Atlas: Improved multivariate prediction in a general linear model with an unknown error covariance matrix by Anoop Chaturvedi

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International Conference on Statistics, Combinatorics and Related Areas - 7th International Conference of the Forum for Interdisciplinary Mathematics
December 19-21, 2000
Indian Institute of Technology-Bombay
Mumbai, Maharastra, India

Organizers
Satya N. Mishra (University of South Alabama), Sanjeev V. Sabnis (IIT, Bombay)

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Improved multivariate prediction in a general linear model with an unknown error covariance matrix
by
Anoop Chaturvedi
Department of Statistics, University of Allahabad, INDA
Coauthors: Alan T.K. Wan (Department of Management Sciences, City University of Hong Kong, HONG KONG), Shri P. Singh (University of Allahabad, India)

This paper deals with the problem of Stein rule prediction in a general linear model. Our study extends the work of Gotway and Cressie (1993) by assuming that the covariance matrix of the model's disturbances is unknown. Also predictions are based on a composite target function that incorporates allowance for the simultaneous predictions of the actual and average values of the target variable. We employ large sample asymptotic theory and derive and compare expressions for the bias vectors, mean squared error matrices and risks based on a quadratic loss structure of the Stein-rule and feasible best linear unbiased predictors. The results are applied to a model with first order autoregressive disturbances. Moreover, a Monte-Carlo experiment is conducted to explore the performance of the predictors in finite samples.

Date received: October 16, 2000