Similar tests for covariance structures in multivariate linear models

The null hypothesis that the error vectors in a multivariate linear model are independent is tested against the alternative hypothesis that they are dependent in some specified manner. This dependence is assumed to be due to common random components or autocorrelation over time. The testing problem

Consider the multivariate linear model for the random matrix Y n\_p t MN(XB, V 7), where B is the parameter matrix, X is a model matrix, not necessarily of full rank, and V 7 is an np\_np positive-definite dispersion matrix. This paper presents sufficient conditions on the positive-definite matrix V

## Abstract In multivariate time series, estimation of the covariance matrix of observation innovations plays an important role in forecasting as it enables computation of standardized forecast error vectors as well as the computation of confidence bounds of forecasts. We develop an online, non‐ite

A class of independent multivariate linear models is considered, having a common parameter matrix \(\theta\) in their means, but having different covariance matrices. For testing \(H_{0}: \Theta=0\), some test procedures are derived, which combine the information from the different models. In the co