[Agresti A. (2013): Categorical Data Analysis, 3rd Edition. John Wiley and Sons, Hoboken, New Jersey.]Search in Google Scholar
[Bishop Y.M M., Fienberg S.E., Holland P.W. (1975): Discrete Multivariate Analysis: Theory and Practice. MIT Press, Cambridge.]Search in Google Scholar
[Bowker A.H. (1948): A test for symmetry in contingency tables. Journal of the American Statistical Association 43: 572–574.10.1080/01621459.1948.1048328418123073]Search in Google Scholar
[Patil G.P., Taillie C. (1982): Diversity as a concept and its measurement. Journal of the American Statistical Association 77: 548–561.10.1080/01621459.1982.10477845]Search in Google Scholar
[Saigusa Y., Tahata K., Tomizawa S. (2016): Measure of departure from partial symmetry for square contingency tables. Journal of Mathematics and Statistics 12: 152–156.10.3844/jmssp.2016.152.156]Search in Google Scholar
[Saigusa Y., Takami M., Ishii A., Nakagawa T., Tomizawa S. (2019a): Measure for departure from cumulative partial symmetry for square contingency tables with ordered categories. Journal of Statistics: Advances in Theory and Applications 21: 53–70.10.18642/jsata_7100122036]Search in Google Scholar
[Saigusa Y., Takami M., Ishii A., Tomizawa S. (2019b): Measure of departure from local symmetry for square contingency tables. International Journal of Statistics and Probability 8: 140–145.10.5539/ijsp.v8n2p140]Search in Google Scholar
[Tomizawa S. (1994): Two kinds of measures of departure from symmetry in square contingency tables having nominal categories. Statistica Sinica 4: 325–334.]Search in Google Scholar
[Tomizawa S., Seo T., Yamamoto H. (1998): Power-divergence-type measure of departure from symmetry for square contingency tables that have nominal categories. Journal of Applied Statistics 25: 387–398.10.1080/02664769823115]Search in Google Scholar
[Tomizawa S., Miyamoto N., Hatanaka Y. (2001): Measure of asymmetry for square contingency tables having ordered categories. Australian and New Zealand Journal of Statistics 43: 335–349.10.1111/1467-842X.00180]Search in Google Scholar
[Tomizawa S., Miyamoto N., Iwamoto M. (2006): Linear column-parameter symmetry model for square contingency tables: application to decayed teeth data. Biometrical Letters 43: 91–98.]Search in Google Scholar