Stability of Vlasov equilibria. Part 2. One non-ignorable co-ordinate

H. Ralph Lewis; Charles E. Seyler

doi:10.1017/S0022377800026350

Extract

The solution of the linearized Vlasov equation is given for an arbitrary equilibrium Hamiltonian in which there is only one non-ignorable co-ordinate. The solution written in terms of integrals with respect to time which only extend over the bounce period of an equilibrium orbit in its equivalent one-dimensional potential. A closed-form solution and a solution based on a Fourier expansion are given. Explicit formulae are presented for Cartesian and cylindrical co-ordinates.

References

REFERENCES

Bromwich, T. J. I'a. 1949 An Introduction to the Theory of Infinite Series. Macmillan.Google Scholar

Lewis, H. R. & Symon, K. R. 1979 J. Math. Phys. 20, 413;Google Scholar

also, Erratum 1979 J. Math. Phys. 20, 2372.CrossRef Google Scholar

Lewis, H. R. & Turner, L. 1976 Nucl. Fusion, 16, 993.CrossRef Google Scholar

Schwarzmeier, J. L., Lewis, H. R., Abraram-Shrauner, B. & Symon, K. R. 1979 Phys. Fluids, 22, 1747.CrossRef Google Scholar

Seyler, C. E. 1979 Phys. Fluids, 22, 2324.Google Scholar

Seyler, C. E. & Freidberg, J. P. 1980 Phys. Fluids, 23, 331.Google Scholar

Symon, K. R., Seyler, C. E. & Lewis, H. R. 1982 J. Plasma Phys. 27, 13.Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Seyler, Charles E. and Lewis, H. Ralph 1982. Stability of Vlasov equilibria. Part 3. Models. Journal of Plasma Physics, Vol. 27, Issue. 1, p. 37.

Finn, J.M. and Sudan, R.N. 1982. Field-reversed configurations with a component of energetic particles. Nuclear Fusion, Vol. 22, Issue. 11, p. 1443.

Farengo, R. Lee, Y. C. and Guzdar, P. N. 1983. An electromagnetic integral equation: Application to microtearing modes. The Physics of Fluids, Vol. 26, Issue. 12, p. 3515.

Symon, K. R. 1983. Notes on the stability problem for inhomogeneous equilibria. Journal of Plasma Physics, Vol. 29, Issue. 2, p. 275.

Dominguez, R. R. and Berk, H. L. 1984. Variational structure of the Vlasov equation in multidimensional systems. The Physics of Fluids, Vol. 27, Issue. 5, p. 1142.

Åkerstedt, H O 1984. Velocity Shear Instabilition Associated with Plasma Motion Across a Magnetic Field. Physica Scripta, Vol. 29, Issue. 1, p. 75.

Agren, O and Persson, H 1984. MHD-like and kinetic equilibria of Extrap, multipoles and related configurations. Plasma Physics and Controlled Fusion, Vol. 26, Issue. 10, p. 1177.

Lewis, H.Ralph and Leach, P.G.L 1985. A resonance formulation for invariants of particle motion in a one-dimensional time-dependent potential. Annals of Physics, Vol. 164, Issue. 1, p. 47.

Schamel, Hans 1986. Electron holes, ion holes and double layers. Physics Reports, Vol. 140, Issue. 3, p. 161.

Lewis, H. Ralph 1986. A finite-Larmor-radius dispersion functional for the Vlasov-fluid model. The Physics of Fluids, Vol. 29, Issue. 6, p. 1860.

Åkerstedt, Hans O 1988. Finite Larmor radius effects on the stability properties of internal modes of aZ-pinch. Physica Scripta, Vol. 37, Issue. 1, p. 117.

Papanikolaou, P.G. and Choi, C.K. 1991. Plasma Stability Study for FRC Compact Torus. Fusion Technology, Vol. 19, Issue. 3P2A, p. 1317.

Papanikolaou, P. and Choi, C.K. 1992. A global method for burning plasma stability. p. 1140.

Brizard, Alain 1994. Eulerian action principles for linearized reduced dynamical equations. Physics of Plasmas, Vol. 1, Issue. 8, p. 2460.

Sicardi Schifino, A.C Ferro Fontán, C González, R and Costa, A 2004. On the thermodynamic origin of energy principles in plasma physics. Physica A: Statistical Mechanics and its Applications, Vol. 334, Issue. 1-2, p. 201.

Hutchinson, I. H. 2018. Transverse instability of electron phase-space holes in multi-dimensional Maxwellian plasmas. Journal of Plasma Physics, Vol. 84, Issue. 4,

Woo, M.-H. Dokgo, K. Yoon, Peter H. Lee, D.-Y. and Choi, Cheong R. 2018. Electrostatic odd symmetric eigenmode in inhomogeneous Bernstein-Greene-Kruskal equilibrium. Physics of Plasmas, Vol. 25, Issue. 4,

Chen, Xiang and Hutchinson, I.H. 2023. Multimode theory of electron hole transverse instability. Journal of Plasma Physics, Vol. 89, Issue. 1,

Article contents

Stability of Vlasov equilibria. Part 2. One non-ignorable co-ordinate

Extract

Access options

References

REFERENCES

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Article contents

Stability of Vlasov equilibria. Part 2. One non-ignorable co-ordinate

Extract

Access options

References

REFERENCES

Save article to Kindle

Save article to Dropbox

Save article to Google Drive

Reply to: Submit a response

Your details

You have entered the maximum number of contributors

Conflicting interests