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American Journal of Mathematical and Management Sciences Volume 11, 1991 - Issue 3-4: Modern Sequential Analysis (SSA) in Honor of Professor Herbert Robbins
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Original Articles

A Note on a Curtailed Sequential Procedure for Subset Selection of Multinomial Cells

Robert E. BechhoferSchool of Operations Research and Industrial Engineering Cornell University, Ithaca, NY14853-7501
&
Pinyuen ChenDepartment of MathematicsSyracuse University, Syracuse, NY13244-1150
Pages 309-324 | Published online: 14 Aug 2013

  • BechhoferR.E., ElmaghrabyS. and MorseN. (1959). A single-sample multiple-decision procedure for selecting the multinomial event which has the highest probability. The Annals of Mathematical Statistics, 30, 102–119.
  • BechhoferR.E. and GoldsmanD.M. (1985a). On the Ramey-Alam sequential procedure for selecting the multinomial event which has the largest probability. Communications in Statistics—Simulation and Computation, B14 (2), 263–282.
  • BechhoferR.E. and GoldsmanD.M. (1985b). Truncation of the Bechhofer-Kiefer-Sobel sequential procedure for selecting the multinomial even which has the largest probability. Communications in Statistics—Simulation and Computation, B14 (2), 283–315.
  • BechhoferR.E. and GoldsmanD.M. (1986). Truncation of the Bechhofer-Kiefer-sobel sequential procedure for selecting the multinomial event which has the largest probability. Communications in Statistics—Simulation and Computation, B15 (3), 829–851.
  • BechhoferR.E., KieferJ. and SobelM. (1968). Sequential Identification and Ranking Procedures (with special reference to Koopman-Darmois populations. The University of Chicago Press, ChicagoIllinois.
  • BechhoferR.E. and KulkarniR.V. (1984). Closed sequential procedures for selecting the multinomial events which have the largest probabilities. Communications in Statistics—Theory and Methods, A13 (24), 2997–3031.
  • CacoullosT. and SobelM. (1966). An inverse-sampling procedure for selecting the most probable event in a multinomial distribution. In Multivariate Analysis (Ed. KrishnaiahP. R.) 423–455. Academic Press, New York.
  • GuptaS.S. and NagelK. (1967). On selection and ranking procedures and order statistics from the multinomial distribution. Sankhya, Series B, 29, 1–34.
  • PanchapakesanS. (1971). On a subset selection procedure for the most probable event in a multinomial distribution. Statistical Decision Theory and Related Topics (Eds. GuptaS. S. and YackelJ.), Academic Press, New York, 275–298.
  • RameyJ.T. and AlamK. (1979). A sequential procedure for selecting the most probable multinomial event. Biometrika, 66, 171–173.

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