Author(s): |
Yi-Gang Cen, Institute of Information Science, Beijing Jiaotong University, Beijing, 100044 Li-Hui Cen, Institute of Information Science and Engineering, Central South University, Hunan, Changsha, 410083 Shi-Ming Chen, School of Electrical and Electronic Engineering, East China Jiao Tong University, Jiangxi, Nanchang, 330013 Dan Tao, School of Electronic and Information Engineering, Beijing Jiaotong University, Beijing, 100044 |
Abstract: |
Polyphase matrix extension is a fundamental approach for the construction of compactly supported biorthogonal multiwavelets, but there are no explicit formulas available so far. In this paper, based on the canonical forms of polyphase matrices of scaling vectors, a novel abstract algebraic approach over the Laurent polynomial ring (denoted as R[z]) has been developed so that closed-form solution can be obtained for the construction of compactly supported biorthogonal multiwavelets. Moreover, via the multiplications of unimodular square matrices over R[z], the relationship between any two different extensions for the same scaling vectors can be obtained from one to another, which leads to a complete solution set for the polyphase matrix extension problem.
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