Tables for the two-sample Haga test of location
Applications of Mathematics, Tome 23 (1978) no. 4, pp. 237-247
The rank statistic $H$ based on the number of exceeding observations in two samples is suitable for testing difference in location of two samples. This paper contains tables of one-sides significance levels $P\{H\geq k\}$ for $k=7,8,\ldots, 11; max (2,n-10)
The rank statistic $H$ based on the number of exceeding observations in two samples is suitable for testing difference in location of two samples. This paper contains tables of one-sides significance levels $P\{H\geq k\}$ for $k=7,8,\ldots, 11; max (2,n-10)$, which includes almost all practically used significance levels for $3\leq m \leq n \leq 25$, where $m,n$ are the sample sizes.
DOI :
10.21136/AM.1978.103750
Classification :
62G10, 62Q05
Keywords: tables; two-sample Haga test of location
Keywords: tables; two-sample Haga test of location
@article{10_21136_AM_1978_103750,
author = {Hojek, Stanislav},
title = {Tables for the two-sample {Haga} test of location},
journal = {Applications of Mathematics},
pages = {237--247},
year = {1978},
volume = {23},
number = {4},
doi = {10.21136/AM.1978.103750},
mrnumber = {0501560},
zbl = {0402.62087},
language = {en},
url = {http://geodesic.mathdoc.fr/articles/10.21136/AM.1978.103750/}
}
Hojek, Stanislav. Tables for the two-sample Haga test of location. Applications of Mathematics, Tome 23 (1978) no. 4, pp. 237-247. doi: 10.21136/AM.1978.103750
[1] T. Haga: A two-sample rank test on location. Ann. Inst. Statist. Math. 11 (1959/60), 211 - 219. | DOI | MR
[2] J. Hájek Z. Šidák: Theory of rank tests. Academia, Prague & Academic Press, New York - London, 1967. | MR
[3] Z. Šidák: Tables for the two-sample location E-test based on exceeding observations. Apl. mat. 22 (1977), 166-175. | MR
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