Averaged Resistive MHD Equations
スポンサーリンク
概要
- 論文の詳細を見る
Averaged resistive MHD equations are derived by using the Lagrangian formalism. The assumption is that the perturbation is of single toroidal harmonics on the special magnetic coordinates Jacobian of which is independent of the toroidal angle. The metrics contained in the obtained resistive equations are those appearing in the averaged equilibrium equations. The local stability conditions are also derived.
- 社団法人日本物理学会の論文
- 1994-06-15
著者
関連論文
- Influence of Numerical Integration on Convergence of Eigenvalues in Magnetohydrodynamics Stability Analysis : Fluids, Plasmas, and Electric Discharges
- Averaged Resistive MHD Equations
- Comment to Paper Y. Nakamura et al."Study of MHD Equilibrium and Stability with Improve Stellarator Expansion Approach (STEP Code)"
- On the Lagrangian of the Linearized MHD Equations
- Theory of Longitudinal Adiabatic Invariant in the Helical Torus
- Adiabatic Invariant and Evaluation of Particle Loss in Helical Torus
- Integration Formula of the Magnetic Field Produced by the Finite Size Helical Coil with Arbitrary Polygonal Cross Section