论文信息 - Split Levinson algorithm for Toeplitz matrices with singular sub-matrices

Split Levinson algorithm for Toeplitz matrices with singular sub-matrices

The split Levinson algorithm, which is computationally superior to the classical Levinson algorithm, is used for solving linear systems with real symmetric Toeplitz matrices, with no restriction on the ranks of their nested submatrices. The algorithm is based on the observation that the singular predictor polynomials are either the same as or closely related to the predictor polynomials when the corresponding Toeplitz submatrix is singular. A numerical example and a flowchart of the algorithm are presented to illustrate the proposed method. >

H. Krishna | M. K. Ciliz

[1] Philippe Delsarte,et al. A generalization of the Levinson algorithm for Hermitian Toeplitz matrices with any rank profile , 1985, IEEE Trans. Acoust. Speech Signal Process..

[2] H. Lev-Ari,et al. Levinson and Schur algorithms for Toeplitz matrices with singular minors , 1988, ICASSP-88., International Conference on Acoustics, Speech, and Signal Processing.

[3] J. L. Hock,et al. An exact recursion for the composite nearest‐neighbor degeneracy for a 2×N lattice space , 1984 .

[4] N. Levinson. The Wiener (Root Mean Square) Error Criterion in Filter Design and Prediction , 1946 .

[5] Philippe Delsarte,et al. The split Levinson algorithm , 1986, IEEE Trans. Acoust. Speech Signal Process..