Kathy D. Merrill scite author profile

We consider wavelets in L^2(R^d) which have generalized multiresolutions. This means that the initial resolution subspace V_0 in L^2(R^d) is not singly generated. As a result, the representation of the integer lattice Z^d restricted to V_0 has a nontrivial multiplicity function. We show how the corresponding analysis and synthesis for these wavelets can be understood in terms of unitary-matrix-valued functions on a torus acting on a certain vector bundle. Specifically, we show how the wavelet functions on R^d can be constructed directly from the generalized wavelet filters.Comment: 34 pages, AMS-LaTeX ("amsproc" document class) v2 changes minor typos in Sections 1 and 4, v3 adds a number of references on GMRA theory and wavelet multiplicity analysis; v4 adds material on pages 2, 3, 5 and 10, and two more reference

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The construction of wavelets from generalized conjugate mirror filters in L2(Rn)

Baggett

Courter

Merrill

2002

Applied and Computational Harmonic Analysis

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Generalized Multiresolution Analyses with Given Multiplicity Functions

Baggett

Larsen

Merrill

et al. 2008

J Fourier Anal Appl

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Abstract. Generalized multiresolution analyses are increasing sequences of subspaces of a Hilbert space H that fail to be multiresolution analyses in the sense of wavelet theory because the core subspace does not have an orthonormal basis generated by a fixed scaling function. Previous authors have studied a multiplicity function m which, loosely speaking, measures the failure of the GMRA to be an MRA. When the Hilbert space H is L 2 (R n ), the possible multiplicity functions have been characterized by Baggett and Merrill. Here we start with a function m satisfying a consistency condition which is known to be necessary, and build a GMRA in an abstract Hilbert space with multiplicity function m.

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Cocycles on the Circle. II

Helson

Merrill

1988

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Kathy D. Merrill

Generalized multi-resolution analyses and a construction procedure for all wavelet sets in ?n

Construction of Parseval wavelets from redundant filter systems

The construction of wavelets from generalized conjugate mirror filters in L2(Rn)

Generalized Multiresolution Analyses with Given Multiplicity Functions

Cocycles on the Circle. II

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