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What are helicons?. Helicons are partially ionized RF discharges in a magnetic field. They are basically whistler modes confined to a cylinder. They are much different than in free space; they have E-fields. OLD. NEW. Long cylinder. Permanent magnet. Helicons pose unending problems.
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What are helicons? Helicons are partially ionized RF discharges in a magnetic field. They are basically whistler modes confined to a cylinder. They are much different than in free space; they have E-fields. OLD NEW Long cylinder Permanent magnet
Helicons pose unending problems • Why does the amplitude oscillate along the cylinder? • Why is a right-helical antenna better than a left one? • What causes the high ionization efficiency? • Why does an endplate near the antenna increase n? • Why is the ion temperature so high? • Why is a half-wavelength antenna better than a full? • Why is the density peaked at the center? Most discharge theorists treat only collision cross sections and ion distribution functions. UCLA
The Trivelpiece-Gould mode: edge ionization An electron cyclotron wave near the edge deposits most of the RF energy UCLA
Edge ionization should give a hollow profile But density is almost always peaked at center, even in KTe is peaked at the edge. UCLA
Let’s take the simplest realistic problem Eliminate all unnecessary features, and not length! Treat a 1D problem in radius r UCLA
The problem is how to treat the ends The sheath drop is normally independent of density UCLA
Ion diffusion upsets the balance The short-circuit effect “moves” electrons across B. Sheaths change to preserve neutrality. Electrons can now follow the Boltzmann relation. This happens in nanoseconds. UCLA
In equilibrium, n is peaked on center Er and diffusion must be outward if axial flow is slow. n(r) is flat in the limit of all ionization at edge. UCLA
Three equations in 3 unknowns: v, n, and Ion equation of motion: Ion equation of continuity: Simplify the collision terms: Use the Boltzmann relation: UCLA
Reduce to one dimension in r Eliminate n and to get an equation for v(r): Non-dimensionalize: This is an ordinary differential equation for all the plasma profiles. UCLA
Rescale r to see structure of the equation We had: Rescale r: Finally: k contains the plasma information: UCLA
Solutions for uniform pressure and KTe Solutions for three values of k Rescale r so that ra 1 in each case This profile is independent of pressure, size, and magnetic field. It depends on KTe, but is always peaked at the center. UCLA
This profile IS modified: • When Te is changed or varies with r • When nn varies with r (neutral depletion, treated later) • When k varies with r But the central peaking remains UCLA
Ionization balance restricts KTe for real r Our previous dimensional equation Solved simultaneously UCLA
Improved Te – p0 relation Old, radially averaged data: M.A. Lieberman and A.J. Lichtenberg, Principles of Plasma Discharges and Materials Processing, 2nd ed. (Wiley-Interscience, Hoboken, NJ, 2005). F. F. Chen and J.P. Chang, Principles of Plasma Processing (Kluwer/Plenum, New York, 2002), UCLA
The EQM program solves simultaneously: Ion motion Ionization balance Neutral depletion UCLA
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