Improved point and interval estimation for a beta regression model

In this paper we consider the beta regression model recently proposed by Ferrari and Cribari-Neto [2004. Beta regression for modeling rates and proportions. J. Appl. Statist. 31, 799-815], which is tailored to situations where the response is restricted to the standard unit interval and the regression structure involves regressors and unknown parameters. We derive the second order biases of the maximum likelihood estimators and use them to define bias-adjusted estimators. As an alternative to the two analytically bias-corrected estimators discussed, we consider a bias correction mechanism based on the parametric bootstrap. The numerical evidence favors the bootstrap-based estimator and also one of the analytically corrected estimators. Several different strategies for interval estimation are also proposed. We present an empirical application.

[1]  D. Cox,et al.  A General Definition of Residuals , 1968 .

[2]  Charles Annis,et al.  Statistical Distributions in Engineering , 2001, Technometrics.

[3]  F. A. Seiler,et al.  Numerical Recipes in C: The Art of Scientific Computing , 1989 .

[4]  G. Weiss,et al.  Small sample comparison of estimation methods for the beta distribution , 1980 .

[5]  J. Wiley,et al.  Heterogeneity in the probability of HIV transmission per sexual contact: the case of male-to-female transmission in penile-vaginal intercourse. , 1989, Statistics in medicine.

[6]  Gauss M. Cordeiro,et al.  Theory & Methods: Second‐order biases of the maximum likelihood estimates in von Mises regression models , 1999 .

[7]  George G. Judge,et al.  Econometric foundations , 2000 .

[8]  B. Efron The jackknife, the bootstrap, and other resampling plans , 1987 .

[9]  Gauss M. Cordeiro,et al.  Bias correction for a class of multivariate nonlinear regression models , 1997 .

[10]  Christopher C. Wackerman,et al.  The modified beta density function as a model for synthetic aperture radar clutter statistics , 1991, IEEE Trans. Geosci. Remote. Sens..

[11]  Francisco Cribari-Neto,et al.  On bootstrap and analytical bias corrections , 1998 .

[12]  Jurgen A. Doornik,et al.  Ox: an Object-oriented Matrix Programming Language , 1996 .

[13]  B. Efron,et al.  The Jackknife: The Bootstrap and Other Resampling Plans. , 1983 .

[14]  William H. Press,et al.  The Art of Scientific Computing Second Edition , 1998 .

[15]  R J McNally,et al.  Maximum likelihood estimation of the parameters of the prior distributions of three variables that strongly influence reproductive performance in cows. , 1990, Biometrics.

[16]  David Hinkley,et al.  Bootstrap Methods: Another Look at the Jackknife , 2008 .

[17]  Philip Paolino,et al.  Maximum Likelihood Estimation of Models with Beta-Distributed Dependent Variables , 2001, Political Analysis.

[18]  Francisco Cribari-Neto,et al.  Bias-corrected maximum likelihood estimation for the beta distribution , 1997 .

[19]  S. Ferrari,et al.  Beta Regression for Modelling Rates and Proportions , 2004 .

[20]  P. McCullagh,et al.  Bias Correction in Generalized Linear Models , 1991 .

[21]  Chih-Ling Tsai,et al.  Bias in nonlinear regression , 1986 .

[22]  Saad T. Bakir,et al.  Bias correction for a generalized log-gamma regression model , 1987 .

[23]  Francisco Cribari-Neto,et al.  Improved maximum likelihood estimation in a new class of beta regression models , 2005 .

[24]  B. Efron Nonparametric standard errors and confidence intervals , 1981 .

[25]  B. McCullough,et al.  Regression analysis of variates observed on (0, 1): percentages, proportions and fractions , 2003 .

[26]  Eric R. Ziegel,et al.  Generalized Linear Models , 2002, Technometrics.

[27]  P. McCullagh,et al.  Generalized Linear Models , 1992 .

[28]  M. Kenward,et al.  An Introduction to the Bootstrap , 2007 .

[29]  M. Kendall Theoretical Statistics , 1956, Nature.

[30]  Robert Tibshirani,et al.  Bootstrap confidence intervals and bootstrap approximations , 1987 .

[31]  D. Firth Bias reduction of maximum likelihood estimates , 1993 .

[32]  K. Hollands,et al.  A method to generate synthetic hourly solar radiation globally , 1990 .

[33]  C. Cox,et al.  Nonlinear quasi-likelihood models: applications to continuous proportions , 1996 .

[34]  Francisco Cribari-Neto,et al.  Nearly Unbiased Maximum Likelihood Estimation for the Beta Distribution , 2002 .

[35]  N. L. Johnson,et al.  Continuous Univariate Distributions. , 1995 .

[36]  D. Lawley A GENERAL METHOD FOR APPROXIMATING TO THE DISTRIBUTION OF LIKELIHOOD RATIO CRITERIA , 1956 .

[37]  Debashis Kushary,et al.  Bootstrap Methods and Their Application , 2000, Technometrics.

[38]  Francisco Cribari-Neto,et al.  Econometric and Statistical Computing Using Ox , 2003 .

[39]  James G. MacKinnon,et al.  Approximate bias correction in econometrics , 1998 .