Spectral Distribution in the Eigenvalues Sequence of Products of g-Toeplitz Structures

Abstract

Starting from the definition of an n× n g-Toeplitz matrix, Tn,g(u)=[ur-gs]r,s=0n-1, where g is a given nonnegative parameter, \uk\ is the sequence of Fourier coefficients of the Lebesgue integrable function u defined over the domain T=(-π,π], we consider the product of g-Toeplitz sequences of matrices, \Tn,g(f1)Tn,g(f2)\, which extends the product of Toeplitz structures, \Tn(f1)Tn(f2)\, in the case where the symbols f1,f2∈ L∞(T). Under suitable assumptions, the spectral distribution in the eigenvalues sequence is completely characterized for the products of g-Toeplitz structures. Specifically, for g≥2 our result shows that the sequences \Tn,g(f1)Tn,g(f2)\ are clustered to zero. This extends the well-known result, which concerns the classical case (that is, g=1) of products of Toeplitz matrices. Finally, a large set of numerical examples confirming the theoretic analysis is presented and discussed.