Multivariate Spectral Estimation Based on the Concept of Optimal Prediction

Author

Zorzi, Mattia

Author_Institution

Dipt. di Ing. dell´Inf., Univ. di Padova, Padua, Italy

Volume

60

Issue

6

fYear

2015

fDate

Jun-15

Firstpage

1647

Lastpage

1652

Abstract

In this technical note, we deal with a spectrum approximation problem arising in THREE-like multivariate spectral estimation approaches. The solution to the problem minimizes a suitable divergence index with respect to an a priori spectral density. We derive a new divergence family between multivariate spectral densities which takes root in the prediction theory. Under mild assumptions on the a priori spectral density, the approximation problem, based on this new divergence family, admits a family of solutions. Moreover, an upper bound on the complexity degree of these solutions is provided.

Keywords

approximation theory; prediction theory; spectral analysis; a priori spectral density; complexity degree; divergence family; divergence index; multivariate spectral densities; optimal prediction; prediction theory; spectrum approximation problem; three-like multivariate spectral estimation approaches; Approximation methods; Estimation; Indexes; Optimization; Prediction theory; Technological innovation; Upper bound; Convex optimization; Divergence family; Generalized covariance extension problem; Prediction theory; Spectrum approximation problem; divergence family; generalized covariance extension problem; prediction theory; spectrum approximation problem;

fLanguage

English

Journal_Title

Automatic Control, IEEE Transactions on

Publisher

ieee

ISSN

0018-9286

Type

jour

DOI

10.1109/TAC.2014.2359713

Filename

6909016