ABSTRACT
Using the same argument as in the case of the T2-test, we can similarly show that the value of K which satisfies (8.97) is given by
where F(a, b; c; x) is the ordinary (2F1) hypergeometric series, given by
Giri and Kiefer (1964b) considered the case p=3, N=3 (or N=4 if µ is unknown). Proceeding exactly the same way as in the T2-test they showed that there exists a probability measure A whose derivative is given by
where z=Cd2, The reader is referred to the original references for details of the proof of (8.100) and the other results that follow in this section. Taking (8.100) for granted we have proved the following theorem.
