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Cascade and lifting structures in the spectral domain for bipartite graph filter banks

conference contribution
posted on 2019-03-04, 00:00 authored by David TayDavid Tay, A Ortega, A Anis
© 2018 APSIPA organization. In classical multirate filter bank systems, the cascade (product) of simple polyphase matrices is an important technique for the theory, design and implementation of filter banks. A particularly important class of cascades uses elementary matrices and leads to the well known lifting scheme in wavelets. In this paper the theory and principles of cascade and lifting structures for bipartite graph filter banks are developed. Accurate spectral characterizations of these structures using equivalent subgraphs will be presented. Some features of the structures in the graph case, that are not present in the classical case, will be discussed.

History

Pagination

1141-1147

Location

Honolulu, Hawaii

Start date

2018-11-12

End date

2018-11-15

ISBN-13

9789881476852

Language

eng

Publication classification

E1 Full written paper - refereed

Copyright notice

2018, APSIPA organization

Title of proceedings

APSIPA ASC 2018 : Proceedings of the 10th Asia-Pacific Signal and Information Processing Association Annual Summit and Conference

Event

Signal and Information Processing Association. Annual Summit and Conference (10th : 2018 : Honolulu, Hawaii)

Publisher

IEEE

Place of publication

Piscataway, N.J.

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