Eigenvalue contour lines of Kac-Murdock-Szego matrices with a complex parameter

Abstract

A previous paper studied the so-called borderline curves of the Kac--Murdock--Szego matrix Kn()=[|j-k|]j,k=1n, where ∈C. These are the level curves (contour lines) in the complex- plane on which Kn() has a type-1 or type-2 eigenvalue of magnitude n, where n is the matrix dimension. Those curves have cusps at all critical points =c at which multiple (double) eigenvalues occur. The present paper determines corresponding curves pertaining to eigenvalues of magnitude N n. We find that these curves no longer present cusps; and that, when N<n, the cusps have in a sense transformed into loops. We discuss the meaning of the winding numbers of our curves. Finally, we point out possible extensions to more general matrices.