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Sequential Analysis
Design Methods and Applications
Volume 38, 2019 - Issue 2
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Original Article

Selection among Bernoulli populations in comparison with a standard

Elena M. BuzaianuDepartment of Mathematics and Statistics, University of North Florida, Jacksonville, Florida, USACorrespondence[email protected]
Pages 184-198 | Received 25 Oct 2018, Accepted 10 Mar 2019, Published online: 09 Jul 2019

References

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  • 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.
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  • 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.

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