction parallel to the magnetic field, the motion is uniform, whereas in the plane perpendicular to the magnetic field the movement is, as previously circular. The sum of these two motions gives a trajectory in the shape of a helix.

When the charged particle begins to approach relativistic speeds, the centripetal force should be multiplied by the Lorentz factor, yielding a corresponding factor in the angular frequency:

${\displaystyle \omega ={\frac {qB}{\gamma m}}}$.

Gaussian units

The above is for SI units. In some cases, the cyclotron frequency is given in Gaussian units.^[2] In Gaussian units, the Lorentz force differs by a factor of 1/c, the speed of light, which leads to:

${\displaystyle \omega ={\frac {v}{r}}={\frac {qB}{mc}}}$.

For materials with little or no magnetism (i.e. ${\displaystyle \mu \approx 1}$) ${\displaystyle H\approx B}$, so we can use the easily measured magnetic field intensity H instead of B:^[3]

${\displaystyle \omega ={\frac {qH}{mc}}}$.

Note that converting this expression to SI units introduces a factor of the vacuum permeability.

Effective mass

See also: Effective mass (solid-state physics) § Cyclotron effective mass

For some materials, the motion of electrons follows loops that depend on the applied magnetic field, but not exactly the same way. For these materials, we define a cyclotron effective mass, ${\displaystyle m^{*}}$ so that:

${\displaystyle \omega ={\frac {qB}{m^{*}}}}$.

See also

• Ion cyclotron resonance
• Electron cyclotron resonance

References

1. Physics by M. Alonso & E. Finn, Addison Wesley 1996.
2. Kittel, Charles. Introduction to Solid State Physics, 8th edition. pp. 153
3. Ashcroft and Mermin. Solid State Physics. pp12

External links

• Calculate Cyclotron frequency with Wolfram Alpha