Kolmogorov–Zurbenko filter について

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・ Kolmogorov equations (Markov jump process)
・ Kolmogorov extension theorem
・ Kolmogorov integral
・ Kolmogorov microscales
・ Kolmogorov space
・ Kolmogorov structure function
・ Kolmogorov's criterion
・ Kolmogorov's inequality
・ Kolmogorov's theorem
・ Kolmogorov's three-series theorem
・ Kolmogorov's two-series theorem
・ Kolmogorov's zero–one law
・ Kolmogorov–Arnold representation theorem
・ Kolmogorov–Arnold–Moser theorem
・ Kolmogorov–Smirnov test
・ Kolmogorov–Zurbenko filter
・ Kolmonen
・ Kolmoskanava
・ Kolmätargränd
・ Kolmården
・ Kolmården Tropicarium
・ Kolmården Wildlife Park
・ KOLN
・ Kolnadu
・ Kolnago Ferante
・ Kolnes
・ Kolnica
・ Kolnica, Gmina Brudzew
・ Kolnica, Gmina Malanów
・ Kolnica, Opole Voivodeship

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Kolmogorov–Zurbenko filter ：ウィキペディア英語版

Kolmogorov–Zurbenko filter

The Kolmogorov–Zurbenko (KZ) Filter was first proposed by A. N. Kolmogorov and formally defined by Zurbenko⁽⁾. It is a series of iterations of a moving average filter of length ''m'', where ''m'' is a positive, odd integer number. The KZ filter belongs to the class of Low-pass filters. The KZ filter has two parameters, the length ''m'' of the moving average window and the number of iterations ''k'' of the moving average itself. It also can be considered as a special window function designed to eliminate spectral leakage.
==Background==
A. N. Kolmogorov had the original idea for the KZ filter during a study of turbulence in the Pacific Ocean⁽⁾. Kolmogorov had just received the International Balzan Prize for his law of 5/3 in the energy spectra of turbulence. Surprisingly the 5/3 law was not obeyed in the Pacific Ocean, causing great concern. Standard Fast Fourier Transform (FFT) was completely fooled by the noisy and non-stationary ocean environment. KZ filtration resolved the problem and enabled proof of Kolmogorov's law in that domain. Filter construction relied on the main concepts of the continuous Fourier transform and their discrete analogues. The algorithm of the KZ filter came from the definition of higher-order derivatives for discrete functions as higher-order differences. Believing that infinite smoothness in the Gaussian window was a beautiful but unrealistic approximation of a truly discrete world, Kolmogorov chose a finitely differentiable tapering window with finite support, and created this mathematical construction for the discrete case⁽⁾. The KZ filter is robust and nearly optimal. Because its operation is a simple Moving Average (MA), the KZ filter performs well in a missing data environment, especially in multidimensional time series where missing data problem arises from spatial sparseness. Another nice feature of the KZ filter is that the two parameters have clear interpretation so that it can be easily adopted by specialists in different areas. A few software packages for time series, longitudinal and spatial data have been developed in the popular statistical software R, which facilitate the use of the KZ filter and its extensions in different areas.

抄文引用元・出典: フリー百科事典『ウィキペディア（Wikipedia）』
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