Bayesian Analysis of Finite Populations under Simple Random Sampling

Statistical methods to produce inferences based on samples from finite populations have been available for at least 70 years. Topics such as Survey Sampling and Sampling Theory have become part of the mainstream of the statistical methodology. A wide variety of sampling schemes as well as estimators are now part of the statistical folklore. On the other hand, while the Bayesian approach is now a well-established paradigm with implications in almost every field of the statistical arena, there does not seem to exist a conventional procedure—able to deal with both continuous and discrete variables—that can be used as a kind of default for Bayesian survey sampling, even in the simple random sampling case. In this paper, the Bayesian analysis of samples from finite populations is discussed, its relationship with the notion of superpopulation is reviewed, and a nonparametric approach is proposed. Our proposal can produce inferences for population quantiles and similar quantities of interest in the same way as for population means and totals. Moreover, it can provide results relatively quickly, which may prove crucial in certain contexts such as the analysis of quick counts in electoral settings.

[1]  V. P. Godambe A New Approach to Sampling from Finite Populations. II Distribution‐Free Sufficiency , 1966 .

[2]  R Core Team,et al.  R: A language and environment for statistical computing. , 2014 .

[3]  T. Ferguson A Bayesian Analysis of Some Nonparametric Problems , 1973 .

[4]  M. Escobar,et al.  Bayesian Density Estimation and Inference Using Mixtures , 1995 .

[5]  D. Blei Bayesian Nonparametrics I , 2016 .

[6]  Juan Carlos Martinez-Ovando,et al.  A Bayesian Nonparametric Framework to Inference on Totals of Finite Populations , 2014 .

[7]  W. A. Ericson A Note on the Posterior Mean of a Population Mean , 1969 .

[8]  R. Little To Model or Not To Model? Competing Modes of Inference for Finite Population Sampling , 2004 .

[9]  V. P. Godambe,et al.  A UNIFIED THEORY OF SAMPLING FROM FINITE POPULATIONS , 1955 .

[10]  Andrew Gelman,et al.  Struggles with survey weighting and regression modeling , 2007, 0710.5005.

[11]  Karl Pearson,et al.  ON A METHOD OF ASCERTAINING LIMITS TO THE ACTUAL NUMBER OF MARKED MEMBERS IN A POPULATION OF GIVEN SIZE FROM A SAMPLE , 1928 .

[12]  Stephen G. Walker,et al.  Sampling the Dirichlet Mixture Model with Slices , 2006, Commun. Stat. Simul. Comput..

[13]  J. Sethuraman A CONSTRUCTIVE DEFINITION OF DIRICHLET PRIORS , 1991 .

[14]  Yajuan Si,et al.  Bayesian hierarchical weighting adjustment and survey inference , 2017, 1707.08220.

[15]  J. Neyman On the Two Different Aspects of the Representative Method: the Method of Stratified Sampling and the Method of Purposive Selection , 1934 .

[16]  O. P. Aggarwal Bayes and Minimax Procedures in Sampling From Finite and Infinite Populations--I , 1959 .

[17]  Richard M. Royall,et al.  Balanced samples and robust Bayesian inference in finite population sampling , 1982 .

[18]  Bayesian Sequential Two-Phase Sampling , 1996 .

[19]  David A. Binder,et al.  Non-parametric Bayesian Models for Samples from Finite Populations , 1982 .

[20]  Ing Rj Ser Approximation Theorems of Mathematical Statistics , 1980 .

[21]  V. P. Godambe A New Approach to Sampling from Finite Populations. I Sufficiency and Linear Estimation , 1966 .

[22]  Yajuan Si,et al.  Bayesian Nonparametric Weighted Sampling Inference , 2013, 1309.1799.

[23]  Glen D Meeden,et al.  A noninformative Bayesian approach to finite population sampling using auxiliary variables , 2008 .

[24]  S. Rahnamay Kordasiabi,et al.  Prediction of the nonsampled units in survey design with the finite population using Bayesian nonparametric mixture model , 2020, Commun. Stat. Simul. Comput..

[25]  Joseph Sedransk,et al.  The morris hansen lecture 2007. Assessing the value of Bayesian methods for inference about finite population quantities , 2008 .

[26]  Antonio Canale,et al.  Bayesian Kernel Mixtures for Counts , 2011, Journal of the American Statistical Association.

[27]  V. M. Joshi,et al.  ADMISSIBILITY AND BAYES ESTIMATION IN SAMPLING FINITE POPULATIONS. II , 1965 .

[28]  Terrance D. Savitsky,et al.  Bayesian Estimation Under Informative Sampling , 2015, 1507.07050.

[29]  Stephen G. Walker,et al.  Slice sampling mixture models , 2011, Stat. Comput..

[30]  Albert Y. Lo,et al.  A Bayesian bootstrap for a finite population , 1988 .

[31]  J. Ghosh,et al.  POSTERIOR CONSISTENCY OF DIRICHLET MIXTURES IN DENSITY ESTIMATION , 1999 .