Difference between revisions of "Spectral function, estimator of the"
From Encyclopedia of Mathematics
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''estimator of the spectral measure'' | ''estimator of the spectral measure'' | ||
| − | A function of the observed values | + | A function of the observed values $X(1),\dots,X(N)$ of a discrete-time [[Stationary stochastic process|stationary stochastic process]], used as an estimator of the [[Spectral function|spectral function]] $F(\lambda)$. As an estimator of this function one often uses an expression of the form |
| − | + | $$F_N(\lambda)=\frac{2\pi}{N}\sum_{-\pi\leq2\pi k/N\leq\lambda}I_N\left(\frac{2\pi k}{N}\right),$$ | |
| − | where | + | where $I_N(x)$ is the [[Periodogram|periodogram]]. Under fairly general smoothness conditions on $F(\lambda)$, or under mixing conditions on the random process $X(t)$, this estimator turns out to be asymptotically unbiased and consistent. |
| − | The above estimator of | + | The above estimator of $F(\lambda)$ is a special case of an estimator |
| − | + | $$\frac{2\pi}{N}\sum_{-\pi\leq2\pi k/N\leq\pi}A\left(\frac{2\pi k}{N}\right)I_N\left(\frac{2\pi k}{N}\right)$$ | |
of a function | of a function | ||
| − | + | $$I(A)=\int\limits_{-\pi}^\pi A(x)f(x)dx$$ | |
| − | of the spectral density | + | of the spectral density $f(\lambda)$. In particular, many estimators of the spectral density (cf. [[Spectral density, estimator of the|Spectral density, estimator of the]]) reduce to this form, where the function $A(x)$ depends on the size $N$ of the sample and is concentrated about the point $x=\lambda$. |
====References==== | ====References==== | ||
Latest revision as of 13:47, 27 August 2014
estimator of the spectral measure
A function of the observed values $X(1),\dots,X(N)$ of a discrete-time stationary stochastic process, used as an estimator of the spectral function $F(\lambda)$. As an estimator of this function one often uses an expression of the form
$$F_N(\lambda)=\frac{2\pi}{N}\sum_{-\pi\leq2\pi k/N\leq\lambda}I_N\left(\frac{2\pi k}{N}\right),$$
where $I_N(x)$ is the periodogram. Under fairly general smoothness conditions on $F(\lambda)$, or under mixing conditions on the random process $X(t)$, this estimator turns out to be asymptotically unbiased and consistent.
The above estimator of $F(\lambda)$ is a special case of an estimator
$$\frac{2\pi}{N}\sum_{-\pi\leq2\pi k/N\leq\pi}A\left(\frac{2\pi k}{N}\right)I_N\left(\frac{2\pi k}{N}\right)$$
of a function
$$I(A)=\int\limits_{-\pi}^\pi A(x)f(x)dx$$
of the spectral density $f(\lambda)$. In particular, many estimators of the spectral density (cf. Spectral density, estimator of the) reduce to this form, where the function $A(x)$ depends on the size $N$ of the sample and is concentrated about the point $x=\lambda$.
References
| [1] | D.R. Brillinger, "Time series. Data analysis and theory" , Holt, Rinehart & Winston (1975) |
| [2] | E.J. Hannan, "Multiple time series" , Wiley (1970) |
Comments
References
| [a1] | G.E.P. Box, G.M. Jenkins, "Time series analysis. Forecasting and control" , Holden-Day (1960) |
How to Cite This Entry:
Spectral function, estimator of the. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Spectral_function,_estimator_of_the&oldid=18632
Spectral function, estimator of the. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Spectral_function,_estimator_of_the&oldid=18632
This article was adapted from an original article by I.G. Zhurbenko (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article