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Orthogonal designs: Hadamard matrices, quadratic forms and algebras

Book


Abstract


  • © Springer International Publishing AG 2017. Orthogonal designs have proved fundamental to constructing code division multiple antenna systems for more efficient mobile communications. Starting with basic theory, this book develops the algebra and combinatorics to create new communications modes. Intended primarily for researchers, it is also useful for graduate students wanting to understand some of the current communications coding theories.

Publication Date


  • 2017

Citation


  • Seberry, J. (2017). Orthogonal designs: Hadamard matrices, quadratic forms and algebras. Swwitzerland: Springer International Publishing.

International Standard Book Number (isbn) 13


  • 9783319590325

Scopus Eid


  • 2-s2.0-85042725260

Ro Metadata Url


  • http://ro.uow.edu.au/eispapers1/1356

Number Of Pages


  • 453

Place Of Publication


  • Swwitzerland

Abstract


  • © Springer International Publishing AG 2017. Orthogonal designs have proved fundamental to constructing code division multiple antenna systems for more efficient mobile communications. Starting with basic theory, this book develops the algebra and combinatorics to create new communications modes. Intended primarily for researchers, it is also useful for graduate students wanting to understand some of the current communications coding theories.

Publication Date


  • 2017

Citation


  • Seberry, J. (2017). Orthogonal designs: Hadamard matrices, quadratic forms and algebras. Swwitzerland: Springer International Publishing.

International Standard Book Number (isbn) 13


  • 9783319590325

Scopus Eid


  • 2-s2.0-85042725260

Ro Metadata Url


  • http://ro.uow.edu.au/eispapers1/1356

Number Of Pages


  • 453

Place Of Publication


  • Swwitzerland