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4 December 2000 Rhomboidal local cosine transform
Douglas W. Warner, Dennis M. Healy Jr., Daniel N. Rockmore
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Proceedings Volume 4119, Wavelet Applications in Signal and Image Processing VIII; (2000) https://doi.org/10.1117/12.408637
Event: International Symposium on Optical Science and Technology, 2000, San Diego, CA, United States
Abstract
In the work, we describe a method for constructing non- separable multidimensional folding operators and discuss preliminary obtained with a discrete rhomboidal local cosine transform. Our construction extends related work by Xia and Suter and Bernardini and Kovacevic by generalizing the definition of folding operators to include the use of non- abelian symmetry groups. A family of prototypical dihedral folding operators allows one to decompose L2(R2) into n subspaces supported on approximate equiangular sectors. We draw directly on the representation theory of finite groups, making use of the group algebra structure. The folding operators do not incorporate windows. Instead, the folding operators are constructed directly by using elements of the matrix group SO(2n).
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Douglas W. Warner, Dennis M. Healy Jr., and Daniel N. Rockmore "Rhomboidal local cosine transform", Proc. SPIE 4119, Wavelet Applications in Signal and Image Processing VIII, (4 December 2000); https://doi.org/10.1117/12.408637
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KEYWORDS
Dimension reduction
Image segmentation
Magnetic resonance imaging
Matrices
Magnetism
Image compression
Mathematics
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