Dr. Sanjay Kumar Singh
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Dr. Sanjay Kumar Singh

Professor
Banaras Hindu University, India


Highest Degree
Ph.D. in Statistics from Banaras Hindu University, Varanasi, Uttar Pradesh, India

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Area of Interest:

Bayesian Inference
100%
Mathematics and Statistics
62%
Statistics
90%
Applied Mathematics
75%
Mathematical Research
55%

Research Publications in Numbers

Books
0
Chapters
0
Articles
96
Abstracts
2

Selected Publications

  1. Singh, U. and V.K. Sharma, 2014. Estimation on system reliability in generalized lindley stress-strength model. J. Stat. Applic. Probab. Lett., 3: 61-75.
  2. Singh, U. and A.S. Yadav, 2014. Bayesian reliability estimation in extension of exponential distribution for progressive type II censored sample with binomial removals using different loss functions. Int. J. Econ. Stat., 13: 19-39.
  3. Singh, S.K., U. Singh, M. Kumar and P.K. Vishwakarma, 2014. Classical and bayesian inference for an extension of the exponential distribution under progressive type-II censored data with binomial removals. J. Stat. Applic. Probab. Lett. Int. J., 1: 75-86.
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  4. Singh, S.K., U. Singh and A.S. Yadav, 2014. Parameter estimation of marshall-olkin exponential distribution under hybrid type-I Censoring scheme. J. Stat. Applic. Probab., 3: 117-127.
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  5. Singh, S.K., U. Singh and A.S. Yadav, 2014. Bayesian estimation of Marshall-Olkin extended exponential parameters under various approximation techniques. Hacettepe J. Math. Stat., 43: 347-360.
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  6. Sharma, V.K., S.K. Singh and U. Singh, 2014. A new upside-down bathtub shaped hazard rate model for survival data analysis. Applied Math. Comput., 239: 242-253.
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  7. Singh, U., G.P. Singh and A. Tripathi, 2013. Bayesian analysis for epidemiological study of child mortality on the district level of Uttar Pradesh. Elixir. Stat., 62: 17901-17907.
  8. Singh, U., G.P. Singh and A. Tripathi, 2013. Assessment of effect of socio-economic variables on child mortality through mathematical modeling. JP J. Biostat., 9: 27-38.
  9. Singh, U. and V.K. Sharma, 2013. Expected total test time and bayes estimation for the generalized lindley distribution under progressive censoring where removals follow the beta-binomial probability law. Applied Math. Comput., 222: 402-419.
  10. Singh, U. and V.K. Sharma, 2013. Bayesian prediction of future observations from inverse weibull distribution based on type-II hybrid censored sample. Int. J. Adv. Stat. Probab., 1: 32-43.
  11. Singh, U. and V.K. Sharma, 2013. Bayesian analysis for type-II hybrid censored sample from inverse weibull distribution. Int. J. Syst. Assur. Eng. Manage., 4: 241-248.
  12. Singh, U. and M. Kumar, 2013. Estimation of parameters of exponentiated pareto model for progressive type-II censored data with binomial removals using Markov Chain Monte Carlo method. Int. J. Math. Comput., 21: 88-102.
  13. Singh, U. and M. Kumar, 2013. Estimation for the parameter of poisson-exponential distribution under Bayesian. J. Data Sci., 12: 157-173.
  14. Singh, U. and M. Kumar, 2013. Bayesian inference for exponential distribution based on progressive type- II censored data with random scheme. Elixir online J., 58: 14874-14881.
  15. Singh, U. and D. Kumar, 2013. Bayesian estimation of the parameters of generalized inverted exponential distribution. Int. J. Econ. Stat., 1: 32-43.
  16. Singh, S.K., U. Singh and D. Kumar, 2013. Bayesian estimation of parameters of inverse weibull distribution. J. Applied Stat., 40: 1597-1607.
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  17. 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.
  18. Singh, U. and D. Kumar, 2011. Bayesian estimation of the exponentiated gamma parameter and reliability function under asymmetric loss function. Revstat-Stat. J., 9: 247-260.
  19. 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.
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  20. Singh, G., B.P. Singh, U. Singh and R.D. Singh, 2011. Shrinkage estimator and estimators for shape parameter of classical pareto distribution. J. Scient. Res., 55: 181-207.
  21. Singh, R., U. Singh and R.D. Singh, 2009. Bayes estimator of weibull parameters using Lindley's approximation under general entropy loss function. J. Scient. Res., 53: 127-145.
  22. Singh, R., U. Singh and G.P. Singh, 2009. Bayes estimators of generalized exponential parameters under general entropy loss function using lindley's approximation. Stat. Trans., 10: 109-127.
  23. 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.
  24. 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.
  25. 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.
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  26. Singh, G.P., S.K. Singh, U. Singh and S.K. Upadhyay, 2008. Bayes estimators of exponential parameters from a censored sample using a guessed estimate. Data Sci. J., 7: 106-114.
  27. Singh, U. 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.
  28. Singh, U., B.P. Singh, K.K. Singh and N. Singh, 2006. A bayesian analysis of risk of under five mortality in two contrasting state of India. Janasamkhyay, 24-25: 7-15.
  29. Singh, U. and P.K. Singh, 2006. Bayes estimator of gamma parameter under general entropy loss function using lindley's. J. Ravishankar Univ., 18: 83-96.
  30. Singh, S.K., S.K. Upadhyay and U. Singh, 1993. Bayes interval for the weibull parameter utilizing guessed estimation. Microelectron Reliability, 33: 909-912.
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  31. Singh, S.K., S.K. Upadhyay and U. Singh, 1990. On the selection of gamma vs exponential distribution and estimation of the parameters. Microelectron Reliability, 30: 1061-1064.
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  32. Singh, S.K., S. K. Upadhyay and U. Singh, 1989. Admissibility of a test procedure based on preliminary test of significance for life test data. Microelectron Reliability, 29: 721-722.
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