- AlamK. (1967). A two-sample estimate of a common mean. Annals of the Institute of Statistical Mathematics, 19, 261–270.
- AlamK. and SaxenaK.M.L. (1984). Bounded length confidence interval for a common mean. Communications in Statistics - Theory and Methods, 13, 2133–2142.
- AnscombeF.J. (1952). Large sample theory of sequential estimation. Proceedings of the Cambridge Philosophical Society, 48, 600–607.
- Von BahrB. and EsseenC.G. (1965). Inequalities for the r th absolute moment of a sum of random variables, 1 < r < 2. Annals of Mathematical Statistics, 36, 299–303.
- BechhoferR.E. and SobelM. (1954). A single sample multiple decision procedure for ranking variances of normal populations. Annals of Mathematical Statistics, 25, 273–289.
- BickelP.J. and YahavJ.A. (1968). Asymptotically optimal Bayes and minimax procedures in sequential estimation. Annals of Mathematical Statistics, 39, 442–456.
- BlumJ.R., HansonD.L. and RosenblattJ.I. (1963). On the central limit theorem for the sum of a random number of independent random variables. Zeitschrift für Wahrscheinlichkeitstheorie und verwandte Gebiete, 1, 389–393.
- ChernoffH. (1968). Optimal stochastic control. Sankya A, 30, 221–252.
- ChernoffH. (1971). The efficient estimation of a parameter measurable by two instruments of unknown precisions. Optimizing methods in statistics, (Editor, RustagiJ.S.). Academic Press, New York, 1–27.
- ChowY.S. and RobbinsH. (1965). On the asymptotic theory of fixed-width sequential confidence intervals for the mean. Annals of Mathematical Statistics, 457–462.
- DudewiczE.J. and BishopT.A. (1979). The heteroscedastic method. Optimizing methods in statistics, (Editor, RustagiJ.S.). Academic Press, New York, 183–203.
- GibbonsJ.D., OlkinI., SobelM. (1977). Selecting and ordering populations. Wiley, New York.
- GovindarajuluZ. (1987). The Sequential Statistical Analysis of Hypothesis Testing, Point and Interval Estimation, and Decicion Theory. American Sciences Press, Inc., ColumbusOhio.
- GuptaS.S. and SobelM. (1962). On selecting a subset containing the population with the smalles variance. Biometrika, 49, 495–507.
- GraybillF.A. and DealR.B. (1959). Combining unbiased estimators. Biometrics, 15, 543–550.
- HoelD.G. (1971). A method for the construction of sequential selection procedures. Annals of Mathematical Statistics, 42, 630–642.
- MallikA.K. (1971). Sequential estimation of the common means of two normal populations, Technical Report no. 42, Department of Statistics, Stanford University.
- RichterD. (1960). Two-stage experiments for estimating a common mean. Annals of Mathematical Statistics, 31, 1164–1173.
- RobbinsH. (1959). Sequential estimation of the mean of a normal population. Probability and Statistics - The Harald Cramér Volume, Almquist and Wiksell, Uppsala, 235–245.
- SinhaB.K. (1985). Unbiased estimation of the variance of the Graybill-Deal estimator of the common mean of several normal populations. The Canadian Journal of Statistics, 13, 243–247.
- StarrN. (1966). On the asymptotic efficiency of a sequential procedure for estimating the mean. Annals of Mathematical Statistics, 37, 1173–1185.
- SwanepoelJ.W.H. and VenterJ.H. (1975). On the construction of sequential selection procedures. South African Statistical Journal, 9, 103–118.
- Choose new content alerts to be informed about new research of interest to you
- Easy remote access to your institution's subscriptions on any device, from any location
- Save your searches and schedule alerts to send you new results
- Export your search results into a .csv file to support your research
![Supercharge Your Next Research Paper: Research and write your next paper with Jenni AI.]({"type":"image" , "src" : "/sda/112445/Skyscraper-econ.png"})