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Let X₁, \, Xₘ; Y₁, \, Yₙ be independently distributed on the unit interval. Assume that the X's are uniformly distributed and that the Y's have an absolutely continuous distribution whose density g (y) is bounded and has at most finitely many discontinuities. Let Z₀ = 0, Z₍ + ₁ = 1, and let Z₁ 0. In Section 2 it is shown that \\n \ \ \\r \ 0 |Qₙ (r) - Q (r) | = 0 with probability one, where Q (r) = \ʳ \¹₀ ² (y) \\ + g (y) \^{r + 1}dy. This result may be used to prove consistency of certain tests of the hypothesis that the two samples have the same continuous distribution. Several such examples are given in Section 3. A further property of one of these tests is briefly discussed in Section 4.
Blum et al. (Fri,) studied this question.