On a Test of Whether one of Two Random Variables is Stochastically Larger than the Other
Mann, H. B. ; Whitney, D. R.
Ann. Math. Statist., Tome 18 (1947) no. 4, p. 50-60 / Harvested from Project Euclid
Let $x$ and $y$ be two random variables with continuous cumulative distribution functions $f$ and $g$. A statistic $U$ depending on the relative ranks of the $x$'s and $y$'s is proposed for testing the hypothesis $f = g$. Wilcoxon proposed an equivalent test in the Biometrics Bulletin, December, 1945, but gave only a few points of the distribution of his statistic. Under the hypothesis $f = g$ the probability of obtaining a given $U$ in a sample of $n x's$ and $m y's$ is the solution of a certain recurrence relation involving $n$ and $m$. Using this recurrence relation tables have been computed giving the probability of $U$ for samples up to $n = m = 8$. At this point the distribution is almost normal. From the recurrence relation explicit expressions for the mean, variance, and fourth moment are obtained. The 2rth moment is shown to have a certain form which enabled us to prove that the limit distribution is normal if $m, n$ go to infinity in any arbitrary manner. The test is shown to be consistent with respect to the class of alternatives $f(x) > g(x)$ for every $x$.
Publié le : 1947-03-14
Classification: 
@article{1177730491,
     author = {Mann, H. B. and Whitney, D. R.},
     title = {On a Test of Whether one of Two Random Variables is Stochastically Larger than the Other},
     journal = {Ann. Math. Statist.},
     volume = {18},
     number = {4},
     year = {1947},
     pages = { 50-60},
     language = {en},
     url = {http://dml.mathdoc.fr/item/1177730491}
}
Mann, H. B.; Whitney, D. R. On a Test of Whether one of Two Random Variables is Stochastically Larger than the Other. Ann. Math. Statist., Tome 18 (1947) no. 4, pp.  50-60. http://gdmltest.u-ga.fr/item/1177730491/