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Communications in Statistics - Theory and Methods Volume 49, 2020 - Issue 16
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Review Article

Parameter estimation approaches to tackling measurement error and multicollinearity in ordinal probit models

Jing GuanSchool of Mathematics, Tianjin University, Tianjin, ChinaCorrespondence[email protected]
&
Yunfeng ZhaoSchool of Mathematics, Tianjin University, Tianjin, ChinaORCID Iconhttp://orcid.org/0000-0001-6767-7233
ORCID Icon
Pages 3835-3859 | Received 23 Nov 2018, Accepted 02 Mar 2019, Published online: 25 Mar 2019

References

  • Agresti, A. 2002. Categorical data analysis. 2nd ed. New York, NY: Wiley. doi:10.1002/0471249688.
  • Besley, D. A., E. Kuh, and R. E. Welsch. 1980. Regression diagnostics: Identifying influential data and sources of collinearity. New York, NY: Wiley. doi:10.1002/0471725153.
  • Blasius, J., and J. C. Gower. 2005. Multivariate prediction with nonlinear principal components analysis: application. Quality & Quantity 39 (4):373–90. doi:10.1007/s11135-005-3006-0.
  • Carroll, R. J., D. Ruppert, L. A. Stefanski, and C. Crainiceanu. 2006. Measurement error in nonlinear models: a modern perspective. 2nd ed. London, UK: Chapman & Hall, doi:10.1201/9781420010138.
  • Cassel, C., P. Hackl, and A. Westlund. 1999. Robustness of partial least-squares method for estimating latent variable quality structures. Journal of Applied Statistics 26 (4):435–46. doi:10.1080/02664769922322.
  • Chen, Z., G. Y. Yi, and C. Wu. 2014. Marginal analysis of longitudinal ordinal data with misclassification in both response and covariates. Biometrical Journal 56:69–185. doi:10.1002/bimj.201200195.
  • Cranfield, J. A. L., and E. Magnusson. 2003. Canadian consumer’s willingness-to-pay for pesticide free food products: An ordered probit analysis. International Food and Agribusiness Management Review 6:13–30.
  • Dijkstra, T. K. 2014. Ridge regression and its degrees of freedom. Quality & Quantity 48 (6):3185–93. doi:10.1007/s11135-013-9949-7.
  • Frisch, R. 1934. Statistical confluence by means of complete regression systems. vol. 5. Copenhagen, Denmark: Universitetes ϕkonomiske Institut.
  • Guan, J., H. Chen, K. A. Bollen, D. R. Thomas, and L. Wang. 2018. Instrumental Variable Estimation in Ordinal Probit Models with Mismeasured Predictors. Working Paper.
  • Hoerl, A. E., and R. W. Kennard. 1970. Ridge regression: applications to nonorthogonal problems. Technometrics 12 (1):69–82. doi:10.1080/00401706.1970.10488635.
  • Huang, Y. J., and C. Y. Wang. 2001. Consistent functional methods for logistic regression with errors in covariates. Journal of American Statistical Association 96 (456):1469–82. doi:10.1198/016214501753382372.
  • Kahraman, H. T., S. Sagiroglu, and I. Colak. 2013. The development of intuitive knowledge classifier and the modeling of domain dependent data. Knowledge-Based Systems 37:283–95. doi:10.1016/j.knosys.2012.08.009.
  • Leahy, K. 2000. Multicollinearity: When the solution is the problem. In Data mining cookbook, ed. O.P. Rud, 106C108. London, UK: Wiley.
  • Liang, K. Y., and X. Liu. 1991. Estimating equations in generalized linear models with measurement error. In Estimating functions, ed. V. P. Godambe, 47–63. New York, NY: Oxford University Press.
  • Liu, I., and A. Agresti. 2005. The analysis of ordered categorical data: An overview and a survey of recent developments. Test 14 (1):1–73. doi:10.1007/BF02595397.
  • Maddala, G. S. 1977. Econometrics. New York, NY: McGraw Hills Publishing Company.
  • Masson, K., G. Shukur, and P. Sjolander. 2014. A new ridge regression causality test in the presence of multicollinearity. Communications in Statistics Theory and Methods 43:235C248. doi:10.1080/03610926.2012.659825.
  • McCullagh, P. 1980. Regression models for ordinal data. Journal of the Royal Statistical Society B 42:109–42. doi:10.1111/j.2517-6161.1980.tb01109.x.
  • Montgomery, D. C., E. A. Peck, and G. G. Vining. 2012. Introduction to linear regression analysis. 5th ed. New York, NY: Wiley.
  • Neto, A. R. D. R., R. Sousa, G. D. A. Barreto, and J. S. Cardoso. 2011. Diagnostic of pathology on the vertebral column with embedded reject option. Lecture Notes in Computer Science 6669:588–95.
  • Oehlert, G. W. 1992. A note on the delta method. American Statistician 46 (1):27–9. doi:10.1080/00031305.1992.10475842.
  • Olsson, U., F. Drasgow, and N. J. Dorans. 1982. The polyserial correlation coefficient. Psychometrika 47 (3):337–47. doi:10.1007/BF02294164.
  • Pagel, M. D., and C. E. Lunneborg. 1985. Empirical evaluation of ridge regression. Psychological Bulletin 97 (2):342–55. doi:10.1037/0033-2909.97.2.342.
  • Park, J. H. 2011. Changepoint analysis of binary and ordinal probit models: An application to bank rate policy under the interwar gold standard. Political Analysis 19 (02):188–204. doi:10.1093/pan/mpr007.
  • Peyhardi, J., C. Trottier, and Y. Guedon. 2015. A new specification of generalized linear models for categorical responses. Biometrika 102 (4):889–906. doi:10.1093/biomet/asv042.
  • Shieh, G. 2011. Clarifying the role of mean centring in multicollinearity of interaction effects. British Journal of Mathematical and Statistical Psychology 64 (3):462–77. doi:10.1111/j.2044-8317.2010.02002.x.
  • Stoklosa, J., Y. H. Huang, E. Furlan, and W. H. Hwang. 2016. On quadratic logistic regression models when predictor variables are subject to measurement error. Computational Statistics-Data Analysis 95 (C):109–21. doi:10.1016/j.csda.2015.09.012.
  • Varin, C., and C. Czado. 2010. A mixed autoregressive probit model for ordinal longitudinal data. Biometrics 11:127–38. doi:10.1093/biostatistics/kxp042.
  • Wang, C. Y. 2000. Flexible regression calibration for covariate measurement error with longitudinal surrogate variables. Statistica Sinica 10:905–21.
  • Wang, L. 2002. A simple adjustment for measurement errors in some limited dependent variable models. Statistics and Probability Letters 58 (4):427–33. doi:10.1016/S0167-7152(02)00165-7.
  • Webster, J. T., R. F. Gunst, and R. L. Mason. 1974. Latent root regression analysis. Technometrics 16 (4):513–22. doi:10.1080/00401706.1974.10489232.
  • Winship, C., and R. D. Mare. 1984. Regression models with ordinal variables. American Sociological Review 49 (4):512–25. doi:10.2307/2095465.
  • Xu, K., Y. Ma, and L. Wang. 2015. Instrument assisted regression for errors in variables models with binary response. Scandinavian Journal of Statistics 42 (1):104–17. doi:10.1111/sjos.12097.
  • Zhu, Q., L. Wang, S. Tannenbaum, Jr, A. Ricci, P. Defusco, and P. Hegde. 2014. Pathologic response prediction to neoadjuvant chemotherapy utilizing pretreatment near-infrared imaging parameters and tumor pathologic criteria. Breast Cancer Research Bcr 16 (5):1–14. doi:10.1186/s13058-014-0456-0.

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