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A.
Papers:
48.
Shan, G. and Wang, W. (2021). Advanced
statistical methods and designs for clinical trials for COVID-19. International Journal of Antimicrobial
Agents, 57, 106167.���������
47.
Yang G., Yang, J. Yang, X., Wang, W. (2020). Optimal
two-stage phase II clinical trial with high-safety and effectiveness. Journal of System Science and Mathematical
Science, 40(2), 318-326.
46.Yin,
H., Wang, W. and Zhang, Z. (2020). Exact tests using binary data in
adaptive two or multi-stage designs. Statistical
Methods in Medical Research, 29, 2269-2281.�����
45. Wang, W., Yin, H. and Zhang, Z. (2020).
On construction of smallest one-sided confidence intervals for the response
rate in adaptive two or multi-stage designs. Statistical Methods in Medical Research 29, 1682-1699.
44. Yin, H., Wang, W., and Zhang, Z. (2019). Optimal
two-stage designs with consideration of response and safety and their
correlation. Journal of Beijing
University of Technology 45(12), 81-88.
43. Yin, H., Wang, W., and Zhang, Z. (2019).
On construction of single-arm two-stage designs with consideration of both
response and toxicity. Biometrical
Journal 61, 1462-1476. R-codes.
42. Briggs,
K. T., Taraban, M. B., Wang, W. and Yu, Y. B. (2019). Nondestructive
quantitative inspection of drug products using benchtop NMR relaxometry�the
case of NovoMixR 30. AAPS PharmSciTech
20:189, DOI: 10.1208/s12249-019-1405-0.
41. Wang, W. (2018). A
�paradox" in confidence interval construction using sufficient statistic.
The American Statistician 72,
315-320.
40. �Yu, Y. B., Taraban,
M. B., Wang, W., Briggs, K. (2017). Improving
Biopharmaceutical Safety through Verification-based Quality Control. Trends in Biotechnology 35, 1140-1155.
39. Wang, W. (2017). On exact
interval estimation for the odds ratio in subject-specific table. Statistics and Probability Letters 129,
360-366. R-code.
38.� Shan, G.
and Wang, W. (2017). Exact
one-sided confidence limits for Cohen's kappa as a measurement of agreement.
Statistical Methods in Medical Research,
26, 615-632.
37.
Wang, W. (2015). Exact
optimal confidence intervals for hypergeometric parameters. Journal of the American Statistical
Association 110, 1491-1499. R-code
36.
Wang, W. and Shan, G. (2015). Exact
confidence intervals for the relative risk and the odds ratio.
Biometrics 71, 985-995. R-code.
35.
Zhang, J., Zhang, Z. and Wang, W. (2015).Testing
against second-order stochastic dominance of multiple distributions. International Journal of Biomathematics 8(3),
1550040, DOI: 10.1142/S1793524515500400.
34.
Wang, W. and Peng, J. (2015). A
step-up test procedure to find the minimum effective dose.
Journal of Biopharmaceutical Statistics
25, 525-538. R-code.
33.
Wang, W. (2014). An
iterative construction of confidence interval for a proportion. Statistica Sinica 24,
1389-1410. Supplementary material.
R-code.
32. Wang, W. and Zhang, Z. (2014). Asymptotic
infimum coverage probability for interval estimation of proportions. Metrika 77, 635-646.
31.
Shan, G. and Wang, W. (2013). ExactCIdiff: An R package for computing exact confidence
intervals for the difference of two proportions. The R Journal 5/2, 62-70. An R package �ExactCIdiff� is available.
30.
Wang, W. (2013). A note on
bootstrap confidence intervals for proportions. Statistics and Probability
Letters 83, 2699-2702.
29. Wang, W. (2012). An
inductive order construction for the difference of two dependent proportions.
Statistics and Probability Letters
82, 1623-1628. An R
package �ExactCIdiff� is available.
28. Joynera, K., Wang,
W. and Y. B. Yu. (2011). The
effect of column and eluent fluorination on the retention and separation of
non-fluorinated amino acids and proteins by HPLC. Journal of Fluorine Chemistry 132, 114-122.
27. Wang, W. (2010). On construction of the
smallest one-sided confidence intervals and its application in identifying the
minimum effective dose. Chapter 11 in Frontiers
in Computational and Systems Biology, 219-229, Feng, J., Fu, W. and Sun, F.
(Eds.), Series: Computational Biology,
15, Springer.
26. Wu, S. S., Wang, W. and Yang, M. C. K.
(2010). Interval
estimation for drop-the-loser designs. Biometrika 97(2),
405-418.
25. Wang, W. (2010). On
construction of the smallest one-sided confidence interval for the difference
of two proportions. The Annals of
Statistics 38, 1227-1243. An R package
�ExactCIdiff� is available.
24. Wang, W. (2010). On
hypothesis testing with a partitioned random alternative. SCIENCE CHINA Mathematics 53(4), 927-938.
23. Wu, S. S., Wang, W. and Annis, D. H. (2008). On
identification of the number of best treatments using the Newman-Keuls test. Biometrical
Journal 50, 861-869.
22. Peng, J, Lee, C. I. C., Davis, K. A. and Wang,
W. (2008). Stepwise
confidence intervals for monotone dose-response studies. Biometrics 64, 877-885.
21. Wu, S. S. and Wang, W. (2008). A note
on step-up test in orthogonal saturated designs. Journal of Statistical Planning and Inference 138, 3149-3156.
20. Wu, S. S. and Wang, W. (2007). Step-up
simultaneous tests for identifying active effects in orthogonal saturated
designs. The Annals of Statistics 35, 449-463.
19. Wang, W. (2006). Smallest
confidence intervals for one binomial proportion. Journal of
Statistical Planning and Inference 136,
4293-4306.
18. Voss, D. T. and Wang, W. (2006). Analysis
of orthogonal saturated designs. Chapter 12 in Screening:
Methods for Experimentation in Industry, Drug Discovery, and Genetics, 268-286. Dean, A. M. and Lewis, S.
(Eds.) Springer Science + Business Media, Inc.
17. Voss, D. T. and Wang, W. (2006). On
adaptive testing in orthogonal saturated designs. Statistica
Sinica 16,
227-234.
16. Wang, W. and
Yu, Y. B. (2004). Algorithmic
generation of freely jointed hard sphere chains and properties of their
inertial tensors. Journal of Biomolecular Structure and Dynamics 21, 805-811.
15. Wang, W. and Voss, D. T. (2003). On
adaptive estimation in orthogonal saturated designs. Statistica Sinica 13, 727-737.
14. Wang, W. and
Zhao, L. H. (2003). Nonparametric
tests for the mean of a nonnegative population. Journal of Statistical
Planning and Inference 110, 75-96.
13. Wang, W. and Voss, D. T. (2001). Control
of error rates in adaptive analysis of orthogonal saturated designs. The
Annals of Statistics 29, 1058-1065.
12. Wang, W. and Voss, D. T. (2001). On the analysis of nonorthogonal saturated
designs using effect sparsity. Statistics and Applications 3, 177-192.
11. Kinateder, K.J., Voss,
D. T., and Wang, W. (2001). Analysis of
nearly saturated designs using composite variance estimators. Proceedings of the Sixth International
Conference on Statistics, Combinatorics and Related Areas, December 1999, a special volume
of American Journal of Mathematical and Management Sciences 21, 227-242.
10. Wang, W. and Hwang, J. T. G. (2001).
A
nearly unbiased test for individual bioequivalence. Journal of
Statistical Planning and Inference 99,
41-58.
9.� Kinateder, K.J., Voss, D. T. and Wang, W. (2000). Analysis of
saturated and super-saturated factorial designs: a review. Advances on Methodological and Applied
Aspects of Probability and Statistics: Proceedings of the Indian International
Statistical Association 1998 International Conference, 325--347. N. Balakrishnan (Ed.), Newark, New Jersey:
Gordon and Breach.
8. Kinateder, K.J., Voss,
D. T. and Wang, W. (2000). Exact
confidence intervals in analysis of nonorthogonal saturated designs. Proceedings of the 1997 International
Conference on Statistical Inference, Combinatorics and Related Areas, a
special volume of American Journal of
Mathematical and Management Sciences 20, 71-84. S. Mishra (Ed.).
7. Wang, W. (1999). On
testing of individual bioequivalence. Journal of the American
Statistical Association 94,
880-887.
6. Yu, Y. B. and Wang,
W. (1999). Determinant
of the inertial tensor and rotational entropy of random polymers. The
Journal of Physical Chemistry B 103(36), 7676-7680.
5. Wang, W., Hwang, J. T. G. and DasGupta,
A. (1999). Multivariate
statistical tests for bioequivalence. Biometrika
86, 395-402.
4. Voss, D. T. and Wang, W. (1999). Simultaneous
confidence intervals in the analysis of orthogonal saturated designs. Journal
of Statistical Planning and Inference 81, 383-392.
3. Wang, W. (1999). On
equivalence of two variances of a bivariate normal vector. Journal
of Statistical Planning and Inference 81, 279-292.
2. Wang, W. (1997). Optimal
unbiased tests for bioequivalence in intra-subject variability. Journal
of the American Statistical Association 92, 1163-1170.
1. Hwang, J. T. G. and Wang, W. (1997). The
validity of the test of individual equivalence ratios. Biometrika 84, 893-900.
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