Eigenvalues of one family of tridiagonal skew-self-adjoint Toeplitz matrices with complex perturbations on the corner

Abstract

In this paper, we study the eigenvalues of the matrices Tn(a)+γ En,1,1 where Tn(a) is the Toeplitz matrix with generating symbol a(t)=t-t-1, En,1,1 is the n× n matrix whose upper left component is 1 and the other components are zero, and γ is a fixed complex number such that 0<|γ|<1. As n∞, the eigenvalues of these matrices are asymptotically distributed as the function 2 i (x), x∈[0,2π]. Our main result is an asymptotic formula for every eigenvalue with a residue of the order O(1/n3).