On comparing several spectral densities

Mathematics and Statistics

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https://doi.org/10.1198/004017008000000244
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Keywords

Asymptotic theory, Information matrix, Likelihood ratio test, Linear process, Periodogram, Simulation, Stationary time series

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On comparing several spectral densities. / Fokianos, K.; Savvides, A.
In: Technometrics, Vol. 50, No. 3, 2008, p. 317-331.

Research output: Contribution to Journal/Magazine › Journal article › peer-review

Harvard

Fokianos, K & Savvides, A 2008, 'On comparing several spectral densities', Technometrics, vol. 50, no. 3, pp. 317-331. https://doi.org/10.1198/004017008000000244

APA

Fokianos, K., & Savvides, A. (2008). On comparing several spectral densities. Technometrics, 50(3), 317-331. https://doi.org/10.1198/004017008000000244

Vancouver

Fokianos K, Savvides A. On comparing several spectral densities. Technometrics. 2008;50(3):317-331. doi: 10.1198/004017008000000244

Author

Fokianos, K. ; Savvides, A. / On comparing several spectral densities. In: Technometrics. 2008 ; Vol. 50, No. 3. pp. 317-331.

Bibtex

@article{521f7e1af6a143c1ad6d1b6b16415004,

title = "On comparing several spectral densities",

abstract = "We investigated the problem of testing equality among spectral densities of several independent stationary processes. Our main methodological contribution is the introduction of a novel semiparametric log-linear model that links all of the spectral densities under consideration. This model is motivated by the asymptotic properties of the periodogram ordinates and specifies that the logarithmic ratio of G − 1 spectral density functions with respect to the Gth is linear in some parameters. Then the problem of testing equality of several spectral density functions is reduced to a parametric problem. Under this assumption, the large-sample theory of the maximum likelihood estimator was studied, and it was found that the estimator is asymptotically normal even when the model is misspecified. The development of the asymptotic theory is based on a new contrast function that might be useful for other spectral domain time series problems. The results are applicable to a variety of models, including linear and nonlinear processes. Simulations and data analysis support further the theoretical findings.",

keywords = "Asymptotic theory, Information matrix, Likelihood ratio test, Linear process, Periodogram, Simulation, Stationary time series",

author = "K. Fokianos and A. Savvides",

year = "2008",

doi = "10.1198/004017008000000244",

language = "English",

volume = "50",

pages = "317--331",

journal = "Technometrics",

issn = "0040-1706",

publisher = "American Statistical Association",

number = "3",

}

RIS

TY - JOUR

T1 - On comparing several spectral densities

AU - Fokianos, K.

AU - Savvides, A.

PY - 2008

Y1 - 2008

N2 - We investigated the problem of testing equality among spectral densities of several independent stationary processes. Our main methodological contribution is the introduction of a novel semiparametric log-linear model that links all of the spectral densities under consideration. This model is motivated by the asymptotic properties of the periodogram ordinates and specifies that the logarithmic ratio of G − 1 spectral density functions with respect to the Gth is linear in some parameters. Then the problem of testing equality of several spectral density functions is reduced to a parametric problem. Under this assumption, the large-sample theory of the maximum likelihood estimator was studied, and it was found that the estimator is asymptotically normal even when the model is misspecified. The development of the asymptotic theory is based on a new contrast function that might be useful for other spectral domain time series problems. The results are applicable to a variety of models, including linear and nonlinear processes. Simulations and data analysis support further the theoretical findings.

AB - We investigated the problem of testing equality among spectral densities of several independent stationary processes. Our main methodological contribution is the introduction of a novel semiparametric log-linear model that links all of the spectral densities under consideration. This model is motivated by the asymptotic properties of the periodogram ordinates and specifies that the logarithmic ratio of G − 1 spectral density functions with respect to the Gth is linear in some parameters. Then the problem of testing equality of several spectral density functions is reduced to a parametric problem. Under this assumption, the large-sample theory of the maximum likelihood estimator was studied, and it was found that the estimator is asymptotically normal even when the model is misspecified. The development of the asymptotic theory is based on a new contrast function that might be useful for other spectral domain time series problems. The results are applicable to a variety of models, including linear and nonlinear processes. Simulations and data analysis support further the theoretical findings.

KW - Asymptotic theory

KW - Information matrix

KW - Likelihood ratio test

KW - Linear process

KW - Periodogram

KW - Simulation

KW - Stationary time series

U2 - 10.1198/004017008000000244

DO - 10.1198/004017008000000244

M3 - Journal article

VL - 50

SP - 317

EP - 331

JO - Technometrics

JF - Technometrics

SN - 0040-1706

IS - 3

ER -

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