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Plasma oscillation

Langmuir waves were discovered by American physicists Irving Langmuir and Lewi Tonks in the 1920s.^[1] They are parallel in form to Jeans instability waves, which are caused by gravitational instabilities in a static medium.

Mechanism[edit]

Consider an electrically neutral plasma in equilibrium, consisting of a gas of positively charged ions and negatively charged electrons. If one displaces by a tiny amount an electron or a group of electrons with respect to the ions, the Coulomb force pulls the electrons back, acting as a restoring force.

'Cold' electrons[edit]

If the thermal motion of the electrons is ignored, it is possible to show that the charge density oscillates at the plasma frequency

${\displaystyle \omega _{\mathrm {pe} }={\sqrt {\frac {n_{\mathrm {e} }e^{2}}{m^{*}\varepsilon _{0}}}},\left[\mathrm {rad/s} \right]}$ (SI units),

${\displaystyle \omega _{\mathrm {pe} }={\sqrt {\frac {4\pi n_{\mathrm {e} }e^{2}}{m^{*}}}},\left[\mathrm {rad/s} \right]}$ (cgs units),

where ${\displaystyle n_{\mathrm {e} }}$ is the number density of electrons, ${\displaystyle e}$ is the electric charge, ${\displaystyle m^{*}}$ is the effective mass of the electron, and ${\displaystyle \varepsilon _{0}}$ is the permittivity of free space. Note that the above formula is derived under the approximation that the ion mass is infinite. This is generally a good approximation, as the electrons are so much lighter than ions.

Proof using Maxwell equations.^[2] Assuming charge density oscillations ${\displaystyle \rho (\omega )=\rho _{0}e^{-i\omega t}}$ the continuity equation: $${\displaystyle \nabla \cdot \mathbf {j} =-{\frac {\partial \rho }{\partial t}}=i\omega \rho (\omega )}$$ the Gauss law $${\displaystyle \nabla \cdot \mathbf {E} (\omega )=4\pi \rho (\omega )}$$ and the conductivity $${\displaystyle \mathbf {j} (\omega )=\sigma (\omega )\mathbf {E} (\omega )}$$ taking the divergence on both sides and substituting the above relations: $${\displaystyle i\omega \rho (\omega )=4\pi \sigma (\omega )\rho (\omega )}$$ which is always true only if $${\displaystyle 1+{\frac {4\pi i\sigma (\omega )}{\omega }}=0}$$ But this is also the dielectric constant (see Drude Model) ${\displaystyle \epsilon (\omega )=1+{\frac {4\pi i\sigma (\omega )}{\omega }}}$ and the condition of transparency (i.e. ${\displaystyle \epsilon \geq 0}$ from a certain plasma frequency ${\displaystyle \omega _{\rm {p}}}$ and above), the same condition here ${\displaystyle \epsilon =0}$ apply to make possible also the propagation of density waves in the charge density.

This expression must be modified in the case of electron-positron plasmas, often encountered in astrophysics.^[3] Since the frequency is independent of the wavelength, these oscillations have an infinite phase velocity and zero group velocity.

Note that, when ${\displaystyle m^{*}=m_{\mathrm {e} }}$, the plasma frequency, ${\displaystyle \omega _{\mathrm {pe} }}$, depends only on physical constants and electron density ${\displaystyle n_{\mathrm {e} }}$. The numeric expression for angular plasma frequency is $${\displaystyle f_{\text{pe}}={\frac {\omega _{\text{pe}}}{2\pi }}~\left[{\text{Hz}}\right]}$$

Metals are only transparent to light with a frequency higher than the metal's plasma frequency. For typical metals such as aluminium or silver, ${\displaystyle n_{\mathrm {e} }}$ is approximately 10²³cm⁻³, which brings the plasma frequency into the ultraviolet region. This is why most metals reflect visible light and appear shiny.

'Warm' electrons[edit]

When the effects of the electron thermal speed ${\textstyle v_{\mathrm {e,th} }={\sqrt {k_{\mathrm {B} }T_{\mathrm {e} }/m_{\mathrm {e} }}}}$ are taken into account, the electron pressure acts as a restoring force as well as the electric field and the oscillations propagate with frequency and wavenumber related by the longitudinal Langmuir^[4] wave: $${\displaystyle \omega ^{2}=\omega _{\mathrm {pe} }^{2}+{\frac {3k_{\mathrm {B} }T_{\mathrm {e} }}{m_{\mathrm {e} }}}k^{2}=\omega _{\mathrm {pe} }^{2}+3k^{2}v_{\mathrm {e,th} }^{2},}$$ called the Bohm–Gross dispersion relation. If the spatial scale is large compared to the Debye length, the oscillations are only weakly modified by the pressure term, but at small scales the pressure term dominates and the waves become dispersionless with a speed of ${\displaystyle {\sqrt {3}}\cdot v_{\mathrm {e,th} }}$. For such waves, however, the electron thermal speed is comparable to the phase velocity, i.e., $${\displaystyle v\sim v_{\mathrm {ph} }\ {\stackrel {\mathrm {def} }{=}}\ {\frac {\omega }{k}},}$$ so the plasma waves can accelerate electrons that are moving with speed nearly equal to the phase velocity of the wave. This process often leads to a form of collisionless damping, called Landau damping. Consequently, the large-k portion in the dispersion relation is difficult to observe and seldom of consequence.

In a bounded plasma, fringing electric fields can result in propagation of plasma oscillations, even when the electrons are cold.

In a metalorsemiconductor, the effect of the ions' periodic potential must be taken into account. This is usually done by using the electrons' effective mass in place of m.

Plasma oscillations and the effect of the negative mass[edit]

Plasma oscillations may give rise to the effect of the “negative mass”. The mechanical model giving rise to the negative effective mass effect is depicted in Figure 1. A core with mass ${\displaystyle m_{2}}$ is connected internally through the spring with constant ${\displaystyle k_{2}}$ to a shell with mass ${\displaystyle m_{1}}$. The system is subjected to the external sinusoidal force ${\displaystyle F($t)={\widehat {F}}\sin \omega t} . If we solve the equations of motion for the masses ${\displaystyle m_{1}}$ and ${\displaystyle m_{2}}$ and replace the entire system with a single effective mass ${\displaystyle m_{\rm {eff}}}$ we obtain:^{[5][6][7][8][9]} $${\displaystyle m_{\rm {eff}}=m_{1}+{m_{2}\omega _{0}^{2} \over \omega _{0}^{2}-\omega ^{2}},}$$ where ${\textstyle \omega _{0}={\sqrt {k_{2}/m_{2}}}}$. When the frequency ${\displaystyle \omega }$ approaches ${\displaystyle \omega _{0}}$ from above the effective mass ${\displaystyle m_{\rm {eff}}}$ will be negative.^[5][6][7][8]

The negative effective mass (density) becomes also possible based on the electro-mechanical coupling exploiting plasma oscillations of a free electron gas (see Figure 2).^[9][10] The negative mass appears as a result of vibration of a metallic particle with a frequency of ${\displaystyle \omega }$ which is close the frequency of the plasma oscillations of the electron gas ${\displaystyle m_{2}}$ relatively to the ionic lattice ${\displaystyle m_{1}}$. The plasma oscillations are represented with the elastic spring ${\displaystyle k_{2}=\omega _{\rm {p}}^{2}m_{2}}$, where ${\displaystyle \omega _{\rm {p}}}$ is the plasma frequency. Thus, the metallic particle vibrated with the external frequency ω is described by the effective mass $${\displaystyle m_{\rm {eff}}=m_{1}+{m_{2}\omega _{\rm {p}}^{2} \over \omega _{\rm {p}}^{2}-\omega ^{2}},}$$ which is negative when the frequency ${\displaystyle \omega }$ approaches ${\displaystyle \omega _{\rm {p}}}$ from above. Metamaterials exploiting the effect of the negative mass in the vicinity of the plasma frequency were reported.^[9][10]

See also[edit]

• Electron wake
• Plasmon
• Relativistic quantum chemistry
• Surface plasmon resonance
• Upper hybrid oscillation, in particular for a discussion of the modification to the mode at propagation angles oblique to the magnetic field
• Waves in plasmas

References[edit]

^ ^{a b c} Bormashenko, Edward; Legchenkova, Irina (April 2020). "Negative Effective Mass in Plasmonic Systems". Materials. 13 (8): 1890. Bibcode:2020Mate...13.1890B. doi:10.3390/ma13081890. PMC 7215794. PMID 32316640. Text was copied from this source, which is available under a Creative Commons Attribution 4.0 International License.

Further reading[edit]

• Longair, Malcolm S. (1998), Galaxy Formation, Berlin: Springer, ISBN 978-3-540-63785-1