论文信息 - On the convergence of an inverse iteration method for nonlinear elliptic eigenvalue problems

On the convergence of an inverse iteration method for nonlinear elliptic eigenvalue problems

SummaryIn recent years, a group of inverse iteration type algorithms have been developed for solving nonlinear elliptic eigenvalue problems in plasma physics [4]. Although these algorithms have been very successful in practice, no satisfactory theoretical justification of convergence has been available. The present paper fills this gap and proves for a large class of such problems and a simple version of such algorithms that linear convergence to a local maximum of a certain potential is obtained.

Kurt Georg | K. Georg

[1] M. Berger. An eigenvalue problem for nonlinear elliptic partial differential equations , 1965 .

[2] H. Amann. Fixed Point Equations and Nonlinear Eigenvalue Problems in Ordered Banach Spaces , 1976 .

[3] R. Meyer-Spasche. Numerical Treatment of Dirichlet Problems with Several Solutions , 1976 .

[4] F. Browder. Variational methods for nonlinear elliptic eigenvalue problems , 1965 .

[5] K. Lackner,et al. Computation of ideal MHD equilibria , 1976 .