https://orcid.org/0000-0002-7771-8446
References
- Abdalghani, O., M. Arshad, K. Meena, and A. Pathak. 2021. Adjusted Bias and Risk for Estimating Treatment Effect after Selection with an Application in Idiopathic Osteoporosis. Milton Park, Abingdon, Oxon: CRC Press.
- Bahadur, R. R., and L. A. Goodman. 1952. Impartial decision rules and sufficient statistics. Annals of Mathematical Statistics 23 (4):553–562. doi:10.1214/aoms/1177729334.
- Bauer, P., F. Bretz, V. Dragalin, F. König, and G. Wassmer. 2016. Twenty-five years of confirmatory adaptive designs: Opportunities and pitfalls. Statistics in Medicine 35 (3):325–347. doi:10.1002/sim.6472.
- Bauer, P., and M. Kieser. 1999. Combining different phases in the development of medical treatments within a single trial. Statistics in Medicine 18 (14):1833–1848. doi:10.1002/(SICI)1097-0258(19990730)18:14<1833:AID-SIM221>3.0.CO;2-3.
- Bowden, J., and E. Glimm. 2008. Unbiased estimation of selected treatment means in two-stage trials. Biometrical Journal: Journal of Mathematical Methods in Biosciences 50 (4):515–527. doi:10.1002/bimj.200810442.
- Brewster, J. -F., and J. Zidek. 1974. Improving on equivariant estimators. Annals of Statistics 2 (1):21–38. doi:10.1214/aos/1176342610.
- Chow, S. -C., and M. Chang. 2006. Adaptive design methods in clinical trials. Boca Raton, Florida: Chapman and Hall/CRC.
- Cohen, A., and H. B. Sackrowitz. 1989. Two stage conditionally unbiased estimators of the selected mean. Statistics & Probability Letters 8 (3):273–278. doi:10.1016/0167-7152(89)90133-8.
- Dahiya, R. C. 1974. Estimation of the mean of the selected population. Journal of the American Statistical Association 69 (345):226–230. doi:10.1080/01621459.1974.10480159.
- Daniel, W. W., and C. L. Cross. 2018. Biostatistics: A Foundation for Analysis in the Health Sciences. Wiley, USA: Wiley.
- Eaton, M. L. 1967. Some optimum properties of ranking procedures. Annals of Mathematical Statistics 38 (1):124–137. doi:10.1214/aoms/1177699063.
- Hwang, J. T. 1993. Empirical Bayes estimation for the means of the selected populations. Sankhyā Series A 55 (2):285–304.
- Kimani, P. K., S. Todd, and N. Stallard. 2013. Conditionally unbiased estimation in phase ii/iii clinical trials with early stopping for futility. Statistics in Medicine 32 (17):2893–2910. doi:10.1002/sim.5757.
- Lu, X., A. Sun, and S. S. Wu. 2013. On estimating the mean of the selected normal population in two-stage adaptive designs. Journal of Statistical Planning and Inference 143 (7):1215–1220. doi:10.1016/j.jspi.2013.01.011.
- Masihuddin, and N. Misra. 2021. Equivariant estimation following selection from two normal populations having common unknown variance. Statistics 55 (6):1407–1438. doi:10.1080/02331888.2021.2006660.
- Misra, N., and I. D. Dhariyal. 1994. Non-minimaxity of natural decision rules under heteroscedasticity. Statistics and Decisions 12 (1):79–89. doi:10.1524/strm.1994.12.1.79.
- Putter, J., and D. Rubinstein. 1968. Technical report No. 165: On estimating the mean of a selected population. University of Wisconsin Statistics Department, Wisconsin.
- Robertson, D. S., B. Choodari-Oskooei, M. Dimairo, L. Flight, P. Pallmann, and T. Jaki. 2023. Point estimation for adaptive trial designs i: A methodological review. Statistics in Medicine 42 (2):122–145. doi:10.1002/sim.9605.
- Robertson, D. S., and E. Glimm. 2019. Conditionally unbiased estimation in the normal setting with unknown variances. Communications in Statistics-Theory and Methods 48 (3):616–627. doi:10.1080/03610926.2017.1417429.
- Sackrowitz, H., and E. Samuel-Cahn. 1986. Evaluating the chosen population: A Bayes and minimax approach. Lecture Notes-Monograph Series 386–399.
- Sampson, A. R., and M. W. Sill. 2005. Drop-the-losers design: Normal case. Biometrical Journal: Journal of Mathematical Methods in Biosciences 47 (3):257–268. doi:10.1002/bimj.200410119.
- Sill, M. W. (2000). Estimation and inference for drop-the-losers designs. PhD thesis, University of Pittsburgh.
- Sill, M. W., and A. R. Sampson. 2007. Extension of a two-stage conditionally unbiased estimator of the selected population to the bivariate normal case. Communications in Statistics—theory and Methods 36 (4):801–813. doi:10.1080/03610920601034072.
- Tappin, L. 1992. Unbiased estimation of the parameter of a selected binomial population. Communications in Statistics-Theory and Methods 21 (4):1067–1083. doi:10.1080/03610929208830831.
- Thall, P. F., R. Simon, and S. S. Ellenberg. 1988. Two-stage selection and testing designs for comparative clinical trials. Biometrika 75 (2):303–310. doi:10.1093/biomet/75.2.303.
- Thall, P. F., R. Simon, and S. S. Ellenberg. 1989. A two-stage design for choosing among several experimental treatments and a control in clinical trials. Biometrics 45 (2):537–547. doi:10.2307/2531495.
- Vellaisamy, P. 2009. A note on unbiased estimation following selection. Statistical Methodology 6 (4):389–396. doi:10.1016/j.stamet.2008.12.001.
- Wu, S. S., W. Wang, and M. C. Yang. 2010. Interval estimation for drop-the-losers designs. Biometrika 97 (2):405–418. doi:10.1093/biomet/asq003.