Interactions in Multidimensional Contingency Tables

  • Goodman L
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Abstract

In the present article, we shall propose a definition of the rth order interactions in a m-dimensional d1 Ã--- d2 Ã--- ⋯ Ã--- dm contingency table (r = 0, 1, 2, ⋯, m - 1), and we shall present methods for testing the hypothesis that any specified subset of these interactions is equal to zero. In addition, we shall present simple methods for obtaining simultaneous confidence intervals for these interactions or for any specified subset of them. In the special case where the m-dimensional contingency table is a 2 Ã--- 2 Ã--- ⋯ Ã--- 2 table (i.e., where di = 2 for i = 1, 2, ⋯, m), the rth order interactions defined herein are the same as Good's interactions [9], but the tests proposed by Good are different even in this case from those presented herein. When $d_i > 2$ for some values of i, Good's interactions are complex valued, whereas the interactions presented here are real valued. We shall show herein that the hypothesis Hr that all rth order and higher-order complex interactions (defined by Good) are equal to zero is equivalent to the hypothesis H* r that all rth order and higher-order real interactions (defined herein) are equal to zero, and that the test of Hr within $H_s (r < s)$ presented by Good is asymptotically equivalent (under Hr) to the test of H* r within H* s presented herein. The tests presented herein are, in some cases, easier to apply than Good's tests. In addition, the methods presented herein are applicable to a wider range of problems in the sense that Good's methods can be used to test the null hypothesis that all rth order and higher-order interactions are equal to zero, whereas the methods presented herein can be used to test the more general null hypothesis that any specified subset of these interactions is equal to zero. The tests presented herein are generalizations of methods proposed earlier by Plackett [13] and Goodman [10] for testing the null hypothesis H* 2 in a three-dimensional table. The test proposed by Good [9] is a generalization of the methods proposed earlier by Bartlett [5], Roy and Kastenbaum [14], and Darroch [8] for testing H* 2 in the three-dimensional table. All of these earlier papers were concerned mainly with the testing of null hypotheses. In the present article, in addition to our treatment of hypothesis testing, we shall also present two different methods for obtaining confidence intervals for the rth order real interactions in the m-dimensional contingency table (r = 0, 1, 2, ⋯, m - 1).

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APA

Goodman, L. A. (1964). Interactions in Multidimensional Contingency Tables. The Annals of Mathematical Statistics, 35(2), 632–646. https://doi.org/10.1214/aoms/1177703561

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