von Rosen, Dietrich
- Department of Energy and Technology, Swedish University of Agricultural Sciences
- Linköping University
Research article2022Peer reviewed
Imori, Shinpei; von Rosen, Dietrich; Oda, Ryoya
In the present paper, we derive a new multivariate model to fit correlated data, representing a general model class. Our model is an extension of the Growth Curve model (also called generalized multivariate analysis of variance model) by additionally assuming randomness of regression coefficients like in linear mixed models. Each random coefficient has a linear or a bilinear form with respect to explanatory variables. In our model, the covariance matrices of the random coefficients is allowed to be singular. This yields flexible covariance structures of response data but the parameter space includes a boundary, and thus maximum likelihood estimators (MLEs) of the unknown parameters have more complicated forms than the ordinary Growth Curve model. We derive the MLEs in the proposed model by solving an optimization problem, and derive sufficient conditions for consistency of the MLEs. Through simulation studies, we confirmed performance of the MLEs when the sample size and the size of the response variable are large.
Consistency; Growth curve model; Maximum likelihood estimators; Random coefficients
Sankhya A - Mathematical Statistics and Probability
2022, Volume: 84, number: 2, pages: 477-508 Publisher: SPRINGER
Probability Theory and Statistics
DOI: https://doi.org/10.1007/s13171-020-00204-5
https://res.slu.se/id/publ/123364