# Indiana University

 dc.contributor.author Puri, Madan L. dc.date.accessioned 2018-06-14T14:55:19Z dc.date.available 2018-06-14T14:55:19Z dc.date.issued 1965-05 dc.identifier.citation Puri, M. L. "Some distribution- free k-sample rank tests of homogeneity against ordered alternatives." Communications on Pure and Applied Mathematics (1965), Volume 18 Issue 1, 51-63. en dc.identifier.uri http://hdl.handle.net/2022/22199 dc.description Publisher's, offprint version. en dc.description.abstract A problem which occurs frequently in statistical analysis is that of deciding whether several samples should be regarded as coming from the same population. This problem, usually referred to as the k-sample problem, when expressed formally is stated as follows: Let $X_{ii} , j = 1, · · · , m_i, i = 1, · · · , k,$ be a set of independent random variables and let $F_i(x)$ be the probability distribution function of $X_{ii}$ . The set of admissible hypotheses designates that each $F_i$ belongs to some class of distribution functions $\Omega$. en dc.language.iso en en dc.publisher Communications on Pure and Applied Mathematics en dc.relation.isversionof https://onlinelibrary.wiley.com/doi/abs/10.1002/cpa.3160180108 en dc.title Some distribution-free k-sample rank tests of homogeneity against ordered alternatives en dc.type Article en dc.identifier.doi 10.1002/cpa.3160180108
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