| A new one-parameter unit-Lindley distribution. J MAZUCHELI, SR BAPAT, AFB MENEZES Chilean Journal of Statistics (ChJS) 11 (1), 2020 | 28 | 2020 |
| Multistage point estimation methodologies for a negative exponential location under a modified linex loss function: Illustrations with infant mortality and bone marrow data N Mukhopadhyay, SR Bapat Sequential Analysis 35 (2), 175-206, 2016 | 19 | 2016 |
| Multistage estimation of the difference of locations of two negative exponential populations under a modified linex loss function: real data illustrations from cancer studies … N Mukhopadhyay, SR Bapat Sequential Analysis 35 (3), 387-412, 2016 | 15 | 2016 |
| Purely sequential bounded-risk point estimation of the negative binomial mean under various loss functions: one-sample problem N Mukhopadhyay, SR Bapat Annals of the Institute of Statistical Mathematics 70, 1049-1075, 2018 | 13 | 2018 |
| Purely Sequential Fixed Accuracy Confidence Intervals for P(X < Y) under Bivariate Exponential Models SR Bapat American Journal of Mathematical and Management Sciences 37 (4), 386-400, 2018 | 12 | 2018 |
| On purely sequential estimation of an inverse Gaussian mean SR Bapat Metrika 81 (8), 1005-1024, 2018 | 11 | 2018 |
| Multi-stage point estimation of the mean of an inverse Gaussian distribution A Chaturvedi, SR Bapat, N Joshi Sequential Analysis 38 (1), 1-25, 2019 | 10 | 2019 |
| Purely sequential bounded-risk point estimation of the negative binomial means under various loss functions: Multi-sample problems N Mukhopadhyay, SR Bapat Sequential Analysis 36 (4), 490-512, 2017 | 9 | 2017 |
| Multi-stage procedures for the minimum risk and bounded risk point estimation of the location of negative exponential distribution under the modified LINEX loss function A Chaturvedi, SR Bapat, N Joshi Sequential Analysis 38 (2), 135-162, 2019 | 8 | 2019 |
| On improved accelerated sequential estimation of the mean of an inverse Gaussian distribution N Joshi, SR Bapat Communications in Statistics-Theory and Methods 51 (17), 6127-6143, 2022 | 6 | 2022 |
| On comparing locations of two-parameter exponential distributions using sequential sampling with applications in cancer research Y Zhuang, SR Bapat Communications in Statistics-Simulation and Computation 51 (10), 6114-6135, 2022 | 5 | 2022 |
| Purely sequential and k-stage procedures for estimating the mean of an inverse Gaussian distribution A Chaturvedi, SR Bapat, N Joshi Methodology and Computing in Applied Probability 22 (3), 1193-1219, 2020 | 5 | 2020 |
| Sequential minimum risk point estimation of the parameters of an Inverse Gaussian Distribution A Chaturvedi, SR Bapat, N Joshi American Journal of Mathematical and Management Sciences 39 (1), 20-40, 2020 | 5 | 2020 |
| A new correlation for bivariate time series with a higher order of integration SR Bapat Communications in Statistics-Simulation and Computation 49 (10), 2546-2558, 2020 | 3 | 2020 |
| Estimation of fixed-accuracy confidence interval of the stress–strength reliability for inverse Pareto distribution using two-stage sampling technique N Joshi, SR Bapat, RN Sengupta Sequential Analysis 43 (1), 79-102, 2024 | 2 | 2024 |
| On fixed-accuracy confidence intervals for the parameters of lindley distribution and its extensions S Bapat, N Joshi, A Shukla Austrian Journal of Statistics 52 (2), 104-115, 2023 | 2 | 2023 |
| Sentiment analysis of ESG disclosures on stock market SR Bapat, S Kothari, R Bansal arXiv preprint arXiv:2210.00731, 2022 | 2 | 2022 |
| Sequential estimation of an Inverse Gaussian mean with known coefficient of variation A Chaturvedi, SR Bapat, N Joshi Sankhya B 84 (1), 402-420, 2022 | 2 | 2022 |
| A class of accelerated sequential procedures with applications to estimation problems for some distributions useful in reliability theory N Joshi, SR Bapat, AK Shukla Communications for Statistical Applications and Methods 28 (5), 563-582, 2021 | 2 | 2021 |
| Two-stage and sequential procedures for estimation of powers of parameter of a family of distributions A Chaturvedi, SR Bapat, N Joshi Sequential Analysis 40 (2), 170-197, 2021 | 2 | 2021 |
Neeraj JoshiDepartment of Mathematics, Indian Institute of Technology Delhi在 iitd.ac.in 的电子邮件经过验证
