Moment problem formulation of the simplified ideal magnetohydrodynamics ballooning equation
- 1 March 1988
- journal article
- Published by AIP Publishing in Journal of Mathematical Physics
- Vol. 29 (3) , 717-720
- https://doi.org/10.1063/1.528012
Abstract
A fundamentally new method for determining the eigenvalues of linear differential operators is presented. The method involves the application of moment analysis and affords a fast and precise numerical algorithm for eigenvalue computation, particularly in the intermediate and strong coupling regimes. The most remarkable feature of this approach is that it provides exponentially converging lower and upper bounds to the eigenvalues. The effectiveness of this method is demonstrated by applying it to an important magnetohydrodynamics problem recently studied by Paris, Auby, and Dagazian [J. Math. Phys. 27, 2188 (1986)]. Through the very precise lower and upper bounds obtained, this approach gives full support to their analysis.Keywords
This publication has 5 references indexed in Scilit:
- Hydrogenic atoms in the external potential V(r)=gr+λr2: exact solutions and ground-state eigenvalue bounds using moment methodsJournal of Physics A: General Physics, 1987
- The eigenvalues of the simplified ideal MHD ballooning equationJournal of Mathematical Physics, 1986
- Hankel-Hadamard analysis of quantum potential x2+λx2/(1+gx2)Journal of Physics A: General Physics, 1985
- Rapidly Convergent Lower Bounds for the Schrödinger-Equation Ground-State EnergyPhysical Review Letters, 1985
- Perturbative study of the spectrum of large toroidal mode number ideal MHD instabilitiesPlasma Physics, 1982