โ Scribed by S.A. Andersson; M.D. Perlman
No coin nor oath required. For personal study only.
๐ SIMILAR VOLUMES
There was an error in Hansen (1992). I am very grateful to James Hamilton for pointing out the error. Equations ( 2) and (3) in the original read where Q ( a ) is a mean zero Gaussian process with covariance function K(ai, a21 = E(q;(ai)~i(ad). While equation ( 2) is correct, (3) is not. Instead,
Bounds are obtained on the limiting size of the nominal level- \(\alpha\) likelihood ratio test of independence in a \(r \times c\) contingency table. The situations considered include sampling with both marginal totals random and with one margin fixed. Upper and lower bounds are obtained. The limit
We prove that the power function of the likelihood ratio test for MANOVA attains its minimum when the rank of the location parameter matrix G decreases from s to 1. This provides a theoretical justification of a result that is known in the literature based only on numerical studies.