an:06600094
Zbl 1349.62001
Chaudhuri, Arijit (ed.); Christofides, Tasos C. (ed.); Rao, C. R. (ed.)
Data gathering, analysis and protection of privacy through randomized response techniques: qualitative and quantitative human traits
EN
Handbook of Statistics 34. Amsterdam: Elsevier/North Holland (ISBN 978-0-444-63570-9/hbk; 978-0-444-63571-6/ebook). xviii, 525~p. (2016).
00404746
2016
b
62-00 62D05 94A60
The articles of this volume will be reviewed individually.
Indexed articles:
\textit{Rao, T. J.; Rao, C. R.}, Review of certain recent advances in randomized response techniques, 1-11 [Zbl 1365.62046]
\textit{Chaudhuri, A.}, How randomized response techniques need not be confined to simple random sampling but liberally applicable to general sampling schemes, 17-27 [Zbl 1365.62027]
\textit{Christofides, T. C.}, The classical randomized response techniques: reading Warner (1965) and Greenberg et al. (1969) 50 years later, 29-41 [Zbl 1365.62028]
\textit{Singh, S.}, On the estimation of correlation coefficient using scrambled responses, 43-90 [Zbl 1365.62052]
\textit{Sengupta, S.}, Admissible and optimal estimation in finite population sampling under randomized response models, 91-104 [Zbl 1365.62050]
\textit{Quatember, A.}, A mixture of true and randomized responses in the estimation of the number of people having a certain attribute, 105-117 [Zbl 1365.62045]
\textit{Barabesi, L.; Diana, G.; Perri, P. F.}, Estimation of complex population parameters under the randomized response theory, 119-131 [Zbl 1366.62023]
\textit{Abdelfatah, S.; Mazloum, R.}, An efficient randomized response model using two decks of cards under simple and stratified random sampling, 133-154 [Zbl 1366.62022]
\textit{Odumade, O.; Arnab, R.; Singh, S.}, Poststratification based on the choice of use of a quantitative randomization device, 169-189 [Zbl 1365.62083]
\textit{Bouza-Herrera, C. N.}, Behavior of some scrambled randomized response models under simple random sampling, ranked set sampling and Rao-Hartley-Cochran designs, 209-220 [Zbl 1365.62025]
\textit{Mukhopadhyay, P.}, Estimation of a finite population variance under linear models for randomized response designs, 221-231 [Zbl 1365.62040]
\textit{Rao, T. J.; Sarkar, J.; Sinha, B. K.}, Randomized response and new thoughts on Politz-Simmons technique, 233-251 [Zbl 1366.62040]
\textit{Arnab, R.; Rueda, M.}, Optional randomized response: a critical review, 253-271 [Zbl 1365.62023]
\textit{Nayak, T. K.; Adeshiyan, S. A.; Zhang, C.}, A concise theory of randomized response techniques for privacy and confidentiality protection, 273-286 [Zbl 1365.62042]
\textit{Cruyff, M. J. L. F.; B??ckenholt, U.; van der Heijden, P. G. M.; Frank, L. E.}, A review of regression procedures for randomized response data, including univariate and multivariate logistic regression, the proportional odds model and item response model, and self-protective responses, 287-315 [Zbl 1365.62030]
\textit{Nandy, K.; Marcovitz, M.; Sinha, B. K.}, Eliciting information on sensitive features: block total response technique and related inference, 317-329 [Zbl 1365.62041]
\textit{Mukerjee, R.}, Optional randomized response revisited, 331-340 [Zbl 1365.62039]
\textit{Bose, M.}, Measures of respondent privacy in randomized response surveys, 341-351 [Zbl 1365.62024]
\textit{Le, S.-S.; Sedory, S. A.; Singh, S.}, Cramer-Rao lower bounds of variance for estimating two proportions and their overlap by using two decks of cards, 353-385 [Zbl 1365.62035]
\textit{Shaw, P.}, Estimating a finite population proportion bearing a sensitive attribute from a single probability sample by item count technique, 387-403 [Zbl 1365.62051]
\textit{Su, S.-C.; Lee, C.-S.; Sedoryi, S. A.; Singh, S.}, Estimation of means of two rare sensitive characteristics: Cramer-Rao lower bound of variances, 413-426 [Zbl 1365.62086]
\textit{Dihidar, K.}, Estimating sensitive population proportion by generating randomized response following direct and inverse hypergeometric distribution, 427-441 [Zbl 1365.62031]
\textit{Johnson, M. L.; Sedory, S. A.; Singh, S.}, Incredibly efficient use of a negative hypergeometric distribution in randomized response techniques, 443-469 [Zbl 1365.62033]
\textit{Mohamed, C.; Sedory, S. A.; Singh, S.}, Comparison of different imputing methods for scrambled responses, 471-495 [Zbl 1365.62038]
\textit{Padmawar, V. R.}, On an indirect response model, 497-513 [Zbl 1365.62043]