References
- Augustin , T. and Coolen , F. P. A. 2004 . Nonparametric predictive inference and interval probability . J. Stat. Plan. Inference , 124 : 251 – 272 .
- Chow , Y. S. , Moriguti , S. , Robbins , H. and Samuels , S. M. 1964 . Optimal selection based on relative rank . Israel J. Math , 2 : 81 – 90 .
- Coolen , F. P. A. 2006 . On nonparametric predictive inference and objective Bayesianism . J. Logic Language Information , 15 : 21 – 47 .
- Coolen , F. P. A. 2011 . “ Nonparametric predictive inference ” . In International encyclopedia of statistical science , Edited by: Lovric , M. 968 – 970 . Berlin : Springer .
- Coolen , F. P. A. and Elsaeiti , M. A. 2009 . Nonparametric predictive methods for acceptance sampling . J. Stat. Theory Pract , 3 : 907 – 921 .
- Elsaeiti, M. A., 2012. Nonparametric predictive inference for acceptance decisions. PhD thesis, Durham University, UK. www.npi-statistics.com (http://www.npi-statistics.com)
- Freeman , P. R. 1983 . The secretary problem and its extensions: A review . Int. Stat. Rev , 51 : 189 – 206 .
- Henke , M. 1973 . Expectations and variances of stopping variables in sequential selection processes . J. Appl. Probability , 10 : 786 – 806 .
- Krieger , A. M. , Pollak , M. and Samuel-Cahn , E. 2007 . Select sets: rank and file . Ann. Appl. Probability , 17 : 360 – 385 .
- Krieger , A. M. , Pollak , M. and Samuel-Cahn , E. 2008 . Beat the mean: sequential selection by better than average rules . J. Appl. Probability , 45 : 244 – 259 .
- Lindley , D. V. 1961 . Dynamic programming and decision theory . Appl. Stat , 10 : 39 – 51 .
- Preater , J. 2000 . Sequential selection with a better-than-average rule . Stat. Probability Lett , 50 : 187 – 191 .
- Preater , J. 2006 . On-line selection of an acceptable pair . J. Appl. Probability , 43 : 729 – 740 .
- Samuels , S. 1991 . “ Secretary problems ” . In Handbook of sequential analysis , Edited by: Ghosh , B. K. and Sen , P. K. 381 – 405 . Boca Raton , FL : CRC Press .
- Tamaki , M. 1979 . Recognizing both the maximum and the second maximum of a sequence . J. Appl. Probability , 16 : 803 – 812 .
- Tamaki , M. 1991 . A secretary problem with uncertain employment and best choice of available candidates . Operations Res , 39 : 274 – 284 .