A generalized inverse eigenvalue problem and m-functions

Abstract

In this manuscript, a generalized inverse eigenvalue problem is considered that involves a linear pencil (zJ[0,n]-H[0,n]) of matrices arising in the theory of rational interpolation and biorthogonal rational functions. In addition to the reconstruction of the Hermitian matrix H[0,n] with the entries bj's, characterizations of the rational functions that are components of the prescribed eigenvectors are given. A condition concerning the positive-definiteness of J[0,n] and which is often an assumption in the direct problem is also isolated. Further, the reconstruction of H[0,n] is viewed through the inverse of the pencil (zJ[0,n]-H[0,n]) which involves the concept of m-functions.