On the convergence rate for the estimation of impulse response function in the space Lp(T)

Author:

Rozora I.1ORCID

Affiliation:

1. Taras Shevchenko National University of Kyiv

Abstract

The problem of estimation of a stochastic linear system has been a matter of active research for the last years. One of the simplest models considers a ‘black box’ with some input and a certain output. The input may be single or multiple and there is the same choice for the output. This generates a great amount of models that can be considered. The sphere of applications of these models is very extensive, ranging from signal processing and automatic control to econometrics (errors-in-variables models). In this paper a time-invariant continuous linear system is considered with a real-valued impulse response function. We assume that impulse function is square-integrable. Input signal is supposed to be Gaussian stationary stochastic process with known spectral density. A sample input–output cross-correlogram is taken as an estimator of the response function. An upper bound for the tail of the distribution of the estimation error is found that gives a convergence rate of estimator to impulse response function in the space Lp(T).

Publisher

Taras Shevchenko National University of Kyiv

Subject

Medical Assisting and Transcription,Medical Terminology

Reference9 articles.

1. BULDYGIN V., BLAZHIEVSKA I. (2010) Asymptotic properties of cross-correlogram estimators of impulse response functions in linear system Research // Bulletin of National Technical University of Ukraine "KPI", 4, 16–27.

2. BULDYGIN V., KUROTSCHKA V. (1999) On cross-coorrelogram estimators of the response function in continuous linear systems from discrete observations // Random Oper. and Stoch. Equ., 7, №1, 71–90.

3. BULDYGIN V., FU LI (1997) On asymptotic normality of an estimation of unit impulse responses of linear system I, II // Theor. Probability and Math. Statist., 54, 55, 3–17, 30–37.

4. BULDYGIN V., UTZET F., ZAIATS V. (2004) Asymptotic normality of crosscorrelogram estimators of the response function // Statistical Infernce for Stochastic Processes, 7, 1–34.

5. GIKHMAN I, SKOROKHOD, A. (1996) Introduction to the Theory of Random Processes, Dover Publication, 544 p.

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1. Sample continuity with probability one for the estimator of impulse response function;Bulletin of Taras Shevchenko National University of Kyiv. Series: Physics and Mathematics;2020

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