On vector-valued orthogonal wavelets

Xiang Gen Xia, Bruce W. Suter

Research output: Contribution to journalConference articlepeer-review

Abstract

In this research, we introduce vector-valued multiresolution analysis and vector-valued wavelets for vector-valued signal spaces. We construct vector-valued wavelets by using paraunitary vector filter bank theory. In particular, we construct vector-valued Meyer wavelets that are band-limited. We classify and construct vector-valued wavelets with sampling property. As an application of vector-valued wavelets, multiwavelets can be constructed from vector-valued wavelets. We show that certain linear combinations of known scalar-valued wavelets may yield multiwavelets. We then present discrete vector wavelet transforms for discrete-time vector-valued (or blocked) signals, which can be thought of as a family of unitary vector transforms. In applications of vector wavelet transforms in two dimensional transform theory, the nonseparability can be easily handled.

Original languageEnglish
Pages (from-to)903-914
Number of pages12
JournalProceedings of SPIE - The International Society for Optical Engineering
Volume2491
DOIs
Publication statusPublished - 6 Apr 1995
Externally publishedYes
EventWavelet Applications II 1995 - Orlando, United States
Duration: 17 Apr 199521 Apr 1995

Keywords

  • Vector-valued multiresolution analysis
  • Vector-valued wavelets

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