- ChenH. J. and DudewiczE. J. (1976). Procedures for fixed-width interval estimation of the largest normal mean. Journal of American Statistical Association, 71, 752–756.
- ChenH. J. and LamK. (1989). Single-stage interval estimation of the largest normal mean under heteroscedasticity. Communications in Statistics - Theory and Methods, 18(10), 3703–3718.
- DudewiczE. J. and DalalS. R. (1975). Allocation of observations in ranking and selection with unequal variances. Sankhya, Ser. B., 37, 28–78.
- DudewiczE. J. and van der MeulenE. C. (1984). On assessing the precision of simulation estimates of percentile points. American Journal of Mathematical and Management Sciences, Vol. 4, Nos. 3 & 4, 335–343.
- HalperinM., GreenhouseS. W., CornfieldJ. and ZalokarJ. (1955). Tables of percentage points for the studentized maximum absolute deviate in normal samples. Journal of American Statistical Association 50, 185–195.
- HochbergY. and TamhaneA. C. (1987). Multiple Comparison Procedures. Wiley, New York.
- LamK. (1992). Subset selection of normal populations under heteroscedasticity. The Frontiers of Modern Statistical Inference Procedures, II (Eds. BofingerE., DudewiczE. J., LewisG. J., and MengersenK.), 307–344, American Sciences Press, Inc., ColumbusOhio.
- MarsagliaG. (1986). A current view of randomnumber generators, Computer Science and Statistics: Proc. 16th Symp. Interface, Atlanta, March 1984 (Elsevier Science Publishers, Amsterdam).
- MarsagliaG., ZamanA., and TsangW. W. (1990). Toward a universal random number generator. Statistics and Probability Letters, 8, 35–39.
- NairK. R. (1948). The distribution of the extreme deviate from the sample mean and its studentized form. Biometrika 35, 118–144.
- NelsonL. S. (1983). Exact critical values for use with the analysis of means. Journal of Quality Technology, 15, 40–44.
- NelsonP. R. (1982a). Exact critical points for the analysis of means. Communications in Statistics-Theory and Methods, 11, 699–709.
- NelsonP. R. (1982b). Multivariate normal and t distributions with pjk = αiαj. Communications in Statistics - Simulation and Computation, 11 (2), 239–248.
- NelsonP. R. (1993). Additional uses for the analysis of means and extended tables of critical values. Technometrics, 35, 61–71.
- SteckG. P. and OwenD. B. (1962). A note on the equicorrelated multivariate normal distribution. Biometrika, 269–271.
- SteinC. M. (1945). A two-sample test for a linear hypothesis whose power is independent of the variance. Annals of Mathematical Statistics, 16, 243–58.
- TongY. L. (1980). Probability Inequalities in Multivariate Distributions. Academic Press, New York.
- WenM. J. and ChenH. J. (1994). Single-stage multiple comparison procedure under heteroscedasticity. American Journal of Mathematical and Management Sciences. Vol. 14, Nos 1 and 2, 1–48.
- WuS. F. and ChenH. J. (1994). Multiple comparison procedures with the average, normal means. Technical Report Number 94–29, Department of Statistics, The University of Georgia, Athens, GA 30602, USA.
- 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