References
- Abo-Eleneen, Z.A. (2011). The entropy of progressively censored samples. Entropy 13:437449.
- Aggarwala, R. (1996). Advances in life testing: progressive censoring and generalized distribution. Ph. D. thesis, McMaster University.
- Aggarwala, R., Balakrishnan, N. (1998). Some properties of progressive censored order statistics from arbitrary and uniform distribution with application to inference and simulation. J. Statist. Plann. Infer. 70:3549.
- Ahmad, I.A., Lin, P.E. (1976). A nonparametric estimation of the entropy for absolutely continuous distributions. IEEE Trans. Inform. Theory 22:372375.
- Asadi, M., Ebrahimi, N., Soofi, E.S. (2005). Dynamic generalized information measures. Statist. Probab. Let. 71:8598.
- Balakrishnan, N., Aggarwala, R. (2000). Progressive Censoring: Theory, Methods and Applications. Boston: Birkhauser.
- Balakrishnan, N., Habibi Rad, A., Arghami, N.R. (2007). Testing exponentiality based on Kullback-Leibler information with progressively Type-II censored data. IEEE Trans. Reliab. 56:301307.
- Balakrishnan, N., Sandhu, R.A. (1995). A simple simulation algorithm for generating progressive Type-II censored samples. Amer. Statistician 49(2): 229230.
- Bordes, L. (2004). Nan-parametric estimation under progressive censoring. J. Statist. Plann. Infer. 119:171189.
- Dmitriev, Y.G., Tarasenko, F.P. (1973). On the estimation of functional of the probability density and its derivatives. Theory Probab. Appl. 18:628633.
- Ebrahimi, N. (1996). How to measure uncertainty in the residual lifetime distributions. Sankhya, A 58:4857.
- Mack, S. (1988). A comparative study of entropy estimators and entropy-based goodness-of-fit tests. . Ph.D. Dissertation, University of California, Riverside.
- Montanari, G.C., Cacciari, M. (1988). Progressively-censored aging tests on XLPE-insulated cable models. IEEE Trans. Elect. Insulation 23:365372.
- Nanda, A.K., Maiti, S.S. (2007). Rényi information measure for a used item. Inform. Sci. 177:41614175.
- Nanda, A.K., Paul, P. (2006). Some results on generalized residual entropy. Inform. Sci. 176:2747.
- Park, S. (1995). The entropy of consecutive order statistics. IEEE Trans. Inform. Theory 41:20032007.
- Rényi, A. (1961). On measures of entropy and information. Proc. Fourth Berkeley Symp. Math. Stat. Probab. 38:133147.
- Shannon, C.E. (1948). A mathematical theory of communication. Bell Syst. Tech. J. 27:379423.
- Vasicek, O. (1976). A test for normality based on sample entropy. J. Roy. Statist. Soc. B 38:5459.
- Zarezadeh, S., Asadi, M. (2010). Results on residual Renyi entropy of order statistics and record values. Inform. Sci. 180:41954206.