Rational Krylov for Nonlinear Eigenproblems, an Iterative Projection Method

An accelerated subspace iteration for generalized eigenproblems is proposed by combining the repeated inverse iteration with the over-relaxation technique. Two schemes are developed to obtain an over-relaxation factor. Numerical results show that the proposed acceleration is ecient and numerically s

A general aqmptotic method based on the work of Krylov-Bogoliubov is developed to obtain the response of nonlinear over damped system. A second-order system with both roots real is treated first and the method is then extended to higher-order systems. ## Two illustrative examples show good agreem

In this paper, we propose a model reduction algorithm for approximation of large-scale linear timeinvariant dynamical systems. The method is a two-sided projection combining features of the singular value decomposition (SVD)-based and the Krylov-based model reduction techniques. While the SVD-side o

TO THE MEMORY OF PASQUALE PORCELLI A successive approximation process for a class of nth order nonlinear partial differential equations on EV,, is given. Analytic solutions are found by iteration. The pairing between initial estimates and limiting functions forms a basis for the study of boundary co