Linear estimating equations for exponential families with application to Gaussian linear concentration models
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Linear estimating equations for exponential families with application to Gaussian linear concentration models. / Forbes, Peter G.M. ; Lauritzen, Steffen L.
I: Linear Algebra and Its Applications, Bind 473, 2015, s. 261-283 .Publikation: Bidrag til tidsskrift › Tidsskriftartikel › Forskning › fagfællebedømt
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TY - JOUR
T1 - Linear estimating equations for exponential families with application to Gaussian linear concentration models
AU - Forbes, Peter G.M.
AU - Lauritzen, Steffen L.
PY - 2015
Y1 - 2015
N2 - In many families of distributions, maximum likelihood estimation is intractable because the normalization constant for the density which enters into the likelihood function is not easily available. The score matching estimator Hyvärinen (1905) provides an alternative where this normalization constant is not required. For an exponential family, e.g. a Gaussian linear concentration model, the corresponding estimating equations become linear (Almeida and Gidas 1993) and the score matching estimator is shown to be consistent and asymptotically normally distributed as the number of observations increase to infinity, although not necessarily efficient. For linear concentration models that are also linear in the covariance (Jensen 1988) we show that the score matching estimator is identical to the maximum likelihood estimator, hence in such cases it is also efficient. Gaussian graphical models and graphical models with symmetries (Højsgaard and Lauritzen 2008) form particularly interesting subclasses of linear concentration models and we investigate the potential use of the score matching estimator for this case.
AB - In many families of distributions, maximum likelihood estimation is intractable because the normalization constant for the density which enters into the likelihood function is not easily available. The score matching estimator Hyvärinen (1905) provides an alternative where this normalization constant is not required. For an exponential family, e.g. a Gaussian linear concentration model, the corresponding estimating equations become linear (Almeida and Gidas 1993) and the score matching estimator is shown to be consistent and asymptotically normally distributed as the number of observations increase to infinity, although not necessarily efficient. For linear concentration models that are also linear in the covariance (Jensen 1988) we show that the score matching estimator is identical to the maximum likelihood estimator, hence in such cases it is also efficient. Gaussian graphical models and graphical models with symmetries (Højsgaard and Lauritzen 2008) form particularly interesting subclasses of linear concentration models and we investigate the potential use of the score matching estimator for this case.
U2 - 10.1016/j.laa.2014.08.015
DO - 10.1016/j.laa.2014.08.015
M3 - Journal article
VL - 473
SP - 261
EP - 283
JO - Linear Algebra and Its Applications
JF - Linear Algebra and Its Applications
SN - 0024-3795
ER -
ID: 128111395