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Mode-Mode Resonance. A linear-nonlinear process. Simple Beam Instability. Let us consider It is well known that the equation supports reactive instability. What is the cause of instability?. One may rewrite the equation. It indicates that Langmuir wave is coupled to a beam mode.
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Mode-Mode Resonance A linear-nonlinear process
Simple Beam Instability • Let us consider • It is well known that the equation supports reactive instability. • What is the cause of instability?
One may rewrite the equation It indicates that Langmuir wave is coupled to a beam mode.
Consequences depending on nature of coupling • Propagation and evanescence • Convective instability • Absolute instability
Mode Evanescence andInstability • Evanescence • Instability
Graphical Description Beam mode Complex root
Convective Instability • The frequency is complex in certain range of k so that the system is unstable. • The roots of the unstable roots are in the same half plane of k. The instability is convective.
Absolute Instability • The frequency is complex in certain range of k so that the system is unstable. • The roots of the unstable roots are in opposite half planes of k. Thus the instability is absolute.
Two Other Electron Beam Instabilities • Beam mode coupled with right-hand polarized ion cyclotron wave • Beam mode couple with left-hand polarized ion cyclotron wave
Ion cyclotron-beam instability • The dispersion relation is • Coupling of beam-cyclotron mode and the electromagnetic ion cyclotron mode leads to two different instabilities
Two electron cyclotron-beam modes Left-hand polarized Right-hand polarized
The two beam instabilities • Have fundamentally different properties. • The right-hand mode is absolutely unstable. • The left-hand mode is convectively unstable
Modified Two Stream Instability • The instability is related to shock wave study in the early 1970s. • The instability theory is rather simple and the physics is fairly interesting. • From the viewpoint of mode-coupling process it is obvious.
Dispersion Relation • Consider electrostatic waves in a magnetized plasma • Consider and obtain
Instability and Growth Rate • Thus we obtain
Mode Coupling and Modulation • This is another important process in plasma physics. • It is relevant to parametric excitation of waves.
An Oscillator with Modulation • The equation that describes the motion is • The modulation frequency is
Physical Parameters • Natural frequency • Pump or modulation frequency • Modulation amplitude • Oscillator with modulation
Fourier transform leads to • Two coupled oscillators if where only terms close to the natural frequency are retained. Eventually we obtain the following dispersion equation
Dispersion Equation • Eliminating X and Y we obtain the dispersion equation • Two cases of interest
Further Discussion Will be given later when we consider parametric instabilities. The details are similar to those discussed earlier.
Summary and Conclusions • Mode coupling in general plays important roles. • It can lead to reactive instabilities such as various types of beam instabilities. • The coupled oscillator problem is an introduction of the theory of parametric instability.