Dr. Dr. Umesh Singh
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Dr. Dr. Umesh Singh

Professor
Banaras Hindu University, India

Highest Degree
Ph.D. in Physical Sciences from Rajasthan University, Jaipur, India

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Area of Interest:

Bayesian Inference
100%
Incompletely Specified Models
62%
Reliability
90%
Stochastic Model
75%
Bayesian Inference
55%

Research Publications in Numbers

Books
0
Chapters
0
Articles
16
Abstracts
0

Selected Publications

  1. Singh, U. and D. Kumar, 2011. Estimation of parameters and reliability function of exponentiated exponential distribution: Bayesian approach under general entropy loss function. Pak. J. Stat. Oper. Res. 7: 199-206.
  2. Singh, S.K., U. Singh and G.P. Singh, 2011. Model selection and bayes estimates of the parameter for distribution of waiting time to first birth. Int. J. Curr. Res., 3: 091-095.
    Direct Link  |  
  3. Singh, R., S.K. Singh and R.D. Singh, 2009. Bayes estimator of weibull parameters using lindley's approximation under general entropy loss function J. Sci. Res., 53: 127-145.
  4. Singh, R., S.K. Singh and G.P. Singh, 2009. Bayes estimators of generalized expontial parameters under general entropy loss function using lindley`s approximation. Stat. Trans. New Series, 10: 109-127.
  5. Singh, B.P., U. Singh and A. Kumar, 2009. Bayesian estimation of scale parameter of classical pareto distribution under multiply type-II censoring. J. Sci. Res., 53: 147-162.
  6. Singh, S.K., P.K. Singh, S.K Upadhyay and R.D. Singh, 2008. Bayes estimator of weibull parameters under general entropy loss function. J. Sci. Res., 52: 249-262.
  7. Singh, R., S.K. Singh, U. Singh and G.P. Singh, 2008. Bayes estimator of generalized exponential parameters under LINEX loss function using lindley's approximation. Data Sci. J., 7: 65-75.
  8. Singh, P.K., S.K. Singh and U. Singh, 2008. Bayes estimator of inverse gaussian parameters under general entropy loss function using lindley's approximation. Commun. Stat. Simulation Comput., 37: 1750-1762.
    CrossRef  |  Direct Link  |  
  9. Singh, S.K. and P.K. Singh, 2007. Bayes estimator of gamma parameter under general entropy loss function using lindley`s approximation. J. Ravishankar Univ., 20: 87-104.
  10. Singh, B.P., S.K. Singh, K.K. Singh and N. Singh, 2007. A batesian analysis of risk of under five mortality in two contrasting state of India. Janasamkhyay, 24-25: 7-15.
  11. Kumar, A., 2007. Estimation of exponential parameter under multiply type II censoring scheme using prior information. Aust. J. Stat., 36: 227-238.
  12. Singh, S.K. and P.K. Singh, 2006. Bayes estimator of gamma parameter under general entropy loss function using lindley`s. J. Ravishankar Univ., 18: 83-96.
  13. Singh, U. and A. Kumar, 2005. Shrinkage estimators for the exponential scale parameter under multiply type-II censoring. Aust. J. Stat., 34: 39-49.
    Direct Link  |  
  14. Kumar, A., 2005. Bayes estimator for one parameter exponential distribution under multiply type-II censoring. Indian J. Math. Math. Sci., 1: 23-33.
  15. Kumar, A. and S.K. Upadhyay, 2005. Maximum likelihood estimators of the parameter of exponential distribution under multiply type-II censoring. Assam. Stat. Reiv., 19: 30-43.
  16. Kumar, A. and S.K. Upadhyay, 2002. Bayes estimator of average life time for normal distribution utilizing point guess. Progress Math., 36: 65-82.