The inverse Lindley distribution: a stress-strength reliability model with application to head and neck cancer data VK Sharma, SK Singh, U Singh, V Agiwal Journal of Industrial and Production Engineering 32 (3), 162-173, 2015 | 232 | 2015 |
A new distribution using sine function-its application to bladder cancer patients data D Kumar, U Singh, SK Singh Journal of Statistics Applications & Probability 4 (3), 417, 2015 | 124 | 2015 |
The generalized inverse Lindley distribution: A new inverse statistical model for the study of upside-down bathtub data VK Sharma, SK Singh, U Singh, F Merovci Communications in Statistics-Theory and Methods 45 (19), 5709-5729, 2016 | 96 | 2016 |
Bayes estimators of the reliability function and parameter of inverted exponential distribution using informative and non-informative priors SK Singh, U Singh, D Kumar Journal of Statistical computation and simulation 83 (12), 2258-2269, 2013 | 78 | 2013 |
A new upside-down bathtub shaped hazard rate model for survival data analysis VK Sharma, SK Singh, U Singh Applied Mathematics and Computation 239, 242-253, 2014 | 60 | 2014 |
Bayesian estimation of the exponentiated gamma parameter and reliability function under asymmetric loss function SK Singh, U Singh, D Kumar REVSTAT–Stat J 9 (3), 247-260, 2011 | 57 | 2011 |
Maximum product spacings method for the estimation of parameters of generalized inverted exponential distribution under Progressive Type II Censoring R Kumar Singh, S Kumar Singh, U Singh Journal of Statistics and Management Systems 19 (2), 219-245, 2016 | 56 | 2016 |
Bayesian estimation of parameters of inverse Weibull distribution SK Singh, U Singh, D Kumar Journal of Applied statistics 40 (7), 1597-1607, 2013 | 52 | 2013 |
Bayes estimator of generalized-exponential parameters under Linex loss function using Lindley's approximation R Singh, SK Singh, U Singh, GP Singh Data Science Journal 7, 65-75, 2008 | 51 | 2008 |
The truncated Lindley distribution: Inference and application SK Singh, U Singh, VK Sharma Journal of Statistics Applications & Probability 3 (2), 219, 2014 | 49 | 2014 |
Estimation of parameters of generalized inverted exponential distribution for progressive type-II censored sample with binomial removals SK Singh, U Singh, M Kumar Journal of Probability and Statistics 2013, 2013 | 47 | 2013 |
Bayes estimator of inverse Gaussian parameters under general entropy loss function using Lindley's approximation PK Singh, SK Singh, U Singh Communications in Statistics—Simulation and Computation® 37 (9), 1750-1762, 2008 | 46 | 2008 |
A new class of distribution having decreasing, increasing, and bathtub-shaped failure rate SK Maurya, A Kaushik, SK Singh, U Singh Communications in Statistics-Theory and Methods 46 (20), 10359-10372, 2017 | 45 | 2017 |
On the estimation of stress strength reliability parameter of inverted exponential distribution SK Singh, U Singh, A Yadav, PK Viswkarma International Journal of Scientific World 3 (1), 98-112, 2015 | 44 | 2015 |
On hybrid censored inverse Lomax distribution: application to the survival data AS Yadav, SK Singh, U Singh Statistica 76 (2), 185-203, 2016 | 40 | 2016 |
A new method of proposing distribution and its application to real data SK Maurya, A Kaushik, RK Singh, SK Singh, U Singh Imperial Journal of Interdisciplinary Research 2 (6), 1331-1338, 2016 | 37 | 2016 |
A comparative study of traditional estimation methods and maximum product spacings method in generalized inverted exponential distribution U Singh, SK Singh, RK Singh Journal of Statistics Applications & Probability 3 (2), 153, 2014 | 37 | 2014 |
Bayesian estimation and prediction for flexible Weibull model under Type-II censoring scheme SK Singh, U Singh, VK Sharma Journal of Probability and Statistics 2013, 2013 | 36 | 2013 |
Bayesian estimation for Poisson-exponential model under progressive type-II censoring data with binomial removal and its application to ovarian cancer data SK Singh, U Singh, M Kumar Communications in Statistics-Simulation and Computation 45 (9), 3457-3475, 2016 | 35 | 2016 |
Bayesian prediction of future observations from inverse Weibull distribution based on Type-II hybrid censored sample SK Singh, U Singh, VK Sharma International Journal of Advanced Statistics and Probability 1 (2), 32-43, 2013 | 35 | 2013 |