Wisconsin-Madison University

A.Publications

1.Chen, Shun-yi, One-stage and two-stage statistical inference under heteroscedasticity. 

    Communications in Statistics: Simulation and Computation (SCI), 30(4), 991-1009, (2001).

2.Chen, Shun-yi, A range test for the equality of means when variances are unequal. 

    American Journal of Mathematical and Management Sciences, 20(1), 145-170, (2000).

3.Chen, Shun-yi, One-sided range test for testing against an ordered alternative under 

    heteroscedasticity. Communications in Statistics : Simulation and Computation (SCI), 29(4), 

    1255-1272, (2000).

4.Chen, Shun-yi, An ANOVA test for the equivalency of means under unequal variances. Computational 

    Statistics and Data Analysis (SCI), 33(2), 151-175, (2000).

5.Chen, H. J.; Chen, Shun-yi, One-sided range test for testing against an ordered alternative under 

    heteroscedasticity. (1999).

6.Chen, Shun-yi; Chen, Hubert J., A range test for the equivalency of means under unequal variances. 

    Technometrics (SCI), 41, no.3, 250-260, (1999).

7.Chen, Hubert J.; Chen, Shun-yi , A nearly optimal confidence interval for the largest normal mean. 

    Communications in statistics : simulation and computation (SCI), 28, no.1,131-146, (1999).

8.Chen, Shun-yi, One-Stage range test and multiple comparisons of means under heteroscedasticity, 31,

    (1998).

9.Chen, H. J.; Chen, Shun-yi Optimal confidence interval for the largest normal mean, (1998).

10. Chen, Shun-yi; Wu, Hsiu-fen; Chang, H. F, Two-stage range test for the equality of means under 

    heteroscedasticity. Journal of the Chinese statistical association, 36, no.4, 339-359, (1998).

11.Bau, J. J.; Chen, H. J.; Chen, Shun-yi , An extremal ratio test for the equivalency of scale 

    parameters, (1998).

12.Chen, Shun-yi, 變異數不相等時的單階段變異數分析法. 中國統計學報, 36, no.4, 321-338, (1998).

13.Chen, Shun-yi; Chen, H. J., Single-stage analysis of variance under heteroscedasticity, (1998).

14.Chen, Shun-yi; Chen, H. J., An ANOVA test for the equivalency of means under unequal variances, 

   (1998).

15. 陳順益; 吳秀芬; 張惠芳, 二階段全距檢空法. 中國統計學報, 36, no.4, 339-359, (1998).

16. Chen, H. J.; Chen, Shun-yi , A nearly optimal confidence interval for the largest normal mean.

   (1998).

17. Chen, Shun-yi; Chen, H. J., Single-stage analysis of variance under heteroscedasticity. 

    Communications in statistics : simulation and computation (SCI), 27, no.3, 641-666, (1998)

18.Bau, J. J.; Chen, H. J.; Chen, Shun-yi , Lower percentage points of Hartley's extremal quotient 

    statistic and their applications. Communications in Statistics: Simulation and Computation 

    (SCI), 26, no.2, 443-465, (1997).

19.Chen, H. J.; Chen, S. Y., range test for the equivalency of means under unequal variances, 

     (1997).

20.Chen, Shun-yi; Chen, H. J., Single-stage range test and multiple comparisons of means under 

     heteroscedasticity. (1997).

21.Chen, S. Y.; Chen, H. J., A range test for the equality ofmeans when variances are unequal, 

    (1997).

22.Chen, S. Y.; Chen, H. J., Single-stage analysis of variance under heteroscedasticity, (1996).

23.Chen, Shun-yi, Population pharmacokinetics model with covariate effects, 17, (1996).

B.Conference papers

1.Chen, Shun-yi, Optimal confidence interval for the largest normal mean with unknown Variance 

    Proceedings of the Statistical Computing Section. (2001).

2.Chen, Shun-yi; Chen, H. J., A single-stage procedure for testing homogeneity of means against 

    ordered alternatives under unequal variances. Joint statistical meetings, (1999).

3.Chen, Shun-yi; Chen, H. J.; Ding, C. G., An ANOVA test for the equivalency of means under 

    unequal variances The 4th ICSA Statistical Conference, (1998).

4.Chen, Shun-yi; Chen, H. J., A range test for the equivalency of means under  unequal variances.

    Proceeding of the statistical computing section of the American statistical association, 141-146,

    (1998).

5.Chen, S. Y.; Chen, H. J., A range test for the equality of means when variances are unequal, 

     International Conference on Statistical Inference, Combinatorics and Related Areas, (1997).

6.Chen, S. Y.; Chen, H. J., One-stage range test and multiple comparisons of means under 

     heteroscedasticity. Proceedings of the Statistical  Computing Section of the American Statistical

     Association, 51-55, (1997).

7. Chen, S. Y., One-stage analysis of variance and range test for 2-way model under heteroscedasticity. 

     IMS Asian and Pacific regional meeting, (1997).

8. Chen, S. Y.; Chang, H. F., Two-stage range test of the equality of means under heteroscedasticity.

     IMS Asian and Pacific Regional Meeting, (1997). 

9.Chen, S. Y.; Chen, H. J., Single-stage analysis of variance under heteroscedasticity, Proceedings of

     the Statistical Computing Section of the American Statistical Association. 136-141, (1996).

Grants

1. NSC85-2121-M032-004 

   Population Pharmacokinetics Model with Covariate Effects

2. NSC86-2115-M032-016 

   Single-Stage Analysis of Variance under Heteroscedasticity

3. NSC87-2118-M032-005 

   One-Stage Range Test and Multiple Comparisons of Means under Heteroscedasticity

4. NSC89-2118-M032-014 

    ONE-SIDED RANGE TEST FOR TESTING AGAINST AN ORDERED ALTERNATIVE UNDER HETEROSCEDASTICITY

5. NSC89-2118-M032-009 

    A Single-Stage Procedure for Testing Homogeneity of Means Against Order Alternatives under Unequal Variances

6. NSC90-2118-M032-003 

    Empirical Likelihood with Application to Data Sets with Large Proportion of Zeroes

7. NSC91-2118-M032-003 

    Empirical Likelihood with Application to Data Sets with Large Proportion of Zeroes

8. NSC92-2118-M032-003 

    Empirical likelihood confidence intervals using varying probability sampling for data with many zero values