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Maximum Rényi Entropy Rate
- Source :
- IEEE Transactions on Information Theory. 62:1193-1205
- Publication Year :
- 2016
- Publisher :
- Institute of Electrical and Electronics Engineers (IEEE), 2016.
-
Abstract
- The supremum of the Renyi entropy rate over the class of discrete-time stationary stochastic processes, whose marginals are supported by some given set and satisfy some given cost constraint, is computed. Unlike the Shannon entropy, the Renyi entropy of a random vector can exceed the sum of the Renyi entropies of its components, and the supremum is, therefore, typically not achieved by memoryless processes. It is nonetheless related to Shannon’s entropy: when the Renyi parameter exceeds one, the supremum is equal to the corresponding supremum of Shannon’s entropy, and when it is smaller than one, the supremum equals the logarithm of the volume of the support set. A Burg-like supremum of the Renyi entropy rate over the class of stochastic processes, whose autocovariance function begins with some given values, is also solved. It is not achieved by Gauss–Markov processes, but it is nonetheless related to Burg’s supremum: the two are equal when the Renyi parameter exceeds one, and the former is infinite otherwise.
- Subjects :
- Shannon's source coding theorem
Min entropy
020206 networking & telecommunications
02 engineering and technology
Library and Information Sciences
01 natural sciences
Computer Science Applications
Entropy power inequality
Differential entropy
Rényi entropy
Combinatorics
010104 statistics & probability
Maximum entropy probability distribution
0202 electrical engineering, electronic engineering, information engineering
0101 mathematics
Joint quantum entropy
Entropy rate
Information Systems
Mathematics
Subjects
Details
- ISSN :
- 15579654 and 00189448
- Volume :
- 62
- Database :
- OpenAIRE
- Journal :
- IEEE Transactions on Information Theory
- Accession number :
- edsair.doi...........0e939ba0d00a0f96c0c87e126c91469b
- Full Text :
- https://doi.org/10.1109/tit.2016.2521364