Isometries, shifts, Cuntz algebras and multiresolution wavelet analysis of scale N

Abstract

In this paper we show how wavelets originating from multiresolution analysis of scale N give rise to certain representations of the Cuntz algebras ON, and conversely how the wavelets can be recovered from these representations. The representations are given on the Hilbert space L2(T) by (Si)(z)=mi(z)(zN). We characterize the Wold decomposition of such operators. If the operators come from wavelets they are shifts, and this can be used to realize the representation on a certain Hardy space over L2(T). This is used to compare the usual scale-2 theory of wavelets with the scale-N theory. Also some other representations of ON of the above form called diagonal representations are characterized and classified up to unitary equivalence by a homological invariant.

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