Extension of Stellarator Approximation in Magnetohydrodynamic Equilibrium and Stability of Toroidal Helical Systems.

概要

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Formulation is made to solve three dimensional MHD equilibrium problem on the basis of the coordinate transformation. The three dimensional problem is divided into three steps : 1) the hyperbolic equations to determine the coordinate transformation, 2) averaged equation in two dimension, and 3) the three dimensional elliptic equation to deal with magnetic potential. The usual stellarator approximation or averaging method is regarded as the first step of the iteration procedure to get the solution of the full three dimensional problems. In formulating linear stability problem, the stellarator ordering is required; the resonance effect should be omitted in the averaging formulation. Some comparison is made to check the validity of the above formulation.
核融合科学研究所の論文
1989-04-00