A new structure-preserving method for quaternion Hermitian eigenvalue problems

We propose a new QR-like algorithm, symmetric squared QR (SSQR) method, that can be readily parallelized using commonly available parallel computational primitives such as matrix-matrix multiplication and QR decomposition. The algorithm converges quadratically and the quadratic convergence is achiev

In this Note we present the following result as a new tool for the study of nonlinear eigenvalue problems: Let X be a separable and reflexive real Banach space; Cp : X + R a lower semicontinuous convex functional; P : X + R a sequentially weakly lower semicontinuous functional. Assume that and limll

The discussion begins with the classification of eigenvalue problems arising from conservative and non-conservative structural systems. The conservative type includes undamped structural eigenvalue problems and undamped gyroscopic eigenvalue problems. The non-conservative type includes damped struct