مرکز منطقه ای اطلاع رساني علوم و فناوري - On the nonstationary covariance realization problem

DocumentCode :

830719

Title :

On the nonstationary covariance realization problem

Author :

Goodrich, R.L. ; Caines, P.E.

Author_Institution :

Harvard Univeristy, Cambridge, MA, USA

Volume :

Issue :

fYear :

1979

fDate :

10/1/1979 12:00:00 AM

Firstpage :

765

Lastpage :

770

Abstract :

This paper contains an algebraic result in system identifiability which is fundamental to the results of [1] concerning the maximum likelihood identification of the parameters of linear time-invariant systems from nonstationary cross sectional data. Let $Z_{1}^{T}$ denote the random vector of $T$ distinct $p$ -component output values of the nonstationary output sample of a linear time-invariant stochastic system, and let the parameterized covariance matrix of $z_{1}^{T}$ be denoted by $\\Sigma _{T}(\\theta)$ for $\\theta \\in \\Theta \\subset R^{v}$ . We say that $\\theta$ is locally identifiable $(T, N_{\\theta})$ if the map $\\Sigma _{T}(\\cdot): \\theta \\rightarrow R^{P} (p=pT(pT+ 1)/2)$ is one-to-one in the neighborhood $N_{\\theta}$ of $\\theta$ . Among other results we show that under a nonstationarity condition $\\theta$ is locally identifiable $(d+2, N_{\\theta})$ , where $d$ is the degree of the minimal polynomial of the state transition matrix of the system. This is established by explicitly constructing a wide-sense state space stochastic realization of $z$ from $\\Sigma _{T}(\\theta)$ in observable canonical form with state dimension $pd$ . The intimate connections between these results and the standard results [13]-[15] concerning the (wide-sense) realization of stationary processes from their covariance matrices are described.

Keywords :

Linear systems, stochastic discrete-time; Parameter identification; Prediction methods; System identification; maximum-likelihood (ML) estimation; Convergence; Covariance matrix; Gaussian processes; Maximum likelihood estimation; Polynomials; State-space methods; Stochastic processes; Stochastic systems; System identification; Vectors;

fLanguage :

English

Journal_Title :

Automatic Control, IEEE Transactions on

Publisher :

ieee

ISSN :

0018-9286

Type :

jour

DOI :

10.1109/TAC.1979.1102168

Filename :

1102168

Link To Document :

https://search.ricest.ac.ir/dl/search/defaultta.aspx?DTC=49&DC=830719