Parseval Frames from Compressions of Cuntz Algebras

Abstract

A row co-isometry is a family (Vi)i=0N-1 of operators on a Hilbert space, subject to the relation Σi=0N-1ViVi*=I. As shown in BJK00, row co-isometries appear as compressions of representations of Cuntz algebras. In this paper we will present some general constructions of Parseval frames for Hilbert spaces, obtained by iterating the operators Vi on a finite set of vectors. The constructions are based on random walks on finite graphs. As applications of our constructions we obtain Parseval Fourier bases on self-affine measures and Parseval Walsh bases on the interval. abstract