Key points are not available for this paper at this time.
We are given independent random samples X₁, , Xₘ and Y₁, , Yₙ from populations with unknown cumulative distribution functions (cdf's) FX and FY, respectively. It is desired to test Hₒ: FX = FY against H₁: FX = G_, FY = G_, , R, where G_ is a specified family of cdf's (one for each), R is an interval on the real line, and are specified and very close to some specified value ₒ, and. A theorem of Hoeffding is used to show that the locally most powerful rank test (L. M. P. R. T. ) of Hₒ against H₁ is based on a linear rank statistic TN = (m) ^-1 N₈ = ₁ a₍₈Z₍₈, where Z₍₈ = 1 when the ith smallest of N = m + n observations is an X, and Z₍₈ = 0, otherwise, and the a₍₈ are given numbers. In a recent paper, Chernoff and Savage established the asymptotic normality of the test statistic TN, subject to some weak restrictions. The concept of asymptotic relative efficiency (A. R. E. ) was introduced by Pitman to compare sequences of tests. It was pointed out by Chernoff and Savage that the asymptotic efficiency of a sequence of tests can be established by means of a likelihood ratio test. Using this method, in conjunction with the theorem of Chernoff and Savage on asymptotic normality, it is shown that the L. M. P. R. T. of Hₒ against H₁ is asymptotically efficient. Several applications to Cauchy, exponential, and normal populations are given.
J. Capon (Wed,) studied this question.
Synapse has enriched 5 closely related papers on similar clinical questions. Consider them for comparative context: