Structured perturbations of tridiagonal twisted Toeplitz matrices

Abstract

Twisted Toeplitz matrices constitute a generalization of Toeplitz matrices in the sense that the entries on each diagonal no longer need to be constant, but are given by the values of a continuous function on a partition of [0,1]. We study the limiting statistical distribution of the eigenvalues of matrices of the form Rn(a) = Tn(a) + σn Xn, where Tn(a) is a sequence of non-Hermitian tridiagonal twisted Toeplitz matrices, Xn is a sequence of tridiagonal random matrices whose entries have mean 0 and finite variance, and σn0. The limiting distribution turns out to be a two-dimensional measure which is in general different from the push-forward of the Lebesgue measure by the symbol. We also explain how the results could extend to banded non-Hermitian twisted Toeplitz matrices.