Hadamard Matrix Analysis and Synthesis (Hardcover)
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|Hadamard Matrix Analysis and Synthesis: With Applications to Communications and Signal/Image Processing presents the basic concepts of Sylvesters construction of Hadamard matrices, the eigenvalue-eigenvector decompositions, along with its relationship to Fourier transforms. Relevant computational structures are included for those interested in implementing the Hadamard transform. The 2-dimensional Hadamard transform is discussed in terms of a 1- dimensional transform. The applications presented touch on statistics, error correction coding theory, communications signaling, Boolean function analysis and synthesis, image processing, sequence theory (maximal length binary sequences, composite sequences, and Thue-Morse sequences) and signal representation. An interesting application of the Hadamard transform to images is the Naturalness Preserving Transform (NPT), which is presented. The NPT provides a way to encode an image that can be reconstructed when it is transmitted through a noisy or an unfriendly channel. The potential applications of the Hadamard transform are wide and the book samples many of the important concepts among a vast field of applications of the transform. Hadamard Matrix Analysis and Synthesis: With Applications to Communications and Signal/Image Processing serves as an excellent reference source and may be used as a text for advanced courses on the topic. *Author: Yarlagadda, Rao K./ Hershey, John E./ Yarlagadda, R. K. Rao *Series Title: Kluwer International Series in Engineering & Computer Science *Series Number: 383 *Binding Type: Hardcover *Number of Pages: 136 *Publication Date: 1996/11/30 *Language: English *Dimensions: 9.21 x 6.14 x 0.44 inches|
From the Publisher:
Focuses on the specific Hadamard matrix constructed by Kronecker but known as the Sylvester construction after J. J. Sylvester, who foreshadowed it in his 1867 publication. Reviews Kronecker matrix algebra as the basis of the construction, defines and explores some basic properties, considers the Sylvester version, defines the Hadamard transform and elaborates on its fast implementation, looks at relevant computational structures, and surveys its applications in a wide range of fields. Annotation c. by Book News, Inc., Portland, Or.