Structured eigenvalue condition numbers and linearizations for matrix polynomials

The connections between linearizations of regular matrix polynomials ZJ h) under shift and inversion of the parameter are developed and used to obtain a new formula for the realization of L(A)-'. In the self-adjoint case nondegenerate indefinite scalar products are obtained in which the fundamental

We define the condition operators and the condition numbers associated with a well-posed generalized eigenvalue problem, and we study the relationship between the condition numbers and the distance to the ill-posed problems.

This paper deals with the normwise perturbation theory for linear (Hermitian) matrix equations. The definition of condition number for the linear (Hermitian) matrix equations is presented. The lower and upper bounds for the condition number are derived. The estimation for the optimal backward pertur

We define and evaluate the normwise backward error and condition numbers for the multiparameter eigenvalue problem (MEP). The pseudospectrum for the MEP is defined and characterized. We show that the distance from a right definite MEP to the closest non right definite MEP is related to the smallest