References
- Abbasnejad, M., Arghami, N.R., Morgenthaler, S., Mohtashami Borzadaran, G.R. (2010). On the dynamic survival entropy. Stat. Probab. Lett. 80:1962–1971.
- Asadi, M., Zohrevand, Y. (2007). On the dynamic cumulative residual entropy. J. Stat. Plan. Inf. 137:1931–1941.
- Di Crescenzo, A., Longobardi, M. (2002). Entropy-based measure of uncertainty in past lifetime distributions. J. Appl. Probab. 39:434–440.
- Ebrahimi, N., Pellerey, F. (1995). New partial ordering of survival functions based on notion of uncertainty. J. Appl. Probab. 32:202–211.
- Mukherjee, S.P., Roy, D. (1986). Some characterizations of the exponential and related life distributions. Calcutta Stat. Assoc. Bull. 35:189–197.
- Nanda, A.K., Paul, P. (2006). Some results on generalized past entropy. J. Stat. Plan. Inf. 136:3659–3674.
- Nanda, A.K., Shaked, M. (2001). The hazard rate and the reversed hazard rate orders, with applications to order statistics. Ann. Inst. Stat. Math. 53(4):853–864.
- Rao, M., Chen, Y., Vemuri, B.C., Wang, F. (2004). Cumulative residual entropy: a new measure of information. IEEE Trans. Inf. Theory 50:1220–1228.
- Rao, M. (2005). More on a new concept of entropy and information theory. Theoretical Probab. 18:967–981.
- Rényi, A. (1961). On measures of entropy and information. In: Proceeding of the Fourth Berkeley Symposium on Mathematical Statistics and Probability 1:547–561.
- Shannon, C.E. (1948). A mathematical theory of communication. Bell Sys. Tech. J. 27:379–423.
- Wiener, N. (1948). Cybernetics. New York: The MIT Press and John Wileys.