Algebraic and Computational Aspects of Real Tensor Ranks 2016 Edition Contributor(s): Sakata, Toshio (Author), Sumi, Toshio (Author), Miyazaki, Mitsuhiro (Author) |
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ISBN: 4431554580 ISBN-13: 9784431554585 Publisher: Springer OUR PRICE: $52.24 Product Type: Paperback Published: March 2016 |
Additional Information |
BISAC Categories: - Mathematics | Probability & Statistics - General - Computers | Mathematical & Statistical Software - Social Science | Statistics |
Dewey: 519.5 |
Series: Springerbriefs in Statistics / Jss Research Series in Statis |
Physical Information: 0.25" H x 6.14" W x 9.21" (0.39 lbs) 108 pages |
Descriptions, Reviews, Etc. |
Publisher Description: This book provides comprehensive summaries of theoretical (algebraic) and computational aspects of tensor ranks, maximal ranks, and typical ranks, over the real number field. Although tensor ranks have been often argued in the complex number field, it should be emphasized that this book treats real tensor ranks, which have direct applications in statistics. The book provides several interesting ideas, including determinant polynomials, determinantal ideals, absolutely nonsingular tensors, absolutely full column rank tensors, and their connection to bilinear maps and Hurwitz-Radon numbers. In addition to reviews of methods to determine real tensor ranks in details, global theories such as the Jacobian method are also reviewed in details. The book includes as well an accessible and comprehensive introduction of mathematical backgrounds, with basics of positive polynomials and calculations by using the Groebner basis. Furthermore, this book provides insights into numerical methods of finding tensor ranks through simultaneous singular value decompositions. |