Spectral features and asymptotic properties for alpha-circulants and alpha-Toeplitz sequences: theoretical results and examples

Abstract

For a given nonnegative integer alpha, a matrix An of size n is called alpha-Toeplitz if its entries obey the rule An=[ar-alpha*s]r,s=0n-1. Analogously, a matrix An again of size n is called alpha-circulant if An= [a(r-alpha*s)mod n]r,s=0n-1. Such kind of matrices arises in wavelet analysis, subdivision algorithms and more generally when dealing with multigrid/multilevel methods for structured matrices and approximations of boundary value problems. In this paper we study the singular values of alpha-circulants and we provide an asymptotic analysis of the distribution results for the singular values of alpha-Toeplitz sequences in the case where ak can be interpreted as the sequence of Fourier coeffcients of an integrable function f over the domain (-pi;pi). Some generalizations to the block, multilevel case, amounting to choose f multivariate and matrix valued, are briefly considered.