Catanova for Two-Way Contingency Tables with Ordinal Variables Using Orthogonal Polynomials |
| |
| Abstract: | ABSTRACT The analysis of variance of cross-classified (categorical) data (CATANOVA) is a technique designed to identify the variation between treatments of interest to the researcher. There are well-established links between CATANOVA and the Goodman and Kruskal tau statistic as well as the Light and Margolin R 2 for the purposes of the graphical identification of this variation. The aim of this article is to present a partition of the numerator of the tau statistic, or equivalently, the BSS measure in the CATANOVA framework, into location, dispersion, and higher order components. Even if a CATANOVA identifies an overall lack of variation, by considering this partition and calculations derived from them, it is possible to identify hidden, but statistically significant, sources of variation. |
| |
| Keywords: | Goodman and Kruskal tau statistic Location, dispersion, and higher-order components Orthogonal polynomials |
|
|
