Abstract
This study proposes a bivariate index vector to concurrently analyze both the degree and direction of departure from the quasi-symmetry (QS) model for ordinal square contingency tables. The QS model and extended QS (EQS) models identify the symmetry and asymmetry between the probabilities of normal circulation and reverse circulation when the order exists for arbitrary three categories. The asymmetry parameter of the EQS model implies the degree of departure from the QS model; the EQS model is equivalent to the QS model when the asymmetry parameter equals to one. The structure of the EQS model differs depending on whether the asymmetry parameter approaches zero or infinity. Thus, the asymmetry parameter of the EQS model also implies the direction of departure from the QS model. The proposed bivariate index vector is constructed by combining existing and original sub-indexes that represent the degree of departure from the QS model and its direction. These sub-indexes are expressed as functions of the asymmetry parameter under the EQS model. We construct an estimator of the proposed bivariate index vector and an approximate confidence region for the proposed bivariate index vector. Using real data, we show that the proposed bivariate index vector is important to compare degrees of departure from the QS model for plural data sets.
Highlights
Consider an R × R square contingency table with the same row and column ordinal classifications
For the analysis of square contingency tables with ordered categories, the index φ was proposed to measure the degree of departure from the QS model based on the probabilities for the normal circulation πijπjkπki and the probabilities for the reverse circulation πkjπjiπik for arbitrary i < j < k
This study proposed the new index, φ, to distinguish the directions of departure from the QS model
Summary
Consider an R × R square contingency table with the same row and column ordinal classifications. Kozai, and Tomizawa (2014) proposed an index to measure the degree of departure from the QS model (see Section 3 for the details of this index) This index is important to measure and compare the degree of departure from the QS model as the range of this index is zero to one, and the value of this index does not depend on the sample size. This index, cannot distinguish directions of departure from the QS model because the value of this index approaches one as the asymmetry parameter approaches zero or infinity under the EQS model. The proposed bivariate index vector can be visually comparing the degrees of departure from the QS model in plural data sets using confidence region.
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