Structured eigenvalue backward errors for rational matrix polynomials with symmetry structures
Abstract
We derive computable formulas for the structured backward errors of a complex number λ when considered as an approximate eigenvalue of rational matrix polynomials that carry a symmetry structure. We consider symmetric, skew-symmetric, T-even, T-odd, Hermitian, skew-Hermitian, *-even, *-odd, and *-palindromic structures. Numerical experiments show that the backward errors with respect to structure-preserving and arbitrary perturbations are significantly different.
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