Optimal Allocation of the Sample in the Poisson Item Count Technique

Authors

  • Michał Bernardelli SGH Warsaw School of Economics, Institute of Econometrics, Probabilistic Methods Unit
  • Barbara Kowalczyk SGH Warsaw School of Economics, Institute of Econometrics, Mathematical Statistics Unit

DOI:

https://doi.org/10.18778/0208-6018.335.03

Keywords:

optimal allocation, latent variable, EM algorithm, sensitive question, indirect questioning, Poisson item count technique

Abstract

Indirect methods of questioning are of utmost importance when dealing with sensitive questions. This paper refers to the new indirect method introduced by Tian et al. (2014) and examines the optimal allocation of the sample to control and treatment groups. If determining the optimal allocation is based on the variance formula for the method of moments (difference in means) estimator of the sensitive proportion, the solution is quite straightforward and was given in Tian et al. (2014). However, maximum likelihood (ML) estimation is known from much better properties, therefore determining the optimal allocation based on ML estimators has more practical importance. This problem is nontrivial because in the Poisson item count technique the study sensitive variable is a latent one and is not directly observable. Thus ML estimation is carried out by using the expectation‑maximisation (EM) algorithm and therefore an explicit analytical formula for the variance of the ML estimator of the sensitive proportion is not obtained. To determine the optimal allocation of the sample based on ML estimation, comprehensive Monte Carlo simulations and the EM algorithm have been employed.

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References

Imai K. (2011), Multivariate regression analysis for the item count technique, “Journal of the American Statistical Association”, vol. 106, no. 494, pp. 407–416.
Google Scholar

Kowalczyk B., Wieczorkowski R. (2017), Comparing proportions of sensitive items in two populations when using Poisson and negative binomial item count techniques, “Quantitative Methods in Economics”, vol. 18, no. 1, pp. 68–77.
Google Scholar

Kuha J., Jackson J. (2014), The item count method for sensitive survey questions: modeling criminal behavior, “Journal of the Royal Statistical Society: Series C”, vol. 63, no. 2, pp. 321–341.
Google Scholar

Tian G‑L., Tang M‑L., Wu Q., Liu Y. (2014), Poisson and negative binomial item count techniques for surveys with sensitive question, “Statistical Methods in Medical Research”, Pre‑published online on December 16, 2014, http://dx.doi.org/10.1177/0962280214563345.
Google Scholar

Tourangeau R., Yan T. (2007), Sensitive questions in surveys, “Psychological Bulletin”, vol. 133, no. 5, pp. 859–883.
Google Scholar

Wolter F., Laier B. (2014), The Effectiveness of the Item Count Technique in Eliciting Valid Answers to Sensitive Questions. An Evaluation in the Context of Self‑Reported Delinquency, “Survey Research Methods”, vol. 8, no. 3, pp. 153–168.
Google Scholar

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Published

2018-05-16

How to Cite

Bernardelli, M., & Kowalczyk, B. (2018). Optimal Allocation of the Sample in the Poisson Item Count Technique. Acta Universitatis Lodziensis. Folia Oeconomica, 3(335), 35–47. https://doi.org/10.18778/0208-6018.335.03

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