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2023 | 24 | nr 2 | 13--128
Tytuł artykułu

A New Confidence Interval for the Odds Ratio

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We consider the problem of interval estimation of the odds ratio. An asymptotic confi****dence interval is widely applied in economics, medicine, sociology, etc. Unfortunately, this confidence interval has a poor coverage probability, significantly smaller than the nominal confidence level. In this paper, a new confidence interval is proposed. Its construction re****quires only information on the sizes of samples and the sample odds ratio. The coverage probability of the proposed confidence interval is at least the nominal confidence level. (original abstract)
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Opis fizyczny
  • Poland
  • Warsaw University of Life Sciences - SGGW, Poland
  • Baumol, W. J., (2015). Macroeconomics: Principles and policy, Cengage Learning, Inc.
  • Andrés, M.A., Mato, S.A., Tejedor, H.I., (2020). Pseudo-Bayesian test for the comparison of two proportions, Metron, 49 (1-4), pp. 151-162.
  • García-Pérez M.A, Nú´nez-Antón V. (2020) Asymptotic versus exact methods in the analysis of contingency tables: Evidence-based practical recommendations, Stat Methods Med Res., 29(9), pp. 2569-2582.
  • Cornfield, J., (1951). A Method of Estimating Comparative Rates from Clinical Data. Applications to Cancer of the Lung, Breast, and Cervix, JNCI: Journal of the National Cancer Institute, 11, pp. 1269-1275, DOI: 10.1093/jnci/11.6.1269.
  • Edwards, A.W.F., (1963). The Measure of Association in a 2×2 Table. Journal of the Royal Statistical Society, Ser. A. 126, pp. 109-114, DOI: 10.2307/2982448.
  • Encyclopedia of Statistical Sciences, (2006). Wiley & Sons.
  • García-Pérez M.A., Nú´nez-Antón V., (2020) Asymptotic versus exact methods in the analysis of contingency tables: Evidence-based practical recommendations. Stat Methods Med Res., 29(9), pp. 2569-2582.
  • Gart, J.J., (1971). The comparison of proportions: a review of significance tests, confidence intervals, and adjustments for stratification. Review of the International Statistical Institute, 39, pp. 148-169.
  • Lawson, R., (2004). Small Sample Confidence Intervals for the Odds Ratio. Communications in Statistics - Simulation and Computation, 33, pp. 1095-1113, DOI: 10.1081/SAC- 200040691.
  • Morris, J.A., Gardner M.J., (1988). Calculating confidence intervals for relative risks (odds ratios) and standardised ratios and rates. British Medical Journal, 296, pp. 1313-6, DOI: 10.1136/bmj.296.6632.1313.
  • McCullagh, P., (1980). Regression Models for Ordinal Data. Journal of the Royal Statistical Society, Ser. B. 42, pp. 109-142.
  • Neyman, J. (1934). On the Two Different Aspects of the Representative Method: The Method of Stratified Sampling and the Method of Purposive Selection. Journal of the Royal Statistical Society, 97, pp. 558-625.
  • Thomas, D.G., (1971). Algorithm AS-36: exact confidence limits for the odds ratio in a 2×2 table. Applied Statistics, 20, pp. 105-110.
  • Wang, W., Shan G., (2015) Exact Confidence Intervals for the Relative Risk and the Odds Ratio. Biometrics, 71, pp. 985-995, DOI: 10.1111/biom.12360.
  • Zieliński, W., (2011) Comparison of confidence intervals for fraction in finite populations. Quantitative Methods in Economics, XII, pp. 177-182.
  • Zieliński, W., (2020a). A new exact confidence interval for the difference of two binomial proportions. REVSTAT-Statistical Journal, 18, pp. 521-530.
  • Zieliński,W., (2020b). A New Confidence Interval for the Odds Ratio: an Application to the Analysis of the Risk of Survival of an Enterprise. The 14th Professor Aleksander Zelia´s International Conference on Modelling and Forecasting of Socio-Economic Phenomena, pp. 185-191.
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