References
- Barlow, R. E., and F. Proschan. 1976. Techniques for analyzing multivariate failure data. Technical report, DTIC Document.
- Cheng, Y., and J. S. Pai. 2003. On the nth stop-loss transform order of ruin probability. Insurance: Mathematics and Economics 32 (1):51–60.
- Chong, K. M. 1977. On characterizations of the exponential and geometric distributions by expectations. Journal of the American Statistical Association 72 (357):160–1.
- Ebrahimi, N., and H. Zahedi. 1989. Testing for bivariate Gumbel against bivariate new better than used in expectation. Communications in Statistics-Theory and Methods 18 (4):1357–71.
- Gupta, P. L., and R. C. Gupta. 1983. On the moments of residual life in reliability and some characterization results. Communications in Statistics-Theory and Methods 12 (4):449–61.
- Gupta, R. C. 2007. Role of equilibrium distribution in reliability studies. Probability in the Engineering and Informational Sciences 21 (02):315–34.
- Hürlimann, W. 2002. On higher-degree bivariate stop-loss transforms, with applications. Blätter Der DGVFM 25 (3):485–502.
- Kundu, C., and K. Sarkar. 2017. Characterizations based on higher order and partial moments of inactivity time. Statistical Papers 58 (3):607–26.
- Lin, G. D. 2003. Characterizations of the exponential distribution via the residual lifetime. Sankhyā: The Indian Journal of Statistics, Series A 65 (2):249–58.
- Nair, N. U., P. G. Sankaran, and S. M. Sunoj. 2013a. Quantile based reliability aspects of partial moments. Journal of the Korean Statistical Society 42 (3):329–42.
- Nair, N. U., P. G. Sankaran, and S. M. Sunoj. 2013b. Quantile based stop-loss transform and its applications. Statistical Methods & Applications 22 (2):167–82.
- Puri, P. S., and H. Rubin. 1974. On a characterization of the family of distributions with constant multivariate failure rates. The Annals of Probability 2 (4):738–40.
- Sankaran, P. G., and N. U. Nair. 2004. Partial moments for bivariate distributions. Metron-International Journal of Statistics 62 (3):339–51.
- Stoyan, D., and D. J. Daley. 1983. Comparison methods for queues and other stochastic models. Wiley, New York.
- Sunoj, S. M. 2004. Characterizations of some continuous distributions using partial moments. Metron 62 (3):353–62.
- Sunoj, S. M., and S. S. Maya. 2008. The role of lower partial moments in stochastic modeling. Metron 66 (2):223–42.
- Sunoj, S. M., and N. Vipin. 2017. Some properties of conditional partial moments in the context of stochastic modeling. Statistical Papers, doi:10.1007/s00362–017–0904–x.