On Jacket Matrices Based on Weighted Hadamard Matrices

Jacket matrices which are defined to be n×n matrices A=(ajk) over a field F with the property AA†=nIn where A† is the transpose matrix of elements inverse of was introduced by Lee in 1984 and are used for signal processing and coding theory, which generalized the Hadamard matrices and Center Weighte...

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Veröffentlicht in:Journal of Electromagnetic Engineering and Science 2007, 7(1), , pp.17-27
Hauptverfasser: Moon Ho Lee, Subash Shree Pokhrel, Chang-Hui Choe, Chang Joo Kim
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Sprache:eng
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Zusammenfassung:Jacket matrices which are defined to be n×n matrices A=(ajk) over a field F with the property AA†=nIn where A† is the transpose matrix of elements inverse of was introduced by Lee in 1984 and are used for signal processing and coding theory, which generalized the Hadamard matrices and Center Weighted Hadamard matrices. In this paper, some properties and constructions of Jacket matrices are extensively investigated and small orders of Jacket matrices are characterized, also present the full rate and the 1/2 code rate complex orthogonal space time code with full diversity. KCI Citation Count: 0
ISSN:2671-7255
2671-7263