Block second-order Krylov subspace methods for large-scale quadratic eigenvalue problems
作者:
Highlights:
•
摘要
In this paper, we first introduce a block second-order Krylov subspace Gm1(A,B;Q1) based on a pair of square matrices A and B and an orthonormal matrix Q1. Then we present a block second-order Arnoldi procedure for generating an orthonormal basis of Gm1(A,B;Q1) and a block second-order biorthogonalization procedure for generating biorthonormal basis of Gm1(A,B;Q1) and Gm1(AT,BT;P1). By applying the projection techniques, we derive two block second-order Krylov subspace methods for solving a large-scale quadratic eigenvalue problem (QEP). These methods are applied to the QEP directly. Hence they preserve essential structures and properties of the QEP. Some theoretical results are given. Numerical experiments report the effectiveness of these methods.
论文关键词:Quadratic eigenvalue problem,Block second-order Krylov subspace,Block second-order Arnoldi procedure,Block second-order biorthogonalization procedure
论文评审过程:Available online 6 March 2006.
论文官网地址:https://doi.org/10.1016/j.amc.2005.12.054