Title of article
Building adaptive estimating equations when inverse of covariance estimation is difficult
Author/Authors
A.، Qu نويسنده , , B.G.، Lindsay نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2003
Pages
-126
From page
127
To page
0
Abstract
To construct an optimal estimating function by weighting a set of score functions, we must either know or estimate consistently the covariance matrix for the individual scores. In problems with high dimensional correlated data the estimated covariance matrix could be unreliable. The smallest eigenvalues of the covariance matrix will be the most important for weighting the estimating equations, but in high dimensions these will be poorly determined. Generalized estimating equations introduced the idea of a working correlation to minimize such problems. However, it can be difficult to specify the working correlation model correctly. We develop an adaptive estimating equation method which requires no working correlation assumptions. This methodology relies on finding a reliable approximation to the inverse of the variance matrix in the quasi–likelihood equations. We apply a multivariate generalization of the conjugate gradient method to find estimating equations that preserve the information well at fixed low dimensions. This approach is particularly useful when the estimator of the covariance matrix is singular or close to singular, or impossible to invert owing to its large size.
Keywords
PM(lambda),(tau) policy , finite dam , compound Poisson input , long-run average cost
Journal title
Journal of Royal Statistical Society (Series B)
Serial Year
2003
Journal title
Journal of Royal Statistical Society (Series B)
Record number
85050
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