On Some Inverse Eigenvalue Problems of Quadratic Palindromic Systems

Abstract

This paper concerns some inverse eigenvalue problems of the quadratic -(anti)-palindromic system Q(λ)=λ2 A1+λA0 + εA1, where ε= 1, A1, A0 ∈ Cn× n, A0=εA0, A1 is nonsingular, and the symbol is used as an abbreviation for transpose for real matrices and either transpose or conjugate transpose for complex matrices. By using the spectral decomposition of the quadratic -(anti)-palindromic system, the inverse eigenvalue problems with entire/partial eigenpairs given, and the model updating problems with no-spillover are considered. Some conditions on the solvabilities of these problems are given, and algorithms are proposed to find these solutions. These algorithms are illustrated by some numerical examples.