Tables for the two-sample Haga test of location

Stanislav Hojek

Aplikace matematiky (1978)

  • Volume: 23, Issue: 4, page 237-247
  • ISSN: 0862-7940

Abstract

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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 k } for k = 7 , 8 , ... , 11 ; m a x ( 2 , n - 10 ) < m n 25 , k = 9 , 10 , ... , 13 ; m a x ( 2 , n - 15 ) < m n - 10 ; 13 n 25 ; k = 11 , 12 , ... , 15 ; 2 < m n - 15 , 18 n 25 , which includes almost all practically used significance levels for 3 m n 25 , where m , n are the sample sizes.

How to cite

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Hojek, Stanislav. "Tables for the two-sample Haga test of location." Aplikace matematiky 23.4 (1978): 237-247. <http://eudml.org/doc/15054>.

@article{Hojek1978,
abstract = {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\lbrace H\ge k\rbrace $ for $k=7,8,\ldots , 11; max (2,n-10)<m\le n\le 25, k=9,10,\ldots , 13; max(2,n-15)<m\le n-10;13\le n \le 25; k=11,12,\ldots ,15; 2<m\le n-15,18\le n\le 25$, which includes almost all practically used significance levels for $3\le m \le n \le 25$, where $m,n$ are the sample sizes.},
author = {Hojek, Stanislav},
journal = {Aplikace matematiky},
keywords = {tables; two-sample Haga test of location; Tables; Two-Sample Haga Test of Location},
language = {eng},
number = {4},
pages = {237-247},
publisher = {Institute of Mathematics, Academy of Sciences of the Czech Republic},
title = {Tables for the two-sample Haga test of location},
url = {http://eudml.org/doc/15054},
volume = {23},
year = {1978},
}

TY - JOUR
AU - Hojek, Stanislav
TI - Tables for the two-sample Haga test of location
JO - Aplikace matematiky
PY - 1978
PB - Institute of Mathematics, Academy of Sciences of the Czech Republic
VL - 23
IS - 4
SP - 237
EP - 247
AB - 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\lbrace H\ge k\rbrace $ for $k=7,8,\ldots , 11; max (2,n-10)<m\le n\le 25, k=9,10,\ldots , 13; max(2,n-15)<m\le n-10;13\le n \le 25; k=11,12,\ldots ,15; 2<m\le n-15,18\le n\le 25$, which includes almost all practically used significance levels for $3\le m \le n \le 25$, where $m,n$ are the sample sizes.
LA - eng
KW - tables; two-sample Haga test of location; Tables; Two-Sample Haga Test of Location
UR - http://eudml.org/doc/15054
ER -

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