On the eigenvalues of Toeplitz matrices with two off-diagonals

Abstract

Consider the Toeplitz matrix Tn(f) generated by the symbol f(θ)=fr eirθ+f0+f-s e-isθ, where fr, f0, f-s ∈ C and 0<r<n,~0<s<n. For r=s=1 we have the classical tridiagonal Toeplitz matrices, for which the eigenvalues and eigenvectors are known. Similarly, the eigendecompositions are known for 1<r=s, when the generated matrices are ``symmetrically sparse tridiagonal''. In the current paper we study the eigenvalues of Tn(f) for 1≤ r<s, which are ``non-symmetrically sparse tridiagonal''. We propose an algorithm which constructs one or two ad hoc matrices smaller than Tn(f), whose eigenvalues are sufficient for determining the full spectrum of Tn(f). The algorithm is explained through use of a conjecture for which examples and numerical experiments are reported for supporting it and for clarifying the presentation. Open problems are briefly discussed.