Shyamal K. De, Ph.D.
Affiliations: | 2012 | Mathematical Sciences | University of Texas at Dallas, Richardson, TX, United States |
Area:
StatisticsGoogle:
"Shyamal De"Parents
Sign in to add mentor| Michael Baron | grad student | 2012 | UT Dallas | |
| (Simultaneous testing of multiple hypotheses in sequential experiments.) | ||||
BETA: Related publications
See more...
Publications
|
You can help our author matching system! If you notice any publications incorrectly attributed to this author, please sign in and mark matches as correct or incorrect. |
| De SK, Mukhopadhyay N. (2019) Two-stage fixed-width and bounded-width confidence interval estimation methodologies for the common correlation in an equi-correlated multivariate normal distribution Sequential Analysis. 38: 214-258 |
| De SK, Chattopadhyay B. (2017) Minimum Risk Point Estimation of Gini Index Arxiv: Methodology. 79: 247-277 |
| Chattopadhyay B, De SK. (2016) Estimation of Gini Index within Pre-Specified Error Bound Econometrics. 4: 1-12 |
| De SK, Zacks S. (2016) Two-stage and sequential estimation of parameterNof binomial distribution whenpis known Sequential Analysis. 35: 440-452 |
| De SK, Mukhopadhyay N. (2015) Fixed Accuracy Interval Estimation of the Common Variance in an Equi-Correlated Normal Distribution Sequential Analysis. 34: 364-386 |
| De SK, Baron M. (2015) Sequential tests controlling generalized familywise error rates Statistical Methodology. 23: 88-102 |
| De SK, Zacks S. (2015) Exact Calculation of the Distributions of the Stopping Times of Two Types of Truncated SPRT for the Mean of the Exponential Distribution Methodology and Computing in Applied Probability |
| De SK, Baron M. (2012) Sequential Bonferroni Methods for Multiple Hypothesis Testing with Strong Control of Family-Wise Error Rates I and II Sequential Analysis. 31: 238-262 |
| De SK, Baron M. (2012) Step-up and step-down methods for testing multiple hypotheses in sequential experiments Journal of Statistical Planning and Inference. 142: 2059-2070 |
| Bhandari SK, De SK, Mandal S, et al. (2009) Study of Optimal Adaptive Rule in Testing Composite Hypothesis Sequential Analysis. 28: 394-405 |