Inverse Spectral Problems for Linked Vibrating Systems and Structured Matrix Polynomials

Abstract

We show that for a given set of nk distinct real numbers λ1, λ2, …, λnk and k graphs on n nodes, G0, G1,…,Gk-1, there are real symmetric n× n matrices As, s=0,1,…, k, such that the matrix polynomial A(z) := Ak zk + ·s + A1 z + A0 has as its spectrum, the graph of As is Gs for s=0,1,…,k-1, and Ak is an arbitrary positive definite diagonal matrix. When k=2, this solves a physically significant inverse eigenvalue problem for linked vibrating systems (see Corollary 5.3).