Maximum likelihood estimation for a bivariate Gaussian process under fixed domain asymptotics

Daira Velandia; François Bachoc; Moreno Bevilacqua; Xavier Gendre; Jean Michel Loubes

doi:10.1214/17-EJS1298

Maximum likelihood estimation for a bivariate Gaussian process under fixed domain asymptotics

Daira Velandia, François Bachoc, Moreno Bevilacqua, Xavier Gendre, Jean Michel Loubes

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2 Scopus citations

Abstract

We consider maximum likelihood estimation with data from a bivariate Gaussian process with a separable exponential covariance model under fixed domain asymptotics. We first characterize the equivalence of Gaussian measures under this model. Then consistency and asymptotic normality for the maximum likelihood estimator of the microergodic parameters are established. A simulation study is presented in order to compare the finite sample behavior of the maximum likelihood estimator with the given asymptotic distribution.

Original language	English
Pages (from-to)	2978-3007
Number of pages	30
Journal	Electronic Journal of Statistics
Volume	11
Issue number	2
DOIs	https://doi.org/10.1214/17-EJS1298
State	Published - 2017
Externally published	Yes

Keywords

Bivariate exponential model
Equivalent Gaussian measures
Infill asymptotics
Microergodic parameters

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10.1214/17-EJS1298

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abstract = "We consider maximum likelihood estimation with data from a bivariate Gaussian process with a separable exponential covariance model under fixed domain asymptotics. We first characterize the equivalence of Gaussian measures under this model. Then consistency and asymptotic normality for the maximum likelihood estimator of the microergodic parameters are established. A simulation study is presented in order to compare the finite sample behavior of the maximum likelihood estimator with the given asymptotic distribution.",

keywords = "Bivariate exponential model, Equivalent Gaussian measures, Infill asymptotics, Microergodic parameters",

author = "Daira Velandia and Fran{\c c}ois Bachoc and Moreno Bevilacqua and Xavier Gendre and Loubes, {Jean Michel}",

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AU - Bachoc, François

AU - Bevilacqua, Moreno

AU - Gendre, Xavier

AU - Loubes, Jean Michel

PY - 2017

Y1 - 2017

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AB - We consider maximum likelihood estimation with data from a bivariate Gaussian process with a separable exponential covariance model under fixed domain asymptotics. We first characterize the equivalence of Gaussian measures under this model. Then consistency and asymptotic normality for the maximum likelihood estimator of the microergodic parameters are established. A simulation study is presented in order to compare the finite sample behavior of the maximum likelihood estimator with the given asymptotic distribution.

KW - Bivariate exponential model

KW - Equivalent Gaussian measures

KW - Infill asymptotics

KW - Microergodic parameters

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DO - 10.1214/17-EJS1298

M3 - Article

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JO - Electronic Journal of Statistics

JF - Electronic Journal of Statistics

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ER -

Maximum likelihood estimation for a bivariate Gaussian process under fixed domain asymptotics

Abstract

Keywords

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