Eigenvalue bifurcations in Kac-Murdock-Szego matrices with a complex parameter

Abstract

For complex , the spectral properties of the Toeplitz matrix Kn()=[|j-k|]j,k=1n, often called the Kac-Murdock-Szeg matrix, have been examined in detail in two recent papers. The second paper, in particular, introduced the concept of borderline curves. These are two closed curves in the complex- plane that consist of all the for which Kn() possesses some eigenvalue whose magnitude equals the matrix dimension n. The purpose of the present paper is to examine eigenvalue bifurcations in both a qualitative and a quantitative manner, and to discuss connections between bifurcations and the borderline curves.