A Levinson Algorithm Based on an Isometric Transformation of Durbin´s

Author

Ramirez, M.A.

Author_Institution

Univ. of Sao Paulo, Sao Paulo

Volume

15

fYear

2008

fDate

6/30/1905 12:00:00 AM

Firstpage

99

Lastpage

102

Abstract

Starting from the Durbin algorithm in polynomial space with an inner product defined by the signal autocorrelation matrix, an isometric transformation is defined that maps this vector space into another one where the Levinson algorithm is performed. Alternatively, for iterative algorithms such as discrete all-pole (DAP), an efficient implementation of a Gohberg-Semencul (GS) relation is developed for the inversion of the autocorrelation matrix which considers its centrosymmetry. In the solution of the autocorrelation equations, the Levinson algorithm is found to be less complex operationally than the procedures based on GS inversion for up to a minimum of five iterations at various linear prediction (LP) orders.

Keywords

correlation methods; iterative methods; prediction theory; signal processing; Durbin algorithm; Gohberg-Semencul relation; Levinson algorithm; autocorrelation equations; isometric transformation; iterative algorithms; linear prediction orders; polynomial space; signal autocorrelation matrix; Algorithm design and analysis; Autocorrelation; Covariance matrix; Digital audio players; Iterative algorithms; Nonlinear equations; Polynomials; Signal processing algorithms; Speech coding; Symmetric matrices; AR models; Durbin algorithm; LP analysis; Levinson algorithm; discrete all-pole (DAP); linear prediction (LP);

fLanguage

English

Journal_Title

Signal Processing Letters, IEEE

Publisher

ieee

ISSN

1070-9908

Type

jour

DOI

10.1109/LSP.2007.910319

Filename

4418406