Structured backward error analysis for sparse polynomial eigenvalue problems

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摘要

We study a backward error analysis for (structured) polynomial eigenvalue problems in homogeneous form arising in practical applications. The perturbation matrices preserve the sparsity as well as other structures, including symmetry, skew-symmetry, Hermite, skew-Hermite. We construct structured perturbation matrices of minimal Frobenius norm such that an approximate eigenpair is an exact eigenpair of the structured perturbed polynomial eigenvalue problem. This work is a complement of previous work for the polynomial eigenvalue problems in homogeneous form.

论文关键词:Backward error,Structured polynomial eigenvalue problem,Sparsity,Zero-preserved,(skew-)Symmetric,(skew-)Hermitian,Homogeneous form

论文评审过程:Available online 24 October 2012.

论文官网地址:https://doi.org/10.1016/j.amc.2012.09.035