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Proceedings Paper

Discrete uninterrupted averaging in Taylor ergodic theorem
Author(s): V. V. Nosov; V. P. Lukin; E. V. Nosov; A. V. Torgaev
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Paper Abstract

Aspects of construction of random functions statistical performances for discrete-uninterrupted averaging have been investigated. At the averaging, which is usually realized in practice, every discrete sequence of random function empiric values is partially averaged by a certain interval of argument variation. The evaluations of dispersion convergence rate for deviation of time average from assembly average providing convergence in probability have been obtained. It is shown that evaluations of dispersion convergence rate depend on the integral scales of random function correlation. These scales are determined by a type of averaging. They differ for uninterrupted, discrete and discrete-uninterrupted averaging. Connections between them are established. Results of reconstruction of arbitrary correlation function parameters from the equation, which binds correlation functions of direct and partial averaged random processes, are listed. It is determined that a non-averaged process correlation function may be restored satisfactorily from partially averaged data, even at large intervals of partial averaging.

Paper Details

Date Published: 21 April 2006
PDF: 15 pages
Proc. SPIE 6160, Twelfth Joint International Symposium on Atmospheric and Ocean Optics/Atmospheric Physics, 616034 (21 April 2006); doi: 10.1117/12.675919
Show Author Affiliations
V. V. Nosov, Institute of Atmospheric Optics (Russia)
V. P. Lukin, Institute of Atmospheric Optics (Russia)
E. V. Nosov, Institute of Atmospheric Optics (Russia)
A. V. Torgaev, Institute of Atmospheric Optics (Russia)


Published in SPIE Proceedings Vol. 6160:
Twelfth Joint International Symposium on Atmospheric and Ocean Optics/Atmospheric Physics

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