A Two-Moment Inequality with Applications to Rényi Entropy and Mutual Information.
Publication
, Journal Article
Reeves, G
Published in: Entropy (Basel, Switzerland)
November 2020
This paper explores some applications of a two-moment inequality for the integral of the rth power of a function, where 0
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Published In
Entropy (Basel, Switzerland)
DOI
EISSN
1099-4300
ISSN
1099-4300
Publication Date
November 2020
Volume
22
Issue
11
Start / End Page
E1244
Related Subject Headings
- Fluids & Plasmas
- 51 Physical sciences
- 49 Mathematical sciences
- 02 Physical Sciences
- 01 Mathematical Sciences
Citation
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Chicago
ICMJE
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NLM
Reeves, G. (2020). A Two-Moment Inequality with Applications to Rényi Entropy and Mutual Information. Entropy (Basel, Switzerland), 22(11), E1244. https://doi.org/10.3390/e22111244
Reeves, Galen. “A Two-Moment Inequality with Applications to Rényi Entropy and Mutual Information.” Entropy (Basel, Switzerland) 22, no. 11 (November 2020): E1244. https://doi.org/10.3390/e22111244.
Reeves G. A Two-Moment Inequality with Applications to Rényi Entropy and Mutual Information. Entropy (Basel, Switzerland). 2020 Nov;22(11):E1244.
Reeves, Galen. “A Two-Moment Inequality with Applications to Rényi Entropy and Mutual Information.” Entropy (Basel, Switzerland), vol. 22, no. 11, Nov. 2020, p. E1244. Epmc, doi:10.3390/e22111244.
Reeves G. A Two-Moment Inequality with Applications to Rényi Entropy and Mutual Information. Entropy (Basel, Switzerland). 2020 Nov;22(11):E1244.
Published In
Entropy (Basel, Switzerland)
DOI
EISSN
1099-4300
ISSN
1099-4300
Publication Date
November 2020
Volume
22
Issue
11
Start / End Page
E1244
Related Subject Headings
- Fluids & Plasmas
- 51 Physical sciences
- 49 Mathematical sciences
- 02 Physical Sciences
- 01 Mathematical Sciences