Symmetric Paraunitary Matrix Extension and Parametrization of Symmetric Orthogonal Multifilter Banks

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Abstract

This paper is devoted to a study of symmetric paraunitary matrix extensions. The problem for a given compactly supported orthonormal scaling vector with some symmetric property, to construct a corresponding multiwavelet which also has the symmetric property, is equivalent to the symmetric paraunitary extension of a given matrix. In this paper we study symmetric paraunitary extensions of two types of matrices which correspond to two different cases for the symmetry of the scaling vector: the components of the scaling vector have or don't have the same symmetric center. In this paper we also discuss parametrizations of symmetric orthogonal multifilter banks.
Original languageAmerican English
JournalSIAM Journal on Matrix Analysis and Applications
Volume23
DOIs
StatePublished - 2001

Disciplines

  • Physical Sciences and Mathematics

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