Appleton–Hartree equation

The Appleton–Hartree equation, sometimes also referred to as the Appleton–Lassen equation, is a mathematical expression that describes the refractive index for electromagnetic wave propagation in a cold magnetized plasma. The Appleton–Hartree equation was developed independently by several different scientists, including Edward Victor Appleton, Douglas Hartree and German radio physicist H. K. Lassen.^[1] Lassen's work, completed two years prior to Appleton and five years prior to Hartree, included a more thorough treatment of collisional plasma; but, published only in German, it has not been widely read in the English speaking world of radio physics.^[2] Further, regarding the derivation by Appleton, it was noted in the historical study by Gillmor that Wilhelm Altar (while working with Appleton) first calculated the dispersion relation in 1926.^[3]

The dispersion relation can be written as an expression for the frequency (squared), but it is also common to write it as an expression for the index of refraction:

${\displaystyle n^2={\left(\frac{ck}{\omega }\right)}^2.}$

The full equation is typically given as follows:^[4]

${\displaystyle n^2=1-\frac{X}{1-iZ-\frac{\frac{1}{2}{Y}^2{\sin }^2\theta }{1-X-iZ}\pm \frac{1}{1-X-iZ}{(\frac{1}{4}{Y}^4{\sin }^4\theta +Y^2{\cos }^2\theta {(1-X-iZ)}^2)}^{1/2}}}$

or, alternatively, with damping term ${\displaystyle Z=0}$ and rearranging terms:^[5]

${\displaystyle n^2=1-\frac{X(1-X)}{1-X-\frac{1}{2}{Y}^2{\sin }^2\theta \pm {({\left(\frac{1}{2}{Y}^2{\sin }^2\theta \right)}^2+{(1-X)}^2{Y}^2{\cos }^2\theta )}^{1/2}}}$

Definition of terms:

${\displaystyle n}$: complex refractive index

${\displaystyle i=\sqrt{-1}}$: imaginary unit

${\displaystyle X=\frac{{\omega }_0^2}{{\omega }^2}}$

${\displaystyle Y=\frac{{\omega }_H}{\omega }}$

${\displaystyle Z=\frac{\nu }{\omega }}$

${\displaystyle \nu }$: electron collision frequency

${\displaystyle \omega =2\pi f}$: angular frequency

${\displaystyle f}$: ordinary frequency (cycles per second, or Hertz)

${\displaystyle {\omega }_0=2\pi f_0=\sqrt{\frac{N{e}^2}{{ϵ}_{0}m}}}$: electron plasma frequency

${\displaystyle {\omega }_H=2\pi f_H=\frac{B_0|e|}{m}}$: electron gyro frequency

${\displaystyle {ϵ}_0}$: permittivity of free space

${\displaystyle B_0}$: ambient magnetic field strength

${\displaystyle e}$: electron charge

${\displaystyle m}$: electron mass

${\displaystyle \theta }$: angle between the ambient magnetic field vector and the wave vector

The presence of the ${\displaystyle \pm }$ sign in the Appleton–Hartree equation gives two separate solutions for the refractive index.^[6] For propagation perpendicular to the magnetic field, i.e., ${\displaystyle 𝐤\perp {𝐁}_0}$, the '+' sign represents the "ordinary mode," and the '−' sign represents the "extraordinary mode." For propagation parallel to the magnetic field, i.e., ${\displaystyle 𝐤\parallel {𝐁}_0}$, the '+' sign represents a left-hand circularly polarized mode, and the '−' sign represents a right-hand circularly polarized mode. See the article on electromagnetic electron waves for more detail.

${\displaystyle 𝐤}$ is the vector of the propagation plane.

If the electron collision frequency ${\displaystyle \nu }$ is negligible compared to the wave frequency of interest ${\displaystyle \omega }$, the plasma can be said to be "collisionless." That is, given the condition

${\displaystyle \nu \ll \omega }$,

we have

${\displaystyle Z=\frac{\nu }{\omega }\ll 1}$,

so we can neglect the ${\displaystyle Z}$ terms in the equation. The Appleton–Hartree equation for a cold, collisionless plasma is therefore,

${\displaystyle n^2=1-\frac{X}{1-\frac{\frac{1}{2}{Y}^2{\sin }^2\theta }{1-X}\pm \frac{1}{1-X}{(\frac{1}{4}{Y}^4{\sin }^4\theta +Y^2{\cos }^2\theta {(1-X)}^2)}^{1/2}}}$

If we further assume that the wave propagation is primarily in the direction of the magnetic field, i.e., ${\displaystyle \theta \approx 0}$, we can neglect the ${\displaystyle Y^4{\sin }^4\theta }$ term above. Thus, for quasi-longitudinal propagation in a cold, collisionless plasma, the Appleton–Hartree equation becomes,

${\displaystyle n^2=1-\frac{X}{1-\frac{\frac{1}{2}{Y}^2{\sin }^2\theta }{1-X}\pm Y\cos \theta }}$

• Mary Taylor Slow
• Plasma (physics)
• Waves in plasmas