References
- Bechhofer, R. E. and Kulkarni, R. V. (1982). Closed Adaptive Procedures for Selecting the Best of k≥2 Bernoulli Populations, in Statistical Decision Theory and Related Topics, vol. 1, S. S. Gupta and J. O. Berger, eds., pp. 61–108, New York: Academic Press.
- Bechoffer, R. E. and Turnbull, B. W. (1978). Two (k+1)-Decision Selection Procedures for Comparing k Normal Means with a Specified Standard, Journal of American Statistical Association 73: 385–392.
- Buzaianu, E. B. and Chen, P. (2008). Curtailment Procedure for Selecting among Bernoulli Populations, Communications in Statistics–Theory & Methods 37: 1085–1102.
- Dunnett, C. W. (1955). A Multiple Comparison Procedure for Comparing Several Treatments with a Control, Journal of American Statistical Association 50: 1096–1121.
- Gupta, S. S. and Sobel, M. (1960). Selecting a Subset Containing the Best of Several Binomial Populations, in Contributions to Probability and Statistics, I. Olkin, S. G. Ghurye, W. Hoeffding, W. G. Madow, and H. B. Mann, eds., pp. 219–230, Stanford: Stanford University Press.
- Hackett, G. H., Harris, M. N. E., Plantevin, O. M., Pringle, H. M., Garrioch, D. B., and Avery, A. (1982). Anaesthesia for Out-Patient Termination of Pregnancy, a Comparison of Two Anaesthetic Techniques, British Journal of Anaesthesia 54: 865–870.
- Krishnamoorthy, K., Thomson, J., and Cai Y. (2004). An Exact Method of Testing Equality of Several Binomial Proportions to a Specified Standard, Computational Statistics and Data Analysis 45: 697–707.
- Kulkarni, P. M. and Shah, A. K. (1995). Testing the Equality of Several Binomial Proportions to a Prespecified Standard, Statistics and Probability Letters 25: 213–219.
- Naik, U. D. (1975). Some Selection Rules for Comparing p Processes with a Standard, Communications in Statistics–Theory & Methods 34: 519–535.
- Paulson, E. (1952). On the Comparison of Several Experimental Categories with a Control, Annals of Mathematical Statistics 23: 239–246.
- Sobel, M. and Hyuett, M. (1957). Selecting the Best One of Several Binomial Populations, Bell System Technical Journal 36: 537–181.