Title :
Exact trigonometric superfast inverse covariance representations
Author_Institution :
Dept. of Electron. & Comput. Eng., Univ. Fed. do Rio de Janeiro, Rio de Janeiro, Brazil
Abstract :
This paper shows that superfast inverse covariance representations are not limited to DFT based formulas, and can be obtained similarly for trigonometric transforms, such as discrete cosine and discrete sine matrices. Unlike commonly implied by some authors, the use of real transforms does not depend on any symmetry condition in the columns of the corresponding data matrix. This result follows the state-of-the-art of the displacement approach to matrices in connection to recurrence polynomial realizations, where the choice of Chebyshev bases leads to DCT/DST decompositions, directly applicable to block frequency-domain equalization using real data.
Keywords :
covariance matrices; decomposition; discrete Fourier transforms; discrete cosine transforms; equalisers; frequency-domain analysis; inverse transforms; polynomial matrices; Chebyshev base; DCT-DST decomposition; DFT; data matrix; discrete cosine matrix; discrete sine matrix; exact trigonometric superfast inverse covariance representation; frequency-domain equalization; recurrence polynomial realization; trigonometric transform; Chebyshev approximation; Covariance matrices; Discrete cosine transforms; Matrix decomposition; Polynomials; Vectors;
Conference_Titel :
Computing, Networking and Communications (ICNC), 2013 International Conference on
Conference_Location :
San Diego, CA
Print_ISBN :
978-1-4673-5287-1
Electronic_ISBN :
978-1-4673-5286-4
DOI :
10.1109/ICCNC.2013.6504134
