Results on residual Rényi entropy of order statistics and record values
Information Sciences: an International Journal
Large-scale energy-efficient graph traversal: a path to efficient data-intensive supercomputing
SC '12 Proceedings of the International Conference on High Performance Computing, Networking, Storage and Analysis
PUFKY: a fully functional PUF-based cryptographic key generator
CHES'12 Proceedings of the 14th international conference on Cryptographic Hardware and Embedded Systems
On uncertainty and information properties of ranked set samples
Information Sciences: an International Journal
| Hi-index | 754.84 |
The entropy of a sequence of random variables under order restrictions is examined. A theorem that shows the amount of entropy reduction when the sequence is ordered is presented. Upper and lower bounds to the entropy reduction and conditions under which they are achieved are derived. Some interesting properties of the entropy of the individual order statistics are also presented. It is shown that the difference between the average entropy of the individual order statistics and the entropy of a member of the original independent identically distributed (IID) population is a constant, regardless of the original distribution. Finally, the entropies of the individual order statistics are found to be symmetric about the median when the probability density function (PDF) of the original IID sequence is symmetric about its mean