Abstract
The magnetohydrodynamic variational principle is employed to calculate equilibrium and stability of toroidal plasmas without two-dimensional symmetry. Differential equations are solved in a conservation form that describes force balance correctly across islands that are treated as discontinuities. The method is applied to both stellarators and tokamaks, and comparison with observations is favorable in both cases. Sometimes the solution of the equations turns out not to be unique, and there exist bifurcated equilibria that are nonlinearly stable when other theories predict linear instability. The calculations are consistent with recent measurements of high values of the pressure in stellarators. For tokamaks we compute three-dimensionally asymmetric solutions that are subject to axially symmetric boundary conditions.
Citation
Paul Garabedian. "Bifurcated equilibria and magnetic islands in tokamaks and stellarators." Commun. Appl. Math. Comput. Sci. 1 (1) 79 - 89, 2006. https://doi.org/10.2140/camcos.2006.1.79
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