We describe a numerical method for calculating the magnetohydrodynamic (MHD) spectrum of one-dimensional equilibria with Bow. Due to a general formulation, the spectrum for two different equilibrium geometries, viz. a plane slab and a cylinder, can be investigated. The linearised equations are discretised with a Finite Element Method. This results in a large non-Hermitian matrix eigenvalue problem, which can be solved using standard techniques. We present test cases for the method and new results on the effect of a sheared poloidal flow and a sheared magnetic field on the MHD spectrum. (C) 1997 Elsevier Science B.V.status: publishe
The ideal magnetohydrodynamic spectrum of gravitating plane plasmas with equilibrium flow is investi...
A new method of systematically constructing the full structure of the complex magnetohydrodynamic sp...
In this study, a Chebyshev spectral collocation method (CSCM) approximation is proposed for solving ...
We describe a numerical method for calculating the magnetohydrodynamic (MHD) spectrum of one-dimensi...
A recently proposed method to calculate the spectrum of linear, incompressible, unbounded plasma flo...
An eigenvalue problem is introduced for the magnetohydrodynamic (MHD) Stokes equations describing th...
For the solution of the generalized complex non-Hermitian eigenvalue problems Ax = lambda Bx occurri...
Magnetohydrodynamics is concerned with the motion of electrically conducting fluids in the presence ...
This thesis presents a finite element method for the solution of three-dimensional magnetohydrodynam...
The spectrum of incompressible waves and instabilities of two-dimensional plasma geometries with bac...
Abstract. The magnetohydrodynamic equations present two challenging algorithmic require-ments: that ...
Abstract. The magnetohydrodynamic equations present two challenging algorithmic require-ments: that ...
For the solution of the generalized complex non-Hermitian eigenvalue problems Ax = lambda Bx occurri...
Given any two-dimensional and incompressible flow described by a set of linear partial differential ...
The ideal magnetohydrodynamic (MHD) equations form a non-strictly hyperbolic system of conservation ...
The ideal magnetohydrodynamic spectrum of gravitating plane plasmas with equilibrium flow is investi...
A new method of systematically constructing the full structure of the complex magnetohydrodynamic sp...
In this study, a Chebyshev spectral collocation method (CSCM) approximation is proposed for solving ...
We describe a numerical method for calculating the magnetohydrodynamic (MHD) spectrum of one-dimensi...
A recently proposed method to calculate the spectrum of linear, incompressible, unbounded plasma flo...
An eigenvalue problem is introduced for the magnetohydrodynamic (MHD) Stokes equations describing th...
For the solution of the generalized complex non-Hermitian eigenvalue problems Ax = lambda Bx occurri...
Magnetohydrodynamics is concerned with the motion of electrically conducting fluids in the presence ...
This thesis presents a finite element method for the solution of three-dimensional magnetohydrodynam...
The spectrum of incompressible waves and instabilities of two-dimensional plasma geometries with bac...
Abstract. The magnetohydrodynamic equations present two challenging algorithmic require-ments: that ...
Abstract. The magnetohydrodynamic equations present two challenging algorithmic require-ments: that ...
For the solution of the generalized complex non-Hermitian eigenvalue problems Ax = lambda Bx occurri...
Given any two-dimensional and incompressible flow described by a set of linear partial differential ...
The ideal magnetohydrodynamic (MHD) equations form a non-strictly hyperbolic system of conservation ...
The ideal magnetohydrodynamic spectrum of gravitating plane plasmas with equilibrium flow is investi...
A new method of systematically constructing the full structure of the complex magnetohydrodynamic sp...
In this study, a Chebyshev spectral collocation method (CSCM) approximation is proposed for solving ...