2010
DOI: 10.1016/j.jmva.2009.12.023
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Explicit estimators of parameters in the Growth Curve model with linearly structured covariance matrices

Abstract: a b s t r a c tEstimation of parameters in the classical Growth Curve model, when the covariance matrix has some specific linear structure, is considered. In our examples maximum likelihood estimators cannot be obtained explicitly and must rely on optimization algorithms. Therefore explicit estimators are obtained as alternatives to the maximum likelihood estimators. From a discussion about residuals, a simple non-iterative estimation procedure is suggested which gives explicit and consistent estimators of bot… Show more

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Cited by 17 publications
(10 citation statements)
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“…Thus, tests and estimates can also be obtained by a decomposition of the whole tensor space as done in Seid Hamid andvon Rosen (2006), von Rosen (1995) and Ohlson and von Rosen (2010).…”
Section: Modelmentioning
confidence: 99%
“…Thus, tests and estimates can also be obtained by a decomposition of the whole tensor space as done in Seid Hamid andvon Rosen (2006), von Rosen (1995) and Ohlson and von Rosen (2010).…”
Section: Modelmentioning
confidence: 99%
“…The paper by Ohlson and von Rosen (2010) was the first to propose a residual based procedure to obtain explicit estimators for an arbitrary linear structured covariance matrix in the classical growth curve model as an alternative to iterative methods. The idea in Ohlson and von Rosen (2010) was later on applied to the sum of two profiles model by Nzabanita et al (2012). The results in Nzabanita et al (2012) have been generalized to the extended GMANOVA model with an arbitrary number of profiles by Nzabanita et al (2015a).…”
Section: Explicit Estimators When the Covariance Matrix Is Linearly Smentioning
confidence: 99%
“…The paper [11] was the first to propose a residual based procedure to obtain explicit estimators for an arbitrary linear structured covariance matrix in the classical growth curve model as an alternative to iterative methods. The idea was later on applied to the sum of two profiles model in [12] and our aim here is to generalize results in [12] to the extended GMANOVA model with an arbitrary number of profiles.…”
Section: Introductionmentioning
confidence: 99%